diff --git a/.gitignore b/.gitignore index a8f42be..ee63590 100644 --- a/.gitignore +++ b/.gitignore @@ -19,3 +19,4 @@ outputs/ *.egg-info/ .ipynb_checkpoints/ !sample_data/chatalpaca-openai-1k.jsonl +!sample_data/multiply-1k.jsonl diff --git a/sample_data/multiply-1k.jsonl b/sample_data/multiply-1k.jsonl new file mode 100644 index 0000000..fa74ea4 --- /dev/null +++ b/sample_data/multiply-1k.jsonl @@ -0,0 +1,1000 @@ +{"messages": [{"role": "user", "content": "What is the multiplication of 239 * 521?"}, {"role": "assistant", "content": "Here are the steps for multiplying 239 * 521 using the long multiplication method.\nStep 1: Break first number 239 into its individual digits: 2 (hundreds place), 3 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 521 into its individual digits: 5 (hundreds place), 2 (tens place), and 1 (ones place).\n- 9 (from 1 place of first number) * 1 (from 1 place of second number) = 9 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 9\n- 9 (from 1 place of first number) * 2 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 9 (from 1 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4500\n- 3 (from 10 place of first number) * 1 (from 1 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 3 (from 10 place of first number) * 2 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 3 (from 10 place of first number) * 5 (from 100 place of second number) = 15 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 15000\n- 2 (from 100 place of first number) * 1 (from 1 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 200\n- 2 (from 100 place of first number) * 2 (from 10 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 2 (from 100 place of first number) * 5 (from 100 place of second number) = 10 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 100000\n\nNow, add all these results together:\nThe sum of 9 + 180 + 4500 + 30 + 600 + 15000 + 200 + 4000 + 100000 = 124519."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 826 * 692?"}, {"role": "assistant", "content": "Here are the steps for multiplying 826 * 692 using the long multiplication method.\nStep 1: Break first number 826 into its individual digits: 8 (hundreds place), 2 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 692 into its individual digits: 6 (hundreds place), 9 (tens place), and 2 (ones place).\n- 6 (from 1 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 12\n- 6 (from 1 place of first number) * 9 (from 10 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 540\n- 6 (from 1 place of first number) * 6 (from 100 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3600\n- 2 (from 10 place of first number) * 2 (from 1 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 2 (from 10 place of first number) * 9 (from 10 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1800\n- 2 (from 10 place of first number) * 6 (from 100 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 12000\n- 8 (from 100 place of first number) * 2 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 8 (from 100 place of first number) * 9 (from 10 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 72000\n- 8 (from 100 place of first number) * 6 (from 100 place of second number) = 48 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 480000\n\nNow, add all these results together:\nThe sum of 12 + 540 + 3600 + 40 + 1800 + 12000 + 1600 + 72000 + 480000 = 571592."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 519 * 515?"}, {"role": "assistant", "content": "Here are the steps for multiplying 519 * 515 using the long multiplication method.\nStep 1: Break first number 519 into its individual digits: 5 (hundreds place), 1 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 515 into its individual digits: 5 (hundreds place), 1 (tens place), and 5 (ones place).\n- 9 (from 1 place of first number) * 5 (from 1 place of second number) = 45 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 45\n- 9 (from 1 place of first number) * 1 (from 10 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 90\n- 9 (from 1 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4500\n- 1 (from 10 place of first number) * 5 (from 1 place of second number) = 5 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 50\n- 1 (from 10 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 1 (from 10 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 5000\n- 5 (from 100 place of first number) * 5 (from 1 place of second number) = 25 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2500\n- 5 (from 100 place of first number) * 1 (from 10 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 5000\n- 5 (from 100 place of first number) * 5 (from 100 place of second number) = 25 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 250000\n\nNow, add all these results together:\nThe sum of 45 + 90 + 4500 + 50 + 100 + 5000 + 2500 + 5000 + 250000 = 267285."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 110 * 163?"}, {"role": "assistant", "content": "Here are the steps for multiplying 110 * 163 using the long multiplication method.\nStep 1: Break first number 110 into its individual digits: 1 (hundreds place), 1 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 163 into its individual digits: 1 (hundreds place), 6 (tens place), and 3 (ones place).\n- 0 (from 1 place of first number) * 3 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 6 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 1 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 1 (from 10 place of first number) * 3 (from 1 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 1 (from 10 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 1 (from 10 place of first number) * 1 (from 100 place of second number) = 1 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 1000\n- 1 (from 100 place of first number) * 3 (from 1 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 1 (from 100 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 1 (from 100 place of first number) * 1 (from 100 place of second number) = 1 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 10000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 30 + 600 + 1000 + 300 + 6000 + 10000 = 17930."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 727 * 312?"}, {"role": "assistant", "content": "Here are the steps for multiplying 727 * 312 using the long multiplication method.\nStep 1: Break first number 727 into its individual digits: 7 (hundreds place), 2 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 312 into its individual digits: 3 (hundreds place), 1 (tens place), and 2 (ones place).\n- 7 (from 1 place of first number) * 2 (from 1 place of second number) = 14 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 14\n- 7 (from 1 place of first number) * 1 (from 10 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 70\n- 7 (from 1 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2100\n- 2 (from 10 place of first number) * 2 (from 1 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 2 (from 10 place of first number) * 1 (from 10 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 200\n- 2 (from 10 place of first number) * 3 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 7 (from 100 place of first number) * 2 (from 1 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1400\n- 7 (from 100 place of first number) * 1 (from 10 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 7000\n- 7 (from 100 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 210000\n\nNow, add all these results together:\nThe sum of 14 + 70 + 2100 + 40 + 200 + 6000 + 1400 + 7000 + 210000 = 226824."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 339 * 190?"}, {"role": "assistant", "content": "Here are the steps for multiplying 339 * 190 using the long multiplication method.\nStep 1: Break first number 339 into its individual digits: 3 (hundreds place), 3 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 190 into its individual digits: 1 (hundreds place), 9 (tens place), and 0 (ones place).\n- 9 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 9 (from 1 place of first number) * 9 (from 10 place of second number) = 81 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 810\n- 9 (from 1 place of first number) * 1 (from 100 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 900\n- 3 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 3 (from 10 place of first number) * 9 (from 10 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2700\n- 3 (from 10 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 3 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 3 (from 100 place of first number) * 9 (from 10 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 27000\n- 3 (from 100 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n\nNow, add all these results together:\nThe sum of 0 + 810 + 900 + 0 + 2700 + 3000 + 0 + 27000 + 30000 = 64410."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 240 * 213?"}, {"role": "assistant", "content": "Here are the steps for multiplying 240 * 213 using the long multiplication method.\nStep 1: Break first number 240 into its individual digits: 2 (hundreds place), 4 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 213 into its individual digits: 2 (hundreds place), 1 (tens place), and 3 (ones place).\n- 0 (from 1 place of first number) * 3 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 1 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 2 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 4 (from 10 place of first number) * 3 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 4 (from 10 place of first number) * 1 (from 10 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 4 (from 10 place of first number) * 2 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 2 (from 100 place of first number) * 3 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 2 (from 100 place of first number) * 1 (from 10 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 2 (from 100 place of first number) * 2 (from 100 place of second number) = 4 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 120 + 400 + 8000 + 600 + 2000 + 40000 = 51120."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 582 * 116?"}, {"role": "assistant", "content": "Here are the steps for multiplying 582 * 116 using the long multiplication method.\nStep 1: Break first number 582 into its individual digits: 5 (hundreds place), 8 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 116 into its individual digits: 1 (hundreds place), 1 (tens place), and 6 (ones place).\n- 2 (from 1 place of first number) * 6 (from 1 place of second number) = 12 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 12\n- 2 (from 1 place of first number) * 1 (from 10 place of second number) = 2 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 20\n- 2 (from 1 place of first number) * 1 (from 100 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 200\n- 8 (from 10 place of first number) * 6 (from 1 place of second number) = 48 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 480\n- 8 (from 10 place of first number) * 1 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 8 (from 10 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 5 (from 100 place of first number) * 6 (from 1 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3000\n- 5 (from 100 place of first number) * 1 (from 10 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 5000\n- 5 (from 100 place of first number) * 1 (from 100 place of second number) = 5 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 50000\n\nNow, add all these results together:\nThe sum of 12 + 20 + 200 + 480 + 800 + 8000 + 3000 + 5000 + 50000 = 67512."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 838 * 152?"}, {"role": "assistant", "content": "Here are the steps for multiplying 838 * 152 using the long multiplication method.\nStep 1: Break first number 838 into its individual digits: 8 (hundreds place), 3 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 152 into its individual digits: 1 (hundreds place), 5 (tens place), and 2 (ones place).\n- 8 (from 1 place of first number) * 2 (from 1 place of second number) = 16 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 16\n- 8 (from 1 place of first number) * 5 (from 10 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 8 (from 1 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 3 (from 10 place of first number) * 2 (from 1 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 60\n- 3 (from 10 place of first number) * 5 (from 10 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1500\n- 3 (from 10 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 8 (from 100 place of first number) * 2 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 8 (from 100 place of first number) * 5 (from 10 place of second number) = 40 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 40000\n- 8 (from 100 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 16 + 400 + 800 + 60 + 1500 + 3000 + 1600 + 40000 + 80000 = 127376."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 636 * 728?"}, {"role": "assistant", "content": "Here are the steps for multiplying 636 * 728 using the long multiplication method.\nStep 1: Break first number 636 into its individual digits: 6 (hundreds place), 3 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 728 into its individual digits: 7 (hundreds place), 2 (tens place), and 8 (ones place).\n- 6 (from 1 place of first number) * 8 (from 1 place of second number) = 48 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 48\n- 6 (from 1 place of first number) * 2 (from 10 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 120\n- 6 (from 1 place of first number) * 7 (from 100 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4200\n- 3 (from 10 place of first number) * 8 (from 1 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 240\n- 3 (from 10 place of first number) * 2 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 3 (from 10 place of first number) * 7 (from 100 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 21000\n- 6 (from 100 place of first number) * 8 (from 1 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4800\n- 6 (from 100 place of first number) * 2 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 6 (from 100 place of first number) * 7 (from 100 place of second number) = 42 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 420000\n\nNow, add all these results together:\nThe sum of 48 + 120 + 4200 + 240 + 600 + 21000 + 4800 + 12000 + 420000 = 463008."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 584 * 379?"}, {"role": "assistant", "content": "Here are the steps for multiplying 584 * 379 using the long multiplication method.\nStep 1: Break first number 584 into its individual digits: 5 (hundreds place), 8 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 379 into its individual digits: 3 (hundreds place), 7 (tens place), and 9 (ones place).\n- 4 (from 1 place of first number) * 9 (from 1 place of second number) = 36 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 36\n- 4 (from 1 place of first number) * 7 (from 10 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 280\n- 4 (from 1 place of first number) * 3 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 8 (from 10 place of first number) * 9 (from 1 place of second number) = 72 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 720\n- 8 (from 10 place of first number) * 7 (from 10 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5600\n- 8 (from 10 place of first number) * 3 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 5 (from 100 place of first number) * 9 (from 1 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4500\n- 5 (from 100 place of first number) * 7 (from 10 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 35000\n- 5 (from 100 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 150000\n\nNow, add all these results together:\nThe sum of 36 + 280 + 1200 + 720 + 5600 + 24000 + 4500 + 35000 + 150000 = 221336."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 579 * 498?"}, {"role": "assistant", "content": "Here are the steps for multiplying 579 * 498 using the long multiplication method.\nStep 1: Break first number 579 into its individual digits: 5 (hundreds place), 7 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 498 into its individual digits: 4 (hundreds place), 9 (tens place), and 8 (ones place).\n- 9 (from 1 place of first number) * 8 (from 1 place of second number) = 72 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 72\n- 9 (from 1 place of first number) * 9 (from 10 place of second number) = 81 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 810\n- 9 (from 1 place of first number) * 4 (from 100 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3600\n- 7 (from 10 place of first number) * 8 (from 1 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 560\n- 7 (from 10 place of first number) * 9 (from 10 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 6300\n- 7 (from 10 place of first number) * 4 (from 100 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 28000\n- 5 (from 100 place of first number) * 8 (from 1 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4000\n- 5 (from 100 place of first number) * 9 (from 10 place of second number) = 45 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 45000\n- 5 (from 100 place of first number) * 4 (from 100 place of second number) = 20 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 200000\n\nNow, add all these results together:\nThe sum of 72 + 810 + 3600 + 560 + 6300 + 28000 + 4000 + 45000 + 200000 = 288342."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 761 * 221?"}, {"role": "assistant", "content": "Here are the steps for multiplying 761 * 221 using the long multiplication method.\nStep 1: Break first number 761 into its individual digits: 7 (hundreds place), 6 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 221 into its individual digits: 2 (hundreds place), 2 (tens place), and 1 (ones place).\n- 1 (from 1 place of first number) * 1 (from 1 place of second number) = 1 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 1\n- 1 (from 1 place of first number) * 2 (from 10 place of second number) = 2 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 20\n- 1 (from 1 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 200\n- 6 (from 10 place of first number) * 1 (from 1 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 60\n- 6 (from 10 place of first number) * 2 (from 10 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1200\n- 6 (from 10 place of first number) * 2 (from 100 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 12000\n- 7 (from 100 place of first number) * 1 (from 1 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 700\n- 7 (from 100 place of first number) * 2 (from 10 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 14000\n- 7 (from 100 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 140000\n\nNow, add all these results together:\nThe sum of 1 + 20 + 200 + 60 + 1200 + 12000 + 700 + 14000 + 140000 = 168181."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 459 * 518?"}, {"role": "assistant", "content": "Here are the steps for multiplying 459 * 518 using the long multiplication method.\nStep 1: Break first number 459 into its individual digits: 4 (hundreds place), 5 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 518 into its individual digits: 5 (hundreds place), 1 (tens place), and 8 (ones place).\n- 9 (from 1 place of first number) * 8 (from 1 place of second number) = 72 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 72\n- 9 (from 1 place of first number) * 1 (from 10 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 90\n- 9 (from 1 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4500\n- 5 (from 10 place of first number) * 8 (from 1 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 5 (from 10 place of first number) * 1 (from 10 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 500\n- 5 (from 10 place of first number) * 5 (from 100 place of second number) = 25 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 25000\n- 4 (from 100 place of first number) * 8 (from 1 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3200\n- 4 (from 100 place of first number) * 1 (from 10 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 4 (from 100 place of first number) * 5 (from 100 place of second number) = 20 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 200000\n\nNow, add all these results together:\nThe sum of 72 + 90 + 4500 + 400 + 500 + 25000 + 3200 + 4000 + 200000 = 237762."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 324 * 271?"}, {"role": "assistant", "content": "Here are the steps for multiplying 324 * 271 using the long multiplication method.\nStep 1: Break first number 324 into its individual digits: 3 (hundreds place), 2 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 271 into its individual digits: 2 (hundreds place), 7 (tens place), and 1 (ones place).\n- 4 (from 1 place of first number) * 1 (from 1 place of second number) = 4 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 4\n- 4 (from 1 place of first number) * 7 (from 10 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 280\n- 4 (from 1 place of first number) * 2 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 2 (from 10 place of first number) * 1 (from 1 place of second number) = 2 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 2 (from 10 place of first number) * 7 (from 10 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1400\n- 2 (from 10 place of first number) * 2 (from 100 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 3 (from 100 place of first number) * 1 (from 1 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 3 (from 100 place of first number) * 7 (from 10 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 21000\n- 3 (from 100 place of first number) * 2 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 4 + 280 + 800 + 20 + 1400 + 4000 + 300 + 21000 + 60000 = 87804."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 573 * 946?"}, {"role": "assistant", "content": "Here are the steps for multiplying 573 * 946 using the long multiplication method.\nStep 1: Break first number 573 into its individual digits: 5 (hundreds place), 7 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 946 into its individual digits: 9 (hundreds place), 4 (tens place), and 6 (ones place).\n- 3 (from 1 place of first number) * 6 (from 1 place of second number) = 18 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 18\n- 3 (from 1 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 120\n- 3 (from 1 place of first number) * 9 (from 100 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2700\n- 7 (from 10 place of first number) * 6 (from 1 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 420\n- 7 (from 10 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2800\n- 7 (from 10 place of first number) * 9 (from 100 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 63000\n- 5 (from 100 place of first number) * 6 (from 1 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3000\n- 5 (from 100 place of first number) * 4 (from 10 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 20000\n- 5 (from 100 place of first number) * 9 (from 100 place of second number) = 45 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 450000\n\nNow, add all these results together:\nThe sum of 18 + 120 + 2700 + 420 + 2800 + 63000 + 3000 + 20000 + 450000 = 542058."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 944 * 458?"}, {"role": "assistant", "content": "Here are the steps for multiplying 944 * 458 using the long multiplication method.\nStep 1: Break first number 944 into its individual digits: 9 (hundreds place), 4 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 458 into its individual digits: 4 (hundreds place), 5 (tens place), and 8 (ones place).\n- 4 (from 1 place of first number) * 8 (from 1 place of second number) = 32 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 32\n- 4 (from 1 place of first number) * 5 (from 10 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 200\n- 4 (from 1 place of first number) * 4 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 4 (from 10 place of first number) * 8 (from 1 place of second number) = 32 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 320\n- 4 (from 10 place of first number) * 5 (from 10 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 4 (from 10 place of first number) * 4 (from 100 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 16000\n- 9 (from 100 place of first number) * 8 (from 1 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 7200\n- 9 (from 100 place of first number) * 5 (from 10 place of second number) = 45 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 45000\n- 9 (from 100 place of first number) * 4 (from 100 place of second number) = 36 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 360000\n\nNow, add all these results together:\nThe sum of 32 + 200 + 1600 + 320 + 2000 + 16000 + 7200 + 45000 + 360000 = 432352."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 603 * 880?"}, {"role": "assistant", "content": "Here are the steps for multiplying 603 * 880 using the long multiplication method.\nStep 1: Break first number 603 into its individual digits: 6 (hundreds place), 0 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 880 into its individual digits: 8 (hundreds place), 8 (tens place), and 0 (ones place).\n- 3 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 3 (from 1 place of first number) * 8 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 3 (from 1 place of first number) * 8 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 0 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 8 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 8 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 6 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 6 (from 100 place of first number) * 8 (from 10 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 48000\n- 6 (from 100 place of first number) * 8 (from 100 place of second number) = 48 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 480000\n\nNow, add all these results together:\nThe sum of 0 + 240 + 2400 + 0 + 0 + 0 + 0 + 48000 + 480000 = 530640."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 675 * 779?"}, {"role": "assistant", "content": "Here are the steps for multiplying 675 * 779 using the long multiplication method.\nStep 1: Break first number 675 into its individual digits: 6 (hundreds place), 7 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 779 into its individual digits: 7 (hundreds place), 7 (tens place), and 9 (ones place).\n- 5 (from 1 place of first number) * 9 (from 1 place of second number) = 45 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 45\n- 5 (from 1 place of first number) * 7 (from 10 place of second number) = 35 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 350\n- 5 (from 1 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3500\n- 7 (from 10 place of first number) * 9 (from 1 place of second number) = 63 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 630\n- 7 (from 10 place of first number) * 7 (from 10 place of second number) = 49 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4900\n- 7 (from 10 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 49000\n- 6 (from 100 place of first number) * 9 (from 1 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 5400\n- 6 (from 100 place of first number) * 7 (from 10 place of second number) = 42 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 42000\n- 6 (from 100 place of first number) * 7 (from 100 place of second number) = 42 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 420000\n\nNow, add all these results together:\nThe sum of 45 + 350 + 3500 + 630 + 4900 + 49000 + 5400 + 42000 + 420000 = 525825."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 443 * 688?"}, {"role": "assistant", "content": "Here are the steps for multiplying 443 * 688 using the long multiplication method.\nStep 1: Break first number 443 into its individual digits: 4 (hundreds place), 4 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 688 into its individual digits: 6 (hundreds place), 8 (tens place), and 8 (ones place).\n- 3 (from 1 place of first number) * 8 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 3 (from 1 place of first number) * 8 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 3 (from 1 place of first number) * 6 (from 100 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1800\n- 4 (from 10 place of first number) * 8 (from 1 place of second number) = 32 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 320\n- 4 (from 10 place of first number) * 8 (from 10 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3200\n- 4 (from 10 place of first number) * 6 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 4 (from 100 place of first number) * 8 (from 1 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3200\n- 4 (from 100 place of first number) * 8 (from 10 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 32000\n- 4 (from 100 place of first number) * 6 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 24 + 240 + 1800 + 320 + 3200 + 24000 + 3200 + 32000 + 240000 = 304784."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 230 * 338?"}, {"role": "assistant", "content": "Here are the steps for multiplying 230 * 338 using the long multiplication method.\nStep 1: Break first number 230 into its individual digits: 2 (hundreds place), 3 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 338 into its individual digits: 3 (hundreds place), 3 (tens place), and 8 (ones place).\n- 0 (from 1 place of first number) * 8 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 3 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 3 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 3 (from 10 place of first number) * 8 (from 1 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 240\n- 3 (from 10 place of first number) * 3 (from 10 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 900\n- 3 (from 10 place of first number) * 3 (from 100 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 9000\n- 2 (from 100 place of first number) * 8 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 2 (from 100 place of first number) * 3 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 2 (from 100 place of first number) * 3 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 240 + 900 + 9000 + 1600 + 6000 + 60000 = 77740."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 240 * 114?"}, {"role": "assistant", "content": "Here are the steps for multiplying 240 * 114 using the long multiplication method.\nStep 1: Break first number 240 into its individual digits: 2 (hundreds place), 4 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 114 into its individual digits: 1 (hundreds place), 1 (tens place), and 4 (ones place).\n- 0 (from 1 place of first number) * 4 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 1 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 1 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 4 (from 10 place of first number) * 4 (from 1 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 160\n- 4 (from 10 place of first number) * 1 (from 10 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 4 (from 10 place of first number) * 1 (from 100 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 2 (from 100 place of first number) * 4 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 2 (from 100 place of first number) * 1 (from 10 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 2 (from 100 place of first number) * 1 (from 100 place of second number) = 2 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 160 + 400 + 4000 + 800 + 2000 + 20000 = 27360."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 706 * 351?"}, {"role": "assistant", "content": "Here are the steps for multiplying 706 * 351 using the long multiplication method.\nStep 1: Break first number 706 into its individual digits: 7 (hundreds place), 0 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 351 into its individual digits: 3 (hundreds place), 5 (tens place), and 1 (ones place).\n- 6 (from 1 place of first number) * 1 (from 1 place of second number) = 6 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 6\n- 6 (from 1 place of first number) * 5 (from 10 place of second number) = 30 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 300\n- 6 (from 1 place of first number) * 3 (from 100 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1800\n- 0 (from 10 place of first number) * 1 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 5 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 3 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 7 (from 100 place of first number) * 1 (from 1 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 700\n- 7 (from 100 place of first number) * 5 (from 10 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 35000\n- 7 (from 100 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 210000\n\nNow, add all these results together:\nThe sum of 6 + 300 + 1800 + 0 + 0 + 0 + 700 + 35000 + 210000 = 247806."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 763 * 498?"}, {"role": "assistant", "content": "Here are the steps for multiplying 763 * 498 using the long multiplication method.\nStep 1: Break first number 763 into its individual digits: 7 (hundreds place), 6 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 498 into its individual digits: 4 (hundreds place), 9 (tens place), and 8 (ones place).\n- 3 (from 1 place of first number) * 8 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 3 (from 1 place of first number) * 9 (from 10 place of second number) = 27 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 270\n- 3 (from 1 place of first number) * 4 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 6 (from 10 place of first number) * 8 (from 1 place of second number) = 48 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 480\n- 6 (from 10 place of first number) * 9 (from 10 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5400\n- 6 (from 10 place of first number) * 4 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 7 (from 100 place of first number) * 8 (from 1 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 5600\n- 7 (from 100 place of first number) * 9 (from 10 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 63000\n- 7 (from 100 place of first number) * 4 (from 100 place of second number) = 28 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 280000\n\nNow, add all these results together:\nThe sum of 24 + 270 + 1200 + 480 + 5400 + 24000 + 5600 + 63000 + 280000 = 379974."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 242 * 867?"}, {"role": "assistant", "content": "Here are the steps for multiplying 242 * 867 using the long multiplication method.\nStep 1: Break first number 242 into its individual digits: 2 (hundreds place), 4 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 867 into its individual digits: 8 (hundreds place), 6 (tens place), and 7 (ones place).\n- 2 (from 1 place of first number) * 7 (from 1 place of second number) = 14 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 14\n- 2 (from 1 place of first number) * 6 (from 10 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 120\n- 2 (from 1 place of first number) * 8 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 4 (from 10 place of first number) * 7 (from 1 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 280\n- 4 (from 10 place of first number) * 6 (from 10 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2400\n- 4 (from 10 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 32000\n- 2 (from 100 place of first number) * 7 (from 1 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1400\n- 2 (from 100 place of first number) * 6 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 2 (from 100 place of first number) * 8 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 14 + 120 + 1600 + 280 + 2400 + 32000 + 1400 + 12000 + 160000 = 209814."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 108 * 871?"}, {"role": "assistant", "content": "Here are the steps for multiplying 108 * 871 using the long multiplication method.\nStep 1: Break first number 108 into its individual digits: 1 (hundreds place), 0 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 871 into its individual digits: 8 (hundreds place), 7 (tens place), and 1 (ones place).\n- 8 (from 1 place of first number) * 1 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 8 (from 1 place of first number) * 7 (from 10 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 560\n- 8 (from 1 place of first number) * 8 (from 100 place of second number) = 64 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 6400\n- 0 (from 10 place of first number) * 1 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 7 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 8 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 1 (from 100 place of first number) * 1 (from 1 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 100\n- 1 (from 100 place of first number) * 7 (from 10 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 7000\n- 1 (from 100 place of first number) * 8 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 8 + 560 + 6400 + 0 + 0 + 0 + 100 + 7000 + 80000 = 94068."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 500 * 511?"}, {"role": "assistant", "content": "Here are the steps for multiplying 500 * 511 using the long multiplication method.\nStep 1: Break first number 500 into its individual digits: 5 (hundreds place), 0 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 511 into its individual digits: 5 (hundreds place), 1 (tens place), and 1 (ones place).\n- 0 (from 1 place of first number) * 1 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 1 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 5 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 0 (from 10 place of first number) * 1 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 1 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 5 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 5 (from 100 place of first number) * 1 (from 1 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 500\n- 5 (from 100 place of first number) * 1 (from 10 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 5000\n- 5 (from 100 place of first number) * 5 (from 100 place of second number) = 25 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 250000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 0 + 0 + 0 + 500 + 5000 + 250000 = 255500."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 629 * 333?"}, {"role": "assistant", "content": "Here are the steps for multiplying 629 * 333 using the long multiplication method.\nStep 1: Break first number 629 into its individual digits: 6 (hundreds place), 2 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 333 into its individual digits: 3 (hundreds place), 3 (tens place), and 3 (ones place).\n- 9 (from 1 place of first number) * 3 (from 1 place of second number) = 27 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 27\n- 9 (from 1 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 270\n- 9 (from 1 place of first number) * 3 (from 100 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2700\n- 2 (from 10 place of first number) * 3 (from 1 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 60\n- 2 (from 10 place of first number) * 3 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 2 (from 10 place of first number) * 3 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 6 (from 100 place of first number) * 3 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 6 (from 100 place of first number) * 3 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 6 (from 100 place of first number) * 3 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 27 + 270 + 2700 + 60 + 600 + 6000 + 1800 + 18000 + 180000 = 209457."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 150 * 221?"}, {"role": "assistant", "content": "Here are the steps for multiplying 150 * 221 using the long multiplication method.\nStep 1: Break first number 150 into its individual digits: 1 (hundreds place), 5 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 221 into its individual digits: 2 (hundreds place), 2 (tens place), and 1 (ones place).\n- 0 (from 1 place of first number) * 1 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 2 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 2 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 5 (from 10 place of first number) * 1 (from 1 place of second number) = 5 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 50\n- 5 (from 10 place of first number) * 2 (from 10 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1000\n- 5 (from 10 place of first number) * 2 (from 100 place of second number) = 10 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 10000\n- 1 (from 100 place of first number) * 1 (from 1 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 100\n- 1 (from 100 place of first number) * 2 (from 10 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 1 (from 100 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 50 + 1000 + 10000 + 100 + 2000 + 20000 = 33150."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 608 * 224?"}, {"role": "assistant", "content": "Here are the steps for multiplying 608 * 224 using the long multiplication method.\nStep 1: Break first number 608 into its individual digits: 6 (hundreds place), 0 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 224 into its individual digits: 2 (hundreds place), 2 (tens place), and 4 (ones place).\n- 8 (from 1 place of first number) * 4 (from 1 place of second number) = 32 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 32\n- 8 (from 1 place of first number) * 2 (from 10 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 160\n- 8 (from 1 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 0 (from 10 place of first number) * 4 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 2 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 2 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 6 (from 100 place of first number) * 4 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 6 (from 100 place of first number) * 2 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 6 (from 100 place of first number) * 2 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 32 + 160 + 1600 + 0 + 0 + 0 + 2400 + 12000 + 120000 = 136192."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 331 * 149?"}, {"role": "assistant", "content": "Here are the steps for multiplying 331 * 149 using the long multiplication method.\nStep 1: Break first number 331 into its individual digits: 3 (hundreds place), 3 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 149 into its individual digits: 1 (hundreds place), 4 (tens place), and 9 (ones place).\n- 1 (from 1 place of first number) * 9 (from 1 place of second number) = 9 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 9\n- 1 (from 1 place of first number) * 4 (from 10 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 40\n- 1 (from 1 place of first number) * 1 (from 100 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 100\n- 3 (from 10 place of first number) * 9 (from 1 place of second number) = 27 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 270\n- 3 (from 10 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1200\n- 3 (from 10 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 3 (from 100 place of first number) * 9 (from 1 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2700\n- 3 (from 100 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 3 (from 100 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n\nNow, add all these results together:\nThe sum of 9 + 40 + 100 + 270 + 1200 + 3000 + 2700 + 12000 + 30000 = 49319."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 314 * 897?"}, {"role": "assistant", "content": "Here are the steps for multiplying 314 * 897 using the long multiplication method.\nStep 1: Break first number 314 into its individual digits: 3 (hundreds place), 1 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 897 into its individual digits: 8 (hundreds place), 9 (tens place), and 7 (ones place).\n- 4 (from 1 place of first number) * 7 (from 1 place of second number) = 28 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 28\n- 4 (from 1 place of first number) * 9 (from 10 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 360\n- 4 (from 1 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3200\n- 1 (from 10 place of first number) * 7 (from 1 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 70\n- 1 (from 10 place of first number) * 9 (from 10 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 900\n- 1 (from 10 place of first number) * 8 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 3 (from 100 place of first number) * 7 (from 1 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2100\n- 3 (from 100 place of first number) * 9 (from 10 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 27000\n- 3 (from 100 place of first number) * 8 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 28 + 360 + 3200 + 70 + 900 + 8000 + 2100 + 27000 + 240000 = 281658."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 312 * 485?"}, {"role": "assistant", "content": "Here are the steps for multiplying 312 * 485 using the long multiplication method.\nStep 1: Break first number 312 into its individual digits: 3 (hundreds place), 1 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 485 into its individual digits: 4 (hundreds place), 8 (tens place), and 5 (ones place).\n- 2 (from 1 place of first number) * 5 (from 1 place of second number) = 10 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 10\n- 2 (from 1 place of first number) * 8 (from 10 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 160\n- 2 (from 1 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 1 (from 10 place of first number) * 5 (from 1 place of second number) = 5 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 50\n- 1 (from 10 place of first number) * 8 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 1 (from 10 place of first number) * 4 (from 100 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 3 (from 100 place of first number) * 5 (from 1 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1500\n- 3 (from 100 place of first number) * 8 (from 10 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 24000\n- 3 (from 100 place of first number) * 4 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 10 + 160 + 800 + 50 + 800 + 4000 + 1500 + 24000 + 120000 = 151320."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 108 * 511?"}, {"role": "assistant", "content": "Here are the steps for multiplying 108 * 511 using the long multiplication method.\nStep 1: Break first number 108 into its individual digits: 1 (hundreds place), 0 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 511 into its individual digits: 5 (hundreds place), 1 (tens place), and 1 (ones place).\n- 8 (from 1 place of first number) * 1 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 8 (from 1 place of first number) * 1 (from 10 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 80\n- 8 (from 1 place of first number) * 5 (from 100 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 0 (from 10 place of first number) * 1 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 1 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 5 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 1 (from 100 place of first number) * 1 (from 1 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 100\n- 1 (from 100 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 1000\n- 1 (from 100 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 50000\n\nNow, add all these results together:\nThe sum of 8 + 80 + 4000 + 0 + 0 + 0 + 100 + 1000 + 50000 = 55188."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 919 * 959?"}, {"role": "assistant", "content": "Here are the steps for multiplying 919 * 959 using the long multiplication method.\nStep 1: Break first number 919 into its individual digits: 9 (hundreds place), 1 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 959 into its individual digits: 9 (hundreds place), 5 (tens place), and 9 (ones place).\n- 9 (from 1 place of first number) * 9 (from 1 place of second number) = 81 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 81\n- 9 (from 1 place of first number) * 5 (from 10 place of second number) = 45 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 450\n- 9 (from 1 place of first number) * 9 (from 100 place of second number) = 81 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 8100\n- 1 (from 10 place of first number) * 9 (from 1 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 90\n- 1 (from 10 place of first number) * 5 (from 10 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 500\n- 1 (from 10 place of first number) * 9 (from 100 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 9000\n- 9 (from 100 place of first number) * 9 (from 1 place of second number) = 81 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 8100\n- 9 (from 100 place of first number) * 5 (from 10 place of second number) = 45 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 45000\n- 9 (from 100 place of first number) * 9 (from 100 place of second number) = 81 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 810000\n\nNow, add all these results together:\nThe sum of 81 + 450 + 8100 + 90 + 500 + 9000 + 8100 + 45000 + 810000 = 881321."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 904 * 407?"}, {"role": "assistant", "content": "Here are the steps for multiplying 904 * 407 using the long multiplication method.\nStep 1: Break first number 904 into its individual digits: 9 (hundreds place), 0 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 407 into its individual digits: 4 (hundreds place), 0 (tens place), and 7 (ones place).\n- 4 (from 1 place of first number) * 7 (from 1 place of second number) = 28 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 28\n- 4 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 4 (from 1 place of first number) * 4 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 0 (from 10 place of first number) * 7 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 4 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 9 (from 100 place of first number) * 7 (from 1 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 6300\n- 9 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 9 (from 100 place of first number) * 4 (from 100 place of second number) = 36 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 360000\n\nNow, add all these results together:\nThe sum of 28 + 0 + 1600 + 0 + 0 + 0 + 6300 + 0 + 360000 = 367928."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 718 * 613?"}, {"role": "assistant", "content": "Here are the steps for multiplying 718 * 613 using the long multiplication method.\nStep 1: Break first number 718 into its individual digits: 7 (hundreds place), 1 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 613 into its individual digits: 6 (hundreds place), 1 (tens place), and 3 (ones place).\n- 8 (from 1 place of first number) * 3 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 8 (from 1 place of first number) * 1 (from 10 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 80\n- 8 (from 1 place of first number) * 6 (from 100 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4800\n- 1 (from 10 place of first number) * 3 (from 1 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 1 (from 10 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 1 (from 10 place of first number) * 6 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 7 (from 100 place of first number) * 3 (from 1 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2100\n- 7 (from 100 place of first number) * 1 (from 10 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 7000\n- 7 (from 100 place of first number) * 6 (from 100 place of second number) = 42 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 420000\n\nNow, add all these results together:\nThe sum of 24 + 80 + 4800 + 30 + 100 + 6000 + 2100 + 7000 + 420000 = 440134."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 321 * 347?"}, {"role": "assistant", "content": "Here are the steps for multiplying 321 * 347 using the long multiplication method.\nStep 1: Break first number 321 into its individual digits: 3 (hundreds place), 2 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 347 into its individual digits: 3 (hundreds place), 4 (tens place), and 7 (ones place).\n- 1 (from 1 place of first number) * 7 (from 1 place of second number) = 7 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 7\n- 1 (from 1 place of first number) * 4 (from 10 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 40\n- 1 (from 1 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 300\n- 2 (from 10 place of first number) * 7 (from 1 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 140\n- 2 (from 10 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 2 (from 10 place of first number) * 3 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 3 (from 100 place of first number) * 7 (from 1 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2100\n- 3 (from 100 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 3 (from 100 place of first number) * 3 (from 100 place of second number) = 9 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 90000\n\nNow, add all these results together:\nThe sum of 7 + 40 + 300 + 140 + 800 + 6000 + 2100 + 12000 + 90000 = 111387."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 487 * 160?"}, {"role": "assistant", "content": "Here are the steps for multiplying 487 * 160 using the long multiplication method.\nStep 1: Break first number 487 into its individual digits: 4 (hundreds place), 8 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 160 into its individual digits: 1 (hundreds place), 6 (tens place), and 0 (ones place).\n- 7 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 1 place of first number) * 6 (from 10 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 420\n- 7 (from 1 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 700\n- 8 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 10 place of first number) * 6 (from 10 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4800\n- 8 (from 10 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 4 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 4 (from 100 place of first number) * 6 (from 10 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 24000\n- 4 (from 100 place of first number) * 1 (from 100 place of second number) = 4 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n\nNow, add all these results together:\nThe sum of 0 + 420 + 700 + 0 + 4800 + 8000 + 0 + 24000 + 40000 = 77920."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 836 * 892?"}, {"role": "assistant", "content": "Here are the steps for multiplying 836 * 892 using the long multiplication method.\nStep 1: Break first number 836 into its individual digits: 8 (hundreds place), 3 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 892 into its individual digits: 8 (hundreds place), 9 (tens place), and 2 (ones place).\n- 6 (from 1 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 12\n- 6 (from 1 place of first number) * 9 (from 10 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 540\n- 6 (from 1 place of first number) * 8 (from 100 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4800\n- 3 (from 10 place of first number) * 2 (from 1 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 60\n- 3 (from 10 place of first number) * 9 (from 10 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2700\n- 3 (from 10 place of first number) * 8 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 8 (from 100 place of first number) * 2 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 8 (from 100 place of first number) * 9 (from 10 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 72000\n- 8 (from 100 place of first number) * 8 (from 100 place of second number) = 64 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 640000\n\nNow, add all these results together:\nThe sum of 12 + 540 + 4800 + 60 + 2700 + 24000 + 1600 + 72000 + 640000 = 745712."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 356 * 192?"}, {"role": "assistant", "content": "Here are the steps for multiplying 356 * 192 using the long multiplication method.\nStep 1: Break first number 356 into its individual digits: 3 (hundreds place), 5 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 192 into its individual digits: 1 (hundreds place), 9 (tens place), and 2 (ones place).\n- 6 (from 1 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 12\n- 6 (from 1 place of first number) * 9 (from 10 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 540\n- 6 (from 1 place of first number) * 1 (from 100 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 600\n- 5 (from 10 place of first number) * 2 (from 1 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 100\n- 5 (from 10 place of first number) * 9 (from 10 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4500\n- 5 (from 10 place of first number) * 1 (from 100 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 5000\n- 3 (from 100 place of first number) * 2 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 3 (from 100 place of first number) * 9 (from 10 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 27000\n- 3 (from 100 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n\nNow, add all these results together:\nThe sum of 12 + 540 + 600 + 100 + 4500 + 5000 + 600 + 27000 + 30000 = 68352."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 856 * 867?"}, {"role": "assistant", "content": "Here are the steps for multiplying 856 * 867 using the long multiplication method.\nStep 1: Break first number 856 into its individual digits: 8 (hundreds place), 5 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 867 into its individual digits: 8 (hundreds place), 6 (tens place), and 7 (ones place).\n- 6 (from 1 place of first number) * 7 (from 1 place of second number) = 42 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 42\n- 6 (from 1 place of first number) * 6 (from 10 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 360\n- 6 (from 1 place of first number) * 8 (from 100 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4800\n- 5 (from 10 place of first number) * 7 (from 1 place of second number) = 35 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 350\n- 5 (from 10 place of first number) * 6 (from 10 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 5 (from 10 place of first number) * 8 (from 100 place of second number) = 40 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n- 8 (from 100 place of first number) * 7 (from 1 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 5600\n- 8 (from 100 place of first number) * 6 (from 10 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 48000\n- 8 (from 100 place of first number) * 8 (from 100 place of second number) = 64 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 640000\n\nNow, add all these results together:\nThe sum of 42 + 360 + 4800 + 350 + 3000 + 40000 + 5600 + 48000 + 640000 = 742152."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 538 * 238?"}, {"role": "assistant", "content": "Here are the steps for multiplying 538 * 238 using the long multiplication method.\nStep 1: Break first number 538 into its individual digits: 5 (hundreds place), 3 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 238 into its individual digits: 2 (hundreds place), 3 (tens place), and 8 (ones place).\n- 8 (from 1 place of first number) * 8 (from 1 place of second number) = 64 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 64\n- 8 (from 1 place of first number) * 3 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 8 (from 1 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 3 (from 10 place of first number) * 8 (from 1 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 240\n- 3 (from 10 place of first number) * 3 (from 10 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 900\n- 3 (from 10 place of first number) * 2 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 5 (from 100 place of first number) * 8 (from 1 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4000\n- 5 (from 100 place of first number) * 3 (from 10 place of second number) = 15 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 15000\n- 5 (from 100 place of first number) * 2 (from 100 place of second number) = 10 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 100000\n\nNow, add all these results together:\nThe sum of 64 + 240 + 1600 + 240 + 900 + 6000 + 4000 + 15000 + 100000 = 128044."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 893 * 565?"}, {"role": "assistant", "content": "Here are the steps for multiplying 893 * 565 using the long multiplication method.\nStep 1: Break first number 893 into its individual digits: 8 (hundreds place), 9 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 565 into its individual digits: 5 (hundreds place), 6 (tens place), and 5 (ones place).\n- 3 (from 1 place of first number) * 5 (from 1 place of second number) = 15 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 15\n- 3 (from 1 place of first number) * 6 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 3 (from 1 place of first number) * 5 (from 100 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1500\n- 9 (from 10 place of first number) * 5 (from 1 place of second number) = 45 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 450\n- 9 (from 10 place of first number) * 6 (from 10 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5400\n- 9 (from 10 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 45000\n- 8 (from 100 place of first number) * 5 (from 1 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4000\n- 8 (from 100 place of first number) * 6 (from 10 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 48000\n- 8 (from 100 place of first number) * 5 (from 100 place of second number) = 40 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 400000\n\nNow, add all these results together:\nThe sum of 15 + 180 + 1500 + 450 + 5400 + 45000 + 4000 + 48000 + 400000 = 504545."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 690 * 733?"}, {"role": "assistant", "content": "Here are the steps for multiplying 690 * 733 using the long multiplication method.\nStep 1: Break first number 690 into its individual digits: 6 (hundreds place), 9 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 733 into its individual digits: 7 (hundreds place), 3 (tens place), and 3 (ones place).\n- 0 (from 1 place of first number) * 3 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 3 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 7 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 9 (from 10 place of first number) * 3 (from 1 place of second number) = 27 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 270\n- 9 (from 10 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2700\n- 9 (from 10 place of first number) * 7 (from 100 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 63000\n- 6 (from 100 place of first number) * 3 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 6 (from 100 place of first number) * 3 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 6 (from 100 place of first number) * 7 (from 100 place of second number) = 42 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 420000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 270 + 2700 + 63000 + 1800 + 18000 + 420000 = 505770."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 131 * 255?"}, {"role": "assistant", "content": "Here are the steps for multiplying 131 * 255 using the long multiplication method.\nStep 1: Break first number 131 into its individual digits: 1 (hundreds place), 3 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 255 into its individual digits: 2 (hundreds place), 5 (tens place), and 5 (ones place).\n- 1 (from 1 place of first number) * 5 (from 1 place of second number) = 5 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 5\n- 1 (from 1 place of first number) * 5 (from 10 place of second number) = 5 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 50\n- 1 (from 1 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 200\n- 3 (from 10 place of first number) * 5 (from 1 place of second number) = 15 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 150\n- 3 (from 10 place of first number) * 5 (from 10 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1500\n- 3 (from 10 place of first number) * 2 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 1 (from 100 place of first number) * 5 (from 1 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 500\n- 1 (from 100 place of first number) * 5 (from 10 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 5000\n- 1 (from 100 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n\nNow, add all these results together:\nThe sum of 5 + 50 + 200 + 150 + 1500 + 6000 + 500 + 5000 + 20000 = 33405."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 961 * 932?"}, {"role": "assistant", "content": "Here are the steps for multiplying 961 * 932 using the long multiplication method.\nStep 1: Break first number 961 into its individual digits: 9 (hundreds place), 6 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 932 into its individual digits: 9 (hundreds place), 3 (tens place), and 2 (ones place).\n- 1 (from 1 place of first number) * 2 (from 1 place of second number) = 2 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 2\n- 1 (from 1 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 30\n- 1 (from 1 place of first number) * 9 (from 100 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 900\n- 6 (from 10 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 6 (from 10 place of first number) * 3 (from 10 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1800\n- 6 (from 10 place of first number) * 9 (from 100 place of second number) = 54 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 54000\n- 9 (from 100 place of first number) * 2 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 9 (from 100 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 27000\n- 9 (from 100 place of first number) * 9 (from 100 place of second number) = 81 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 810000\n\nNow, add all these results together:\nThe sum of 2 + 30 + 900 + 120 + 1800 + 54000 + 1800 + 27000 + 810000 = 895652."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 813 * 228?"}, {"role": "assistant", "content": "Here are the steps for multiplying 813 * 228 using the long multiplication method.\nStep 1: Break first number 813 into its individual digits: 8 (hundreds place), 1 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 228 into its individual digits: 2 (hundreds place), 2 (tens place), and 8 (ones place).\n- 3 (from 1 place of first number) * 8 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 3 (from 1 place of first number) * 2 (from 10 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 60\n- 3 (from 1 place of first number) * 2 (from 100 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 600\n- 1 (from 10 place of first number) * 8 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 1 (from 10 place of first number) * 2 (from 10 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 200\n- 1 (from 10 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 8 (from 100 place of first number) * 8 (from 1 place of second number) = 64 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 6400\n- 8 (from 100 place of first number) * 2 (from 10 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 16000\n- 8 (from 100 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 24 + 60 + 600 + 80 + 200 + 2000 + 6400 + 16000 + 160000 = 185364."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 722 * 347?"}, {"role": "assistant", "content": "Here are the steps for multiplying 722 * 347 using the long multiplication method.\nStep 1: Break first number 722 into its individual digits: 7 (hundreds place), 2 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 347 into its individual digits: 3 (hundreds place), 4 (tens place), and 7 (ones place).\n- 2 (from 1 place of first number) * 7 (from 1 place of second number) = 14 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 14\n- 2 (from 1 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 80\n- 2 (from 1 place of first number) * 3 (from 100 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 600\n- 2 (from 10 place of first number) * 7 (from 1 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 140\n- 2 (from 10 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 2 (from 10 place of first number) * 3 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 7 (from 100 place of first number) * 7 (from 1 place of second number) = 49 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4900\n- 7 (from 100 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 28000\n- 7 (from 100 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 210000\n\nNow, add all these results together:\nThe sum of 14 + 80 + 600 + 140 + 800 + 6000 + 4900 + 28000 + 210000 = 250534."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 224 * 368?"}, {"role": "assistant", "content": "Here are the steps for multiplying 224 * 368 using the long multiplication method.\nStep 1: Break first number 224 into its individual digits: 2 (hundreds place), 2 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 368 into its individual digits: 3 (hundreds place), 6 (tens place), and 8 (ones place).\n- 4 (from 1 place of first number) * 8 (from 1 place of second number) = 32 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 32\n- 4 (from 1 place of first number) * 6 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 4 (from 1 place of first number) * 3 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 2 (from 10 place of first number) * 8 (from 1 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 160\n- 2 (from 10 place of first number) * 6 (from 10 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1200\n- 2 (from 10 place of first number) * 3 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 2 (from 100 place of first number) * 8 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 2 (from 100 place of first number) * 6 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 2 (from 100 place of first number) * 3 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 32 + 240 + 1200 + 160 + 1200 + 6000 + 1600 + 12000 + 60000 = 82432."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 945 * 493?"}, {"role": "assistant", "content": "Here are the steps for multiplying 945 * 493 using the long multiplication method.\nStep 1: Break first number 945 into its individual digits: 9 (hundreds place), 4 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 493 into its individual digits: 4 (hundreds place), 9 (tens place), and 3 (ones place).\n- 5 (from 1 place of first number) * 3 (from 1 place of second number) = 15 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 15\n- 5 (from 1 place of first number) * 9 (from 10 place of second number) = 45 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 450\n- 5 (from 1 place of first number) * 4 (from 100 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 4 (from 10 place of first number) * 3 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 4 (from 10 place of first number) * 9 (from 10 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3600\n- 4 (from 10 place of first number) * 4 (from 100 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 16000\n- 9 (from 100 place of first number) * 3 (from 1 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2700\n- 9 (from 100 place of first number) * 9 (from 10 place of second number) = 81 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 81000\n- 9 (from 100 place of first number) * 4 (from 100 place of second number) = 36 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 360000\n\nNow, add all these results together:\nThe sum of 15 + 450 + 2000 + 120 + 3600 + 16000 + 2700 + 81000 + 360000 = 465885."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 737 * 369?"}, {"role": "assistant", "content": "Here are the steps for multiplying 737 * 369 using the long multiplication method.\nStep 1: Break first number 737 into its individual digits: 7 (hundreds place), 3 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 369 into its individual digits: 3 (hundreds place), 6 (tens place), and 9 (ones place).\n- 7 (from 1 place of first number) * 9 (from 1 place of second number) = 63 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 63\n- 7 (from 1 place of first number) * 6 (from 10 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 420\n- 7 (from 1 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2100\n- 3 (from 10 place of first number) * 9 (from 1 place of second number) = 27 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 270\n- 3 (from 10 place of first number) * 6 (from 10 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1800\n- 3 (from 10 place of first number) * 3 (from 100 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 9000\n- 7 (from 100 place of first number) * 9 (from 1 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 6300\n- 7 (from 100 place of first number) * 6 (from 10 place of second number) = 42 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 42000\n- 7 (from 100 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 210000\n\nNow, add all these results together:\nThe sum of 63 + 420 + 2100 + 270 + 1800 + 9000 + 6300 + 42000 + 210000 = 271953."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 839 * 548?"}, {"role": "assistant", "content": "Here are the steps for multiplying 839 * 548 using the long multiplication method.\nStep 1: Break first number 839 into its individual digits: 8 (hundreds place), 3 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 548 into its individual digits: 5 (hundreds place), 4 (tens place), and 8 (ones place).\n- 9 (from 1 place of first number) * 8 (from 1 place of second number) = 72 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 72\n- 9 (from 1 place of first number) * 4 (from 10 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 360\n- 9 (from 1 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4500\n- 3 (from 10 place of first number) * 8 (from 1 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 240\n- 3 (from 10 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1200\n- 3 (from 10 place of first number) * 5 (from 100 place of second number) = 15 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 15000\n- 8 (from 100 place of first number) * 8 (from 1 place of second number) = 64 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 6400\n- 8 (from 100 place of first number) * 4 (from 10 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 32000\n- 8 (from 100 place of first number) * 5 (from 100 place of second number) = 40 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 400000\n\nNow, add all these results together:\nThe sum of 72 + 360 + 4500 + 240 + 1200 + 15000 + 6400 + 32000 + 400000 = 459772."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 457 * 893?"}, {"role": "assistant", "content": "Here are the steps for multiplying 457 * 893 using the long multiplication method.\nStep 1: Break first number 457 into its individual digits: 4 (hundreds place), 5 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 893 into its individual digits: 8 (hundreds place), 9 (tens place), and 3 (ones place).\n- 7 (from 1 place of first number) * 3 (from 1 place of second number) = 21 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 21\n- 7 (from 1 place of first number) * 9 (from 10 place of second number) = 63 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 630\n- 7 (from 1 place of first number) * 8 (from 100 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5600\n- 5 (from 10 place of first number) * 3 (from 1 place of second number) = 15 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 150\n- 5 (from 10 place of first number) * 9 (from 10 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4500\n- 5 (from 10 place of first number) * 8 (from 100 place of second number) = 40 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n- 4 (from 100 place of first number) * 3 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 4 (from 100 place of first number) * 9 (from 10 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 36000\n- 4 (from 100 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 320000\n\nNow, add all these results together:\nThe sum of 21 + 630 + 5600 + 150 + 4500 + 40000 + 1200 + 36000 + 320000 = 408101."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 457 * 659?"}, {"role": "assistant", "content": "Here are the steps for multiplying 457 * 659 using the long multiplication method.\nStep 1: Break first number 457 into its individual digits: 4 (hundreds place), 5 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 659 into its individual digits: 6 (hundreds place), 5 (tens place), and 9 (ones place).\n- 7 (from 1 place of first number) * 9 (from 1 place of second number) = 63 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 63\n- 7 (from 1 place of first number) * 5 (from 10 place of second number) = 35 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 350\n- 7 (from 1 place of first number) * 6 (from 100 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4200\n- 5 (from 10 place of first number) * 9 (from 1 place of second number) = 45 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 450\n- 5 (from 10 place of first number) * 5 (from 10 place of second number) = 25 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2500\n- 5 (from 10 place of first number) * 6 (from 100 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n- 4 (from 100 place of first number) * 9 (from 1 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3600\n- 4 (from 100 place of first number) * 5 (from 10 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 20000\n- 4 (from 100 place of first number) * 6 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 63 + 350 + 4200 + 450 + 2500 + 30000 + 3600 + 20000 + 240000 = 301163."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 728 * 481?"}, {"role": "assistant", "content": "Here are the steps for multiplying 728 * 481 using the long multiplication method.\nStep 1: Break first number 728 into its individual digits: 7 (hundreds place), 2 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 481 into its individual digits: 4 (hundreds place), 8 (tens place), and 1 (ones place).\n- 8 (from 1 place of first number) * 1 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 8 (from 1 place of first number) * 8 (from 10 place of second number) = 64 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 640\n- 8 (from 1 place of first number) * 4 (from 100 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3200\n- 2 (from 10 place of first number) * 1 (from 1 place of second number) = 2 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 2 (from 10 place of first number) * 8 (from 10 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1600\n- 2 (from 10 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 7 (from 100 place of first number) * 1 (from 1 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 700\n- 7 (from 100 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 56000\n- 7 (from 100 place of first number) * 4 (from 100 place of second number) = 28 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 280000\n\nNow, add all these results together:\nThe sum of 8 + 640 + 3200 + 20 + 1600 + 8000 + 700 + 56000 + 280000 = 350168."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 254 * 929?"}, {"role": "assistant", "content": "Here are the steps for multiplying 254 * 929 using the long multiplication method.\nStep 1: Break first number 254 into its individual digits: 2 (hundreds place), 5 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 929 into its individual digits: 9 (hundreds place), 2 (tens place), and 9 (ones place).\n- 4 (from 1 place of first number) * 9 (from 1 place of second number) = 36 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 36\n- 4 (from 1 place of first number) * 2 (from 10 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 80\n- 4 (from 1 place of first number) * 9 (from 100 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3600\n- 5 (from 10 place of first number) * 9 (from 1 place of second number) = 45 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 450\n- 5 (from 10 place of first number) * 2 (from 10 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1000\n- 5 (from 10 place of first number) * 9 (from 100 place of second number) = 45 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 45000\n- 2 (from 100 place of first number) * 9 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 2 (from 100 place of first number) * 2 (from 10 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 2 (from 100 place of first number) * 9 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 36 + 80 + 3600 + 450 + 1000 + 45000 + 1800 + 4000 + 180000 = 235966."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 734 * 944?"}, {"role": "assistant", "content": "Here are the steps for multiplying 734 * 944 using the long multiplication method.\nStep 1: Break first number 734 into its individual digits: 7 (hundreds place), 3 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 944 into its individual digits: 9 (hundreds place), 4 (tens place), and 4 (ones place).\n- 4 (from 1 place of first number) * 4 (from 1 place of second number) = 16 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 16\n- 4 (from 1 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 160\n- 4 (from 1 place of first number) * 9 (from 100 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3600\n- 3 (from 10 place of first number) * 4 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 3 (from 10 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1200\n- 3 (from 10 place of first number) * 9 (from 100 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 27000\n- 7 (from 100 place of first number) * 4 (from 1 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2800\n- 7 (from 100 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 28000\n- 7 (from 100 place of first number) * 9 (from 100 place of second number) = 63 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 630000\n\nNow, add all these results together:\nThe sum of 16 + 160 + 3600 + 120 + 1200 + 27000 + 2800 + 28000 + 630000 = 692896."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 149 * 228?"}, {"role": "assistant", "content": "Here are the steps for multiplying 149 * 228 using the long multiplication method.\nStep 1: Break first number 149 into its individual digits: 1 (hundreds place), 4 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 228 into its individual digits: 2 (hundreds place), 2 (tens place), and 8 (ones place).\n- 9 (from 1 place of first number) * 8 (from 1 place of second number) = 72 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 72\n- 9 (from 1 place of first number) * 2 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 9 (from 1 place of first number) * 2 (from 100 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1800\n- 4 (from 10 place of first number) * 8 (from 1 place of second number) = 32 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 320\n- 4 (from 10 place of first number) * 2 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 4 (from 10 place of first number) * 2 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 1 (from 100 place of first number) * 8 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 1 (from 100 place of first number) * 2 (from 10 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 1 (from 100 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n\nNow, add all these results together:\nThe sum of 72 + 180 + 1800 + 320 + 800 + 8000 + 800 + 2000 + 20000 = 33972."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 875 * 407?"}, {"role": "assistant", "content": "Here are the steps for multiplying 875 * 407 using the long multiplication method.\nStep 1: Break first number 875 into its individual digits: 8 (hundreds place), 7 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 407 into its individual digits: 4 (hundreds place), 0 (tens place), and 7 (ones place).\n- 5 (from 1 place of first number) * 7 (from 1 place of second number) = 35 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 35\n- 5 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 5 (from 1 place of first number) * 4 (from 100 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 7 (from 10 place of first number) * 7 (from 1 place of second number) = 49 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 490\n- 7 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 7 (from 10 place of first number) * 4 (from 100 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 28000\n- 8 (from 100 place of first number) * 7 (from 1 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 5600\n- 8 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 8 (from 100 place of first number) * 4 (from 100 place of second number) = 32 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 320000\n\nNow, add all these results together:\nThe sum of 35 + 0 + 2000 + 490 + 0 + 28000 + 5600 + 0 + 320000 = 356125."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 542 * 712?"}, {"role": "assistant", "content": "Here are the steps for multiplying 542 * 712 using the long multiplication method.\nStep 1: Break first number 542 into its individual digits: 5 (hundreds place), 4 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 712 into its individual digits: 7 (hundreds place), 1 (tens place), and 2 (ones place).\n- 2 (from 1 place of first number) * 2 (from 1 place of second number) = 4 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 4\n- 2 (from 1 place of first number) * 1 (from 10 place of second number) = 2 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 20\n- 2 (from 1 place of first number) * 7 (from 100 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1400\n- 4 (from 10 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 4 (from 10 place of first number) * 1 (from 10 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 4 (from 10 place of first number) * 7 (from 100 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 28000\n- 5 (from 100 place of first number) * 2 (from 1 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1000\n- 5 (from 100 place of first number) * 1 (from 10 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 5000\n- 5 (from 100 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 350000\n\nNow, add all these results together:\nThe sum of 4 + 20 + 1400 + 80 + 400 + 28000 + 1000 + 5000 + 350000 = 385904."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 946 * 843?"}, {"role": "assistant", "content": "Here are the steps for multiplying 946 * 843 using the long multiplication method.\nStep 1: Break first number 946 into its individual digits: 9 (hundreds place), 4 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 843 into its individual digits: 8 (hundreds place), 4 (tens place), and 3 (ones place).\n- 6 (from 1 place of first number) * 3 (from 1 place of second number) = 18 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 18\n- 6 (from 1 place of first number) * 4 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 6 (from 1 place of first number) * 8 (from 100 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4800\n- 4 (from 10 place of first number) * 3 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 4 (from 10 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1600\n- 4 (from 10 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 32000\n- 9 (from 100 place of first number) * 3 (from 1 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2700\n- 9 (from 100 place of first number) * 4 (from 10 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 36000\n- 9 (from 100 place of first number) * 8 (from 100 place of second number) = 72 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 720000\n\nNow, add all these results together:\nThe sum of 18 + 240 + 4800 + 120 + 1600 + 32000 + 2700 + 36000 + 720000 = 797478."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 679 * 737?"}, {"role": "assistant", "content": "Here are the steps for multiplying 679 * 737 using the long multiplication method.\nStep 1: Break first number 679 into its individual digits: 6 (hundreds place), 7 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 737 into its individual digits: 7 (hundreds place), 3 (tens place), and 7 (ones place).\n- 9 (from 1 place of first number) * 7 (from 1 place of second number) = 63 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 63\n- 9 (from 1 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 270\n- 9 (from 1 place of first number) * 7 (from 100 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 6300\n- 7 (from 10 place of first number) * 7 (from 1 place of second number) = 49 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 490\n- 7 (from 10 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2100\n- 7 (from 10 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 49000\n- 6 (from 100 place of first number) * 7 (from 1 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4200\n- 6 (from 100 place of first number) * 3 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 6 (from 100 place of first number) * 7 (from 100 place of second number) = 42 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 420000\n\nNow, add all these results together:\nThe sum of 63 + 270 + 6300 + 490 + 2100 + 49000 + 4200 + 18000 + 420000 = 500423."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 147 * 575?"}, {"role": "assistant", "content": "Here are the steps for multiplying 147 * 575 using the long multiplication method.\nStep 1: Break first number 147 into its individual digits: 1 (hundreds place), 4 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 575 into its individual digits: 5 (hundreds place), 7 (tens place), and 5 (ones place).\n- 7 (from 1 place of first number) * 5 (from 1 place of second number) = 35 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 35\n- 7 (from 1 place of first number) * 7 (from 10 place of second number) = 49 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 490\n- 7 (from 1 place of first number) * 5 (from 100 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3500\n- 4 (from 10 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 200\n- 4 (from 10 place of first number) * 7 (from 10 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2800\n- 4 (from 10 place of first number) * 5 (from 100 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n- 1 (from 100 place of first number) * 5 (from 1 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 500\n- 1 (from 100 place of first number) * 7 (from 10 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 7000\n- 1 (from 100 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 50000\n\nNow, add all these results together:\nThe sum of 35 + 490 + 3500 + 200 + 2800 + 20000 + 500 + 7000 + 50000 = 84525."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 295 * 426?"}, {"role": "assistant", "content": "Here are the steps for multiplying 295 * 426 using the long multiplication method.\nStep 1: Break first number 295 into its individual digits: 2 (hundreds place), 9 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 426 into its individual digits: 4 (hundreds place), 2 (tens place), and 6 (ones place).\n- 5 (from 1 place of first number) * 6 (from 1 place of second number) = 30 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 5 (from 1 place of first number) * 2 (from 10 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 5 (from 1 place of first number) * 4 (from 100 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 9 (from 10 place of first number) * 6 (from 1 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 540\n- 9 (from 10 place of first number) * 2 (from 10 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1800\n- 9 (from 10 place of first number) * 4 (from 100 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 36000\n- 2 (from 100 place of first number) * 6 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 2 (from 100 place of first number) * 2 (from 10 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 2 (from 100 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 30 + 100 + 2000 + 540 + 1800 + 36000 + 1200 + 4000 + 80000 = 125670."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 187 * 139?"}, {"role": "assistant", "content": "Here are the steps for multiplying 187 * 139 using the long multiplication method.\nStep 1: Break first number 187 into its individual digits: 1 (hundreds place), 8 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 139 into its individual digits: 1 (hundreds place), 3 (tens place), and 9 (ones place).\n- 7 (from 1 place of first number) * 9 (from 1 place of second number) = 63 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 63\n- 7 (from 1 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 210\n- 7 (from 1 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 700\n- 8 (from 10 place of first number) * 9 (from 1 place of second number) = 72 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 720\n- 8 (from 10 place of first number) * 3 (from 10 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2400\n- 8 (from 10 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 1 (from 100 place of first number) * 9 (from 1 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 900\n- 1 (from 100 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 1 (from 100 place of first number) * 1 (from 100 place of second number) = 1 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 10000\n\nNow, add all these results together:\nThe sum of 63 + 210 + 700 + 720 + 2400 + 8000 + 900 + 3000 + 10000 = 25993."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 612 * 506?"}, {"role": "assistant", "content": "Here are the steps for multiplying 612 * 506 using the long multiplication method.\nStep 1: Break first number 612 into its individual digits: 6 (hundreds place), 1 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 506 into its individual digits: 5 (hundreds place), 0 (tens place), and 6 (ones place).\n- 2 (from 1 place of first number) * 6 (from 1 place of second number) = 12 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 12\n- 2 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 2 (from 1 place of first number) * 5 (from 100 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1000\n- 1 (from 10 place of first number) * 6 (from 1 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 60\n- 1 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 1 (from 10 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 5000\n- 6 (from 100 place of first number) * 6 (from 1 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3600\n- 6 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 6 (from 100 place of first number) * 5 (from 100 place of second number) = 30 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 300000\n\nNow, add all these results together:\nThe sum of 12 + 0 + 1000 + 60 + 0 + 5000 + 3600 + 0 + 300000 = 309672."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 314 * 735?"}, {"role": "assistant", "content": "Here are the steps for multiplying 314 * 735 using the long multiplication method.\nStep 1: Break first number 314 into its individual digits: 3 (hundreds place), 1 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 735 into its individual digits: 7 (hundreds place), 3 (tens place), and 5 (ones place).\n- 4 (from 1 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 4 (from 1 place of first number) * 3 (from 10 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 120\n- 4 (from 1 place of first number) * 7 (from 100 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2800\n- 1 (from 10 place of first number) * 5 (from 1 place of second number) = 5 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 50\n- 1 (from 10 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 300\n- 1 (from 10 place of first number) * 7 (from 100 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 7000\n- 3 (from 100 place of first number) * 5 (from 1 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1500\n- 3 (from 100 place of first number) * 3 (from 10 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 9000\n- 3 (from 100 place of first number) * 7 (from 100 place of second number) = 21 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 210000\n\nNow, add all these results together:\nThe sum of 20 + 120 + 2800 + 50 + 300 + 7000 + 1500 + 9000 + 210000 = 230790."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 858 * 721?"}, {"role": "assistant", "content": "Here are the steps for multiplying 858 * 721 using the long multiplication method.\nStep 1: Break first number 858 into its individual digits: 8 (hundreds place), 5 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 721 into its individual digits: 7 (hundreds place), 2 (tens place), and 1 (ones place).\n- 8 (from 1 place of first number) * 1 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 8 (from 1 place of first number) * 2 (from 10 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 160\n- 8 (from 1 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5600\n- 5 (from 10 place of first number) * 1 (from 1 place of second number) = 5 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 50\n- 5 (from 10 place of first number) * 2 (from 10 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1000\n- 5 (from 10 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 35000\n- 8 (from 100 place of first number) * 1 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 8 (from 100 place of first number) * 2 (from 10 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 16000\n- 8 (from 100 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 560000\n\nNow, add all these results together:\nThe sum of 8 + 160 + 5600 + 50 + 1000 + 35000 + 800 + 16000 + 560000 = 618618."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 439 * 878?"}, {"role": "assistant", "content": "Here are the steps for multiplying 439 * 878 using the long multiplication method.\nStep 1: Break first number 439 into its individual digits: 4 (hundreds place), 3 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 878 into its individual digits: 8 (hundreds place), 7 (tens place), and 8 (ones place).\n- 9 (from 1 place of first number) * 8 (from 1 place of second number) = 72 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 72\n- 9 (from 1 place of first number) * 7 (from 10 place of second number) = 63 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 630\n- 9 (from 1 place of first number) * 8 (from 100 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 7200\n- 3 (from 10 place of first number) * 8 (from 1 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 240\n- 3 (from 10 place of first number) * 7 (from 10 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2100\n- 3 (from 10 place of first number) * 8 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 4 (from 100 place of first number) * 8 (from 1 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3200\n- 4 (from 100 place of first number) * 7 (from 10 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 28000\n- 4 (from 100 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 320000\n\nNow, add all these results together:\nThe sum of 72 + 630 + 7200 + 240 + 2100 + 24000 + 3200 + 28000 + 320000 = 385442."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 378 * 444?"}, {"role": "assistant", "content": "Here are the steps for multiplying 378 * 444 using the long multiplication method.\nStep 1: Break first number 378 into its individual digits: 3 (hundreds place), 7 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 444 into its individual digits: 4 (hundreds place), 4 (tens place), and 4 (ones place).\n- 8 (from 1 place of first number) * 4 (from 1 place of second number) = 32 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 32\n- 8 (from 1 place of first number) * 4 (from 10 place of second number) = 32 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 320\n- 8 (from 1 place of first number) * 4 (from 100 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3200\n- 7 (from 10 place of first number) * 4 (from 1 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 280\n- 7 (from 10 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2800\n- 7 (from 10 place of first number) * 4 (from 100 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 28000\n- 3 (from 100 place of first number) * 4 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 3 (from 100 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 3 (from 100 place of first number) * 4 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 32 + 320 + 3200 + 280 + 2800 + 28000 + 1200 + 12000 + 120000 = 167832."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 190 * 963?"}, {"role": "assistant", "content": "Here are the steps for multiplying 190 * 963 using the long multiplication method.\nStep 1: Break first number 190 into its individual digits: 1 (hundreds place), 9 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 963 into its individual digits: 9 (hundreds place), 6 (tens place), and 3 (ones place).\n- 0 (from 1 place of first number) * 3 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 6 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 9 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 9 (from 10 place of first number) * 3 (from 1 place of second number) = 27 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 270\n- 9 (from 10 place of first number) * 6 (from 10 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5400\n- 9 (from 10 place of first number) * 9 (from 100 place of second number) = 81 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 81000\n- 1 (from 100 place of first number) * 3 (from 1 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 1 (from 100 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 1 (from 100 place of first number) * 9 (from 100 place of second number) = 9 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 90000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 270 + 5400 + 81000 + 300 + 6000 + 90000 = 182970."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 859 * 563?"}, {"role": "assistant", "content": "Here are the steps for multiplying 859 * 563 using the long multiplication method.\nStep 1: Break first number 859 into its individual digits: 8 (hundreds place), 5 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 563 into its individual digits: 5 (hundreds place), 6 (tens place), and 3 (ones place).\n- 9 (from 1 place of first number) * 3 (from 1 place of second number) = 27 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 27\n- 9 (from 1 place of first number) * 6 (from 10 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 540\n- 9 (from 1 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4500\n- 5 (from 10 place of first number) * 3 (from 1 place of second number) = 15 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 150\n- 5 (from 10 place of first number) * 6 (from 10 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 5 (from 10 place of first number) * 5 (from 100 place of second number) = 25 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 25000\n- 8 (from 100 place of first number) * 3 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 8 (from 100 place of first number) * 6 (from 10 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 48000\n- 8 (from 100 place of first number) * 5 (from 100 place of second number) = 40 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 400000\n\nNow, add all these results together:\nThe sum of 27 + 540 + 4500 + 150 + 3000 + 25000 + 2400 + 48000 + 400000 = 483617."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 481 * 435?"}, {"role": "assistant", "content": "Here are the steps for multiplying 481 * 435 using the long multiplication method.\nStep 1: Break first number 481 into its individual digits: 4 (hundreds place), 8 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 435 into its individual digits: 4 (hundreds place), 3 (tens place), and 5 (ones place).\n- 1 (from 1 place of first number) * 5 (from 1 place of second number) = 5 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 5\n- 1 (from 1 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 30\n- 1 (from 1 place of first number) * 4 (from 100 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 400\n- 8 (from 10 place of first number) * 5 (from 1 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 8 (from 10 place of first number) * 3 (from 10 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2400\n- 8 (from 10 place of first number) * 4 (from 100 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 32000\n- 4 (from 100 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2000\n- 4 (from 100 place of first number) * 3 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 4 (from 100 place of first number) * 4 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 5 + 30 + 400 + 400 + 2400 + 32000 + 2000 + 12000 + 160000 = 209235."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 173 * 167?"}, {"role": "assistant", "content": "Here are the steps for multiplying 173 * 167 using the long multiplication method.\nStep 1: Break first number 173 into its individual digits: 1 (hundreds place), 7 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 167 into its individual digits: 1 (hundreds place), 6 (tens place), and 7 (ones place).\n- 3 (from 1 place of first number) * 7 (from 1 place of second number) = 21 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 21\n- 3 (from 1 place of first number) * 6 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 3 (from 1 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 300\n- 7 (from 10 place of first number) * 7 (from 1 place of second number) = 49 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 490\n- 7 (from 10 place of first number) * 6 (from 10 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4200\n- 7 (from 10 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 7000\n- 1 (from 100 place of first number) * 7 (from 1 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 700\n- 1 (from 100 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 1 (from 100 place of first number) * 1 (from 100 place of second number) = 1 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 10000\n\nNow, add all these results together:\nThe sum of 21 + 180 + 300 + 490 + 4200 + 7000 + 700 + 6000 + 10000 = 28891."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 154 * 264?"}, {"role": "assistant", "content": "Here are the steps for multiplying 154 * 264 using the long multiplication method.\nStep 1: Break first number 154 into its individual digits: 1 (hundreds place), 5 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 264 into its individual digits: 2 (hundreds place), 6 (tens place), and 4 (ones place).\n- 4 (from 1 place of first number) * 4 (from 1 place of second number) = 16 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 16\n- 4 (from 1 place of first number) * 6 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 4 (from 1 place of first number) * 2 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 5 (from 10 place of first number) * 4 (from 1 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 200\n- 5 (from 10 place of first number) * 6 (from 10 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 5 (from 10 place of first number) * 2 (from 100 place of second number) = 10 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 10000\n- 1 (from 100 place of first number) * 4 (from 1 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 1 (from 100 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 1 (from 100 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n\nNow, add all these results together:\nThe sum of 16 + 240 + 800 + 200 + 3000 + 10000 + 400 + 6000 + 20000 = 40656."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 520 * 783?"}, {"role": "assistant", "content": "Here are the steps for multiplying 520 * 783 using the long multiplication method.\nStep 1: Break first number 520 into its individual digits: 5 (hundreds place), 2 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 783 into its individual digits: 7 (hundreds place), 8 (tens place), and 3 (ones place).\n- 0 (from 1 place of first number) * 3 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 8 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 7 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 2 (from 10 place of first number) * 3 (from 1 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 60\n- 2 (from 10 place of first number) * 8 (from 10 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1600\n- 2 (from 10 place of first number) * 7 (from 100 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 14000\n- 5 (from 100 place of first number) * 3 (from 1 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1500\n- 5 (from 100 place of first number) * 8 (from 10 place of second number) = 40 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 40000\n- 5 (from 100 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 350000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 60 + 1600 + 14000 + 1500 + 40000 + 350000 = 407160."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 607 * 468?"}, {"role": "assistant", "content": "Here are the steps for multiplying 607 * 468 using the long multiplication method.\nStep 1: Break first number 607 into its individual digits: 6 (hundreds place), 0 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 468 into its individual digits: 4 (hundreds place), 6 (tens place), and 8 (ones place).\n- 7 (from 1 place of first number) * 8 (from 1 place of second number) = 56 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 56\n- 7 (from 1 place of first number) * 6 (from 10 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 420\n- 7 (from 1 place of first number) * 4 (from 100 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2800\n- 0 (from 10 place of first number) * 8 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 6 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 4 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 6 (from 100 place of first number) * 8 (from 1 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4800\n- 6 (from 100 place of first number) * 6 (from 10 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 36000\n- 6 (from 100 place of first number) * 4 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 56 + 420 + 2800 + 0 + 0 + 0 + 4800 + 36000 + 240000 = 284076."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 634 * 898?"}, {"role": "assistant", "content": "Here are the steps for multiplying 634 * 898 using the long multiplication method.\nStep 1: Break first number 634 into its individual digits: 6 (hundreds place), 3 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 898 into its individual digits: 8 (hundreds place), 9 (tens place), and 8 (ones place).\n- 4 (from 1 place of first number) * 8 (from 1 place of second number) = 32 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 32\n- 4 (from 1 place of first number) * 9 (from 10 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 360\n- 4 (from 1 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3200\n- 3 (from 10 place of first number) * 8 (from 1 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 240\n- 3 (from 10 place of first number) * 9 (from 10 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2700\n- 3 (from 10 place of first number) * 8 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 6 (from 100 place of first number) * 8 (from 1 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4800\n- 6 (from 100 place of first number) * 9 (from 10 place of second number) = 54 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 54000\n- 6 (from 100 place of first number) * 8 (from 100 place of second number) = 48 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 480000\n\nNow, add all these results together:\nThe sum of 32 + 360 + 3200 + 240 + 2700 + 24000 + 4800 + 54000 + 480000 = 569332."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 772 * 691?"}, {"role": "assistant", "content": "Here are the steps for multiplying 772 * 691 using the long multiplication method.\nStep 1: Break first number 772 into its individual digits: 7 (hundreds place), 7 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 691 into its individual digits: 6 (hundreds place), 9 (tens place), and 1 (ones place).\n- 2 (from 1 place of first number) * 1 (from 1 place of second number) = 2 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 2\n- 2 (from 1 place of first number) * 9 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 2 (from 1 place of first number) * 6 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 7 (from 10 place of first number) * 1 (from 1 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 70\n- 7 (from 10 place of first number) * 9 (from 10 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 6300\n- 7 (from 10 place of first number) * 6 (from 100 place of second number) = 42 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 42000\n- 7 (from 100 place of first number) * 1 (from 1 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 700\n- 7 (from 100 place of first number) * 9 (from 10 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 63000\n- 7 (from 100 place of first number) * 6 (from 100 place of second number) = 42 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 420000\n\nNow, add all these results together:\nThe sum of 2 + 180 + 1200 + 70 + 6300 + 42000 + 700 + 63000 + 420000 = 533452."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 456 * 191?"}, {"role": "assistant", "content": "Here are the steps for multiplying 456 * 191 using the long multiplication method.\nStep 1: Break first number 456 into its individual digits: 4 (hundreds place), 5 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 191 into its individual digits: 1 (hundreds place), 9 (tens place), and 1 (ones place).\n- 6 (from 1 place of first number) * 1 (from 1 place of second number) = 6 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 6\n- 6 (from 1 place of first number) * 9 (from 10 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 540\n- 6 (from 1 place of first number) * 1 (from 100 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 600\n- 5 (from 10 place of first number) * 1 (from 1 place of second number) = 5 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 50\n- 5 (from 10 place of first number) * 9 (from 10 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4500\n- 5 (from 10 place of first number) * 1 (from 100 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 5000\n- 4 (from 100 place of first number) * 1 (from 1 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 4 (from 100 place of first number) * 9 (from 10 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 36000\n- 4 (from 100 place of first number) * 1 (from 100 place of second number) = 4 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n\nNow, add all these results together:\nThe sum of 6 + 540 + 600 + 50 + 4500 + 5000 + 400 + 36000 + 40000 = 87096."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 811 * 262?"}, {"role": "assistant", "content": "Here are the steps for multiplying 811 * 262 using the long multiplication method.\nStep 1: Break first number 811 into its individual digits: 8 (hundreds place), 1 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 262 into its individual digits: 2 (hundreds place), 6 (tens place), and 2 (ones place).\n- 1 (from 1 place of first number) * 2 (from 1 place of second number) = 2 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 2\n- 1 (from 1 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 60\n- 1 (from 1 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 200\n- 1 (from 10 place of first number) * 2 (from 1 place of second number) = 2 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 1 (from 10 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 1 (from 10 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 8 (from 100 place of first number) * 2 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 8 (from 100 place of first number) * 6 (from 10 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 48000\n- 8 (from 100 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 2 + 60 + 200 + 20 + 600 + 2000 + 1600 + 48000 + 160000 = 212482."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 696 * 730?"}, {"role": "assistant", "content": "Here are the steps for multiplying 696 * 730 using the long multiplication method.\nStep 1: Break first number 696 into its individual digits: 6 (hundreds place), 9 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 730 into its individual digits: 7 (hundreds place), 3 (tens place), and 0 (ones place).\n- 6 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 6 (from 1 place of first number) * 3 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 6 (from 1 place of first number) * 7 (from 100 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4200\n- 9 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 9 (from 10 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2700\n- 9 (from 10 place of first number) * 7 (from 100 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 63000\n- 6 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 6 (from 100 place of first number) * 3 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 6 (from 100 place of first number) * 7 (from 100 place of second number) = 42 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 420000\n\nNow, add all these results together:\nThe sum of 0 + 180 + 4200 + 0 + 2700 + 63000 + 0 + 18000 + 420000 = 508080."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 685 * 442?"}, {"role": "assistant", "content": "Here are the steps for multiplying 685 * 442 using the long multiplication method.\nStep 1: Break first number 685 into its individual digits: 6 (hundreds place), 8 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 442 into its individual digits: 4 (hundreds place), 4 (tens place), and 2 (ones place).\n- 5 (from 1 place of first number) * 2 (from 1 place of second number) = 10 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 10\n- 5 (from 1 place of first number) * 4 (from 10 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 200\n- 5 (from 1 place of first number) * 4 (from 100 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 8 (from 10 place of first number) * 2 (from 1 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 160\n- 8 (from 10 place of first number) * 4 (from 10 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3200\n- 8 (from 10 place of first number) * 4 (from 100 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 32000\n- 6 (from 100 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 6 (from 100 place of first number) * 4 (from 10 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 24000\n- 6 (from 100 place of first number) * 4 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 10 + 200 + 2000 + 160 + 3200 + 32000 + 1200 + 24000 + 240000 = 302770."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 705 * 825?"}, {"role": "assistant", "content": "Here are the steps for multiplying 705 * 825 using the long multiplication method.\nStep 1: Break first number 705 into its individual digits: 7 (hundreds place), 0 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 825 into its individual digits: 8 (hundreds place), 2 (tens place), and 5 (ones place).\n- 5 (from 1 place of first number) * 5 (from 1 place of second number) = 25 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 25\n- 5 (from 1 place of first number) * 2 (from 10 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 5 (from 1 place of first number) * 8 (from 100 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 0 (from 10 place of first number) * 5 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 2 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 8 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 7 (from 100 place of first number) * 5 (from 1 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3500\n- 7 (from 100 place of first number) * 2 (from 10 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 14000\n- 7 (from 100 place of first number) * 8 (from 100 place of second number) = 56 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 560000\n\nNow, add all these results together:\nThe sum of 25 + 100 + 4000 + 0 + 0 + 0 + 3500 + 14000 + 560000 = 581625."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 450 * 243?"}, {"role": "assistant", "content": "Here are the steps for multiplying 450 * 243 using the long multiplication method.\nStep 1: Break first number 450 into its individual digits: 4 (hundreds place), 5 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 243 into its individual digits: 2 (hundreds place), 4 (tens place), and 3 (ones place).\n- 0 (from 1 place of first number) * 3 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 4 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 2 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 5 (from 10 place of first number) * 3 (from 1 place of second number) = 15 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 150\n- 5 (from 10 place of first number) * 4 (from 10 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 5 (from 10 place of first number) * 2 (from 100 place of second number) = 10 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 10000\n- 4 (from 100 place of first number) * 3 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 4 (from 100 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 16000\n- 4 (from 100 place of first number) * 2 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 150 + 2000 + 10000 + 1200 + 16000 + 80000 = 109350."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 932 * 408?"}, {"role": "assistant", "content": "Here are the steps for multiplying 932 * 408 using the long multiplication method.\nStep 1: Break first number 932 into its individual digits: 9 (hundreds place), 3 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 408 into its individual digits: 4 (hundreds place), 0 (tens place), and 8 (ones place).\n- 2 (from 1 place of first number) * 8 (from 1 place of second number) = 16 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 16\n- 2 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 2 (from 1 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 3 (from 10 place of first number) * 8 (from 1 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 240\n- 3 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 3 (from 10 place of first number) * 4 (from 100 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 12000\n- 9 (from 100 place of first number) * 8 (from 1 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 7200\n- 9 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 9 (from 100 place of first number) * 4 (from 100 place of second number) = 36 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 360000\n\nNow, add all these results together:\nThe sum of 16 + 0 + 800 + 240 + 0 + 12000 + 7200 + 0 + 360000 = 380256."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 570 * 573?"}, {"role": "assistant", "content": "Here are the steps for multiplying 570 * 573 using the long multiplication method.\nStep 1: Break first number 570 into its individual digits: 5 (hundreds place), 7 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 573 into its individual digits: 5 (hundreds place), 7 (tens place), and 3 (ones place).\n- 0 (from 1 place of first number) * 3 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 7 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 5 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 7 (from 10 place of first number) * 3 (from 1 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 210\n- 7 (from 10 place of first number) * 7 (from 10 place of second number) = 49 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4900\n- 7 (from 10 place of first number) * 5 (from 100 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 35000\n- 5 (from 100 place of first number) * 3 (from 1 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1500\n- 5 (from 100 place of first number) * 7 (from 10 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 35000\n- 5 (from 100 place of first number) * 5 (from 100 place of second number) = 25 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 250000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 210 + 4900 + 35000 + 1500 + 35000 + 250000 = 326610."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 687 * 516?"}, {"role": "assistant", "content": "Here are the steps for multiplying 687 * 516 using the long multiplication method.\nStep 1: Break first number 687 into its individual digits: 6 (hundreds place), 8 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 516 into its individual digits: 5 (hundreds place), 1 (tens place), and 6 (ones place).\n- 7 (from 1 place of first number) * 6 (from 1 place of second number) = 42 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 42\n- 7 (from 1 place of first number) * 1 (from 10 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 70\n- 7 (from 1 place of first number) * 5 (from 100 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3500\n- 8 (from 10 place of first number) * 6 (from 1 place of second number) = 48 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 480\n- 8 (from 10 place of first number) * 1 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 8 (from 10 place of first number) * 5 (from 100 place of second number) = 40 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n- 6 (from 100 place of first number) * 6 (from 1 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3600\n- 6 (from 100 place of first number) * 1 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 6 (from 100 place of first number) * 5 (from 100 place of second number) = 30 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 300000\n\nNow, add all these results together:\nThe sum of 42 + 70 + 3500 + 480 + 800 + 40000 + 3600 + 6000 + 300000 = 354492."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 784 * 636?"}, {"role": "assistant", "content": "Here are the steps for multiplying 784 * 636 using the long multiplication method.\nStep 1: Break first number 784 into its individual digits: 7 (hundreds place), 8 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 636 into its individual digits: 6 (hundreds place), 3 (tens place), and 6 (ones place).\n- 4 (from 1 place of first number) * 6 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 4 (from 1 place of first number) * 3 (from 10 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 120\n- 4 (from 1 place of first number) * 6 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 8 (from 10 place of first number) * 6 (from 1 place of second number) = 48 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 480\n- 8 (from 10 place of first number) * 3 (from 10 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2400\n- 8 (from 10 place of first number) * 6 (from 100 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 48000\n- 7 (from 100 place of first number) * 6 (from 1 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4200\n- 7 (from 100 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 21000\n- 7 (from 100 place of first number) * 6 (from 100 place of second number) = 42 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 420000\n\nNow, add all these results together:\nThe sum of 24 + 120 + 2400 + 480 + 2400 + 48000 + 4200 + 21000 + 420000 = 498624."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 773 * 185?"}, {"role": "assistant", "content": "Here are the steps for multiplying 773 * 185 using the long multiplication method.\nStep 1: Break first number 773 into its individual digits: 7 (hundreds place), 7 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 185 into its individual digits: 1 (hundreds place), 8 (tens place), and 5 (ones place).\n- 3 (from 1 place of first number) * 5 (from 1 place of second number) = 15 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 15\n- 3 (from 1 place of first number) * 8 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 3 (from 1 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 300\n- 7 (from 10 place of first number) * 5 (from 1 place of second number) = 35 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 350\n- 7 (from 10 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5600\n- 7 (from 10 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 7000\n- 7 (from 100 place of first number) * 5 (from 1 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3500\n- 7 (from 100 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 56000\n- 7 (from 100 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 70000\n\nNow, add all these results together:\nThe sum of 15 + 240 + 300 + 350 + 5600 + 7000 + 3500 + 56000 + 70000 = 143005."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 820 * 396?"}, {"role": "assistant", "content": "Here are the steps for multiplying 820 * 396 using the long multiplication method.\nStep 1: Break first number 820 into its individual digits: 8 (hundreds place), 2 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 396 into its individual digits: 3 (hundreds place), 9 (tens place), and 6 (ones place).\n- 0 (from 1 place of first number) * 6 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 9 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 3 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 2 (from 10 place of first number) * 6 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 2 (from 10 place of first number) * 9 (from 10 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1800\n- 2 (from 10 place of first number) * 3 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 8 (from 100 place of first number) * 6 (from 1 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4800\n- 8 (from 100 place of first number) * 9 (from 10 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 72000\n- 8 (from 100 place of first number) * 3 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 120 + 1800 + 6000 + 4800 + 72000 + 240000 = 324720."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 227 * 242?"}, {"role": "assistant", "content": "Here are the steps for multiplying 227 * 242 using the long multiplication method.\nStep 1: Break first number 227 into its individual digits: 2 (hundreds place), 2 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 242 into its individual digits: 2 (hundreds place), 4 (tens place), and 2 (ones place).\n- 7 (from 1 place of first number) * 2 (from 1 place of second number) = 14 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 14\n- 7 (from 1 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 280\n- 7 (from 1 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1400\n- 2 (from 10 place of first number) * 2 (from 1 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 2 (from 10 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 2 (from 10 place of first number) * 2 (from 100 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 2 (from 100 place of first number) * 2 (from 1 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 2 (from 100 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 2 (from 100 place of first number) * 2 (from 100 place of second number) = 4 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n\nNow, add all these results together:\nThe sum of 14 + 280 + 1400 + 40 + 800 + 4000 + 400 + 8000 + 40000 = 54934."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 937 * 140?"}, {"role": "assistant", "content": "Here are the steps for multiplying 937 * 140 using the long multiplication method.\nStep 1: Break first number 937 into its individual digits: 9 (hundreds place), 3 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 140 into its individual digits: 1 (hundreds place), 4 (tens place), and 0 (ones place).\n- 7 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 1 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 280\n- 7 (from 1 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 700\n- 3 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 3 (from 10 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1200\n- 3 (from 10 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 9 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 9 (from 100 place of first number) * 4 (from 10 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 36000\n- 9 (from 100 place of first number) * 1 (from 100 place of second number) = 9 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 90000\n\nNow, add all these results together:\nThe sum of 0 + 280 + 700 + 0 + 1200 + 3000 + 0 + 36000 + 90000 = 131180."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 526 * 998?"}, {"role": "assistant", "content": "Here are the steps for multiplying 526 * 998 using the long multiplication method.\nStep 1: Break first number 526 into its individual digits: 5 (hundreds place), 2 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 998 into its individual digits: 9 (hundreds place), 9 (tens place), and 8 (ones place).\n- 6 (from 1 place of first number) * 8 (from 1 place of second number) = 48 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 48\n- 6 (from 1 place of first number) * 9 (from 10 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 540\n- 6 (from 1 place of first number) * 9 (from 100 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5400\n- 2 (from 10 place of first number) * 8 (from 1 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 160\n- 2 (from 10 place of first number) * 9 (from 10 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1800\n- 2 (from 10 place of first number) * 9 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 5 (from 100 place of first number) * 8 (from 1 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4000\n- 5 (from 100 place of first number) * 9 (from 10 place of second number) = 45 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 45000\n- 5 (from 100 place of first number) * 9 (from 100 place of second number) = 45 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 450000\n\nNow, add all these results together:\nThe sum of 48 + 540 + 5400 + 160 + 1800 + 18000 + 4000 + 45000 + 450000 = 524948."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 237 * 580?"}, {"role": "assistant", "content": "Here are the steps for multiplying 237 * 580 using the long multiplication method.\nStep 1: Break first number 237 into its individual digits: 2 (hundreds place), 3 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 580 into its individual digits: 5 (hundreds place), 8 (tens place), and 0 (ones place).\n- 7 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 1 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 560\n- 7 (from 1 place of first number) * 5 (from 100 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3500\n- 3 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 3 (from 10 place of first number) * 8 (from 10 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2400\n- 3 (from 10 place of first number) * 5 (from 100 place of second number) = 15 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 15000\n- 2 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 2 (from 100 place of first number) * 8 (from 10 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 16000\n- 2 (from 100 place of first number) * 5 (from 100 place of second number) = 10 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 100000\n\nNow, add all these results together:\nThe sum of 0 + 560 + 3500 + 0 + 2400 + 15000 + 0 + 16000 + 100000 = 137460."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 691 * 218?"}, {"role": "assistant", "content": "Here are the steps for multiplying 691 * 218 using the long multiplication method.\nStep 1: Break first number 691 into its individual digits: 6 (hundreds place), 9 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 218 into its individual digits: 2 (hundreds place), 1 (tens place), and 8 (ones place).\n- 1 (from 1 place of first number) * 8 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 1 (from 1 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 10\n- 1 (from 1 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 200\n- 9 (from 10 place of first number) * 8 (from 1 place of second number) = 72 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 720\n- 9 (from 10 place of first number) * 1 (from 10 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 900\n- 9 (from 10 place of first number) * 2 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 6 (from 100 place of first number) * 8 (from 1 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4800\n- 6 (from 100 place of first number) * 1 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 6 (from 100 place of first number) * 2 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 8 + 10 + 200 + 720 + 900 + 18000 + 4800 + 6000 + 120000 = 150638."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 649 * 216?"}, {"role": "assistant", "content": "Here are the steps for multiplying 649 * 216 using the long multiplication method.\nStep 1: Break first number 649 into its individual digits: 6 (hundreds place), 4 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 216 into its individual digits: 2 (hundreds place), 1 (tens place), and 6 (ones place).\n- 9 (from 1 place of first number) * 6 (from 1 place of second number) = 54 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 54\n- 9 (from 1 place of first number) * 1 (from 10 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 90\n- 9 (from 1 place of first number) * 2 (from 100 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1800\n- 4 (from 10 place of first number) * 6 (from 1 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 240\n- 4 (from 10 place of first number) * 1 (from 10 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 4 (from 10 place of first number) * 2 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 6 (from 100 place of first number) * 6 (from 1 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3600\n- 6 (from 100 place of first number) * 1 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 6 (from 100 place of first number) * 2 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 54 + 90 + 1800 + 240 + 400 + 8000 + 3600 + 6000 + 120000 = 140184."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 405 * 935?"}, {"role": "assistant", "content": "Here are the steps for multiplying 405 * 935 using the long multiplication method.\nStep 1: Break first number 405 into its individual digits: 4 (hundreds place), 0 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 935 into its individual digits: 9 (hundreds place), 3 (tens place), and 5 (ones place).\n- 5 (from 1 place of first number) * 5 (from 1 place of second number) = 25 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 25\n- 5 (from 1 place of first number) * 3 (from 10 place of second number) = 15 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 150\n- 5 (from 1 place of first number) * 9 (from 100 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4500\n- 0 (from 10 place of first number) * 5 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 3 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 9 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 4 (from 100 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2000\n- 4 (from 100 place of first number) * 3 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 4 (from 100 place of first number) * 9 (from 100 place of second number) = 36 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 360000\n\nNow, add all these results together:\nThe sum of 25 + 150 + 4500 + 0 + 0 + 0 + 2000 + 12000 + 360000 = 378675."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 370 * 578?"}, {"role": "assistant", "content": "Here are the steps for multiplying 370 * 578 using the long multiplication method.\nStep 1: Break first number 370 into its individual digits: 3 (hundreds place), 7 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 578 into its individual digits: 5 (hundreds place), 7 (tens place), and 8 (ones place).\n- 0 (from 1 place of first number) * 8 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 7 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 5 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 7 (from 10 place of first number) * 8 (from 1 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 560\n- 7 (from 10 place of first number) * 7 (from 10 place of second number) = 49 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4900\n- 7 (from 10 place of first number) * 5 (from 100 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 35000\n- 3 (from 100 place of first number) * 8 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 3 (from 100 place of first number) * 7 (from 10 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 21000\n- 3 (from 100 place of first number) * 5 (from 100 place of second number) = 15 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 150000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 560 + 4900 + 35000 + 2400 + 21000 + 150000 = 213860."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 417 * 889?"}, {"role": "assistant", "content": "Here are the steps for multiplying 417 * 889 using the long multiplication method.\nStep 1: Break first number 417 into its individual digits: 4 (hundreds place), 1 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 889 into its individual digits: 8 (hundreds place), 8 (tens place), and 9 (ones place).\n- 7 (from 1 place of first number) * 9 (from 1 place of second number) = 63 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 63\n- 7 (from 1 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 560\n- 7 (from 1 place of first number) * 8 (from 100 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5600\n- 1 (from 10 place of first number) * 9 (from 1 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 90\n- 1 (from 10 place of first number) * 8 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 1 (from 10 place of first number) * 8 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 4 (from 100 place of first number) * 9 (from 1 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3600\n- 4 (from 100 place of first number) * 8 (from 10 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 32000\n- 4 (from 100 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 320000\n\nNow, add all these results together:\nThe sum of 63 + 560 + 5600 + 90 + 800 + 8000 + 3600 + 32000 + 320000 = 370713."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 975 * 372?"}, {"role": "assistant", "content": "Here are the steps for multiplying 975 * 372 using the long multiplication method.\nStep 1: Break first number 975 into its individual digits: 9 (hundreds place), 7 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 372 into its individual digits: 3 (hundreds place), 7 (tens place), and 2 (ones place).\n- 5 (from 1 place of first number) * 2 (from 1 place of second number) = 10 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 10\n- 5 (from 1 place of first number) * 7 (from 10 place of second number) = 35 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 350\n- 5 (from 1 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1500\n- 7 (from 10 place of first number) * 2 (from 1 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 140\n- 7 (from 10 place of first number) * 7 (from 10 place of second number) = 49 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4900\n- 7 (from 10 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 21000\n- 9 (from 100 place of first number) * 2 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 9 (from 100 place of first number) * 7 (from 10 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 63000\n- 9 (from 100 place of first number) * 3 (from 100 place of second number) = 27 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 270000\n\nNow, add all these results together:\nThe sum of 10 + 350 + 1500 + 140 + 4900 + 21000 + 1800 + 63000 + 270000 = 362700."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 153 * 858?"}, {"role": "assistant", "content": "Here are the steps for multiplying 153 * 858 using the long multiplication method.\nStep 1: Break first number 153 into its individual digits: 1 (hundreds place), 5 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 858 into its individual digits: 8 (hundreds place), 5 (tens place), and 8 (ones place).\n- 3 (from 1 place of first number) * 8 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 3 (from 1 place of first number) * 5 (from 10 place of second number) = 15 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 150\n- 3 (from 1 place of first number) * 8 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 5 (from 10 place of first number) * 8 (from 1 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 5 (from 10 place of first number) * 5 (from 10 place of second number) = 25 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2500\n- 5 (from 10 place of first number) * 8 (from 100 place of second number) = 40 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n- 1 (from 100 place of first number) * 8 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 1 (from 100 place of first number) * 5 (from 10 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 5000\n- 1 (from 100 place of first number) * 8 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 24 + 150 + 2400 + 400 + 2500 + 40000 + 800 + 5000 + 80000 = 131274."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 713 * 788?"}, {"role": "assistant", "content": "Here are the steps for multiplying 713 * 788 using the long multiplication method.\nStep 1: Break first number 713 into its individual digits: 7 (hundreds place), 1 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 788 into its individual digits: 7 (hundreds place), 8 (tens place), and 8 (ones place).\n- 3 (from 1 place of first number) * 8 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 3 (from 1 place of first number) * 8 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 3 (from 1 place of first number) * 7 (from 100 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2100\n- 1 (from 10 place of first number) * 8 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 1 (from 10 place of first number) * 8 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 1 (from 10 place of first number) * 7 (from 100 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 7000\n- 7 (from 100 place of first number) * 8 (from 1 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 5600\n- 7 (from 100 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 56000\n- 7 (from 100 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 490000\n\nNow, add all these results together:\nThe sum of 24 + 240 + 2100 + 80 + 800 + 7000 + 5600 + 56000 + 490000 = 561844."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 385 * 265?"}, {"role": "assistant", "content": "Here are the steps for multiplying 385 * 265 using the long multiplication method.\nStep 1: Break first number 385 into its individual digits: 3 (hundreds place), 8 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 265 into its individual digits: 2 (hundreds place), 6 (tens place), and 5 (ones place).\n- 5 (from 1 place of first number) * 5 (from 1 place of second number) = 25 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 25\n- 5 (from 1 place of first number) * 6 (from 10 place of second number) = 30 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 300\n- 5 (from 1 place of first number) * 2 (from 100 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1000\n- 8 (from 10 place of first number) * 5 (from 1 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 8 (from 10 place of first number) * 6 (from 10 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4800\n- 8 (from 10 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 16000\n- 3 (from 100 place of first number) * 5 (from 1 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1500\n- 3 (from 100 place of first number) * 6 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 3 (from 100 place of first number) * 2 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 25 + 300 + 1000 + 400 + 4800 + 16000 + 1500 + 18000 + 60000 = 102025."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 307 * 162?"}, {"role": "assistant", "content": "Here are the steps for multiplying 307 * 162 using the long multiplication method.\nStep 1: Break first number 307 into its individual digits: 3 (hundreds place), 0 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 162 into its individual digits: 1 (hundreds place), 6 (tens place), and 2 (ones place).\n- 7 (from 1 place of first number) * 2 (from 1 place of second number) = 14 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 14\n- 7 (from 1 place of first number) * 6 (from 10 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 420\n- 7 (from 1 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 700\n- 0 (from 10 place of first number) * 2 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 6 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 1 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 3 (from 100 place of first number) * 2 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 3 (from 100 place of first number) * 6 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 3 (from 100 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n\nNow, add all these results together:\nThe sum of 14 + 420 + 700 + 0 + 0 + 0 + 600 + 18000 + 30000 = 49734."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 158 * 376?"}, {"role": "assistant", "content": "Here are the steps for multiplying 158 * 376 using the long multiplication method.\nStep 1: Break first number 158 into its individual digits: 1 (hundreds place), 5 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 376 into its individual digits: 3 (hundreds place), 7 (tens place), and 6 (ones place).\n- 8 (from 1 place of first number) * 6 (from 1 place of second number) = 48 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 48\n- 8 (from 1 place of first number) * 7 (from 10 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 560\n- 8 (from 1 place of first number) * 3 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 5 (from 10 place of first number) * 6 (from 1 place of second number) = 30 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 5 (from 10 place of first number) * 7 (from 10 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3500\n- 5 (from 10 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 15000\n- 1 (from 100 place of first number) * 6 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 1 (from 100 place of first number) * 7 (from 10 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 7000\n- 1 (from 100 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n\nNow, add all these results together:\nThe sum of 48 + 560 + 2400 + 300 + 3500 + 15000 + 600 + 7000 + 30000 = 59408."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 448 * 914?"}, {"role": "assistant", "content": "Here are the steps for multiplying 448 * 914 using the long multiplication method.\nStep 1: Break first number 448 into its individual digits: 4 (hundreds place), 4 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 914 into its individual digits: 9 (hundreds place), 1 (tens place), and 4 (ones place).\n- 8 (from 1 place of first number) * 4 (from 1 place of second number) = 32 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 32\n- 8 (from 1 place of first number) * 1 (from 10 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 80\n- 8 (from 1 place of first number) * 9 (from 100 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 7200\n- 4 (from 10 place of first number) * 4 (from 1 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 160\n- 4 (from 10 place of first number) * 1 (from 10 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 4 (from 10 place of first number) * 9 (from 100 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 36000\n- 4 (from 100 place of first number) * 4 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 4 (from 100 place of first number) * 1 (from 10 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 4 (from 100 place of first number) * 9 (from 100 place of second number) = 36 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 360000\n\nNow, add all these results together:\nThe sum of 32 + 80 + 7200 + 160 + 400 + 36000 + 1600 + 4000 + 360000 = 409472."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 797 * 226?"}, {"role": "assistant", "content": "Here are the steps for multiplying 797 * 226 using the long multiplication method.\nStep 1: Break first number 797 into its individual digits: 7 (hundreds place), 9 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 226 into its individual digits: 2 (hundreds place), 2 (tens place), and 6 (ones place).\n- 7 (from 1 place of first number) * 6 (from 1 place of second number) = 42 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 42\n- 7 (from 1 place of first number) * 2 (from 10 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 140\n- 7 (from 1 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1400\n- 9 (from 10 place of first number) * 6 (from 1 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 540\n- 9 (from 10 place of first number) * 2 (from 10 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1800\n- 9 (from 10 place of first number) * 2 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 7 (from 100 place of first number) * 6 (from 1 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4200\n- 7 (from 100 place of first number) * 2 (from 10 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 14000\n- 7 (from 100 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 140000\n\nNow, add all these results together:\nThe sum of 42 + 140 + 1400 + 540 + 1800 + 18000 + 4200 + 14000 + 140000 = 180122."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 730 * 248?"}, {"role": "assistant", "content": "Here are the steps for multiplying 730 * 248 using the long multiplication method.\nStep 1: Break first number 730 into its individual digits: 7 (hundreds place), 3 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 248 into its individual digits: 2 (hundreds place), 4 (tens place), and 8 (ones place).\n- 0 (from 1 place of first number) * 8 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 4 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 2 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 3 (from 10 place of first number) * 8 (from 1 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 240\n- 3 (from 10 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1200\n- 3 (from 10 place of first number) * 2 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 7 (from 100 place of first number) * 8 (from 1 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 5600\n- 7 (from 100 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 28000\n- 7 (from 100 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 140000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 240 + 1200 + 6000 + 5600 + 28000 + 140000 = 181040."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 885 * 192?"}, {"role": "assistant", "content": "Here are the steps for multiplying 885 * 192 using the long multiplication method.\nStep 1: Break first number 885 into its individual digits: 8 (hundreds place), 8 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 192 into its individual digits: 1 (hundreds place), 9 (tens place), and 2 (ones place).\n- 5 (from 1 place of first number) * 2 (from 1 place of second number) = 10 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 10\n- 5 (from 1 place of first number) * 9 (from 10 place of second number) = 45 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 450\n- 5 (from 1 place of first number) * 1 (from 100 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 500\n- 8 (from 10 place of first number) * 2 (from 1 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 160\n- 8 (from 10 place of first number) * 9 (from 10 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 7200\n- 8 (from 10 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 8 (from 100 place of first number) * 2 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 8 (from 100 place of first number) * 9 (from 10 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 72000\n- 8 (from 100 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 10 + 450 + 500 + 160 + 7200 + 8000 + 1600 + 72000 + 80000 = 169920."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 903 * 420?"}, {"role": "assistant", "content": "Here are the steps for multiplying 903 * 420 using the long multiplication method.\nStep 1: Break first number 903 into its individual digits: 9 (hundreds place), 0 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 420 into its individual digits: 4 (hundreds place), 2 (tens place), and 0 (ones place).\n- 3 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 3 (from 1 place of first number) * 2 (from 10 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 60\n- 3 (from 1 place of first number) * 4 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 0 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 2 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 4 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 9 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 9 (from 100 place of first number) * 2 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 9 (from 100 place of first number) * 4 (from 100 place of second number) = 36 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 360000\n\nNow, add all these results together:\nThe sum of 0 + 60 + 1200 + 0 + 0 + 0 + 0 + 18000 + 360000 = 379260."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 924 * 528?"}, {"role": "assistant", "content": "Here are the steps for multiplying 924 * 528 using the long multiplication method.\nStep 1: Break first number 924 into its individual digits: 9 (hundreds place), 2 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 528 into its individual digits: 5 (hundreds place), 2 (tens place), and 8 (ones place).\n- 4 (from 1 place of first number) * 8 (from 1 place of second number) = 32 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 32\n- 4 (from 1 place of first number) * 2 (from 10 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 80\n- 4 (from 1 place of first number) * 5 (from 100 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 2 (from 10 place of first number) * 8 (from 1 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 160\n- 2 (from 10 place of first number) * 2 (from 10 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 2 (from 10 place of first number) * 5 (from 100 place of second number) = 10 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 10000\n- 9 (from 100 place of first number) * 8 (from 1 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 7200\n- 9 (from 100 place of first number) * 2 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 9 (from 100 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 450000\n\nNow, add all these results together:\nThe sum of 32 + 80 + 2000 + 160 + 400 + 10000 + 7200 + 18000 + 450000 = 487872."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 879 * 576?"}, {"role": "assistant", "content": "Here are the steps for multiplying 879 * 576 using the long multiplication method.\nStep 1: Break first number 879 into its individual digits: 8 (hundreds place), 7 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 576 into its individual digits: 5 (hundreds place), 7 (tens place), and 6 (ones place).\n- 9 (from 1 place of first number) * 6 (from 1 place of second number) = 54 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 54\n- 9 (from 1 place of first number) * 7 (from 10 place of second number) = 63 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 630\n- 9 (from 1 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4500\n- 7 (from 10 place of first number) * 6 (from 1 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 420\n- 7 (from 10 place of first number) * 7 (from 10 place of second number) = 49 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4900\n- 7 (from 10 place of first number) * 5 (from 100 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 35000\n- 8 (from 100 place of first number) * 6 (from 1 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4800\n- 8 (from 100 place of first number) * 7 (from 10 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 56000\n- 8 (from 100 place of first number) * 5 (from 100 place of second number) = 40 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 400000\n\nNow, add all these results together:\nThe sum of 54 + 630 + 4500 + 420 + 4900 + 35000 + 4800 + 56000 + 400000 = 506304."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 157 * 706?"}, {"role": "assistant", "content": "Here are the steps for multiplying 157 * 706 using the long multiplication method.\nStep 1: Break first number 157 into its individual digits: 1 (hundreds place), 5 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 706 into its individual digits: 7 (hundreds place), 0 (tens place), and 6 (ones place).\n- 7 (from 1 place of first number) * 6 (from 1 place of second number) = 42 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 42\n- 7 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 7 (from 1 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4900\n- 5 (from 10 place of first number) * 6 (from 1 place of second number) = 30 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 5 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 5 (from 10 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 35000\n- 1 (from 100 place of first number) * 6 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 1 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 1 (from 100 place of first number) * 7 (from 100 place of second number) = 7 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 70000\n\nNow, add all these results together:\nThe sum of 42 + 0 + 4900 + 300 + 0 + 35000 + 600 + 0 + 70000 = 110842."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 772 * 857?"}, {"role": "assistant", "content": "Here are the steps for multiplying 772 * 857 using the long multiplication method.\nStep 1: Break first number 772 into its individual digits: 7 (hundreds place), 7 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 857 into its individual digits: 8 (hundreds place), 5 (tens place), and 7 (ones place).\n- 2 (from 1 place of first number) * 7 (from 1 place of second number) = 14 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 14\n- 2 (from 1 place of first number) * 5 (from 10 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 2 (from 1 place of first number) * 8 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 7 (from 10 place of first number) * 7 (from 1 place of second number) = 49 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 490\n- 7 (from 10 place of first number) * 5 (from 10 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3500\n- 7 (from 10 place of first number) * 8 (from 100 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 56000\n- 7 (from 100 place of first number) * 7 (from 1 place of second number) = 49 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4900\n- 7 (from 100 place of first number) * 5 (from 10 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 35000\n- 7 (from 100 place of first number) * 8 (from 100 place of second number) = 56 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 560000\n\nNow, add all these results together:\nThe sum of 14 + 100 + 1600 + 490 + 3500 + 56000 + 4900 + 35000 + 560000 = 661604."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 815 * 415?"}, {"role": "assistant", "content": "Here are the steps for multiplying 815 * 415 using the long multiplication method.\nStep 1: Break first number 815 into its individual digits: 8 (hundreds place), 1 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 415 into its individual digits: 4 (hundreds place), 1 (tens place), and 5 (ones place).\n- 5 (from 1 place of first number) * 5 (from 1 place of second number) = 25 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 25\n- 5 (from 1 place of first number) * 1 (from 10 place of second number) = 5 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 50\n- 5 (from 1 place of first number) * 4 (from 100 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 1 (from 10 place of first number) * 5 (from 1 place of second number) = 5 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 50\n- 1 (from 10 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 1 (from 10 place of first number) * 4 (from 100 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 8 (from 100 place of first number) * 5 (from 1 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4000\n- 8 (from 100 place of first number) * 1 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 8 (from 100 place of first number) * 4 (from 100 place of second number) = 32 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 320000\n\nNow, add all these results together:\nThe sum of 25 + 50 + 2000 + 50 + 100 + 4000 + 4000 + 8000 + 320000 = 338225."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 394 * 931?"}, {"role": "assistant", "content": "Here are the steps for multiplying 394 * 931 using the long multiplication method.\nStep 1: Break first number 394 into its individual digits: 3 (hundreds place), 9 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 931 into its individual digits: 9 (hundreds place), 3 (tens place), and 1 (ones place).\n- 4 (from 1 place of first number) * 1 (from 1 place of second number) = 4 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 4\n- 4 (from 1 place of first number) * 3 (from 10 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 120\n- 4 (from 1 place of first number) * 9 (from 100 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3600\n- 9 (from 10 place of first number) * 1 (from 1 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 90\n- 9 (from 10 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2700\n- 9 (from 10 place of first number) * 9 (from 100 place of second number) = 81 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 81000\n- 3 (from 100 place of first number) * 1 (from 1 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 3 (from 100 place of first number) * 3 (from 10 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 9000\n- 3 (from 100 place of first number) * 9 (from 100 place of second number) = 27 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 270000\n\nNow, add all these results together:\nThe sum of 4 + 120 + 3600 + 90 + 2700 + 81000 + 300 + 9000 + 270000 = 366814."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 264 * 608?"}, {"role": "assistant", "content": "Here are the steps for multiplying 264 * 608 using the long multiplication method.\nStep 1: Break first number 264 into its individual digits: 2 (hundreds place), 6 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 608 into its individual digits: 6 (hundreds place), 0 (tens place), and 8 (ones place).\n- 4 (from 1 place of first number) * 8 (from 1 place of second number) = 32 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 32\n- 4 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 4 (from 1 place of first number) * 6 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 6 (from 10 place of first number) * 8 (from 1 place of second number) = 48 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 480\n- 6 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 6 (from 10 place of first number) * 6 (from 100 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 36000\n- 2 (from 100 place of first number) * 8 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 2 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 2 (from 100 place of first number) * 6 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 32 + 0 + 2400 + 480 + 0 + 36000 + 1600 + 0 + 120000 = 160512."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 157 * 165?"}, {"role": "assistant", "content": "Here are the steps for multiplying 157 * 165 using the long multiplication method.\nStep 1: Break first number 157 into its individual digits: 1 (hundreds place), 5 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 165 into its individual digits: 1 (hundreds place), 6 (tens place), and 5 (ones place).\n- 7 (from 1 place of first number) * 5 (from 1 place of second number) = 35 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 35\n- 7 (from 1 place of first number) * 6 (from 10 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 420\n- 7 (from 1 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 700\n- 5 (from 10 place of first number) * 5 (from 1 place of second number) = 25 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 250\n- 5 (from 10 place of first number) * 6 (from 10 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 5 (from 10 place of first number) * 1 (from 100 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 5000\n- 1 (from 100 place of first number) * 5 (from 1 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 500\n- 1 (from 100 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 1 (from 100 place of first number) * 1 (from 100 place of second number) = 1 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 10000\n\nNow, add all these results together:\nThe sum of 35 + 420 + 700 + 250 + 3000 + 5000 + 500 + 6000 + 10000 = 25905."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 439 * 178?"}, {"role": "assistant", "content": "Here are the steps for multiplying 439 * 178 using the long multiplication method.\nStep 1: Break first number 439 into its individual digits: 4 (hundreds place), 3 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 178 into its individual digits: 1 (hundreds place), 7 (tens place), and 8 (ones place).\n- 9 (from 1 place of first number) * 8 (from 1 place of second number) = 72 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 72\n- 9 (from 1 place of first number) * 7 (from 10 place of second number) = 63 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 630\n- 9 (from 1 place of first number) * 1 (from 100 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 900\n- 3 (from 10 place of first number) * 8 (from 1 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 240\n- 3 (from 10 place of first number) * 7 (from 10 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2100\n- 3 (from 10 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 4 (from 100 place of first number) * 8 (from 1 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3200\n- 4 (from 100 place of first number) * 7 (from 10 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 28000\n- 4 (from 100 place of first number) * 1 (from 100 place of second number) = 4 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n\nNow, add all these results together:\nThe sum of 72 + 630 + 900 + 240 + 2100 + 3000 + 3200 + 28000 + 40000 = 78142."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 938 * 633?"}, {"role": "assistant", "content": "Here are the steps for multiplying 938 * 633 using the long multiplication method.\nStep 1: Break first number 938 into its individual digits: 9 (hundreds place), 3 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 633 into its individual digits: 6 (hundreds place), 3 (tens place), and 3 (ones place).\n- 8 (from 1 place of first number) * 3 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 8 (from 1 place of first number) * 3 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 8 (from 1 place of first number) * 6 (from 100 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4800\n- 3 (from 10 place of first number) * 3 (from 1 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 90\n- 3 (from 10 place of first number) * 3 (from 10 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 900\n- 3 (from 10 place of first number) * 6 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 9 (from 100 place of first number) * 3 (from 1 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2700\n- 9 (from 100 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 27000\n- 9 (from 100 place of first number) * 6 (from 100 place of second number) = 54 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 540000\n\nNow, add all these results together:\nThe sum of 24 + 240 + 4800 + 90 + 900 + 18000 + 2700 + 27000 + 540000 = 593754."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 439 * 714?"}, {"role": "assistant", "content": "Here are the steps for multiplying 439 * 714 using the long multiplication method.\nStep 1: Break first number 439 into its individual digits: 4 (hundreds place), 3 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 714 into its individual digits: 7 (hundreds place), 1 (tens place), and 4 (ones place).\n- 9 (from 1 place of first number) * 4 (from 1 place of second number) = 36 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 36\n- 9 (from 1 place of first number) * 1 (from 10 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 90\n- 9 (from 1 place of first number) * 7 (from 100 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 6300\n- 3 (from 10 place of first number) * 4 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 3 (from 10 place of first number) * 1 (from 10 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 300\n- 3 (from 10 place of first number) * 7 (from 100 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 21000\n- 4 (from 100 place of first number) * 4 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 4 (from 100 place of first number) * 1 (from 10 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 4 (from 100 place of first number) * 7 (from 100 place of second number) = 28 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 280000\n\nNow, add all these results together:\nThe sum of 36 + 90 + 6300 + 120 + 300 + 21000 + 1600 + 4000 + 280000 = 313446."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 123 * 514?"}, {"role": "assistant", "content": "Here are the steps for multiplying 123 * 514 using the long multiplication method.\nStep 1: Break first number 123 into its individual digits: 1 (hundreds place), 2 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 514 into its individual digits: 5 (hundreds place), 1 (tens place), and 4 (ones place).\n- 3 (from 1 place of first number) * 4 (from 1 place of second number) = 12 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 12\n- 3 (from 1 place of first number) * 1 (from 10 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 30\n- 3 (from 1 place of first number) * 5 (from 100 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1500\n- 2 (from 10 place of first number) * 4 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 2 (from 10 place of first number) * 1 (from 10 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 200\n- 2 (from 10 place of first number) * 5 (from 100 place of second number) = 10 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 10000\n- 1 (from 100 place of first number) * 4 (from 1 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 1 (from 100 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 1000\n- 1 (from 100 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 50000\n\nNow, add all these results together:\nThe sum of 12 + 30 + 1500 + 80 + 200 + 10000 + 400 + 1000 + 50000 = 63222."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 397 * 334?"}, {"role": "assistant", "content": "Here are the steps for multiplying 397 * 334 using the long multiplication method.\nStep 1: Break first number 397 into its individual digits: 3 (hundreds place), 9 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 334 into its individual digits: 3 (hundreds place), 3 (tens place), and 4 (ones place).\n- 7 (from 1 place of first number) * 4 (from 1 place of second number) = 28 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 28\n- 7 (from 1 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 210\n- 7 (from 1 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2100\n- 9 (from 10 place of first number) * 4 (from 1 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 360\n- 9 (from 10 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2700\n- 9 (from 10 place of first number) * 3 (from 100 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 27000\n- 3 (from 100 place of first number) * 4 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 3 (from 100 place of first number) * 3 (from 10 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 9000\n- 3 (from 100 place of first number) * 3 (from 100 place of second number) = 9 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 90000\n\nNow, add all these results together:\nThe sum of 28 + 210 + 2100 + 360 + 2700 + 27000 + 1200 + 9000 + 90000 = 132598."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 283 * 795?"}, {"role": "assistant", "content": "Here are the steps for multiplying 283 * 795 using the long multiplication method.\nStep 1: Break first number 283 into its individual digits: 2 (hundreds place), 8 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 795 into its individual digits: 7 (hundreds place), 9 (tens place), and 5 (ones place).\n- 3 (from 1 place of first number) * 5 (from 1 place of second number) = 15 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 15\n- 3 (from 1 place of first number) * 9 (from 10 place of second number) = 27 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 270\n- 3 (from 1 place of first number) * 7 (from 100 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2100\n- 8 (from 10 place of first number) * 5 (from 1 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 8 (from 10 place of first number) * 9 (from 10 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 7200\n- 8 (from 10 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 56000\n- 2 (from 100 place of first number) * 5 (from 1 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1000\n- 2 (from 100 place of first number) * 9 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 2 (from 100 place of first number) * 7 (from 100 place of second number) = 14 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 140000\n\nNow, add all these results together:\nThe sum of 15 + 270 + 2100 + 400 + 7200 + 56000 + 1000 + 18000 + 140000 = 224985."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 833 * 956?"}, {"role": "assistant", "content": "Here are the steps for multiplying 833 * 956 using the long multiplication method.\nStep 1: Break first number 833 into its individual digits: 8 (hundreds place), 3 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 956 into its individual digits: 9 (hundreds place), 5 (tens place), and 6 (ones place).\n- 3 (from 1 place of first number) * 6 (from 1 place of second number) = 18 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 18\n- 3 (from 1 place of first number) * 5 (from 10 place of second number) = 15 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 150\n- 3 (from 1 place of first number) * 9 (from 100 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2700\n- 3 (from 10 place of first number) * 6 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 3 (from 10 place of first number) * 5 (from 10 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1500\n- 3 (from 10 place of first number) * 9 (from 100 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 27000\n- 8 (from 100 place of first number) * 6 (from 1 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4800\n- 8 (from 100 place of first number) * 5 (from 10 place of second number) = 40 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 40000\n- 8 (from 100 place of first number) * 9 (from 100 place of second number) = 72 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 720000\n\nNow, add all these results together:\nThe sum of 18 + 150 + 2700 + 180 + 1500 + 27000 + 4800 + 40000 + 720000 = 796348."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 552 * 444?"}, {"role": "assistant", "content": "Here are the steps for multiplying 552 * 444 using the long multiplication method.\nStep 1: Break first number 552 into its individual digits: 5 (hundreds place), 5 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 444 into its individual digits: 4 (hundreds place), 4 (tens place), and 4 (ones place).\n- 2 (from 1 place of first number) * 4 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 2 (from 1 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 80\n- 2 (from 1 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 5 (from 10 place of first number) * 4 (from 1 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 200\n- 5 (from 10 place of first number) * 4 (from 10 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 5 (from 10 place of first number) * 4 (from 100 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n- 5 (from 100 place of first number) * 4 (from 1 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2000\n- 5 (from 100 place of first number) * 4 (from 10 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 20000\n- 5 (from 100 place of first number) * 4 (from 100 place of second number) = 20 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 200000\n\nNow, add all these results together:\nThe sum of 8 + 80 + 800 + 200 + 2000 + 20000 + 2000 + 20000 + 200000 = 245088."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 609 * 230?"}, {"role": "assistant", "content": "Here are the steps for multiplying 609 * 230 using the long multiplication method.\nStep 1: Break first number 609 into its individual digits: 6 (hundreds place), 0 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 230 into its individual digits: 2 (hundreds place), 3 (tens place), and 0 (ones place).\n- 9 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 9 (from 1 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 270\n- 9 (from 1 place of first number) * 2 (from 100 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1800\n- 0 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 3 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 2 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 6 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 6 (from 100 place of first number) * 3 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 6 (from 100 place of first number) * 2 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 0 + 270 + 1800 + 0 + 0 + 0 + 0 + 18000 + 120000 = 140070."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 908 * 948?"}, {"role": "assistant", "content": "Here are the steps for multiplying 908 * 948 using the long multiplication method.\nStep 1: Break first number 908 into its individual digits: 9 (hundreds place), 0 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 948 into its individual digits: 9 (hundreds place), 4 (tens place), and 8 (ones place).\n- 8 (from 1 place of first number) * 8 (from 1 place of second number) = 64 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 64\n- 8 (from 1 place of first number) * 4 (from 10 place of second number) = 32 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 320\n- 8 (from 1 place of first number) * 9 (from 100 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 7200\n- 0 (from 10 place of first number) * 8 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 4 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 9 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 9 (from 100 place of first number) * 8 (from 1 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 7200\n- 9 (from 100 place of first number) * 4 (from 10 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 36000\n- 9 (from 100 place of first number) * 9 (from 100 place of second number) = 81 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 810000\n\nNow, add all these results together:\nThe sum of 64 + 320 + 7200 + 0 + 0 + 0 + 7200 + 36000 + 810000 = 860784."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 644 * 994?"}, {"role": "assistant", "content": "Here are the steps for multiplying 644 * 994 using the long multiplication method.\nStep 1: Break first number 644 into its individual digits: 6 (hundreds place), 4 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 994 into its individual digits: 9 (hundreds place), 9 (tens place), and 4 (ones place).\n- 4 (from 1 place of first number) * 4 (from 1 place of second number) = 16 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 16\n- 4 (from 1 place of first number) * 9 (from 10 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 360\n- 4 (from 1 place of first number) * 9 (from 100 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3600\n- 4 (from 10 place of first number) * 4 (from 1 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 160\n- 4 (from 10 place of first number) * 9 (from 10 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3600\n- 4 (from 10 place of first number) * 9 (from 100 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 36000\n- 6 (from 100 place of first number) * 4 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 6 (from 100 place of first number) * 9 (from 10 place of second number) = 54 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 54000\n- 6 (from 100 place of first number) * 9 (from 100 place of second number) = 54 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 540000\n\nNow, add all these results together:\nThe sum of 16 + 360 + 3600 + 160 + 3600 + 36000 + 2400 + 54000 + 540000 = 640136."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 656 * 676?"}, {"role": "assistant", "content": "Here are the steps for multiplying 656 * 676 using the long multiplication method.\nStep 1: Break first number 656 into its individual digits: 6 (hundreds place), 5 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 676 into its individual digits: 6 (hundreds place), 7 (tens place), and 6 (ones place).\n- 6 (from 1 place of first number) * 6 (from 1 place of second number) = 36 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 36\n- 6 (from 1 place of first number) * 7 (from 10 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 420\n- 6 (from 1 place of first number) * 6 (from 100 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3600\n- 5 (from 10 place of first number) * 6 (from 1 place of second number) = 30 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 5 (from 10 place of first number) * 7 (from 10 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3500\n- 5 (from 10 place of first number) * 6 (from 100 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n- 6 (from 100 place of first number) * 6 (from 1 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3600\n- 6 (from 100 place of first number) * 7 (from 10 place of second number) = 42 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 42000\n- 6 (from 100 place of first number) * 6 (from 100 place of second number) = 36 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 360000\n\nNow, add all these results together:\nThe sum of 36 + 420 + 3600 + 300 + 3500 + 30000 + 3600 + 42000 + 360000 = 443456."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 355 * 549?"}, {"role": "assistant", "content": "Here are the steps for multiplying 355 * 549 using the long multiplication method.\nStep 1: Break first number 355 into its individual digits: 3 (hundreds place), 5 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 549 into its individual digits: 5 (hundreds place), 4 (tens place), and 9 (ones place).\n- 5 (from 1 place of first number) * 9 (from 1 place of second number) = 45 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 45\n- 5 (from 1 place of first number) * 4 (from 10 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 200\n- 5 (from 1 place of first number) * 5 (from 100 place of second number) = 25 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2500\n- 5 (from 10 place of first number) * 9 (from 1 place of second number) = 45 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 450\n- 5 (from 10 place of first number) * 4 (from 10 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 5 (from 10 place of first number) * 5 (from 100 place of second number) = 25 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 25000\n- 3 (from 100 place of first number) * 9 (from 1 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2700\n- 3 (from 100 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 3 (from 100 place of first number) * 5 (from 100 place of second number) = 15 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 150000\n\nNow, add all these results together:\nThe sum of 45 + 200 + 2500 + 450 + 2000 + 25000 + 2700 + 12000 + 150000 = 194895."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 763 * 720?"}, {"role": "assistant", "content": "Here are the steps for multiplying 763 * 720 using the long multiplication method.\nStep 1: Break first number 763 into its individual digits: 7 (hundreds place), 6 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 720 into its individual digits: 7 (hundreds place), 2 (tens place), and 0 (ones place).\n- 3 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 3 (from 1 place of first number) * 2 (from 10 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 60\n- 3 (from 1 place of first number) * 7 (from 100 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2100\n- 6 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 6 (from 10 place of first number) * 2 (from 10 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1200\n- 6 (from 10 place of first number) * 7 (from 100 place of second number) = 42 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 42000\n- 7 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 100 place of first number) * 2 (from 10 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 14000\n- 7 (from 100 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 490000\n\nNow, add all these results together:\nThe sum of 0 + 60 + 2100 + 0 + 1200 + 42000 + 0 + 14000 + 490000 = 549360."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 375 * 984?"}, {"role": "assistant", "content": "Here are the steps for multiplying 375 * 984 using the long multiplication method.\nStep 1: Break first number 375 into its individual digits: 3 (hundreds place), 7 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 984 into its individual digits: 9 (hundreds place), 8 (tens place), and 4 (ones place).\n- 5 (from 1 place of first number) * 4 (from 1 place of second number) = 20 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 5 (from 1 place of first number) * 8 (from 10 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 5 (from 1 place of first number) * 9 (from 100 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4500\n- 7 (from 10 place of first number) * 4 (from 1 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 280\n- 7 (from 10 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5600\n- 7 (from 10 place of first number) * 9 (from 100 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 63000\n- 3 (from 100 place of first number) * 4 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 3 (from 100 place of first number) * 8 (from 10 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 24000\n- 3 (from 100 place of first number) * 9 (from 100 place of second number) = 27 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 270000\n\nNow, add all these results together:\nThe sum of 20 + 400 + 4500 + 280 + 5600 + 63000 + 1200 + 24000 + 270000 = 369000."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 125 * 924?"}, {"role": "assistant", "content": "Here are the steps for multiplying 125 * 924 using the long multiplication method.\nStep 1: Break first number 125 into its individual digits: 1 (hundreds place), 2 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 924 into its individual digits: 9 (hundreds place), 2 (tens place), and 4 (ones place).\n- 5 (from 1 place of first number) * 4 (from 1 place of second number) = 20 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 5 (from 1 place of first number) * 2 (from 10 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 5 (from 1 place of first number) * 9 (from 100 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4500\n- 2 (from 10 place of first number) * 4 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 2 (from 10 place of first number) * 2 (from 10 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 2 (from 10 place of first number) * 9 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 1 (from 100 place of first number) * 4 (from 1 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 1 (from 100 place of first number) * 2 (from 10 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 1 (from 100 place of first number) * 9 (from 100 place of second number) = 9 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 90000\n\nNow, add all these results together:\nThe sum of 20 + 100 + 4500 + 80 + 400 + 18000 + 400 + 2000 + 90000 = 115500."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 838 * 693?"}, {"role": "assistant", "content": "Here are the steps for multiplying 838 * 693 using the long multiplication method.\nStep 1: Break first number 838 into its individual digits: 8 (hundreds place), 3 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 693 into its individual digits: 6 (hundreds place), 9 (tens place), and 3 (ones place).\n- 8 (from 1 place of first number) * 3 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 8 (from 1 place of first number) * 9 (from 10 place of second number) = 72 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 720\n- 8 (from 1 place of first number) * 6 (from 100 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4800\n- 3 (from 10 place of first number) * 3 (from 1 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 90\n- 3 (from 10 place of first number) * 9 (from 10 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2700\n- 3 (from 10 place of first number) * 6 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 8 (from 100 place of first number) * 3 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 8 (from 100 place of first number) * 9 (from 10 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 72000\n- 8 (from 100 place of first number) * 6 (from 100 place of second number) = 48 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 480000\n\nNow, add all these results together:\nThe sum of 24 + 720 + 4800 + 90 + 2700 + 18000 + 2400 + 72000 + 480000 = 580734."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 821 * 290?"}, {"role": "assistant", "content": "Here are the steps for multiplying 821 * 290 using the long multiplication method.\nStep 1: Break first number 821 into its individual digits: 8 (hundreds place), 2 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 290 into its individual digits: 2 (hundreds place), 9 (tens place), and 0 (ones place).\n- 1 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 1 (from 1 place of first number) * 9 (from 10 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 90\n- 1 (from 1 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 200\n- 2 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 2 (from 10 place of first number) * 9 (from 10 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1800\n- 2 (from 10 place of first number) * 2 (from 100 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 8 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 100 place of first number) * 9 (from 10 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 72000\n- 8 (from 100 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 0 + 90 + 200 + 0 + 1800 + 4000 + 0 + 72000 + 160000 = 238090."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 191 * 823?"}, {"role": "assistant", "content": "Here are the steps for multiplying 191 * 823 using the long multiplication method.\nStep 1: Break first number 191 into its individual digits: 1 (hundreds place), 9 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 823 into its individual digits: 8 (hundreds place), 2 (tens place), and 3 (ones place).\n- 1 (from 1 place of first number) * 3 (from 1 place of second number) = 3 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 3\n- 1 (from 1 place of first number) * 2 (from 10 place of second number) = 2 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 20\n- 1 (from 1 place of first number) * 8 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 9 (from 10 place of first number) * 3 (from 1 place of second number) = 27 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 270\n- 9 (from 10 place of first number) * 2 (from 10 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1800\n- 9 (from 10 place of first number) * 8 (from 100 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 72000\n- 1 (from 100 place of first number) * 3 (from 1 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 1 (from 100 place of first number) * 2 (from 10 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 1 (from 100 place of first number) * 8 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 3 + 20 + 800 + 270 + 1800 + 72000 + 300 + 2000 + 80000 = 157193."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 189 * 477?"}, {"role": "assistant", "content": "Here are the steps for multiplying 189 * 477 using the long multiplication method.\nStep 1: Break first number 189 into its individual digits: 1 (hundreds place), 8 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 477 into its individual digits: 4 (hundreds place), 7 (tens place), and 7 (ones place).\n- 9 (from 1 place of first number) * 7 (from 1 place of second number) = 63 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 63\n- 9 (from 1 place of first number) * 7 (from 10 place of second number) = 63 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 630\n- 9 (from 1 place of first number) * 4 (from 100 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3600\n- 8 (from 10 place of first number) * 7 (from 1 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 560\n- 8 (from 10 place of first number) * 7 (from 10 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5600\n- 8 (from 10 place of first number) * 4 (from 100 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 32000\n- 1 (from 100 place of first number) * 7 (from 1 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 700\n- 1 (from 100 place of first number) * 7 (from 10 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 7000\n- 1 (from 100 place of first number) * 4 (from 100 place of second number) = 4 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n\nNow, add all these results together:\nThe sum of 63 + 630 + 3600 + 560 + 5600 + 32000 + 700 + 7000 + 40000 = 90153."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 642 * 305?"}, {"role": "assistant", "content": "Here are the steps for multiplying 642 * 305 using the long multiplication method.\nStep 1: Break first number 642 into its individual digits: 6 (hundreds place), 4 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 305 into its individual digits: 3 (hundreds place), 0 (tens place), and 5 (ones place).\n- 2 (from 1 place of first number) * 5 (from 1 place of second number) = 10 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 10\n- 2 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 2 (from 1 place of first number) * 3 (from 100 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 600\n- 4 (from 10 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 200\n- 4 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 4 (from 10 place of first number) * 3 (from 100 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 12000\n- 6 (from 100 place of first number) * 5 (from 1 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3000\n- 6 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 6 (from 100 place of first number) * 3 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 10 + 0 + 600 + 200 + 0 + 12000 + 3000 + 0 + 180000 = 195810."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 524 * 845?"}, {"role": "assistant", "content": "Here are the steps for multiplying 524 * 845 using the long multiplication method.\nStep 1: Break first number 524 into its individual digits: 5 (hundreds place), 2 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 845 into its individual digits: 8 (hundreds place), 4 (tens place), and 5 (ones place).\n- 4 (from 1 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 4 (from 1 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 160\n- 4 (from 1 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3200\n- 2 (from 10 place of first number) * 5 (from 1 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 100\n- 2 (from 10 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 2 (from 10 place of first number) * 8 (from 100 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 16000\n- 5 (from 100 place of first number) * 5 (from 1 place of second number) = 25 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2500\n- 5 (from 100 place of first number) * 4 (from 10 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 20000\n- 5 (from 100 place of first number) * 8 (from 100 place of second number) = 40 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 400000\n\nNow, add all these results together:\nThe sum of 20 + 160 + 3200 + 100 + 800 + 16000 + 2500 + 20000 + 400000 = 442780."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 598 * 862?"}, {"role": "assistant", "content": "Here are the steps for multiplying 598 * 862 using the long multiplication method.\nStep 1: Break first number 598 into its individual digits: 5 (hundreds place), 9 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 862 into its individual digits: 8 (hundreds place), 6 (tens place), and 2 (ones place).\n- 8 (from 1 place of first number) * 2 (from 1 place of second number) = 16 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 16\n- 8 (from 1 place of first number) * 6 (from 10 place of second number) = 48 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 480\n- 8 (from 1 place of first number) * 8 (from 100 place of second number) = 64 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 6400\n- 9 (from 10 place of first number) * 2 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 9 (from 10 place of first number) * 6 (from 10 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5400\n- 9 (from 10 place of first number) * 8 (from 100 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 72000\n- 5 (from 100 place of first number) * 2 (from 1 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1000\n- 5 (from 100 place of first number) * 6 (from 10 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 30000\n- 5 (from 100 place of first number) * 8 (from 100 place of second number) = 40 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 400000\n\nNow, add all these results together:\nThe sum of 16 + 480 + 6400 + 180 + 5400 + 72000 + 1000 + 30000 + 400000 = 515476."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 276 * 216?"}, {"role": "assistant", "content": "Here are the steps for multiplying 276 * 216 using the long multiplication method.\nStep 1: Break first number 276 into its individual digits: 2 (hundreds place), 7 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 216 into its individual digits: 2 (hundreds place), 1 (tens place), and 6 (ones place).\n- 6 (from 1 place of first number) * 6 (from 1 place of second number) = 36 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 36\n- 6 (from 1 place of first number) * 1 (from 10 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 60\n- 6 (from 1 place of first number) * 2 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 7 (from 10 place of first number) * 6 (from 1 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 420\n- 7 (from 10 place of first number) * 1 (from 10 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 700\n- 7 (from 10 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 14000\n- 2 (from 100 place of first number) * 6 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 2 (from 100 place of first number) * 1 (from 10 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 2 (from 100 place of first number) * 2 (from 100 place of second number) = 4 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n\nNow, add all these results together:\nThe sum of 36 + 60 + 1200 + 420 + 700 + 14000 + 1200 + 2000 + 40000 = 59616."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 545 * 944?"}, {"role": "assistant", "content": "Here are the steps for multiplying 545 * 944 using the long multiplication method.\nStep 1: Break first number 545 into its individual digits: 5 (hundreds place), 4 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 944 into its individual digits: 9 (hundreds place), 4 (tens place), and 4 (ones place).\n- 5 (from 1 place of first number) * 4 (from 1 place of second number) = 20 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 5 (from 1 place of first number) * 4 (from 10 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 200\n- 5 (from 1 place of first number) * 9 (from 100 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4500\n- 4 (from 10 place of first number) * 4 (from 1 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 160\n- 4 (from 10 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1600\n- 4 (from 10 place of first number) * 9 (from 100 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 36000\n- 5 (from 100 place of first number) * 4 (from 1 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2000\n- 5 (from 100 place of first number) * 4 (from 10 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 20000\n- 5 (from 100 place of first number) * 9 (from 100 place of second number) = 45 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 450000\n\nNow, add all these results together:\nThe sum of 20 + 200 + 4500 + 160 + 1600 + 36000 + 2000 + 20000 + 450000 = 514480."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 488 * 357?"}, {"role": "assistant", "content": "Here are the steps for multiplying 488 * 357 using the long multiplication method.\nStep 1: Break first number 488 into its individual digits: 4 (hundreds place), 8 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 357 into its individual digits: 3 (hundreds place), 5 (tens place), and 7 (ones place).\n- 8 (from 1 place of first number) * 7 (from 1 place of second number) = 56 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 56\n- 8 (from 1 place of first number) * 5 (from 10 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 8 (from 1 place of first number) * 3 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 8 (from 10 place of first number) * 7 (from 1 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 560\n- 8 (from 10 place of first number) * 5 (from 10 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 8 (from 10 place of first number) * 3 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 4 (from 100 place of first number) * 7 (from 1 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2800\n- 4 (from 100 place of first number) * 5 (from 10 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 20000\n- 4 (from 100 place of first number) * 3 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 56 + 400 + 2400 + 560 + 4000 + 24000 + 2800 + 20000 + 120000 = 174216."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 762 * 177?"}, {"role": "assistant", "content": "Here are the steps for multiplying 762 * 177 using the long multiplication method.\nStep 1: Break first number 762 into its individual digits: 7 (hundreds place), 6 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 177 into its individual digits: 1 (hundreds place), 7 (tens place), and 7 (ones place).\n- 2 (from 1 place of first number) * 7 (from 1 place of second number) = 14 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 14\n- 2 (from 1 place of first number) * 7 (from 10 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 140\n- 2 (from 1 place of first number) * 1 (from 100 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 200\n- 6 (from 10 place of first number) * 7 (from 1 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 420\n- 6 (from 10 place of first number) * 7 (from 10 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4200\n- 6 (from 10 place of first number) * 1 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 7 (from 100 place of first number) * 7 (from 1 place of second number) = 49 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4900\n- 7 (from 100 place of first number) * 7 (from 10 place of second number) = 49 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 49000\n- 7 (from 100 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 70000\n\nNow, add all these results together:\nThe sum of 14 + 140 + 200 + 420 + 4200 + 6000 + 4900 + 49000 + 70000 = 134874."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 570 * 484?"}, {"role": "assistant", "content": "Here are the steps for multiplying 570 * 484 using the long multiplication method.\nStep 1: Break first number 570 into its individual digits: 5 (hundreds place), 7 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 484 into its individual digits: 4 (hundreds place), 8 (tens place), and 4 (ones place).\n- 0 (from 1 place of first number) * 4 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 8 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 4 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 7 (from 10 place of first number) * 4 (from 1 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 280\n- 7 (from 10 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5600\n- 7 (from 10 place of first number) * 4 (from 100 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 28000\n- 5 (from 100 place of first number) * 4 (from 1 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2000\n- 5 (from 100 place of first number) * 8 (from 10 place of second number) = 40 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 40000\n- 5 (from 100 place of first number) * 4 (from 100 place of second number) = 20 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 200000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 280 + 5600 + 28000 + 2000 + 40000 + 200000 = 275880."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 972 * 499?"}, {"role": "assistant", "content": "Here are the steps for multiplying 972 * 499 using the long multiplication method.\nStep 1: Break first number 972 into its individual digits: 9 (hundreds place), 7 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 499 into its individual digits: 4 (hundreds place), 9 (tens place), and 9 (ones place).\n- 2 (from 1 place of first number) * 9 (from 1 place of second number) = 18 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 18\n- 2 (from 1 place of first number) * 9 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 2 (from 1 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 7 (from 10 place of first number) * 9 (from 1 place of second number) = 63 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 630\n- 7 (from 10 place of first number) * 9 (from 10 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 6300\n- 7 (from 10 place of first number) * 4 (from 100 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 28000\n- 9 (from 100 place of first number) * 9 (from 1 place of second number) = 81 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 8100\n- 9 (from 100 place of first number) * 9 (from 10 place of second number) = 81 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 81000\n- 9 (from 100 place of first number) * 4 (from 100 place of second number) = 36 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 360000\n\nNow, add all these results together:\nThe sum of 18 + 180 + 800 + 630 + 6300 + 28000 + 8100 + 81000 + 360000 = 485028."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 682 * 556?"}, {"role": "assistant", "content": "Here are the steps for multiplying 682 * 556 using the long multiplication method.\nStep 1: Break first number 682 into its individual digits: 6 (hundreds place), 8 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 556 into its individual digits: 5 (hundreds place), 5 (tens place), and 6 (ones place).\n- 2 (from 1 place of first number) * 6 (from 1 place of second number) = 12 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 12\n- 2 (from 1 place of first number) * 5 (from 10 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 2 (from 1 place of first number) * 5 (from 100 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1000\n- 8 (from 10 place of first number) * 6 (from 1 place of second number) = 48 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 480\n- 8 (from 10 place of first number) * 5 (from 10 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 8 (from 10 place of first number) * 5 (from 100 place of second number) = 40 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n- 6 (from 100 place of first number) * 6 (from 1 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3600\n- 6 (from 100 place of first number) * 5 (from 10 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 30000\n- 6 (from 100 place of first number) * 5 (from 100 place of second number) = 30 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 300000\n\nNow, add all these results together:\nThe sum of 12 + 100 + 1000 + 480 + 4000 + 40000 + 3600 + 30000 + 300000 = 379192."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 973 * 285?"}, {"role": "assistant", "content": "Here are the steps for multiplying 973 * 285 using the long multiplication method.\nStep 1: Break first number 973 into its individual digits: 9 (hundreds place), 7 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 285 into its individual digits: 2 (hundreds place), 8 (tens place), and 5 (ones place).\n- 3 (from 1 place of first number) * 5 (from 1 place of second number) = 15 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 15\n- 3 (from 1 place of first number) * 8 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 3 (from 1 place of first number) * 2 (from 100 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 600\n- 7 (from 10 place of first number) * 5 (from 1 place of second number) = 35 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 350\n- 7 (from 10 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5600\n- 7 (from 10 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 14000\n- 9 (from 100 place of first number) * 5 (from 1 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4500\n- 9 (from 100 place of first number) * 8 (from 10 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 72000\n- 9 (from 100 place of first number) * 2 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 15 + 240 + 600 + 350 + 5600 + 14000 + 4500 + 72000 + 180000 = 277305."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 189 * 358?"}, {"role": "assistant", "content": "Here are the steps for multiplying 189 * 358 using the long multiplication method.\nStep 1: Break first number 189 into its individual digits: 1 (hundreds place), 8 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 358 into its individual digits: 3 (hundreds place), 5 (tens place), and 8 (ones place).\n- 9 (from 1 place of first number) * 8 (from 1 place of second number) = 72 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 72\n- 9 (from 1 place of first number) * 5 (from 10 place of second number) = 45 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 450\n- 9 (from 1 place of first number) * 3 (from 100 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2700\n- 8 (from 10 place of first number) * 8 (from 1 place of second number) = 64 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 640\n- 8 (from 10 place of first number) * 5 (from 10 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 8 (from 10 place of first number) * 3 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 1 (from 100 place of first number) * 8 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 1 (from 100 place of first number) * 5 (from 10 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 5000\n- 1 (from 100 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n\nNow, add all these results together:\nThe sum of 72 + 450 + 2700 + 640 + 4000 + 24000 + 800 + 5000 + 30000 = 67662."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 907 * 535?"}, {"role": "assistant", "content": "Here are the steps for multiplying 907 * 535 using the long multiplication method.\nStep 1: Break first number 907 into its individual digits: 9 (hundreds place), 0 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 535 into its individual digits: 5 (hundreds place), 3 (tens place), and 5 (ones place).\n- 7 (from 1 place of first number) * 5 (from 1 place of second number) = 35 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 35\n- 7 (from 1 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 210\n- 7 (from 1 place of first number) * 5 (from 100 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3500\n- 0 (from 10 place of first number) * 5 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 3 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 5 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 9 (from 100 place of first number) * 5 (from 1 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4500\n- 9 (from 100 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 27000\n- 9 (from 100 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 450000\n\nNow, add all these results together:\nThe sum of 35 + 210 + 3500 + 0 + 0 + 0 + 4500 + 27000 + 450000 = 485245."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 208 * 773?"}, {"role": "assistant", "content": "Here are the steps for multiplying 208 * 773 using the long multiplication method.\nStep 1: Break first number 208 into its individual digits: 2 (hundreds place), 0 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 773 into its individual digits: 7 (hundreds place), 7 (tens place), and 3 (ones place).\n- 8 (from 1 place of first number) * 3 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 8 (from 1 place of first number) * 7 (from 10 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 560\n- 8 (from 1 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5600\n- 0 (from 10 place of first number) * 3 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 7 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 7 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 2 (from 100 place of first number) * 3 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 2 (from 100 place of first number) * 7 (from 10 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 14000\n- 2 (from 100 place of first number) * 7 (from 100 place of second number) = 14 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 140000\n\nNow, add all these results together:\nThe sum of 24 + 560 + 5600 + 0 + 0 + 0 + 600 + 14000 + 140000 = 160784."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 750 * 993?"}, {"role": "assistant", "content": "Here are the steps for multiplying 750 * 993 using the long multiplication method.\nStep 1: Break first number 750 into its individual digits: 7 (hundreds place), 5 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 993 into its individual digits: 9 (hundreds place), 9 (tens place), and 3 (ones place).\n- 0 (from 1 place of first number) * 3 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 9 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 9 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 5 (from 10 place of first number) * 3 (from 1 place of second number) = 15 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 150\n- 5 (from 10 place of first number) * 9 (from 10 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4500\n- 5 (from 10 place of first number) * 9 (from 100 place of second number) = 45 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 45000\n- 7 (from 100 place of first number) * 3 (from 1 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2100\n- 7 (from 100 place of first number) * 9 (from 10 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 63000\n- 7 (from 100 place of first number) * 9 (from 100 place of second number) = 63 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 630000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 150 + 4500 + 45000 + 2100 + 63000 + 630000 = 744750."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 107 * 313?"}, {"role": "assistant", "content": "Here are the steps for multiplying 107 * 313 using the long multiplication method.\nStep 1: Break first number 107 into its individual digits: 1 (hundreds place), 0 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 313 into its individual digits: 3 (hundreds place), 1 (tens place), and 3 (ones place).\n- 7 (from 1 place of first number) * 3 (from 1 place of second number) = 21 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 21\n- 7 (from 1 place of first number) * 1 (from 10 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 70\n- 7 (from 1 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2100\n- 0 (from 10 place of first number) * 3 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 1 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 3 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 1 (from 100 place of first number) * 3 (from 1 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 1 (from 100 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 1000\n- 1 (from 100 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n\nNow, add all these results together:\nThe sum of 21 + 70 + 2100 + 0 + 0 + 0 + 300 + 1000 + 30000 = 33491."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 955 * 627?"}, {"role": "assistant", "content": "Here are the steps for multiplying 955 * 627 using the long multiplication method.\nStep 1: Break first number 955 into its individual digits: 9 (hundreds place), 5 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 627 into its individual digits: 6 (hundreds place), 2 (tens place), and 7 (ones place).\n- 5 (from 1 place of first number) * 7 (from 1 place of second number) = 35 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 35\n- 5 (from 1 place of first number) * 2 (from 10 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 5 (from 1 place of first number) * 6 (from 100 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 5 (from 10 place of first number) * 7 (from 1 place of second number) = 35 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 350\n- 5 (from 10 place of first number) * 2 (from 10 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1000\n- 5 (from 10 place of first number) * 6 (from 100 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n- 9 (from 100 place of first number) * 7 (from 1 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 6300\n- 9 (from 100 place of first number) * 2 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 9 (from 100 place of first number) * 6 (from 100 place of second number) = 54 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 540000\n\nNow, add all these results together:\nThe sum of 35 + 100 + 3000 + 350 + 1000 + 30000 + 6300 + 18000 + 540000 = 598785."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 176 * 159?"}, {"role": "assistant", "content": "Here are the steps for multiplying 176 * 159 using the long multiplication method.\nStep 1: Break first number 176 into its individual digits: 1 (hundreds place), 7 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 159 into its individual digits: 1 (hundreds place), 5 (tens place), and 9 (ones place).\n- 6 (from 1 place of first number) * 9 (from 1 place of second number) = 54 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 54\n- 6 (from 1 place of first number) * 5 (from 10 place of second number) = 30 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 300\n- 6 (from 1 place of first number) * 1 (from 100 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 600\n- 7 (from 10 place of first number) * 9 (from 1 place of second number) = 63 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 630\n- 7 (from 10 place of first number) * 5 (from 10 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3500\n- 7 (from 10 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 7000\n- 1 (from 100 place of first number) * 9 (from 1 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 900\n- 1 (from 100 place of first number) * 5 (from 10 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 5000\n- 1 (from 100 place of first number) * 1 (from 100 place of second number) = 1 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 10000\n\nNow, add all these results together:\nThe sum of 54 + 300 + 600 + 630 + 3500 + 7000 + 900 + 5000 + 10000 = 27984."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 771 * 932?"}, {"role": "assistant", "content": "Here are the steps for multiplying 771 * 932 using the long multiplication method.\nStep 1: Break first number 771 into its individual digits: 7 (hundreds place), 7 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 932 into its individual digits: 9 (hundreds place), 3 (tens place), and 2 (ones place).\n- 1 (from 1 place of first number) * 2 (from 1 place of second number) = 2 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 2\n- 1 (from 1 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 30\n- 1 (from 1 place of first number) * 9 (from 100 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 900\n- 7 (from 10 place of first number) * 2 (from 1 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 140\n- 7 (from 10 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2100\n- 7 (from 10 place of first number) * 9 (from 100 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 63000\n- 7 (from 100 place of first number) * 2 (from 1 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1400\n- 7 (from 100 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 21000\n- 7 (from 100 place of first number) * 9 (from 100 place of second number) = 63 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 630000\n\nNow, add all these results together:\nThe sum of 2 + 30 + 900 + 140 + 2100 + 63000 + 1400 + 21000 + 630000 = 718572."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 161 * 363?"}, {"role": "assistant", "content": "Here are the steps for multiplying 161 * 363 using the long multiplication method.\nStep 1: Break first number 161 into its individual digits: 1 (hundreds place), 6 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 363 into its individual digits: 3 (hundreds place), 6 (tens place), and 3 (ones place).\n- 1 (from 1 place of first number) * 3 (from 1 place of second number) = 3 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 3\n- 1 (from 1 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 60\n- 1 (from 1 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 300\n- 6 (from 10 place of first number) * 3 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 6 (from 10 place of first number) * 6 (from 10 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3600\n- 6 (from 10 place of first number) * 3 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 1 (from 100 place of first number) * 3 (from 1 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 1 (from 100 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 1 (from 100 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n\nNow, add all these results together:\nThe sum of 3 + 60 + 300 + 180 + 3600 + 18000 + 300 + 6000 + 30000 = 58443."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 552 * 996?"}, {"role": "assistant", "content": "Here are the steps for multiplying 552 * 996 using the long multiplication method.\nStep 1: Break first number 552 into its individual digits: 5 (hundreds place), 5 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 996 into its individual digits: 9 (hundreds place), 9 (tens place), and 6 (ones place).\n- 2 (from 1 place of first number) * 6 (from 1 place of second number) = 12 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 12\n- 2 (from 1 place of first number) * 9 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 2 (from 1 place of first number) * 9 (from 100 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1800\n- 5 (from 10 place of first number) * 6 (from 1 place of second number) = 30 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 5 (from 10 place of first number) * 9 (from 10 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4500\n- 5 (from 10 place of first number) * 9 (from 100 place of second number) = 45 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 45000\n- 5 (from 100 place of first number) * 6 (from 1 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3000\n- 5 (from 100 place of first number) * 9 (from 10 place of second number) = 45 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 45000\n- 5 (from 100 place of first number) * 9 (from 100 place of second number) = 45 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 450000\n\nNow, add all these results together:\nThe sum of 12 + 180 + 1800 + 300 + 4500 + 45000 + 3000 + 45000 + 450000 = 549792."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 732 * 158?"}, {"role": "assistant", "content": "Here are the steps for multiplying 732 * 158 using the long multiplication method.\nStep 1: Break first number 732 into its individual digits: 7 (hundreds place), 3 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 158 into its individual digits: 1 (hundreds place), 5 (tens place), and 8 (ones place).\n- 2 (from 1 place of first number) * 8 (from 1 place of second number) = 16 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 16\n- 2 (from 1 place of first number) * 5 (from 10 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 2 (from 1 place of first number) * 1 (from 100 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 200\n- 3 (from 10 place of first number) * 8 (from 1 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 240\n- 3 (from 10 place of first number) * 5 (from 10 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1500\n- 3 (from 10 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 7 (from 100 place of first number) * 8 (from 1 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 5600\n- 7 (from 100 place of first number) * 5 (from 10 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 35000\n- 7 (from 100 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 70000\n\nNow, add all these results together:\nThe sum of 16 + 100 + 200 + 240 + 1500 + 3000 + 5600 + 35000 + 70000 = 115656."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 204 * 840?"}, {"role": "assistant", "content": "Here are the steps for multiplying 204 * 840 using the long multiplication method.\nStep 1: Break first number 204 into its individual digits: 2 (hundreds place), 0 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 840 into its individual digits: 8 (hundreds place), 4 (tens place), and 0 (ones place).\n- 4 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 4 (from 1 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 160\n- 4 (from 1 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3200\n- 0 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 4 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 8 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 2 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 2 (from 100 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 2 (from 100 place of first number) * 8 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 0 + 160 + 3200 + 0 + 0 + 0 + 0 + 8000 + 160000 = 171360."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 715 * 256?"}, {"role": "assistant", "content": "Here are the steps for multiplying 715 * 256 using the long multiplication method.\nStep 1: Break first number 715 into its individual digits: 7 (hundreds place), 1 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 256 into its individual digits: 2 (hundreds place), 5 (tens place), and 6 (ones place).\n- 5 (from 1 place of first number) * 6 (from 1 place of second number) = 30 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 5 (from 1 place of first number) * 5 (from 10 place of second number) = 25 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 250\n- 5 (from 1 place of first number) * 2 (from 100 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1000\n- 1 (from 10 place of first number) * 6 (from 1 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 60\n- 1 (from 10 place of first number) * 5 (from 10 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 500\n- 1 (from 10 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 7 (from 100 place of first number) * 6 (from 1 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4200\n- 7 (from 100 place of first number) * 5 (from 10 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 35000\n- 7 (from 100 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 140000\n\nNow, add all these results together:\nThe sum of 30 + 250 + 1000 + 60 + 500 + 2000 + 4200 + 35000 + 140000 = 183040."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 125 * 302?"}, {"role": "assistant", "content": "Here are the steps for multiplying 125 * 302 using the long multiplication method.\nStep 1: Break first number 125 into its individual digits: 1 (hundreds place), 2 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 302 into its individual digits: 3 (hundreds place), 0 (tens place), and 2 (ones place).\n- 5 (from 1 place of first number) * 2 (from 1 place of second number) = 10 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 10\n- 5 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 5 (from 1 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1500\n- 2 (from 10 place of first number) * 2 (from 1 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 2 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 2 (from 10 place of first number) * 3 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 1 (from 100 place of first number) * 2 (from 1 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 200\n- 1 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 1 (from 100 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n\nNow, add all these results together:\nThe sum of 10 + 0 + 1500 + 40 + 0 + 6000 + 200 + 0 + 30000 = 37750."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 851 * 860?"}, {"role": "assistant", "content": "Here are the steps for multiplying 851 * 860 using the long multiplication method.\nStep 1: Break first number 851 into its individual digits: 8 (hundreds place), 5 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 860 into its individual digits: 8 (hundreds place), 6 (tens place), and 0 (ones place).\n- 1 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 1 (from 1 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 60\n- 1 (from 1 place of first number) * 8 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 5 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 5 (from 10 place of first number) * 6 (from 10 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 5 (from 10 place of first number) * 8 (from 100 place of second number) = 40 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n- 8 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 100 place of first number) * 6 (from 10 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 48000\n- 8 (from 100 place of first number) * 8 (from 100 place of second number) = 64 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 640000\n\nNow, add all these results together:\nThe sum of 0 + 60 + 800 + 0 + 3000 + 40000 + 0 + 48000 + 640000 = 731860."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 300 * 776?"}, {"role": "assistant", "content": "Here are the steps for multiplying 300 * 776 using the long multiplication method.\nStep 1: Break first number 300 into its individual digits: 3 (hundreds place), 0 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 776 into its individual digits: 7 (hundreds place), 7 (tens place), and 6 (ones place).\n- 0 (from 1 place of first number) * 6 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 7 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 7 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 0 (from 10 place of first number) * 6 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 7 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 7 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 3 (from 100 place of first number) * 6 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 3 (from 100 place of first number) * 7 (from 10 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 21000\n- 3 (from 100 place of first number) * 7 (from 100 place of second number) = 21 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 210000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 0 + 0 + 0 + 1800 + 21000 + 210000 = 232800."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 612 * 994?"}, {"role": "assistant", "content": "Here are the steps for multiplying 612 * 994 using the long multiplication method.\nStep 1: Break first number 612 into its individual digits: 6 (hundreds place), 1 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 994 into its individual digits: 9 (hundreds place), 9 (tens place), and 4 (ones place).\n- 2 (from 1 place of first number) * 4 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 2 (from 1 place of first number) * 9 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 2 (from 1 place of first number) * 9 (from 100 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1800\n- 1 (from 10 place of first number) * 4 (from 1 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 1 (from 10 place of first number) * 9 (from 10 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 900\n- 1 (from 10 place of first number) * 9 (from 100 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 9000\n- 6 (from 100 place of first number) * 4 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 6 (from 100 place of first number) * 9 (from 10 place of second number) = 54 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 54000\n- 6 (from 100 place of first number) * 9 (from 100 place of second number) = 54 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 540000\n\nNow, add all these results together:\nThe sum of 8 + 180 + 1800 + 40 + 900 + 9000 + 2400 + 54000 + 540000 = 608328."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 896 * 779?"}, {"role": "assistant", "content": "Here are the steps for multiplying 896 * 779 using the long multiplication method.\nStep 1: Break first number 896 into its individual digits: 8 (hundreds place), 9 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 779 into its individual digits: 7 (hundreds place), 7 (tens place), and 9 (ones place).\n- 6 (from 1 place of first number) * 9 (from 1 place of second number) = 54 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 54\n- 6 (from 1 place of first number) * 7 (from 10 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 420\n- 6 (from 1 place of first number) * 7 (from 100 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4200\n- 9 (from 10 place of first number) * 9 (from 1 place of second number) = 81 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 810\n- 9 (from 10 place of first number) * 7 (from 10 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 6300\n- 9 (from 10 place of first number) * 7 (from 100 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 63000\n- 8 (from 100 place of first number) * 9 (from 1 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 7200\n- 8 (from 100 place of first number) * 7 (from 10 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 56000\n- 8 (from 100 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 560000\n\nNow, add all these results together:\nThe sum of 54 + 420 + 4200 + 810 + 6300 + 63000 + 7200 + 56000 + 560000 = 697984."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 946 * 354?"}, {"role": "assistant", "content": "Here are the steps for multiplying 946 * 354 using the long multiplication method.\nStep 1: Break first number 946 into its individual digits: 9 (hundreds place), 4 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 354 into its individual digits: 3 (hundreds place), 5 (tens place), and 4 (ones place).\n- 6 (from 1 place of first number) * 4 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 6 (from 1 place of first number) * 5 (from 10 place of second number) = 30 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 300\n- 6 (from 1 place of first number) * 3 (from 100 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1800\n- 4 (from 10 place of first number) * 4 (from 1 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 160\n- 4 (from 10 place of first number) * 5 (from 10 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 4 (from 10 place of first number) * 3 (from 100 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 12000\n- 9 (from 100 place of first number) * 4 (from 1 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3600\n- 9 (from 100 place of first number) * 5 (from 10 place of second number) = 45 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 45000\n- 9 (from 100 place of first number) * 3 (from 100 place of second number) = 27 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 270000\n\nNow, add all these results together:\nThe sum of 24 + 300 + 1800 + 160 + 2000 + 12000 + 3600 + 45000 + 270000 = 334884."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 887 * 370?"}, {"role": "assistant", "content": "Here are the steps for multiplying 887 * 370 using the long multiplication method.\nStep 1: Break first number 887 into its individual digits: 8 (hundreds place), 8 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 370 into its individual digits: 3 (hundreds place), 7 (tens place), and 0 (ones place).\n- 7 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 1 place of first number) * 7 (from 10 place of second number) = 49 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 490\n- 7 (from 1 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2100\n- 8 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 10 place of first number) * 7 (from 10 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5600\n- 8 (from 10 place of first number) * 3 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 8 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 100 place of first number) * 7 (from 10 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 56000\n- 8 (from 100 place of first number) * 3 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 0 + 490 + 2100 + 0 + 5600 + 24000 + 0 + 56000 + 240000 = 328190."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 745 * 944?"}, {"role": "assistant", "content": "Here are the steps for multiplying 745 * 944 using the long multiplication method.\nStep 1: Break first number 745 into its individual digits: 7 (hundreds place), 4 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 944 into its individual digits: 9 (hundreds place), 4 (tens place), and 4 (ones place).\n- 5 (from 1 place of first number) * 4 (from 1 place of second number) = 20 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 5 (from 1 place of first number) * 4 (from 10 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 200\n- 5 (from 1 place of first number) * 9 (from 100 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4500\n- 4 (from 10 place of first number) * 4 (from 1 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 160\n- 4 (from 10 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1600\n- 4 (from 10 place of first number) * 9 (from 100 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 36000\n- 7 (from 100 place of first number) * 4 (from 1 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2800\n- 7 (from 100 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 28000\n- 7 (from 100 place of first number) * 9 (from 100 place of second number) = 63 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 630000\n\nNow, add all these results together:\nThe sum of 20 + 200 + 4500 + 160 + 1600 + 36000 + 2800 + 28000 + 630000 = 703280."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 170 * 332?"}, {"role": "assistant", "content": "Here are the steps for multiplying 170 * 332 using the long multiplication method.\nStep 1: Break first number 170 into its individual digits: 1 (hundreds place), 7 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 332 into its individual digits: 3 (hundreds place), 3 (tens place), and 2 (ones place).\n- 0 (from 1 place of first number) * 2 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 3 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 3 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 7 (from 10 place of first number) * 2 (from 1 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 140\n- 7 (from 10 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2100\n- 7 (from 10 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 21000\n- 1 (from 100 place of first number) * 2 (from 1 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 200\n- 1 (from 100 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 1 (from 100 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 140 + 2100 + 21000 + 200 + 3000 + 30000 = 56440."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 808 * 130?"}, {"role": "assistant", "content": "Here are the steps for multiplying 808 * 130 using the long multiplication method.\nStep 1: Break first number 808 into its individual digits: 8 (hundreds place), 0 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 130 into its individual digits: 1 (hundreds place), 3 (tens place), and 0 (ones place).\n- 8 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 1 place of first number) * 3 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 8 (from 1 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 0 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 3 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 1 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 8 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 100 place of first number) * 3 (from 10 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 24000\n- 8 (from 100 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 0 + 240 + 800 + 0 + 0 + 0 + 0 + 24000 + 80000 = 105040."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 197 * 292?"}, {"role": "assistant", "content": "Here are the steps for multiplying 197 * 292 using the long multiplication method.\nStep 1: Break first number 197 into its individual digits: 1 (hundreds place), 9 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 292 into its individual digits: 2 (hundreds place), 9 (tens place), and 2 (ones place).\n- 7 (from 1 place of first number) * 2 (from 1 place of second number) = 14 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 14\n- 7 (from 1 place of first number) * 9 (from 10 place of second number) = 63 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 630\n- 7 (from 1 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1400\n- 9 (from 10 place of first number) * 2 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 9 (from 10 place of first number) * 9 (from 10 place of second number) = 81 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 8100\n- 9 (from 10 place of first number) * 2 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 1 (from 100 place of first number) * 2 (from 1 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 200\n- 1 (from 100 place of first number) * 9 (from 10 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 9000\n- 1 (from 100 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n\nNow, add all these results together:\nThe sum of 14 + 630 + 1400 + 180 + 8100 + 18000 + 200 + 9000 + 20000 = 57524."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 371 * 534?"}, {"role": "assistant", "content": "Here are the steps for multiplying 371 * 534 using the long multiplication method.\nStep 1: Break first number 371 into its individual digits: 3 (hundreds place), 7 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 534 into its individual digits: 5 (hundreds place), 3 (tens place), and 4 (ones place).\n- 1 (from 1 place of first number) * 4 (from 1 place of second number) = 4 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 4\n- 1 (from 1 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 30\n- 1 (from 1 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 500\n- 7 (from 10 place of first number) * 4 (from 1 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 280\n- 7 (from 10 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2100\n- 7 (from 10 place of first number) * 5 (from 100 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 35000\n- 3 (from 100 place of first number) * 4 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 3 (from 100 place of first number) * 3 (from 10 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 9000\n- 3 (from 100 place of first number) * 5 (from 100 place of second number) = 15 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 150000\n\nNow, add all these results together:\nThe sum of 4 + 30 + 500 + 280 + 2100 + 35000 + 1200 + 9000 + 150000 = 198114."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 473 * 451?"}, {"role": "assistant", "content": "Here are the steps for multiplying 473 * 451 using the long multiplication method.\nStep 1: Break first number 473 into its individual digits: 4 (hundreds place), 7 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 451 into its individual digits: 4 (hundreds place), 5 (tens place), and 1 (ones place).\n- 3 (from 1 place of first number) * 1 (from 1 place of second number) = 3 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 3\n- 3 (from 1 place of first number) * 5 (from 10 place of second number) = 15 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 150\n- 3 (from 1 place of first number) * 4 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 7 (from 10 place of first number) * 1 (from 1 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 70\n- 7 (from 10 place of first number) * 5 (from 10 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3500\n- 7 (from 10 place of first number) * 4 (from 100 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 28000\n- 4 (from 100 place of first number) * 1 (from 1 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 4 (from 100 place of first number) * 5 (from 10 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 20000\n- 4 (from 100 place of first number) * 4 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 3 + 150 + 1200 + 70 + 3500 + 28000 + 400 + 20000 + 160000 = 213323."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 538 * 775?"}, {"role": "assistant", "content": "Here are the steps for multiplying 538 * 775 using the long multiplication method.\nStep 1: Break first number 538 into its individual digits: 5 (hundreds place), 3 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 775 into its individual digits: 7 (hundreds place), 7 (tens place), and 5 (ones place).\n- 8 (from 1 place of first number) * 5 (from 1 place of second number) = 40 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 8 (from 1 place of first number) * 7 (from 10 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 560\n- 8 (from 1 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5600\n- 3 (from 10 place of first number) * 5 (from 1 place of second number) = 15 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 150\n- 3 (from 10 place of first number) * 7 (from 10 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2100\n- 3 (from 10 place of first number) * 7 (from 100 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 21000\n- 5 (from 100 place of first number) * 5 (from 1 place of second number) = 25 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2500\n- 5 (from 100 place of first number) * 7 (from 10 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 35000\n- 5 (from 100 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 350000\n\nNow, add all these results together:\nThe sum of 40 + 560 + 5600 + 150 + 2100 + 21000 + 2500 + 35000 + 350000 = 416950."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 488 * 733?"}, {"role": "assistant", "content": "Here are the steps for multiplying 488 * 733 using the long multiplication method.\nStep 1: Break first number 488 into its individual digits: 4 (hundreds place), 8 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 733 into its individual digits: 7 (hundreds place), 3 (tens place), and 3 (ones place).\n- 8 (from 1 place of first number) * 3 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 8 (from 1 place of first number) * 3 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 8 (from 1 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5600\n- 8 (from 10 place of first number) * 3 (from 1 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 240\n- 8 (from 10 place of first number) * 3 (from 10 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2400\n- 8 (from 10 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 56000\n- 4 (from 100 place of first number) * 3 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 4 (from 100 place of first number) * 3 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 4 (from 100 place of first number) * 7 (from 100 place of second number) = 28 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 280000\n\nNow, add all these results together:\nThe sum of 24 + 240 + 5600 + 240 + 2400 + 56000 + 1200 + 12000 + 280000 = 357704."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 709 * 564?"}, {"role": "assistant", "content": "Here are the steps for multiplying 709 * 564 using the long multiplication method.\nStep 1: Break first number 709 into its individual digits: 7 (hundreds place), 0 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 564 into its individual digits: 5 (hundreds place), 6 (tens place), and 4 (ones place).\n- 9 (from 1 place of first number) * 4 (from 1 place of second number) = 36 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 36\n- 9 (from 1 place of first number) * 6 (from 10 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 540\n- 9 (from 1 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4500\n- 0 (from 10 place of first number) * 4 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 6 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 5 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 7 (from 100 place of first number) * 4 (from 1 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2800\n- 7 (from 100 place of first number) * 6 (from 10 place of second number) = 42 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 42000\n- 7 (from 100 place of first number) * 5 (from 100 place of second number) = 35 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 350000\n\nNow, add all these results together:\nThe sum of 36 + 540 + 4500 + 0 + 0 + 0 + 2800 + 42000 + 350000 = 399876."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 741 * 990?"}, {"role": "assistant", "content": "Here are the steps for multiplying 741 * 990 using the long multiplication method.\nStep 1: Break first number 741 into its individual digits: 7 (hundreds place), 4 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 990 into its individual digits: 9 (hundreds place), 9 (tens place), and 0 (ones place).\n- 1 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 1 (from 1 place of first number) * 9 (from 10 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 90\n- 1 (from 1 place of first number) * 9 (from 100 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 900\n- 4 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 4 (from 10 place of first number) * 9 (from 10 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3600\n- 4 (from 10 place of first number) * 9 (from 100 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 36000\n- 7 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 100 place of first number) * 9 (from 10 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 63000\n- 7 (from 100 place of first number) * 9 (from 100 place of second number) = 63 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 630000\n\nNow, add all these results together:\nThe sum of 0 + 90 + 900 + 0 + 3600 + 36000 + 0 + 63000 + 630000 = 733590."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 940 * 384?"}, {"role": "assistant", "content": "Here are the steps for multiplying 940 * 384 using the long multiplication method.\nStep 1: Break first number 940 into its individual digits: 9 (hundreds place), 4 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 384 into its individual digits: 3 (hundreds place), 8 (tens place), and 4 (ones place).\n- 0 (from 1 place of first number) * 4 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 8 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 3 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 4 (from 10 place of first number) * 4 (from 1 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 160\n- 4 (from 10 place of first number) * 8 (from 10 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3200\n- 4 (from 10 place of first number) * 3 (from 100 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 12000\n- 9 (from 100 place of first number) * 4 (from 1 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3600\n- 9 (from 100 place of first number) * 8 (from 10 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 72000\n- 9 (from 100 place of first number) * 3 (from 100 place of second number) = 27 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 270000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 160 + 3200 + 12000 + 3600 + 72000 + 270000 = 360960."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 749 * 333?"}, {"role": "assistant", "content": "Here are the steps for multiplying 749 * 333 using the long multiplication method.\nStep 1: Break first number 749 into its individual digits: 7 (hundreds place), 4 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 333 into its individual digits: 3 (hundreds place), 3 (tens place), and 3 (ones place).\n- 9 (from 1 place of first number) * 3 (from 1 place of second number) = 27 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 27\n- 9 (from 1 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 270\n- 9 (from 1 place of first number) * 3 (from 100 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2700\n- 4 (from 10 place of first number) * 3 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 4 (from 10 place of first number) * 3 (from 10 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1200\n- 4 (from 10 place of first number) * 3 (from 100 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 12000\n- 7 (from 100 place of first number) * 3 (from 1 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2100\n- 7 (from 100 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 21000\n- 7 (from 100 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 210000\n\nNow, add all these results together:\nThe sum of 27 + 270 + 2700 + 120 + 1200 + 12000 + 2100 + 21000 + 210000 = 249417."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 305 * 227?"}, {"role": "assistant", "content": "Here are the steps for multiplying 305 * 227 using the long multiplication method.\nStep 1: Break first number 305 into its individual digits: 3 (hundreds place), 0 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 227 into its individual digits: 2 (hundreds place), 2 (tens place), and 7 (ones place).\n- 5 (from 1 place of first number) * 7 (from 1 place of second number) = 35 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 35\n- 5 (from 1 place of first number) * 2 (from 10 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 5 (from 1 place of first number) * 2 (from 100 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1000\n- 0 (from 10 place of first number) * 7 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 2 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 2 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 3 (from 100 place of first number) * 7 (from 1 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2100\n- 3 (from 100 place of first number) * 2 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 3 (from 100 place of first number) * 2 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 35 + 100 + 1000 + 0 + 0 + 0 + 2100 + 6000 + 60000 = 69235."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 367 * 801?"}, {"role": "assistant", "content": "Here are the steps for multiplying 367 * 801 using the long multiplication method.\nStep 1: Break first number 367 into its individual digits: 3 (hundreds place), 6 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 801 into its individual digits: 8 (hundreds place), 0 (tens place), and 1 (ones place).\n- 7 (from 1 place of first number) * 1 (from 1 place of second number) = 7 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 7\n- 7 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 7 (from 1 place of first number) * 8 (from 100 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5600\n- 6 (from 10 place of first number) * 1 (from 1 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 60\n- 6 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 6 (from 10 place of first number) * 8 (from 100 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 48000\n- 3 (from 100 place of first number) * 1 (from 1 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 3 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 3 (from 100 place of first number) * 8 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 7 + 0 + 5600 + 60 + 0 + 48000 + 300 + 0 + 240000 = 293967."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 153 * 588?"}, {"role": "assistant", "content": "Here are the steps for multiplying 153 * 588 using the long multiplication method.\nStep 1: Break first number 153 into its individual digits: 1 (hundreds place), 5 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 588 into its individual digits: 5 (hundreds place), 8 (tens place), and 8 (ones place).\n- 3 (from 1 place of first number) * 8 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 3 (from 1 place of first number) * 8 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 3 (from 1 place of first number) * 5 (from 100 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1500\n- 5 (from 10 place of first number) * 8 (from 1 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 5 (from 10 place of first number) * 8 (from 10 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 5 (from 10 place of first number) * 5 (from 100 place of second number) = 25 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 25000\n- 1 (from 100 place of first number) * 8 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 1 (from 100 place of first number) * 8 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 1 (from 100 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 50000\n\nNow, add all these results together:\nThe sum of 24 + 240 + 1500 + 400 + 4000 + 25000 + 800 + 8000 + 50000 = 89964."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 279 * 445?"}, {"role": "assistant", "content": "Here are the steps for multiplying 279 * 445 using the long multiplication method.\nStep 1: Break first number 279 into its individual digits: 2 (hundreds place), 7 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 445 into its individual digits: 4 (hundreds place), 4 (tens place), and 5 (ones place).\n- 9 (from 1 place of first number) * 5 (from 1 place of second number) = 45 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 45\n- 9 (from 1 place of first number) * 4 (from 10 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 360\n- 9 (from 1 place of first number) * 4 (from 100 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3600\n- 7 (from 10 place of first number) * 5 (from 1 place of second number) = 35 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 350\n- 7 (from 10 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2800\n- 7 (from 10 place of first number) * 4 (from 100 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 28000\n- 2 (from 100 place of first number) * 5 (from 1 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1000\n- 2 (from 100 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 2 (from 100 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 45 + 360 + 3600 + 350 + 2800 + 28000 + 1000 + 8000 + 80000 = 124155."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 158 * 730?"}, {"role": "assistant", "content": "Here are the steps for multiplying 158 * 730 using the long multiplication method.\nStep 1: Break first number 158 into its individual digits: 1 (hundreds place), 5 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 730 into its individual digits: 7 (hundreds place), 3 (tens place), and 0 (ones place).\n- 8 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 1 place of first number) * 3 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 8 (from 1 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5600\n- 5 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 5 (from 10 place of first number) * 3 (from 10 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1500\n- 5 (from 10 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 35000\n- 1 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 1 (from 100 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 1 (from 100 place of first number) * 7 (from 100 place of second number) = 7 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 70000\n\nNow, add all these results together:\nThe sum of 0 + 240 + 5600 + 0 + 1500 + 35000 + 0 + 3000 + 70000 = 115340."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 202 * 967?"}, {"role": "assistant", "content": "Here are the steps for multiplying 202 * 967 using the long multiplication method.\nStep 1: Break first number 202 into its individual digits: 2 (hundreds place), 0 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 967 into its individual digits: 9 (hundreds place), 6 (tens place), and 7 (ones place).\n- 2 (from 1 place of first number) * 7 (from 1 place of second number) = 14 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 14\n- 2 (from 1 place of first number) * 6 (from 10 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 120\n- 2 (from 1 place of first number) * 9 (from 100 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1800\n- 0 (from 10 place of first number) * 7 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 6 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 9 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 2 (from 100 place of first number) * 7 (from 1 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1400\n- 2 (from 100 place of first number) * 6 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 2 (from 100 place of first number) * 9 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 14 + 120 + 1800 + 0 + 0 + 0 + 1400 + 12000 + 180000 = 195334."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 846 * 489?"}, {"role": "assistant", "content": "Here are the steps for multiplying 846 * 489 using the long multiplication method.\nStep 1: Break first number 846 into its individual digits: 8 (hundreds place), 4 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 489 into its individual digits: 4 (hundreds place), 8 (tens place), and 9 (ones place).\n- 6 (from 1 place of first number) * 9 (from 1 place of second number) = 54 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 54\n- 6 (from 1 place of first number) * 8 (from 10 place of second number) = 48 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 480\n- 6 (from 1 place of first number) * 4 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 4 (from 10 place of first number) * 9 (from 1 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 360\n- 4 (from 10 place of first number) * 8 (from 10 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3200\n- 4 (from 10 place of first number) * 4 (from 100 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 16000\n- 8 (from 100 place of first number) * 9 (from 1 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 7200\n- 8 (from 100 place of first number) * 8 (from 10 place of second number) = 64 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 64000\n- 8 (from 100 place of first number) * 4 (from 100 place of second number) = 32 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 320000\n\nNow, add all these results together:\nThe sum of 54 + 480 + 2400 + 360 + 3200 + 16000 + 7200 + 64000 + 320000 = 413694."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 304 * 753?"}, {"role": "assistant", "content": "Here are the steps for multiplying 304 * 753 using the long multiplication method.\nStep 1: Break first number 304 into its individual digits: 3 (hundreds place), 0 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 753 into its individual digits: 7 (hundreds place), 5 (tens place), and 3 (ones place).\n- 4 (from 1 place of first number) * 3 (from 1 place of second number) = 12 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 12\n- 4 (from 1 place of first number) * 5 (from 10 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 200\n- 4 (from 1 place of first number) * 7 (from 100 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2800\n- 0 (from 10 place of first number) * 3 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 5 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 7 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 3 (from 100 place of first number) * 3 (from 1 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 900\n- 3 (from 100 place of first number) * 5 (from 10 place of second number) = 15 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 15000\n- 3 (from 100 place of first number) * 7 (from 100 place of second number) = 21 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 210000\n\nNow, add all these results together:\nThe sum of 12 + 200 + 2800 + 0 + 0 + 0 + 900 + 15000 + 210000 = 228912."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 748 * 729?"}, {"role": "assistant", "content": "Here are the steps for multiplying 748 * 729 using the long multiplication method.\nStep 1: Break first number 748 into its individual digits: 7 (hundreds place), 4 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 729 into its individual digits: 7 (hundreds place), 2 (tens place), and 9 (ones place).\n- 8 (from 1 place of first number) * 9 (from 1 place of second number) = 72 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 72\n- 8 (from 1 place of first number) * 2 (from 10 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 160\n- 8 (from 1 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5600\n- 4 (from 10 place of first number) * 9 (from 1 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 360\n- 4 (from 10 place of first number) * 2 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 4 (from 10 place of first number) * 7 (from 100 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 28000\n- 7 (from 100 place of first number) * 9 (from 1 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 6300\n- 7 (from 100 place of first number) * 2 (from 10 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 14000\n- 7 (from 100 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 490000\n\nNow, add all these results together:\nThe sum of 72 + 160 + 5600 + 360 + 800 + 28000 + 6300 + 14000 + 490000 = 545292."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 416 * 525?"}, {"role": "assistant", "content": "Here are the steps for multiplying 416 * 525 using the long multiplication method.\nStep 1: Break first number 416 into its individual digits: 4 (hundreds place), 1 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 525 into its individual digits: 5 (hundreds place), 2 (tens place), and 5 (ones place).\n- 6 (from 1 place of first number) * 5 (from 1 place of second number) = 30 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 6 (from 1 place of first number) * 2 (from 10 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 120\n- 6 (from 1 place of first number) * 5 (from 100 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 1 (from 10 place of first number) * 5 (from 1 place of second number) = 5 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 50\n- 1 (from 10 place of first number) * 2 (from 10 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 200\n- 1 (from 10 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 5000\n- 4 (from 100 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2000\n- 4 (from 100 place of first number) * 2 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 4 (from 100 place of first number) * 5 (from 100 place of second number) = 20 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 200000\n\nNow, add all these results together:\nThe sum of 30 + 120 + 3000 + 50 + 200 + 5000 + 2000 + 8000 + 200000 = 218400."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 795 * 771?"}, {"role": "assistant", "content": "Here are the steps for multiplying 795 * 771 using the long multiplication method.\nStep 1: Break first number 795 into its individual digits: 7 (hundreds place), 9 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 771 into its individual digits: 7 (hundreds place), 7 (tens place), and 1 (ones place).\n- 5 (from 1 place of first number) * 1 (from 1 place of second number) = 5 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 5\n- 5 (from 1 place of first number) * 7 (from 10 place of second number) = 35 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 350\n- 5 (from 1 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3500\n- 9 (from 10 place of first number) * 1 (from 1 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 90\n- 9 (from 10 place of first number) * 7 (from 10 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 6300\n- 9 (from 10 place of first number) * 7 (from 100 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 63000\n- 7 (from 100 place of first number) * 1 (from 1 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 700\n- 7 (from 100 place of first number) * 7 (from 10 place of second number) = 49 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 49000\n- 7 (from 100 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 490000\n\nNow, add all these results together:\nThe sum of 5 + 350 + 3500 + 90 + 6300 + 63000 + 700 + 49000 + 490000 = 612945."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 338 * 620?"}, {"role": "assistant", "content": "Here are the steps for multiplying 338 * 620 using the long multiplication method.\nStep 1: Break first number 338 into its individual digits: 3 (hundreds place), 3 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 620 into its individual digits: 6 (hundreds place), 2 (tens place), and 0 (ones place).\n- 8 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 1 place of first number) * 2 (from 10 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 160\n- 8 (from 1 place of first number) * 6 (from 100 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4800\n- 3 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 3 (from 10 place of first number) * 2 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 3 (from 10 place of first number) * 6 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 3 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 3 (from 100 place of first number) * 2 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 3 (from 100 place of first number) * 6 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 0 + 160 + 4800 + 0 + 600 + 18000 + 0 + 6000 + 180000 = 209560."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 549 * 101?"}, {"role": "assistant", "content": "Here are the steps for multiplying 549 * 101 using the long multiplication method.\nStep 1: Break first number 549 into its individual digits: 5 (hundreds place), 4 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 101 into its individual digits: 1 (hundreds place), 0 (tens place), and 1 (ones place).\n- 9 (from 1 place of first number) * 1 (from 1 place of second number) = 9 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 9\n- 9 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 9 (from 1 place of first number) * 1 (from 100 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 900\n- 4 (from 10 place of first number) * 1 (from 1 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 4 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 4 (from 10 place of first number) * 1 (from 100 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 5 (from 100 place of first number) * 1 (from 1 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 500\n- 5 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 5 (from 100 place of first number) * 1 (from 100 place of second number) = 5 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 50000\n\nNow, add all these results together:\nThe sum of 9 + 0 + 900 + 40 + 0 + 4000 + 500 + 0 + 50000 = 55449."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 877 * 380?"}, {"role": "assistant", "content": "Here are the steps for multiplying 877 * 380 using the long multiplication method.\nStep 1: Break first number 877 into its individual digits: 8 (hundreds place), 7 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 380 into its individual digits: 3 (hundreds place), 8 (tens place), and 0 (ones place).\n- 7 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 1 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 560\n- 7 (from 1 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2100\n- 7 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 10 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5600\n- 7 (from 10 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 21000\n- 8 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 100 place of first number) * 8 (from 10 place of second number) = 64 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 64000\n- 8 (from 100 place of first number) * 3 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 0 + 560 + 2100 + 0 + 5600 + 21000 + 0 + 64000 + 240000 = 333260."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 261 * 538?"}, {"role": "assistant", "content": "Here are the steps for multiplying 261 * 538 using the long multiplication method.\nStep 1: Break first number 261 into its individual digits: 2 (hundreds place), 6 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 538 into its individual digits: 5 (hundreds place), 3 (tens place), and 8 (ones place).\n- 1 (from 1 place of first number) * 8 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 1 (from 1 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 30\n- 1 (from 1 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 500\n- 6 (from 10 place of first number) * 8 (from 1 place of second number) = 48 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 480\n- 6 (from 10 place of first number) * 3 (from 10 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1800\n- 6 (from 10 place of first number) * 5 (from 100 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n- 2 (from 100 place of first number) * 8 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 2 (from 100 place of first number) * 3 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 2 (from 100 place of first number) * 5 (from 100 place of second number) = 10 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 100000\n\nNow, add all these results together:\nThe sum of 8 + 30 + 500 + 480 + 1800 + 30000 + 1600 + 6000 + 100000 = 140418."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 483 * 272?"}, {"role": "assistant", "content": "Here are the steps for multiplying 483 * 272 using the long multiplication method.\nStep 1: Break first number 483 into its individual digits: 4 (hundreds place), 8 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 272 into its individual digits: 2 (hundreds place), 7 (tens place), and 2 (ones place).\n- 3 (from 1 place of first number) * 2 (from 1 place of second number) = 6 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 6\n- 3 (from 1 place of first number) * 7 (from 10 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 210\n- 3 (from 1 place of first number) * 2 (from 100 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 600\n- 8 (from 10 place of first number) * 2 (from 1 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 160\n- 8 (from 10 place of first number) * 7 (from 10 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5600\n- 8 (from 10 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 16000\n- 4 (from 100 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 4 (from 100 place of first number) * 7 (from 10 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 28000\n- 4 (from 100 place of first number) * 2 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 6 + 210 + 600 + 160 + 5600 + 16000 + 800 + 28000 + 80000 = 131376."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 828 * 261?"}, {"role": "assistant", "content": "Here are the steps for multiplying 828 * 261 using the long multiplication method.\nStep 1: Break first number 828 into its individual digits: 8 (hundreds place), 2 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 261 into its individual digits: 2 (hundreds place), 6 (tens place), and 1 (ones place).\n- 8 (from 1 place of first number) * 1 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 8 (from 1 place of first number) * 6 (from 10 place of second number) = 48 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 480\n- 8 (from 1 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 2 (from 10 place of first number) * 1 (from 1 place of second number) = 2 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 2 (from 10 place of first number) * 6 (from 10 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1200\n- 2 (from 10 place of first number) * 2 (from 100 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 8 (from 100 place of first number) * 1 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 8 (from 100 place of first number) * 6 (from 10 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 48000\n- 8 (from 100 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 8 + 480 + 1600 + 20 + 1200 + 4000 + 800 + 48000 + 160000 = 216108."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 589 * 836?"}, {"role": "assistant", "content": "Here are the steps for multiplying 589 * 836 using the long multiplication method.\nStep 1: Break first number 589 into its individual digits: 5 (hundreds place), 8 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 836 into its individual digits: 8 (hundreds place), 3 (tens place), and 6 (ones place).\n- 9 (from 1 place of first number) * 6 (from 1 place of second number) = 54 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 54\n- 9 (from 1 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 270\n- 9 (from 1 place of first number) * 8 (from 100 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 7200\n- 8 (from 10 place of first number) * 6 (from 1 place of second number) = 48 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 480\n- 8 (from 10 place of first number) * 3 (from 10 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2400\n- 8 (from 10 place of first number) * 8 (from 100 place of second number) = 64 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 64000\n- 5 (from 100 place of first number) * 6 (from 1 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3000\n- 5 (from 100 place of first number) * 3 (from 10 place of second number) = 15 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 15000\n- 5 (from 100 place of first number) * 8 (from 100 place of second number) = 40 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 400000\n\nNow, add all these results together:\nThe sum of 54 + 270 + 7200 + 480 + 2400 + 64000 + 3000 + 15000 + 400000 = 492404."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 572 * 295?"}, {"role": "assistant", "content": "Here are the steps for multiplying 572 * 295 using the long multiplication method.\nStep 1: Break first number 572 into its individual digits: 5 (hundreds place), 7 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 295 into its individual digits: 2 (hundreds place), 9 (tens place), and 5 (ones place).\n- 2 (from 1 place of first number) * 5 (from 1 place of second number) = 10 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 10\n- 2 (from 1 place of first number) * 9 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 2 (from 1 place of first number) * 2 (from 100 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 400\n- 7 (from 10 place of first number) * 5 (from 1 place of second number) = 35 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 350\n- 7 (from 10 place of first number) * 9 (from 10 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 6300\n- 7 (from 10 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 14000\n- 5 (from 100 place of first number) * 5 (from 1 place of second number) = 25 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2500\n- 5 (from 100 place of first number) * 9 (from 10 place of second number) = 45 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 45000\n- 5 (from 100 place of first number) * 2 (from 100 place of second number) = 10 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 100000\n\nNow, add all these results together:\nThe sum of 10 + 180 + 400 + 350 + 6300 + 14000 + 2500 + 45000 + 100000 = 168740."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 772 * 708?"}, {"role": "assistant", "content": "Here are the steps for multiplying 772 * 708 using the long multiplication method.\nStep 1: Break first number 772 into its individual digits: 7 (hundreds place), 7 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 708 into its individual digits: 7 (hundreds place), 0 (tens place), and 8 (ones place).\n- 2 (from 1 place of first number) * 8 (from 1 place of second number) = 16 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 16\n- 2 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 2 (from 1 place of first number) * 7 (from 100 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1400\n- 7 (from 10 place of first number) * 8 (from 1 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 560\n- 7 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 7 (from 10 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 49000\n- 7 (from 100 place of first number) * 8 (from 1 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 5600\n- 7 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 7 (from 100 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 490000\n\nNow, add all these results together:\nThe sum of 16 + 0 + 1400 + 560 + 0 + 49000 + 5600 + 0 + 490000 = 546576."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 679 * 202?"}, {"role": "assistant", "content": "Here are the steps for multiplying 679 * 202 using the long multiplication method.\nStep 1: Break first number 679 into its individual digits: 6 (hundreds place), 7 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 202 into its individual digits: 2 (hundreds place), 0 (tens place), and 2 (ones place).\n- 9 (from 1 place of first number) * 2 (from 1 place of second number) = 18 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 18\n- 9 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 9 (from 1 place of first number) * 2 (from 100 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1800\n- 7 (from 10 place of first number) * 2 (from 1 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 140\n- 7 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 7 (from 10 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 14000\n- 6 (from 100 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 6 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 6 (from 100 place of first number) * 2 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 18 + 0 + 1800 + 140 + 0 + 14000 + 1200 + 0 + 120000 = 137158."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 618 * 112?"}, {"role": "assistant", "content": "Here are the steps for multiplying 618 * 112 using the long multiplication method.\nStep 1: Break first number 618 into its individual digits: 6 (hundreds place), 1 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 112 into its individual digits: 1 (hundreds place), 1 (tens place), and 2 (ones place).\n- 8 (from 1 place of first number) * 2 (from 1 place of second number) = 16 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 16\n- 8 (from 1 place of first number) * 1 (from 10 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 80\n- 8 (from 1 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 1 (from 10 place of first number) * 2 (from 1 place of second number) = 2 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 1 (from 10 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 1 (from 10 place of first number) * 1 (from 100 place of second number) = 1 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 1000\n- 6 (from 100 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 6 (from 100 place of first number) * 1 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 6 (from 100 place of first number) * 1 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 16 + 80 + 800 + 20 + 100 + 1000 + 1200 + 6000 + 60000 = 69216."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 172 * 932?"}, {"role": "assistant", "content": "Here are the steps for multiplying 172 * 932 using the long multiplication method.\nStep 1: Break first number 172 into its individual digits: 1 (hundreds place), 7 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 932 into its individual digits: 9 (hundreds place), 3 (tens place), and 2 (ones place).\n- 2 (from 1 place of first number) * 2 (from 1 place of second number) = 4 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 4\n- 2 (from 1 place of first number) * 3 (from 10 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 60\n- 2 (from 1 place of first number) * 9 (from 100 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1800\n- 7 (from 10 place of first number) * 2 (from 1 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 140\n- 7 (from 10 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2100\n- 7 (from 10 place of first number) * 9 (from 100 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 63000\n- 1 (from 100 place of first number) * 2 (from 1 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 200\n- 1 (from 100 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 1 (from 100 place of first number) * 9 (from 100 place of second number) = 9 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 90000\n\nNow, add all these results together:\nThe sum of 4 + 60 + 1800 + 140 + 2100 + 63000 + 200 + 3000 + 90000 = 160304."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 923 * 960?"}, {"role": "assistant", "content": "Here are the steps for multiplying 923 * 960 using the long multiplication method.\nStep 1: Break first number 923 into its individual digits: 9 (hundreds place), 2 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 960 into its individual digits: 9 (hundreds place), 6 (tens place), and 0 (ones place).\n- 3 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 3 (from 1 place of first number) * 6 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 3 (from 1 place of first number) * 9 (from 100 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2700\n- 2 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 2 (from 10 place of first number) * 6 (from 10 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1200\n- 2 (from 10 place of first number) * 9 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 9 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 9 (from 100 place of first number) * 6 (from 10 place of second number) = 54 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 54000\n- 9 (from 100 place of first number) * 9 (from 100 place of second number) = 81 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 810000\n\nNow, add all these results together:\nThe sum of 0 + 180 + 2700 + 0 + 1200 + 18000 + 0 + 54000 + 810000 = 886080."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 238 * 784?"}, {"role": "assistant", "content": "Here are the steps for multiplying 238 * 784 using the long multiplication method.\nStep 1: Break first number 238 into its individual digits: 2 (hundreds place), 3 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 784 into its individual digits: 7 (hundreds place), 8 (tens place), and 4 (ones place).\n- 8 (from 1 place of first number) * 4 (from 1 place of second number) = 32 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 32\n- 8 (from 1 place of first number) * 8 (from 10 place of second number) = 64 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 640\n- 8 (from 1 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5600\n- 3 (from 10 place of first number) * 4 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 3 (from 10 place of first number) * 8 (from 10 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2400\n- 3 (from 10 place of first number) * 7 (from 100 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 21000\n- 2 (from 100 place of first number) * 4 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 2 (from 100 place of first number) * 8 (from 10 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 16000\n- 2 (from 100 place of first number) * 7 (from 100 place of second number) = 14 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 140000\n\nNow, add all these results together:\nThe sum of 32 + 640 + 5600 + 120 + 2400 + 21000 + 800 + 16000 + 140000 = 186592."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 435 * 928?"}, {"role": "assistant", "content": "Here are the steps for multiplying 435 * 928 using the long multiplication method.\nStep 1: Break first number 435 into its individual digits: 4 (hundreds place), 3 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 928 into its individual digits: 9 (hundreds place), 2 (tens place), and 8 (ones place).\n- 5 (from 1 place of first number) * 8 (from 1 place of second number) = 40 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 5 (from 1 place of first number) * 2 (from 10 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 5 (from 1 place of first number) * 9 (from 100 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4500\n- 3 (from 10 place of first number) * 8 (from 1 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 240\n- 3 (from 10 place of first number) * 2 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 3 (from 10 place of first number) * 9 (from 100 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 27000\n- 4 (from 100 place of first number) * 8 (from 1 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3200\n- 4 (from 100 place of first number) * 2 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 4 (from 100 place of first number) * 9 (from 100 place of second number) = 36 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 360000\n\nNow, add all these results together:\nThe sum of 40 + 100 + 4500 + 240 + 600 + 27000 + 3200 + 8000 + 360000 = 403680."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 103 * 613?"}, {"role": "assistant", "content": "Here are the steps for multiplying 103 * 613 using the long multiplication method.\nStep 1: Break first number 103 into its individual digits: 1 (hundreds place), 0 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 613 into its individual digits: 6 (hundreds place), 1 (tens place), and 3 (ones place).\n- 3 (from 1 place of first number) * 3 (from 1 place of second number) = 9 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 9\n- 3 (from 1 place of first number) * 1 (from 10 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 30\n- 3 (from 1 place of first number) * 6 (from 100 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1800\n- 0 (from 10 place of first number) * 3 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 1 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 6 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 1 (from 100 place of first number) * 3 (from 1 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 1 (from 100 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 1000\n- 1 (from 100 place of first number) * 6 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 9 + 30 + 1800 + 0 + 0 + 0 + 300 + 1000 + 60000 = 63139."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 512 * 518?"}, {"role": "assistant", "content": "Here are the steps for multiplying 512 * 518 using the long multiplication method.\nStep 1: Break first number 512 into its individual digits: 5 (hundreds place), 1 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 518 into its individual digits: 5 (hundreds place), 1 (tens place), and 8 (ones place).\n- 2 (from 1 place of first number) * 8 (from 1 place of second number) = 16 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 16\n- 2 (from 1 place of first number) * 1 (from 10 place of second number) = 2 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 20\n- 2 (from 1 place of first number) * 5 (from 100 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1000\n- 1 (from 10 place of first number) * 8 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 1 (from 10 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 1 (from 10 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 5000\n- 5 (from 100 place of first number) * 8 (from 1 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4000\n- 5 (from 100 place of first number) * 1 (from 10 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 5000\n- 5 (from 100 place of first number) * 5 (from 100 place of second number) = 25 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 250000\n\nNow, add all these results together:\nThe sum of 16 + 20 + 1000 + 80 + 100 + 5000 + 4000 + 5000 + 250000 = 265216."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 828 * 524?"}, {"role": "assistant", "content": "Here are the steps for multiplying 828 * 524 using the long multiplication method.\nStep 1: Break first number 828 into its individual digits: 8 (hundreds place), 2 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 524 into its individual digits: 5 (hundreds place), 2 (tens place), and 4 (ones place).\n- 8 (from 1 place of first number) * 4 (from 1 place of second number) = 32 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 32\n- 8 (from 1 place of first number) * 2 (from 10 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 160\n- 8 (from 1 place of first number) * 5 (from 100 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 2 (from 10 place of first number) * 4 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 2 (from 10 place of first number) * 2 (from 10 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 2 (from 10 place of first number) * 5 (from 100 place of second number) = 10 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 10000\n- 8 (from 100 place of first number) * 4 (from 1 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3200\n- 8 (from 100 place of first number) * 2 (from 10 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 16000\n- 8 (from 100 place of first number) * 5 (from 100 place of second number) = 40 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 400000\n\nNow, add all these results together:\nThe sum of 32 + 160 + 4000 + 80 + 400 + 10000 + 3200 + 16000 + 400000 = 433872."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 118 * 543?"}, {"role": "assistant", "content": "Here are the steps for multiplying 118 * 543 using the long multiplication method.\nStep 1: Break first number 118 into its individual digits: 1 (hundreds place), 1 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 543 into its individual digits: 5 (hundreds place), 4 (tens place), and 3 (ones place).\n- 8 (from 1 place of first number) * 3 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 8 (from 1 place of first number) * 4 (from 10 place of second number) = 32 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 320\n- 8 (from 1 place of first number) * 5 (from 100 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 1 (from 10 place of first number) * 3 (from 1 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 1 (from 10 place of first number) * 4 (from 10 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 1 (from 10 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 5000\n- 1 (from 100 place of first number) * 3 (from 1 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 1 (from 100 place of first number) * 4 (from 10 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 1 (from 100 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 50000\n\nNow, add all these results together:\nThe sum of 24 + 320 + 4000 + 30 + 400 + 5000 + 300 + 4000 + 50000 = 64074."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 185 * 240?"}, {"role": "assistant", "content": "Here are the steps for multiplying 185 * 240 using the long multiplication method.\nStep 1: Break first number 185 into its individual digits: 1 (hundreds place), 8 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 240 into its individual digits: 2 (hundreds place), 4 (tens place), and 0 (ones place).\n- 5 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 5 (from 1 place of first number) * 4 (from 10 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 200\n- 5 (from 1 place of first number) * 2 (from 100 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1000\n- 8 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 10 place of first number) * 4 (from 10 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3200\n- 8 (from 10 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 16000\n- 1 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 1 (from 100 place of first number) * 4 (from 10 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 1 (from 100 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n\nNow, add all these results together:\nThe sum of 0 + 200 + 1000 + 0 + 3200 + 16000 + 0 + 4000 + 20000 = 44400."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 453 * 364?"}, {"role": "assistant", "content": "Here are the steps for multiplying 453 * 364 using the long multiplication method.\nStep 1: Break first number 453 into its individual digits: 4 (hundreds place), 5 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 364 into its individual digits: 3 (hundreds place), 6 (tens place), and 4 (ones place).\n- 3 (from 1 place of first number) * 4 (from 1 place of second number) = 12 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 12\n- 3 (from 1 place of first number) * 6 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 3 (from 1 place of first number) * 3 (from 100 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 900\n- 5 (from 10 place of first number) * 4 (from 1 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 200\n- 5 (from 10 place of first number) * 6 (from 10 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 5 (from 10 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 15000\n- 4 (from 100 place of first number) * 4 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 4 (from 100 place of first number) * 6 (from 10 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 24000\n- 4 (from 100 place of first number) * 3 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 12 + 180 + 900 + 200 + 3000 + 15000 + 1600 + 24000 + 120000 = 164892."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 315 * 399?"}, {"role": "assistant", "content": "Here are the steps for multiplying 315 * 399 using the long multiplication method.\nStep 1: Break first number 315 into its individual digits: 3 (hundreds place), 1 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 399 into its individual digits: 3 (hundreds place), 9 (tens place), and 9 (ones place).\n- 5 (from 1 place of first number) * 9 (from 1 place of second number) = 45 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 45\n- 5 (from 1 place of first number) * 9 (from 10 place of second number) = 45 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 450\n- 5 (from 1 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1500\n- 1 (from 10 place of first number) * 9 (from 1 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 90\n- 1 (from 10 place of first number) * 9 (from 10 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 900\n- 1 (from 10 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 3 (from 100 place of first number) * 9 (from 1 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2700\n- 3 (from 100 place of first number) * 9 (from 10 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 27000\n- 3 (from 100 place of first number) * 3 (from 100 place of second number) = 9 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 90000\n\nNow, add all these results together:\nThe sum of 45 + 450 + 1500 + 90 + 900 + 3000 + 2700 + 27000 + 90000 = 125685."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 573 * 380?"}, {"role": "assistant", "content": "Here are the steps for multiplying 573 * 380 using the long multiplication method.\nStep 1: Break first number 573 into its individual digits: 5 (hundreds place), 7 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 380 into its individual digits: 3 (hundreds place), 8 (tens place), and 0 (ones place).\n- 3 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 3 (from 1 place of first number) * 8 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 3 (from 1 place of first number) * 3 (from 100 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 900\n- 7 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 10 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5600\n- 7 (from 10 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 21000\n- 5 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 5 (from 100 place of first number) * 8 (from 10 place of second number) = 40 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 40000\n- 5 (from 100 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 150000\n\nNow, add all these results together:\nThe sum of 0 + 240 + 900 + 0 + 5600 + 21000 + 0 + 40000 + 150000 = 217740."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 915 * 567?"}, {"role": "assistant", "content": "Here are the steps for multiplying 915 * 567 using the long multiplication method.\nStep 1: Break first number 915 into its individual digits: 9 (hundreds place), 1 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 567 into its individual digits: 5 (hundreds place), 6 (tens place), and 7 (ones place).\n- 5 (from 1 place of first number) * 7 (from 1 place of second number) = 35 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 35\n- 5 (from 1 place of first number) * 6 (from 10 place of second number) = 30 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 300\n- 5 (from 1 place of first number) * 5 (from 100 place of second number) = 25 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2500\n- 1 (from 10 place of first number) * 7 (from 1 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 70\n- 1 (from 10 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 1 (from 10 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 5000\n- 9 (from 100 place of first number) * 7 (from 1 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 6300\n- 9 (from 100 place of first number) * 6 (from 10 place of second number) = 54 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 54000\n- 9 (from 100 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 450000\n\nNow, add all these results together:\nThe sum of 35 + 300 + 2500 + 70 + 600 + 5000 + 6300 + 54000 + 450000 = 518805."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 650 * 628?"}, {"role": "assistant", "content": "Here are the steps for multiplying 650 * 628 using the long multiplication method.\nStep 1: Break first number 650 into its individual digits: 6 (hundreds place), 5 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 628 into its individual digits: 6 (hundreds place), 2 (tens place), and 8 (ones place).\n- 0 (from 1 place of first number) * 8 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 2 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 6 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 5 (from 10 place of first number) * 8 (from 1 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 5 (from 10 place of first number) * 2 (from 10 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1000\n- 5 (from 10 place of first number) * 6 (from 100 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n- 6 (from 100 place of first number) * 8 (from 1 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4800\n- 6 (from 100 place of first number) * 2 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 6 (from 100 place of first number) * 6 (from 100 place of second number) = 36 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 360000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 400 + 1000 + 30000 + 4800 + 12000 + 360000 = 408200."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 220 * 441?"}, {"role": "assistant", "content": "Here are the steps for multiplying 220 * 441 using the long multiplication method.\nStep 1: Break first number 220 into its individual digits: 2 (hundreds place), 2 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 441 into its individual digits: 4 (hundreds place), 4 (tens place), and 1 (ones place).\n- 0 (from 1 place of first number) * 1 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 4 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 4 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 2 (from 10 place of first number) * 1 (from 1 place of second number) = 2 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 2 (from 10 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 2 (from 10 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 2 (from 100 place of first number) * 1 (from 1 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 200\n- 2 (from 100 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 2 (from 100 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 20 + 800 + 8000 + 200 + 8000 + 80000 = 97020."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 390 * 442?"}, {"role": "assistant", "content": "Here are the steps for multiplying 390 * 442 using the long multiplication method.\nStep 1: Break first number 390 into its individual digits: 3 (hundreds place), 9 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 442 into its individual digits: 4 (hundreds place), 4 (tens place), and 2 (ones place).\n- 0 (from 1 place of first number) * 2 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 4 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 4 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 9 (from 10 place of first number) * 2 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 9 (from 10 place of first number) * 4 (from 10 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3600\n- 9 (from 10 place of first number) * 4 (from 100 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 36000\n- 3 (from 100 place of first number) * 2 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 3 (from 100 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 3 (from 100 place of first number) * 4 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 180 + 3600 + 36000 + 600 + 12000 + 120000 = 172380."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 891 * 786?"}, {"role": "assistant", "content": "Here are the steps for multiplying 891 * 786 using the long multiplication method.\nStep 1: Break first number 891 into its individual digits: 8 (hundreds place), 9 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 786 into its individual digits: 7 (hundreds place), 8 (tens place), and 6 (ones place).\n- 1 (from 1 place of first number) * 6 (from 1 place of second number) = 6 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 6\n- 1 (from 1 place of first number) * 8 (from 10 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 80\n- 1 (from 1 place of first number) * 7 (from 100 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 700\n- 9 (from 10 place of first number) * 6 (from 1 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 540\n- 9 (from 10 place of first number) * 8 (from 10 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 7200\n- 9 (from 10 place of first number) * 7 (from 100 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 63000\n- 8 (from 100 place of first number) * 6 (from 1 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4800\n- 8 (from 100 place of first number) * 8 (from 10 place of second number) = 64 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 64000\n- 8 (from 100 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 560000\n\nNow, add all these results together:\nThe sum of 6 + 80 + 700 + 540 + 7200 + 63000 + 4800 + 64000 + 560000 = 700326."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 862 * 378?"}, {"role": "assistant", "content": "Here are the steps for multiplying 862 * 378 using the long multiplication method.\nStep 1: Break first number 862 into its individual digits: 8 (hundreds place), 6 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 378 into its individual digits: 3 (hundreds place), 7 (tens place), and 8 (ones place).\n- 2 (from 1 place of first number) * 8 (from 1 place of second number) = 16 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 16\n- 2 (from 1 place of first number) * 7 (from 10 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 140\n- 2 (from 1 place of first number) * 3 (from 100 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 600\n- 6 (from 10 place of first number) * 8 (from 1 place of second number) = 48 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 480\n- 6 (from 10 place of first number) * 7 (from 10 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4200\n- 6 (from 10 place of first number) * 3 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 8 (from 100 place of first number) * 8 (from 1 place of second number) = 64 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 6400\n- 8 (from 100 place of first number) * 7 (from 10 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 56000\n- 8 (from 100 place of first number) * 3 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 16 + 140 + 600 + 480 + 4200 + 18000 + 6400 + 56000 + 240000 = 325836."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 425 * 222?"}, {"role": "assistant", "content": "Here are the steps for multiplying 425 * 222 using the long multiplication method.\nStep 1: Break first number 425 into its individual digits: 4 (hundreds place), 2 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 222 into its individual digits: 2 (hundreds place), 2 (tens place), and 2 (ones place).\n- 5 (from 1 place of first number) * 2 (from 1 place of second number) = 10 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 10\n- 5 (from 1 place of first number) * 2 (from 10 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 5 (from 1 place of first number) * 2 (from 100 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1000\n- 2 (from 10 place of first number) * 2 (from 1 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 2 (from 10 place of first number) * 2 (from 10 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 2 (from 10 place of first number) * 2 (from 100 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 4 (from 100 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 4 (from 100 place of first number) * 2 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 4 (from 100 place of first number) * 2 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 10 + 100 + 1000 + 40 + 400 + 4000 + 800 + 8000 + 80000 = 94350."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 763 * 470?"}, {"role": "assistant", "content": "Here are the steps for multiplying 763 * 470 using the long multiplication method.\nStep 1: Break first number 763 into its individual digits: 7 (hundreds place), 6 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 470 into its individual digits: 4 (hundreds place), 7 (tens place), and 0 (ones place).\n- 3 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 3 (from 1 place of first number) * 7 (from 10 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 210\n- 3 (from 1 place of first number) * 4 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 6 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 6 (from 10 place of first number) * 7 (from 10 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4200\n- 6 (from 10 place of first number) * 4 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 7 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 100 place of first number) * 7 (from 10 place of second number) = 49 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 49000\n- 7 (from 100 place of first number) * 4 (from 100 place of second number) = 28 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 280000\n\nNow, add all these results together:\nThe sum of 0 + 210 + 1200 + 0 + 4200 + 24000 + 0 + 49000 + 280000 = 358610."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 891 * 409?"}, {"role": "assistant", "content": "Here are the steps for multiplying 891 * 409 using the long multiplication method.\nStep 1: Break first number 891 into its individual digits: 8 (hundreds place), 9 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 409 into its individual digits: 4 (hundreds place), 0 (tens place), and 9 (ones place).\n- 1 (from 1 place of first number) * 9 (from 1 place of second number) = 9 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 9\n- 1 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 1 (from 1 place of first number) * 4 (from 100 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 400\n- 9 (from 10 place of first number) * 9 (from 1 place of second number) = 81 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 810\n- 9 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 9 (from 10 place of first number) * 4 (from 100 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 36000\n- 8 (from 100 place of first number) * 9 (from 1 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 7200\n- 8 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 8 (from 100 place of first number) * 4 (from 100 place of second number) = 32 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 320000\n\nNow, add all these results together:\nThe sum of 9 + 0 + 400 + 810 + 0 + 36000 + 7200 + 0 + 320000 = 364419."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 863 * 702?"}, {"role": "assistant", "content": "Here are the steps for multiplying 863 * 702 using the long multiplication method.\nStep 1: Break first number 863 into its individual digits: 8 (hundreds place), 6 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 702 into its individual digits: 7 (hundreds place), 0 (tens place), and 2 (ones place).\n- 3 (from 1 place of first number) * 2 (from 1 place of second number) = 6 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 6\n- 3 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 3 (from 1 place of first number) * 7 (from 100 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2100\n- 6 (from 10 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 6 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 6 (from 10 place of first number) * 7 (from 100 place of second number) = 42 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 42000\n- 8 (from 100 place of first number) * 2 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 8 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 8 (from 100 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 560000\n\nNow, add all these results together:\nThe sum of 6 + 0 + 2100 + 120 + 0 + 42000 + 1600 + 0 + 560000 = 605826."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 347 * 646?"}, {"role": "assistant", "content": "Here are the steps for multiplying 347 * 646 using the long multiplication method.\nStep 1: Break first number 347 into its individual digits: 3 (hundreds place), 4 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 646 into its individual digits: 6 (hundreds place), 4 (tens place), and 6 (ones place).\n- 7 (from 1 place of first number) * 6 (from 1 place of second number) = 42 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 42\n- 7 (from 1 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 280\n- 7 (from 1 place of first number) * 6 (from 100 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4200\n- 4 (from 10 place of first number) * 6 (from 1 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 240\n- 4 (from 10 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1600\n- 4 (from 10 place of first number) * 6 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 3 (from 100 place of first number) * 6 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 3 (from 100 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 3 (from 100 place of first number) * 6 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 42 + 280 + 4200 + 240 + 1600 + 24000 + 1800 + 12000 + 180000 = 224162."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 737 * 994?"}, {"role": "assistant", "content": "Here are the steps for multiplying 737 * 994 using the long multiplication method.\nStep 1: Break first number 737 into its individual digits: 7 (hundreds place), 3 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 994 into its individual digits: 9 (hundreds place), 9 (tens place), and 4 (ones place).\n- 7 (from 1 place of first number) * 4 (from 1 place of second number) = 28 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 28\n- 7 (from 1 place of first number) * 9 (from 10 place of second number) = 63 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 630\n- 7 (from 1 place of first number) * 9 (from 100 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 6300\n- 3 (from 10 place of first number) * 4 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 3 (from 10 place of first number) * 9 (from 10 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2700\n- 3 (from 10 place of first number) * 9 (from 100 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 27000\n- 7 (from 100 place of first number) * 4 (from 1 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2800\n- 7 (from 100 place of first number) * 9 (from 10 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 63000\n- 7 (from 100 place of first number) * 9 (from 100 place of second number) = 63 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 630000\n\nNow, add all these results together:\nThe sum of 28 + 630 + 6300 + 120 + 2700 + 27000 + 2800 + 63000 + 630000 = 732578."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 197 * 941?"}, {"role": "assistant", "content": "Here are the steps for multiplying 197 * 941 using the long multiplication method.\nStep 1: Break first number 197 into its individual digits: 1 (hundreds place), 9 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 941 into its individual digits: 9 (hundreds place), 4 (tens place), and 1 (ones place).\n- 7 (from 1 place of first number) * 1 (from 1 place of second number) = 7 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 7\n- 7 (from 1 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 280\n- 7 (from 1 place of first number) * 9 (from 100 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 6300\n- 9 (from 10 place of first number) * 1 (from 1 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 90\n- 9 (from 10 place of first number) * 4 (from 10 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3600\n- 9 (from 10 place of first number) * 9 (from 100 place of second number) = 81 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 81000\n- 1 (from 100 place of first number) * 1 (from 1 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 100\n- 1 (from 100 place of first number) * 4 (from 10 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 1 (from 100 place of first number) * 9 (from 100 place of second number) = 9 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 90000\n\nNow, add all these results together:\nThe sum of 7 + 280 + 6300 + 90 + 3600 + 81000 + 100 + 4000 + 90000 = 185377."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 961 * 130?"}, {"role": "assistant", "content": "Here are the steps for multiplying 961 * 130 using the long multiplication method.\nStep 1: Break first number 961 into its individual digits: 9 (hundreds place), 6 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 130 into its individual digits: 1 (hundreds place), 3 (tens place), and 0 (ones place).\n- 1 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 1 (from 1 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 30\n- 1 (from 1 place of first number) * 1 (from 100 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 100\n- 6 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 6 (from 10 place of first number) * 3 (from 10 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1800\n- 6 (from 10 place of first number) * 1 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 9 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 9 (from 100 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 27000\n- 9 (from 100 place of first number) * 1 (from 100 place of second number) = 9 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 90000\n\nNow, add all these results together:\nThe sum of 0 + 30 + 100 + 0 + 1800 + 6000 + 0 + 27000 + 90000 = 124930."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 608 * 386?"}, {"role": "assistant", "content": "Here are the steps for multiplying 608 * 386 using the long multiplication method.\nStep 1: Break first number 608 into its individual digits: 6 (hundreds place), 0 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 386 into its individual digits: 3 (hundreds place), 8 (tens place), and 6 (ones place).\n- 8 (from 1 place of first number) * 6 (from 1 place of second number) = 48 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 48\n- 8 (from 1 place of first number) * 8 (from 10 place of second number) = 64 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 640\n- 8 (from 1 place of first number) * 3 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 0 (from 10 place of first number) * 6 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 8 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 3 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 6 (from 100 place of first number) * 6 (from 1 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3600\n- 6 (from 100 place of first number) * 8 (from 10 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 48000\n- 6 (from 100 place of first number) * 3 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 48 + 640 + 2400 + 0 + 0 + 0 + 3600 + 48000 + 180000 = 234688."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 924 * 276?"}, {"role": "assistant", "content": "Here are the steps for multiplying 924 * 276 using the long multiplication method.\nStep 1: Break first number 924 into its individual digits: 9 (hundreds place), 2 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 276 into its individual digits: 2 (hundreds place), 7 (tens place), and 6 (ones place).\n- 4 (from 1 place of first number) * 6 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 4 (from 1 place of first number) * 7 (from 10 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 280\n- 4 (from 1 place of first number) * 2 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 2 (from 10 place of first number) * 6 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 2 (from 10 place of first number) * 7 (from 10 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1400\n- 2 (from 10 place of first number) * 2 (from 100 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 9 (from 100 place of first number) * 6 (from 1 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 5400\n- 9 (from 100 place of first number) * 7 (from 10 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 63000\n- 9 (from 100 place of first number) * 2 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 24 + 280 + 800 + 120 + 1400 + 4000 + 5400 + 63000 + 180000 = 255024."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 802 * 562?"}, {"role": "assistant", "content": "Here are the steps for multiplying 802 * 562 using the long multiplication method.\nStep 1: Break first number 802 into its individual digits: 8 (hundreds place), 0 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 562 into its individual digits: 5 (hundreds place), 6 (tens place), and 2 (ones place).\n- 2 (from 1 place of first number) * 2 (from 1 place of second number) = 4 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 4\n- 2 (from 1 place of first number) * 6 (from 10 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 120\n- 2 (from 1 place of first number) * 5 (from 100 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1000\n- 0 (from 10 place of first number) * 2 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 6 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 5 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 8 (from 100 place of first number) * 2 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 8 (from 100 place of first number) * 6 (from 10 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 48000\n- 8 (from 100 place of first number) * 5 (from 100 place of second number) = 40 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 400000\n\nNow, add all these results together:\nThe sum of 4 + 120 + 1000 + 0 + 0 + 0 + 1600 + 48000 + 400000 = 450724."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 497 * 203?"}, {"role": "assistant", "content": "Here are the steps for multiplying 497 * 203 using the long multiplication method.\nStep 1: Break first number 497 into its individual digits: 4 (hundreds place), 9 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 203 into its individual digits: 2 (hundreds place), 0 (tens place), and 3 (ones place).\n- 7 (from 1 place of first number) * 3 (from 1 place of second number) = 21 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 21\n- 7 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 7 (from 1 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1400\n- 9 (from 10 place of first number) * 3 (from 1 place of second number) = 27 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 270\n- 9 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 9 (from 10 place of first number) * 2 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 4 (from 100 place of first number) * 3 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 4 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 4 (from 100 place of first number) * 2 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 21 + 0 + 1400 + 270 + 0 + 18000 + 1200 + 0 + 80000 = 100891."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 667 * 572?"}, {"role": "assistant", "content": "Here are the steps for multiplying 667 * 572 using the long multiplication method.\nStep 1: Break first number 667 into its individual digits: 6 (hundreds place), 6 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 572 into its individual digits: 5 (hundreds place), 7 (tens place), and 2 (ones place).\n- 7 (from 1 place of first number) * 2 (from 1 place of second number) = 14 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 14\n- 7 (from 1 place of first number) * 7 (from 10 place of second number) = 49 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 490\n- 7 (from 1 place of first number) * 5 (from 100 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3500\n- 6 (from 10 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 6 (from 10 place of first number) * 7 (from 10 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4200\n- 6 (from 10 place of first number) * 5 (from 100 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n- 6 (from 100 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 6 (from 100 place of first number) * 7 (from 10 place of second number) = 42 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 42000\n- 6 (from 100 place of first number) * 5 (from 100 place of second number) = 30 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 300000\n\nNow, add all these results together:\nThe sum of 14 + 490 + 3500 + 120 + 4200 + 30000 + 1200 + 42000 + 300000 = 381524."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 253 * 489?"}, {"role": "assistant", "content": "Here are the steps for multiplying 253 * 489 using the long multiplication method.\nStep 1: Break first number 253 into its individual digits: 2 (hundreds place), 5 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 489 into its individual digits: 4 (hundreds place), 8 (tens place), and 9 (ones place).\n- 3 (from 1 place of first number) * 9 (from 1 place of second number) = 27 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 27\n- 3 (from 1 place of first number) * 8 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 3 (from 1 place of first number) * 4 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 5 (from 10 place of first number) * 9 (from 1 place of second number) = 45 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 450\n- 5 (from 10 place of first number) * 8 (from 10 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 5 (from 10 place of first number) * 4 (from 100 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n- 2 (from 100 place of first number) * 9 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 2 (from 100 place of first number) * 8 (from 10 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 16000\n- 2 (from 100 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 27 + 240 + 1200 + 450 + 4000 + 20000 + 1800 + 16000 + 80000 = 123717."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 778 * 590?"}, {"role": "assistant", "content": "Here are the steps for multiplying 778 * 590 using the long multiplication method.\nStep 1: Break first number 778 into its individual digits: 7 (hundreds place), 7 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 590 into its individual digits: 5 (hundreds place), 9 (tens place), and 0 (ones place).\n- 8 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 1 place of first number) * 9 (from 10 place of second number) = 72 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 720\n- 8 (from 1 place of first number) * 5 (from 100 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 7 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 10 place of first number) * 9 (from 10 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 6300\n- 7 (from 10 place of first number) * 5 (from 100 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 35000\n- 7 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 100 place of first number) * 9 (from 10 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 63000\n- 7 (from 100 place of first number) * 5 (from 100 place of second number) = 35 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 350000\n\nNow, add all these results together:\nThe sum of 0 + 720 + 4000 + 0 + 6300 + 35000 + 0 + 63000 + 350000 = 459020."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 322 * 785?"}, {"role": "assistant", "content": "Here are the steps for multiplying 322 * 785 using the long multiplication method.\nStep 1: Break first number 322 into its individual digits: 3 (hundreds place), 2 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 785 into its individual digits: 7 (hundreds place), 8 (tens place), and 5 (ones place).\n- 2 (from 1 place of first number) * 5 (from 1 place of second number) = 10 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 10\n- 2 (from 1 place of first number) * 8 (from 10 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 160\n- 2 (from 1 place of first number) * 7 (from 100 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1400\n- 2 (from 10 place of first number) * 5 (from 1 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 100\n- 2 (from 10 place of first number) * 8 (from 10 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1600\n- 2 (from 10 place of first number) * 7 (from 100 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 14000\n- 3 (from 100 place of first number) * 5 (from 1 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1500\n- 3 (from 100 place of first number) * 8 (from 10 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 24000\n- 3 (from 100 place of first number) * 7 (from 100 place of second number) = 21 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 210000\n\nNow, add all these results together:\nThe sum of 10 + 160 + 1400 + 100 + 1600 + 14000 + 1500 + 24000 + 210000 = 252770."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 544 * 312?"}, {"role": "assistant", "content": "Here are the steps for multiplying 544 * 312 using the long multiplication method.\nStep 1: Break first number 544 into its individual digits: 5 (hundreds place), 4 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 312 into its individual digits: 3 (hundreds place), 1 (tens place), and 2 (ones place).\n- 4 (from 1 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 4 (from 1 place of first number) * 1 (from 10 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 40\n- 4 (from 1 place of first number) * 3 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 4 (from 10 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 4 (from 10 place of first number) * 1 (from 10 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 4 (from 10 place of first number) * 3 (from 100 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 12000\n- 5 (from 100 place of first number) * 2 (from 1 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1000\n- 5 (from 100 place of first number) * 1 (from 10 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 5000\n- 5 (from 100 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 150000\n\nNow, add all these results together:\nThe sum of 8 + 40 + 1200 + 80 + 400 + 12000 + 1000 + 5000 + 150000 = 169728."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 133 * 212?"}, {"role": "assistant", "content": "Here are the steps for multiplying 133 * 212 using the long multiplication method.\nStep 1: Break first number 133 into its individual digits: 1 (hundreds place), 3 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 212 into its individual digits: 2 (hundreds place), 1 (tens place), and 2 (ones place).\n- 3 (from 1 place of first number) * 2 (from 1 place of second number) = 6 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 6\n- 3 (from 1 place of first number) * 1 (from 10 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 30\n- 3 (from 1 place of first number) * 2 (from 100 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 600\n- 3 (from 10 place of first number) * 2 (from 1 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 60\n- 3 (from 10 place of first number) * 1 (from 10 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 300\n- 3 (from 10 place of first number) * 2 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 1 (from 100 place of first number) * 2 (from 1 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 200\n- 1 (from 100 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 1000\n- 1 (from 100 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n\nNow, add all these results together:\nThe sum of 6 + 30 + 600 + 60 + 300 + 6000 + 200 + 1000 + 20000 = 28196."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 619 * 911?"}, {"role": "assistant", "content": "Here are the steps for multiplying 619 * 911 using the long multiplication method.\nStep 1: Break first number 619 into its individual digits: 6 (hundreds place), 1 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 911 into its individual digits: 9 (hundreds place), 1 (tens place), and 1 (ones place).\n- 9 (from 1 place of first number) * 1 (from 1 place of second number) = 9 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 9\n- 9 (from 1 place of first number) * 1 (from 10 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 90\n- 9 (from 1 place of first number) * 9 (from 100 place of second number) = 81 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 8100\n- 1 (from 10 place of first number) * 1 (from 1 place of second number) = 1 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 10\n- 1 (from 10 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 1 (from 10 place of first number) * 9 (from 100 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 9000\n- 6 (from 100 place of first number) * 1 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 6 (from 100 place of first number) * 1 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 6 (from 100 place of first number) * 9 (from 100 place of second number) = 54 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 540000\n\nNow, add all these results together:\nThe sum of 9 + 90 + 8100 + 10 + 100 + 9000 + 600 + 6000 + 540000 = 563909."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 877 * 121?"}, {"role": "assistant", "content": "Here are the steps for multiplying 877 * 121 using the long multiplication method.\nStep 1: Break first number 877 into its individual digits: 8 (hundreds place), 7 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 121 into its individual digits: 1 (hundreds place), 2 (tens place), and 1 (ones place).\n- 7 (from 1 place of first number) * 1 (from 1 place of second number) = 7 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 7\n- 7 (from 1 place of first number) * 2 (from 10 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 140\n- 7 (from 1 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 700\n- 7 (from 10 place of first number) * 1 (from 1 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 70\n- 7 (from 10 place of first number) * 2 (from 10 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1400\n- 7 (from 10 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 7000\n- 8 (from 100 place of first number) * 1 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 8 (from 100 place of first number) * 2 (from 10 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 16000\n- 8 (from 100 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 7 + 140 + 700 + 70 + 1400 + 7000 + 800 + 16000 + 80000 = 106117."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 545 * 936?"}, {"role": "assistant", "content": "Here are the steps for multiplying 545 * 936 using the long multiplication method.\nStep 1: Break first number 545 into its individual digits: 5 (hundreds place), 4 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 936 into its individual digits: 9 (hundreds place), 3 (tens place), and 6 (ones place).\n- 5 (from 1 place of first number) * 6 (from 1 place of second number) = 30 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 5 (from 1 place of first number) * 3 (from 10 place of second number) = 15 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 150\n- 5 (from 1 place of first number) * 9 (from 100 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4500\n- 4 (from 10 place of first number) * 6 (from 1 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 240\n- 4 (from 10 place of first number) * 3 (from 10 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1200\n- 4 (from 10 place of first number) * 9 (from 100 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 36000\n- 5 (from 100 place of first number) * 6 (from 1 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3000\n- 5 (from 100 place of first number) * 3 (from 10 place of second number) = 15 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 15000\n- 5 (from 100 place of first number) * 9 (from 100 place of second number) = 45 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 450000\n\nNow, add all these results together:\nThe sum of 30 + 150 + 4500 + 240 + 1200 + 36000 + 3000 + 15000 + 450000 = 510120."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 872 * 159?"}, {"role": "assistant", "content": "Here are the steps for multiplying 872 * 159 using the long multiplication method.\nStep 1: Break first number 872 into its individual digits: 8 (hundreds place), 7 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 159 into its individual digits: 1 (hundreds place), 5 (tens place), and 9 (ones place).\n- 2 (from 1 place of first number) * 9 (from 1 place of second number) = 18 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 18\n- 2 (from 1 place of first number) * 5 (from 10 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 2 (from 1 place of first number) * 1 (from 100 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 200\n- 7 (from 10 place of first number) * 9 (from 1 place of second number) = 63 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 630\n- 7 (from 10 place of first number) * 5 (from 10 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3500\n- 7 (from 10 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 7000\n- 8 (from 100 place of first number) * 9 (from 1 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 7200\n- 8 (from 100 place of first number) * 5 (from 10 place of second number) = 40 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 40000\n- 8 (from 100 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 18 + 100 + 200 + 630 + 3500 + 7000 + 7200 + 40000 + 80000 = 138648."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 460 * 549?"}, {"role": "assistant", "content": "Here are the steps for multiplying 460 * 549 using the long multiplication method.\nStep 1: Break first number 460 into its individual digits: 4 (hundreds place), 6 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 549 into its individual digits: 5 (hundreds place), 4 (tens place), and 9 (ones place).\n- 0 (from 1 place of first number) * 9 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 4 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 5 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 6 (from 10 place of first number) * 9 (from 1 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 540\n- 6 (from 10 place of first number) * 4 (from 10 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2400\n- 6 (from 10 place of first number) * 5 (from 100 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n- 4 (from 100 place of first number) * 9 (from 1 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3600\n- 4 (from 100 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 16000\n- 4 (from 100 place of first number) * 5 (from 100 place of second number) = 20 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 200000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 540 + 2400 + 30000 + 3600 + 16000 + 200000 = 252540."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 299 * 893?"}, {"role": "assistant", "content": "Here are the steps for multiplying 299 * 893 using the long multiplication method.\nStep 1: Break first number 299 into its individual digits: 2 (hundreds place), 9 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 893 into its individual digits: 8 (hundreds place), 9 (tens place), and 3 (ones place).\n- 9 (from 1 place of first number) * 3 (from 1 place of second number) = 27 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 27\n- 9 (from 1 place of first number) * 9 (from 10 place of second number) = 81 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 810\n- 9 (from 1 place of first number) * 8 (from 100 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 7200\n- 9 (from 10 place of first number) * 3 (from 1 place of second number) = 27 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 270\n- 9 (from 10 place of first number) * 9 (from 10 place of second number) = 81 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 8100\n- 9 (from 10 place of first number) * 8 (from 100 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 72000\n- 2 (from 100 place of first number) * 3 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 2 (from 100 place of first number) * 9 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 2 (from 100 place of first number) * 8 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 27 + 810 + 7200 + 270 + 8100 + 72000 + 600 + 18000 + 160000 = 267007."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 307 * 767?"}, {"role": "assistant", "content": "Here are the steps for multiplying 307 * 767 using the long multiplication method.\nStep 1: Break first number 307 into its individual digits: 3 (hundreds place), 0 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 767 into its individual digits: 7 (hundreds place), 6 (tens place), and 7 (ones place).\n- 7 (from 1 place of first number) * 7 (from 1 place of second number) = 49 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 49\n- 7 (from 1 place of first number) * 6 (from 10 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 420\n- 7 (from 1 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4900\n- 0 (from 10 place of first number) * 7 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 6 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 7 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 3 (from 100 place of first number) * 7 (from 1 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2100\n- 3 (from 100 place of first number) * 6 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 3 (from 100 place of first number) * 7 (from 100 place of second number) = 21 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 210000\n\nNow, add all these results together:\nThe sum of 49 + 420 + 4900 + 0 + 0 + 0 + 2100 + 18000 + 210000 = 235469."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 832 * 577?"}, {"role": "assistant", "content": "Here are the steps for multiplying 832 * 577 using the long multiplication method.\nStep 1: Break first number 832 into its individual digits: 8 (hundreds place), 3 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 577 into its individual digits: 5 (hundreds place), 7 (tens place), and 7 (ones place).\n- 2 (from 1 place of first number) * 7 (from 1 place of second number) = 14 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 14\n- 2 (from 1 place of first number) * 7 (from 10 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 140\n- 2 (from 1 place of first number) * 5 (from 100 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1000\n- 3 (from 10 place of first number) * 7 (from 1 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 210\n- 3 (from 10 place of first number) * 7 (from 10 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2100\n- 3 (from 10 place of first number) * 5 (from 100 place of second number) = 15 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 15000\n- 8 (from 100 place of first number) * 7 (from 1 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 5600\n- 8 (from 100 place of first number) * 7 (from 10 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 56000\n- 8 (from 100 place of first number) * 5 (from 100 place of second number) = 40 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 400000\n\nNow, add all these results together:\nThe sum of 14 + 140 + 1000 + 210 + 2100 + 15000 + 5600 + 56000 + 400000 = 480064."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 718 * 214?"}, {"role": "assistant", "content": "Here are the steps for multiplying 718 * 214 using the long multiplication method.\nStep 1: Break first number 718 into its individual digits: 7 (hundreds place), 1 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 214 into its individual digits: 2 (hundreds place), 1 (tens place), and 4 (ones place).\n- 8 (from 1 place of first number) * 4 (from 1 place of second number) = 32 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 32\n- 8 (from 1 place of first number) * 1 (from 10 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 80\n- 8 (from 1 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 1 (from 10 place of first number) * 4 (from 1 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 1 (from 10 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 1 (from 10 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 7 (from 100 place of first number) * 4 (from 1 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2800\n- 7 (from 100 place of first number) * 1 (from 10 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 7000\n- 7 (from 100 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 140000\n\nNow, add all these results together:\nThe sum of 32 + 80 + 1600 + 40 + 100 + 2000 + 2800 + 7000 + 140000 = 153652."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 554 * 372?"}, {"role": "assistant", "content": "Here are the steps for multiplying 554 * 372 using the long multiplication method.\nStep 1: Break first number 554 into its individual digits: 5 (hundreds place), 5 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 372 into its individual digits: 3 (hundreds place), 7 (tens place), and 2 (ones place).\n- 4 (from 1 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 4 (from 1 place of first number) * 7 (from 10 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 280\n- 4 (from 1 place of first number) * 3 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 5 (from 10 place of first number) * 2 (from 1 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 100\n- 5 (from 10 place of first number) * 7 (from 10 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3500\n- 5 (from 10 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 15000\n- 5 (from 100 place of first number) * 2 (from 1 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1000\n- 5 (from 100 place of first number) * 7 (from 10 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 35000\n- 5 (from 100 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 150000\n\nNow, add all these results together:\nThe sum of 8 + 280 + 1200 + 100 + 3500 + 15000 + 1000 + 35000 + 150000 = 206088."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 720 * 474?"}, {"role": "assistant", "content": "Here are the steps for multiplying 720 * 474 using the long multiplication method.\nStep 1: Break first number 720 into its individual digits: 7 (hundreds place), 2 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 474 into its individual digits: 4 (hundreds place), 7 (tens place), and 4 (ones place).\n- 0 (from 1 place of first number) * 4 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 7 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 4 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 2 (from 10 place of first number) * 4 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 2 (from 10 place of first number) * 7 (from 10 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1400\n- 2 (from 10 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 7 (from 100 place of first number) * 4 (from 1 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2800\n- 7 (from 100 place of first number) * 7 (from 10 place of second number) = 49 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 49000\n- 7 (from 100 place of first number) * 4 (from 100 place of second number) = 28 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 280000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 80 + 1400 + 8000 + 2800 + 49000 + 280000 = 341280."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 444 * 644?"}, {"role": "assistant", "content": "Here are the steps for multiplying 444 * 644 using the long multiplication method.\nStep 1: Break first number 444 into its individual digits: 4 (hundreds place), 4 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 644 into its individual digits: 6 (hundreds place), 4 (tens place), and 4 (ones place).\n- 4 (from 1 place of first number) * 4 (from 1 place of second number) = 16 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 16\n- 4 (from 1 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 160\n- 4 (from 1 place of first number) * 6 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 4 (from 10 place of first number) * 4 (from 1 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 160\n- 4 (from 10 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1600\n- 4 (from 10 place of first number) * 6 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 4 (from 100 place of first number) * 4 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 4 (from 100 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 16000\n- 4 (from 100 place of first number) * 6 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 16 + 160 + 2400 + 160 + 1600 + 24000 + 1600 + 16000 + 240000 = 285936."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 274 * 387?"}, {"role": "assistant", "content": "Here are the steps for multiplying 274 * 387 using the long multiplication method.\nStep 1: Break first number 274 into its individual digits: 2 (hundreds place), 7 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 387 into its individual digits: 3 (hundreds place), 8 (tens place), and 7 (ones place).\n- 4 (from 1 place of first number) * 7 (from 1 place of second number) = 28 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 28\n- 4 (from 1 place of first number) * 8 (from 10 place of second number) = 32 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 320\n- 4 (from 1 place of first number) * 3 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 7 (from 10 place of first number) * 7 (from 1 place of second number) = 49 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 490\n- 7 (from 10 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5600\n- 7 (from 10 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 21000\n- 2 (from 100 place of first number) * 7 (from 1 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1400\n- 2 (from 100 place of first number) * 8 (from 10 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 16000\n- 2 (from 100 place of first number) * 3 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 28 + 320 + 1200 + 490 + 5600 + 21000 + 1400 + 16000 + 60000 = 106038."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 980 * 130?"}, {"role": "assistant", "content": "Here are the steps for multiplying 980 * 130 using the long multiplication method.\nStep 1: Break first number 980 into its individual digits: 9 (hundreds place), 8 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 130 into its individual digits: 1 (hundreds place), 3 (tens place), and 0 (ones place).\n- 0 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 3 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 1 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 8 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 10 place of first number) * 3 (from 10 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2400\n- 8 (from 10 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 9 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 9 (from 100 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 27000\n- 9 (from 100 place of first number) * 1 (from 100 place of second number) = 9 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 90000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 0 + 2400 + 8000 + 0 + 27000 + 90000 = 127400."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 525 * 586?"}, {"role": "assistant", "content": "Here are the steps for multiplying 525 * 586 using the long multiplication method.\nStep 1: Break first number 525 into its individual digits: 5 (hundreds place), 2 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 586 into its individual digits: 5 (hundreds place), 8 (tens place), and 6 (ones place).\n- 5 (from 1 place of first number) * 6 (from 1 place of second number) = 30 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 5 (from 1 place of first number) * 8 (from 10 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 5 (from 1 place of first number) * 5 (from 100 place of second number) = 25 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2500\n- 2 (from 10 place of first number) * 6 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 2 (from 10 place of first number) * 8 (from 10 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1600\n- 2 (from 10 place of first number) * 5 (from 100 place of second number) = 10 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 10000\n- 5 (from 100 place of first number) * 6 (from 1 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3000\n- 5 (from 100 place of first number) * 8 (from 10 place of second number) = 40 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 40000\n- 5 (from 100 place of first number) * 5 (from 100 place of second number) = 25 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 250000\n\nNow, add all these results together:\nThe sum of 30 + 400 + 2500 + 120 + 1600 + 10000 + 3000 + 40000 + 250000 = 307650."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 963 * 569?"}, {"role": "assistant", "content": "Here are the steps for multiplying 963 * 569 using the long multiplication method.\nStep 1: Break first number 963 into its individual digits: 9 (hundreds place), 6 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 569 into its individual digits: 5 (hundreds place), 6 (tens place), and 9 (ones place).\n- 3 (from 1 place of first number) * 9 (from 1 place of second number) = 27 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 27\n- 3 (from 1 place of first number) * 6 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 3 (from 1 place of first number) * 5 (from 100 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1500\n- 6 (from 10 place of first number) * 9 (from 1 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 540\n- 6 (from 10 place of first number) * 6 (from 10 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3600\n- 6 (from 10 place of first number) * 5 (from 100 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n- 9 (from 100 place of first number) * 9 (from 1 place of second number) = 81 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 8100\n- 9 (from 100 place of first number) * 6 (from 10 place of second number) = 54 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 54000\n- 9 (from 100 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 450000\n\nNow, add all these results together:\nThe sum of 27 + 180 + 1500 + 540 + 3600 + 30000 + 8100 + 54000 + 450000 = 547947."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 878 * 780?"}, {"role": "assistant", "content": "Here are the steps for multiplying 878 * 780 using the long multiplication method.\nStep 1: Break first number 878 into its individual digits: 8 (hundreds place), 7 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 780 into its individual digits: 7 (hundreds place), 8 (tens place), and 0 (ones place).\n- 8 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 1 place of first number) * 8 (from 10 place of second number) = 64 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 640\n- 8 (from 1 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5600\n- 7 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 10 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5600\n- 7 (from 10 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 49000\n- 8 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 100 place of first number) * 8 (from 10 place of second number) = 64 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 64000\n- 8 (from 100 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 560000\n\nNow, add all these results together:\nThe sum of 0 + 640 + 5600 + 0 + 5600 + 49000 + 0 + 64000 + 560000 = 684840."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 185 * 177?"}, {"role": "assistant", "content": "Here are the steps for multiplying 185 * 177 using the long multiplication method.\nStep 1: Break first number 185 into its individual digits: 1 (hundreds place), 8 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 177 into its individual digits: 1 (hundreds place), 7 (tens place), and 7 (ones place).\n- 5 (from 1 place of first number) * 7 (from 1 place of second number) = 35 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 35\n- 5 (from 1 place of first number) * 7 (from 10 place of second number) = 35 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 350\n- 5 (from 1 place of first number) * 1 (from 100 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 500\n- 8 (from 10 place of first number) * 7 (from 1 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 560\n- 8 (from 10 place of first number) * 7 (from 10 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5600\n- 8 (from 10 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 1 (from 100 place of first number) * 7 (from 1 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 700\n- 1 (from 100 place of first number) * 7 (from 10 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 7000\n- 1 (from 100 place of first number) * 1 (from 100 place of second number) = 1 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 10000\n\nNow, add all these results together:\nThe sum of 35 + 350 + 500 + 560 + 5600 + 8000 + 700 + 7000 + 10000 = 32745."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 480 * 344?"}, {"role": "assistant", "content": "Here are the steps for multiplying 480 * 344 using the long multiplication method.\nStep 1: Break first number 480 into its individual digits: 4 (hundreds place), 8 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 344 into its individual digits: 3 (hundreds place), 4 (tens place), and 4 (ones place).\n- 0 (from 1 place of first number) * 4 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 4 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 3 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 8 (from 10 place of first number) * 4 (from 1 place of second number) = 32 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 320\n- 8 (from 10 place of first number) * 4 (from 10 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3200\n- 8 (from 10 place of first number) * 3 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 4 (from 100 place of first number) * 4 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 4 (from 100 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 16000\n- 4 (from 100 place of first number) * 3 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 320 + 3200 + 24000 + 1600 + 16000 + 120000 = 165120."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 248 * 714?"}, {"role": "assistant", "content": "Here are the steps for multiplying 248 * 714 using the long multiplication method.\nStep 1: Break first number 248 into its individual digits: 2 (hundreds place), 4 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 714 into its individual digits: 7 (hundreds place), 1 (tens place), and 4 (ones place).\n- 8 (from 1 place of first number) * 4 (from 1 place of second number) = 32 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 32\n- 8 (from 1 place of first number) * 1 (from 10 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 80\n- 8 (from 1 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5600\n- 4 (from 10 place of first number) * 4 (from 1 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 160\n- 4 (from 10 place of first number) * 1 (from 10 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 4 (from 10 place of first number) * 7 (from 100 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 28000\n- 2 (from 100 place of first number) * 4 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 2 (from 100 place of first number) * 1 (from 10 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 2 (from 100 place of first number) * 7 (from 100 place of second number) = 14 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 140000\n\nNow, add all these results together:\nThe sum of 32 + 80 + 5600 + 160 + 400 + 28000 + 800 + 2000 + 140000 = 177072."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 865 * 209?"}, {"role": "assistant", "content": "Here are the steps for multiplying 865 * 209 using the long multiplication method.\nStep 1: Break first number 865 into its individual digits: 8 (hundreds place), 6 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 209 into its individual digits: 2 (hundreds place), 0 (tens place), and 9 (ones place).\n- 5 (from 1 place of first number) * 9 (from 1 place of second number) = 45 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 45\n- 5 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 5 (from 1 place of first number) * 2 (from 100 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1000\n- 6 (from 10 place of first number) * 9 (from 1 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 540\n- 6 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 6 (from 10 place of first number) * 2 (from 100 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 12000\n- 8 (from 100 place of first number) * 9 (from 1 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 7200\n- 8 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 8 (from 100 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 45 + 0 + 1000 + 540 + 0 + 12000 + 7200 + 0 + 160000 = 180785."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 781 * 562?"}, {"role": "assistant", "content": "Here are the steps for multiplying 781 * 562 using the long multiplication method.\nStep 1: Break first number 781 into its individual digits: 7 (hundreds place), 8 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 562 into its individual digits: 5 (hundreds place), 6 (tens place), and 2 (ones place).\n- 1 (from 1 place of first number) * 2 (from 1 place of second number) = 2 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 2\n- 1 (from 1 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 60\n- 1 (from 1 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 500\n- 8 (from 10 place of first number) * 2 (from 1 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 160\n- 8 (from 10 place of first number) * 6 (from 10 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4800\n- 8 (from 10 place of first number) * 5 (from 100 place of second number) = 40 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n- 7 (from 100 place of first number) * 2 (from 1 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1400\n- 7 (from 100 place of first number) * 6 (from 10 place of second number) = 42 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 42000\n- 7 (from 100 place of first number) * 5 (from 100 place of second number) = 35 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 350000\n\nNow, add all these results together:\nThe sum of 2 + 60 + 500 + 160 + 4800 + 40000 + 1400 + 42000 + 350000 = 438922."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 609 * 649?"}, {"role": "assistant", "content": "Here are the steps for multiplying 609 * 649 using the long multiplication method.\nStep 1: Break first number 609 into its individual digits: 6 (hundreds place), 0 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 649 into its individual digits: 6 (hundreds place), 4 (tens place), and 9 (ones place).\n- 9 (from 1 place of first number) * 9 (from 1 place of second number) = 81 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 81\n- 9 (from 1 place of first number) * 4 (from 10 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 360\n- 9 (from 1 place of first number) * 6 (from 100 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5400\n- 0 (from 10 place of first number) * 9 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 4 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 6 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 6 (from 100 place of first number) * 9 (from 1 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 5400\n- 6 (from 100 place of first number) * 4 (from 10 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 24000\n- 6 (from 100 place of first number) * 6 (from 100 place of second number) = 36 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 360000\n\nNow, add all these results together:\nThe sum of 81 + 360 + 5400 + 0 + 0 + 0 + 5400 + 24000 + 360000 = 395241."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 509 * 218?"}, {"role": "assistant", "content": "Here are the steps for multiplying 509 * 218 using the long multiplication method.\nStep 1: Break first number 509 into its individual digits: 5 (hundreds place), 0 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 218 into its individual digits: 2 (hundreds place), 1 (tens place), and 8 (ones place).\n- 9 (from 1 place of first number) * 8 (from 1 place of second number) = 72 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 72\n- 9 (from 1 place of first number) * 1 (from 10 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 90\n- 9 (from 1 place of first number) * 2 (from 100 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1800\n- 0 (from 10 place of first number) * 8 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 1 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 2 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 5 (from 100 place of first number) * 8 (from 1 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4000\n- 5 (from 100 place of first number) * 1 (from 10 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 5000\n- 5 (from 100 place of first number) * 2 (from 100 place of second number) = 10 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 100000\n\nNow, add all these results together:\nThe sum of 72 + 90 + 1800 + 0 + 0 + 0 + 4000 + 5000 + 100000 = 110962."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 419 * 135?"}, {"role": "assistant", "content": "Here are the steps for multiplying 419 * 135 using the long multiplication method.\nStep 1: Break first number 419 into its individual digits: 4 (hundreds place), 1 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 135 into its individual digits: 1 (hundreds place), 3 (tens place), and 5 (ones place).\n- 9 (from 1 place of first number) * 5 (from 1 place of second number) = 45 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 45\n- 9 (from 1 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 270\n- 9 (from 1 place of first number) * 1 (from 100 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 900\n- 1 (from 10 place of first number) * 5 (from 1 place of second number) = 5 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 50\n- 1 (from 10 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 300\n- 1 (from 10 place of first number) * 1 (from 100 place of second number) = 1 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 1000\n- 4 (from 100 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2000\n- 4 (from 100 place of first number) * 3 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 4 (from 100 place of first number) * 1 (from 100 place of second number) = 4 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n\nNow, add all these results together:\nThe sum of 45 + 270 + 900 + 50 + 300 + 1000 + 2000 + 12000 + 40000 = 56565."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 899 * 527?"}, {"role": "assistant", "content": "Here are the steps for multiplying 899 * 527 using the long multiplication method.\nStep 1: Break first number 899 into its individual digits: 8 (hundreds place), 9 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 527 into its individual digits: 5 (hundreds place), 2 (tens place), and 7 (ones place).\n- 9 (from 1 place of first number) * 7 (from 1 place of second number) = 63 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 63\n- 9 (from 1 place of first number) * 2 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 9 (from 1 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4500\n- 9 (from 10 place of first number) * 7 (from 1 place of second number) = 63 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 630\n- 9 (from 10 place of first number) * 2 (from 10 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1800\n- 9 (from 10 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 45000\n- 8 (from 100 place of first number) * 7 (from 1 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 5600\n- 8 (from 100 place of first number) * 2 (from 10 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 16000\n- 8 (from 100 place of first number) * 5 (from 100 place of second number) = 40 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 400000\n\nNow, add all these results together:\nThe sum of 63 + 180 + 4500 + 630 + 1800 + 45000 + 5600 + 16000 + 400000 = 473773."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 796 * 776?"}, {"role": "assistant", "content": "Here are the steps for multiplying 796 * 776 using the long multiplication method.\nStep 1: Break first number 796 into its individual digits: 7 (hundreds place), 9 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 776 into its individual digits: 7 (hundreds place), 7 (tens place), and 6 (ones place).\n- 6 (from 1 place of first number) * 6 (from 1 place of second number) = 36 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 36\n- 6 (from 1 place of first number) * 7 (from 10 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 420\n- 6 (from 1 place of first number) * 7 (from 100 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4200\n- 9 (from 10 place of first number) * 6 (from 1 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 540\n- 9 (from 10 place of first number) * 7 (from 10 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 6300\n- 9 (from 10 place of first number) * 7 (from 100 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 63000\n- 7 (from 100 place of first number) * 6 (from 1 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4200\n- 7 (from 100 place of first number) * 7 (from 10 place of second number) = 49 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 49000\n- 7 (from 100 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 490000\n\nNow, add all these results together:\nThe sum of 36 + 420 + 4200 + 540 + 6300 + 63000 + 4200 + 49000 + 490000 = 617696."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 887 * 755?"}, {"role": "assistant", "content": "Here are the steps for multiplying 887 * 755 using the long multiplication method.\nStep 1: Break first number 887 into its individual digits: 8 (hundreds place), 8 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 755 into its individual digits: 7 (hundreds place), 5 (tens place), and 5 (ones place).\n- 7 (from 1 place of first number) * 5 (from 1 place of second number) = 35 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 35\n- 7 (from 1 place of first number) * 5 (from 10 place of second number) = 35 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 350\n- 7 (from 1 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4900\n- 8 (from 10 place of first number) * 5 (from 1 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 8 (from 10 place of first number) * 5 (from 10 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 8 (from 10 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 56000\n- 8 (from 100 place of first number) * 5 (from 1 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4000\n- 8 (from 100 place of first number) * 5 (from 10 place of second number) = 40 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 40000\n- 8 (from 100 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 560000\n\nNow, add all these results together:\nThe sum of 35 + 350 + 4900 + 400 + 4000 + 56000 + 4000 + 40000 + 560000 = 669685."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 443 * 852?"}, {"role": "assistant", "content": "Here are the steps for multiplying 443 * 852 using the long multiplication method.\nStep 1: Break first number 443 into its individual digits: 4 (hundreds place), 4 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 852 into its individual digits: 8 (hundreds place), 5 (tens place), and 2 (ones place).\n- 3 (from 1 place of first number) * 2 (from 1 place of second number) = 6 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 6\n- 3 (from 1 place of first number) * 5 (from 10 place of second number) = 15 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 150\n- 3 (from 1 place of first number) * 8 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 4 (from 10 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 4 (from 10 place of first number) * 5 (from 10 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 4 (from 10 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 32000\n- 4 (from 100 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 4 (from 100 place of first number) * 5 (from 10 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 20000\n- 4 (from 100 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 320000\n\nNow, add all these results together:\nThe sum of 6 + 150 + 2400 + 80 + 2000 + 32000 + 800 + 20000 + 320000 = 377436."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 976 * 265?"}, {"role": "assistant", "content": "Here are the steps for multiplying 976 * 265 using the long multiplication method.\nStep 1: Break first number 976 into its individual digits: 9 (hundreds place), 7 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 265 into its individual digits: 2 (hundreds place), 6 (tens place), and 5 (ones place).\n- 6 (from 1 place of first number) * 5 (from 1 place of second number) = 30 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 6 (from 1 place of first number) * 6 (from 10 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 360\n- 6 (from 1 place of first number) * 2 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 7 (from 10 place of first number) * 5 (from 1 place of second number) = 35 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 350\n- 7 (from 10 place of first number) * 6 (from 10 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4200\n- 7 (from 10 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 14000\n- 9 (from 100 place of first number) * 5 (from 1 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4500\n- 9 (from 100 place of first number) * 6 (from 10 place of second number) = 54 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 54000\n- 9 (from 100 place of first number) * 2 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 30 + 360 + 1200 + 350 + 4200 + 14000 + 4500 + 54000 + 180000 = 258640."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 435 * 346?"}, {"role": "assistant", "content": "Here are the steps for multiplying 435 * 346 using the long multiplication method.\nStep 1: Break first number 435 into its individual digits: 4 (hundreds place), 3 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 346 into its individual digits: 3 (hundreds place), 4 (tens place), and 6 (ones place).\n- 5 (from 1 place of first number) * 6 (from 1 place of second number) = 30 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 5 (from 1 place of first number) * 4 (from 10 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 200\n- 5 (from 1 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1500\n- 3 (from 10 place of first number) * 6 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 3 (from 10 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1200\n- 3 (from 10 place of first number) * 3 (from 100 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 9000\n- 4 (from 100 place of first number) * 6 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 4 (from 100 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 16000\n- 4 (from 100 place of first number) * 3 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 30 + 200 + 1500 + 180 + 1200 + 9000 + 2400 + 16000 + 120000 = 150510."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 759 * 288?"}, {"role": "assistant", "content": "Here are the steps for multiplying 759 * 288 using the long multiplication method.\nStep 1: Break first number 759 into its individual digits: 7 (hundreds place), 5 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 288 into its individual digits: 2 (hundreds place), 8 (tens place), and 8 (ones place).\n- 9 (from 1 place of first number) * 8 (from 1 place of second number) = 72 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 72\n- 9 (from 1 place of first number) * 8 (from 10 place of second number) = 72 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 720\n- 9 (from 1 place of first number) * 2 (from 100 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1800\n- 5 (from 10 place of first number) * 8 (from 1 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 5 (from 10 place of first number) * 8 (from 10 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 5 (from 10 place of first number) * 2 (from 100 place of second number) = 10 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 10000\n- 7 (from 100 place of first number) * 8 (from 1 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 5600\n- 7 (from 100 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 56000\n- 7 (from 100 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 140000\n\nNow, add all these results together:\nThe sum of 72 + 720 + 1800 + 400 + 4000 + 10000 + 5600 + 56000 + 140000 = 218592."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 580 * 667?"}, {"role": "assistant", "content": "Here are the steps for multiplying 580 * 667 using the long multiplication method.\nStep 1: Break first number 580 into its individual digits: 5 (hundreds place), 8 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 667 into its individual digits: 6 (hundreds place), 6 (tens place), and 7 (ones place).\n- 0 (from 1 place of first number) * 7 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 6 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 6 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 8 (from 10 place of first number) * 7 (from 1 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 560\n- 8 (from 10 place of first number) * 6 (from 10 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4800\n- 8 (from 10 place of first number) * 6 (from 100 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 48000\n- 5 (from 100 place of first number) * 7 (from 1 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3500\n- 5 (from 100 place of first number) * 6 (from 10 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 30000\n- 5 (from 100 place of first number) * 6 (from 100 place of second number) = 30 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 300000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 560 + 4800 + 48000 + 3500 + 30000 + 300000 = 386860."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 498 * 777?"}, {"role": "assistant", "content": "Here are the steps for multiplying 498 * 777 using the long multiplication method.\nStep 1: Break first number 498 into its individual digits: 4 (hundreds place), 9 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 777 into its individual digits: 7 (hundreds place), 7 (tens place), and 7 (ones place).\n- 8 (from 1 place of first number) * 7 (from 1 place of second number) = 56 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 56\n- 8 (from 1 place of first number) * 7 (from 10 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 560\n- 8 (from 1 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5600\n- 9 (from 10 place of first number) * 7 (from 1 place of second number) = 63 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 630\n- 9 (from 10 place of first number) * 7 (from 10 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 6300\n- 9 (from 10 place of first number) * 7 (from 100 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 63000\n- 4 (from 100 place of first number) * 7 (from 1 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2800\n- 4 (from 100 place of first number) * 7 (from 10 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 28000\n- 4 (from 100 place of first number) * 7 (from 100 place of second number) = 28 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 280000\n\nNow, add all these results together:\nThe sum of 56 + 560 + 5600 + 630 + 6300 + 63000 + 2800 + 28000 + 280000 = 386946."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 753 * 738?"}, {"role": "assistant", "content": "Here are the steps for multiplying 753 * 738 using the long multiplication method.\nStep 1: Break first number 753 into its individual digits: 7 (hundreds place), 5 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 738 into its individual digits: 7 (hundreds place), 3 (tens place), and 8 (ones place).\n- 3 (from 1 place of first number) * 8 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 3 (from 1 place of first number) * 3 (from 10 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 90\n- 3 (from 1 place of first number) * 7 (from 100 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2100\n- 5 (from 10 place of first number) * 8 (from 1 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 5 (from 10 place of first number) * 3 (from 10 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1500\n- 5 (from 10 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 35000\n- 7 (from 100 place of first number) * 8 (from 1 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 5600\n- 7 (from 100 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 21000\n- 7 (from 100 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 490000\n\nNow, add all these results together:\nThe sum of 24 + 90 + 2100 + 400 + 1500 + 35000 + 5600 + 21000 + 490000 = 555714."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 774 * 651?"}, {"role": "assistant", "content": "Here are the steps for multiplying 774 * 651 using the long multiplication method.\nStep 1: Break first number 774 into its individual digits: 7 (hundreds place), 7 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 651 into its individual digits: 6 (hundreds place), 5 (tens place), and 1 (ones place).\n- 4 (from 1 place of first number) * 1 (from 1 place of second number) = 4 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 4\n- 4 (from 1 place of first number) * 5 (from 10 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 200\n- 4 (from 1 place of first number) * 6 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 7 (from 10 place of first number) * 1 (from 1 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 70\n- 7 (from 10 place of first number) * 5 (from 10 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3500\n- 7 (from 10 place of first number) * 6 (from 100 place of second number) = 42 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 42000\n- 7 (from 100 place of first number) * 1 (from 1 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 700\n- 7 (from 100 place of first number) * 5 (from 10 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 35000\n- 7 (from 100 place of first number) * 6 (from 100 place of second number) = 42 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 420000\n\nNow, add all these results together:\nThe sum of 4 + 200 + 2400 + 70 + 3500 + 42000 + 700 + 35000 + 420000 = 503874."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 164 * 170?"}, {"role": "assistant", "content": "Here are the steps for multiplying 164 * 170 using the long multiplication method.\nStep 1: Break first number 164 into its individual digits: 1 (hundreds place), 6 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 170 into its individual digits: 1 (hundreds place), 7 (tens place), and 0 (ones place).\n- 4 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 4 (from 1 place of first number) * 7 (from 10 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 280\n- 4 (from 1 place of first number) * 1 (from 100 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 400\n- 6 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 6 (from 10 place of first number) * 7 (from 10 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4200\n- 6 (from 10 place of first number) * 1 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 1 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 1 (from 100 place of first number) * 7 (from 10 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 7000\n- 1 (from 100 place of first number) * 1 (from 100 place of second number) = 1 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 10000\n\nNow, add all these results together:\nThe sum of 0 + 280 + 400 + 0 + 4200 + 6000 + 0 + 7000 + 10000 = 27880."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 638 * 208?"}, {"role": "assistant", "content": "Here are the steps for multiplying 638 * 208 using the long multiplication method.\nStep 1: Break first number 638 into its individual digits: 6 (hundreds place), 3 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 208 into its individual digits: 2 (hundreds place), 0 (tens place), and 8 (ones place).\n- 8 (from 1 place of first number) * 8 (from 1 place of second number) = 64 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 64\n- 8 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 8 (from 1 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 3 (from 10 place of first number) * 8 (from 1 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 240\n- 3 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 3 (from 10 place of first number) * 2 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 6 (from 100 place of first number) * 8 (from 1 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4800\n- 6 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 6 (from 100 place of first number) * 2 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 64 + 0 + 1600 + 240 + 0 + 6000 + 4800 + 0 + 120000 = 132704."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 600 * 592?"}, {"role": "assistant", "content": "Here are the steps for multiplying 600 * 592 using the long multiplication method.\nStep 1: Break first number 600 into its individual digits: 6 (hundreds place), 0 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 592 into its individual digits: 5 (hundreds place), 9 (tens place), and 2 (ones place).\n- 0 (from 1 place of first number) * 2 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 9 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 5 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 0 (from 10 place of first number) * 2 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 9 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 5 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 6 (from 100 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 6 (from 100 place of first number) * 9 (from 10 place of second number) = 54 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 54000\n- 6 (from 100 place of first number) * 5 (from 100 place of second number) = 30 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 300000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 0 + 0 + 0 + 1200 + 54000 + 300000 = 355200."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 422 * 823?"}, {"role": "assistant", "content": "Here are the steps for multiplying 422 * 823 using the long multiplication method.\nStep 1: Break first number 422 into its individual digits: 4 (hundreds place), 2 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 823 into its individual digits: 8 (hundreds place), 2 (tens place), and 3 (ones place).\n- 2 (from 1 place of first number) * 3 (from 1 place of second number) = 6 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 6\n- 2 (from 1 place of first number) * 2 (from 10 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 40\n- 2 (from 1 place of first number) * 8 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 2 (from 10 place of first number) * 3 (from 1 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 60\n- 2 (from 10 place of first number) * 2 (from 10 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 2 (from 10 place of first number) * 8 (from 100 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 16000\n- 4 (from 100 place of first number) * 3 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 4 (from 100 place of first number) * 2 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 4 (from 100 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 320000\n\nNow, add all these results together:\nThe sum of 6 + 40 + 1600 + 60 + 400 + 16000 + 1200 + 8000 + 320000 = 347306."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 250 * 906?"}, {"role": "assistant", "content": "Here are the steps for multiplying 250 * 906 using the long multiplication method.\nStep 1: Break first number 250 into its individual digits: 2 (hundreds place), 5 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 906 into its individual digits: 9 (hundreds place), 0 (tens place), and 6 (ones place).\n- 0 (from 1 place of first number) * 6 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 9 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 5 (from 10 place of first number) * 6 (from 1 place of second number) = 30 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 5 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 5 (from 10 place of first number) * 9 (from 100 place of second number) = 45 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 45000\n- 2 (from 100 place of first number) * 6 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 2 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 2 (from 100 place of first number) * 9 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 300 + 0 + 45000 + 1200 + 0 + 180000 = 226500."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 696 * 797?"}, {"role": "assistant", "content": "Here are the steps for multiplying 696 * 797 using the long multiplication method.\nStep 1: Break first number 696 into its individual digits: 6 (hundreds place), 9 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 797 into its individual digits: 7 (hundreds place), 9 (tens place), and 7 (ones place).\n- 6 (from 1 place of first number) * 7 (from 1 place of second number) = 42 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 42\n- 6 (from 1 place of first number) * 9 (from 10 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 540\n- 6 (from 1 place of first number) * 7 (from 100 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4200\n- 9 (from 10 place of first number) * 7 (from 1 place of second number) = 63 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 630\n- 9 (from 10 place of first number) * 9 (from 10 place of second number) = 81 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 8100\n- 9 (from 10 place of first number) * 7 (from 100 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 63000\n- 6 (from 100 place of first number) * 7 (from 1 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4200\n- 6 (from 100 place of first number) * 9 (from 10 place of second number) = 54 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 54000\n- 6 (from 100 place of first number) * 7 (from 100 place of second number) = 42 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 420000\n\nNow, add all these results together:\nThe sum of 42 + 540 + 4200 + 630 + 8100 + 63000 + 4200 + 54000 + 420000 = 554712."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 612 * 975?"}, {"role": "assistant", "content": "Here are the steps for multiplying 612 * 975 using the long multiplication method.\nStep 1: Break first number 612 into its individual digits: 6 (hundreds place), 1 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 975 into its individual digits: 9 (hundreds place), 7 (tens place), and 5 (ones place).\n- 2 (from 1 place of first number) * 5 (from 1 place of second number) = 10 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 10\n- 2 (from 1 place of first number) * 7 (from 10 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 140\n- 2 (from 1 place of first number) * 9 (from 100 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1800\n- 1 (from 10 place of first number) * 5 (from 1 place of second number) = 5 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 50\n- 1 (from 10 place of first number) * 7 (from 10 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 700\n- 1 (from 10 place of first number) * 9 (from 100 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 9000\n- 6 (from 100 place of first number) * 5 (from 1 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3000\n- 6 (from 100 place of first number) * 7 (from 10 place of second number) = 42 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 42000\n- 6 (from 100 place of first number) * 9 (from 100 place of second number) = 54 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 540000\n\nNow, add all these results together:\nThe sum of 10 + 140 + 1800 + 50 + 700 + 9000 + 3000 + 42000 + 540000 = 596700."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 399 * 668?"}, {"role": "assistant", "content": "Here are the steps for multiplying 399 * 668 using the long multiplication method.\nStep 1: Break first number 399 into its individual digits: 3 (hundreds place), 9 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 668 into its individual digits: 6 (hundreds place), 6 (tens place), and 8 (ones place).\n- 9 (from 1 place of first number) * 8 (from 1 place of second number) = 72 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 72\n- 9 (from 1 place of first number) * 6 (from 10 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 540\n- 9 (from 1 place of first number) * 6 (from 100 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5400\n- 9 (from 10 place of first number) * 8 (from 1 place of second number) = 72 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 720\n- 9 (from 10 place of first number) * 6 (from 10 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5400\n- 9 (from 10 place of first number) * 6 (from 100 place of second number) = 54 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 54000\n- 3 (from 100 place of first number) * 8 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 3 (from 100 place of first number) * 6 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 3 (from 100 place of first number) * 6 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 72 + 540 + 5400 + 720 + 5400 + 54000 + 2400 + 18000 + 180000 = 266532."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 771 * 110?"}, {"role": "assistant", "content": "Here are the steps for multiplying 771 * 110 using the long multiplication method.\nStep 1: Break first number 771 into its individual digits: 7 (hundreds place), 7 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 110 into its individual digits: 1 (hundreds place), 1 (tens place), and 0 (ones place).\n- 1 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 1 (from 1 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 10\n- 1 (from 1 place of first number) * 1 (from 100 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 100\n- 7 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 10 place of first number) * 1 (from 10 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 700\n- 7 (from 10 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 7000\n- 7 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 100 place of first number) * 1 (from 10 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 7000\n- 7 (from 100 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 70000\n\nNow, add all these results together:\nThe sum of 0 + 10 + 100 + 0 + 700 + 7000 + 0 + 7000 + 70000 = 84810."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 555 * 245?"}, {"role": "assistant", "content": "Here are the steps for multiplying 555 * 245 using the long multiplication method.\nStep 1: Break first number 555 into its individual digits: 5 (hundreds place), 5 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 245 into its individual digits: 2 (hundreds place), 4 (tens place), and 5 (ones place).\n- 5 (from 1 place of first number) * 5 (from 1 place of second number) = 25 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 25\n- 5 (from 1 place of first number) * 4 (from 10 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 200\n- 5 (from 1 place of first number) * 2 (from 100 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1000\n- 5 (from 10 place of first number) * 5 (from 1 place of second number) = 25 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 250\n- 5 (from 10 place of first number) * 4 (from 10 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 5 (from 10 place of first number) * 2 (from 100 place of second number) = 10 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 10000\n- 5 (from 100 place of first number) * 5 (from 1 place of second number) = 25 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2500\n- 5 (from 100 place of first number) * 4 (from 10 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 20000\n- 5 (from 100 place of first number) * 2 (from 100 place of second number) = 10 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 100000\n\nNow, add all these results together:\nThe sum of 25 + 200 + 1000 + 250 + 2000 + 10000 + 2500 + 20000 + 100000 = 135975."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 368 * 493?"}, {"role": "assistant", "content": "Here are the steps for multiplying 368 * 493 using the long multiplication method.\nStep 1: Break first number 368 into its individual digits: 3 (hundreds place), 6 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 493 into its individual digits: 4 (hundreds place), 9 (tens place), and 3 (ones place).\n- 8 (from 1 place of first number) * 3 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 8 (from 1 place of first number) * 9 (from 10 place of second number) = 72 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 720\n- 8 (from 1 place of first number) * 4 (from 100 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3200\n- 6 (from 10 place of first number) * 3 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 6 (from 10 place of first number) * 9 (from 10 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5400\n- 6 (from 10 place of first number) * 4 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 3 (from 100 place of first number) * 3 (from 1 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 900\n- 3 (from 100 place of first number) * 9 (from 10 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 27000\n- 3 (from 100 place of first number) * 4 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 24 + 720 + 3200 + 180 + 5400 + 24000 + 900 + 27000 + 120000 = 181424."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 576 * 824?"}, {"role": "assistant", "content": "Here are the steps for multiplying 576 * 824 using the long multiplication method.\nStep 1: Break first number 576 into its individual digits: 5 (hundreds place), 7 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 824 into its individual digits: 8 (hundreds place), 2 (tens place), and 4 (ones place).\n- 6 (from 1 place of first number) * 4 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 6 (from 1 place of first number) * 2 (from 10 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 120\n- 6 (from 1 place of first number) * 8 (from 100 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4800\n- 7 (from 10 place of first number) * 4 (from 1 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 280\n- 7 (from 10 place of first number) * 2 (from 10 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1400\n- 7 (from 10 place of first number) * 8 (from 100 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 56000\n- 5 (from 100 place of first number) * 4 (from 1 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2000\n- 5 (from 100 place of first number) * 2 (from 10 place of second number) = 10 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 10000\n- 5 (from 100 place of first number) * 8 (from 100 place of second number) = 40 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 400000\n\nNow, add all these results together:\nThe sum of 24 + 120 + 4800 + 280 + 1400 + 56000 + 2000 + 10000 + 400000 = 474624."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 647 * 148?"}, {"role": "assistant", "content": "Here are the steps for multiplying 647 * 148 using the long multiplication method.\nStep 1: Break first number 647 into its individual digits: 6 (hundreds place), 4 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 148 into its individual digits: 1 (hundreds place), 4 (tens place), and 8 (ones place).\n- 7 (from 1 place of first number) * 8 (from 1 place of second number) = 56 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 56\n- 7 (from 1 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 280\n- 7 (from 1 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 700\n- 4 (from 10 place of first number) * 8 (from 1 place of second number) = 32 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 320\n- 4 (from 10 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1600\n- 4 (from 10 place of first number) * 1 (from 100 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 6 (from 100 place of first number) * 8 (from 1 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4800\n- 6 (from 100 place of first number) * 4 (from 10 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 24000\n- 6 (from 100 place of first number) * 1 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 56 + 280 + 700 + 320 + 1600 + 4000 + 4800 + 24000 + 60000 = 95756."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 181 * 168?"}, {"role": "assistant", "content": "Here are the steps for multiplying 181 * 168 using the long multiplication method.\nStep 1: Break first number 181 into its individual digits: 1 (hundreds place), 8 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 168 into its individual digits: 1 (hundreds place), 6 (tens place), and 8 (ones place).\n- 1 (from 1 place of first number) * 8 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 1 (from 1 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 60\n- 1 (from 1 place of first number) * 1 (from 100 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 100\n- 8 (from 10 place of first number) * 8 (from 1 place of second number) = 64 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 640\n- 8 (from 10 place of first number) * 6 (from 10 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4800\n- 8 (from 10 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 1 (from 100 place of first number) * 8 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 1 (from 100 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 1 (from 100 place of first number) * 1 (from 100 place of second number) = 1 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 10000\n\nNow, add all these results together:\nThe sum of 8 + 60 + 100 + 640 + 4800 + 8000 + 800 + 6000 + 10000 = 30408."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 502 * 664?"}, {"role": "assistant", "content": "Here are the steps for multiplying 502 * 664 using the long multiplication method.\nStep 1: Break first number 502 into its individual digits: 5 (hundreds place), 0 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 664 into its individual digits: 6 (hundreds place), 6 (tens place), and 4 (ones place).\n- 2 (from 1 place of first number) * 4 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 2 (from 1 place of first number) * 6 (from 10 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 120\n- 2 (from 1 place of first number) * 6 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 0 (from 10 place of first number) * 4 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 6 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 6 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 5 (from 100 place of first number) * 4 (from 1 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2000\n- 5 (from 100 place of first number) * 6 (from 10 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 30000\n- 5 (from 100 place of first number) * 6 (from 100 place of second number) = 30 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 300000\n\nNow, add all these results together:\nThe sum of 8 + 120 + 1200 + 0 + 0 + 0 + 2000 + 30000 + 300000 = 333328."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 915 * 437?"}, {"role": "assistant", "content": "Here are the steps for multiplying 915 * 437 using the long multiplication method.\nStep 1: Break first number 915 into its individual digits: 9 (hundreds place), 1 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 437 into its individual digits: 4 (hundreds place), 3 (tens place), and 7 (ones place).\n- 5 (from 1 place of first number) * 7 (from 1 place of second number) = 35 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 35\n- 5 (from 1 place of first number) * 3 (from 10 place of second number) = 15 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 150\n- 5 (from 1 place of first number) * 4 (from 100 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 1 (from 10 place of first number) * 7 (from 1 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 70\n- 1 (from 10 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 300\n- 1 (from 10 place of first number) * 4 (from 100 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 9 (from 100 place of first number) * 7 (from 1 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 6300\n- 9 (from 100 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 27000\n- 9 (from 100 place of first number) * 4 (from 100 place of second number) = 36 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 360000\n\nNow, add all these results together:\nThe sum of 35 + 150 + 2000 + 70 + 300 + 4000 + 6300 + 27000 + 360000 = 399855."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 166 * 421?"}, {"role": "assistant", "content": "Here are the steps for multiplying 166 * 421 using the long multiplication method.\nStep 1: Break first number 166 into its individual digits: 1 (hundreds place), 6 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 421 into its individual digits: 4 (hundreds place), 2 (tens place), and 1 (ones place).\n- 6 (from 1 place of first number) * 1 (from 1 place of second number) = 6 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 6\n- 6 (from 1 place of first number) * 2 (from 10 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 120\n- 6 (from 1 place of first number) * 4 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 6 (from 10 place of first number) * 1 (from 1 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 60\n- 6 (from 10 place of first number) * 2 (from 10 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1200\n- 6 (from 10 place of first number) * 4 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 1 (from 100 place of first number) * 1 (from 1 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 100\n- 1 (from 100 place of first number) * 2 (from 10 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 1 (from 100 place of first number) * 4 (from 100 place of second number) = 4 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n\nNow, add all these results together:\nThe sum of 6 + 120 + 2400 + 60 + 1200 + 24000 + 100 + 2000 + 40000 = 69886."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 470 * 240?"}, {"role": "assistant", "content": "Here are the steps for multiplying 470 * 240 using the long multiplication method.\nStep 1: Break first number 470 into its individual digits: 4 (hundreds place), 7 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 240 into its individual digits: 2 (hundreds place), 4 (tens place), and 0 (ones place).\n- 0 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 4 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 2 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 7 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 10 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2800\n- 7 (from 10 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 14000\n- 4 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 4 (from 100 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 16000\n- 4 (from 100 place of first number) * 2 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 0 + 2800 + 14000 + 0 + 16000 + 80000 = 112800."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 397 * 282?"}, {"role": "assistant", "content": "Here are the steps for multiplying 397 * 282 using the long multiplication method.\nStep 1: Break first number 397 into its individual digits: 3 (hundreds place), 9 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 282 into its individual digits: 2 (hundreds place), 8 (tens place), and 2 (ones place).\n- 7 (from 1 place of first number) * 2 (from 1 place of second number) = 14 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 14\n- 7 (from 1 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 560\n- 7 (from 1 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1400\n- 9 (from 10 place of first number) * 2 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 9 (from 10 place of first number) * 8 (from 10 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 7200\n- 9 (from 10 place of first number) * 2 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 3 (from 100 place of first number) * 2 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 3 (from 100 place of first number) * 8 (from 10 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 24000\n- 3 (from 100 place of first number) * 2 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 14 + 560 + 1400 + 180 + 7200 + 18000 + 600 + 24000 + 60000 = 111954."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 329 * 392?"}, {"role": "assistant", "content": "Here are the steps for multiplying 329 * 392 using the long multiplication method.\nStep 1: Break first number 329 into its individual digits: 3 (hundreds place), 2 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 392 into its individual digits: 3 (hundreds place), 9 (tens place), and 2 (ones place).\n- 9 (from 1 place of first number) * 2 (from 1 place of second number) = 18 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 18\n- 9 (from 1 place of first number) * 9 (from 10 place of second number) = 81 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 810\n- 9 (from 1 place of first number) * 3 (from 100 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2700\n- 2 (from 10 place of first number) * 2 (from 1 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 2 (from 10 place of first number) * 9 (from 10 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1800\n- 2 (from 10 place of first number) * 3 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 3 (from 100 place of first number) * 2 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 3 (from 100 place of first number) * 9 (from 10 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 27000\n- 3 (from 100 place of first number) * 3 (from 100 place of second number) = 9 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 90000\n\nNow, add all these results together:\nThe sum of 18 + 810 + 2700 + 40 + 1800 + 6000 + 600 + 27000 + 90000 = 128968."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 720 * 983?"}, {"role": "assistant", "content": "Here are the steps for multiplying 720 * 983 using the long multiplication method.\nStep 1: Break first number 720 into its individual digits: 7 (hundreds place), 2 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 983 into its individual digits: 9 (hundreds place), 8 (tens place), and 3 (ones place).\n- 0 (from 1 place of first number) * 3 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 8 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 9 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 2 (from 10 place of first number) * 3 (from 1 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 60\n- 2 (from 10 place of first number) * 8 (from 10 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1600\n- 2 (from 10 place of first number) * 9 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 7 (from 100 place of first number) * 3 (from 1 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2100\n- 7 (from 100 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 56000\n- 7 (from 100 place of first number) * 9 (from 100 place of second number) = 63 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 630000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 60 + 1600 + 18000 + 2100 + 56000 + 630000 = 707760."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 697 * 512?"}, {"role": "assistant", "content": "Here are the steps for multiplying 697 * 512 using the long multiplication method.\nStep 1: Break first number 697 into its individual digits: 6 (hundreds place), 9 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 512 into its individual digits: 5 (hundreds place), 1 (tens place), and 2 (ones place).\n- 7 (from 1 place of first number) * 2 (from 1 place of second number) = 14 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 14\n- 7 (from 1 place of first number) * 1 (from 10 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 70\n- 7 (from 1 place of first number) * 5 (from 100 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3500\n- 9 (from 10 place of first number) * 2 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 9 (from 10 place of first number) * 1 (from 10 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 900\n- 9 (from 10 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 45000\n- 6 (from 100 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 6 (from 100 place of first number) * 1 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 6 (from 100 place of first number) * 5 (from 100 place of second number) = 30 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 300000\n\nNow, add all these results together:\nThe sum of 14 + 70 + 3500 + 180 + 900 + 45000 + 1200 + 6000 + 300000 = 356864."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 395 * 173?"}, {"role": "assistant", "content": "Here are the steps for multiplying 395 * 173 using the long multiplication method.\nStep 1: Break first number 395 into its individual digits: 3 (hundreds place), 9 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 173 into its individual digits: 1 (hundreds place), 7 (tens place), and 3 (ones place).\n- 5 (from 1 place of first number) * 3 (from 1 place of second number) = 15 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 15\n- 5 (from 1 place of first number) * 7 (from 10 place of second number) = 35 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 350\n- 5 (from 1 place of first number) * 1 (from 100 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 500\n- 9 (from 10 place of first number) * 3 (from 1 place of second number) = 27 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 270\n- 9 (from 10 place of first number) * 7 (from 10 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 6300\n- 9 (from 10 place of first number) * 1 (from 100 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 9000\n- 3 (from 100 place of first number) * 3 (from 1 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 900\n- 3 (from 100 place of first number) * 7 (from 10 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 21000\n- 3 (from 100 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n\nNow, add all these results together:\nThe sum of 15 + 350 + 500 + 270 + 6300 + 9000 + 900 + 21000 + 30000 = 68335."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 624 * 447?"}, {"role": "assistant", "content": "Here are the steps for multiplying 624 * 447 using the long multiplication method.\nStep 1: Break first number 624 into its individual digits: 6 (hundreds place), 2 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 447 into its individual digits: 4 (hundreds place), 4 (tens place), and 7 (ones place).\n- 4 (from 1 place of first number) * 7 (from 1 place of second number) = 28 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 28\n- 4 (from 1 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 160\n- 4 (from 1 place of first number) * 4 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 2 (from 10 place of first number) * 7 (from 1 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 140\n- 2 (from 10 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 2 (from 10 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 6 (from 100 place of first number) * 7 (from 1 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4200\n- 6 (from 100 place of first number) * 4 (from 10 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 24000\n- 6 (from 100 place of first number) * 4 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 28 + 160 + 1600 + 140 + 800 + 8000 + 4200 + 24000 + 240000 = 278928."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 432 * 361?"}, {"role": "assistant", "content": "Here are the steps for multiplying 432 * 361 using the long multiplication method.\nStep 1: Break first number 432 into its individual digits: 4 (hundreds place), 3 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 361 into its individual digits: 3 (hundreds place), 6 (tens place), and 1 (ones place).\n- 2 (from 1 place of first number) * 1 (from 1 place of second number) = 2 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 2\n- 2 (from 1 place of first number) * 6 (from 10 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 120\n- 2 (from 1 place of first number) * 3 (from 100 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 600\n- 3 (from 10 place of first number) * 1 (from 1 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 3 (from 10 place of first number) * 6 (from 10 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1800\n- 3 (from 10 place of first number) * 3 (from 100 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 9000\n- 4 (from 100 place of first number) * 1 (from 1 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 4 (from 100 place of first number) * 6 (from 10 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 24000\n- 4 (from 100 place of first number) * 3 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 2 + 120 + 600 + 30 + 1800 + 9000 + 400 + 24000 + 120000 = 155952."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 798 * 691?"}, {"role": "assistant", "content": "Here are the steps for multiplying 798 * 691 using the long multiplication method.\nStep 1: Break first number 798 into its individual digits: 7 (hundreds place), 9 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 691 into its individual digits: 6 (hundreds place), 9 (tens place), and 1 (ones place).\n- 8 (from 1 place of first number) * 1 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 8 (from 1 place of first number) * 9 (from 10 place of second number) = 72 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 720\n- 8 (from 1 place of first number) * 6 (from 100 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4800\n- 9 (from 10 place of first number) * 1 (from 1 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 90\n- 9 (from 10 place of first number) * 9 (from 10 place of second number) = 81 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 8100\n- 9 (from 10 place of first number) * 6 (from 100 place of second number) = 54 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 54000\n- 7 (from 100 place of first number) * 1 (from 1 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 700\n- 7 (from 100 place of first number) * 9 (from 10 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 63000\n- 7 (from 100 place of first number) * 6 (from 100 place of second number) = 42 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 420000\n\nNow, add all these results together:\nThe sum of 8 + 720 + 4800 + 90 + 8100 + 54000 + 700 + 63000 + 420000 = 551418."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 785 * 648?"}, {"role": "assistant", "content": "Here are the steps for multiplying 785 * 648 using the long multiplication method.\nStep 1: Break first number 785 into its individual digits: 7 (hundreds place), 8 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 648 into its individual digits: 6 (hundreds place), 4 (tens place), and 8 (ones place).\n- 5 (from 1 place of first number) * 8 (from 1 place of second number) = 40 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 5 (from 1 place of first number) * 4 (from 10 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 200\n- 5 (from 1 place of first number) * 6 (from 100 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 8 (from 10 place of first number) * 8 (from 1 place of second number) = 64 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 640\n- 8 (from 10 place of first number) * 4 (from 10 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3200\n- 8 (from 10 place of first number) * 6 (from 100 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 48000\n- 7 (from 100 place of first number) * 8 (from 1 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 5600\n- 7 (from 100 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 28000\n- 7 (from 100 place of first number) * 6 (from 100 place of second number) = 42 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 420000\n\nNow, add all these results together:\nThe sum of 40 + 200 + 3000 + 640 + 3200 + 48000 + 5600 + 28000 + 420000 = 508680."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 689 * 951?"}, {"role": "assistant", "content": "Here are the steps for multiplying 689 * 951 using the long multiplication method.\nStep 1: Break first number 689 into its individual digits: 6 (hundreds place), 8 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 951 into its individual digits: 9 (hundreds place), 5 (tens place), and 1 (ones place).\n- 9 (from 1 place of first number) * 1 (from 1 place of second number) = 9 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 9\n- 9 (from 1 place of first number) * 5 (from 10 place of second number) = 45 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 450\n- 9 (from 1 place of first number) * 9 (from 100 place of second number) = 81 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 8100\n- 8 (from 10 place of first number) * 1 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 8 (from 10 place of first number) * 5 (from 10 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 8 (from 10 place of first number) * 9 (from 100 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 72000\n- 6 (from 100 place of first number) * 1 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 6 (from 100 place of first number) * 5 (from 10 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 30000\n- 6 (from 100 place of first number) * 9 (from 100 place of second number) = 54 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 540000\n\nNow, add all these results together:\nThe sum of 9 + 450 + 8100 + 80 + 4000 + 72000 + 600 + 30000 + 540000 = 655239."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 469 * 583?"}, {"role": "assistant", "content": "Here are the steps for multiplying 469 * 583 using the long multiplication method.\nStep 1: Break first number 469 into its individual digits: 4 (hundreds place), 6 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 583 into its individual digits: 5 (hundreds place), 8 (tens place), and 3 (ones place).\n- 9 (from 1 place of first number) * 3 (from 1 place of second number) = 27 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 27\n- 9 (from 1 place of first number) * 8 (from 10 place of second number) = 72 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 720\n- 9 (from 1 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4500\n- 6 (from 10 place of first number) * 3 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 6 (from 10 place of first number) * 8 (from 10 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4800\n- 6 (from 10 place of first number) * 5 (from 100 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n- 4 (from 100 place of first number) * 3 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 4 (from 100 place of first number) * 8 (from 10 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 32000\n- 4 (from 100 place of first number) * 5 (from 100 place of second number) = 20 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 200000\n\nNow, add all these results together:\nThe sum of 27 + 720 + 4500 + 180 + 4800 + 30000 + 1200 + 32000 + 200000 = 273427."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 783 * 885?"}, {"role": "assistant", "content": "Here are the steps for multiplying 783 * 885 using the long multiplication method.\nStep 1: Break first number 783 into its individual digits: 7 (hundreds place), 8 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 885 into its individual digits: 8 (hundreds place), 8 (tens place), and 5 (ones place).\n- 3 (from 1 place of first number) * 5 (from 1 place of second number) = 15 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 15\n- 3 (from 1 place of first number) * 8 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 3 (from 1 place of first number) * 8 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 8 (from 10 place of first number) * 5 (from 1 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 8 (from 10 place of first number) * 8 (from 10 place of second number) = 64 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 6400\n- 8 (from 10 place of first number) * 8 (from 100 place of second number) = 64 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 64000\n- 7 (from 100 place of first number) * 5 (from 1 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3500\n- 7 (from 100 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 56000\n- 7 (from 100 place of first number) * 8 (from 100 place of second number) = 56 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 560000\n\nNow, add all these results together:\nThe sum of 15 + 240 + 2400 + 400 + 6400 + 64000 + 3500 + 56000 + 560000 = 692955."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 410 * 243?"}, {"role": "assistant", "content": "Here are the steps for multiplying 410 * 243 using the long multiplication method.\nStep 1: Break first number 410 into its individual digits: 4 (hundreds place), 1 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 243 into its individual digits: 2 (hundreds place), 4 (tens place), and 3 (ones place).\n- 0 (from 1 place of first number) * 3 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 4 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 2 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 1 (from 10 place of first number) * 3 (from 1 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 1 (from 10 place of first number) * 4 (from 10 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 1 (from 10 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 4 (from 100 place of first number) * 3 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 4 (from 100 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 16000\n- 4 (from 100 place of first number) * 2 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 30 + 400 + 2000 + 1200 + 16000 + 80000 = 99630."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 376 * 597?"}, {"role": "assistant", "content": "Here are the steps for multiplying 376 * 597 using the long multiplication method.\nStep 1: Break first number 376 into its individual digits: 3 (hundreds place), 7 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 597 into its individual digits: 5 (hundreds place), 9 (tens place), and 7 (ones place).\n- 6 (from 1 place of first number) * 7 (from 1 place of second number) = 42 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 42\n- 6 (from 1 place of first number) * 9 (from 10 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 540\n- 6 (from 1 place of first number) * 5 (from 100 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 7 (from 10 place of first number) * 7 (from 1 place of second number) = 49 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 490\n- 7 (from 10 place of first number) * 9 (from 10 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 6300\n- 7 (from 10 place of first number) * 5 (from 100 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 35000\n- 3 (from 100 place of first number) * 7 (from 1 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2100\n- 3 (from 100 place of first number) * 9 (from 10 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 27000\n- 3 (from 100 place of first number) * 5 (from 100 place of second number) = 15 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 150000\n\nNow, add all these results together:\nThe sum of 42 + 540 + 3000 + 490 + 6300 + 35000 + 2100 + 27000 + 150000 = 224472."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 845 * 622?"}, {"role": "assistant", "content": "Here are the steps for multiplying 845 * 622 using the long multiplication method.\nStep 1: Break first number 845 into its individual digits: 8 (hundreds place), 4 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 622 into its individual digits: 6 (hundreds place), 2 (tens place), and 2 (ones place).\n- 5 (from 1 place of first number) * 2 (from 1 place of second number) = 10 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 10\n- 5 (from 1 place of first number) * 2 (from 10 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 5 (from 1 place of first number) * 6 (from 100 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 4 (from 10 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 4 (from 10 place of first number) * 2 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 4 (from 10 place of first number) * 6 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 8 (from 100 place of first number) * 2 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 8 (from 100 place of first number) * 2 (from 10 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 16000\n- 8 (from 100 place of first number) * 6 (from 100 place of second number) = 48 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 480000\n\nNow, add all these results together:\nThe sum of 10 + 100 + 3000 + 80 + 800 + 24000 + 1600 + 16000 + 480000 = 525590."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 794 * 362?"}, {"role": "assistant", "content": "Here are the steps for multiplying 794 * 362 using the long multiplication method.\nStep 1: Break first number 794 into its individual digits: 7 (hundreds place), 9 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 362 into its individual digits: 3 (hundreds place), 6 (tens place), and 2 (ones place).\n- 4 (from 1 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 4 (from 1 place of first number) * 6 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 4 (from 1 place of first number) * 3 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 9 (from 10 place of first number) * 2 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 9 (from 10 place of first number) * 6 (from 10 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5400\n- 9 (from 10 place of first number) * 3 (from 100 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 27000\n- 7 (from 100 place of first number) * 2 (from 1 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1400\n- 7 (from 100 place of first number) * 6 (from 10 place of second number) = 42 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 42000\n- 7 (from 100 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 210000\n\nNow, add all these results together:\nThe sum of 8 + 240 + 1200 + 180 + 5400 + 27000 + 1400 + 42000 + 210000 = 287428."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 841 * 110?"}, {"role": "assistant", "content": "Here are the steps for multiplying 841 * 110 using the long multiplication method.\nStep 1: Break first number 841 into its individual digits: 8 (hundreds place), 4 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 110 into its individual digits: 1 (hundreds place), 1 (tens place), and 0 (ones place).\n- 1 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 1 (from 1 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 10\n- 1 (from 1 place of first number) * 1 (from 100 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 100\n- 4 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 4 (from 10 place of first number) * 1 (from 10 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 4 (from 10 place of first number) * 1 (from 100 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 8 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 100 place of first number) * 1 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 8 (from 100 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 0 + 10 + 100 + 0 + 400 + 4000 + 0 + 8000 + 80000 = 92510."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 179 * 905?"}, {"role": "assistant", "content": "Here are the steps for multiplying 179 * 905 using the long multiplication method.\nStep 1: Break first number 179 into its individual digits: 1 (hundreds place), 7 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 905 into its individual digits: 9 (hundreds place), 0 (tens place), and 5 (ones place).\n- 9 (from 1 place of first number) * 5 (from 1 place of second number) = 45 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 45\n- 9 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 9 (from 1 place of first number) * 9 (from 100 place of second number) = 81 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 8100\n- 7 (from 10 place of first number) * 5 (from 1 place of second number) = 35 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 350\n- 7 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 7 (from 10 place of first number) * 9 (from 100 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 63000\n- 1 (from 100 place of first number) * 5 (from 1 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 500\n- 1 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 1 (from 100 place of first number) * 9 (from 100 place of second number) = 9 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 90000\n\nNow, add all these results together:\nThe sum of 45 + 0 + 8100 + 350 + 0 + 63000 + 500 + 0 + 90000 = 161995."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 371 * 539?"}, {"role": "assistant", "content": "Here are the steps for multiplying 371 * 539 using the long multiplication method.\nStep 1: Break first number 371 into its individual digits: 3 (hundreds place), 7 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 539 into its individual digits: 5 (hundreds place), 3 (tens place), and 9 (ones place).\n- 1 (from 1 place of first number) * 9 (from 1 place of second number) = 9 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 9\n- 1 (from 1 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 30\n- 1 (from 1 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 500\n- 7 (from 10 place of first number) * 9 (from 1 place of second number) = 63 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 630\n- 7 (from 10 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2100\n- 7 (from 10 place of first number) * 5 (from 100 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 35000\n- 3 (from 100 place of first number) * 9 (from 1 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2700\n- 3 (from 100 place of first number) * 3 (from 10 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 9000\n- 3 (from 100 place of first number) * 5 (from 100 place of second number) = 15 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 150000\n\nNow, add all these results together:\nThe sum of 9 + 30 + 500 + 630 + 2100 + 35000 + 2700 + 9000 + 150000 = 199969."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 731 * 127?"}, {"role": "assistant", "content": "Here are the steps for multiplying 731 * 127 using the long multiplication method.\nStep 1: Break first number 731 into its individual digits: 7 (hundreds place), 3 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 127 into its individual digits: 1 (hundreds place), 2 (tens place), and 7 (ones place).\n- 1 (from 1 place of first number) * 7 (from 1 place of second number) = 7 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 7\n- 1 (from 1 place of first number) * 2 (from 10 place of second number) = 2 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 20\n- 1 (from 1 place of first number) * 1 (from 100 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 100\n- 3 (from 10 place of first number) * 7 (from 1 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 210\n- 3 (from 10 place of first number) * 2 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 3 (from 10 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 7 (from 100 place of first number) * 7 (from 1 place of second number) = 49 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4900\n- 7 (from 100 place of first number) * 2 (from 10 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 14000\n- 7 (from 100 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 70000\n\nNow, add all these results together:\nThe sum of 7 + 20 + 100 + 210 + 600 + 3000 + 4900 + 14000 + 70000 = 92837."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 470 * 212?"}, {"role": "assistant", "content": "Here are the steps for multiplying 470 * 212 using the long multiplication method.\nStep 1: Break first number 470 into its individual digits: 4 (hundreds place), 7 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 212 into its individual digits: 2 (hundreds place), 1 (tens place), and 2 (ones place).\n- 0 (from 1 place of first number) * 2 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 1 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 2 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 7 (from 10 place of first number) * 2 (from 1 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 140\n- 7 (from 10 place of first number) * 1 (from 10 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 700\n- 7 (from 10 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 14000\n- 4 (from 100 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 4 (from 100 place of first number) * 1 (from 10 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 4 (from 100 place of first number) * 2 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 140 + 700 + 14000 + 800 + 4000 + 80000 = 99640."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 252 * 897?"}, {"role": "assistant", "content": "Here are the steps for multiplying 252 * 897 using the long multiplication method.\nStep 1: Break first number 252 into its individual digits: 2 (hundreds place), 5 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 897 into its individual digits: 8 (hundreds place), 9 (tens place), and 7 (ones place).\n- 2 (from 1 place of first number) * 7 (from 1 place of second number) = 14 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 14\n- 2 (from 1 place of first number) * 9 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 2 (from 1 place of first number) * 8 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 5 (from 10 place of first number) * 7 (from 1 place of second number) = 35 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 350\n- 5 (from 10 place of first number) * 9 (from 10 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4500\n- 5 (from 10 place of first number) * 8 (from 100 place of second number) = 40 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n- 2 (from 100 place of first number) * 7 (from 1 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1400\n- 2 (from 100 place of first number) * 9 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 2 (from 100 place of first number) * 8 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 14 + 180 + 1600 + 350 + 4500 + 40000 + 1400 + 18000 + 160000 = 226044."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 905 * 983?"}, {"role": "assistant", "content": "Here are the steps for multiplying 905 * 983 using the long multiplication method.\nStep 1: Break first number 905 into its individual digits: 9 (hundreds place), 0 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 983 into its individual digits: 9 (hundreds place), 8 (tens place), and 3 (ones place).\n- 5 (from 1 place of first number) * 3 (from 1 place of second number) = 15 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 15\n- 5 (from 1 place of first number) * 8 (from 10 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 5 (from 1 place of first number) * 9 (from 100 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4500\n- 0 (from 10 place of first number) * 3 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 8 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 9 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 9 (from 100 place of first number) * 3 (from 1 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2700\n- 9 (from 100 place of first number) * 8 (from 10 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 72000\n- 9 (from 100 place of first number) * 9 (from 100 place of second number) = 81 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 810000\n\nNow, add all these results together:\nThe sum of 15 + 400 + 4500 + 0 + 0 + 0 + 2700 + 72000 + 810000 = 889615."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 622 * 652?"}, {"role": "assistant", "content": "Here are the steps for multiplying 622 * 652 using the long multiplication method.\nStep 1: Break first number 622 into its individual digits: 6 (hundreds place), 2 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 652 into its individual digits: 6 (hundreds place), 5 (tens place), and 2 (ones place).\n- 2 (from 1 place of first number) * 2 (from 1 place of second number) = 4 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 4\n- 2 (from 1 place of first number) * 5 (from 10 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 2 (from 1 place of first number) * 6 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 2 (from 10 place of first number) * 2 (from 1 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 2 (from 10 place of first number) * 5 (from 10 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1000\n- 2 (from 10 place of first number) * 6 (from 100 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 12000\n- 6 (from 100 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 6 (from 100 place of first number) * 5 (from 10 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 30000\n- 6 (from 100 place of first number) * 6 (from 100 place of second number) = 36 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 360000\n\nNow, add all these results together:\nThe sum of 4 + 100 + 1200 + 40 + 1000 + 12000 + 1200 + 30000 + 360000 = 405544."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 653 * 678?"}, {"role": "assistant", "content": "Here are the steps for multiplying 653 * 678 using the long multiplication method.\nStep 1: Break first number 653 into its individual digits: 6 (hundreds place), 5 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 678 into its individual digits: 6 (hundreds place), 7 (tens place), and 8 (ones place).\n- 3 (from 1 place of first number) * 8 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 3 (from 1 place of first number) * 7 (from 10 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 210\n- 3 (from 1 place of first number) * 6 (from 100 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1800\n- 5 (from 10 place of first number) * 8 (from 1 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 5 (from 10 place of first number) * 7 (from 10 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3500\n- 5 (from 10 place of first number) * 6 (from 100 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n- 6 (from 100 place of first number) * 8 (from 1 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4800\n- 6 (from 100 place of first number) * 7 (from 10 place of second number) = 42 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 42000\n- 6 (from 100 place of first number) * 6 (from 100 place of second number) = 36 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 360000\n\nNow, add all these results together:\nThe sum of 24 + 210 + 1800 + 400 + 3500 + 30000 + 4800 + 42000 + 360000 = 442734."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 396 * 167?"}, {"role": "assistant", "content": "Here are the steps for multiplying 396 * 167 using the long multiplication method.\nStep 1: Break first number 396 into its individual digits: 3 (hundreds place), 9 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 167 into its individual digits: 1 (hundreds place), 6 (tens place), and 7 (ones place).\n- 6 (from 1 place of first number) * 7 (from 1 place of second number) = 42 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 42\n- 6 (from 1 place of first number) * 6 (from 10 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 360\n- 6 (from 1 place of first number) * 1 (from 100 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 600\n- 9 (from 10 place of first number) * 7 (from 1 place of second number) = 63 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 630\n- 9 (from 10 place of first number) * 6 (from 10 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5400\n- 9 (from 10 place of first number) * 1 (from 100 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 9000\n- 3 (from 100 place of first number) * 7 (from 1 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2100\n- 3 (from 100 place of first number) * 6 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 3 (from 100 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n\nNow, add all these results together:\nThe sum of 42 + 360 + 600 + 630 + 5400 + 9000 + 2100 + 18000 + 30000 = 66132."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 929 * 694?"}, {"role": "assistant", "content": "Here are the steps for multiplying 929 * 694 using the long multiplication method.\nStep 1: Break first number 929 into its individual digits: 9 (hundreds place), 2 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 694 into its individual digits: 6 (hundreds place), 9 (tens place), and 4 (ones place).\n- 9 (from 1 place of first number) * 4 (from 1 place of second number) = 36 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 36\n- 9 (from 1 place of first number) * 9 (from 10 place of second number) = 81 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 810\n- 9 (from 1 place of first number) * 6 (from 100 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5400\n- 2 (from 10 place of first number) * 4 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 2 (from 10 place of first number) * 9 (from 10 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1800\n- 2 (from 10 place of first number) * 6 (from 100 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 12000\n- 9 (from 100 place of first number) * 4 (from 1 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3600\n- 9 (from 100 place of first number) * 9 (from 10 place of second number) = 81 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 81000\n- 9 (from 100 place of first number) * 6 (from 100 place of second number) = 54 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 540000\n\nNow, add all these results together:\nThe sum of 36 + 810 + 5400 + 80 + 1800 + 12000 + 3600 + 81000 + 540000 = 644726."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 476 * 434?"}, {"role": "assistant", "content": "Here are the steps for multiplying 476 * 434 using the long multiplication method.\nStep 1: Break first number 476 into its individual digits: 4 (hundreds place), 7 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 434 into its individual digits: 4 (hundreds place), 3 (tens place), and 4 (ones place).\n- 6 (from 1 place of first number) * 4 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 6 (from 1 place of first number) * 3 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 6 (from 1 place of first number) * 4 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 7 (from 10 place of first number) * 4 (from 1 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 280\n- 7 (from 10 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2100\n- 7 (from 10 place of first number) * 4 (from 100 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 28000\n- 4 (from 100 place of first number) * 4 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 4 (from 100 place of first number) * 3 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 4 (from 100 place of first number) * 4 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 24 + 180 + 2400 + 280 + 2100 + 28000 + 1600 + 12000 + 160000 = 206584."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 784 * 935?"}, {"role": "assistant", "content": "Here are the steps for multiplying 784 * 935 using the long multiplication method.\nStep 1: Break first number 784 into its individual digits: 7 (hundreds place), 8 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 935 into its individual digits: 9 (hundreds place), 3 (tens place), and 5 (ones place).\n- 4 (from 1 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 4 (from 1 place of first number) * 3 (from 10 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 120\n- 4 (from 1 place of first number) * 9 (from 100 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3600\n- 8 (from 10 place of first number) * 5 (from 1 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 8 (from 10 place of first number) * 3 (from 10 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2400\n- 8 (from 10 place of first number) * 9 (from 100 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 72000\n- 7 (from 100 place of first number) * 5 (from 1 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3500\n- 7 (from 100 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 21000\n- 7 (from 100 place of first number) * 9 (from 100 place of second number) = 63 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 630000\n\nNow, add all these results together:\nThe sum of 20 + 120 + 3600 + 400 + 2400 + 72000 + 3500 + 21000 + 630000 = 733040."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 335 * 177?"}, {"role": "assistant", "content": "Here are the steps for multiplying 335 * 177 using the long multiplication method.\nStep 1: Break first number 335 into its individual digits: 3 (hundreds place), 3 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 177 into its individual digits: 1 (hundreds place), 7 (tens place), and 7 (ones place).\n- 5 (from 1 place of first number) * 7 (from 1 place of second number) = 35 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 35\n- 5 (from 1 place of first number) * 7 (from 10 place of second number) = 35 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 350\n- 5 (from 1 place of first number) * 1 (from 100 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 500\n- 3 (from 10 place of first number) * 7 (from 1 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 210\n- 3 (from 10 place of first number) * 7 (from 10 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2100\n- 3 (from 10 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 3 (from 100 place of first number) * 7 (from 1 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2100\n- 3 (from 100 place of first number) * 7 (from 10 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 21000\n- 3 (from 100 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n\nNow, add all these results together:\nThe sum of 35 + 350 + 500 + 210 + 2100 + 3000 + 2100 + 21000 + 30000 = 59295."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 244 * 512?"}, {"role": "assistant", "content": "Here are the steps for multiplying 244 * 512 using the long multiplication method.\nStep 1: Break first number 244 into its individual digits: 2 (hundreds place), 4 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 512 into its individual digits: 5 (hundreds place), 1 (tens place), and 2 (ones place).\n- 4 (from 1 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 4 (from 1 place of first number) * 1 (from 10 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 40\n- 4 (from 1 place of first number) * 5 (from 100 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 4 (from 10 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 4 (from 10 place of first number) * 1 (from 10 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 4 (from 10 place of first number) * 5 (from 100 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n- 2 (from 100 place of first number) * 2 (from 1 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 2 (from 100 place of first number) * 1 (from 10 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 2 (from 100 place of first number) * 5 (from 100 place of second number) = 10 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 100000\n\nNow, add all these results together:\nThe sum of 8 + 40 + 2000 + 80 + 400 + 20000 + 400 + 2000 + 100000 = 124928."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 589 * 458?"}, {"role": "assistant", "content": "Here are the steps for multiplying 589 * 458 using the long multiplication method.\nStep 1: Break first number 589 into its individual digits: 5 (hundreds place), 8 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 458 into its individual digits: 4 (hundreds place), 5 (tens place), and 8 (ones place).\n- 9 (from 1 place of first number) * 8 (from 1 place of second number) = 72 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 72\n- 9 (from 1 place of first number) * 5 (from 10 place of second number) = 45 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 450\n- 9 (from 1 place of first number) * 4 (from 100 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3600\n- 8 (from 10 place of first number) * 8 (from 1 place of second number) = 64 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 640\n- 8 (from 10 place of first number) * 5 (from 10 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 8 (from 10 place of first number) * 4 (from 100 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 32000\n- 5 (from 100 place of first number) * 8 (from 1 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4000\n- 5 (from 100 place of first number) * 5 (from 10 place of second number) = 25 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 25000\n- 5 (from 100 place of first number) * 4 (from 100 place of second number) = 20 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 200000\n\nNow, add all these results together:\nThe sum of 72 + 450 + 3600 + 640 + 4000 + 32000 + 4000 + 25000 + 200000 = 269762."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 664 * 506?"}, {"role": "assistant", "content": "Here are the steps for multiplying 664 * 506 using the long multiplication method.\nStep 1: Break first number 664 into its individual digits: 6 (hundreds place), 6 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 506 into its individual digits: 5 (hundreds place), 0 (tens place), and 6 (ones place).\n- 4 (from 1 place of first number) * 6 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 4 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 4 (from 1 place of first number) * 5 (from 100 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 6 (from 10 place of first number) * 6 (from 1 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 360\n- 6 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 6 (from 10 place of first number) * 5 (from 100 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n- 6 (from 100 place of first number) * 6 (from 1 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3600\n- 6 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 6 (from 100 place of first number) * 5 (from 100 place of second number) = 30 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 300000\n\nNow, add all these results together:\nThe sum of 24 + 0 + 2000 + 360 + 0 + 30000 + 3600 + 0 + 300000 = 335984."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 789 * 948?"}, {"role": "assistant", "content": "Here are the steps for multiplying 789 * 948 using the long multiplication method.\nStep 1: Break first number 789 into its individual digits: 7 (hundreds place), 8 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 948 into its individual digits: 9 (hundreds place), 4 (tens place), and 8 (ones place).\n- 9 (from 1 place of first number) * 8 (from 1 place of second number) = 72 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 72\n- 9 (from 1 place of first number) * 4 (from 10 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 360\n- 9 (from 1 place of first number) * 9 (from 100 place of second number) = 81 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 8100\n- 8 (from 10 place of first number) * 8 (from 1 place of second number) = 64 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 640\n- 8 (from 10 place of first number) * 4 (from 10 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3200\n- 8 (from 10 place of first number) * 9 (from 100 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 72000\n- 7 (from 100 place of first number) * 8 (from 1 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 5600\n- 7 (from 100 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 28000\n- 7 (from 100 place of first number) * 9 (from 100 place of second number) = 63 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 630000\n\nNow, add all these results together:\nThe sum of 72 + 360 + 8100 + 640 + 3200 + 72000 + 5600 + 28000 + 630000 = 747972."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 400 * 864?"}, {"role": "assistant", "content": "Here are the steps for multiplying 400 * 864 using the long multiplication method.\nStep 1: Break first number 400 into its individual digits: 4 (hundreds place), 0 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 864 into its individual digits: 8 (hundreds place), 6 (tens place), and 4 (ones place).\n- 0 (from 1 place of first number) * 4 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 6 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 8 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 0 (from 10 place of first number) * 4 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 6 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 8 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 4 (from 100 place of first number) * 4 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 4 (from 100 place of first number) * 6 (from 10 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 24000\n- 4 (from 100 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 320000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 0 + 0 + 0 + 1600 + 24000 + 320000 = 345600."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 114 * 757?"}, {"role": "assistant", "content": "Here are the steps for multiplying 114 * 757 using the long multiplication method.\nStep 1: Break first number 114 into its individual digits: 1 (hundreds place), 1 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 757 into its individual digits: 7 (hundreds place), 5 (tens place), and 7 (ones place).\n- 4 (from 1 place of first number) * 7 (from 1 place of second number) = 28 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 28\n- 4 (from 1 place of first number) * 5 (from 10 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 200\n- 4 (from 1 place of first number) * 7 (from 100 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2800\n- 1 (from 10 place of first number) * 7 (from 1 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 70\n- 1 (from 10 place of first number) * 5 (from 10 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 500\n- 1 (from 10 place of first number) * 7 (from 100 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 7000\n- 1 (from 100 place of first number) * 7 (from 1 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 700\n- 1 (from 100 place of first number) * 5 (from 10 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 5000\n- 1 (from 100 place of first number) * 7 (from 100 place of second number) = 7 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 70000\n\nNow, add all these results together:\nThe sum of 28 + 200 + 2800 + 70 + 500 + 7000 + 700 + 5000 + 70000 = 86298."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 461 * 115?"}, {"role": "assistant", "content": "Here are the steps for multiplying 461 * 115 using the long multiplication method.\nStep 1: Break first number 461 into its individual digits: 4 (hundreds place), 6 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 115 into its individual digits: 1 (hundreds place), 1 (tens place), and 5 (ones place).\n- 1 (from 1 place of first number) * 5 (from 1 place of second number) = 5 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 5\n- 1 (from 1 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 10\n- 1 (from 1 place of first number) * 1 (from 100 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 100\n- 6 (from 10 place of first number) * 5 (from 1 place of second number) = 30 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 6 (from 10 place of first number) * 1 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 6 (from 10 place of first number) * 1 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 4 (from 100 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2000\n- 4 (from 100 place of first number) * 1 (from 10 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 4 (from 100 place of first number) * 1 (from 100 place of second number) = 4 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n\nNow, add all these results together:\nThe sum of 5 + 10 + 100 + 300 + 600 + 6000 + 2000 + 4000 + 40000 = 53015."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 309 * 744?"}, {"role": "assistant", "content": "Here are the steps for multiplying 309 * 744 using the long multiplication method.\nStep 1: Break first number 309 into its individual digits: 3 (hundreds place), 0 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 744 into its individual digits: 7 (hundreds place), 4 (tens place), and 4 (ones place).\n- 9 (from 1 place of first number) * 4 (from 1 place of second number) = 36 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 36\n- 9 (from 1 place of first number) * 4 (from 10 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 360\n- 9 (from 1 place of first number) * 7 (from 100 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 6300\n- 0 (from 10 place of first number) * 4 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 4 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 7 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 3 (from 100 place of first number) * 4 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 3 (from 100 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 3 (from 100 place of first number) * 7 (from 100 place of second number) = 21 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 210000\n\nNow, add all these results together:\nThe sum of 36 + 360 + 6300 + 0 + 0 + 0 + 1200 + 12000 + 210000 = 229896."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 272 * 638?"}, {"role": "assistant", "content": "Here are the steps for multiplying 272 * 638 using the long multiplication method.\nStep 1: Break first number 272 into its individual digits: 2 (hundreds place), 7 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 638 into its individual digits: 6 (hundreds place), 3 (tens place), and 8 (ones place).\n- 2 (from 1 place of first number) * 8 (from 1 place of second number) = 16 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 16\n- 2 (from 1 place of first number) * 3 (from 10 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 60\n- 2 (from 1 place of first number) * 6 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 7 (from 10 place of first number) * 8 (from 1 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 560\n- 7 (from 10 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2100\n- 7 (from 10 place of first number) * 6 (from 100 place of second number) = 42 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 42000\n- 2 (from 100 place of first number) * 8 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 2 (from 100 place of first number) * 3 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 2 (from 100 place of first number) * 6 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 16 + 60 + 1200 + 560 + 2100 + 42000 + 1600 + 6000 + 120000 = 173536."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 489 * 722?"}, {"role": "assistant", "content": "Here are the steps for multiplying 489 * 722 using the long multiplication method.\nStep 1: Break first number 489 into its individual digits: 4 (hundreds place), 8 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 722 into its individual digits: 7 (hundreds place), 2 (tens place), and 2 (ones place).\n- 9 (from 1 place of first number) * 2 (from 1 place of second number) = 18 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 18\n- 9 (from 1 place of first number) * 2 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 9 (from 1 place of first number) * 7 (from 100 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 6300\n- 8 (from 10 place of first number) * 2 (from 1 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 160\n- 8 (from 10 place of first number) * 2 (from 10 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1600\n- 8 (from 10 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 56000\n- 4 (from 100 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 4 (from 100 place of first number) * 2 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 4 (from 100 place of first number) * 7 (from 100 place of second number) = 28 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 280000\n\nNow, add all these results together:\nThe sum of 18 + 180 + 6300 + 160 + 1600 + 56000 + 800 + 8000 + 280000 = 353058."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 548 * 245?"}, {"role": "assistant", "content": "Here are the steps for multiplying 548 * 245 using the long multiplication method.\nStep 1: Break first number 548 into its individual digits: 5 (hundreds place), 4 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 245 into its individual digits: 2 (hundreds place), 4 (tens place), and 5 (ones place).\n- 8 (from 1 place of first number) * 5 (from 1 place of second number) = 40 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 8 (from 1 place of first number) * 4 (from 10 place of second number) = 32 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 320\n- 8 (from 1 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 4 (from 10 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 200\n- 4 (from 10 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1600\n- 4 (from 10 place of first number) * 2 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 5 (from 100 place of first number) * 5 (from 1 place of second number) = 25 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2500\n- 5 (from 100 place of first number) * 4 (from 10 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 20000\n- 5 (from 100 place of first number) * 2 (from 100 place of second number) = 10 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 100000\n\nNow, add all these results together:\nThe sum of 40 + 320 + 1600 + 200 + 1600 + 8000 + 2500 + 20000 + 100000 = 134260."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 756 * 291?"}, {"role": "assistant", "content": "Here are the steps for multiplying 756 * 291 using the long multiplication method.\nStep 1: Break first number 756 into its individual digits: 7 (hundreds place), 5 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 291 into its individual digits: 2 (hundreds place), 9 (tens place), and 1 (ones place).\n- 6 (from 1 place of first number) * 1 (from 1 place of second number) = 6 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 6\n- 6 (from 1 place of first number) * 9 (from 10 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 540\n- 6 (from 1 place of first number) * 2 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 5 (from 10 place of first number) * 1 (from 1 place of second number) = 5 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 50\n- 5 (from 10 place of first number) * 9 (from 10 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4500\n- 5 (from 10 place of first number) * 2 (from 100 place of second number) = 10 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 10000\n- 7 (from 100 place of first number) * 1 (from 1 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 700\n- 7 (from 100 place of first number) * 9 (from 10 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 63000\n- 7 (from 100 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 140000\n\nNow, add all these results together:\nThe sum of 6 + 540 + 1200 + 50 + 4500 + 10000 + 700 + 63000 + 140000 = 219996."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 337 * 313?"}, {"role": "assistant", "content": "Here are the steps for multiplying 337 * 313 using the long multiplication method.\nStep 1: Break first number 337 into its individual digits: 3 (hundreds place), 3 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 313 into its individual digits: 3 (hundreds place), 1 (tens place), and 3 (ones place).\n- 7 (from 1 place of first number) * 3 (from 1 place of second number) = 21 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 21\n- 7 (from 1 place of first number) * 1 (from 10 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 70\n- 7 (from 1 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2100\n- 3 (from 10 place of first number) * 3 (from 1 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 90\n- 3 (from 10 place of first number) * 1 (from 10 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 300\n- 3 (from 10 place of first number) * 3 (from 100 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 9000\n- 3 (from 100 place of first number) * 3 (from 1 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 900\n- 3 (from 100 place of first number) * 1 (from 10 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 3 (from 100 place of first number) * 3 (from 100 place of second number) = 9 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 90000\n\nNow, add all these results together:\nThe sum of 21 + 70 + 2100 + 90 + 300 + 9000 + 900 + 3000 + 90000 = 105481."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 435 * 256?"}, {"role": "assistant", "content": "Here are the steps for multiplying 435 * 256 using the long multiplication method.\nStep 1: Break first number 435 into its individual digits: 4 (hundreds place), 3 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 256 into its individual digits: 2 (hundreds place), 5 (tens place), and 6 (ones place).\n- 5 (from 1 place of first number) * 6 (from 1 place of second number) = 30 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 5 (from 1 place of first number) * 5 (from 10 place of second number) = 25 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 250\n- 5 (from 1 place of first number) * 2 (from 100 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1000\n- 3 (from 10 place of first number) * 6 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 3 (from 10 place of first number) * 5 (from 10 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1500\n- 3 (from 10 place of first number) * 2 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 4 (from 100 place of first number) * 6 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 4 (from 100 place of first number) * 5 (from 10 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 20000\n- 4 (from 100 place of first number) * 2 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 30 + 250 + 1000 + 180 + 1500 + 6000 + 2400 + 20000 + 80000 = 111360."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 275 * 912?"}, {"role": "assistant", "content": "Here are the steps for multiplying 275 * 912 using the long multiplication method.\nStep 1: Break first number 275 into its individual digits: 2 (hundreds place), 7 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 912 into its individual digits: 9 (hundreds place), 1 (tens place), and 2 (ones place).\n- 5 (from 1 place of first number) * 2 (from 1 place of second number) = 10 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 10\n- 5 (from 1 place of first number) * 1 (from 10 place of second number) = 5 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 50\n- 5 (from 1 place of first number) * 9 (from 100 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4500\n- 7 (from 10 place of first number) * 2 (from 1 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 140\n- 7 (from 10 place of first number) * 1 (from 10 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 700\n- 7 (from 10 place of first number) * 9 (from 100 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 63000\n- 2 (from 100 place of first number) * 2 (from 1 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 2 (from 100 place of first number) * 1 (from 10 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 2 (from 100 place of first number) * 9 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 10 + 50 + 4500 + 140 + 700 + 63000 + 400 + 2000 + 180000 = 250800."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 386 * 219?"}, {"role": "assistant", "content": "Here are the steps for multiplying 386 * 219 using the long multiplication method.\nStep 1: Break first number 386 into its individual digits: 3 (hundreds place), 8 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 219 into its individual digits: 2 (hundreds place), 1 (tens place), and 9 (ones place).\n- 6 (from 1 place of first number) * 9 (from 1 place of second number) = 54 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 54\n- 6 (from 1 place of first number) * 1 (from 10 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 60\n- 6 (from 1 place of first number) * 2 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 8 (from 10 place of first number) * 9 (from 1 place of second number) = 72 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 720\n- 8 (from 10 place of first number) * 1 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 8 (from 10 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 16000\n- 3 (from 100 place of first number) * 9 (from 1 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2700\n- 3 (from 100 place of first number) * 1 (from 10 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 3 (from 100 place of first number) * 2 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 54 + 60 + 1200 + 720 + 800 + 16000 + 2700 + 3000 + 60000 = 84534."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 594 * 316?"}, {"role": "assistant", "content": "Here are the steps for multiplying 594 * 316 using the long multiplication method.\nStep 1: Break first number 594 into its individual digits: 5 (hundreds place), 9 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 316 into its individual digits: 3 (hundreds place), 1 (tens place), and 6 (ones place).\n- 4 (from 1 place of first number) * 6 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 4 (from 1 place of first number) * 1 (from 10 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 40\n- 4 (from 1 place of first number) * 3 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 9 (from 10 place of first number) * 6 (from 1 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 540\n- 9 (from 10 place of first number) * 1 (from 10 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 900\n- 9 (from 10 place of first number) * 3 (from 100 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 27000\n- 5 (from 100 place of first number) * 6 (from 1 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3000\n- 5 (from 100 place of first number) * 1 (from 10 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 5000\n- 5 (from 100 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 150000\n\nNow, add all these results together:\nThe sum of 24 + 40 + 1200 + 540 + 900 + 27000 + 3000 + 5000 + 150000 = 187704."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 142 * 993?"}, {"role": "assistant", "content": "Here are the steps for multiplying 142 * 993 using the long multiplication method.\nStep 1: Break first number 142 into its individual digits: 1 (hundreds place), 4 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 993 into its individual digits: 9 (hundreds place), 9 (tens place), and 3 (ones place).\n- 2 (from 1 place of first number) * 3 (from 1 place of second number) = 6 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 6\n- 2 (from 1 place of first number) * 9 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 2 (from 1 place of first number) * 9 (from 100 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1800\n- 4 (from 10 place of first number) * 3 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 4 (from 10 place of first number) * 9 (from 10 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3600\n- 4 (from 10 place of first number) * 9 (from 100 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 36000\n- 1 (from 100 place of first number) * 3 (from 1 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 1 (from 100 place of first number) * 9 (from 10 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 9000\n- 1 (from 100 place of first number) * 9 (from 100 place of second number) = 9 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 90000\n\nNow, add all these results together:\nThe sum of 6 + 180 + 1800 + 120 + 3600 + 36000 + 300 + 9000 + 90000 = 141006."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 325 * 744?"}, {"role": "assistant", "content": "Here are the steps for multiplying 325 * 744 using the long multiplication method.\nStep 1: Break first number 325 into its individual digits: 3 (hundreds place), 2 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 744 into its individual digits: 7 (hundreds place), 4 (tens place), and 4 (ones place).\n- 5 (from 1 place of first number) * 4 (from 1 place of second number) = 20 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 5 (from 1 place of first number) * 4 (from 10 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 200\n- 5 (from 1 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3500\n- 2 (from 10 place of first number) * 4 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 2 (from 10 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 2 (from 10 place of first number) * 7 (from 100 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 14000\n- 3 (from 100 place of first number) * 4 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 3 (from 100 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 3 (from 100 place of first number) * 7 (from 100 place of second number) = 21 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 210000\n\nNow, add all these results together:\nThe sum of 20 + 200 + 3500 + 80 + 800 + 14000 + 1200 + 12000 + 210000 = 241800."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 862 * 125?"}, {"role": "assistant", "content": "Here are the steps for multiplying 862 * 125 using the long multiplication method.\nStep 1: Break first number 862 into its individual digits: 8 (hundreds place), 6 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 125 into its individual digits: 1 (hundreds place), 2 (tens place), and 5 (ones place).\n- 2 (from 1 place of first number) * 5 (from 1 place of second number) = 10 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 10\n- 2 (from 1 place of first number) * 2 (from 10 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 40\n- 2 (from 1 place of first number) * 1 (from 100 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 200\n- 6 (from 10 place of first number) * 5 (from 1 place of second number) = 30 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 6 (from 10 place of first number) * 2 (from 10 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1200\n- 6 (from 10 place of first number) * 1 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 8 (from 100 place of first number) * 5 (from 1 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4000\n- 8 (from 100 place of first number) * 2 (from 10 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 16000\n- 8 (from 100 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 10 + 40 + 200 + 300 + 1200 + 6000 + 4000 + 16000 + 80000 = 107750."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 162 * 405?"}, {"role": "assistant", "content": "Here are the steps for multiplying 162 * 405 using the long multiplication method.\nStep 1: Break first number 162 into its individual digits: 1 (hundreds place), 6 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 405 into its individual digits: 4 (hundreds place), 0 (tens place), and 5 (ones place).\n- 2 (from 1 place of first number) * 5 (from 1 place of second number) = 10 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 10\n- 2 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 2 (from 1 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 6 (from 10 place of first number) * 5 (from 1 place of second number) = 30 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 6 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 6 (from 10 place of first number) * 4 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 1 (from 100 place of first number) * 5 (from 1 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 500\n- 1 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 1 (from 100 place of first number) * 4 (from 100 place of second number) = 4 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n\nNow, add all these results together:\nThe sum of 10 + 0 + 800 + 300 + 0 + 24000 + 500 + 0 + 40000 = 65610."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 562 * 878?"}, {"role": "assistant", "content": "Here are the steps for multiplying 562 * 878 using the long multiplication method.\nStep 1: Break first number 562 into its individual digits: 5 (hundreds place), 6 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 878 into its individual digits: 8 (hundreds place), 7 (tens place), and 8 (ones place).\n- 2 (from 1 place of first number) * 8 (from 1 place of second number) = 16 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 16\n- 2 (from 1 place of first number) * 7 (from 10 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 140\n- 2 (from 1 place of first number) * 8 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 6 (from 10 place of first number) * 8 (from 1 place of second number) = 48 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 480\n- 6 (from 10 place of first number) * 7 (from 10 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4200\n- 6 (from 10 place of first number) * 8 (from 100 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 48000\n- 5 (from 100 place of first number) * 8 (from 1 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4000\n- 5 (from 100 place of first number) * 7 (from 10 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 35000\n- 5 (from 100 place of first number) * 8 (from 100 place of second number) = 40 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 400000\n\nNow, add all these results together:\nThe sum of 16 + 140 + 1600 + 480 + 4200 + 48000 + 4000 + 35000 + 400000 = 493436."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 548 * 710?"}, {"role": "assistant", "content": "Here are the steps for multiplying 548 * 710 using the long multiplication method.\nStep 1: Break first number 548 into its individual digits: 5 (hundreds place), 4 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 710 into its individual digits: 7 (hundreds place), 1 (tens place), and 0 (ones place).\n- 8 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 1 place of first number) * 1 (from 10 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 80\n- 8 (from 1 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5600\n- 4 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 4 (from 10 place of first number) * 1 (from 10 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 4 (from 10 place of first number) * 7 (from 100 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 28000\n- 5 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 5 (from 100 place of first number) * 1 (from 10 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 5000\n- 5 (from 100 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 350000\n\nNow, add all these results together:\nThe sum of 0 + 80 + 5600 + 0 + 400 + 28000 + 0 + 5000 + 350000 = 389080."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 261 * 910?"}, {"role": "assistant", "content": "Here are the steps for multiplying 261 * 910 using the long multiplication method.\nStep 1: Break first number 261 into its individual digits: 2 (hundreds place), 6 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 910 into its individual digits: 9 (hundreds place), 1 (tens place), and 0 (ones place).\n- 1 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 1 (from 1 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 10\n- 1 (from 1 place of first number) * 9 (from 100 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 900\n- 6 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 6 (from 10 place of first number) * 1 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 6 (from 10 place of first number) * 9 (from 100 place of second number) = 54 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 54000\n- 2 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 2 (from 100 place of first number) * 1 (from 10 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 2 (from 100 place of first number) * 9 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 0 + 10 + 900 + 0 + 600 + 54000 + 0 + 2000 + 180000 = 237510."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 739 * 641?"}, {"role": "assistant", "content": "Here are the steps for multiplying 739 * 641 using the long multiplication method.\nStep 1: Break first number 739 into its individual digits: 7 (hundreds place), 3 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 641 into its individual digits: 6 (hundreds place), 4 (tens place), and 1 (ones place).\n- 9 (from 1 place of first number) * 1 (from 1 place of second number) = 9 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 9\n- 9 (from 1 place of first number) * 4 (from 10 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 360\n- 9 (from 1 place of first number) * 6 (from 100 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5400\n- 3 (from 10 place of first number) * 1 (from 1 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 3 (from 10 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1200\n- 3 (from 10 place of first number) * 6 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 7 (from 100 place of first number) * 1 (from 1 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 700\n- 7 (from 100 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 28000\n- 7 (from 100 place of first number) * 6 (from 100 place of second number) = 42 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 420000\n\nNow, add all these results together:\nThe sum of 9 + 360 + 5400 + 30 + 1200 + 18000 + 700 + 28000 + 420000 = 473699."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 307 * 516?"}, {"role": "assistant", "content": "Here are the steps for multiplying 307 * 516 using the long multiplication method.\nStep 1: Break first number 307 into its individual digits: 3 (hundreds place), 0 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 516 into its individual digits: 5 (hundreds place), 1 (tens place), and 6 (ones place).\n- 7 (from 1 place of first number) * 6 (from 1 place of second number) = 42 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 42\n- 7 (from 1 place of first number) * 1 (from 10 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 70\n- 7 (from 1 place of first number) * 5 (from 100 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3500\n- 0 (from 10 place of first number) * 6 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 1 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 5 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 3 (from 100 place of first number) * 6 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 3 (from 100 place of first number) * 1 (from 10 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 3 (from 100 place of first number) * 5 (from 100 place of second number) = 15 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 150000\n\nNow, add all these results together:\nThe sum of 42 + 70 + 3500 + 0 + 0 + 0 + 1800 + 3000 + 150000 = 158412."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 227 * 836?"}, {"role": "assistant", "content": "Here are the steps for multiplying 227 * 836 using the long multiplication method.\nStep 1: Break first number 227 into its individual digits: 2 (hundreds place), 2 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 836 into its individual digits: 8 (hundreds place), 3 (tens place), and 6 (ones place).\n- 7 (from 1 place of first number) * 6 (from 1 place of second number) = 42 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 42\n- 7 (from 1 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 210\n- 7 (from 1 place of first number) * 8 (from 100 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5600\n- 2 (from 10 place of first number) * 6 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 2 (from 10 place of first number) * 3 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 2 (from 10 place of first number) * 8 (from 100 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 16000\n- 2 (from 100 place of first number) * 6 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 2 (from 100 place of first number) * 3 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 2 (from 100 place of first number) * 8 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 42 + 210 + 5600 + 120 + 600 + 16000 + 1200 + 6000 + 160000 = 189772."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 993 * 536?"}, {"role": "assistant", "content": "Here are the steps for multiplying 993 * 536 using the long multiplication method.\nStep 1: Break first number 993 into its individual digits: 9 (hundreds place), 9 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 536 into its individual digits: 5 (hundreds place), 3 (tens place), and 6 (ones place).\n- 3 (from 1 place of first number) * 6 (from 1 place of second number) = 18 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 18\n- 3 (from 1 place of first number) * 3 (from 10 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 90\n- 3 (from 1 place of first number) * 5 (from 100 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1500\n- 9 (from 10 place of first number) * 6 (from 1 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 540\n- 9 (from 10 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2700\n- 9 (from 10 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 45000\n- 9 (from 100 place of first number) * 6 (from 1 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 5400\n- 9 (from 100 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 27000\n- 9 (from 100 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 450000\n\nNow, add all these results together:\nThe sum of 18 + 90 + 1500 + 540 + 2700 + 45000 + 5400 + 27000 + 450000 = 532248."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 467 * 857?"}, {"role": "assistant", "content": "Here are the steps for multiplying 467 * 857 using the long multiplication method.\nStep 1: Break first number 467 into its individual digits: 4 (hundreds place), 6 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 857 into its individual digits: 8 (hundreds place), 5 (tens place), and 7 (ones place).\n- 7 (from 1 place of first number) * 7 (from 1 place of second number) = 49 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 49\n- 7 (from 1 place of first number) * 5 (from 10 place of second number) = 35 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 350\n- 7 (from 1 place of first number) * 8 (from 100 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5600\n- 6 (from 10 place of first number) * 7 (from 1 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 420\n- 6 (from 10 place of first number) * 5 (from 10 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 6 (from 10 place of first number) * 8 (from 100 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 48000\n- 4 (from 100 place of first number) * 7 (from 1 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2800\n- 4 (from 100 place of first number) * 5 (from 10 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 20000\n- 4 (from 100 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 320000\n\nNow, add all these results together:\nThe sum of 49 + 350 + 5600 + 420 + 3000 + 48000 + 2800 + 20000 + 320000 = 400219."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 812 * 100?"}, {"role": "assistant", "content": "Here are the steps for multiplying 812 * 100 using the long multiplication method.\nStep 1: Break first number 812 into its individual digits: 8 (hundreds place), 1 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 100 into its individual digits: 1 (hundreds place), 0 (tens place), and 0 (ones place).\n- 2 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 2 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 2 (from 1 place of first number) * 1 (from 100 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 200\n- 1 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 1 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 1 (from 10 place of first number) * 1 (from 100 place of second number) = 1 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 1000\n- 8 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 8 (from 100 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 200 + 0 + 0 + 1000 + 0 + 0 + 80000 = 81200."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 321 * 914?"}, {"role": "assistant", "content": "Here are the steps for multiplying 321 * 914 using the long multiplication method.\nStep 1: Break first number 321 into its individual digits: 3 (hundreds place), 2 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 914 into its individual digits: 9 (hundreds place), 1 (tens place), and 4 (ones place).\n- 1 (from 1 place of first number) * 4 (from 1 place of second number) = 4 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 4\n- 1 (from 1 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 10\n- 1 (from 1 place of first number) * 9 (from 100 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 900\n- 2 (from 10 place of first number) * 4 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 2 (from 10 place of first number) * 1 (from 10 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 200\n- 2 (from 10 place of first number) * 9 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 3 (from 100 place of first number) * 4 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 3 (from 100 place of first number) * 1 (from 10 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 3 (from 100 place of first number) * 9 (from 100 place of second number) = 27 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 270000\n\nNow, add all these results together:\nThe sum of 4 + 10 + 900 + 80 + 200 + 18000 + 1200 + 3000 + 270000 = 293394."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 606 * 514?"}, {"role": "assistant", "content": "Here are the steps for multiplying 606 * 514 using the long multiplication method.\nStep 1: Break first number 606 into its individual digits: 6 (hundreds place), 0 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 514 into its individual digits: 5 (hundreds place), 1 (tens place), and 4 (ones place).\n- 6 (from 1 place of first number) * 4 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 6 (from 1 place of first number) * 1 (from 10 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 60\n- 6 (from 1 place of first number) * 5 (from 100 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 0 (from 10 place of first number) * 4 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 1 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 5 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 6 (from 100 place of first number) * 4 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 6 (from 100 place of first number) * 1 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 6 (from 100 place of first number) * 5 (from 100 place of second number) = 30 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 300000\n\nNow, add all these results together:\nThe sum of 24 + 60 + 3000 + 0 + 0 + 0 + 2400 + 6000 + 300000 = 311484."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 464 * 402?"}, {"role": "assistant", "content": "Here are the steps for multiplying 464 * 402 using the long multiplication method.\nStep 1: Break first number 464 into its individual digits: 4 (hundreds place), 6 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 402 into its individual digits: 4 (hundreds place), 0 (tens place), and 2 (ones place).\n- 4 (from 1 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 4 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 4 (from 1 place of first number) * 4 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 6 (from 10 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 6 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 6 (from 10 place of first number) * 4 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 4 (from 100 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 4 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 4 (from 100 place of first number) * 4 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 8 + 0 + 1600 + 120 + 0 + 24000 + 800 + 0 + 160000 = 186528."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 748 * 157?"}, {"role": "assistant", "content": "Here are the steps for multiplying 748 * 157 using the long multiplication method.\nStep 1: Break first number 748 into its individual digits: 7 (hundreds place), 4 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 157 into its individual digits: 1 (hundreds place), 5 (tens place), and 7 (ones place).\n- 8 (from 1 place of first number) * 7 (from 1 place of second number) = 56 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 56\n- 8 (from 1 place of first number) * 5 (from 10 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 8 (from 1 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 4 (from 10 place of first number) * 7 (from 1 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 280\n- 4 (from 10 place of first number) * 5 (from 10 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 4 (from 10 place of first number) * 1 (from 100 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 7 (from 100 place of first number) * 7 (from 1 place of second number) = 49 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4900\n- 7 (from 100 place of first number) * 5 (from 10 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 35000\n- 7 (from 100 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 70000\n\nNow, add all these results together:\nThe sum of 56 + 400 + 800 + 280 + 2000 + 4000 + 4900 + 35000 + 70000 = 117436."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 377 * 938?"}, {"role": "assistant", "content": "Here are the steps for multiplying 377 * 938 using the long multiplication method.\nStep 1: Break first number 377 into its individual digits: 3 (hundreds place), 7 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 938 into its individual digits: 9 (hundreds place), 3 (tens place), and 8 (ones place).\n- 7 (from 1 place of first number) * 8 (from 1 place of second number) = 56 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 56\n- 7 (from 1 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 210\n- 7 (from 1 place of first number) * 9 (from 100 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 6300\n- 7 (from 10 place of first number) * 8 (from 1 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 560\n- 7 (from 10 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2100\n- 7 (from 10 place of first number) * 9 (from 100 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 63000\n- 3 (from 100 place of first number) * 8 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 3 (from 100 place of first number) * 3 (from 10 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 9000\n- 3 (from 100 place of first number) * 9 (from 100 place of second number) = 27 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 270000\n\nNow, add all these results together:\nThe sum of 56 + 210 + 6300 + 560 + 2100 + 63000 + 2400 + 9000 + 270000 = 353626."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 689 * 201?"}, {"role": "assistant", "content": "Here are the steps for multiplying 689 * 201 using the long multiplication method.\nStep 1: Break first number 689 into its individual digits: 6 (hundreds place), 8 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 201 into its individual digits: 2 (hundreds place), 0 (tens place), and 1 (ones place).\n- 9 (from 1 place of first number) * 1 (from 1 place of second number) = 9 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 9\n- 9 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 9 (from 1 place of first number) * 2 (from 100 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1800\n- 8 (from 10 place of first number) * 1 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 8 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 8 (from 10 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 16000\n- 6 (from 100 place of first number) * 1 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 6 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 6 (from 100 place of first number) * 2 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 9 + 0 + 1800 + 80 + 0 + 16000 + 600 + 0 + 120000 = 138489."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 228 * 153?"}, {"role": "assistant", "content": "Here are the steps for multiplying 228 * 153 using the long multiplication method.\nStep 1: Break first number 228 into its individual digits: 2 (hundreds place), 2 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 153 into its individual digits: 1 (hundreds place), 5 (tens place), and 3 (ones place).\n- 8 (from 1 place of first number) * 3 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 8 (from 1 place of first number) * 5 (from 10 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 8 (from 1 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 2 (from 10 place of first number) * 3 (from 1 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 60\n- 2 (from 10 place of first number) * 5 (from 10 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1000\n- 2 (from 10 place of first number) * 1 (from 100 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 2 (from 100 place of first number) * 3 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 2 (from 100 place of first number) * 5 (from 10 place of second number) = 10 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 10000\n- 2 (from 100 place of first number) * 1 (from 100 place of second number) = 2 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n\nNow, add all these results together:\nThe sum of 24 + 400 + 800 + 60 + 1000 + 2000 + 600 + 10000 + 20000 = 34884."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 830 * 327?"}, {"role": "assistant", "content": "Here are the steps for multiplying 830 * 327 using the long multiplication method.\nStep 1: Break first number 830 into its individual digits: 8 (hundreds place), 3 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 327 into its individual digits: 3 (hundreds place), 2 (tens place), and 7 (ones place).\n- 0 (from 1 place of first number) * 7 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 2 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 3 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 3 (from 10 place of first number) * 7 (from 1 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 210\n- 3 (from 10 place of first number) * 2 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 3 (from 10 place of first number) * 3 (from 100 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 9000\n- 8 (from 100 place of first number) * 7 (from 1 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 5600\n- 8 (from 100 place of first number) * 2 (from 10 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 16000\n- 8 (from 100 place of first number) * 3 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 210 + 600 + 9000 + 5600 + 16000 + 240000 = 271410."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 504 * 915?"}, {"role": "assistant", "content": "Here are the steps for multiplying 504 * 915 using the long multiplication method.\nStep 1: Break first number 504 into its individual digits: 5 (hundreds place), 0 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 915 into its individual digits: 9 (hundreds place), 1 (tens place), and 5 (ones place).\n- 4 (from 1 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 4 (from 1 place of first number) * 1 (from 10 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 40\n- 4 (from 1 place of first number) * 9 (from 100 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3600\n- 0 (from 10 place of first number) * 5 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 1 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 9 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 5 (from 100 place of first number) * 5 (from 1 place of second number) = 25 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2500\n- 5 (from 100 place of first number) * 1 (from 10 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 5000\n- 5 (from 100 place of first number) * 9 (from 100 place of second number) = 45 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 450000\n\nNow, add all these results together:\nThe sum of 20 + 40 + 3600 + 0 + 0 + 0 + 2500 + 5000 + 450000 = 461160."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 972 * 522?"}, {"role": "assistant", "content": "Here are the steps for multiplying 972 * 522 using the long multiplication method.\nStep 1: Break first number 972 into its individual digits: 9 (hundreds place), 7 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 522 into its individual digits: 5 (hundreds place), 2 (tens place), and 2 (ones place).\n- 2 (from 1 place of first number) * 2 (from 1 place of second number) = 4 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 4\n- 2 (from 1 place of first number) * 2 (from 10 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 40\n- 2 (from 1 place of first number) * 5 (from 100 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1000\n- 7 (from 10 place of first number) * 2 (from 1 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 140\n- 7 (from 10 place of first number) * 2 (from 10 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1400\n- 7 (from 10 place of first number) * 5 (from 100 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 35000\n- 9 (from 100 place of first number) * 2 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 9 (from 100 place of first number) * 2 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 9 (from 100 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 450000\n\nNow, add all these results together:\nThe sum of 4 + 40 + 1000 + 140 + 1400 + 35000 + 1800 + 18000 + 450000 = 507384."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 596 * 542?"}, {"role": "assistant", "content": "Here are the steps for multiplying 596 * 542 using the long multiplication method.\nStep 1: Break first number 596 into its individual digits: 5 (hundreds place), 9 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 542 into its individual digits: 5 (hundreds place), 4 (tens place), and 2 (ones place).\n- 6 (from 1 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 12\n- 6 (from 1 place of first number) * 4 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 6 (from 1 place of first number) * 5 (from 100 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 9 (from 10 place of first number) * 2 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 9 (from 10 place of first number) * 4 (from 10 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3600\n- 9 (from 10 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 45000\n- 5 (from 100 place of first number) * 2 (from 1 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1000\n- 5 (from 100 place of first number) * 4 (from 10 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 20000\n- 5 (from 100 place of first number) * 5 (from 100 place of second number) = 25 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 250000\n\nNow, add all these results together:\nThe sum of 12 + 240 + 3000 + 180 + 3600 + 45000 + 1000 + 20000 + 250000 = 323032."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 487 * 385?"}, {"role": "assistant", "content": "Here are the steps for multiplying 487 * 385 using the long multiplication method.\nStep 1: Break first number 487 into its individual digits: 4 (hundreds place), 8 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 385 into its individual digits: 3 (hundreds place), 8 (tens place), and 5 (ones place).\n- 7 (from 1 place of first number) * 5 (from 1 place of second number) = 35 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 35\n- 7 (from 1 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 560\n- 7 (from 1 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2100\n- 8 (from 10 place of first number) * 5 (from 1 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 8 (from 10 place of first number) * 8 (from 10 place of second number) = 64 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 6400\n- 8 (from 10 place of first number) * 3 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 4 (from 100 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2000\n- 4 (from 100 place of first number) * 8 (from 10 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 32000\n- 4 (from 100 place of first number) * 3 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 35 + 560 + 2100 + 400 + 6400 + 24000 + 2000 + 32000 + 120000 = 187495."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 174 * 553?"}, {"role": "assistant", "content": "Here are the steps for multiplying 174 * 553 using the long multiplication method.\nStep 1: Break first number 174 into its individual digits: 1 (hundreds place), 7 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 553 into its individual digits: 5 (hundreds place), 5 (tens place), and 3 (ones place).\n- 4 (from 1 place of first number) * 3 (from 1 place of second number) = 12 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 12\n- 4 (from 1 place of first number) * 5 (from 10 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 200\n- 4 (from 1 place of first number) * 5 (from 100 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 7 (from 10 place of first number) * 3 (from 1 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 210\n- 7 (from 10 place of first number) * 5 (from 10 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3500\n- 7 (from 10 place of first number) * 5 (from 100 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 35000\n- 1 (from 100 place of first number) * 3 (from 1 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 1 (from 100 place of first number) * 5 (from 10 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 5000\n- 1 (from 100 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 50000\n\nNow, add all these results together:\nThe sum of 12 + 200 + 2000 + 210 + 3500 + 35000 + 300 + 5000 + 50000 = 96222."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 395 * 232?"}, {"role": "assistant", "content": "Here are the steps for multiplying 395 * 232 using the long multiplication method.\nStep 1: Break first number 395 into its individual digits: 3 (hundreds place), 9 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 232 into its individual digits: 2 (hundreds place), 3 (tens place), and 2 (ones place).\n- 5 (from 1 place of first number) * 2 (from 1 place of second number) = 10 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 10\n- 5 (from 1 place of first number) * 3 (from 10 place of second number) = 15 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 150\n- 5 (from 1 place of first number) * 2 (from 100 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1000\n- 9 (from 10 place of first number) * 2 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 9 (from 10 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2700\n- 9 (from 10 place of first number) * 2 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 3 (from 100 place of first number) * 2 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 3 (from 100 place of first number) * 3 (from 10 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 9000\n- 3 (from 100 place of first number) * 2 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 10 + 150 + 1000 + 180 + 2700 + 18000 + 600 + 9000 + 60000 = 91640."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 116 * 632?"}, {"role": "assistant", "content": "Here are the steps for multiplying 116 * 632 using the long multiplication method.\nStep 1: Break first number 116 into its individual digits: 1 (hundreds place), 1 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 632 into its individual digits: 6 (hundreds place), 3 (tens place), and 2 (ones place).\n- 6 (from 1 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 12\n- 6 (from 1 place of first number) * 3 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 6 (from 1 place of first number) * 6 (from 100 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3600\n- 1 (from 10 place of first number) * 2 (from 1 place of second number) = 2 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 1 (from 10 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 300\n- 1 (from 10 place of first number) * 6 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 1 (from 100 place of first number) * 2 (from 1 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 200\n- 1 (from 100 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 1 (from 100 place of first number) * 6 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 12 + 180 + 3600 + 20 + 300 + 6000 + 200 + 3000 + 60000 = 73312."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 241 * 500?"}, {"role": "assistant", "content": "Here are the steps for multiplying 241 * 500 using the long multiplication method.\nStep 1: Break first number 241 into its individual digits: 2 (hundreds place), 4 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 500 into its individual digits: 5 (hundreds place), 0 (tens place), and 0 (ones place).\n- 1 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 1 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 1 (from 1 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 500\n- 4 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 4 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 4 (from 10 place of first number) * 5 (from 100 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n- 2 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 2 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 2 (from 100 place of first number) * 5 (from 100 place of second number) = 10 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 100000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 500 + 0 + 0 + 20000 + 0 + 0 + 100000 = 120500."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 246 * 946?"}, {"role": "assistant", "content": "Here are the steps for multiplying 246 * 946 using the long multiplication method.\nStep 1: Break first number 246 into its individual digits: 2 (hundreds place), 4 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 946 into its individual digits: 9 (hundreds place), 4 (tens place), and 6 (ones place).\n- 6 (from 1 place of first number) * 6 (from 1 place of second number) = 36 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 36\n- 6 (from 1 place of first number) * 4 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 6 (from 1 place of first number) * 9 (from 100 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5400\n- 4 (from 10 place of first number) * 6 (from 1 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 240\n- 4 (from 10 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1600\n- 4 (from 10 place of first number) * 9 (from 100 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 36000\n- 2 (from 100 place of first number) * 6 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 2 (from 100 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 2 (from 100 place of first number) * 9 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 36 + 240 + 5400 + 240 + 1600 + 36000 + 1200 + 8000 + 180000 = 232716."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 687 * 107?"}, {"role": "assistant", "content": "Here are the steps for multiplying 687 * 107 using the long multiplication method.\nStep 1: Break first number 687 into its individual digits: 6 (hundreds place), 8 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 107 into its individual digits: 1 (hundreds place), 0 (tens place), and 7 (ones place).\n- 7 (from 1 place of first number) * 7 (from 1 place of second number) = 49 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 49\n- 7 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 7 (from 1 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 700\n- 8 (from 10 place of first number) * 7 (from 1 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 560\n- 8 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 8 (from 10 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 6 (from 100 place of first number) * 7 (from 1 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4200\n- 6 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 6 (from 100 place of first number) * 1 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 49 + 0 + 700 + 560 + 0 + 8000 + 4200 + 0 + 60000 = 73509."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 137 * 237?"}, {"role": "assistant", "content": "Here are the steps for multiplying 137 * 237 using the long multiplication method.\nStep 1: Break first number 137 into its individual digits: 1 (hundreds place), 3 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 237 into its individual digits: 2 (hundreds place), 3 (tens place), and 7 (ones place).\n- 7 (from 1 place of first number) * 7 (from 1 place of second number) = 49 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 49\n- 7 (from 1 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 210\n- 7 (from 1 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1400\n- 3 (from 10 place of first number) * 7 (from 1 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 210\n- 3 (from 10 place of first number) * 3 (from 10 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 900\n- 3 (from 10 place of first number) * 2 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 1 (from 100 place of first number) * 7 (from 1 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 700\n- 1 (from 100 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 1 (from 100 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n\nNow, add all these results together:\nThe sum of 49 + 210 + 1400 + 210 + 900 + 6000 + 700 + 3000 + 20000 = 32469."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 353 * 935?"}, {"role": "assistant", "content": "Here are the steps for multiplying 353 * 935 using the long multiplication method.\nStep 1: Break first number 353 into its individual digits: 3 (hundreds place), 5 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 935 into its individual digits: 9 (hundreds place), 3 (tens place), and 5 (ones place).\n- 3 (from 1 place of first number) * 5 (from 1 place of second number) = 15 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 15\n- 3 (from 1 place of first number) * 3 (from 10 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 90\n- 3 (from 1 place of first number) * 9 (from 100 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2700\n- 5 (from 10 place of first number) * 5 (from 1 place of second number) = 25 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 250\n- 5 (from 10 place of first number) * 3 (from 10 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1500\n- 5 (from 10 place of first number) * 9 (from 100 place of second number) = 45 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 45000\n- 3 (from 100 place of first number) * 5 (from 1 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1500\n- 3 (from 100 place of first number) * 3 (from 10 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 9000\n- 3 (from 100 place of first number) * 9 (from 100 place of second number) = 27 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 270000\n\nNow, add all these results together:\nThe sum of 15 + 90 + 2700 + 250 + 1500 + 45000 + 1500 + 9000 + 270000 = 330055."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 978 * 888?"}, {"role": "assistant", "content": "Here are the steps for multiplying 978 * 888 using the long multiplication method.\nStep 1: Break first number 978 into its individual digits: 9 (hundreds place), 7 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 888 into its individual digits: 8 (hundreds place), 8 (tens place), and 8 (ones place).\n- 8 (from 1 place of first number) * 8 (from 1 place of second number) = 64 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 64\n- 8 (from 1 place of first number) * 8 (from 10 place of second number) = 64 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 640\n- 8 (from 1 place of first number) * 8 (from 100 place of second number) = 64 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 6400\n- 7 (from 10 place of first number) * 8 (from 1 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 560\n- 7 (from 10 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5600\n- 7 (from 10 place of first number) * 8 (from 100 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 56000\n- 9 (from 100 place of first number) * 8 (from 1 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 7200\n- 9 (from 100 place of first number) * 8 (from 10 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 72000\n- 9 (from 100 place of first number) * 8 (from 100 place of second number) = 72 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 720000\n\nNow, add all these results together:\nThe sum of 64 + 640 + 6400 + 560 + 5600 + 56000 + 7200 + 72000 + 720000 = 868464."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 101 * 770?"}, {"role": "assistant", "content": "Here are the steps for multiplying 101 * 770 using the long multiplication method.\nStep 1: Break first number 101 into its individual digits: 1 (hundreds place), 0 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 770 into its individual digits: 7 (hundreds place), 7 (tens place), and 0 (ones place).\n- 1 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 1 (from 1 place of first number) * 7 (from 10 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 70\n- 1 (from 1 place of first number) * 7 (from 100 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 700\n- 0 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 7 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 7 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 1 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 1 (from 100 place of first number) * 7 (from 10 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 7000\n- 1 (from 100 place of first number) * 7 (from 100 place of second number) = 7 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 70000\n\nNow, add all these results together:\nThe sum of 0 + 70 + 700 + 0 + 0 + 0 + 0 + 7000 + 70000 = 77770."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 680 * 121?"}, {"role": "assistant", "content": "Here are the steps for multiplying 680 * 121 using the long multiplication method.\nStep 1: Break first number 680 into its individual digits: 6 (hundreds place), 8 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 121 into its individual digits: 1 (hundreds place), 2 (tens place), and 1 (ones place).\n- 0 (from 1 place of first number) * 1 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 2 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 1 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 8 (from 10 place of first number) * 1 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 8 (from 10 place of first number) * 2 (from 10 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1600\n- 8 (from 10 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 6 (from 100 place of first number) * 1 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 6 (from 100 place of first number) * 2 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 6 (from 100 place of first number) * 1 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 80 + 1600 + 8000 + 600 + 12000 + 60000 = 82280."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 433 * 953?"}, {"role": "assistant", "content": "Here are the steps for multiplying 433 * 953 using the long multiplication method.\nStep 1: Break first number 433 into its individual digits: 4 (hundreds place), 3 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 953 into its individual digits: 9 (hundreds place), 5 (tens place), and 3 (ones place).\n- 3 (from 1 place of first number) * 3 (from 1 place of second number) = 9 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 9\n- 3 (from 1 place of first number) * 5 (from 10 place of second number) = 15 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 150\n- 3 (from 1 place of first number) * 9 (from 100 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2700\n- 3 (from 10 place of first number) * 3 (from 1 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 90\n- 3 (from 10 place of first number) * 5 (from 10 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1500\n- 3 (from 10 place of first number) * 9 (from 100 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 27000\n- 4 (from 100 place of first number) * 3 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 4 (from 100 place of first number) * 5 (from 10 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 20000\n- 4 (from 100 place of first number) * 9 (from 100 place of second number) = 36 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 360000\n\nNow, add all these results together:\nThe sum of 9 + 150 + 2700 + 90 + 1500 + 27000 + 1200 + 20000 + 360000 = 412649."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 947 * 990?"}, {"role": "assistant", "content": "Here are the steps for multiplying 947 * 990 using the long multiplication method.\nStep 1: Break first number 947 into its individual digits: 9 (hundreds place), 4 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 990 into its individual digits: 9 (hundreds place), 9 (tens place), and 0 (ones place).\n- 7 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 1 place of first number) * 9 (from 10 place of second number) = 63 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 630\n- 7 (from 1 place of first number) * 9 (from 100 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 6300\n- 4 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 4 (from 10 place of first number) * 9 (from 10 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3600\n- 4 (from 10 place of first number) * 9 (from 100 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 36000\n- 9 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 9 (from 100 place of first number) * 9 (from 10 place of second number) = 81 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 81000\n- 9 (from 100 place of first number) * 9 (from 100 place of second number) = 81 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 810000\n\nNow, add all these results together:\nThe sum of 0 + 630 + 6300 + 0 + 3600 + 36000 + 0 + 81000 + 810000 = 937530."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 396 * 911?"}, {"role": "assistant", "content": "Here are the steps for multiplying 396 * 911 using the long multiplication method.\nStep 1: Break first number 396 into its individual digits: 3 (hundreds place), 9 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 911 into its individual digits: 9 (hundreds place), 1 (tens place), and 1 (ones place).\n- 6 (from 1 place of first number) * 1 (from 1 place of second number) = 6 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 6\n- 6 (from 1 place of first number) * 1 (from 10 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 60\n- 6 (from 1 place of first number) * 9 (from 100 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5400\n- 9 (from 10 place of first number) * 1 (from 1 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 90\n- 9 (from 10 place of first number) * 1 (from 10 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 900\n- 9 (from 10 place of first number) * 9 (from 100 place of second number) = 81 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 81000\n- 3 (from 100 place of first number) * 1 (from 1 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 3 (from 100 place of first number) * 1 (from 10 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 3 (from 100 place of first number) * 9 (from 100 place of second number) = 27 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 270000\n\nNow, add all these results together:\nThe sum of 6 + 60 + 5400 + 90 + 900 + 81000 + 300 + 3000 + 270000 = 360756."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 743 * 823?"}, {"role": "assistant", "content": "Here are the steps for multiplying 743 * 823 using the long multiplication method.\nStep 1: Break first number 743 into its individual digits: 7 (hundreds place), 4 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 823 into its individual digits: 8 (hundreds place), 2 (tens place), and 3 (ones place).\n- 3 (from 1 place of first number) * 3 (from 1 place of second number) = 9 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 9\n- 3 (from 1 place of first number) * 2 (from 10 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 60\n- 3 (from 1 place of first number) * 8 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 4 (from 10 place of first number) * 3 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 4 (from 10 place of first number) * 2 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 4 (from 10 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 32000\n- 7 (from 100 place of first number) * 3 (from 1 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2100\n- 7 (from 100 place of first number) * 2 (from 10 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 14000\n- 7 (from 100 place of first number) * 8 (from 100 place of second number) = 56 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 560000\n\nNow, add all these results together:\nThe sum of 9 + 60 + 2400 + 120 + 800 + 32000 + 2100 + 14000 + 560000 = 611489."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 174 * 681?"}, {"role": "assistant", "content": "Here are the steps for multiplying 174 * 681 using the long multiplication method.\nStep 1: Break first number 174 into its individual digits: 1 (hundreds place), 7 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 681 into its individual digits: 6 (hundreds place), 8 (tens place), and 1 (ones place).\n- 4 (from 1 place of first number) * 1 (from 1 place of second number) = 4 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 4\n- 4 (from 1 place of first number) * 8 (from 10 place of second number) = 32 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 320\n- 4 (from 1 place of first number) * 6 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 7 (from 10 place of first number) * 1 (from 1 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 70\n- 7 (from 10 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5600\n- 7 (from 10 place of first number) * 6 (from 100 place of second number) = 42 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 42000\n- 1 (from 100 place of first number) * 1 (from 1 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 100\n- 1 (from 100 place of first number) * 8 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 1 (from 100 place of first number) * 6 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 4 + 320 + 2400 + 70 + 5600 + 42000 + 100 + 8000 + 60000 = 118494."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 781 * 864?"}, {"role": "assistant", "content": "Here are the steps for multiplying 781 * 864 using the long multiplication method.\nStep 1: Break first number 781 into its individual digits: 7 (hundreds place), 8 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 864 into its individual digits: 8 (hundreds place), 6 (tens place), and 4 (ones place).\n- 1 (from 1 place of first number) * 4 (from 1 place of second number) = 4 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 4\n- 1 (from 1 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 60\n- 1 (from 1 place of first number) * 8 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 8 (from 10 place of first number) * 4 (from 1 place of second number) = 32 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 320\n- 8 (from 10 place of first number) * 6 (from 10 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4800\n- 8 (from 10 place of first number) * 8 (from 100 place of second number) = 64 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 64000\n- 7 (from 100 place of first number) * 4 (from 1 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2800\n- 7 (from 100 place of first number) * 6 (from 10 place of second number) = 42 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 42000\n- 7 (from 100 place of first number) * 8 (from 100 place of second number) = 56 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 560000\n\nNow, add all these results together:\nThe sum of 4 + 60 + 800 + 320 + 4800 + 64000 + 2800 + 42000 + 560000 = 674784."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 375 * 371?"}, {"role": "assistant", "content": "Here are the steps for multiplying 375 * 371 using the long multiplication method.\nStep 1: Break first number 375 into its individual digits: 3 (hundreds place), 7 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 371 into its individual digits: 3 (hundreds place), 7 (tens place), and 1 (ones place).\n- 5 (from 1 place of first number) * 1 (from 1 place of second number) = 5 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 5\n- 5 (from 1 place of first number) * 7 (from 10 place of second number) = 35 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 350\n- 5 (from 1 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1500\n- 7 (from 10 place of first number) * 1 (from 1 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 70\n- 7 (from 10 place of first number) * 7 (from 10 place of second number) = 49 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4900\n- 7 (from 10 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 21000\n- 3 (from 100 place of first number) * 1 (from 1 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 3 (from 100 place of first number) * 7 (from 10 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 21000\n- 3 (from 100 place of first number) * 3 (from 100 place of second number) = 9 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 90000\n\nNow, add all these results together:\nThe sum of 5 + 350 + 1500 + 70 + 4900 + 21000 + 300 + 21000 + 90000 = 139125."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 414 * 499?"}, {"role": "assistant", "content": "Here are the steps for multiplying 414 * 499 using the long multiplication method.\nStep 1: Break first number 414 into its individual digits: 4 (hundreds place), 1 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 499 into its individual digits: 4 (hundreds place), 9 (tens place), and 9 (ones place).\n- 4 (from 1 place of first number) * 9 (from 1 place of second number) = 36 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 36\n- 4 (from 1 place of first number) * 9 (from 10 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 360\n- 4 (from 1 place of first number) * 4 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 1 (from 10 place of first number) * 9 (from 1 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 90\n- 1 (from 10 place of first number) * 9 (from 10 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 900\n- 1 (from 10 place of first number) * 4 (from 100 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 4 (from 100 place of first number) * 9 (from 1 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3600\n- 4 (from 100 place of first number) * 9 (from 10 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 36000\n- 4 (from 100 place of first number) * 4 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 36 + 360 + 1600 + 90 + 900 + 4000 + 3600 + 36000 + 160000 = 206586."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 237 * 936?"}, {"role": "assistant", "content": "Here are the steps for multiplying 237 * 936 using the long multiplication method.\nStep 1: Break first number 237 into its individual digits: 2 (hundreds place), 3 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 936 into its individual digits: 9 (hundreds place), 3 (tens place), and 6 (ones place).\n- 7 (from 1 place of first number) * 6 (from 1 place of second number) = 42 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 42\n- 7 (from 1 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 210\n- 7 (from 1 place of first number) * 9 (from 100 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 6300\n- 3 (from 10 place of first number) * 6 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 3 (from 10 place of first number) * 3 (from 10 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 900\n- 3 (from 10 place of first number) * 9 (from 100 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 27000\n- 2 (from 100 place of first number) * 6 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 2 (from 100 place of first number) * 3 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 2 (from 100 place of first number) * 9 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 42 + 210 + 6300 + 180 + 900 + 27000 + 1200 + 6000 + 180000 = 221832."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 166 * 625?"}, {"role": "assistant", "content": "Here are the steps for multiplying 166 * 625 using the long multiplication method.\nStep 1: Break first number 166 into its individual digits: 1 (hundreds place), 6 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 625 into its individual digits: 6 (hundreds place), 2 (tens place), and 5 (ones place).\n- 6 (from 1 place of first number) * 5 (from 1 place of second number) = 30 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 6 (from 1 place of first number) * 2 (from 10 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 120\n- 6 (from 1 place of first number) * 6 (from 100 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3600\n- 6 (from 10 place of first number) * 5 (from 1 place of second number) = 30 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 6 (from 10 place of first number) * 2 (from 10 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1200\n- 6 (from 10 place of first number) * 6 (from 100 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 36000\n- 1 (from 100 place of first number) * 5 (from 1 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 500\n- 1 (from 100 place of first number) * 2 (from 10 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 1 (from 100 place of first number) * 6 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 30 + 120 + 3600 + 300 + 1200 + 36000 + 500 + 2000 + 60000 = 103750."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 733 * 305?"}, {"role": "assistant", "content": "Here are the steps for multiplying 733 * 305 using the long multiplication method.\nStep 1: Break first number 733 into its individual digits: 7 (hundreds place), 3 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 305 into its individual digits: 3 (hundreds place), 0 (tens place), and 5 (ones place).\n- 3 (from 1 place of first number) * 5 (from 1 place of second number) = 15 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 15\n- 3 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 3 (from 1 place of first number) * 3 (from 100 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 900\n- 3 (from 10 place of first number) * 5 (from 1 place of second number) = 15 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 150\n- 3 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 3 (from 10 place of first number) * 3 (from 100 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 9000\n- 7 (from 100 place of first number) * 5 (from 1 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3500\n- 7 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 7 (from 100 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 210000\n\nNow, add all these results together:\nThe sum of 15 + 0 + 900 + 150 + 0 + 9000 + 3500 + 0 + 210000 = 223565."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 218 * 670?"}, {"role": "assistant", "content": "Here are the steps for multiplying 218 * 670 using the long multiplication method.\nStep 1: Break first number 218 into its individual digits: 2 (hundreds place), 1 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 670 into its individual digits: 6 (hundreds place), 7 (tens place), and 0 (ones place).\n- 8 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 1 place of first number) * 7 (from 10 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 560\n- 8 (from 1 place of first number) * 6 (from 100 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4800\n- 1 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 1 (from 10 place of first number) * 7 (from 10 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 700\n- 1 (from 10 place of first number) * 6 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 2 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 2 (from 100 place of first number) * 7 (from 10 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 14000\n- 2 (from 100 place of first number) * 6 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 0 + 560 + 4800 + 0 + 700 + 6000 + 0 + 14000 + 120000 = 146060."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 795 * 516?"}, {"role": "assistant", "content": "Here are the steps for multiplying 795 * 516 using the long multiplication method.\nStep 1: Break first number 795 into its individual digits: 7 (hundreds place), 9 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 516 into its individual digits: 5 (hundreds place), 1 (tens place), and 6 (ones place).\n- 5 (from 1 place of first number) * 6 (from 1 place of second number) = 30 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 5 (from 1 place of first number) * 1 (from 10 place of second number) = 5 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 50\n- 5 (from 1 place of first number) * 5 (from 100 place of second number) = 25 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2500\n- 9 (from 10 place of first number) * 6 (from 1 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 540\n- 9 (from 10 place of first number) * 1 (from 10 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 900\n- 9 (from 10 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 45000\n- 7 (from 100 place of first number) * 6 (from 1 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4200\n- 7 (from 100 place of first number) * 1 (from 10 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 7000\n- 7 (from 100 place of first number) * 5 (from 100 place of second number) = 35 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 350000\n\nNow, add all these results together:\nThe sum of 30 + 50 + 2500 + 540 + 900 + 45000 + 4200 + 7000 + 350000 = 410220."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 375 * 986?"}, {"role": "assistant", "content": "Here are the steps for multiplying 375 * 986 using the long multiplication method.\nStep 1: Break first number 375 into its individual digits: 3 (hundreds place), 7 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 986 into its individual digits: 9 (hundreds place), 8 (tens place), and 6 (ones place).\n- 5 (from 1 place of first number) * 6 (from 1 place of second number) = 30 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 5 (from 1 place of first number) * 8 (from 10 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 5 (from 1 place of first number) * 9 (from 100 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4500\n- 7 (from 10 place of first number) * 6 (from 1 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 420\n- 7 (from 10 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5600\n- 7 (from 10 place of first number) * 9 (from 100 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 63000\n- 3 (from 100 place of first number) * 6 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 3 (from 100 place of first number) * 8 (from 10 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 24000\n- 3 (from 100 place of first number) * 9 (from 100 place of second number) = 27 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 270000\n\nNow, add all these results together:\nThe sum of 30 + 400 + 4500 + 420 + 5600 + 63000 + 1800 + 24000 + 270000 = 369750."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 954 * 672?"}, {"role": "assistant", "content": "Here are the steps for multiplying 954 * 672 using the long multiplication method.\nStep 1: Break first number 954 into its individual digits: 9 (hundreds place), 5 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 672 into its individual digits: 6 (hundreds place), 7 (tens place), and 2 (ones place).\n- 4 (from 1 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 4 (from 1 place of first number) * 7 (from 10 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 280\n- 4 (from 1 place of first number) * 6 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 5 (from 10 place of first number) * 2 (from 1 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 100\n- 5 (from 10 place of first number) * 7 (from 10 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3500\n- 5 (from 10 place of first number) * 6 (from 100 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n- 9 (from 100 place of first number) * 2 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 9 (from 100 place of first number) * 7 (from 10 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 63000\n- 9 (from 100 place of first number) * 6 (from 100 place of second number) = 54 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 540000\n\nNow, add all these results together:\nThe sum of 8 + 280 + 2400 + 100 + 3500 + 30000 + 1800 + 63000 + 540000 = 641088."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 805 * 744?"}, {"role": "assistant", "content": "Here are the steps for multiplying 805 * 744 using the long multiplication method.\nStep 1: Break first number 805 into its individual digits: 8 (hundreds place), 0 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 744 into its individual digits: 7 (hundreds place), 4 (tens place), and 4 (ones place).\n- 5 (from 1 place of first number) * 4 (from 1 place of second number) = 20 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 5 (from 1 place of first number) * 4 (from 10 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 200\n- 5 (from 1 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3500\n- 0 (from 10 place of first number) * 4 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 4 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 7 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 8 (from 100 place of first number) * 4 (from 1 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3200\n- 8 (from 100 place of first number) * 4 (from 10 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 32000\n- 8 (from 100 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 560000\n\nNow, add all these results together:\nThe sum of 20 + 200 + 3500 + 0 + 0 + 0 + 3200 + 32000 + 560000 = 598920."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 169 * 743?"}, {"role": "assistant", "content": "Here are the steps for multiplying 169 * 743 using the long multiplication method.\nStep 1: Break first number 169 into its individual digits: 1 (hundreds place), 6 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 743 into its individual digits: 7 (hundreds place), 4 (tens place), and 3 (ones place).\n- 9 (from 1 place of first number) * 3 (from 1 place of second number) = 27 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 27\n- 9 (from 1 place of first number) * 4 (from 10 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 360\n- 9 (from 1 place of first number) * 7 (from 100 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 6300\n- 6 (from 10 place of first number) * 3 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 6 (from 10 place of first number) * 4 (from 10 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2400\n- 6 (from 10 place of first number) * 7 (from 100 place of second number) = 42 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 42000\n- 1 (from 100 place of first number) * 3 (from 1 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 1 (from 100 place of first number) * 4 (from 10 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 1 (from 100 place of first number) * 7 (from 100 place of second number) = 7 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 70000\n\nNow, add all these results together:\nThe sum of 27 + 360 + 6300 + 180 + 2400 + 42000 + 300 + 4000 + 70000 = 125567."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 274 * 241?"}, {"role": "assistant", "content": "Here are the steps for multiplying 274 * 241 using the long multiplication method.\nStep 1: Break first number 274 into its individual digits: 2 (hundreds place), 7 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 241 into its individual digits: 2 (hundreds place), 4 (tens place), and 1 (ones place).\n- 4 (from 1 place of first number) * 1 (from 1 place of second number) = 4 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 4\n- 4 (from 1 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 160\n- 4 (from 1 place of first number) * 2 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 7 (from 10 place of first number) * 1 (from 1 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 70\n- 7 (from 10 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2800\n- 7 (from 10 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 14000\n- 2 (from 100 place of first number) * 1 (from 1 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 200\n- 2 (from 100 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 2 (from 100 place of first number) * 2 (from 100 place of second number) = 4 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n\nNow, add all these results together:\nThe sum of 4 + 160 + 800 + 70 + 2800 + 14000 + 200 + 8000 + 40000 = 66034."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 387 * 845?"}, {"role": "assistant", "content": "Here are the steps for multiplying 387 * 845 using the long multiplication method.\nStep 1: Break first number 387 into its individual digits: 3 (hundreds place), 8 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 845 into its individual digits: 8 (hundreds place), 4 (tens place), and 5 (ones place).\n- 7 (from 1 place of first number) * 5 (from 1 place of second number) = 35 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 35\n- 7 (from 1 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 280\n- 7 (from 1 place of first number) * 8 (from 100 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5600\n- 8 (from 10 place of first number) * 5 (from 1 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 8 (from 10 place of first number) * 4 (from 10 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3200\n- 8 (from 10 place of first number) * 8 (from 100 place of second number) = 64 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 64000\n- 3 (from 100 place of first number) * 5 (from 1 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1500\n- 3 (from 100 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 3 (from 100 place of first number) * 8 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 35 + 280 + 5600 + 400 + 3200 + 64000 + 1500 + 12000 + 240000 = 327015."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 558 * 544?"}, {"role": "assistant", "content": "Here are the steps for multiplying 558 * 544 using the long multiplication method.\nStep 1: Break first number 558 into its individual digits: 5 (hundreds place), 5 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 544 into its individual digits: 5 (hundreds place), 4 (tens place), and 4 (ones place).\n- 8 (from 1 place of first number) * 4 (from 1 place of second number) = 32 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 32\n- 8 (from 1 place of first number) * 4 (from 10 place of second number) = 32 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 320\n- 8 (from 1 place of first number) * 5 (from 100 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 5 (from 10 place of first number) * 4 (from 1 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 200\n- 5 (from 10 place of first number) * 4 (from 10 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 5 (from 10 place of first number) * 5 (from 100 place of second number) = 25 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 25000\n- 5 (from 100 place of first number) * 4 (from 1 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2000\n- 5 (from 100 place of first number) * 4 (from 10 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 20000\n- 5 (from 100 place of first number) * 5 (from 100 place of second number) = 25 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 250000\n\nNow, add all these results together:\nThe sum of 32 + 320 + 4000 + 200 + 2000 + 25000 + 2000 + 20000 + 250000 = 303552."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 708 * 294?"}, {"role": "assistant", "content": "Here are the steps for multiplying 708 * 294 using the long multiplication method.\nStep 1: Break first number 708 into its individual digits: 7 (hundreds place), 0 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 294 into its individual digits: 2 (hundreds place), 9 (tens place), and 4 (ones place).\n- 8 (from 1 place of first number) * 4 (from 1 place of second number) = 32 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 32\n- 8 (from 1 place of first number) * 9 (from 10 place of second number) = 72 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 720\n- 8 (from 1 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 0 (from 10 place of first number) * 4 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 9 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 2 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 7 (from 100 place of first number) * 4 (from 1 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2800\n- 7 (from 100 place of first number) * 9 (from 10 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 63000\n- 7 (from 100 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 140000\n\nNow, add all these results together:\nThe sum of 32 + 720 + 1600 + 0 + 0 + 0 + 2800 + 63000 + 140000 = 208152."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 830 * 320?"}, {"role": "assistant", "content": "Here are the steps for multiplying 830 * 320 using the long multiplication method.\nStep 1: Break first number 830 into its individual digits: 8 (hundreds place), 3 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 320 into its individual digits: 3 (hundreds place), 2 (tens place), and 0 (ones place).\n- 0 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 2 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 3 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 3 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 3 (from 10 place of first number) * 2 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 3 (from 10 place of first number) * 3 (from 100 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 9000\n- 8 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 100 place of first number) * 2 (from 10 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 16000\n- 8 (from 100 place of first number) * 3 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 0 + 600 + 9000 + 0 + 16000 + 240000 = 265600."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 635 * 590?"}, {"role": "assistant", "content": "Here are the steps for multiplying 635 * 590 using the long multiplication method.\nStep 1: Break first number 635 into its individual digits: 6 (hundreds place), 3 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 590 into its individual digits: 5 (hundreds place), 9 (tens place), and 0 (ones place).\n- 5 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 5 (from 1 place of first number) * 9 (from 10 place of second number) = 45 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 450\n- 5 (from 1 place of first number) * 5 (from 100 place of second number) = 25 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2500\n- 3 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 3 (from 10 place of first number) * 9 (from 10 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2700\n- 3 (from 10 place of first number) * 5 (from 100 place of second number) = 15 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 15000\n- 6 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 6 (from 100 place of first number) * 9 (from 10 place of second number) = 54 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 54000\n- 6 (from 100 place of first number) * 5 (from 100 place of second number) = 30 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 300000\n\nNow, add all these results together:\nThe sum of 0 + 450 + 2500 + 0 + 2700 + 15000 + 0 + 54000 + 300000 = 374650."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 265 * 492?"}, {"role": "assistant", "content": "Here are the steps for multiplying 265 * 492 using the long multiplication method.\nStep 1: Break first number 265 into its individual digits: 2 (hundreds place), 6 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 492 into its individual digits: 4 (hundreds place), 9 (tens place), and 2 (ones place).\n- 5 (from 1 place of first number) * 2 (from 1 place of second number) = 10 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 10\n- 5 (from 1 place of first number) * 9 (from 10 place of second number) = 45 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 450\n- 5 (from 1 place of first number) * 4 (from 100 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 6 (from 10 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 6 (from 10 place of first number) * 9 (from 10 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5400\n- 6 (from 10 place of first number) * 4 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 2 (from 100 place of first number) * 2 (from 1 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 2 (from 100 place of first number) * 9 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 2 (from 100 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 10 + 450 + 2000 + 120 + 5400 + 24000 + 400 + 18000 + 80000 = 130380."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 244 * 982?"}, {"role": "assistant", "content": "Here are the steps for multiplying 244 * 982 using the long multiplication method.\nStep 1: Break first number 244 into its individual digits: 2 (hundreds place), 4 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 982 into its individual digits: 9 (hundreds place), 8 (tens place), and 2 (ones place).\n- 4 (from 1 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 4 (from 1 place of first number) * 8 (from 10 place of second number) = 32 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 320\n- 4 (from 1 place of first number) * 9 (from 100 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3600\n- 4 (from 10 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 4 (from 10 place of first number) * 8 (from 10 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3200\n- 4 (from 10 place of first number) * 9 (from 100 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 36000\n- 2 (from 100 place of first number) * 2 (from 1 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 2 (from 100 place of first number) * 8 (from 10 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 16000\n- 2 (from 100 place of first number) * 9 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 8 + 320 + 3600 + 80 + 3200 + 36000 + 400 + 16000 + 180000 = 239608."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 306 * 607?"}, {"role": "assistant", "content": "Here are the steps for multiplying 306 * 607 using the long multiplication method.\nStep 1: Break first number 306 into its individual digits: 3 (hundreds place), 0 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 607 into its individual digits: 6 (hundreds place), 0 (tens place), and 7 (ones place).\n- 6 (from 1 place of first number) * 7 (from 1 place of second number) = 42 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 42\n- 6 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 6 (from 1 place of first number) * 6 (from 100 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3600\n- 0 (from 10 place of first number) * 7 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 6 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 3 (from 100 place of first number) * 7 (from 1 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2100\n- 3 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 3 (from 100 place of first number) * 6 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 42 + 0 + 3600 + 0 + 0 + 0 + 2100 + 0 + 180000 = 185742."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 467 * 848?"}, {"role": "assistant", "content": "Here are the steps for multiplying 467 * 848 using the long multiplication method.\nStep 1: Break first number 467 into its individual digits: 4 (hundreds place), 6 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 848 into its individual digits: 8 (hundreds place), 4 (tens place), and 8 (ones place).\n- 7 (from 1 place of first number) * 8 (from 1 place of second number) = 56 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 56\n- 7 (from 1 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 280\n- 7 (from 1 place of first number) * 8 (from 100 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5600\n- 6 (from 10 place of first number) * 8 (from 1 place of second number) = 48 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 480\n- 6 (from 10 place of first number) * 4 (from 10 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2400\n- 6 (from 10 place of first number) * 8 (from 100 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 48000\n- 4 (from 100 place of first number) * 8 (from 1 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3200\n- 4 (from 100 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 16000\n- 4 (from 100 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 320000\n\nNow, add all these results together:\nThe sum of 56 + 280 + 5600 + 480 + 2400 + 48000 + 3200 + 16000 + 320000 = 396016."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 193 * 851?"}, {"role": "assistant", "content": "Here are the steps for multiplying 193 * 851 using the long multiplication method.\nStep 1: Break first number 193 into its individual digits: 1 (hundreds place), 9 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 851 into its individual digits: 8 (hundreds place), 5 (tens place), and 1 (ones place).\n- 3 (from 1 place of first number) * 1 (from 1 place of second number) = 3 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 3\n- 3 (from 1 place of first number) * 5 (from 10 place of second number) = 15 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 150\n- 3 (from 1 place of first number) * 8 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 9 (from 10 place of first number) * 1 (from 1 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 90\n- 9 (from 10 place of first number) * 5 (from 10 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4500\n- 9 (from 10 place of first number) * 8 (from 100 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 72000\n- 1 (from 100 place of first number) * 1 (from 1 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 100\n- 1 (from 100 place of first number) * 5 (from 10 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 5000\n- 1 (from 100 place of first number) * 8 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 3 + 150 + 2400 + 90 + 4500 + 72000 + 100 + 5000 + 80000 = 164243."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 287 * 628?"}, {"role": "assistant", "content": "Here are the steps for multiplying 287 * 628 using the long multiplication method.\nStep 1: Break first number 287 into its individual digits: 2 (hundreds place), 8 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 628 into its individual digits: 6 (hundreds place), 2 (tens place), and 8 (ones place).\n- 7 (from 1 place of first number) * 8 (from 1 place of second number) = 56 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 56\n- 7 (from 1 place of first number) * 2 (from 10 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 140\n- 7 (from 1 place of first number) * 6 (from 100 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4200\n- 8 (from 10 place of first number) * 8 (from 1 place of second number) = 64 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 640\n- 8 (from 10 place of first number) * 2 (from 10 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1600\n- 8 (from 10 place of first number) * 6 (from 100 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 48000\n- 2 (from 100 place of first number) * 8 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 2 (from 100 place of first number) * 2 (from 10 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 2 (from 100 place of first number) * 6 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 56 + 140 + 4200 + 640 + 1600 + 48000 + 1600 + 4000 + 120000 = 180236."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 761 * 373?"}, {"role": "assistant", "content": "Here are the steps for multiplying 761 * 373 using the long multiplication method.\nStep 1: Break first number 761 into its individual digits: 7 (hundreds place), 6 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 373 into its individual digits: 3 (hundreds place), 7 (tens place), and 3 (ones place).\n- 1 (from 1 place of first number) * 3 (from 1 place of second number) = 3 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 3\n- 1 (from 1 place of first number) * 7 (from 10 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 70\n- 1 (from 1 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 300\n- 6 (from 10 place of first number) * 3 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 6 (from 10 place of first number) * 7 (from 10 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4200\n- 6 (from 10 place of first number) * 3 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 7 (from 100 place of first number) * 3 (from 1 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2100\n- 7 (from 100 place of first number) * 7 (from 10 place of second number) = 49 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 49000\n- 7 (from 100 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 210000\n\nNow, add all these results together:\nThe sum of 3 + 70 + 300 + 180 + 4200 + 18000 + 2100 + 49000 + 210000 = 283853."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 844 * 175?"}, {"role": "assistant", "content": "Here are the steps for multiplying 844 * 175 using the long multiplication method.\nStep 1: Break first number 844 into its individual digits: 8 (hundreds place), 4 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 175 into its individual digits: 1 (hundreds place), 7 (tens place), and 5 (ones place).\n- 4 (from 1 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 4 (from 1 place of first number) * 7 (from 10 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 280\n- 4 (from 1 place of first number) * 1 (from 100 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 400\n- 4 (from 10 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 200\n- 4 (from 10 place of first number) * 7 (from 10 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2800\n- 4 (from 10 place of first number) * 1 (from 100 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 8 (from 100 place of first number) * 5 (from 1 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4000\n- 8 (from 100 place of first number) * 7 (from 10 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 56000\n- 8 (from 100 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 20 + 280 + 400 + 200 + 2800 + 4000 + 4000 + 56000 + 80000 = 147700."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 148 * 724?"}, {"role": "assistant", "content": "Here are the steps for multiplying 148 * 724 using the long multiplication method.\nStep 1: Break first number 148 into its individual digits: 1 (hundreds place), 4 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 724 into its individual digits: 7 (hundreds place), 2 (tens place), and 4 (ones place).\n- 8 (from 1 place of first number) * 4 (from 1 place of second number) = 32 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 32\n- 8 (from 1 place of first number) * 2 (from 10 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 160\n- 8 (from 1 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5600\n- 4 (from 10 place of first number) * 4 (from 1 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 160\n- 4 (from 10 place of first number) * 2 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 4 (from 10 place of first number) * 7 (from 100 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 28000\n- 1 (from 100 place of first number) * 4 (from 1 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 1 (from 100 place of first number) * 2 (from 10 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 1 (from 100 place of first number) * 7 (from 100 place of second number) = 7 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 70000\n\nNow, add all these results together:\nThe sum of 32 + 160 + 5600 + 160 + 800 + 28000 + 400 + 2000 + 70000 = 107152."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 630 * 146?"}, {"role": "assistant", "content": "Here are the steps for multiplying 630 * 146 using the long multiplication method.\nStep 1: Break first number 630 into its individual digits: 6 (hundreds place), 3 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 146 into its individual digits: 1 (hundreds place), 4 (tens place), and 6 (ones place).\n- 0 (from 1 place of first number) * 6 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 4 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 1 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 3 (from 10 place of first number) * 6 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 3 (from 10 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1200\n- 3 (from 10 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 6 (from 100 place of first number) * 6 (from 1 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3600\n- 6 (from 100 place of first number) * 4 (from 10 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 24000\n- 6 (from 100 place of first number) * 1 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 180 + 1200 + 3000 + 3600 + 24000 + 60000 = 91980."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 497 * 800?"}, {"role": "assistant", "content": "Here are the steps for multiplying 497 * 800 using the long multiplication method.\nStep 1: Break first number 497 into its individual digits: 4 (hundreds place), 9 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 800 into its individual digits: 8 (hundreds place), 0 (tens place), and 0 (ones place).\n- 7 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 7 (from 1 place of first number) * 8 (from 100 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5600\n- 9 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 9 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 9 (from 10 place of first number) * 8 (from 100 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 72000\n- 4 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 4 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 4 (from 100 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 320000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 5600 + 0 + 0 + 72000 + 0 + 0 + 320000 = 397600."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 455 * 961?"}, {"role": "assistant", "content": "Here are the steps for multiplying 455 * 961 using the long multiplication method.\nStep 1: Break first number 455 into its individual digits: 4 (hundreds place), 5 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 961 into its individual digits: 9 (hundreds place), 6 (tens place), and 1 (ones place).\n- 5 (from 1 place of first number) * 1 (from 1 place of second number) = 5 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 5\n- 5 (from 1 place of first number) * 6 (from 10 place of second number) = 30 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 300\n- 5 (from 1 place of first number) * 9 (from 100 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4500\n- 5 (from 10 place of first number) * 1 (from 1 place of second number) = 5 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 50\n- 5 (from 10 place of first number) * 6 (from 10 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 5 (from 10 place of first number) * 9 (from 100 place of second number) = 45 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 45000\n- 4 (from 100 place of first number) * 1 (from 1 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 4 (from 100 place of first number) * 6 (from 10 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 24000\n- 4 (from 100 place of first number) * 9 (from 100 place of second number) = 36 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 360000\n\nNow, add all these results together:\nThe sum of 5 + 300 + 4500 + 50 + 3000 + 45000 + 400 + 24000 + 360000 = 437255."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 900 * 975?"}, {"role": "assistant", "content": "Here are the steps for multiplying 900 * 975 using the long multiplication method.\nStep 1: Break first number 900 into its individual digits: 9 (hundreds place), 0 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 975 into its individual digits: 9 (hundreds place), 7 (tens place), and 5 (ones place).\n- 0 (from 1 place of first number) * 5 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 7 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 9 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 0 (from 10 place of first number) * 5 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 7 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 9 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 9 (from 100 place of first number) * 5 (from 1 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4500\n- 9 (from 100 place of first number) * 7 (from 10 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 63000\n- 9 (from 100 place of first number) * 9 (from 100 place of second number) = 81 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 810000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 0 + 0 + 0 + 4500 + 63000 + 810000 = 877500."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 902 * 991?"}, {"role": "assistant", "content": "Here are the steps for multiplying 902 * 991 using the long multiplication method.\nStep 1: Break first number 902 into its individual digits: 9 (hundreds place), 0 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 991 into its individual digits: 9 (hundreds place), 9 (tens place), and 1 (ones place).\n- 2 (from 1 place of first number) * 1 (from 1 place of second number) = 2 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 2\n- 2 (from 1 place of first number) * 9 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 2 (from 1 place of first number) * 9 (from 100 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1800\n- 0 (from 10 place of first number) * 1 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 9 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 9 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 9 (from 100 place of first number) * 1 (from 1 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 900\n- 9 (from 100 place of first number) * 9 (from 10 place of second number) = 81 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 81000\n- 9 (from 100 place of first number) * 9 (from 100 place of second number) = 81 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 810000\n\nNow, add all these results together:\nThe sum of 2 + 180 + 1800 + 0 + 0 + 0 + 900 + 81000 + 810000 = 893882."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 271 * 979?"}, {"role": "assistant", "content": "Here are the steps for multiplying 271 * 979 using the long multiplication method.\nStep 1: Break first number 271 into its individual digits: 2 (hundreds place), 7 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 979 into its individual digits: 9 (hundreds place), 7 (tens place), and 9 (ones place).\n- 1 (from 1 place of first number) * 9 (from 1 place of second number) = 9 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 9\n- 1 (from 1 place of first number) * 7 (from 10 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 70\n- 1 (from 1 place of first number) * 9 (from 100 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 900\n- 7 (from 10 place of first number) * 9 (from 1 place of second number) = 63 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 630\n- 7 (from 10 place of first number) * 7 (from 10 place of second number) = 49 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4900\n- 7 (from 10 place of first number) * 9 (from 100 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 63000\n- 2 (from 100 place of first number) * 9 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 2 (from 100 place of first number) * 7 (from 10 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 14000\n- 2 (from 100 place of first number) * 9 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 9 + 70 + 900 + 630 + 4900 + 63000 + 1800 + 14000 + 180000 = 265309."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 384 * 801?"}, {"role": "assistant", "content": "Here are the steps for multiplying 384 * 801 using the long multiplication method.\nStep 1: Break first number 384 into its individual digits: 3 (hundreds place), 8 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 801 into its individual digits: 8 (hundreds place), 0 (tens place), and 1 (ones place).\n- 4 (from 1 place of first number) * 1 (from 1 place of second number) = 4 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 4\n- 4 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 4 (from 1 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3200\n- 8 (from 10 place of first number) * 1 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 8 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 8 (from 10 place of first number) * 8 (from 100 place of second number) = 64 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 64000\n- 3 (from 100 place of first number) * 1 (from 1 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 3 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 3 (from 100 place of first number) * 8 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 4 + 0 + 3200 + 80 + 0 + 64000 + 300 + 0 + 240000 = 307584."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 385 * 714?"}, {"role": "assistant", "content": "Here are the steps for multiplying 385 * 714 using the long multiplication method.\nStep 1: Break first number 385 into its individual digits: 3 (hundreds place), 8 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 714 into its individual digits: 7 (hundreds place), 1 (tens place), and 4 (ones place).\n- 5 (from 1 place of first number) * 4 (from 1 place of second number) = 20 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 5 (from 1 place of first number) * 1 (from 10 place of second number) = 5 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 50\n- 5 (from 1 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3500\n- 8 (from 10 place of first number) * 4 (from 1 place of second number) = 32 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 320\n- 8 (from 10 place of first number) * 1 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 8 (from 10 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 56000\n- 3 (from 100 place of first number) * 4 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 3 (from 100 place of first number) * 1 (from 10 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 3 (from 100 place of first number) * 7 (from 100 place of second number) = 21 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 210000\n\nNow, add all these results together:\nThe sum of 20 + 50 + 3500 + 320 + 800 + 56000 + 1200 + 3000 + 210000 = 274890."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 747 * 846?"}, {"role": "assistant", "content": "Here are the steps for multiplying 747 * 846 using the long multiplication method.\nStep 1: Break first number 747 into its individual digits: 7 (hundreds place), 4 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 846 into its individual digits: 8 (hundreds place), 4 (tens place), and 6 (ones place).\n- 7 (from 1 place of first number) * 6 (from 1 place of second number) = 42 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 42\n- 7 (from 1 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 280\n- 7 (from 1 place of first number) * 8 (from 100 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5600\n- 4 (from 10 place of first number) * 6 (from 1 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 240\n- 4 (from 10 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1600\n- 4 (from 10 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 32000\n- 7 (from 100 place of first number) * 6 (from 1 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4200\n- 7 (from 100 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 28000\n- 7 (from 100 place of first number) * 8 (from 100 place of second number) = 56 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 560000\n\nNow, add all these results together:\nThe sum of 42 + 280 + 5600 + 240 + 1600 + 32000 + 4200 + 28000 + 560000 = 631962."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 524 * 953?"}, {"role": "assistant", "content": "Here are the steps for multiplying 524 * 953 using the long multiplication method.\nStep 1: Break first number 524 into its individual digits: 5 (hundreds place), 2 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 953 into its individual digits: 9 (hundreds place), 5 (tens place), and 3 (ones place).\n- 4 (from 1 place of first number) * 3 (from 1 place of second number) = 12 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 12\n- 4 (from 1 place of first number) * 5 (from 10 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 200\n- 4 (from 1 place of first number) * 9 (from 100 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3600\n- 2 (from 10 place of first number) * 3 (from 1 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 60\n- 2 (from 10 place of first number) * 5 (from 10 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1000\n- 2 (from 10 place of first number) * 9 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 5 (from 100 place of first number) * 3 (from 1 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1500\n- 5 (from 100 place of first number) * 5 (from 10 place of second number) = 25 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 25000\n- 5 (from 100 place of first number) * 9 (from 100 place of second number) = 45 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 450000\n\nNow, add all these results together:\nThe sum of 12 + 200 + 3600 + 60 + 1000 + 18000 + 1500 + 25000 + 450000 = 499372."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 560 * 142?"}, {"role": "assistant", "content": "Here are the steps for multiplying 560 * 142 using the long multiplication method.\nStep 1: Break first number 560 into its individual digits: 5 (hundreds place), 6 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 142 into its individual digits: 1 (hundreds place), 4 (tens place), and 2 (ones place).\n- 0 (from 1 place of first number) * 2 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 4 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 1 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 6 (from 10 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 6 (from 10 place of first number) * 4 (from 10 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2400\n- 6 (from 10 place of first number) * 1 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 5 (from 100 place of first number) * 2 (from 1 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1000\n- 5 (from 100 place of first number) * 4 (from 10 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 20000\n- 5 (from 100 place of first number) * 1 (from 100 place of second number) = 5 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 50000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 120 + 2400 + 6000 + 1000 + 20000 + 50000 = 79520."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 670 * 337?"}, {"role": "assistant", "content": "Here are the steps for multiplying 670 * 337 using the long multiplication method.\nStep 1: Break first number 670 into its individual digits: 6 (hundreds place), 7 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 337 into its individual digits: 3 (hundreds place), 3 (tens place), and 7 (ones place).\n- 0 (from 1 place of first number) * 7 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 3 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 3 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 7 (from 10 place of first number) * 7 (from 1 place of second number) = 49 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 490\n- 7 (from 10 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2100\n- 7 (from 10 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 21000\n- 6 (from 100 place of first number) * 7 (from 1 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4200\n- 6 (from 100 place of first number) * 3 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 6 (from 100 place of first number) * 3 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 490 + 2100 + 21000 + 4200 + 18000 + 180000 = 225790."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 769 * 575?"}, {"role": "assistant", "content": "Here are the steps for multiplying 769 * 575 using the long multiplication method.\nStep 1: Break first number 769 into its individual digits: 7 (hundreds place), 6 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 575 into its individual digits: 5 (hundreds place), 7 (tens place), and 5 (ones place).\n- 9 (from 1 place of first number) * 5 (from 1 place of second number) = 45 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 45\n- 9 (from 1 place of first number) * 7 (from 10 place of second number) = 63 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 630\n- 9 (from 1 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4500\n- 6 (from 10 place of first number) * 5 (from 1 place of second number) = 30 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 6 (from 10 place of first number) * 7 (from 10 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4200\n- 6 (from 10 place of first number) * 5 (from 100 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n- 7 (from 100 place of first number) * 5 (from 1 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3500\n- 7 (from 100 place of first number) * 7 (from 10 place of second number) = 49 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 49000\n- 7 (from 100 place of first number) * 5 (from 100 place of second number) = 35 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 350000\n\nNow, add all these results together:\nThe sum of 45 + 630 + 4500 + 300 + 4200 + 30000 + 3500 + 49000 + 350000 = 442175."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 461 * 372?"}, {"role": "assistant", "content": "Here are the steps for multiplying 461 * 372 using the long multiplication method.\nStep 1: Break first number 461 into its individual digits: 4 (hundreds place), 6 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 372 into its individual digits: 3 (hundreds place), 7 (tens place), and 2 (ones place).\n- 1 (from 1 place of first number) * 2 (from 1 place of second number) = 2 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 2\n- 1 (from 1 place of first number) * 7 (from 10 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 70\n- 1 (from 1 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 300\n- 6 (from 10 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 6 (from 10 place of first number) * 7 (from 10 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4200\n- 6 (from 10 place of first number) * 3 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 4 (from 100 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 4 (from 100 place of first number) * 7 (from 10 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 28000\n- 4 (from 100 place of first number) * 3 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 2 + 70 + 300 + 120 + 4200 + 18000 + 800 + 28000 + 120000 = 171492."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 420 * 519?"}, {"role": "assistant", "content": "Here are the steps for multiplying 420 * 519 using the long multiplication method.\nStep 1: Break first number 420 into its individual digits: 4 (hundreds place), 2 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 519 into its individual digits: 5 (hundreds place), 1 (tens place), and 9 (ones place).\n- 0 (from 1 place of first number) * 9 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 1 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 5 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 2 (from 10 place of first number) * 9 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 2 (from 10 place of first number) * 1 (from 10 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 200\n- 2 (from 10 place of first number) * 5 (from 100 place of second number) = 10 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 10000\n- 4 (from 100 place of first number) * 9 (from 1 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3600\n- 4 (from 100 place of first number) * 1 (from 10 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 4 (from 100 place of first number) * 5 (from 100 place of second number) = 20 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 200000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 180 + 200 + 10000 + 3600 + 4000 + 200000 = 217980."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 101 * 981?"}, {"role": "assistant", "content": "Here are the steps for multiplying 101 * 981 using the long multiplication method.\nStep 1: Break first number 101 into its individual digits: 1 (hundreds place), 0 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 981 into its individual digits: 9 (hundreds place), 8 (tens place), and 1 (ones place).\n- 1 (from 1 place of first number) * 1 (from 1 place of second number) = 1 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 1\n- 1 (from 1 place of first number) * 8 (from 10 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 80\n- 1 (from 1 place of first number) * 9 (from 100 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 900\n- 0 (from 10 place of first number) * 1 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 8 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 9 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 1 (from 100 place of first number) * 1 (from 1 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 100\n- 1 (from 100 place of first number) * 8 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 1 (from 100 place of first number) * 9 (from 100 place of second number) = 9 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 90000\n\nNow, add all these results together:\nThe sum of 1 + 80 + 900 + 0 + 0 + 0 + 100 + 8000 + 90000 = 99081."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 215 * 829?"}, {"role": "assistant", "content": "Here are the steps for multiplying 215 * 829 using the long multiplication method.\nStep 1: Break first number 215 into its individual digits: 2 (hundreds place), 1 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 829 into its individual digits: 8 (hundreds place), 2 (tens place), and 9 (ones place).\n- 5 (from 1 place of first number) * 9 (from 1 place of second number) = 45 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 45\n- 5 (from 1 place of first number) * 2 (from 10 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 5 (from 1 place of first number) * 8 (from 100 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 1 (from 10 place of first number) * 9 (from 1 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 90\n- 1 (from 10 place of first number) * 2 (from 10 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 200\n- 1 (from 10 place of first number) * 8 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 2 (from 100 place of first number) * 9 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 2 (from 100 place of first number) * 2 (from 10 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 2 (from 100 place of first number) * 8 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 45 + 100 + 4000 + 90 + 200 + 8000 + 1800 + 4000 + 160000 = 178235."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 432 * 167?"}, {"role": "assistant", "content": "Here are the steps for multiplying 432 * 167 using the long multiplication method.\nStep 1: Break first number 432 into its individual digits: 4 (hundreds place), 3 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 167 into its individual digits: 1 (hundreds place), 6 (tens place), and 7 (ones place).\n- 2 (from 1 place of first number) * 7 (from 1 place of second number) = 14 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 14\n- 2 (from 1 place of first number) * 6 (from 10 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 120\n- 2 (from 1 place of first number) * 1 (from 100 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 200\n- 3 (from 10 place of first number) * 7 (from 1 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 210\n- 3 (from 10 place of first number) * 6 (from 10 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1800\n- 3 (from 10 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 4 (from 100 place of first number) * 7 (from 1 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2800\n- 4 (from 100 place of first number) * 6 (from 10 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 24000\n- 4 (from 100 place of first number) * 1 (from 100 place of second number) = 4 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n\nNow, add all these results together:\nThe sum of 14 + 120 + 200 + 210 + 1800 + 3000 + 2800 + 24000 + 40000 = 72144."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 951 * 135?"}, {"role": "assistant", "content": "Here are the steps for multiplying 951 * 135 using the long multiplication method.\nStep 1: Break first number 951 into its individual digits: 9 (hundreds place), 5 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 135 into its individual digits: 1 (hundreds place), 3 (tens place), and 5 (ones place).\n- 1 (from 1 place of first number) * 5 (from 1 place of second number) = 5 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 5\n- 1 (from 1 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 30\n- 1 (from 1 place of first number) * 1 (from 100 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 100\n- 5 (from 10 place of first number) * 5 (from 1 place of second number) = 25 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 250\n- 5 (from 10 place of first number) * 3 (from 10 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1500\n- 5 (from 10 place of first number) * 1 (from 100 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 5000\n- 9 (from 100 place of first number) * 5 (from 1 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4500\n- 9 (from 100 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 27000\n- 9 (from 100 place of first number) * 1 (from 100 place of second number) = 9 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 90000\n\nNow, add all these results together:\nThe sum of 5 + 30 + 100 + 250 + 1500 + 5000 + 4500 + 27000 + 90000 = 128385."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 454 * 283?"}, {"role": "assistant", "content": "Here are the steps for multiplying 454 * 283 using the long multiplication method.\nStep 1: Break first number 454 into its individual digits: 4 (hundreds place), 5 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 283 into its individual digits: 2 (hundreds place), 8 (tens place), and 3 (ones place).\n- 4 (from 1 place of first number) * 3 (from 1 place of second number) = 12 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 12\n- 4 (from 1 place of first number) * 8 (from 10 place of second number) = 32 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 320\n- 4 (from 1 place of first number) * 2 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 5 (from 10 place of first number) * 3 (from 1 place of second number) = 15 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 150\n- 5 (from 10 place of first number) * 8 (from 10 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 5 (from 10 place of first number) * 2 (from 100 place of second number) = 10 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 10000\n- 4 (from 100 place of first number) * 3 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 4 (from 100 place of first number) * 8 (from 10 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 32000\n- 4 (from 100 place of first number) * 2 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 12 + 320 + 800 + 150 + 4000 + 10000 + 1200 + 32000 + 80000 = 128482."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 974 * 501?"}, {"role": "assistant", "content": "Here are the steps for multiplying 974 * 501 using the long multiplication method.\nStep 1: Break first number 974 into its individual digits: 9 (hundreds place), 7 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 501 into its individual digits: 5 (hundreds place), 0 (tens place), and 1 (ones place).\n- 4 (from 1 place of first number) * 1 (from 1 place of second number) = 4 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 4\n- 4 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 4 (from 1 place of first number) * 5 (from 100 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 7 (from 10 place of first number) * 1 (from 1 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 70\n- 7 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 7 (from 10 place of first number) * 5 (from 100 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 35000\n- 9 (from 100 place of first number) * 1 (from 1 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 900\n- 9 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 9 (from 100 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 450000\n\nNow, add all these results together:\nThe sum of 4 + 0 + 2000 + 70 + 0 + 35000 + 900 + 0 + 450000 = 487974."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 646 * 100?"}, {"role": "assistant", "content": "Here are the steps for multiplying 646 * 100 using the long multiplication method.\nStep 1: Break first number 646 into its individual digits: 6 (hundreds place), 4 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 100 into its individual digits: 1 (hundreds place), 0 (tens place), and 0 (ones place).\n- 6 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 6 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 6 (from 1 place of first number) * 1 (from 100 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 600\n- 4 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 4 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 4 (from 10 place of first number) * 1 (from 100 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 6 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 6 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 6 (from 100 place of first number) * 1 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 600 + 0 + 0 + 4000 + 0 + 0 + 60000 = 64600."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 209 * 692?"}, {"role": "assistant", "content": "Here are the steps for multiplying 209 * 692 using the long multiplication method.\nStep 1: Break first number 209 into its individual digits: 2 (hundreds place), 0 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 692 into its individual digits: 6 (hundreds place), 9 (tens place), and 2 (ones place).\n- 9 (from 1 place of first number) * 2 (from 1 place of second number) = 18 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 18\n- 9 (from 1 place of first number) * 9 (from 10 place of second number) = 81 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 810\n- 9 (from 1 place of first number) * 6 (from 100 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5400\n- 0 (from 10 place of first number) * 2 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 9 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 6 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 2 (from 100 place of first number) * 2 (from 1 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 2 (from 100 place of first number) * 9 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 2 (from 100 place of first number) * 6 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 18 + 810 + 5400 + 0 + 0 + 0 + 400 + 18000 + 120000 = 144628."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 508 * 536?"}, {"role": "assistant", "content": "Here are the steps for multiplying 508 * 536 using the long multiplication method.\nStep 1: Break first number 508 into its individual digits: 5 (hundreds place), 0 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 536 into its individual digits: 5 (hundreds place), 3 (tens place), and 6 (ones place).\n- 8 (from 1 place of first number) * 6 (from 1 place of second number) = 48 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 48\n- 8 (from 1 place of first number) * 3 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 8 (from 1 place of first number) * 5 (from 100 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 0 (from 10 place of first number) * 6 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 3 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 5 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 5 (from 100 place of first number) * 6 (from 1 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3000\n- 5 (from 100 place of first number) * 3 (from 10 place of second number) = 15 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 15000\n- 5 (from 100 place of first number) * 5 (from 100 place of second number) = 25 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 250000\n\nNow, add all these results together:\nThe sum of 48 + 240 + 4000 + 0 + 0 + 0 + 3000 + 15000 + 250000 = 272288."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 518 * 279?"}, {"role": "assistant", "content": "Here are the steps for multiplying 518 * 279 using the long multiplication method.\nStep 1: Break first number 518 into its individual digits: 5 (hundreds place), 1 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 279 into its individual digits: 2 (hundreds place), 7 (tens place), and 9 (ones place).\n- 8 (from 1 place of first number) * 9 (from 1 place of second number) = 72 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 72\n- 8 (from 1 place of first number) * 7 (from 10 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 560\n- 8 (from 1 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 1 (from 10 place of first number) * 9 (from 1 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 90\n- 1 (from 10 place of first number) * 7 (from 10 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 700\n- 1 (from 10 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 5 (from 100 place of first number) * 9 (from 1 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4500\n- 5 (from 100 place of first number) * 7 (from 10 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 35000\n- 5 (from 100 place of first number) * 2 (from 100 place of second number) = 10 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 100000\n\nNow, add all these results together:\nThe sum of 72 + 560 + 1600 + 90 + 700 + 2000 + 4500 + 35000 + 100000 = 144522."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 427 * 721?"}, {"role": "assistant", "content": "Here are the steps for multiplying 427 * 721 using the long multiplication method.\nStep 1: Break first number 427 into its individual digits: 4 (hundreds place), 2 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 721 into its individual digits: 7 (hundreds place), 2 (tens place), and 1 (ones place).\n- 7 (from 1 place of first number) * 1 (from 1 place of second number) = 7 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 7\n- 7 (from 1 place of first number) * 2 (from 10 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 140\n- 7 (from 1 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4900\n- 2 (from 10 place of first number) * 1 (from 1 place of second number) = 2 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 2 (from 10 place of first number) * 2 (from 10 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 2 (from 10 place of first number) * 7 (from 100 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 14000\n- 4 (from 100 place of first number) * 1 (from 1 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 4 (from 100 place of first number) * 2 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 4 (from 100 place of first number) * 7 (from 100 place of second number) = 28 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 280000\n\nNow, add all these results together:\nThe sum of 7 + 140 + 4900 + 20 + 400 + 14000 + 400 + 8000 + 280000 = 307867."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 891 * 766?"}, {"role": "assistant", "content": "Here are the steps for multiplying 891 * 766 using the long multiplication method.\nStep 1: Break first number 891 into its individual digits: 8 (hundreds place), 9 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 766 into its individual digits: 7 (hundreds place), 6 (tens place), and 6 (ones place).\n- 1 (from 1 place of first number) * 6 (from 1 place of second number) = 6 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 6\n- 1 (from 1 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 60\n- 1 (from 1 place of first number) * 7 (from 100 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 700\n- 9 (from 10 place of first number) * 6 (from 1 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 540\n- 9 (from 10 place of first number) * 6 (from 10 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5400\n- 9 (from 10 place of first number) * 7 (from 100 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 63000\n- 8 (from 100 place of first number) * 6 (from 1 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4800\n- 8 (from 100 place of first number) * 6 (from 10 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 48000\n- 8 (from 100 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 560000\n\nNow, add all these results together:\nThe sum of 6 + 60 + 700 + 540 + 5400 + 63000 + 4800 + 48000 + 560000 = 682506."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 380 * 772?"}, {"role": "assistant", "content": "Here are the steps for multiplying 380 * 772 using the long multiplication method.\nStep 1: Break first number 380 into its individual digits: 3 (hundreds place), 8 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 772 into its individual digits: 7 (hundreds place), 7 (tens place), and 2 (ones place).\n- 0 (from 1 place of first number) * 2 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 7 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 7 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 8 (from 10 place of first number) * 2 (from 1 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 160\n- 8 (from 10 place of first number) * 7 (from 10 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5600\n- 8 (from 10 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 56000\n- 3 (from 100 place of first number) * 2 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 3 (from 100 place of first number) * 7 (from 10 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 21000\n- 3 (from 100 place of first number) * 7 (from 100 place of second number) = 21 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 210000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 160 + 5600 + 56000 + 600 + 21000 + 210000 = 293360."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 960 * 920?"}, {"role": "assistant", "content": "Here are the steps for multiplying 960 * 920 using the long multiplication method.\nStep 1: Break first number 960 into its individual digits: 9 (hundreds place), 6 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 920 into its individual digits: 9 (hundreds place), 2 (tens place), and 0 (ones place).\n- 0 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 2 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 9 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 6 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 6 (from 10 place of first number) * 2 (from 10 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1200\n- 6 (from 10 place of first number) * 9 (from 100 place of second number) = 54 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 54000\n- 9 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 9 (from 100 place of first number) * 2 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 9 (from 100 place of first number) * 9 (from 100 place of second number) = 81 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 810000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 0 + 1200 + 54000 + 0 + 18000 + 810000 = 883200."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 695 * 337?"}, {"role": "assistant", "content": "Here are the steps for multiplying 695 * 337 using the long multiplication method.\nStep 1: Break first number 695 into its individual digits: 6 (hundreds place), 9 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 337 into its individual digits: 3 (hundreds place), 3 (tens place), and 7 (ones place).\n- 5 (from 1 place of first number) * 7 (from 1 place of second number) = 35 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 35\n- 5 (from 1 place of first number) * 3 (from 10 place of second number) = 15 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 150\n- 5 (from 1 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1500\n- 9 (from 10 place of first number) * 7 (from 1 place of second number) = 63 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 630\n- 9 (from 10 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2700\n- 9 (from 10 place of first number) * 3 (from 100 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 27000\n- 6 (from 100 place of first number) * 7 (from 1 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4200\n- 6 (from 100 place of first number) * 3 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 6 (from 100 place of first number) * 3 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 35 + 150 + 1500 + 630 + 2700 + 27000 + 4200 + 18000 + 180000 = 234215."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 930 * 602?"}, {"role": "assistant", "content": "Here are the steps for multiplying 930 * 602 using the long multiplication method.\nStep 1: Break first number 930 into its individual digits: 9 (hundreds place), 3 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 602 into its individual digits: 6 (hundreds place), 0 (tens place), and 2 (ones place).\n- 0 (from 1 place of first number) * 2 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 6 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 3 (from 10 place of first number) * 2 (from 1 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 60\n- 3 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 3 (from 10 place of first number) * 6 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 9 (from 100 place of first number) * 2 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 9 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 9 (from 100 place of first number) * 6 (from 100 place of second number) = 54 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 540000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 60 + 0 + 18000 + 1800 + 0 + 540000 = 559860."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 878 * 765?"}, {"role": "assistant", "content": "Here are the steps for multiplying 878 * 765 using the long multiplication method.\nStep 1: Break first number 878 into its individual digits: 8 (hundreds place), 7 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 765 into its individual digits: 7 (hundreds place), 6 (tens place), and 5 (ones place).\n- 8 (from 1 place of first number) * 5 (from 1 place of second number) = 40 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 8 (from 1 place of first number) * 6 (from 10 place of second number) = 48 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 480\n- 8 (from 1 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5600\n- 7 (from 10 place of first number) * 5 (from 1 place of second number) = 35 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 350\n- 7 (from 10 place of first number) * 6 (from 10 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4200\n- 7 (from 10 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 49000\n- 8 (from 100 place of first number) * 5 (from 1 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4000\n- 8 (from 100 place of first number) * 6 (from 10 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 48000\n- 8 (from 100 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 560000\n\nNow, add all these results together:\nThe sum of 40 + 480 + 5600 + 350 + 4200 + 49000 + 4000 + 48000 + 560000 = 671670."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 229 * 459?"}, {"role": "assistant", "content": "Here are the steps for multiplying 229 * 459 using the long multiplication method.\nStep 1: Break first number 229 into its individual digits: 2 (hundreds place), 2 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 459 into its individual digits: 4 (hundreds place), 5 (tens place), and 9 (ones place).\n- 9 (from 1 place of first number) * 9 (from 1 place of second number) = 81 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 81\n- 9 (from 1 place of first number) * 5 (from 10 place of second number) = 45 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 450\n- 9 (from 1 place of first number) * 4 (from 100 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3600\n- 2 (from 10 place of first number) * 9 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 2 (from 10 place of first number) * 5 (from 10 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1000\n- 2 (from 10 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 2 (from 100 place of first number) * 9 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 2 (from 100 place of first number) * 5 (from 10 place of second number) = 10 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 10000\n- 2 (from 100 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 81 + 450 + 3600 + 180 + 1000 + 8000 + 1800 + 10000 + 80000 = 105111."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 597 * 761?"}, {"role": "assistant", "content": "Here are the steps for multiplying 597 * 761 using the long multiplication method.\nStep 1: Break first number 597 into its individual digits: 5 (hundreds place), 9 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 761 into its individual digits: 7 (hundreds place), 6 (tens place), and 1 (ones place).\n- 7 (from 1 place of first number) * 1 (from 1 place of second number) = 7 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 7\n- 7 (from 1 place of first number) * 6 (from 10 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 420\n- 7 (from 1 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4900\n- 9 (from 10 place of first number) * 1 (from 1 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 90\n- 9 (from 10 place of first number) * 6 (from 10 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5400\n- 9 (from 10 place of first number) * 7 (from 100 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 63000\n- 5 (from 100 place of first number) * 1 (from 1 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 500\n- 5 (from 100 place of first number) * 6 (from 10 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 30000\n- 5 (from 100 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 350000\n\nNow, add all these results together:\nThe sum of 7 + 420 + 4900 + 90 + 5400 + 63000 + 500 + 30000 + 350000 = 454317."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 462 * 878?"}, {"role": "assistant", "content": "Here are the steps for multiplying 462 * 878 using the long multiplication method.\nStep 1: Break first number 462 into its individual digits: 4 (hundreds place), 6 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 878 into its individual digits: 8 (hundreds place), 7 (tens place), and 8 (ones place).\n- 2 (from 1 place of first number) * 8 (from 1 place of second number) = 16 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 16\n- 2 (from 1 place of first number) * 7 (from 10 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 140\n- 2 (from 1 place of first number) * 8 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 6 (from 10 place of first number) * 8 (from 1 place of second number) = 48 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 480\n- 6 (from 10 place of first number) * 7 (from 10 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4200\n- 6 (from 10 place of first number) * 8 (from 100 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 48000\n- 4 (from 100 place of first number) * 8 (from 1 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3200\n- 4 (from 100 place of first number) * 7 (from 10 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 28000\n- 4 (from 100 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 320000\n\nNow, add all these results together:\nThe sum of 16 + 140 + 1600 + 480 + 4200 + 48000 + 3200 + 28000 + 320000 = 405636."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 880 * 860?"}, {"role": "assistant", "content": "Here are the steps for multiplying 880 * 860 using the long multiplication method.\nStep 1: Break first number 880 into its individual digits: 8 (hundreds place), 8 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 860 into its individual digits: 8 (hundreds place), 6 (tens place), and 0 (ones place).\n- 0 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 6 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 8 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 8 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 10 place of first number) * 6 (from 10 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4800\n- 8 (from 10 place of first number) * 8 (from 100 place of second number) = 64 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 64000\n- 8 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 100 place of first number) * 6 (from 10 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 48000\n- 8 (from 100 place of first number) * 8 (from 100 place of second number) = 64 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 640000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 0 + 4800 + 64000 + 0 + 48000 + 640000 = 756800."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 841 * 765?"}, {"role": "assistant", "content": "Here are the steps for multiplying 841 * 765 using the long multiplication method.\nStep 1: Break first number 841 into its individual digits: 8 (hundreds place), 4 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 765 into its individual digits: 7 (hundreds place), 6 (tens place), and 5 (ones place).\n- 1 (from 1 place of first number) * 5 (from 1 place of second number) = 5 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 5\n- 1 (from 1 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 60\n- 1 (from 1 place of first number) * 7 (from 100 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 700\n- 4 (from 10 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 200\n- 4 (from 10 place of first number) * 6 (from 10 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2400\n- 4 (from 10 place of first number) * 7 (from 100 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 28000\n- 8 (from 100 place of first number) * 5 (from 1 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4000\n- 8 (from 100 place of first number) * 6 (from 10 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 48000\n- 8 (from 100 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 560000\n\nNow, add all these results together:\nThe sum of 5 + 60 + 700 + 200 + 2400 + 28000 + 4000 + 48000 + 560000 = 643365."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 877 * 184?"}, {"role": "assistant", "content": "Here are the steps for multiplying 877 * 184 using the long multiplication method.\nStep 1: Break first number 877 into its individual digits: 8 (hundreds place), 7 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 184 into its individual digits: 1 (hundreds place), 8 (tens place), and 4 (ones place).\n- 7 (from 1 place of first number) * 4 (from 1 place of second number) = 28 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 28\n- 7 (from 1 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 560\n- 7 (from 1 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 700\n- 7 (from 10 place of first number) * 4 (from 1 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 280\n- 7 (from 10 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5600\n- 7 (from 10 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 7000\n- 8 (from 100 place of first number) * 4 (from 1 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3200\n- 8 (from 100 place of first number) * 8 (from 10 place of second number) = 64 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 64000\n- 8 (from 100 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 28 + 560 + 700 + 280 + 5600 + 7000 + 3200 + 64000 + 80000 = 161368."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 811 * 237?"}, {"role": "assistant", "content": "Here are the steps for multiplying 811 * 237 using the long multiplication method.\nStep 1: Break first number 811 into its individual digits: 8 (hundreds place), 1 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 237 into its individual digits: 2 (hundreds place), 3 (tens place), and 7 (ones place).\n- 1 (from 1 place of first number) * 7 (from 1 place of second number) = 7 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 7\n- 1 (from 1 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 30\n- 1 (from 1 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 200\n- 1 (from 10 place of first number) * 7 (from 1 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 70\n- 1 (from 10 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 300\n- 1 (from 10 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 8 (from 100 place of first number) * 7 (from 1 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 5600\n- 8 (from 100 place of first number) * 3 (from 10 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 24000\n- 8 (from 100 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 7 + 30 + 200 + 70 + 300 + 2000 + 5600 + 24000 + 160000 = 192207."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 578 * 746?"}, {"role": "assistant", "content": "Here are the steps for multiplying 578 * 746 using the long multiplication method.\nStep 1: Break first number 578 into its individual digits: 5 (hundreds place), 7 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 746 into its individual digits: 7 (hundreds place), 4 (tens place), and 6 (ones place).\n- 8 (from 1 place of first number) * 6 (from 1 place of second number) = 48 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 48\n- 8 (from 1 place of first number) * 4 (from 10 place of second number) = 32 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 320\n- 8 (from 1 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5600\n- 7 (from 10 place of first number) * 6 (from 1 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 420\n- 7 (from 10 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2800\n- 7 (from 10 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 49000\n- 5 (from 100 place of first number) * 6 (from 1 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3000\n- 5 (from 100 place of first number) * 4 (from 10 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 20000\n- 5 (from 100 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 350000\n\nNow, add all these results together:\nThe sum of 48 + 320 + 5600 + 420 + 2800 + 49000 + 3000 + 20000 + 350000 = 431188."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 618 * 487?"}, {"role": "assistant", "content": "Here are the steps for multiplying 618 * 487 using the long multiplication method.\nStep 1: Break first number 618 into its individual digits: 6 (hundreds place), 1 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 487 into its individual digits: 4 (hundreds place), 8 (tens place), and 7 (ones place).\n- 8 (from 1 place of first number) * 7 (from 1 place of second number) = 56 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 56\n- 8 (from 1 place of first number) * 8 (from 10 place of second number) = 64 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 640\n- 8 (from 1 place of first number) * 4 (from 100 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3200\n- 1 (from 10 place of first number) * 7 (from 1 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 70\n- 1 (from 10 place of first number) * 8 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 1 (from 10 place of first number) * 4 (from 100 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 6 (from 100 place of first number) * 7 (from 1 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4200\n- 6 (from 100 place of first number) * 8 (from 10 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 48000\n- 6 (from 100 place of first number) * 4 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 56 + 640 + 3200 + 70 + 800 + 4000 + 4200 + 48000 + 240000 = 300966."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 226 * 143?"}, {"role": "assistant", "content": "Here are the steps for multiplying 226 * 143 using the long multiplication method.\nStep 1: Break first number 226 into its individual digits: 2 (hundreds place), 2 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 143 into its individual digits: 1 (hundreds place), 4 (tens place), and 3 (ones place).\n- 6 (from 1 place of first number) * 3 (from 1 place of second number) = 18 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 18\n- 6 (from 1 place of first number) * 4 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 6 (from 1 place of first number) * 1 (from 100 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 600\n- 2 (from 10 place of first number) * 3 (from 1 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 60\n- 2 (from 10 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 2 (from 10 place of first number) * 1 (from 100 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 2 (from 100 place of first number) * 3 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 2 (from 100 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 2 (from 100 place of first number) * 1 (from 100 place of second number) = 2 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n\nNow, add all these results together:\nThe sum of 18 + 240 + 600 + 60 + 800 + 2000 + 600 + 8000 + 20000 = 32318."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 930 * 631?"}, {"role": "assistant", "content": "Here are the steps for multiplying 930 * 631 using the long multiplication method.\nStep 1: Break first number 930 into its individual digits: 9 (hundreds place), 3 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 631 into its individual digits: 6 (hundreds place), 3 (tens place), and 1 (ones place).\n- 0 (from 1 place of first number) * 1 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 3 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 6 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 3 (from 10 place of first number) * 1 (from 1 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 3 (from 10 place of first number) * 3 (from 10 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 900\n- 3 (from 10 place of first number) * 6 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 9 (from 100 place of first number) * 1 (from 1 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 900\n- 9 (from 100 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 27000\n- 9 (from 100 place of first number) * 6 (from 100 place of second number) = 54 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 540000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 30 + 900 + 18000 + 900 + 27000 + 540000 = 586830."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 536 * 343?"}, {"role": "assistant", "content": "Here are the steps for multiplying 536 * 343 using the long multiplication method.\nStep 1: Break first number 536 into its individual digits: 5 (hundreds place), 3 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 343 into its individual digits: 3 (hundreds place), 4 (tens place), and 3 (ones place).\n- 6 (from 1 place of first number) * 3 (from 1 place of second number) = 18 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 18\n- 6 (from 1 place of first number) * 4 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 6 (from 1 place of first number) * 3 (from 100 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1800\n- 3 (from 10 place of first number) * 3 (from 1 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 90\n- 3 (from 10 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1200\n- 3 (from 10 place of first number) * 3 (from 100 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 9000\n- 5 (from 100 place of first number) * 3 (from 1 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1500\n- 5 (from 100 place of first number) * 4 (from 10 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 20000\n- 5 (from 100 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 150000\n\nNow, add all these results together:\nThe sum of 18 + 240 + 1800 + 90 + 1200 + 9000 + 1500 + 20000 + 150000 = 183848."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 252 * 132?"}, {"role": "assistant", "content": "Here are the steps for multiplying 252 * 132 using the long multiplication method.\nStep 1: Break first number 252 into its individual digits: 2 (hundreds place), 5 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 132 into its individual digits: 1 (hundreds place), 3 (tens place), and 2 (ones place).\n- 2 (from 1 place of first number) * 2 (from 1 place of second number) = 4 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 4\n- 2 (from 1 place of first number) * 3 (from 10 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 60\n- 2 (from 1 place of first number) * 1 (from 100 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 200\n- 5 (from 10 place of first number) * 2 (from 1 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 100\n- 5 (from 10 place of first number) * 3 (from 10 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1500\n- 5 (from 10 place of first number) * 1 (from 100 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 5000\n- 2 (from 100 place of first number) * 2 (from 1 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 2 (from 100 place of first number) * 3 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 2 (from 100 place of first number) * 1 (from 100 place of second number) = 2 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n\nNow, add all these results together:\nThe sum of 4 + 60 + 200 + 100 + 1500 + 5000 + 400 + 6000 + 20000 = 33264."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 433 * 945?"}, {"role": "assistant", "content": "Here are the steps for multiplying 433 * 945 using the long multiplication method.\nStep 1: Break first number 433 into its individual digits: 4 (hundreds place), 3 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 945 into its individual digits: 9 (hundreds place), 4 (tens place), and 5 (ones place).\n- 3 (from 1 place of first number) * 5 (from 1 place of second number) = 15 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 15\n- 3 (from 1 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 120\n- 3 (from 1 place of first number) * 9 (from 100 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2700\n- 3 (from 10 place of first number) * 5 (from 1 place of second number) = 15 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 150\n- 3 (from 10 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1200\n- 3 (from 10 place of first number) * 9 (from 100 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 27000\n- 4 (from 100 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2000\n- 4 (from 100 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 16000\n- 4 (from 100 place of first number) * 9 (from 100 place of second number) = 36 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 360000\n\nNow, add all these results together:\nThe sum of 15 + 120 + 2700 + 150 + 1200 + 27000 + 2000 + 16000 + 360000 = 409185."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 452 * 422?"}, {"role": "assistant", "content": "Here are the steps for multiplying 452 * 422 using the long multiplication method.\nStep 1: Break first number 452 into its individual digits: 4 (hundreds place), 5 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 422 into its individual digits: 4 (hundreds place), 2 (tens place), and 2 (ones place).\n- 2 (from 1 place of first number) * 2 (from 1 place of second number) = 4 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 4\n- 2 (from 1 place of first number) * 2 (from 10 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 40\n- 2 (from 1 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 5 (from 10 place of first number) * 2 (from 1 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 100\n- 5 (from 10 place of first number) * 2 (from 10 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1000\n- 5 (from 10 place of first number) * 4 (from 100 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n- 4 (from 100 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 4 (from 100 place of first number) * 2 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 4 (from 100 place of first number) * 4 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 4 + 40 + 800 + 100 + 1000 + 20000 + 800 + 8000 + 160000 = 190744."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 642 * 250?"}, {"role": "assistant", "content": "Here are the steps for multiplying 642 * 250 using the long multiplication method.\nStep 1: Break first number 642 into its individual digits: 6 (hundreds place), 4 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 250 into its individual digits: 2 (hundreds place), 5 (tens place), and 0 (ones place).\n- 2 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 2 (from 1 place of first number) * 5 (from 10 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 2 (from 1 place of first number) * 2 (from 100 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 400\n- 4 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 4 (from 10 place of first number) * 5 (from 10 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 4 (from 10 place of first number) * 2 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 6 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 6 (from 100 place of first number) * 5 (from 10 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 30000\n- 6 (from 100 place of first number) * 2 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 0 + 100 + 400 + 0 + 2000 + 8000 + 0 + 30000 + 120000 = 160500."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 104 * 166?"}, {"role": "assistant", "content": "Here are the steps for multiplying 104 * 166 using the long multiplication method.\nStep 1: Break first number 104 into its individual digits: 1 (hundreds place), 0 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 166 into its individual digits: 1 (hundreds place), 6 (tens place), and 6 (ones place).\n- 4 (from 1 place of first number) * 6 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 4 (from 1 place of first number) * 6 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 4 (from 1 place of first number) * 1 (from 100 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 400\n- 0 (from 10 place of first number) * 6 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 6 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 1 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 1 (from 100 place of first number) * 6 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 1 (from 100 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 1 (from 100 place of first number) * 1 (from 100 place of second number) = 1 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 10000\n\nNow, add all these results together:\nThe sum of 24 + 240 + 400 + 0 + 0 + 0 + 600 + 6000 + 10000 = 17264."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 841 * 720?"}, {"role": "assistant", "content": "Here are the steps for multiplying 841 * 720 using the long multiplication method.\nStep 1: Break first number 841 into its individual digits: 8 (hundreds place), 4 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 720 into its individual digits: 7 (hundreds place), 2 (tens place), and 0 (ones place).\n- 1 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 1 (from 1 place of first number) * 2 (from 10 place of second number) = 2 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 20\n- 1 (from 1 place of first number) * 7 (from 100 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 700\n- 4 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 4 (from 10 place of first number) * 2 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 4 (from 10 place of first number) * 7 (from 100 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 28000\n- 8 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 100 place of first number) * 2 (from 10 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 16000\n- 8 (from 100 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 560000\n\nNow, add all these results together:\nThe sum of 0 + 20 + 700 + 0 + 800 + 28000 + 0 + 16000 + 560000 = 605520."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 670 * 102?"}, {"role": "assistant", "content": "Here are the steps for multiplying 670 * 102 using the long multiplication method.\nStep 1: Break first number 670 into its individual digits: 6 (hundreds place), 7 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 102 into its individual digits: 1 (hundreds place), 0 (tens place), and 2 (ones place).\n- 0 (from 1 place of first number) * 2 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 1 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 7 (from 10 place of first number) * 2 (from 1 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 140\n- 7 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 7 (from 10 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 7000\n- 6 (from 100 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 6 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 6 (from 100 place of first number) * 1 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 140 + 0 + 7000 + 1200 + 0 + 60000 = 68340."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 762 * 682?"}, {"role": "assistant", "content": "Here are the steps for multiplying 762 * 682 using the long multiplication method.\nStep 1: Break first number 762 into its individual digits: 7 (hundreds place), 6 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 682 into its individual digits: 6 (hundreds place), 8 (tens place), and 2 (ones place).\n- 2 (from 1 place of first number) * 2 (from 1 place of second number) = 4 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 4\n- 2 (from 1 place of first number) * 8 (from 10 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 160\n- 2 (from 1 place of first number) * 6 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 6 (from 10 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 6 (from 10 place of first number) * 8 (from 10 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4800\n- 6 (from 10 place of first number) * 6 (from 100 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 36000\n- 7 (from 100 place of first number) * 2 (from 1 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1400\n- 7 (from 100 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 56000\n- 7 (from 100 place of first number) * 6 (from 100 place of second number) = 42 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 420000\n\nNow, add all these results together:\nThe sum of 4 + 160 + 1200 + 120 + 4800 + 36000 + 1400 + 56000 + 420000 = 519684."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 631 * 772?"}, {"role": "assistant", "content": "Here are the steps for multiplying 631 * 772 using the long multiplication method.\nStep 1: Break first number 631 into its individual digits: 6 (hundreds place), 3 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 772 into its individual digits: 7 (hundreds place), 7 (tens place), and 2 (ones place).\n- 1 (from 1 place of first number) * 2 (from 1 place of second number) = 2 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 2\n- 1 (from 1 place of first number) * 7 (from 10 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 70\n- 1 (from 1 place of first number) * 7 (from 100 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 700\n- 3 (from 10 place of first number) * 2 (from 1 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 60\n- 3 (from 10 place of first number) * 7 (from 10 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2100\n- 3 (from 10 place of first number) * 7 (from 100 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 21000\n- 6 (from 100 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 6 (from 100 place of first number) * 7 (from 10 place of second number) = 42 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 42000\n- 6 (from 100 place of first number) * 7 (from 100 place of second number) = 42 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 420000\n\nNow, add all these results together:\nThe sum of 2 + 70 + 700 + 60 + 2100 + 21000 + 1200 + 42000 + 420000 = 487132."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 279 * 659?"}, {"role": "assistant", "content": "Here are the steps for multiplying 279 * 659 using the long multiplication method.\nStep 1: Break first number 279 into its individual digits: 2 (hundreds place), 7 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 659 into its individual digits: 6 (hundreds place), 5 (tens place), and 9 (ones place).\n- 9 (from 1 place of first number) * 9 (from 1 place of second number) = 81 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 81\n- 9 (from 1 place of first number) * 5 (from 10 place of second number) = 45 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 450\n- 9 (from 1 place of first number) * 6 (from 100 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5400\n- 7 (from 10 place of first number) * 9 (from 1 place of second number) = 63 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 630\n- 7 (from 10 place of first number) * 5 (from 10 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3500\n- 7 (from 10 place of first number) * 6 (from 100 place of second number) = 42 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 42000\n- 2 (from 100 place of first number) * 9 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 2 (from 100 place of first number) * 5 (from 10 place of second number) = 10 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 10000\n- 2 (from 100 place of first number) * 6 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 81 + 450 + 5400 + 630 + 3500 + 42000 + 1800 + 10000 + 120000 = 183861."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 140 * 695?"}, {"role": "assistant", "content": "Here are the steps for multiplying 140 * 695 using the long multiplication method.\nStep 1: Break first number 140 into its individual digits: 1 (hundreds place), 4 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 695 into its individual digits: 6 (hundreds place), 9 (tens place), and 5 (ones place).\n- 0 (from 1 place of first number) * 5 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 9 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 6 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 4 (from 10 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 200\n- 4 (from 10 place of first number) * 9 (from 10 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3600\n- 4 (from 10 place of first number) * 6 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 1 (from 100 place of first number) * 5 (from 1 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 500\n- 1 (from 100 place of first number) * 9 (from 10 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 9000\n- 1 (from 100 place of first number) * 6 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 200 + 3600 + 24000 + 500 + 9000 + 60000 = 97300."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 825 * 786?"}, {"role": "assistant", "content": "Here are the steps for multiplying 825 * 786 using the long multiplication method.\nStep 1: Break first number 825 into its individual digits: 8 (hundreds place), 2 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 786 into its individual digits: 7 (hundreds place), 8 (tens place), and 6 (ones place).\n- 5 (from 1 place of first number) * 6 (from 1 place of second number) = 30 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 5 (from 1 place of first number) * 8 (from 10 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 5 (from 1 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3500\n- 2 (from 10 place of first number) * 6 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 2 (from 10 place of first number) * 8 (from 10 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1600\n- 2 (from 10 place of first number) * 7 (from 100 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 14000\n- 8 (from 100 place of first number) * 6 (from 1 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4800\n- 8 (from 100 place of first number) * 8 (from 10 place of second number) = 64 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 64000\n- 8 (from 100 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 560000\n\nNow, add all these results together:\nThe sum of 30 + 400 + 3500 + 120 + 1600 + 14000 + 4800 + 64000 + 560000 = 648450."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 350 * 447?"}, {"role": "assistant", "content": "Here are the steps for multiplying 350 * 447 using the long multiplication method.\nStep 1: Break first number 350 into its individual digits: 3 (hundreds place), 5 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 447 into its individual digits: 4 (hundreds place), 4 (tens place), and 7 (ones place).\n- 0 (from 1 place of first number) * 7 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 4 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 4 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 5 (from 10 place of first number) * 7 (from 1 place of second number) = 35 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 350\n- 5 (from 10 place of first number) * 4 (from 10 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 5 (from 10 place of first number) * 4 (from 100 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n- 3 (from 100 place of first number) * 7 (from 1 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2100\n- 3 (from 100 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 3 (from 100 place of first number) * 4 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 350 + 2000 + 20000 + 2100 + 12000 + 120000 = 156450."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 900 * 445?"}, {"role": "assistant", "content": "Here are the steps for multiplying 900 * 445 using the long multiplication method.\nStep 1: Break first number 900 into its individual digits: 9 (hundreds place), 0 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 445 into its individual digits: 4 (hundreds place), 4 (tens place), and 5 (ones place).\n- 0 (from 1 place of first number) * 5 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 4 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 4 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 0 (from 10 place of first number) * 5 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 4 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 4 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 9 (from 100 place of first number) * 5 (from 1 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4500\n- 9 (from 100 place of first number) * 4 (from 10 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 36000\n- 9 (from 100 place of first number) * 4 (from 100 place of second number) = 36 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 360000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 0 + 0 + 0 + 4500 + 36000 + 360000 = 400500."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 229 * 449?"}, {"role": "assistant", "content": "Here are the steps for multiplying 229 * 449 using the long multiplication method.\nStep 1: Break first number 229 into its individual digits: 2 (hundreds place), 2 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 449 into its individual digits: 4 (hundreds place), 4 (tens place), and 9 (ones place).\n- 9 (from 1 place of first number) * 9 (from 1 place of second number) = 81 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 81\n- 9 (from 1 place of first number) * 4 (from 10 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 360\n- 9 (from 1 place of first number) * 4 (from 100 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3600\n- 2 (from 10 place of first number) * 9 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 2 (from 10 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 2 (from 10 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 2 (from 100 place of first number) * 9 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 2 (from 100 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 2 (from 100 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 81 + 360 + 3600 + 180 + 800 + 8000 + 1800 + 8000 + 80000 = 102821."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 763 * 856?"}, {"role": "assistant", "content": "Here are the steps for multiplying 763 * 856 using the long multiplication method.\nStep 1: Break first number 763 into its individual digits: 7 (hundreds place), 6 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 856 into its individual digits: 8 (hundreds place), 5 (tens place), and 6 (ones place).\n- 3 (from 1 place of first number) * 6 (from 1 place of second number) = 18 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 18\n- 3 (from 1 place of first number) * 5 (from 10 place of second number) = 15 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 150\n- 3 (from 1 place of first number) * 8 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 6 (from 10 place of first number) * 6 (from 1 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 360\n- 6 (from 10 place of first number) * 5 (from 10 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 6 (from 10 place of first number) * 8 (from 100 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 48000\n- 7 (from 100 place of first number) * 6 (from 1 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4200\n- 7 (from 100 place of first number) * 5 (from 10 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 35000\n- 7 (from 100 place of first number) * 8 (from 100 place of second number) = 56 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 560000\n\nNow, add all these results together:\nThe sum of 18 + 150 + 2400 + 360 + 3000 + 48000 + 4200 + 35000 + 560000 = 653128."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 117 * 222?"}, {"role": "assistant", "content": "Here are the steps for multiplying 117 * 222 using the long multiplication method.\nStep 1: Break first number 117 into its individual digits: 1 (hundreds place), 1 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 222 into its individual digits: 2 (hundreds place), 2 (tens place), and 2 (ones place).\n- 7 (from 1 place of first number) * 2 (from 1 place of second number) = 14 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 14\n- 7 (from 1 place of first number) * 2 (from 10 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 140\n- 7 (from 1 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1400\n- 1 (from 10 place of first number) * 2 (from 1 place of second number) = 2 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 1 (from 10 place of first number) * 2 (from 10 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 200\n- 1 (from 10 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 1 (from 100 place of first number) * 2 (from 1 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 200\n- 1 (from 100 place of first number) * 2 (from 10 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 1 (from 100 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n\nNow, add all these results together:\nThe sum of 14 + 140 + 1400 + 20 + 200 + 2000 + 200 + 2000 + 20000 = 25974."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 386 * 952?"}, {"role": "assistant", "content": "Here are the steps for multiplying 386 * 952 using the long multiplication method.\nStep 1: Break first number 386 into its individual digits: 3 (hundreds place), 8 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 952 into its individual digits: 9 (hundreds place), 5 (tens place), and 2 (ones place).\n- 6 (from 1 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 12\n- 6 (from 1 place of first number) * 5 (from 10 place of second number) = 30 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 300\n- 6 (from 1 place of first number) * 9 (from 100 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5400\n- 8 (from 10 place of first number) * 2 (from 1 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 160\n- 8 (from 10 place of first number) * 5 (from 10 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 8 (from 10 place of first number) * 9 (from 100 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 72000\n- 3 (from 100 place of first number) * 2 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 3 (from 100 place of first number) * 5 (from 10 place of second number) = 15 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 15000\n- 3 (from 100 place of first number) * 9 (from 100 place of second number) = 27 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 270000\n\nNow, add all these results together:\nThe sum of 12 + 300 + 5400 + 160 + 4000 + 72000 + 600 + 15000 + 270000 = 367472."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 242 * 323?"}, {"role": "assistant", "content": "Here are the steps for multiplying 242 * 323 using the long multiplication method.\nStep 1: Break first number 242 into its individual digits: 2 (hundreds place), 4 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 323 into its individual digits: 3 (hundreds place), 2 (tens place), and 3 (ones place).\n- 2 (from 1 place of first number) * 3 (from 1 place of second number) = 6 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 6\n- 2 (from 1 place of first number) * 2 (from 10 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 40\n- 2 (from 1 place of first number) * 3 (from 100 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 600\n- 4 (from 10 place of first number) * 3 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 4 (from 10 place of first number) * 2 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 4 (from 10 place of first number) * 3 (from 100 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 12000\n- 2 (from 100 place of first number) * 3 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 2 (from 100 place of first number) * 2 (from 10 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 2 (from 100 place of first number) * 3 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 6 + 40 + 600 + 120 + 800 + 12000 + 600 + 4000 + 60000 = 78166."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 387 * 625?"}, {"role": "assistant", "content": "Here are the steps for multiplying 387 * 625 using the long multiplication method.\nStep 1: Break first number 387 into its individual digits: 3 (hundreds place), 8 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 625 into its individual digits: 6 (hundreds place), 2 (tens place), and 5 (ones place).\n- 7 (from 1 place of first number) * 5 (from 1 place of second number) = 35 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 35\n- 7 (from 1 place of first number) * 2 (from 10 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 140\n- 7 (from 1 place of first number) * 6 (from 100 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4200\n- 8 (from 10 place of first number) * 5 (from 1 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 8 (from 10 place of first number) * 2 (from 10 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1600\n- 8 (from 10 place of first number) * 6 (from 100 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 48000\n- 3 (from 100 place of first number) * 5 (from 1 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1500\n- 3 (from 100 place of first number) * 2 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 3 (from 100 place of first number) * 6 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 35 + 140 + 4200 + 400 + 1600 + 48000 + 1500 + 6000 + 180000 = 241875."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 260 * 704?"}, {"role": "assistant", "content": "Here are the steps for multiplying 260 * 704 using the long multiplication method.\nStep 1: Break first number 260 into its individual digits: 2 (hundreds place), 6 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 704 into its individual digits: 7 (hundreds place), 0 (tens place), and 4 (ones place).\n- 0 (from 1 place of first number) * 4 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 7 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 6 (from 10 place of first number) * 4 (from 1 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 240\n- 6 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 6 (from 10 place of first number) * 7 (from 100 place of second number) = 42 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 42000\n- 2 (from 100 place of first number) * 4 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 2 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 2 (from 100 place of first number) * 7 (from 100 place of second number) = 14 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 140000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 240 + 0 + 42000 + 800 + 0 + 140000 = 183040."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 433 * 845?"}, {"role": "assistant", "content": "Here are the steps for multiplying 433 * 845 using the long multiplication method.\nStep 1: Break first number 433 into its individual digits: 4 (hundreds place), 3 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 845 into its individual digits: 8 (hundreds place), 4 (tens place), and 5 (ones place).\n- 3 (from 1 place of first number) * 5 (from 1 place of second number) = 15 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 15\n- 3 (from 1 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 120\n- 3 (from 1 place of first number) * 8 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 3 (from 10 place of first number) * 5 (from 1 place of second number) = 15 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 150\n- 3 (from 10 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1200\n- 3 (from 10 place of first number) * 8 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 4 (from 100 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2000\n- 4 (from 100 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 16000\n- 4 (from 100 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 320000\n\nNow, add all these results together:\nThe sum of 15 + 120 + 2400 + 150 + 1200 + 24000 + 2000 + 16000 + 320000 = 365885."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 380 * 389?"}, {"role": "assistant", "content": "Here are the steps for multiplying 380 * 389 using the long multiplication method.\nStep 1: Break first number 380 into its individual digits: 3 (hundreds place), 8 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 389 into its individual digits: 3 (hundreds place), 8 (tens place), and 9 (ones place).\n- 0 (from 1 place of first number) * 9 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 8 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 3 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 8 (from 10 place of first number) * 9 (from 1 place of second number) = 72 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 720\n- 8 (from 10 place of first number) * 8 (from 10 place of second number) = 64 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 6400\n- 8 (from 10 place of first number) * 3 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 3 (from 100 place of first number) * 9 (from 1 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2700\n- 3 (from 100 place of first number) * 8 (from 10 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 24000\n- 3 (from 100 place of first number) * 3 (from 100 place of second number) = 9 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 90000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 720 + 6400 + 24000 + 2700 + 24000 + 90000 = 147820."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 315 * 204?"}, {"role": "assistant", "content": "Here are the steps for multiplying 315 * 204 using the long multiplication method.\nStep 1: Break first number 315 into its individual digits: 3 (hundreds place), 1 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 204 into its individual digits: 2 (hundreds place), 0 (tens place), and 4 (ones place).\n- 5 (from 1 place of first number) * 4 (from 1 place of second number) = 20 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 5 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 5 (from 1 place of first number) * 2 (from 100 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1000\n- 1 (from 10 place of first number) * 4 (from 1 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 1 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 1 (from 10 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 3 (from 100 place of first number) * 4 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 3 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 3 (from 100 place of first number) * 2 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 20 + 0 + 1000 + 40 + 0 + 2000 + 1200 + 0 + 60000 = 64260."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 616 * 595?"}, {"role": "assistant", "content": "Here are the steps for multiplying 616 * 595 using the long multiplication method.\nStep 1: Break first number 616 into its individual digits: 6 (hundreds place), 1 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 595 into its individual digits: 5 (hundreds place), 9 (tens place), and 5 (ones place).\n- 6 (from 1 place of first number) * 5 (from 1 place of second number) = 30 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 6 (from 1 place of first number) * 9 (from 10 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 540\n- 6 (from 1 place of first number) * 5 (from 100 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 1 (from 10 place of first number) * 5 (from 1 place of second number) = 5 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 50\n- 1 (from 10 place of first number) * 9 (from 10 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 900\n- 1 (from 10 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 5000\n- 6 (from 100 place of first number) * 5 (from 1 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3000\n- 6 (from 100 place of first number) * 9 (from 10 place of second number) = 54 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 54000\n- 6 (from 100 place of first number) * 5 (from 100 place of second number) = 30 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 300000\n\nNow, add all these results together:\nThe sum of 30 + 540 + 3000 + 50 + 900 + 5000 + 3000 + 54000 + 300000 = 366520."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 316 * 244?"}, {"role": "assistant", "content": "Here are the steps for multiplying 316 * 244 using the long multiplication method.\nStep 1: Break first number 316 into its individual digits: 3 (hundreds place), 1 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 244 into its individual digits: 2 (hundreds place), 4 (tens place), and 4 (ones place).\n- 6 (from 1 place of first number) * 4 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 6 (from 1 place of first number) * 4 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 6 (from 1 place of first number) * 2 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 1 (from 10 place of first number) * 4 (from 1 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 1 (from 10 place of first number) * 4 (from 10 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 1 (from 10 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 3 (from 100 place of first number) * 4 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 3 (from 100 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 3 (from 100 place of first number) * 2 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 24 + 240 + 1200 + 40 + 400 + 2000 + 1200 + 12000 + 60000 = 77104."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 620 * 934?"}, {"role": "assistant", "content": "Here are the steps for multiplying 620 * 934 using the long multiplication method.\nStep 1: Break first number 620 into its individual digits: 6 (hundreds place), 2 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 934 into its individual digits: 9 (hundreds place), 3 (tens place), and 4 (ones place).\n- 0 (from 1 place of first number) * 4 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 3 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 9 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 2 (from 10 place of first number) * 4 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 2 (from 10 place of first number) * 3 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 2 (from 10 place of first number) * 9 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 6 (from 100 place of first number) * 4 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 6 (from 100 place of first number) * 3 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 6 (from 100 place of first number) * 9 (from 100 place of second number) = 54 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 540000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 80 + 600 + 18000 + 2400 + 18000 + 540000 = 579080."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 510 * 796?"}, {"role": "assistant", "content": "Here are the steps for multiplying 510 * 796 using the long multiplication method.\nStep 1: Break first number 510 into its individual digits: 5 (hundreds place), 1 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 796 into its individual digits: 7 (hundreds place), 9 (tens place), and 6 (ones place).\n- 0 (from 1 place of first number) * 6 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 9 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 7 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 1 (from 10 place of first number) * 6 (from 1 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 60\n- 1 (from 10 place of first number) * 9 (from 10 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 900\n- 1 (from 10 place of first number) * 7 (from 100 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 7000\n- 5 (from 100 place of first number) * 6 (from 1 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3000\n- 5 (from 100 place of first number) * 9 (from 10 place of second number) = 45 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 45000\n- 5 (from 100 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 350000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 60 + 900 + 7000 + 3000 + 45000 + 350000 = 405960."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 141 * 143?"}, {"role": "assistant", "content": "Here are the steps for multiplying 141 * 143 using the long multiplication method.\nStep 1: Break first number 141 into its individual digits: 1 (hundreds place), 4 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 143 into its individual digits: 1 (hundreds place), 4 (tens place), and 3 (ones place).\n- 1 (from 1 place of first number) * 3 (from 1 place of second number) = 3 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 3\n- 1 (from 1 place of first number) * 4 (from 10 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 40\n- 1 (from 1 place of first number) * 1 (from 100 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 100\n- 4 (from 10 place of first number) * 3 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 4 (from 10 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1600\n- 4 (from 10 place of first number) * 1 (from 100 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 1 (from 100 place of first number) * 3 (from 1 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 1 (from 100 place of first number) * 4 (from 10 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 1 (from 100 place of first number) * 1 (from 100 place of second number) = 1 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 10000\n\nNow, add all these results together:\nThe sum of 3 + 40 + 100 + 120 + 1600 + 4000 + 300 + 4000 + 10000 = 20163."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 675 * 402?"}, {"role": "assistant", "content": "Here are the steps for multiplying 675 * 402 using the long multiplication method.\nStep 1: Break first number 675 into its individual digits: 6 (hundreds place), 7 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 402 into its individual digits: 4 (hundreds place), 0 (tens place), and 2 (ones place).\n- 5 (from 1 place of first number) * 2 (from 1 place of second number) = 10 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 10\n- 5 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 5 (from 1 place of first number) * 4 (from 100 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 7 (from 10 place of first number) * 2 (from 1 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 140\n- 7 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 7 (from 10 place of first number) * 4 (from 100 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 28000\n- 6 (from 100 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 6 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 6 (from 100 place of first number) * 4 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 10 + 0 + 2000 + 140 + 0 + 28000 + 1200 + 0 + 240000 = 271350."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 207 * 601?"}, {"role": "assistant", "content": "Here are the steps for multiplying 207 * 601 using the long multiplication method.\nStep 1: Break first number 207 into its individual digits: 2 (hundreds place), 0 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 601 into its individual digits: 6 (hundreds place), 0 (tens place), and 1 (ones place).\n- 7 (from 1 place of first number) * 1 (from 1 place of second number) = 7 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 7\n- 7 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 7 (from 1 place of first number) * 6 (from 100 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4200\n- 0 (from 10 place of first number) * 1 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 6 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 2 (from 100 place of first number) * 1 (from 1 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 200\n- 2 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 2 (from 100 place of first number) * 6 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 7 + 0 + 4200 + 0 + 0 + 0 + 200 + 0 + 120000 = 124407."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 794 * 745?"}, {"role": "assistant", "content": "Here are the steps for multiplying 794 * 745 using the long multiplication method.\nStep 1: Break first number 794 into its individual digits: 7 (hundreds place), 9 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 745 into its individual digits: 7 (hundreds place), 4 (tens place), and 5 (ones place).\n- 4 (from 1 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 4 (from 1 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 160\n- 4 (from 1 place of first number) * 7 (from 100 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2800\n- 9 (from 10 place of first number) * 5 (from 1 place of second number) = 45 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 450\n- 9 (from 10 place of first number) * 4 (from 10 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3600\n- 9 (from 10 place of first number) * 7 (from 100 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 63000\n- 7 (from 100 place of first number) * 5 (from 1 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3500\n- 7 (from 100 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 28000\n- 7 (from 100 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 490000\n\nNow, add all these results together:\nThe sum of 20 + 160 + 2800 + 450 + 3600 + 63000 + 3500 + 28000 + 490000 = 591530."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 313 * 164?"}, {"role": "assistant", "content": "Here are the steps for multiplying 313 * 164 using the long multiplication method.\nStep 1: Break first number 313 into its individual digits: 3 (hundreds place), 1 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 164 into its individual digits: 1 (hundreds place), 6 (tens place), and 4 (ones place).\n- 3 (from 1 place of first number) * 4 (from 1 place of second number) = 12 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 12\n- 3 (from 1 place of first number) * 6 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 3 (from 1 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 300\n- 1 (from 10 place of first number) * 4 (from 1 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 1 (from 10 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 1 (from 10 place of first number) * 1 (from 100 place of second number) = 1 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 1000\n- 3 (from 100 place of first number) * 4 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 3 (from 100 place of first number) * 6 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 3 (from 100 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n\nNow, add all these results together:\nThe sum of 12 + 180 + 300 + 40 + 600 + 1000 + 1200 + 18000 + 30000 = 51332."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 618 * 244?"}, {"role": "assistant", "content": "Here are the steps for multiplying 618 * 244 using the long multiplication method.\nStep 1: Break first number 618 into its individual digits: 6 (hundreds place), 1 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 244 into its individual digits: 2 (hundreds place), 4 (tens place), and 4 (ones place).\n- 8 (from 1 place of first number) * 4 (from 1 place of second number) = 32 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 32\n- 8 (from 1 place of first number) * 4 (from 10 place of second number) = 32 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 320\n- 8 (from 1 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 1 (from 10 place of first number) * 4 (from 1 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 1 (from 10 place of first number) * 4 (from 10 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 1 (from 10 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 6 (from 100 place of first number) * 4 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 6 (from 100 place of first number) * 4 (from 10 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 24000\n- 6 (from 100 place of first number) * 2 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 32 + 320 + 1600 + 40 + 400 + 2000 + 2400 + 24000 + 120000 = 150792."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 407 * 445?"}, {"role": "assistant", "content": "Here are the steps for multiplying 407 * 445 using the long multiplication method.\nStep 1: Break first number 407 into its individual digits: 4 (hundreds place), 0 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 445 into its individual digits: 4 (hundreds place), 4 (tens place), and 5 (ones place).\n- 7 (from 1 place of first number) * 5 (from 1 place of second number) = 35 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 35\n- 7 (from 1 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 280\n- 7 (from 1 place of first number) * 4 (from 100 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2800\n- 0 (from 10 place of first number) * 5 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 4 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 4 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 4 (from 100 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2000\n- 4 (from 100 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 16000\n- 4 (from 100 place of first number) * 4 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 35 + 280 + 2800 + 0 + 0 + 0 + 2000 + 16000 + 160000 = 181115."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 114 * 331?"}, {"role": "assistant", "content": "Here are the steps for multiplying 114 * 331 using the long multiplication method.\nStep 1: Break first number 114 into its individual digits: 1 (hundreds place), 1 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 331 into its individual digits: 3 (hundreds place), 3 (tens place), and 1 (ones place).\n- 4 (from 1 place of first number) * 1 (from 1 place of second number) = 4 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 4\n- 4 (from 1 place of first number) * 3 (from 10 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 120\n- 4 (from 1 place of first number) * 3 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 1 (from 10 place of first number) * 1 (from 1 place of second number) = 1 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 10\n- 1 (from 10 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 300\n- 1 (from 10 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 1 (from 100 place of first number) * 1 (from 1 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 100\n- 1 (from 100 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 1 (from 100 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n\nNow, add all these results together:\nThe sum of 4 + 120 + 1200 + 10 + 300 + 3000 + 100 + 3000 + 30000 = 37734."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 377 * 298?"}, {"role": "assistant", "content": "Here are the steps for multiplying 377 * 298 using the long multiplication method.\nStep 1: Break first number 377 into its individual digits: 3 (hundreds place), 7 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 298 into its individual digits: 2 (hundreds place), 9 (tens place), and 8 (ones place).\n- 7 (from 1 place of first number) * 8 (from 1 place of second number) = 56 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 56\n- 7 (from 1 place of first number) * 9 (from 10 place of second number) = 63 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 630\n- 7 (from 1 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1400\n- 7 (from 10 place of first number) * 8 (from 1 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 560\n- 7 (from 10 place of first number) * 9 (from 10 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 6300\n- 7 (from 10 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 14000\n- 3 (from 100 place of first number) * 8 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 3 (from 100 place of first number) * 9 (from 10 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 27000\n- 3 (from 100 place of first number) * 2 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 56 + 630 + 1400 + 560 + 6300 + 14000 + 2400 + 27000 + 60000 = 112346."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 376 * 278?"}, {"role": "assistant", "content": "Here are the steps for multiplying 376 * 278 using the long multiplication method.\nStep 1: Break first number 376 into its individual digits: 3 (hundreds place), 7 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 278 into its individual digits: 2 (hundreds place), 7 (tens place), and 8 (ones place).\n- 6 (from 1 place of first number) * 8 (from 1 place of second number) = 48 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 48\n- 6 (from 1 place of first number) * 7 (from 10 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 420\n- 6 (from 1 place of first number) * 2 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 7 (from 10 place of first number) * 8 (from 1 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 560\n- 7 (from 10 place of first number) * 7 (from 10 place of second number) = 49 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4900\n- 7 (from 10 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 14000\n- 3 (from 100 place of first number) * 8 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 3 (from 100 place of first number) * 7 (from 10 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 21000\n- 3 (from 100 place of first number) * 2 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 48 + 420 + 1200 + 560 + 4900 + 14000 + 2400 + 21000 + 60000 = 104528."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 488 * 688?"}, {"role": "assistant", "content": "Here are the steps for multiplying 488 * 688 using the long multiplication method.\nStep 1: Break first number 488 into its individual digits: 4 (hundreds place), 8 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 688 into its individual digits: 6 (hundreds place), 8 (tens place), and 8 (ones place).\n- 8 (from 1 place of first number) * 8 (from 1 place of second number) = 64 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 64\n- 8 (from 1 place of first number) * 8 (from 10 place of second number) = 64 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 640\n- 8 (from 1 place of first number) * 6 (from 100 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4800\n- 8 (from 10 place of first number) * 8 (from 1 place of second number) = 64 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 640\n- 8 (from 10 place of first number) * 8 (from 10 place of second number) = 64 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 6400\n- 8 (from 10 place of first number) * 6 (from 100 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 48000\n- 4 (from 100 place of first number) * 8 (from 1 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3200\n- 4 (from 100 place of first number) * 8 (from 10 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 32000\n- 4 (from 100 place of first number) * 6 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 64 + 640 + 4800 + 640 + 6400 + 48000 + 3200 + 32000 + 240000 = 335744."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 162 * 333?"}, {"role": "assistant", "content": "Here are the steps for multiplying 162 * 333 using the long multiplication method.\nStep 1: Break first number 162 into its individual digits: 1 (hundreds place), 6 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 333 into its individual digits: 3 (hundreds place), 3 (tens place), and 3 (ones place).\n- 2 (from 1 place of first number) * 3 (from 1 place of second number) = 6 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 6\n- 2 (from 1 place of first number) * 3 (from 10 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 60\n- 2 (from 1 place of first number) * 3 (from 100 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 600\n- 6 (from 10 place of first number) * 3 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 6 (from 10 place of first number) * 3 (from 10 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1800\n- 6 (from 10 place of first number) * 3 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 1 (from 100 place of first number) * 3 (from 1 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 1 (from 100 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 1 (from 100 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n\nNow, add all these results together:\nThe sum of 6 + 60 + 600 + 180 + 1800 + 18000 + 300 + 3000 + 30000 = 53946."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 144 * 943?"}, {"role": "assistant", "content": "Here are the steps for multiplying 144 * 943 using the long multiplication method.\nStep 1: Break first number 144 into its individual digits: 1 (hundreds place), 4 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 943 into its individual digits: 9 (hundreds place), 4 (tens place), and 3 (ones place).\n- 4 (from 1 place of first number) * 3 (from 1 place of second number) = 12 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 12\n- 4 (from 1 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 160\n- 4 (from 1 place of first number) * 9 (from 100 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3600\n- 4 (from 10 place of first number) * 3 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 4 (from 10 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1600\n- 4 (from 10 place of first number) * 9 (from 100 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 36000\n- 1 (from 100 place of first number) * 3 (from 1 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 1 (from 100 place of first number) * 4 (from 10 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 1 (from 100 place of first number) * 9 (from 100 place of second number) = 9 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 90000\n\nNow, add all these results together:\nThe sum of 12 + 160 + 3600 + 120 + 1600 + 36000 + 300 + 4000 + 90000 = 135792."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 902 * 541?"}, {"role": "assistant", "content": "Here are the steps for multiplying 902 * 541 using the long multiplication method.\nStep 1: Break first number 902 into its individual digits: 9 (hundreds place), 0 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 541 into its individual digits: 5 (hundreds place), 4 (tens place), and 1 (ones place).\n- 2 (from 1 place of first number) * 1 (from 1 place of second number) = 2 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 2\n- 2 (from 1 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 80\n- 2 (from 1 place of first number) * 5 (from 100 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1000\n- 0 (from 10 place of first number) * 1 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 4 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 5 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 9 (from 100 place of first number) * 1 (from 1 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 900\n- 9 (from 100 place of first number) * 4 (from 10 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 36000\n- 9 (from 100 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 450000\n\nNow, add all these results together:\nThe sum of 2 + 80 + 1000 + 0 + 0 + 0 + 900 + 36000 + 450000 = 487982."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 317 * 157?"}, {"role": "assistant", "content": "Here are the steps for multiplying 317 * 157 using the long multiplication method.\nStep 1: Break first number 317 into its individual digits: 3 (hundreds place), 1 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 157 into its individual digits: 1 (hundreds place), 5 (tens place), and 7 (ones place).\n- 7 (from 1 place of first number) * 7 (from 1 place of second number) = 49 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 49\n- 7 (from 1 place of first number) * 5 (from 10 place of second number) = 35 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 350\n- 7 (from 1 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 700\n- 1 (from 10 place of first number) * 7 (from 1 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 70\n- 1 (from 10 place of first number) * 5 (from 10 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 500\n- 1 (from 10 place of first number) * 1 (from 100 place of second number) = 1 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 1000\n- 3 (from 100 place of first number) * 7 (from 1 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2100\n- 3 (from 100 place of first number) * 5 (from 10 place of second number) = 15 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 15000\n- 3 (from 100 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n\nNow, add all these results together:\nThe sum of 49 + 350 + 700 + 70 + 500 + 1000 + 2100 + 15000 + 30000 = 49769."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 249 * 834?"}, {"role": "assistant", "content": "Here are the steps for multiplying 249 * 834 using the long multiplication method.\nStep 1: Break first number 249 into its individual digits: 2 (hundreds place), 4 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 834 into its individual digits: 8 (hundreds place), 3 (tens place), and 4 (ones place).\n- 9 (from 1 place of first number) * 4 (from 1 place of second number) = 36 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 36\n- 9 (from 1 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 270\n- 9 (from 1 place of first number) * 8 (from 100 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 7200\n- 4 (from 10 place of first number) * 4 (from 1 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 160\n- 4 (from 10 place of first number) * 3 (from 10 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1200\n- 4 (from 10 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 32000\n- 2 (from 100 place of first number) * 4 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 2 (from 100 place of first number) * 3 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 2 (from 100 place of first number) * 8 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 36 + 270 + 7200 + 160 + 1200 + 32000 + 800 + 6000 + 160000 = 207666."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 166 * 409?"}, {"role": "assistant", "content": "Here are the steps for multiplying 166 * 409 using the long multiplication method.\nStep 1: Break first number 166 into its individual digits: 1 (hundreds place), 6 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 409 into its individual digits: 4 (hundreds place), 0 (tens place), and 9 (ones place).\n- 6 (from 1 place of first number) * 9 (from 1 place of second number) = 54 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 54\n- 6 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 6 (from 1 place of first number) * 4 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 6 (from 10 place of first number) * 9 (from 1 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 540\n- 6 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 6 (from 10 place of first number) * 4 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 1 (from 100 place of first number) * 9 (from 1 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 900\n- 1 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 1 (from 100 place of first number) * 4 (from 100 place of second number) = 4 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n\nNow, add all these results together:\nThe sum of 54 + 0 + 2400 + 540 + 0 + 24000 + 900 + 0 + 40000 = 67894."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 682 * 680?"}, {"role": "assistant", "content": "Here are the steps for multiplying 682 * 680 using the long multiplication method.\nStep 1: Break first number 682 into its individual digits: 6 (hundreds place), 8 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 680 into its individual digits: 6 (hundreds place), 8 (tens place), and 0 (ones place).\n- 2 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 2 (from 1 place of first number) * 8 (from 10 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 160\n- 2 (from 1 place of first number) * 6 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 8 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 10 place of first number) * 8 (from 10 place of second number) = 64 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 6400\n- 8 (from 10 place of first number) * 6 (from 100 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 48000\n- 6 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 6 (from 100 place of first number) * 8 (from 10 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 48000\n- 6 (from 100 place of first number) * 6 (from 100 place of second number) = 36 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 360000\n\nNow, add all these results together:\nThe sum of 0 + 160 + 1200 + 0 + 6400 + 48000 + 0 + 48000 + 360000 = 463760."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 217 * 633?"}, {"role": "assistant", "content": "Here are the steps for multiplying 217 * 633 using the long multiplication method.\nStep 1: Break first number 217 into its individual digits: 2 (hundreds place), 1 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 633 into its individual digits: 6 (hundreds place), 3 (tens place), and 3 (ones place).\n- 7 (from 1 place of first number) * 3 (from 1 place of second number) = 21 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 21\n- 7 (from 1 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 210\n- 7 (from 1 place of first number) * 6 (from 100 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4200\n- 1 (from 10 place of first number) * 3 (from 1 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 1 (from 10 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 300\n- 1 (from 10 place of first number) * 6 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 2 (from 100 place of first number) * 3 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 2 (from 100 place of first number) * 3 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 2 (from 100 place of first number) * 6 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 21 + 210 + 4200 + 30 + 300 + 6000 + 600 + 6000 + 120000 = 137361."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 111 * 610?"}, {"role": "assistant", "content": "Here are the steps for multiplying 111 * 610 using the long multiplication method.\nStep 1: Break first number 111 into its individual digits: 1 (hundreds place), 1 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 610 into its individual digits: 6 (hundreds place), 1 (tens place), and 0 (ones place).\n- 1 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 1 (from 1 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 10\n- 1 (from 1 place of first number) * 6 (from 100 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 600\n- 1 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 1 (from 10 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 1 (from 10 place of first number) * 6 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 1 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 1 (from 100 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 1000\n- 1 (from 100 place of first number) * 6 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 0 + 10 + 600 + 0 + 100 + 6000 + 0 + 1000 + 60000 = 67710."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 103 * 281?"}, {"role": "assistant", "content": "Here are the steps for multiplying 103 * 281 using the long multiplication method.\nStep 1: Break first number 103 into its individual digits: 1 (hundreds place), 0 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 281 into its individual digits: 2 (hundreds place), 8 (tens place), and 1 (ones place).\n- 3 (from 1 place of first number) * 1 (from 1 place of second number) = 3 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 3\n- 3 (from 1 place of first number) * 8 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 3 (from 1 place of first number) * 2 (from 100 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 600\n- 0 (from 10 place of first number) * 1 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 8 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 2 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 1 (from 100 place of first number) * 1 (from 1 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 100\n- 1 (from 100 place of first number) * 8 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 1 (from 100 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n\nNow, add all these results together:\nThe sum of 3 + 240 + 600 + 0 + 0 + 0 + 100 + 8000 + 20000 = 28943."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 191 * 935?"}, {"role": "assistant", "content": "Here are the steps for multiplying 191 * 935 using the long multiplication method.\nStep 1: Break first number 191 into its individual digits: 1 (hundreds place), 9 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 935 into its individual digits: 9 (hundreds place), 3 (tens place), and 5 (ones place).\n- 1 (from 1 place of first number) * 5 (from 1 place of second number) = 5 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 5\n- 1 (from 1 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 30\n- 1 (from 1 place of first number) * 9 (from 100 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 900\n- 9 (from 10 place of first number) * 5 (from 1 place of second number) = 45 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 450\n- 9 (from 10 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2700\n- 9 (from 10 place of first number) * 9 (from 100 place of second number) = 81 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 81000\n- 1 (from 100 place of first number) * 5 (from 1 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 500\n- 1 (from 100 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 1 (from 100 place of first number) * 9 (from 100 place of second number) = 9 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 90000\n\nNow, add all these results together:\nThe sum of 5 + 30 + 900 + 450 + 2700 + 81000 + 500 + 3000 + 90000 = 178585."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 306 * 516?"}, {"role": "assistant", "content": "Here are the steps for multiplying 306 * 516 using the long multiplication method.\nStep 1: Break first number 306 into its individual digits: 3 (hundreds place), 0 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 516 into its individual digits: 5 (hundreds place), 1 (tens place), and 6 (ones place).\n- 6 (from 1 place of first number) * 6 (from 1 place of second number) = 36 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 36\n- 6 (from 1 place of first number) * 1 (from 10 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 60\n- 6 (from 1 place of first number) * 5 (from 100 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 0 (from 10 place of first number) * 6 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 1 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 5 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 3 (from 100 place of first number) * 6 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 3 (from 100 place of first number) * 1 (from 10 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 3 (from 100 place of first number) * 5 (from 100 place of second number) = 15 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 150000\n\nNow, add all these results together:\nThe sum of 36 + 60 + 3000 + 0 + 0 + 0 + 1800 + 3000 + 150000 = 157896."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 301 * 558?"}, {"role": "assistant", "content": "Here are the steps for multiplying 301 * 558 using the long multiplication method.\nStep 1: Break first number 301 into its individual digits: 3 (hundreds place), 0 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 558 into its individual digits: 5 (hundreds place), 5 (tens place), and 8 (ones place).\n- 1 (from 1 place of first number) * 8 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 1 (from 1 place of first number) * 5 (from 10 place of second number) = 5 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 50\n- 1 (from 1 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 500\n- 0 (from 10 place of first number) * 8 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 5 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 5 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 3 (from 100 place of first number) * 8 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 3 (from 100 place of first number) * 5 (from 10 place of second number) = 15 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 15000\n- 3 (from 100 place of first number) * 5 (from 100 place of second number) = 15 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 150000\n\nNow, add all these results together:\nThe sum of 8 + 50 + 500 + 0 + 0 + 0 + 2400 + 15000 + 150000 = 167958."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 833 * 720?"}, {"role": "assistant", "content": "Here are the steps for multiplying 833 * 720 using the long multiplication method.\nStep 1: Break first number 833 into its individual digits: 8 (hundreds place), 3 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 720 into its individual digits: 7 (hundreds place), 2 (tens place), and 0 (ones place).\n- 3 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 3 (from 1 place of first number) * 2 (from 10 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 60\n- 3 (from 1 place of first number) * 7 (from 100 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2100\n- 3 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 3 (from 10 place of first number) * 2 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 3 (from 10 place of first number) * 7 (from 100 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 21000\n- 8 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 100 place of first number) * 2 (from 10 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 16000\n- 8 (from 100 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 560000\n\nNow, add all these results together:\nThe sum of 0 + 60 + 2100 + 0 + 600 + 21000 + 0 + 16000 + 560000 = 599760."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 817 * 200?"}, {"role": "assistant", "content": "Here are the steps for multiplying 817 * 200 using the long multiplication method.\nStep 1: Break first number 817 into its individual digits: 8 (hundreds place), 1 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 200 into its individual digits: 2 (hundreds place), 0 (tens place), and 0 (ones place).\n- 7 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 7 (from 1 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1400\n- 1 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 1 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 1 (from 10 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 8 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 8 (from 100 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 1400 + 0 + 0 + 2000 + 0 + 0 + 160000 = 163400."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 480 * 450?"}, {"role": "assistant", "content": "Here are the steps for multiplying 480 * 450 using the long multiplication method.\nStep 1: Break first number 480 into its individual digits: 4 (hundreds place), 8 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 450 into its individual digits: 4 (hundreds place), 5 (tens place), and 0 (ones place).\n- 0 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 5 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 4 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 8 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 10 place of first number) * 5 (from 10 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 8 (from 10 place of first number) * 4 (from 100 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 32000\n- 4 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 4 (from 100 place of first number) * 5 (from 10 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 20000\n- 4 (from 100 place of first number) * 4 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 0 + 4000 + 32000 + 0 + 20000 + 160000 = 216000."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 317 * 364?"}, {"role": "assistant", "content": "Here are the steps for multiplying 317 * 364 using the long multiplication method.\nStep 1: Break first number 317 into its individual digits: 3 (hundreds place), 1 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 364 into its individual digits: 3 (hundreds place), 6 (tens place), and 4 (ones place).\n- 7 (from 1 place of first number) * 4 (from 1 place of second number) = 28 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 28\n- 7 (from 1 place of first number) * 6 (from 10 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 420\n- 7 (from 1 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2100\n- 1 (from 10 place of first number) * 4 (from 1 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 1 (from 10 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 1 (from 10 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 3 (from 100 place of first number) * 4 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 3 (from 100 place of first number) * 6 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 3 (from 100 place of first number) * 3 (from 100 place of second number) = 9 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 90000\n\nNow, add all these results together:\nThe sum of 28 + 420 + 2100 + 40 + 600 + 3000 + 1200 + 18000 + 90000 = 115388."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 771 * 712?"}, {"role": "assistant", "content": "Here are the steps for multiplying 771 * 712 using the long multiplication method.\nStep 1: Break first number 771 into its individual digits: 7 (hundreds place), 7 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 712 into its individual digits: 7 (hundreds place), 1 (tens place), and 2 (ones place).\n- 1 (from 1 place of first number) * 2 (from 1 place of second number) = 2 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 2\n- 1 (from 1 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 10\n- 1 (from 1 place of first number) * 7 (from 100 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 700\n- 7 (from 10 place of first number) * 2 (from 1 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 140\n- 7 (from 10 place of first number) * 1 (from 10 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 700\n- 7 (from 10 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 49000\n- 7 (from 100 place of first number) * 2 (from 1 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1400\n- 7 (from 100 place of first number) * 1 (from 10 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 7000\n- 7 (from 100 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 490000\n\nNow, add all these results together:\nThe sum of 2 + 10 + 700 + 140 + 700 + 49000 + 1400 + 7000 + 490000 = 548952."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 773 * 749?"}, {"role": "assistant", "content": "Here are the steps for multiplying 773 * 749 using the long multiplication method.\nStep 1: Break first number 773 into its individual digits: 7 (hundreds place), 7 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 749 into its individual digits: 7 (hundreds place), 4 (tens place), and 9 (ones place).\n- 3 (from 1 place of first number) * 9 (from 1 place of second number) = 27 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 27\n- 3 (from 1 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 120\n- 3 (from 1 place of first number) * 7 (from 100 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2100\n- 7 (from 10 place of first number) * 9 (from 1 place of second number) = 63 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 630\n- 7 (from 10 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2800\n- 7 (from 10 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 49000\n- 7 (from 100 place of first number) * 9 (from 1 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 6300\n- 7 (from 100 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 28000\n- 7 (from 100 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 490000\n\nNow, add all these results together:\nThe sum of 27 + 120 + 2100 + 630 + 2800 + 49000 + 6300 + 28000 + 490000 = 578977."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 914 * 682?"}, {"role": "assistant", "content": "Here are the steps for multiplying 914 * 682 using the long multiplication method.\nStep 1: Break first number 914 into its individual digits: 9 (hundreds place), 1 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 682 into its individual digits: 6 (hundreds place), 8 (tens place), and 2 (ones place).\n- 4 (from 1 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 4 (from 1 place of first number) * 8 (from 10 place of second number) = 32 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 320\n- 4 (from 1 place of first number) * 6 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 1 (from 10 place of first number) * 2 (from 1 place of second number) = 2 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 1 (from 10 place of first number) * 8 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 1 (from 10 place of first number) * 6 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 9 (from 100 place of first number) * 2 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 9 (from 100 place of first number) * 8 (from 10 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 72000\n- 9 (from 100 place of first number) * 6 (from 100 place of second number) = 54 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 540000\n\nNow, add all these results together:\nThe sum of 8 + 320 + 2400 + 20 + 800 + 6000 + 1800 + 72000 + 540000 = 623348."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 213 * 594?"}, {"role": "assistant", "content": "Here are the steps for multiplying 213 * 594 using the long multiplication method.\nStep 1: Break first number 213 into its individual digits: 2 (hundreds place), 1 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 594 into its individual digits: 5 (hundreds place), 9 (tens place), and 4 (ones place).\n- 3 (from 1 place of first number) * 4 (from 1 place of second number) = 12 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 12\n- 3 (from 1 place of first number) * 9 (from 10 place of second number) = 27 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 270\n- 3 (from 1 place of first number) * 5 (from 100 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1500\n- 1 (from 10 place of first number) * 4 (from 1 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 1 (from 10 place of first number) * 9 (from 10 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 900\n- 1 (from 10 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 5000\n- 2 (from 100 place of first number) * 4 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 2 (from 100 place of first number) * 9 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 2 (from 100 place of first number) * 5 (from 100 place of second number) = 10 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 100000\n\nNow, add all these results together:\nThe sum of 12 + 270 + 1500 + 40 + 900 + 5000 + 800 + 18000 + 100000 = 126522."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 598 * 785?"}, {"role": "assistant", "content": "Here are the steps for multiplying 598 * 785 using the long multiplication method.\nStep 1: Break first number 598 into its individual digits: 5 (hundreds place), 9 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 785 into its individual digits: 7 (hundreds place), 8 (tens place), and 5 (ones place).\n- 8 (from 1 place of first number) * 5 (from 1 place of second number) = 40 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 8 (from 1 place of first number) * 8 (from 10 place of second number) = 64 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 640\n- 8 (from 1 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5600\n- 9 (from 10 place of first number) * 5 (from 1 place of second number) = 45 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 450\n- 9 (from 10 place of first number) * 8 (from 10 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 7200\n- 9 (from 10 place of first number) * 7 (from 100 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 63000\n- 5 (from 100 place of first number) * 5 (from 1 place of second number) = 25 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2500\n- 5 (from 100 place of first number) * 8 (from 10 place of second number) = 40 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 40000\n- 5 (from 100 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 350000\n\nNow, add all these results together:\nThe sum of 40 + 640 + 5600 + 450 + 7200 + 63000 + 2500 + 40000 + 350000 = 469430."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 165 * 137?"}, {"role": "assistant", "content": "Here are the steps for multiplying 165 * 137 using the long multiplication method.\nStep 1: Break first number 165 into its individual digits: 1 (hundreds place), 6 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 137 into its individual digits: 1 (hundreds place), 3 (tens place), and 7 (ones place).\n- 5 (from 1 place of first number) * 7 (from 1 place of second number) = 35 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 35\n- 5 (from 1 place of first number) * 3 (from 10 place of second number) = 15 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 150\n- 5 (from 1 place of first number) * 1 (from 100 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 500\n- 6 (from 10 place of first number) * 7 (from 1 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 420\n- 6 (from 10 place of first number) * 3 (from 10 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1800\n- 6 (from 10 place of first number) * 1 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 1 (from 100 place of first number) * 7 (from 1 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 700\n- 1 (from 100 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 1 (from 100 place of first number) * 1 (from 100 place of second number) = 1 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 10000\n\nNow, add all these results together:\nThe sum of 35 + 150 + 500 + 420 + 1800 + 6000 + 700 + 3000 + 10000 = 22605."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 280 * 513?"}, {"role": "assistant", "content": "Here are the steps for multiplying 280 * 513 using the long multiplication method.\nStep 1: Break first number 280 into its individual digits: 2 (hundreds place), 8 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 513 into its individual digits: 5 (hundreds place), 1 (tens place), and 3 (ones place).\n- 0 (from 1 place of first number) * 3 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 1 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 5 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 8 (from 10 place of first number) * 3 (from 1 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 240\n- 8 (from 10 place of first number) * 1 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 8 (from 10 place of first number) * 5 (from 100 place of second number) = 40 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n- 2 (from 100 place of first number) * 3 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 2 (from 100 place of first number) * 1 (from 10 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 2 (from 100 place of first number) * 5 (from 100 place of second number) = 10 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 100000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 240 + 800 + 40000 + 600 + 2000 + 100000 = 143640."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 438 * 693?"}, {"role": "assistant", "content": "Here are the steps for multiplying 438 * 693 using the long multiplication method.\nStep 1: Break first number 438 into its individual digits: 4 (hundreds place), 3 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 693 into its individual digits: 6 (hundreds place), 9 (tens place), and 3 (ones place).\n- 8 (from 1 place of first number) * 3 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 8 (from 1 place of first number) * 9 (from 10 place of second number) = 72 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 720\n- 8 (from 1 place of first number) * 6 (from 100 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4800\n- 3 (from 10 place of first number) * 3 (from 1 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 90\n- 3 (from 10 place of first number) * 9 (from 10 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2700\n- 3 (from 10 place of first number) * 6 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 4 (from 100 place of first number) * 3 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 4 (from 100 place of first number) * 9 (from 10 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 36000\n- 4 (from 100 place of first number) * 6 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 24 + 720 + 4800 + 90 + 2700 + 18000 + 1200 + 36000 + 240000 = 303534."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 945 * 517?"}, {"role": "assistant", "content": "Here are the steps for multiplying 945 * 517 using the long multiplication method.\nStep 1: Break first number 945 into its individual digits: 9 (hundreds place), 4 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 517 into its individual digits: 5 (hundreds place), 1 (tens place), and 7 (ones place).\n- 5 (from 1 place of first number) * 7 (from 1 place of second number) = 35 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 35\n- 5 (from 1 place of first number) * 1 (from 10 place of second number) = 5 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 50\n- 5 (from 1 place of first number) * 5 (from 100 place of second number) = 25 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2500\n- 4 (from 10 place of first number) * 7 (from 1 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 280\n- 4 (from 10 place of first number) * 1 (from 10 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 4 (from 10 place of first number) * 5 (from 100 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n- 9 (from 100 place of first number) * 7 (from 1 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 6300\n- 9 (from 100 place of first number) * 1 (from 10 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 9000\n- 9 (from 100 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 450000\n\nNow, add all these results together:\nThe sum of 35 + 50 + 2500 + 280 + 400 + 20000 + 6300 + 9000 + 450000 = 488565."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 195 * 338?"}, {"role": "assistant", "content": "Here are the steps for multiplying 195 * 338 using the long multiplication method.\nStep 1: Break first number 195 into its individual digits: 1 (hundreds place), 9 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 338 into its individual digits: 3 (hundreds place), 3 (tens place), and 8 (ones place).\n- 5 (from 1 place of first number) * 8 (from 1 place of second number) = 40 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 5 (from 1 place of first number) * 3 (from 10 place of second number) = 15 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 150\n- 5 (from 1 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1500\n- 9 (from 10 place of first number) * 8 (from 1 place of second number) = 72 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 720\n- 9 (from 10 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2700\n- 9 (from 10 place of first number) * 3 (from 100 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 27000\n- 1 (from 100 place of first number) * 8 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 1 (from 100 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 1 (from 100 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n\nNow, add all these results together:\nThe sum of 40 + 150 + 1500 + 720 + 2700 + 27000 + 800 + 3000 + 30000 = 65910."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 442 * 861?"}, {"role": "assistant", "content": "Here are the steps for multiplying 442 * 861 using the long multiplication method.\nStep 1: Break first number 442 into its individual digits: 4 (hundreds place), 4 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 861 into its individual digits: 8 (hundreds place), 6 (tens place), and 1 (ones place).\n- 2 (from 1 place of first number) * 1 (from 1 place of second number) = 2 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 2\n- 2 (from 1 place of first number) * 6 (from 10 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 120\n- 2 (from 1 place of first number) * 8 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 4 (from 10 place of first number) * 1 (from 1 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 4 (from 10 place of first number) * 6 (from 10 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2400\n- 4 (from 10 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 32000\n- 4 (from 100 place of first number) * 1 (from 1 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 4 (from 100 place of first number) * 6 (from 10 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 24000\n- 4 (from 100 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 320000\n\nNow, add all these results together:\nThe sum of 2 + 120 + 1600 + 40 + 2400 + 32000 + 400 + 24000 + 320000 = 380562."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 997 * 834?"}, {"role": "assistant", "content": "Here are the steps for multiplying 997 * 834 using the long multiplication method.\nStep 1: Break first number 997 into its individual digits: 9 (hundreds place), 9 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 834 into its individual digits: 8 (hundreds place), 3 (tens place), and 4 (ones place).\n- 7 (from 1 place of first number) * 4 (from 1 place of second number) = 28 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 28\n- 7 (from 1 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 210\n- 7 (from 1 place of first number) * 8 (from 100 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5600\n- 9 (from 10 place of first number) * 4 (from 1 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 360\n- 9 (from 10 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2700\n- 9 (from 10 place of first number) * 8 (from 100 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 72000\n- 9 (from 100 place of first number) * 4 (from 1 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3600\n- 9 (from 100 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 27000\n- 9 (from 100 place of first number) * 8 (from 100 place of second number) = 72 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 720000\n\nNow, add all these results together:\nThe sum of 28 + 210 + 5600 + 360 + 2700 + 72000 + 3600 + 27000 + 720000 = 831498."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 712 * 651?"}, {"role": "assistant", "content": "Here are the steps for multiplying 712 * 651 using the long multiplication method.\nStep 1: Break first number 712 into its individual digits: 7 (hundreds place), 1 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 651 into its individual digits: 6 (hundreds place), 5 (tens place), and 1 (ones place).\n- 2 (from 1 place of first number) * 1 (from 1 place of second number) = 2 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 2\n- 2 (from 1 place of first number) * 5 (from 10 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 2 (from 1 place of first number) * 6 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 1 (from 10 place of first number) * 1 (from 1 place of second number) = 1 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 10\n- 1 (from 10 place of first number) * 5 (from 10 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 500\n- 1 (from 10 place of first number) * 6 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 7 (from 100 place of first number) * 1 (from 1 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 700\n- 7 (from 100 place of first number) * 5 (from 10 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 35000\n- 7 (from 100 place of first number) * 6 (from 100 place of second number) = 42 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 420000\n\nNow, add all these results together:\nThe sum of 2 + 100 + 1200 + 10 + 500 + 6000 + 700 + 35000 + 420000 = 463512."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 716 * 284?"}, {"role": "assistant", "content": "Here are the steps for multiplying 716 * 284 using the long multiplication method.\nStep 1: Break first number 716 into its individual digits: 7 (hundreds place), 1 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 284 into its individual digits: 2 (hundreds place), 8 (tens place), and 4 (ones place).\n- 6 (from 1 place of first number) * 4 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 6 (from 1 place of first number) * 8 (from 10 place of second number) = 48 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 480\n- 6 (from 1 place of first number) * 2 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 1 (from 10 place of first number) * 4 (from 1 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 1 (from 10 place of first number) * 8 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 1 (from 10 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 7 (from 100 place of first number) * 4 (from 1 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2800\n- 7 (from 100 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 56000\n- 7 (from 100 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 140000\n\nNow, add all these results together:\nThe sum of 24 + 480 + 1200 + 40 + 800 + 2000 + 2800 + 56000 + 140000 = 203344."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 179 * 780?"}, {"role": "assistant", "content": "Here are the steps for multiplying 179 * 780 using the long multiplication method.\nStep 1: Break first number 179 into its individual digits: 1 (hundreds place), 7 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 780 into its individual digits: 7 (hundreds place), 8 (tens place), and 0 (ones place).\n- 9 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 9 (from 1 place of first number) * 8 (from 10 place of second number) = 72 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 720\n- 9 (from 1 place of first number) * 7 (from 100 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 6300\n- 7 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 10 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5600\n- 7 (from 10 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 49000\n- 1 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 1 (from 100 place of first number) * 8 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 1 (from 100 place of first number) * 7 (from 100 place of second number) = 7 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 70000\n\nNow, add all these results together:\nThe sum of 0 + 720 + 6300 + 0 + 5600 + 49000 + 0 + 8000 + 70000 = 139620."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 412 * 670?"}, {"role": "assistant", "content": "Here are the steps for multiplying 412 * 670 using the long multiplication method.\nStep 1: Break first number 412 into its individual digits: 4 (hundreds place), 1 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 670 into its individual digits: 6 (hundreds place), 7 (tens place), and 0 (ones place).\n- 2 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 2 (from 1 place of first number) * 7 (from 10 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 140\n- 2 (from 1 place of first number) * 6 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 1 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 1 (from 10 place of first number) * 7 (from 10 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 700\n- 1 (from 10 place of first number) * 6 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 4 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 4 (from 100 place of first number) * 7 (from 10 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 28000\n- 4 (from 100 place of first number) * 6 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 0 + 140 + 1200 + 0 + 700 + 6000 + 0 + 28000 + 240000 = 276040."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 290 * 176?"}, {"role": "assistant", "content": "Here are the steps for multiplying 290 * 176 using the long multiplication method.\nStep 1: Break first number 290 into its individual digits: 2 (hundreds place), 9 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 176 into its individual digits: 1 (hundreds place), 7 (tens place), and 6 (ones place).\n- 0 (from 1 place of first number) * 6 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 7 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 1 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 9 (from 10 place of first number) * 6 (from 1 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 540\n- 9 (from 10 place of first number) * 7 (from 10 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 6300\n- 9 (from 10 place of first number) * 1 (from 100 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 9000\n- 2 (from 100 place of first number) * 6 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 2 (from 100 place of first number) * 7 (from 10 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 14000\n- 2 (from 100 place of first number) * 1 (from 100 place of second number) = 2 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 540 + 6300 + 9000 + 1200 + 14000 + 20000 = 51040."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 629 * 387?"}, {"role": "assistant", "content": "Here are the steps for multiplying 629 * 387 using the long multiplication method.\nStep 1: Break first number 629 into its individual digits: 6 (hundreds place), 2 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 387 into its individual digits: 3 (hundreds place), 8 (tens place), and 7 (ones place).\n- 9 (from 1 place of first number) * 7 (from 1 place of second number) = 63 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 63\n- 9 (from 1 place of first number) * 8 (from 10 place of second number) = 72 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 720\n- 9 (from 1 place of first number) * 3 (from 100 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2700\n- 2 (from 10 place of first number) * 7 (from 1 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 140\n- 2 (from 10 place of first number) * 8 (from 10 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1600\n- 2 (from 10 place of first number) * 3 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 6 (from 100 place of first number) * 7 (from 1 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4200\n- 6 (from 100 place of first number) * 8 (from 10 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 48000\n- 6 (from 100 place of first number) * 3 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 63 + 720 + 2700 + 140 + 1600 + 6000 + 4200 + 48000 + 180000 = 243423."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 288 * 203?"}, {"role": "assistant", "content": "Here are the steps for multiplying 288 * 203 using the long multiplication method.\nStep 1: Break first number 288 into its individual digits: 2 (hundreds place), 8 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 203 into its individual digits: 2 (hundreds place), 0 (tens place), and 3 (ones place).\n- 8 (from 1 place of first number) * 3 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 8 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 8 (from 1 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 8 (from 10 place of first number) * 3 (from 1 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 240\n- 8 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 8 (from 10 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 16000\n- 2 (from 100 place of first number) * 3 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 2 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 2 (from 100 place of first number) * 2 (from 100 place of second number) = 4 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n\nNow, add all these results together:\nThe sum of 24 + 0 + 1600 + 240 + 0 + 16000 + 600 + 0 + 40000 = 58464."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 911 * 937?"}, {"role": "assistant", "content": "Here are the steps for multiplying 911 * 937 using the long multiplication method.\nStep 1: Break first number 911 into its individual digits: 9 (hundreds place), 1 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 937 into its individual digits: 9 (hundreds place), 3 (tens place), and 7 (ones place).\n- 1 (from 1 place of first number) * 7 (from 1 place of second number) = 7 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 7\n- 1 (from 1 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 30\n- 1 (from 1 place of first number) * 9 (from 100 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 900\n- 1 (from 10 place of first number) * 7 (from 1 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 70\n- 1 (from 10 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 300\n- 1 (from 10 place of first number) * 9 (from 100 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 9000\n- 9 (from 100 place of first number) * 7 (from 1 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 6300\n- 9 (from 100 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 27000\n- 9 (from 100 place of first number) * 9 (from 100 place of second number) = 81 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 810000\n\nNow, add all these results together:\nThe sum of 7 + 30 + 900 + 70 + 300 + 9000 + 6300 + 27000 + 810000 = 853607."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 182 * 514?"}, {"role": "assistant", "content": "Here are the steps for multiplying 182 * 514 using the long multiplication method.\nStep 1: Break first number 182 into its individual digits: 1 (hundreds place), 8 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 514 into its individual digits: 5 (hundreds place), 1 (tens place), and 4 (ones place).\n- 2 (from 1 place of first number) * 4 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 2 (from 1 place of first number) * 1 (from 10 place of second number) = 2 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 20\n- 2 (from 1 place of first number) * 5 (from 100 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1000\n- 8 (from 10 place of first number) * 4 (from 1 place of second number) = 32 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 320\n- 8 (from 10 place of first number) * 1 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 8 (from 10 place of first number) * 5 (from 100 place of second number) = 40 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n- 1 (from 100 place of first number) * 4 (from 1 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 1 (from 100 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 1000\n- 1 (from 100 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 50000\n\nNow, add all these results together:\nThe sum of 8 + 20 + 1000 + 320 + 800 + 40000 + 400 + 1000 + 50000 = 93548."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 719 * 866?"}, {"role": "assistant", "content": "Here are the steps for multiplying 719 * 866 using the long multiplication method.\nStep 1: Break first number 719 into its individual digits: 7 (hundreds place), 1 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 866 into its individual digits: 8 (hundreds place), 6 (tens place), and 6 (ones place).\n- 9 (from 1 place of first number) * 6 (from 1 place of second number) = 54 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 54\n- 9 (from 1 place of first number) * 6 (from 10 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 540\n- 9 (from 1 place of first number) * 8 (from 100 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 7200\n- 1 (from 10 place of first number) * 6 (from 1 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 60\n- 1 (from 10 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 1 (from 10 place of first number) * 8 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 7 (from 100 place of first number) * 6 (from 1 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4200\n- 7 (from 100 place of first number) * 6 (from 10 place of second number) = 42 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 42000\n- 7 (from 100 place of first number) * 8 (from 100 place of second number) = 56 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 560000\n\nNow, add all these results together:\nThe sum of 54 + 540 + 7200 + 60 + 600 + 8000 + 4200 + 42000 + 560000 = 622654."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 577 * 630?"}, {"role": "assistant", "content": "Here are the steps for multiplying 577 * 630 using the long multiplication method.\nStep 1: Break first number 577 into its individual digits: 5 (hundreds place), 7 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 630 into its individual digits: 6 (hundreds place), 3 (tens place), and 0 (ones place).\n- 7 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 1 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 210\n- 7 (from 1 place of first number) * 6 (from 100 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4200\n- 7 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 10 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2100\n- 7 (from 10 place of first number) * 6 (from 100 place of second number) = 42 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 42000\n- 5 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 5 (from 100 place of first number) * 3 (from 10 place of second number) = 15 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 15000\n- 5 (from 100 place of first number) * 6 (from 100 place of second number) = 30 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 300000\n\nNow, add all these results together:\nThe sum of 0 + 210 + 4200 + 0 + 2100 + 42000 + 0 + 15000 + 300000 = 363510."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 784 * 339?"}, {"role": "assistant", "content": "Here are the steps for multiplying 784 * 339 using the long multiplication method.\nStep 1: Break first number 784 into its individual digits: 7 (hundreds place), 8 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 339 into its individual digits: 3 (hundreds place), 3 (tens place), and 9 (ones place).\n- 4 (from 1 place of first number) * 9 (from 1 place of second number) = 36 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 36\n- 4 (from 1 place of first number) * 3 (from 10 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 120\n- 4 (from 1 place of first number) * 3 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 8 (from 10 place of first number) * 9 (from 1 place of second number) = 72 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 720\n- 8 (from 10 place of first number) * 3 (from 10 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2400\n- 8 (from 10 place of first number) * 3 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 7 (from 100 place of first number) * 9 (from 1 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 6300\n- 7 (from 100 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 21000\n- 7 (from 100 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 210000\n\nNow, add all these results together:\nThe sum of 36 + 120 + 1200 + 720 + 2400 + 24000 + 6300 + 21000 + 210000 = 265776."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 982 * 455?"}, {"role": "assistant", "content": "Here are the steps for multiplying 982 * 455 using the long multiplication method.\nStep 1: Break first number 982 into its individual digits: 9 (hundreds place), 8 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 455 into its individual digits: 4 (hundreds place), 5 (tens place), and 5 (ones place).\n- 2 (from 1 place of first number) * 5 (from 1 place of second number) = 10 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 10\n- 2 (from 1 place of first number) * 5 (from 10 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 2 (from 1 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 8 (from 10 place of first number) * 5 (from 1 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 8 (from 10 place of first number) * 5 (from 10 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 8 (from 10 place of first number) * 4 (from 100 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 32000\n- 9 (from 100 place of first number) * 5 (from 1 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4500\n- 9 (from 100 place of first number) * 5 (from 10 place of second number) = 45 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 45000\n- 9 (from 100 place of first number) * 4 (from 100 place of second number) = 36 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 360000\n\nNow, add all these results together:\nThe sum of 10 + 100 + 800 + 400 + 4000 + 32000 + 4500 + 45000 + 360000 = 446810."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 200 * 899?"}, {"role": "assistant", "content": "Here are the steps for multiplying 200 * 899 using the long multiplication method.\nStep 1: Break first number 200 into its individual digits: 2 (hundreds place), 0 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 899 into its individual digits: 8 (hundreds place), 9 (tens place), and 9 (ones place).\n- 0 (from 1 place of first number) * 9 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 9 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 8 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 0 (from 10 place of first number) * 9 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 9 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 8 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 2 (from 100 place of first number) * 9 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 2 (from 100 place of first number) * 9 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 2 (from 100 place of first number) * 8 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 0 + 0 + 0 + 1800 + 18000 + 160000 = 179800."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 912 * 324?"}, {"role": "assistant", "content": "Here are the steps for multiplying 912 * 324 using the long multiplication method.\nStep 1: Break first number 912 into its individual digits: 9 (hundreds place), 1 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 324 into its individual digits: 3 (hundreds place), 2 (tens place), and 4 (ones place).\n- 2 (from 1 place of first number) * 4 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 2 (from 1 place of first number) * 2 (from 10 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 40\n- 2 (from 1 place of first number) * 3 (from 100 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 600\n- 1 (from 10 place of first number) * 4 (from 1 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 1 (from 10 place of first number) * 2 (from 10 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 200\n- 1 (from 10 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 9 (from 100 place of first number) * 4 (from 1 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3600\n- 9 (from 100 place of first number) * 2 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 9 (from 100 place of first number) * 3 (from 100 place of second number) = 27 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 270000\n\nNow, add all these results together:\nThe sum of 8 + 40 + 600 + 40 + 200 + 3000 + 3600 + 18000 + 270000 = 295488."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 830 * 341?"}, {"role": "assistant", "content": "Here are the steps for multiplying 830 * 341 using the long multiplication method.\nStep 1: Break first number 830 into its individual digits: 8 (hundreds place), 3 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 341 into its individual digits: 3 (hundreds place), 4 (tens place), and 1 (ones place).\n- 0 (from 1 place of first number) * 1 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 4 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 3 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 3 (from 10 place of first number) * 1 (from 1 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 3 (from 10 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1200\n- 3 (from 10 place of first number) * 3 (from 100 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 9000\n- 8 (from 100 place of first number) * 1 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 8 (from 100 place of first number) * 4 (from 10 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 32000\n- 8 (from 100 place of first number) * 3 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 30 + 1200 + 9000 + 800 + 32000 + 240000 = 283030."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 339 * 343?"}, {"role": "assistant", "content": "Here are the steps for multiplying 339 * 343 using the long multiplication method.\nStep 1: Break first number 339 into its individual digits: 3 (hundreds place), 3 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 343 into its individual digits: 3 (hundreds place), 4 (tens place), and 3 (ones place).\n- 9 (from 1 place of first number) * 3 (from 1 place of second number) = 27 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 27\n- 9 (from 1 place of first number) * 4 (from 10 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 360\n- 9 (from 1 place of first number) * 3 (from 100 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2700\n- 3 (from 10 place of first number) * 3 (from 1 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 90\n- 3 (from 10 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1200\n- 3 (from 10 place of first number) * 3 (from 100 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 9000\n- 3 (from 100 place of first number) * 3 (from 1 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 900\n- 3 (from 100 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 3 (from 100 place of first number) * 3 (from 100 place of second number) = 9 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 90000\n\nNow, add all these results together:\nThe sum of 27 + 360 + 2700 + 90 + 1200 + 9000 + 900 + 12000 + 90000 = 116277."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 253 * 868?"}, {"role": "assistant", "content": "Here are the steps for multiplying 253 * 868 using the long multiplication method.\nStep 1: Break first number 253 into its individual digits: 2 (hundreds place), 5 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 868 into its individual digits: 8 (hundreds place), 6 (tens place), and 8 (ones place).\n- 3 (from 1 place of first number) * 8 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 3 (from 1 place of first number) * 6 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 3 (from 1 place of first number) * 8 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 5 (from 10 place of first number) * 8 (from 1 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 5 (from 10 place of first number) * 6 (from 10 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 5 (from 10 place of first number) * 8 (from 100 place of second number) = 40 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n- 2 (from 100 place of first number) * 8 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 2 (from 100 place of first number) * 6 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 2 (from 100 place of first number) * 8 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 24 + 180 + 2400 + 400 + 3000 + 40000 + 1600 + 12000 + 160000 = 219604."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 341 * 895?"}, {"role": "assistant", "content": "Here are the steps for multiplying 341 * 895 using the long multiplication method.\nStep 1: Break first number 341 into its individual digits: 3 (hundreds place), 4 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 895 into its individual digits: 8 (hundreds place), 9 (tens place), and 5 (ones place).\n- 1 (from 1 place of first number) * 5 (from 1 place of second number) = 5 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 5\n- 1 (from 1 place of first number) * 9 (from 10 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 90\n- 1 (from 1 place of first number) * 8 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 4 (from 10 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 200\n- 4 (from 10 place of first number) * 9 (from 10 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3600\n- 4 (from 10 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 32000\n- 3 (from 100 place of first number) * 5 (from 1 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1500\n- 3 (from 100 place of first number) * 9 (from 10 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 27000\n- 3 (from 100 place of first number) * 8 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 5 + 90 + 800 + 200 + 3600 + 32000 + 1500 + 27000 + 240000 = 305195."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 138 * 486?"}, {"role": "assistant", "content": "Here are the steps for multiplying 138 * 486 using the long multiplication method.\nStep 1: Break first number 138 into its individual digits: 1 (hundreds place), 3 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 486 into its individual digits: 4 (hundreds place), 8 (tens place), and 6 (ones place).\n- 8 (from 1 place of first number) * 6 (from 1 place of second number) = 48 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 48\n- 8 (from 1 place of first number) * 8 (from 10 place of second number) = 64 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 640\n- 8 (from 1 place of first number) * 4 (from 100 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3200\n- 3 (from 10 place of first number) * 6 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 3 (from 10 place of first number) * 8 (from 10 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2400\n- 3 (from 10 place of first number) * 4 (from 100 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 12000\n- 1 (from 100 place of first number) * 6 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 1 (from 100 place of first number) * 8 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 1 (from 100 place of first number) * 4 (from 100 place of second number) = 4 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n\nNow, add all these results together:\nThe sum of 48 + 640 + 3200 + 180 + 2400 + 12000 + 600 + 8000 + 40000 = 67068."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 406 * 882?"}, {"role": "assistant", "content": "Here are the steps for multiplying 406 * 882 using the long multiplication method.\nStep 1: Break first number 406 into its individual digits: 4 (hundreds place), 0 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 882 into its individual digits: 8 (hundreds place), 8 (tens place), and 2 (ones place).\n- 6 (from 1 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 12\n- 6 (from 1 place of first number) * 8 (from 10 place of second number) = 48 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 480\n- 6 (from 1 place of first number) * 8 (from 100 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4800\n- 0 (from 10 place of first number) * 2 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 8 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 8 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 4 (from 100 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 4 (from 100 place of first number) * 8 (from 10 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 32000\n- 4 (from 100 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 320000\n\nNow, add all these results together:\nThe sum of 12 + 480 + 4800 + 0 + 0 + 0 + 800 + 32000 + 320000 = 358092."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 379 * 205?"}, {"role": "assistant", "content": "Here are the steps for multiplying 379 * 205 using the long multiplication method.\nStep 1: Break first number 379 into its individual digits: 3 (hundreds place), 7 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 205 into its individual digits: 2 (hundreds place), 0 (tens place), and 5 (ones place).\n- 9 (from 1 place of first number) * 5 (from 1 place of second number) = 45 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 45\n- 9 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 9 (from 1 place of first number) * 2 (from 100 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1800\n- 7 (from 10 place of first number) * 5 (from 1 place of second number) = 35 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 350\n- 7 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 7 (from 10 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 14000\n- 3 (from 100 place of first number) * 5 (from 1 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1500\n- 3 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 3 (from 100 place of first number) * 2 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 45 + 0 + 1800 + 350 + 0 + 14000 + 1500 + 0 + 60000 = 77695."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 148 * 867?"}, {"role": "assistant", "content": "Here are the steps for multiplying 148 * 867 using the long multiplication method.\nStep 1: Break first number 148 into its individual digits: 1 (hundreds place), 4 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 867 into its individual digits: 8 (hundreds place), 6 (tens place), and 7 (ones place).\n- 8 (from 1 place of first number) * 7 (from 1 place of second number) = 56 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 56\n- 8 (from 1 place of first number) * 6 (from 10 place of second number) = 48 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 480\n- 8 (from 1 place of first number) * 8 (from 100 place of second number) = 64 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 6400\n- 4 (from 10 place of first number) * 7 (from 1 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 280\n- 4 (from 10 place of first number) * 6 (from 10 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2400\n- 4 (from 10 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 32000\n- 1 (from 100 place of first number) * 7 (from 1 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 700\n- 1 (from 100 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 1 (from 100 place of first number) * 8 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 56 + 480 + 6400 + 280 + 2400 + 32000 + 700 + 6000 + 80000 = 128316."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 566 * 918?"}, {"role": "assistant", "content": "Here are the steps for multiplying 566 * 918 using the long multiplication method.\nStep 1: Break first number 566 into its individual digits: 5 (hundreds place), 6 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 918 into its individual digits: 9 (hundreds place), 1 (tens place), and 8 (ones place).\n- 6 (from 1 place of first number) * 8 (from 1 place of second number) = 48 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 48\n- 6 (from 1 place of first number) * 1 (from 10 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 60\n- 6 (from 1 place of first number) * 9 (from 100 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5400\n- 6 (from 10 place of first number) * 8 (from 1 place of second number) = 48 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 480\n- 6 (from 10 place of first number) * 1 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 6 (from 10 place of first number) * 9 (from 100 place of second number) = 54 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 54000\n- 5 (from 100 place of first number) * 8 (from 1 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4000\n- 5 (from 100 place of first number) * 1 (from 10 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 5000\n- 5 (from 100 place of first number) * 9 (from 100 place of second number) = 45 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 450000\n\nNow, add all these results together:\nThe sum of 48 + 60 + 5400 + 480 + 600 + 54000 + 4000 + 5000 + 450000 = 519588."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 395 * 301?"}, {"role": "assistant", "content": "Here are the steps for multiplying 395 * 301 using the long multiplication method.\nStep 1: Break first number 395 into its individual digits: 3 (hundreds place), 9 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 301 into its individual digits: 3 (hundreds place), 0 (tens place), and 1 (ones place).\n- 5 (from 1 place of first number) * 1 (from 1 place of second number) = 5 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 5\n- 5 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 5 (from 1 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1500\n- 9 (from 10 place of first number) * 1 (from 1 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 90\n- 9 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 9 (from 10 place of first number) * 3 (from 100 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 27000\n- 3 (from 100 place of first number) * 1 (from 1 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 3 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 3 (from 100 place of first number) * 3 (from 100 place of second number) = 9 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 90000\n\nNow, add all these results together:\nThe sum of 5 + 0 + 1500 + 90 + 0 + 27000 + 300 + 0 + 90000 = 118895."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 574 * 162?"}, {"role": "assistant", "content": "Here are the steps for multiplying 574 * 162 using the long multiplication method.\nStep 1: Break first number 574 into its individual digits: 5 (hundreds place), 7 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 162 into its individual digits: 1 (hundreds place), 6 (tens place), and 2 (ones place).\n- 4 (from 1 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 4 (from 1 place of first number) * 6 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 4 (from 1 place of first number) * 1 (from 100 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 400\n- 7 (from 10 place of first number) * 2 (from 1 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 140\n- 7 (from 10 place of first number) * 6 (from 10 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4200\n- 7 (from 10 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 7000\n- 5 (from 100 place of first number) * 2 (from 1 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1000\n- 5 (from 100 place of first number) * 6 (from 10 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 30000\n- 5 (from 100 place of first number) * 1 (from 100 place of second number) = 5 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 50000\n\nNow, add all these results together:\nThe sum of 8 + 240 + 400 + 140 + 4200 + 7000 + 1000 + 30000 + 50000 = 92988."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 780 * 444?"}, {"role": "assistant", "content": "Here are the steps for multiplying 780 * 444 using the long multiplication method.\nStep 1: Break first number 780 into its individual digits: 7 (hundreds place), 8 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 444 into its individual digits: 4 (hundreds place), 4 (tens place), and 4 (ones place).\n- 0 (from 1 place of first number) * 4 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 4 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 4 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 8 (from 10 place of first number) * 4 (from 1 place of second number) = 32 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 320\n- 8 (from 10 place of first number) * 4 (from 10 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3200\n- 8 (from 10 place of first number) * 4 (from 100 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 32000\n- 7 (from 100 place of first number) * 4 (from 1 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2800\n- 7 (from 100 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 28000\n- 7 (from 100 place of first number) * 4 (from 100 place of second number) = 28 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 280000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 320 + 3200 + 32000 + 2800 + 28000 + 280000 = 346320."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 781 * 181?"}, {"role": "assistant", "content": "Here are the steps for multiplying 781 * 181 using the long multiplication method.\nStep 1: Break first number 781 into its individual digits: 7 (hundreds place), 8 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 181 into its individual digits: 1 (hundreds place), 8 (tens place), and 1 (ones place).\n- 1 (from 1 place of first number) * 1 (from 1 place of second number) = 1 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 1\n- 1 (from 1 place of first number) * 8 (from 10 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 80\n- 1 (from 1 place of first number) * 1 (from 100 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 100\n- 8 (from 10 place of first number) * 1 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 8 (from 10 place of first number) * 8 (from 10 place of second number) = 64 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 6400\n- 8 (from 10 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 7 (from 100 place of first number) * 1 (from 1 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 700\n- 7 (from 100 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 56000\n- 7 (from 100 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 70000\n\nNow, add all these results together:\nThe sum of 1 + 80 + 100 + 80 + 6400 + 8000 + 700 + 56000 + 70000 = 141361."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 883 * 113?"}, {"role": "assistant", "content": "Here are the steps for multiplying 883 * 113 using the long multiplication method.\nStep 1: Break first number 883 into its individual digits: 8 (hundreds place), 8 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 113 into its individual digits: 1 (hundreds place), 1 (tens place), and 3 (ones place).\n- 3 (from 1 place of first number) * 3 (from 1 place of second number) = 9 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 9\n- 3 (from 1 place of first number) * 1 (from 10 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 30\n- 3 (from 1 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 300\n- 8 (from 10 place of first number) * 3 (from 1 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 240\n- 8 (from 10 place of first number) * 1 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 8 (from 10 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 8 (from 100 place of first number) * 3 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 8 (from 100 place of first number) * 1 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 8 (from 100 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 9 + 30 + 300 + 240 + 800 + 8000 + 2400 + 8000 + 80000 = 99779."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 848 * 290?"}, {"role": "assistant", "content": "Here are the steps for multiplying 848 * 290 using the long multiplication method.\nStep 1: Break first number 848 into its individual digits: 8 (hundreds place), 4 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 290 into its individual digits: 2 (hundreds place), 9 (tens place), and 0 (ones place).\n- 8 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 1 place of first number) * 9 (from 10 place of second number) = 72 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 720\n- 8 (from 1 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 4 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 4 (from 10 place of first number) * 9 (from 10 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3600\n- 4 (from 10 place of first number) * 2 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 8 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 100 place of first number) * 9 (from 10 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 72000\n- 8 (from 100 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 0 + 720 + 1600 + 0 + 3600 + 8000 + 0 + 72000 + 160000 = 245920."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 684 * 197?"}, {"role": "assistant", "content": "Here are the steps for multiplying 684 * 197 using the long multiplication method.\nStep 1: Break first number 684 into its individual digits: 6 (hundreds place), 8 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 197 into its individual digits: 1 (hundreds place), 9 (tens place), and 7 (ones place).\n- 4 (from 1 place of first number) * 7 (from 1 place of second number) = 28 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 28\n- 4 (from 1 place of first number) * 9 (from 10 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 360\n- 4 (from 1 place of first number) * 1 (from 100 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 400\n- 8 (from 10 place of first number) * 7 (from 1 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 560\n- 8 (from 10 place of first number) * 9 (from 10 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 7200\n- 8 (from 10 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 6 (from 100 place of first number) * 7 (from 1 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4200\n- 6 (from 100 place of first number) * 9 (from 10 place of second number) = 54 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 54000\n- 6 (from 100 place of first number) * 1 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 28 + 360 + 400 + 560 + 7200 + 8000 + 4200 + 54000 + 60000 = 134748."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 841 * 697?"}, {"role": "assistant", "content": "Here are the steps for multiplying 841 * 697 using the long multiplication method.\nStep 1: Break first number 841 into its individual digits: 8 (hundreds place), 4 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 697 into its individual digits: 6 (hundreds place), 9 (tens place), and 7 (ones place).\n- 1 (from 1 place of first number) * 7 (from 1 place of second number) = 7 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 7\n- 1 (from 1 place of first number) * 9 (from 10 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 90\n- 1 (from 1 place of first number) * 6 (from 100 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 600\n- 4 (from 10 place of first number) * 7 (from 1 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 280\n- 4 (from 10 place of first number) * 9 (from 10 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3600\n- 4 (from 10 place of first number) * 6 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 8 (from 100 place of first number) * 7 (from 1 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 5600\n- 8 (from 100 place of first number) * 9 (from 10 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 72000\n- 8 (from 100 place of first number) * 6 (from 100 place of second number) = 48 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 480000\n\nNow, add all these results together:\nThe sum of 7 + 90 + 600 + 280 + 3600 + 24000 + 5600 + 72000 + 480000 = 586177."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 671 * 981?"}, {"role": "assistant", "content": "Here are the steps for multiplying 671 * 981 using the long multiplication method.\nStep 1: Break first number 671 into its individual digits: 6 (hundreds place), 7 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 981 into its individual digits: 9 (hundreds place), 8 (tens place), and 1 (ones place).\n- 1 (from 1 place of first number) * 1 (from 1 place of second number) = 1 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 1\n- 1 (from 1 place of first number) * 8 (from 10 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 80\n- 1 (from 1 place of first number) * 9 (from 100 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 900\n- 7 (from 10 place of first number) * 1 (from 1 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 70\n- 7 (from 10 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5600\n- 7 (from 10 place of first number) * 9 (from 100 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 63000\n- 6 (from 100 place of first number) * 1 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 6 (from 100 place of first number) * 8 (from 10 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 48000\n- 6 (from 100 place of first number) * 9 (from 100 place of second number) = 54 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 540000\n\nNow, add all these results together:\nThe sum of 1 + 80 + 900 + 70 + 5600 + 63000 + 600 + 48000 + 540000 = 658251."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 832 * 174?"}, {"role": "assistant", "content": "Here are the steps for multiplying 832 * 174 using the long multiplication method.\nStep 1: Break first number 832 into its individual digits: 8 (hundreds place), 3 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 174 into its individual digits: 1 (hundreds place), 7 (tens place), and 4 (ones place).\n- 2 (from 1 place of first number) * 4 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 2 (from 1 place of first number) * 7 (from 10 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 140\n- 2 (from 1 place of first number) * 1 (from 100 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 200\n- 3 (from 10 place of first number) * 4 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 3 (from 10 place of first number) * 7 (from 10 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2100\n- 3 (from 10 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 8 (from 100 place of first number) * 4 (from 1 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3200\n- 8 (from 100 place of first number) * 7 (from 10 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 56000\n- 8 (from 100 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 8 + 140 + 200 + 120 + 2100 + 3000 + 3200 + 56000 + 80000 = 144768."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 875 * 475?"}, {"role": "assistant", "content": "Here are the steps for multiplying 875 * 475 using the long multiplication method.\nStep 1: Break first number 875 into its individual digits: 8 (hundreds place), 7 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 475 into its individual digits: 4 (hundreds place), 7 (tens place), and 5 (ones place).\n- 5 (from 1 place of first number) * 5 (from 1 place of second number) = 25 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 25\n- 5 (from 1 place of first number) * 7 (from 10 place of second number) = 35 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 350\n- 5 (from 1 place of first number) * 4 (from 100 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 7 (from 10 place of first number) * 5 (from 1 place of second number) = 35 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 350\n- 7 (from 10 place of first number) * 7 (from 10 place of second number) = 49 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4900\n- 7 (from 10 place of first number) * 4 (from 100 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 28000\n- 8 (from 100 place of first number) * 5 (from 1 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4000\n- 8 (from 100 place of first number) * 7 (from 10 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 56000\n- 8 (from 100 place of first number) * 4 (from 100 place of second number) = 32 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 320000\n\nNow, add all these results together:\nThe sum of 25 + 350 + 2000 + 350 + 4900 + 28000 + 4000 + 56000 + 320000 = 415625."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 392 * 804?"}, {"role": "assistant", "content": "Here are the steps for multiplying 392 * 804 using the long multiplication method.\nStep 1: Break first number 392 into its individual digits: 3 (hundreds place), 9 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 804 into its individual digits: 8 (hundreds place), 0 (tens place), and 4 (ones place).\n- 2 (from 1 place of first number) * 4 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 2 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 2 (from 1 place of first number) * 8 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 9 (from 10 place of first number) * 4 (from 1 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 360\n- 9 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 9 (from 10 place of first number) * 8 (from 100 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 72000\n- 3 (from 100 place of first number) * 4 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 3 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 3 (from 100 place of first number) * 8 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 8 + 0 + 1600 + 360 + 0 + 72000 + 1200 + 0 + 240000 = 315168."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 123 * 891?"}, {"role": "assistant", "content": "Here are the steps for multiplying 123 * 891 using the long multiplication method.\nStep 1: Break first number 123 into its individual digits: 1 (hundreds place), 2 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 891 into its individual digits: 8 (hundreds place), 9 (tens place), and 1 (ones place).\n- 3 (from 1 place of first number) * 1 (from 1 place of second number) = 3 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 3\n- 3 (from 1 place of first number) * 9 (from 10 place of second number) = 27 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 270\n- 3 (from 1 place of first number) * 8 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 2 (from 10 place of first number) * 1 (from 1 place of second number) = 2 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 2 (from 10 place of first number) * 9 (from 10 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1800\n- 2 (from 10 place of first number) * 8 (from 100 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 16000\n- 1 (from 100 place of first number) * 1 (from 1 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 100\n- 1 (from 100 place of first number) * 9 (from 10 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 9000\n- 1 (from 100 place of first number) * 8 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 3 + 270 + 2400 + 20 + 1800 + 16000 + 100 + 9000 + 80000 = 109593."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 714 * 424?"}, {"role": "assistant", "content": "Here are the steps for multiplying 714 * 424 using the long multiplication method.\nStep 1: Break first number 714 into its individual digits: 7 (hundreds place), 1 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 424 into its individual digits: 4 (hundreds place), 2 (tens place), and 4 (ones place).\n- 4 (from 1 place of first number) * 4 (from 1 place of second number) = 16 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 16\n- 4 (from 1 place of first number) * 2 (from 10 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 80\n- 4 (from 1 place of first number) * 4 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 1 (from 10 place of first number) * 4 (from 1 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 1 (from 10 place of first number) * 2 (from 10 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 200\n- 1 (from 10 place of first number) * 4 (from 100 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 7 (from 100 place of first number) * 4 (from 1 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2800\n- 7 (from 100 place of first number) * 2 (from 10 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 14000\n- 7 (from 100 place of first number) * 4 (from 100 place of second number) = 28 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 280000\n\nNow, add all these results together:\nThe sum of 16 + 80 + 1600 + 40 + 200 + 4000 + 2800 + 14000 + 280000 = 302736."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 697 * 499?"}, {"role": "assistant", "content": "Here are the steps for multiplying 697 * 499 using the long multiplication method.\nStep 1: Break first number 697 into its individual digits: 6 (hundreds place), 9 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 499 into its individual digits: 4 (hundreds place), 9 (tens place), and 9 (ones place).\n- 7 (from 1 place of first number) * 9 (from 1 place of second number) = 63 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 63\n- 7 (from 1 place of first number) * 9 (from 10 place of second number) = 63 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 630\n- 7 (from 1 place of first number) * 4 (from 100 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2800\n- 9 (from 10 place of first number) * 9 (from 1 place of second number) = 81 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 810\n- 9 (from 10 place of first number) * 9 (from 10 place of second number) = 81 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 8100\n- 9 (from 10 place of first number) * 4 (from 100 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 36000\n- 6 (from 100 place of first number) * 9 (from 1 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 5400\n- 6 (from 100 place of first number) * 9 (from 10 place of second number) = 54 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 54000\n- 6 (from 100 place of first number) * 4 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 63 + 630 + 2800 + 810 + 8100 + 36000 + 5400 + 54000 + 240000 = 347803."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 247 * 375?"}, {"role": "assistant", "content": "Here are the steps for multiplying 247 * 375 using the long multiplication method.\nStep 1: Break first number 247 into its individual digits: 2 (hundreds place), 4 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 375 into its individual digits: 3 (hundreds place), 7 (tens place), and 5 (ones place).\n- 7 (from 1 place of first number) * 5 (from 1 place of second number) = 35 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 35\n- 7 (from 1 place of first number) * 7 (from 10 place of second number) = 49 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 490\n- 7 (from 1 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2100\n- 4 (from 10 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 200\n- 4 (from 10 place of first number) * 7 (from 10 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2800\n- 4 (from 10 place of first number) * 3 (from 100 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 12000\n- 2 (from 100 place of first number) * 5 (from 1 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1000\n- 2 (from 100 place of first number) * 7 (from 10 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 14000\n- 2 (from 100 place of first number) * 3 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 35 + 490 + 2100 + 200 + 2800 + 12000 + 1000 + 14000 + 60000 = 92625."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 960 * 720?"}, {"role": "assistant", "content": "Here are the steps for multiplying 960 * 720 using the long multiplication method.\nStep 1: Break first number 960 into its individual digits: 9 (hundreds place), 6 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 720 into its individual digits: 7 (hundreds place), 2 (tens place), and 0 (ones place).\n- 0 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 2 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 7 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 6 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 6 (from 10 place of first number) * 2 (from 10 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1200\n- 6 (from 10 place of first number) * 7 (from 100 place of second number) = 42 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 42000\n- 9 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 9 (from 100 place of first number) * 2 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 9 (from 100 place of first number) * 7 (from 100 place of second number) = 63 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 630000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 0 + 1200 + 42000 + 0 + 18000 + 630000 = 691200."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 733 * 761?"}, {"role": "assistant", "content": "Here are the steps for multiplying 733 * 761 using the long multiplication method.\nStep 1: Break first number 733 into its individual digits: 7 (hundreds place), 3 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 761 into its individual digits: 7 (hundreds place), 6 (tens place), and 1 (ones place).\n- 3 (from 1 place of first number) * 1 (from 1 place of second number) = 3 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 3\n- 3 (from 1 place of first number) * 6 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 3 (from 1 place of first number) * 7 (from 100 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2100\n- 3 (from 10 place of first number) * 1 (from 1 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 3 (from 10 place of first number) * 6 (from 10 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1800\n- 3 (from 10 place of first number) * 7 (from 100 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 21000\n- 7 (from 100 place of first number) * 1 (from 1 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 700\n- 7 (from 100 place of first number) * 6 (from 10 place of second number) = 42 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 42000\n- 7 (from 100 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 490000\n\nNow, add all these results together:\nThe sum of 3 + 180 + 2100 + 30 + 1800 + 21000 + 700 + 42000 + 490000 = 557813."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 776 * 219?"}, {"role": "assistant", "content": "Here are the steps for multiplying 776 * 219 using the long multiplication method.\nStep 1: Break first number 776 into its individual digits: 7 (hundreds place), 7 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 219 into its individual digits: 2 (hundreds place), 1 (tens place), and 9 (ones place).\n- 6 (from 1 place of first number) * 9 (from 1 place of second number) = 54 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 54\n- 6 (from 1 place of first number) * 1 (from 10 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 60\n- 6 (from 1 place of first number) * 2 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 7 (from 10 place of first number) * 9 (from 1 place of second number) = 63 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 630\n- 7 (from 10 place of first number) * 1 (from 10 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 700\n- 7 (from 10 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 14000\n- 7 (from 100 place of first number) * 9 (from 1 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 6300\n- 7 (from 100 place of first number) * 1 (from 10 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 7000\n- 7 (from 100 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 140000\n\nNow, add all these results together:\nThe sum of 54 + 60 + 1200 + 630 + 700 + 14000 + 6300 + 7000 + 140000 = 169944."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 258 * 650?"}, {"role": "assistant", "content": "Here are the steps for multiplying 258 * 650 using the long multiplication method.\nStep 1: Break first number 258 into its individual digits: 2 (hundreds place), 5 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 650 into its individual digits: 6 (hundreds place), 5 (tens place), and 0 (ones place).\n- 8 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 1 place of first number) * 5 (from 10 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 8 (from 1 place of first number) * 6 (from 100 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4800\n- 5 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 5 (from 10 place of first number) * 5 (from 10 place of second number) = 25 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2500\n- 5 (from 10 place of first number) * 6 (from 100 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n- 2 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 2 (from 100 place of first number) * 5 (from 10 place of second number) = 10 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 10000\n- 2 (from 100 place of first number) * 6 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 0 + 400 + 4800 + 0 + 2500 + 30000 + 0 + 10000 + 120000 = 167700."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 415 * 638?"}, {"role": "assistant", "content": "Here are the steps for multiplying 415 * 638 using the long multiplication method.\nStep 1: Break first number 415 into its individual digits: 4 (hundreds place), 1 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 638 into its individual digits: 6 (hundreds place), 3 (tens place), and 8 (ones place).\n- 5 (from 1 place of first number) * 8 (from 1 place of second number) = 40 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 5 (from 1 place of first number) * 3 (from 10 place of second number) = 15 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 150\n- 5 (from 1 place of first number) * 6 (from 100 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 1 (from 10 place of first number) * 8 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 1 (from 10 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 300\n- 1 (from 10 place of first number) * 6 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 4 (from 100 place of first number) * 8 (from 1 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3200\n- 4 (from 100 place of first number) * 3 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 4 (from 100 place of first number) * 6 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 40 + 150 + 3000 + 80 + 300 + 6000 + 3200 + 12000 + 240000 = 264770."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 537 * 128?"}, {"role": "assistant", "content": "Here are the steps for multiplying 537 * 128 using the long multiplication method.\nStep 1: Break first number 537 into its individual digits: 5 (hundreds place), 3 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 128 into its individual digits: 1 (hundreds place), 2 (tens place), and 8 (ones place).\n- 7 (from 1 place of first number) * 8 (from 1 place of second number) = 56 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 56\n- 7 (from 1 place of first number) * 2 (from 10 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 140\n- 7 (from 1 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 700\n- 3 (from 10 place of first number) * 8 (from 1 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 240\n- 3 (from 10 place of first number) * 2 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 3 (from 10 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 5 (from 100 place of first number) * 8 (from 1 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4000\n- 5 (from 100 place of first number) * 2 (from 10 place of second number) = 10 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 10000\n- 5 (from 100 place of first number) * 1 (from 100 place of second number) = 5 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 50000\n\nNow, add all these results together:\nThe sum of 56 + 140 + 700 + 240 + 600 + 3000 + 4000 + 10000 + 50000 = 68736."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 952 * 819?"}, {"role": "assistant", "content": "Here are the steps for multiplying 952 * 819 using the long multiplication method.\nStep 1: Break first number 952 into its individual digits: 9 (hundreds place), 5 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 819 into its individual digits: 8 (hundreds place), 1 (tens place), and 9 (ones place).\n- 2 (from 1 place of first number) * 9 (from 1 place of second number) = 18 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 18\n- 2 (from 1 place of first number) * 1 (from 10 place of second number) = 2 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 20\n- 2 (from 1 place of first number) * 8 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 5 (from 10 place of first number) * 9 (from 1 place of second number) = 45 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 450\n- 5 (from 10 place of first number) * 1 (from 10 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 500\n- 5 (from 10 place of first number) * 8 (from 100 place of second number) = 40 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n- 9 (from 100 place of first number) * 9 (from 1 place of second number) = 81 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 8100\n- 9 (from 100 place of first number) * 1 (from 10 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 9000\n- 9 (from 100 place of first number) * 8 (from 100 place of second number) = 72 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 720000\n\nNow, add all these results together:\nThe sum of 18 + 20 + 1600 + 450 + 500 + 40000 + 8100 + 9000 + 720000 = 779688."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 983 * 775?"}, {"role": "assistant", "content": "Here are the steps for multiplying 983 * 775 using the long multiplication method.\nStep 1: Break first number 983 into its individual digits: 9 (hundreds place), 8 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 775 into its individual digits: 7 (hundreds place), 7 (tens place), and 5 (ones place).\n- 3 (from 1 place of first number) * 5 (from 1 place of second number) = 15 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 15\n- 3 (from 1 place of first number) * 7 (from 10 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 210\n- 3 (from 1 place of first number) * 7 (from 100 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2100\n- 8 (from 10 place of first number) * 5 (from 1 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 8 (from 10 place of first number) * 7 (from 10 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5600\n- 8 (from 10 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 56000\n- 9 (from 100 place of first number) * 5 (from 1 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4500\n- 9 (from 100 place of first number) * 7 (from 10 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 63000\n- 9 (from 100 place of first number) * 7 (from 100 place of second number) = 63 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 630000\n\nNow, add all these results together:\nThe sum of 15 + 210 + 2100 + 400 + 5600 + 56000 + 4500 + 63000 + 630000 = 761825."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 338 * 122?"}, {"role": "assistant", "content": "Here are the steps for multiplying 338 * 122 using the long multiplication method.\nStep 1: Break first number 338 into its individual digits: 3 (hundreds place), 3 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 122 into its individual digits: 1 (hundreds place), 2 (tens place), and 2 (ones place).\n- 8 (from 1 place of first number) * 2 (from 1 place of second number) = 16 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 16\n- 8 (from 1 place of first number) * 2 (from 10 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 160\n- 8 (from 1 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 3 (from 10 place of first number) * 2 (from 1 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 60\n- 3 (from 10 place of first number) * 2 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 3 (from 10 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 3 (from 100 place of first number) * 2 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 3 (from 100 place of first number) * 2 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 3 (from 100 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n\nNow, add all these results together:\nThe sum of 16 + 160 + 800 + 60 + 600 + 3000 + 600 + 6000 + 30000 = 41236."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 480 * 374?"}, {"role": "assistant", "content": "Here are the steps for multiplying 480 * 374 using the long multiplication method.\nStep 1: Break first number 480 into its individual digits: 4 (hundreds place), 8 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 374 into its individual digits: 3 (hundreds place), 7 (tens place), and 4 (ones place).\n- 0 (from 1 place of first number) * 4 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 7 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 3 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 8 (from 10 place of first number) * 4 (from 1 place of second number) = 32 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 320\n- 8 (from 10 place of first number) * 7 (from 10 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5600\n- 8 (from 10 place of first number) * 3 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 4 (from 100 place of first number) * 4 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 4 (from 100 place of first number) * 7 (from 10 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 28000\n- 4 (from 100 place of first number) * 3 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 320 + 5600 + 24000 + 1600 + 28000 + 120000 = 179520."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 879 * 847?"}, {"role": "assistant", "content": "Here are the steps for multiplying 879 * 847 using the long multiplication method.\nStep 1: Break first number 879 into its individual digits: 8 (hundreds place), 7 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 847 into its individual digits: 8 (hundreds place), 4 (tens place), and 7 (ones place).\n- 9 (from 1 place of first number) * 7 (from 1 place of second number) = 63 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 63\n- 9 (from 1 place of first number) * 4 (from 10 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 360\n- 9 (from 1 place of first number) * 8 (from 100 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 7200\n- 7 (from 10 place of first number) * 7 (from 1 place of second number) = 49 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 490\n- 7 (from 10 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2800\n- 7 (from 10 place of first number) * 8 (from 100 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 56000\n- 8 (from 100 place of first number) * 7 (from 1 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 5600\n- 8 (from 100 place of first number) * 4 (from 10 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 32000\n- 8 (from 100 place of first number) * 8 (from 100 place of second number) = 64 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 640000\n\nNow, add all these results together:\nThe sum of 63 + 360 + 7200 + 490 + 2800 + 56000 + 5600 + 32000 + 640000 = 744513."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 548 * 187?"}, {"role": "assistant", "content": "Here are the steps for multiplying 548 * 187 using the long multiplication method.\nStep 1: Break first number 548 into its individual digits: 5 (hundreds place), 4 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 187 into its individual digits: 1 (hundreds place), 8 (tens place), and 7 (ones place).\n- 8 (from 1 place of first number) * 7 (from 1 place of second number) = 56 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 56\n- 8 (from 1 place of first number) * 8 (from 10 place of second number) = 64 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 640\n- 8 (from 1 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 4 (from 10 place of first number) * 7 (from 1 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 280\n- 4 (from 10 place of first number) * 8 (from 10 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3200\n- 4 (from 10 place of first number) * 1 (from 100 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 5 (from 100 place of first number) * 7 (from 1 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3500\n- 5 (from 100 place of first number) * 8 (from 10 place of second number) = 40 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 40000\n- 5 (from 100 place of first number) * 1 (from 100 place of second number) = 5 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 50000\n\nNow, add all these results together:\nThe sum of 56 + 640 + 800 + 280 + 3200 + 4000 + 3500 + 40000 + 50000 = 102476."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 915 * 552?"}, {"role": "assistant", "content": "Here are the steps for multiplying 915 * 552 using the long multiplication method.\nStep 1: Break first number 915 into its individual digits: 9 (hundreds place), 1 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 552 into its individual digits: 5 (hundreds place), 5 (tens place), and 2 (ones place).\n- 5 (from 1 place of first number) * 2 (from 1 place of second number) = 10 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 10\n- 5 (from 1 place of first number) * 5 (from 10 place of second number) = 25 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 250\n- 5 (from 1 place of first number) * 5 (from 100 place of second number) = 25 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2500\n- 1 (from 10 place of first number) * 2 (from 1 place of second number) = 2 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 1 (from 10 place of first number) * 5 (from 10 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 500\n- 1 (from 10 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 5000\n- 9 (from 100 place of first number) * 2 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 9 (from 100 place of first number) * 5 (from 10 place of second number) = 45 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 45000\n- 9 (from 100 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 450000\n\nNow, add all these results together:\nThe sum of 10 + 250 + 2500 + 20 + 500 + 5000 + 1800 + 45000 + 450000 = 505080."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 667 * 534?"}, {"role": "assistant", "content": "Here are the steps for multiplying 667 * 534 using the long multiplication method.\nStep 1: Break first number 667 into its individual digits: 6 (hundreds place), 6 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 534 into its individual digits: 5 (hundreds place), 3 (tens place), and 4 (ones place).\n- 7 (from 1 place of first number) * 4 (from 1 place of second number) = 28 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 28\n- 7 (from 1 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 210\n- 7 (from 1 place of first number) * 5 (from 100 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3500\n- 6 (from 10 place of first number) * 4 (from 1 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 240\n- 6 (from 10 place of first number) * 3 (from 10 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1800\n- 6 (from 10 place of first number) * 5 (from 100 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n- 6 (from 100 place of first number) * 4 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 6 (from 100 place of first number) * 3 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 6 (from 100 place of first number) * 5 (from 100 place of second number) = 30 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 300000\n\nNow, add all these results together:\nThe sum of 28 + 210 + 3500 + 240 + 1800 + 30000 + 2400 + 18000 + 300000 = 356178."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 517 * 631?"}, {"role": "assistant", "content": "Here are the steps for multiplying 517 * 631 using the long multiplication method.\nStep 1: Break first number 517 into its individual digits: 5 (hundreds place), 1 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 631 into its individual digits: 6 (hundreds place), 3 (tens place), and 1 (ones place).\n- 7 (from 1 place of first number) * 1 (from 1 place of second number) = 7 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 7\n- 7 (from 1 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 210\n- 7 (from 1 place of first number) * 6 (from 100 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4200\n- 1 (from 10 place of first number) * 1 (from 1 place of second number) = 1 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 10\n- 1 (from 10 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 300\n- 1 (from 10 place of first number) * 6 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 5 (from 100 place of first number) * 1 (from 1 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 500\n- 5 (from 100 place of first number) * 3 (from 10 place of second number) = 15 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 15000\n- 5 (from 100 place of first number) * 6 (from 100 place of second number) = 30 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 300000\n\nNow, add all these results together:\nThe sum of 7 + 210 + 4200 + 10 + 300 + 6000 + 500 + 15000 + 300000 = 326227."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 738 * 253?"}, {"role": "assistant", "content": "Here are the steps for multiplying 738 * 253 using the long multiplication method.\nStep 1: Break first number 738 into its individual digits: 7 (hundreds place), 3 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 253 into its individual digits: 2 (hundreds place), 5 (tens place), and 3 (ones place).\n- 8 (from 1 place of first number) * 3 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 8 (from 1 place of first number) * 5 (from 10 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 8 (from 1 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 3 (from 10 place of first number) * 3 (from 1 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 90\n- 3 (from 10 place of first number) * 5 (from 10 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1500\n- 3 (from 10 place of first number) * 2 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 7 (from 100 place of first number) * 3 (from 1 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2100\n- 7 (from 100 place of first number) * 5 (from 10 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 35000\n- 7 (from 100 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 140000\n\nNow, add all these results together:\nThe sum of 24 + 400 + 1600 + 90 + 1500 + 6000 + 2100 + 35000 + 140000 = 186714."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 481 * 455?"}, {"role": "assistant", "content": "Here are the steps for multiplying 481 * 455 using the long multiplication method.\nStep 1: Break first number 481 into its individual digits: 4 (hundreds place), 8 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 455 into its individual digits: 4 (hundreds place), 5 (tens place), and 5 (ones place).\n- 1 (from 1 place of first number) * 5 (from 1 place of second number) = 5 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 5\n- 1 (from 1 place of first number) * 5 (from 10 place of second number) = 5 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 50\n- 1 (from 1 place of first number) * 4 (from 100 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 400\n- 8 (from 10 place of first number) * 5 (from 1 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 8 (from 10 place of first number) * 5 (from 10 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 8 (from 10 place of first number) * 4 (from 100 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 32000\n- 4 (from 100 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2000\n- 4 (from 100 place of first number) * 5 (from 10 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 20000\n- 4 (from 100 place of first number) * 4 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 5 + 50 + 400 + 400 + 4000 + 32000 + 2000 + 20000 + 160000 = 218855."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 601 * 714?"}, {"role": "assistant", "content": "Here are the steps for multiplying 601 * 714 using the long multiplication method.\nStep 1: Break first number 601 into its individual digits: 6 (hundreds place), 0 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 714 into its individual digits: 7 (hundreds place), 1 (tens place), and 4 (ones place).\n- 1 (from 1 place of first number) * 4 (from 1 place of second number) = 4 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 4\n- 1 (from 1 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 10\n- 1 (from 1 place of first number) * 7 (from 100 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 700\n- 0 (from 10 place of first number) * 4 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 1 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 7 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 6 (from 100 place of first number) * 4 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 6 (from 100 place of first number) * 1 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 6 (from 100 place of first number) * 7 (from 100 place of second number) = 42 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 420000\n\nNow, add all these results together:\nThe sum of 4 + 10 + 700 + 0 + 0 + 0 + 2400 + 6000 + 420000 = 429114."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 943 * 364?"}, {"role": "assistant", "content": "Here are the steps for multiplying 943 * 364 using the long multiplication method.\nStep 1: Break first number 943 into its individual digits: 9 (hundreds place), 4 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 364 into its individual digits: 3 (hundreds place), 6 (tens place), and 4 (ones place).\n- 3 (from 1 place of first number) * 4 (from 1 place of second number) = 12 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 12\n- 3 (from 1 place of first number) * 6 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 3 (from 1 place of first number) * 3 (from 100 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 900\n- 4 (from 10 place of first number) * 4 (from 1 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 160\n- 4 (from 10 place of first number) * 6 (from 10 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2400\n- 4 (from 10 place of first number) * 3 (from 100 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 12000\n- 9 (from 100 place of first number) * 4 (from 1 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3600\n- 9 (from 100 place of first number) * 6 (from 10 place of second number) = 54 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 54000\n- 9 (from 100 place of first number) * 3 (from 100 place of second number) = 27 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 270000\n\nNow, add all these results together:\nThe sum of 12 + 180 + 900 + 160 + 2400 + 12000 + 3600 + 54000 + 270000 = 343252."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 250 * 338?"}, {"role": "assistant", "content": "Here are the steps for multiplying 250 * 338 using the long multiplication method.\nStep 1: Break first number 250 into its individual digits: 2 (hundreds place), 5 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 338 into its individual digits: 3 (hundreds place), 3 (tens place), and 8 (ones place).\n- 0 (from 1 place of first number) * 8 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 3 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 3 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 5 (from 10 place of first number) * 8 (from 1 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 5 (from 10 place of first number) * 3 (from 10 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1500\n- 5 (from 10 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 15000\n- 2 (from 100 place of first number) * 8 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 2 (from 100 place of first number) * 3 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 2 (from 100 place of first number) * 3 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 400 + 1500 + 15000 + 1600 + 6000 + 60000 = 84500."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 867 * 752?"}, {"role": "assistant", "content": "Here are the steps for multiplying 867 * 752 using the long multiplication method.\nStep 1: Break first number 867 into its individual digits: 8 (hundreds place), 6 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 752 into its individual digits: 7 (hundreds place), 5 (tens place), and 2 (ones place).\n- 7 (from 1 place of first number) * 2 (from 1 place of second number) = 14 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 14\n- 7 (from 1 place of first number) * 5 (from 10 place of second number) = 35 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 350\n- 7 (from 1 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4900\n- 6 (from 10 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 6 (from 10 place of first number) * 5 (from 10 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 6 (from 10 place of first number) * 7 (from 100 place of second number) = 42 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 42000\n- 8 (from 100 place of first number) * 2 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 8 (from 100 place of first number) * 5 (from 10 place of second number) = 40 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 40000\n- 8 (from 100 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 560000\n\nNow, add all these results together:\nThe sum of 14 + 350 + 4900 + 120 + 3000 + 42000 + 1600 + 40000 + 560000 = 651984."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 748 * 893?"}, {"role": "assistant", "content": "Here are the steps for multiplying 748 * 893 using the long multiplication method.\nStep 1: Break first number 748 into its individual digits: 7 (hundreds place), 4 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 893 into its individual digits: 8 (hundreds place), 9 (tens place), and 3 (ones place).\n- 8 (from 1 place of first number) * 3 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 8 (from 1 place of first number) * 9 (from 10 place of second number) = 72 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 720\n- 8 (from 1 place of first number) * 8 (from 100 place of second number) = 64 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 6400\n- 4 (from 10 place of first number) * 3 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 4 (from 10 place of first number) * 9 (from 10 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3600\n- 4 (from 10 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 32000\n- 7 (from 100 place of first number) * 3 (from 1 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2100\n- 7 (from 100 place of first number) * 9 (from 10 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 63000\n- 7 (from 100 place of first number) * 8 (from 100 place of second number) = 56 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 560000\n\nNow, add all these results together:\nThe sum of 24 + 720 + 6400 + 120 + 3600 + 32000 + 2100 + 63000 + 560000 = 667964."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 202 * 850?"}, {"role": "assistant", "content": "Here are the steps for multiplying 202 * 850 using the long multiplication method.\nStep 1: Break first number 202 into its individual digits: 2 (hundreds place), 0 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 850 into its individual digits: 8 (hundreds place), 5 (tens place), and 0 (ones place).\n- 2 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 2 (from 1 place of first number) * 5 (from 10 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 2 (from 1 place of first number) * 8 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 0 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 5 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 8 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 2 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 2 (from 100 place of first number) * 5 (from 10 place of second number) = 10 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 10000\n- 2 (from 100 place of first number) * 8 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 0 + 100 + 1600 + 0 + 0 + 0 + 0 + 10000 + 160000 = 171700."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 934 * 442?"}, {"role": "assistant", "content": "Here are the steps for multiplying 934 * 442 using the long multiplication method.\nStep 1: Break first number 934 into its individual digits: 9 (hundreds place), 3 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 442 into its individual digits: 4 (hundreds place), 4 (tens place), and 2 (ones place).\n- 4 (from 1 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 4 (from 1 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 160\n- 4 (from 1 place of first number) * 4 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 3 (from 10 place of first number) * 2 (from 1 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 60\n- 3 (from 10 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1200\n- 3 (from 10 place of first number) * 4 (from 100 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 12000\n- 9 (from 100 place of first number) * 2 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 9 (from 100 place of first number) * 4 (from 10 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 36000\n- 9 (from 100 place of first number) * 4 (from 100 place of second number) = 36 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 360000\n\nNow, add all these results together:\nThe sum of 8 + 160 + 1600 + 60 + 1200 + 12000 + 1800 + 36000 + 360000 = 412828."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 382 * 545?"}, {"role": "assistant", "content": "Here are the steps for multiplying 382 * 545 using the long multiplication method.\nStep 1: Break first number 382 into its individual digits: 3 (hundreds place), 8 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 545 into its individual digits: 5 (hundreds place), 4 (tens place), and 5 (ones place).\n- 2 (from 1 place of first number) * 5 (from 1 place of second number) = 10 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 10\n- 2 (from 1 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 80\n- 2 (from 1 place of first number) * 5 (from 100 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1000\n- 8 (from 10 place of first number) * 5 (from 1 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 8 (from 10 place of first number) * 4 (from 10 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3200\n- 8 (from 10 place of first number) * 5 (from 100 place of second number) = 40 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n- 3 (from 100 place of first number) * 5 (from 1 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1500\n- 3 (from 100 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 3 (from 100 place of first number) * 5 (from 100 place of second number) = 15 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 150000\n\nNow, add all these results together:\nThe sum of 10 + 80 + 1000 + 400 + 3200 + 40000 + 1500 + 12000 + 150000 = 208190."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 276 * 304?"}, {"role": "assistant", "content": "Here are the steps for multiplying 276 * 304 using the long multiplication method.\nStep 1: Break first number 276 into its individual digits: 2 (hundreds place), 7 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 304 into its individual digits: 3 (hundreds place), 0 (tens place), and 4 (ones place).\n- 6 (from 1 place of first number) * 4 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 6 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 6 (from 1 place of first number) * 3 (from 100 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1800\n- 7 (from 10 place of first number) * 4 (from 1 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 280\n- 7 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 7 (from 10 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 21000\n- 2 (from 100 place of first number) * 4 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 2 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 2 (from 100 place of first number) * 3 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 24 + 0 + 1800 + 280 + 0 + 21000 + 800 + 0 + 60000 = 83904."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 508 * 803?"}, {"role": "assistant", "content": "Here are the steps for multiplying 508 * 803 using the long multiplication method.\nStep 1: Break first number 508 into its individual digits: 5 (hundreds place), 0 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 803 into its individual digits: 8 (hundreds place), 0 (tens place), and 3 (ones place).\n- 8 (from 1 place of first number) * 3 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 8 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 8 (from 1 place of first number) * 8 (from 100 place of second number) = 64 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 6400\n- 0 (from 10 place of first number) * 3 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 8 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 5 (from 100 place of first number) * 3 (from 1 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1500\n- 5 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 5 (from 100 place of first number) * 8 (from 100 place of second number) = 40 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 400000\n\nNow, add all these results together:\nThe sum of 24 + 0 + 6400 + 0 + 0 + 0 + 1500 + 0 + 400000 = 407924."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 900 * 674?"}, {"role": "assistant", "content": "Here are the steps for multiplying 900 * 674 using the long multiplication method.\nStep 1: Break first number 900 into its individual digits: 9 (hundreds place), 0 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 674 into its individual digits: 6 (hundreds place), 7 (tens place), and 4 (ones place).\n- 0 (from 1 place of first number) * 4 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 7 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 6 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 0 (from 10 place of first number) * 4 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 7 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 6 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 9 (from 100 place of first number) * 4 (from 1 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3600\n- 9 (from 100 place of first number) * 7 (from 10 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 63000\n- 9 (from 100 place of first number) * 6 (from 100 place of second number) = 54 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 540000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 0 + 0 + 0 + 3600 + 63000 + 540000 = 606600."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 748 * 373?"}, {"role": "assistant", "content": "Here are the steps for multiplying 748 * 373 using the long multiplication method.\nStep 1: Break first number 748 into its individual digits: 7 (hundreds place), 4 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 373 into its individual digits: 3 (hundreds place), 7 (tens place), and 3 (ones place).\n- 8 (from 1 place of first number) * 3 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 8 (from 1 place of first number) * 7 (from 10 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 560\n- 8 (from 1 place of first number) * 3 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 4 (from 10 place of first number) * 3 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 4 (from 10 place of first number) * 7 (from 10 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2800\n- 4 (from 10 place of first number) * 3 (from 100 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 12000\n- 7 (from 100 place of first number) * 3 (from 1 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2100\n- 7 (from 100 place of first number) * 7 (from 10 place of second number) = 49 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 49000\n- 7 (from 100 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 210000\n\nNow, add all these results together:\nThe sum of 24 + 560 + 2400 + 120 + 2800 + 12000 + 2100 + 49000 + 210000 = 279004."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 185 * 328?"}, {"role": "assistant", "content": "Here are the steps for multiplying 185 * 328 using the long multiplication method.\nStep 1: Break first number 185 into its individual digits: 1 (hundreds place), 8 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 328 into its individual digits: 3 (hundreds place), 2 (tens place), and 8 (ones place).\n- 5 (from 1 place of first number) * 8 (from 1 place of second number) = 40 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 5 (from 1 place of first number) * 2 (from 10 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 5 (from 1 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1500\n- 8 (from 10 place of first number) * 8 (from 1 place of second number) = 64 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 640\n- 8 (from 10 place of first number) * 2 (from 10 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1600\n- 8 (from 10 place of first number) * 3 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 1 (from 100 place of first number) * 8 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 1 (from 100 place of first number) * 2 (from 10 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 1 (from 100 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n\nNow, add all these results together:\nThe sum of 40 + 100 + 1500 + 640 + 1600 + 24000 + 800 + 2000 + 30000 = 60680."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 557 * 766?"}, {"role": "assistant", "content": "Here are the steps for multiplying 557 * 766 using the long multiplication method.\nStep 1: Break first number 557 into its individual digits: 5 (hundreds place), 5 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 766 into its individual digits: 7 (hundreds place), 6 (tens place), and 6 (ones place).\n- 7 (from 1 place of first number) * 6 (from 1 place of second number) = 42 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 42\n- 7 (from 1 place of first number) * 6 (from 10 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 420\n- 7 (from 1 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4900\n- 5 (from 10 place of first number) * 6 (from 1 place of second number) = 30 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 5 (from 10 place of first number) * 6 (from 10 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 5 (from 10 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 35000\n- 5 (from 100 place of first number) * 6 (from 1 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3000\n- 5 (from 100 place of first number) * 6 (from 10 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 30000\n- 5 (from 100 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 350000\n\nNow, add all these results together:\nThe sum of 42 + 420 + 4900 + 300 + 3000 + 35000 + 3000 + 30000 + 350000 = 426662."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 893 * 813?"}, {"role": "assistant", "content": "Here are the steps for multiplying 893 * 813 using the long multiplication method.\nStep 1: Break first number 893 into its individual digits: 8 (hundreds place), 9 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 813 into its individual digits: 8 (hundreds place), 1 (tens place), and 3 (ones place).\n- 3 (from 1 place of first number) * 3 (from 1 place of second number) = 9 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 9\n- 3 (from 1 place of first number) * 1 (from 10 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 30\n- 3 (from 1 place of first number) * 8 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 9 (from 10 place of first number) * 3 (from 1 place of second number) = 27 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 270\n- 9 (from 10 place of first number) * 1 (from 10 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 900\n- 9 (from 10 place of first number) * 8 (from 100 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 72000\n- 8 (from 100 place of first number) * 3 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 8 (from 100 place of first number) * 1 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 8 (from 100 place of first number) * 8 (from 100 place of second number) = 64 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 640000\n\nNow, add all these results together:\nThe sum of 9 + 30 + 2400 + 270 + 900 + 72000 + 2400 + 8000 + 640000 = 726009."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 151 * 761?"}, {"role": "assistant", "content": "Here are the steps for multiplying 151 * 761 using the long multiplication method.\nStep 1: Break first number 151 into its individual digits: 1 (hundreds place), 5 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 761 into its individual digits: 7 (hundreds place), 6 (tens place), and 1 (ones place).\n- 1 (from 1 place of first number) * 1 (from 1 place of second number) = 1 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 1\n- 1 (from 1 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 60\n- 1 (from 1 place of first number) * 7 (from 100 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 700\n- 5 (from 10 place of first number) * 1 (from 1 place of second number) = 5 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 50\n- 5 (from 10 place of first number) * 6 (from 10 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 5 (from 10 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 35000\n- 1 (from 100 place of first number) * 1 (from 1 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 100\n- 1 (from 100 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 1 (from 100 place of first number) * 7 (from 100 place of second number) = 7 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 70000\n\nNow, add all these results together:\nThe sum of 1 + 60 + 700 + 50 + 3000 + 35000 + 100 + 6000 + 70000 = 114911."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 248 * 639?"}, {"role": "assistant", "content": "Here are the steps for multiplying 248 * 639 using the long multiplication method.\nStep 1: Break first number 248 into its individual digits: 2 (hundreds place), 4 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 639 into its individual digits: 6 (hundreds place), 3 (tens place), and 9 (ones place).\n- 8 (from 1 place of first number) * 9 (from 1 place of second number) = 72 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 72\n- 8 (from 1 place of first number) * 3 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 8 (from 1 place of first number) * 6 (from 100 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4800\n- 4 (from 10 place of first number) * 9 (from 1 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 360\n- 4 (from 10 place of first number) * 3 (from 10 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1200\n- 4 (from 10 place of first number) * 6 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 2 (from 100 place of first number) * 9 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 2 (from 100 place of first number) * 3 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 2 (from 100 place of first number) * 6 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 72 + 240 + 4800 + 360 + 1200 + 24000 + 1800 + 6000 + 120000 = 158472."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 705 * 104?"}, {"role": "assistant", "content": "Here are the steps for multiplying 705 * 104 using the long multiplication method.\nStep 1: Break first number 705 into its individual digits: 7 (hundreds place), 0 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 104 into its individual digits: 1 (hundreds place), 0 (tens place), and 4 (ones place).\n- 5 (from 1 place of first number) * 4 (from 1 place of second number) = 20 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 5 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 5 (from 1 place of first number) * 1 (from 100 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 500\n- 0 (from 10 place of first number) * 4 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 1 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 7 (from 100 place of first number) * 4 (from 1 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2800\n- 7 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 7 (from 100 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 70000\n\nNow, add all these results together:\nThe sum of 20 + 0 + 500 + 0 + 0 + 0 + 2800 + 0 + 70000 = 73320."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 219 * 263?"}, {"role": "assistant", "content": "Here are the steps for multiplying 219 * 263 using the long multiplication method.\nStep 1: Break first number 219 into its individual digits: 2 (hundreds place), 1 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 263 into its individual digits: 2 (hundreds place), 6 (tens place), and 3 (ones place).\n- 9 (from 1 place of first number) * 3 (from 1 place of second number) = 27 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 27\n- 9 (from 1 place of first number) * 6 (from 10 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 540\n- 9 (from 1 place of first number) * 2 (from 100 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1800\n- 1 (from 10 place of first number) * 3 (from 1 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 1 (from 10 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 1 (from 10 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 2 (from 100 place of first number) * 3 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 2 (from 100 place of first number) * 6 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 2 (from 100 place of first number) * 2 (from 100 place of second number) = 4 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n\nNow, add all these results together:\nThe sum of 27 + 540 + 1800 + 30 + 600 + 2000 + 600 + 12000 + 40000 = 57597."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 134 * 897?"}, {"role": "assistant", "content": "Here are the steps for multiplying 134 * 897 using the long multiplication method.\nStep 1: Break first number 134 into its individual digits: 1 (hundreds place), 3 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 897 into its individual digits: 8 (hundreds place), 9 (tens place), and 7 (ones place).\n- 4 (from 1 place of first number) * 7 (from 1 place of second number) = 28 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 28\n- 4 (from 1 place of first number) * 9 (from 10 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 360\n- 4 (from 1 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3200\n- 3 (from 10 place of first number) * 7 (from 1 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 210\n- 3 (from 10 place of first number) * 9 (from 10 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2700\n- 3 (from 10 place of first number) * 8 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 1 (from 100 place of first number) * 7 (from 1 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 700\n- 1 (from 100 place of first number) * 9 (from 10 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 9000\n- 1 (from 100 place of first number) * 8 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 28 + 360 + 3200 + 210 + 2700 + 24000 + 700 + 9000 + 80000 = 120198."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 370 * 984?"}, {"role": "assistant", "content": "Here are the steps for multiplying 370 * 984 using the long multiplication method.\nStep 1: Break first number 370 into its individual digits: 3 (hundreds place), 7 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 984 into its individual digits: 9 (hundreds place), 8 (tens place), and 4 (ones place).\n- 0 (from 1 place of first number) * 4 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 8 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 9 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 7 (from 10 place of first number) * 4 (from 1 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 280\n- 7 (from 10 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5600\n- 7 (from 10 place of first number) * 9 (from 100 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 63000\n- 3 (from 100 place of first number) * 4 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 3 (from 100 place of first number) * 8 (from 10 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 24000\n- 3 (from 100 place of first number) * 9 (from 100 place of second number) = 27 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 270000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 280 + 5600 + 63000 + 1200 + 24000 + 270000 = 364080."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 954 * 524?"}, {"role": "assistant", "content": "Here are the steps for multiplying 954 * 524 using the long multiplication method.\nStep 1: Break first number 954 into its individual digits: 9 (hundreds place), 5 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 524 into its individual digits: 5 (hundreds place), 2 (tens place), and 4 (ones place).\n- 4 (from 1 place of first number) * 4 (from 1 place of second number) = 16 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 16\n- 4 (from 1 place of first number) * 2 (from 10 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 80\n- 4 (from 1 place of first number) * 5 (from 100 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 5 (from 10 place of first number) * 4 (from 1 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 200\n- 5 (from 10 place of first number) * 2 (from 10 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1000\n- 5 (from 10 place of first number) * 5 (from 100 place of second number) = 25 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 25000\n- 9 (from 100 place of first number) * 4 (from 1 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3600\n- 9 (from 100 place of first number) * 2 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 9 (from 100 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 450000\n\nNow, add all these results together:\nThe sum of 16 + 80 + 2000 + 200 + 1000 + 25000 + 3600 + 18000 + 450000 = 499896."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 934 * 180?"}, {"role": "assistant", "content": "Here are the steps for multiplying 934 * 180 using the long multiplication method.\nStep 1: Break first number 934 into its individual digits: 9 (hundreds place), 3 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 180 into its individual digits: 1 (hundreds place), 8 (tens place), and 0 (ones place).\n- 4 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 4 (from 1 place of first number) * 8 (from 10 place of second number) = 32 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 320\n- 4 (from 1 place of first number) * 1 (from 100 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 400\n- 3 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 3 (from 10 place of first number) * 8 (from 10 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2400\n- 3 (from 10 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 9 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 9 (from 100 place of first number) * 8 (from 10 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 72000\n- 9 (from 100 place of first number) * 1 (from 100 place of second number) = 9 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 90000\n\nNow, add all these results together:\nThe sum of 0 + 320 + 400 + 0 + 2400 + 3000 + 0 + 72000 + 90000 = 168120."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 356 * 396?"}, {"role": "assistant", "content": "Here are the steps for multiplying 356 * 396 using the long multiplication method.\nStep 1: Break first number 356 into its individual digits: 3 (hundreds place), 5 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 396 into its individual digits: 3 (hundreds place), 9 (tens place), and 6 (ones place).\n- 6 (from 1 place of first number) * 6 (from 1 place of second number) = 36 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 36\n- 6 (from 1 place of first number) * 9 (from 10 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 540\n- 6 (from 1 place of first number) * 3 (from 100 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1800\n- 5 (from 10 place of first number) * 6 (from 1 place of second number) = 30 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 5 (from 10 place of first number) * 9 (from 10 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4500\n- 5 (from 10 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 15000\n- 3 (from 100 place of first number) * 6 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 3 (from 100 place of first number) * 9 (from 10 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 27000\n- 3 (from 100 place of first number) * 3 (from 100 place of second number) = 9 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 90000\n\nNow, add all these results together:\nThe sum of 36 + 540 + 1800 + 300 + 4500 + 15000 + 1800 + 27000 + 90000 = 140976."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 156 * 686?"}, {"role": "assistant", "content": "Here are the steps for multiplying 156 * 686 using the long multiplication method.\nStep 1: Break first number 156 into its individual digits: 1 (hundreds place), 5 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 686 into its individual digits: 6 (hundreds place), 8 (tens place), and 6 (ones place).\n- 6 (from 1 place of first number) * 6 (from 1 place of second number) = 36 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 36\n- 6 (from 1 place of first number) * 8 (from 10 place of second number) = 48 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 480\n- 6 (from 1 place of first number) * 6 (from 100 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3600\n- 5 (from 10 place of first number) * 6 (from 1 place of second number) = 30 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 5 (from 10 place of first number) * 8 (from 10 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 5 (from 10 place of first number) * 6 (from 100 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n- 1 (from 100 place of first number) * 6 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 1 (from 100 place of first number) * 8 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 1 (from 100 place of first number) * 6 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 36 + 480 + 3600 + 300 + 4000 + 30000 + 600 + 8000 + 60000 = 107016."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 958 * 114?"}, {"role": "assistant", "content": "Here are the steps for multiplying 958 * 114 using the long multiplication method.\nStep 1: Break first number 958 into its individual digits: 9 (hundreds place), 5 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 114 into its individual digits: 1 (hundreds place), 1 (tens place), and 4 (ones place).\n- 8 (from 1 place of first number) * 4 (from 1 place of second number) = 32 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 32\n- 8 (from 1 place of first number) * 1 (from 10 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 80\n- 8 (from 1 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 5 (from 10 place of first number) * 4 (from 1 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 200\n- 5 (from 10 place of first number) * 1 (from 10 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 500\n- 5 (from 10 place of first number) * 1 (from 100 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 5000\n- 9 (from 100 place of first number) * 4 (from 1 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3600\n- 9 (from 100 place of first number) * 1 (from 10 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 9000\n- 9 (from 100 place of first number) * 1 (from 100 place of second number) = 9 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 90000\n\nNow, add all these results together:\nThe sum of 32 + 80 + 800 + 200 + 500 + 5000 + 3600 + 9000 + 90000 = 109212."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 536 * 601?"}, {"role": "assistant", "content": "Here are the steps for multiplying 536 * 601 using the long multiplication method.\nStep 1: Break first number 536 into its individual digits: 5 (hundreds place), 3 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 601 into its individual digits: 6 (hundreds place), 0 (tens place), and 1 (ones place).\n- 6 (from 1 place of first number) * 1 (from 1 place of second number) = 6 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 6\n- 6 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 6 (from 1 place of first number) * 6 (from 100 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3600\n- 3 (from 10 place of first number) * 1 (from 1 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 3 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 3 (from 10 place of first number) * 6 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 5 (from 100 place of first number) * 1 (from 1 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 500\n- 5 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 5 (from 100 place of first number) * 6 (from 100 place of second number) = 30 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 300000\n\nNow, add all these results together:\nThe sum of 6 + 0 + 3600 + 30 + 0 + 18000 + 500 + 0 + 300000 = 322136."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 388 * 215?"}, {"role": "assistant", "content": "Here are the steps for multiplying 388 * 215 using the long multiplication method.\nStep 1: Break first number 388 into its individual digits: 3 (hundreds place), 8 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 215 into its individual digits: 2 (hundreds place), 1 (tens place), and 5 (ones place).\n- 8 (from 1 place of first number) * 5 (from 1 place of second number) = 40 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 8 (from 1 place of first number) * 1 (from 10 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 80\n- 8 (from 1 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 8 (from 10 place of first number) * 5 (from 1 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 8 (from 10 place of first number) * 1 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 8 (from 10 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 16000\n- 3 (from 100 place of first number) * 5 (from 1 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1500\n- 3 (from 100 place of first number) * 1 (from 10 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 3 (from 100 place of first number) * 2 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 40 + 80 + 1600 + 400 + 800 + 16000 + 1500 + 3000 + 60000 = 83420."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 473 * 288?"}, {"role": "assistant", "content": "Here are the steps for multiplying 473 * 288 using the long multiplication method.\nStep 1: Break first number 473 into its individual digits: 4 (hundreds place), 7 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 288 into its individual digits: 2 (hundreds place), 8 (tens place), and 8 (ones place).\n- 3 (from 1 place of first number) * 8 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 3 (from 1 place of first number) * 8 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 3 (from 1 place of first number) * 2 (from 100 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 600\n- 7 (from 10 place of first number) * 8 (from 1 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 560\n- 7 (from 10 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5600\n- 7 (from 10 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 14000\n- 4 (from 100 place of first number) * 8 (from 1 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3200\n- 4 (from 100 place of first number) * 8 (from 10 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 32000\n- 4 (from 100 place of first number) * 2 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 24 + 240 + 600 + 560 + 5600 + 14000 + 3200 + 32000 + 80000 = 136224."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 678 * 230?"}, {"role": "assistant", "content": "Here are the steps for multiplying 678 * 230 using the long multiplication method.\nStep 1: Break first number 678 into its individual digits: 6 (hundreds place), 7 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 230 into its individual digits: 2 (hundreds place), 3 (tens place), and 0 (ones place).\n- 8 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 1 place of first number) * 3 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 8 (from 1 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 7 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 10 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2100\n- 7 (from 10 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 14000\n- 6 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 6 (from 100 place of first number) * 3 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 6 (from 100 place of first number) * 2 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 0 + 240 + 1600 + 0 + 2100 + 14000 + 0 + 18000 + 120000 = 155940."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 830 * 294?"}, {"role": "assistant", "content": "Here are the steps for multiplying 830 * 294 using the long multiplication method.\nStep 1: Break first number 830 into its individual digits: 8 (hundreds place), 3 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 294 into its individual digits: 2 (hundreds place), 9 (tens place), and 4 (ones place).\n- 0 (from 1 place of first number) * 4 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 9 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 2 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 3 (from 10 place of first number) * 4 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 3 (from 10 place of first number) * 9 (from 10 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2700\n- 3 (from 10 place of first number) * 2 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 8 (from 100 place of first number) * 4 (from 1 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3200\n- 8 (from 100 place of first number) * 9 (from 10 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 72000\n- 8 (from 100 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 120 + 2700 + 6000 + 3200 + 72000 + 160000 = 244020."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 894 * 211?"}, {"role": "assistant", "content": "Here are the steps for multiplying 894 * 211 using the long multiplication method.\nStep 1: Break first number 894 into its individual digits: 8 (hundreds place), 9 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 211 into its individual digits: 2 (hundreds place), 1 (tens place), and 1 (ones place).\n- 4 (from 1 place of first number) * 1 (from 1 place of second number) = 4 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 4\n- 4 (from 1 place of first number) * 1 (from 10 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 40\n- 4 (from 1 place of first number) * 2 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 9 (from 10 place of first number) * 1 (from 1 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 90\n- 9 (from 10 place of first number) * 1 (from 10 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 900\n- 9 (from 10 place of first number) * 2 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 8 (from 100 place of first number) * 1 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 8 (from 100 place of first number) * 1 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 8 (from 100 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 4 + 40 + 800 + 90 + 900 + 18000 + 800 + 8000 + 160000 = 188634."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 499 * 314?"}, {"role": "assistant", "content": "Here are the steps for multiplying 499 * 314 using the long multiplication method.\nStep 1: Break first number 499 into its individual digits: 4 (hundreds place), 9 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 314 into its individual digits: 3 (hundreds place), 1 (tens place), and 4 (ones place).\n- 9 (from 1 place of first number) * 4 (from 1 place of second number) = 36 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 36\n- 9 (from 1 place of first number) * 1 (from 10 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 90\n- 9 (from 1 place of first number) * 3 (from 100 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2700\n- 9 (from 10 place of first number) * 4 (from 1 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 360\n- 9 (from 10 place of first number) * 1 (from 10 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 900\n- 9 (from 10 place of first number) * 3 (from 100 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 27000\n- 4 (from 100 place of first number) * 4 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 4 (from 100 place of first number) * 1 (from 10 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 4 (from 100 place of first number) * 3 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 36 + 90 + 2700 + 360 + 900 + 27000 + 1600 + 4000 + 120000 = 156686."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 129 * 541?"}, {"role": "assistant", "content": "Here are the steps for multiplying 129 * 541 using the long multiplication method.\nStep 1: Break first number 129 into its individual digits: 1 (hundreds place), 2 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 541 into its individual digits: 5 (hundreds place), 4 (tens place), and 1 (ones place).\n- 9 (from 1 place of first number) * 1 (from 1 place of second number) = 9 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 9\n- 9 (from 1 place of first number) * 4 (from 10 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 360\n- 9 (from 1 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4500\n- 2 (from 10 place of first number) * 1 (from 1 place of second number) = 2 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 2 (from 10 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 2 (from 10 place of first number) * 5 (from 100 place of second number) = 10 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 10000\n- 1 (from 100 place of first number) * 1 (from 1 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 100\n- 1 (from 100 place of first number) * 4 (from 10 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 1 (from 100 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 50000\n\nNow, add all these results together:\nThe sum of 9 + 360 + 4500 + 20 + 800 + 10000 + 100 + 4000 + 50000 = 69789."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 294 * 903?"}, {"role": "assistant", "content": "Here are the steps for multiplying 294 * 903 using the long multiplication method.\nStep 1: Break first number 294 into its individual digits: 2 (hundreds place), 9 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 903 into its individual digits: 9 (hundreds place), 0 (tens place), and 3 (ones place).\n- 4 (from 1 place of first number) * 3 (from 1 place of second number) = 12 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 12\n- 4 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 4 (from 1 place of first number) * 9 (from 100 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3600\n- 9 (from 10 place of first number) * 3 (from 1 place of second number) = 27 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 270\n- 9 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 9 (from 10 place of first number) * 9 (from 100 place of second number) = 81 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 81000\n- 2 (from 100 place of first number) * 3 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 2 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 2 (from 100 place of first number) * 9 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 12 + 0 + 3600 + 270 + 0 + 81000 + 600 + 0 + 180000 = 265482."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 661 * 784?"}, {"role": "assistant", "content": "Here are the steps for multiplying 661 * 784 using the long multiplication method.\nStep 1: Break first number 661 into its individual digits: 6 (hundreds place), 6 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 784 into its individual digits: 7 (hundreds place), 8 (tens place), and 4 (ones place).\n- 1 (from 1 place of first number) * 4 (from 1 place of second number) = 4 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 4\n- 1 (from 1 place of first number) * 8 (from 10 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 80\n- 1 (from 1 place of first number) * 7 (from 100 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 700\n- 6 (from 10 place of first number) * 4 (from 1 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 240\n- 6 (from 10 place of first number) * 8 (from 10 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4800\n- 6 (from 10 place of first number) * 7 (from 100 place of second number) = 42 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 42000\n- 6 (from 100 place of first number) * 4 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 6 (from 100 place of first number) * 8 (from 10 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 48000\n- 6 (from 100 place of first number) * 7 (from 100 place of second number) = 42 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 420000\n\nNow, add all these results together:\nThe sum of 4 + 80 + 700 + 240 + 4800 + 42000 + 2400 + 48000 + 420000 = 518224."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 387 * 760?"}, {"role": "assistant", "content": "Here are the steps for multiplying 387 * 760 using the long multiplication method.\nStep 1: Break first number 387 into its individual digits: 3 (hundreds place), 8 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 760 into its individual digits: 7 (hundreds place), 6 (tens place), and 0 (ones place).\n- 7 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 1 place of first number) * 6 (from 10 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 420\n- 7 (from 1 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4900\n- 8 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 10 place of first number) * 6 (from 10 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4800\n- 8 (from 10 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 56000\n- 3 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 3 (from 100 place of first number) * 6 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 3 (from 100 place of first number) * 7 (from 100 place of second number) = 21 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 210000\n\nNow, add all these results together:\nThe sum of 0 + 420 + 4900 + 0 + 4800 + 56000 + 0 + 18000 + 210000 = 294120."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 414 * 300?"}, {"role": "assistant", "content": "Here are the steps for multiplying 414 * 300 using the long multiplication method.\nStep 1: Break first number 414 into its individual digits: 4 (hundreds place), 1 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 300 into its individual digits: 3 (hundreds place), 0 (tens place), and 0 (ones place).\n- 4 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 4 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 4 (from 1 place of first number) * 3 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 1 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 1 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 1 (from 10 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 4 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 4 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 4 (from 100 place of first number) * 3 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 1200 + 0 + 0 + 3000 + 0 + 0 + 120000 = 124200."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 217 * 511?"}, {"role": "assistant", "content": "Here are the steps for multiplying 217 * 511 using the long multiplication method.\nStep 1: Break first number 217 into its individual digits: 2 (hundreds place), 1 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 511 into its individual digits: 5 (hundreds place), 1 (tens place), and 1 (ones place).\n- 7 (from 1 place of first number) * 1 (from 1 place of second number) = 7 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 7\n- 7 (from 1 place of first number) * 1 (from 10 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 70\n- 7 (from 1 place of first number) * 5 (from 100 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3500\n- 1 (from 10 place of first number) * 1 (from 1 place of second number) = 1 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 10\n- 1 (from 10 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 1 (from 10 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 5000\n- 2 (from 100 place of first number) * 1 (from 1 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 200\n- 2 (from 100 place of first number) * 1 (from 10 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 2 (from 100 place of first number) * 5 (from 100 place of second number) = 10 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 100000\n\nNow, add all these results together:\nThe sum of 7 + 70 + 3500 + 10 + 100 + 5000 + 200 + 2000 + 100000 = 110887."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 256 * 287?"}, {"role": "assistant", "content": "Here are the steps for multiplying 256 * 287 using the long multiplication method.\nStep 1: Break first number 256 into its individual digits: 2 (hundreds place), 5 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 287 into its individual digits: 2 (hundreds place), 8 (tens place), and 7 (ones place).\n- 6 (from 1 place of first number) * 7 (from 1 place of second number) = 42 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 42\n- 6 (from 1 place of first number) * 8 (from 10 place of second number) = 48 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 480\n- 6 (from 1 place of first number) * 2 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 5 (from 10 place of first number) * 7 (from 1 place of second number) = 35 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 350\n- 5 (from 10 place of first number) * 8 (from 10 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 5 (from 10 place of first number) * 2 (from 100 place of second number) = 10 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 10000\n- 2 (from 100 place of first number) * 7 (from 1 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1400\n- 2 (from 100 place of first number) * 8 (from 10 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 16000\n- 2 (from 100 place of first number) * 2 (from 100 place of second number) = 4 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n\nNow, add all these results together:\nThe sum of 42 + 480 + 1200 + 350 + 4000 + 10000 + 1400 + 16000 + 40000 = 73472."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 970 * 675?"}, {"role": "assistant", "content": "Here are the steps for multiplying 970 * 675 using the long multiplication method.\nStep 1: Break first number 970 into its individual digits: 9 (hundreds place), 7 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 675 into its individual digits: 6 (hundreds place), 7 (tens place), and 5 (ones place).\n- 0 (from 1 place of first number) * 5 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 7 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 6 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 7 (from 10 place of first number) * 5 (from 1 place of second number) = 35 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 350\n- 7 (from 10 place of first number) * 7 (from 10 place of second number) = 49 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4900\n- 7 (from 10 place of first number) * 6 (from 100 place of second number) = 42 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 42000\n- 9 (from 100 place of first number) * 5 (from 1 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4500\n- 9 (from 100 place of first number) * 7 (from 10 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 63000\n- 9 (from 100 place of first number) * 6 (from 100 place of second number) = 54 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 540000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 350 + 4900 + 42000 + 4500 + 63000 + 540000 = 654750."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 283 * 786?"}, {"role": "assistant", "content": "Here are the steps for multiplying 283 * 786 using the long multiplication method.\nStep 1: Break first number 283 into its individual digits: 2 (hundreds place), 8 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 786 into its individual digits: 7 (hundreds place), 8 (tens place), and 6 (ones place).\n- 3 (from 1 place of first number) * 6 (from 1 place of second number) = 18 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 18\n- 3 (from 1 place of first number) * 8 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 3 (from 1 place of first number) * 7 (from 100 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2100\n- 8 (from 10 place of first number) * 6 (from 1 place of second number) = 48 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 480\n- 8 (from 10 place of first number) * 8 (from 10 place of second number) = 64 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 6400\n- 8 (from 10 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 56000\n- 2 (from 100 place of first number) * 6 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 2 (from 100 place of first number) * 8 (from 10 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 16000\n- 2 (from 100 place of first number) * 7 (from 100 place of second number) = 14 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 140000\n\nNow, add all these results together:\nThe sum of 18 + 240 + 2100 + 480 + 6400 + 56000 + 1200 + 16000 + 140000 = 222438."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 488 * 959?"}, {"role": "assistant", "content": "Here are the steps for multiplying 488 * 959 using the long multiplication method.\nStep 1: Break first number 488 into its individual digits: 4 (hundreds place), 8 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 959 into its individual digits: 9 (hundreds place), 5 (tens place), and 9 (ones place).\n- 8 (from 1 place of first number) * 9 (from 1 place of second number) = 72 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 72\n- 8 (from 1 place of first number) * 5 (from 10 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 8 (from 1 place of first number) * 9 (from 100 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 7200\n- 8 (from 10 place of first number) * 9 (from 1 place of second number) = 72 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 720\n- 8 (from 10 place of first number) * 5 (from 10 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 8 (from 10 place of first number) * 9 (from 100 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 72000\n- 4 (from 100 place of first number) * 9 (from 1 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3600\n- 4 (from 100 place of first number) * 5 (from 10 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 20000\n- 4 (from 100 place of first number) * 9 (from 100 place of second number) = 36 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 360000\n\nNow, add all these results together:\nThe sum of 72 + 400 + 7200 + 720 + 4000 + 72000 + 3600 + 20000 + 360000 = 467992."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 305 * 164?"}, {"role": "assistant", "content": "Here are the steps for multiplying 305 * 164 using the long multiplication method.\nStep 1: Break first number 305 into its individual digits: 3 (hundreds place), 0 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 164 into its individual digits: 1 (hundreds place), 6 (tens place), and 4 (ones place).\n- 5 (from 1 place of first number) * 4 (from 1 place of second number) = 20 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 5 (from 1 place of first number) * 6 (from 10 place of second number) = 30 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 300\n- 5 (from 1 place of first number) * 1 (from 100 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 500\n- 0 (from 10 place of first number) * 4 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 6 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 1 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 3 (from 100 place of first number) * 4 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 3 (from 100 place of first number) * 6 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 3 (from 100 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n\nNow, add all these results together:\nThe sum of 20 + 300 + 500 + 0 + 0 + 0 + 1200 + 18000 + 30000 = 50020."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 354 * 532?"}, {"role": "assistant", "content": "Here are the steps for multiplying 354 * 532 using the long multiplication method.\nStep 1: Break first number 354 into its individual digits: 3 (hundreds place), 5 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 532 into its individual digits: 5 (hundreds place), 3 (tens place), and 2 (ones place).\n- 4 (from 1 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 4 (from 1 place of first number) * 3 (from 10 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 120\n- 4 (from 1 place of first number) * 5 (from 100 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 5 (from 10 place of first number) * 2 (from 1 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 100\n- 5 (from 10 place of first number) * 3 (from 10 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1500\n- 5 (from 10 place of first number) * 5 (from 100 place of second number) = 25 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 25000\n- 3 (from 100 place of first number) * 2 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 3 (from 100 place of first number) * 3 (from 10 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 9000\n- 3 (from 100 place of first number) * 5 (from 100 place of second number) = 15 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 150000\n\nNow, add all these results together:\nThe sum of 8 + 120 + 2000 + 100 + 1500 + 25000 + 600 + 9000 + 150000 = 188328."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 302 * 543?"}, {"role": "assistant", "content": "Here are the steps for multiplying 302 * 543 using the long multiplication method.\nStep 1: Break first number 302 into its individual digits: 3 (hundreds place), 0 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 543 into its individual digits: 5 (hundreds place), 4 (tens place), and 3 (ones place).\n- 2 (from 1 place of first number) * 3 (from 1 place of second number) = 6 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 6\n- 2 (from 1 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 80\n- 2 (from 1 place of first number) * 5 (from 100 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1000\n- 0 (from 10 place of first number) * 3 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 4 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 5 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 3 (from 100 place of first number) * 3 (from 1 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 900\n- 3 (from 100 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 3 (from 100 place of first number) * 5 (from 100 place of second number) = 15 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 150000\n\nNow, add all these results together:\nThe sum of 6 + 80 + 1000 + 0 + 0 + 0 + 900 + 12000 + 150000 = 163986."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 365 * 865?"}, {"role": "assistant", "content": "Here are the steps for multiplying 365 * 865 using the long multiplication method.\nStep 1: Break first number 365 into its individual digits: 3 (hundreds place), 6 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 865 into its individual digits: 8 (hundreds place), 6 (tens place), and 5 (ones place).\n- 5 (from 1 place of first number) * 5 (from 1 place of second number) = 25 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 25\n- 5 (from 1 place of first number) * 6 (from 10 place of second number) = 30 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 300\n- 5 (from 1 place of first number) * 8 (from 100 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 6 (from 10 place of first number) * 5 (from 1 place of second number) = 30 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 6 (from 10 place of first number) * 6 (from 10 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3600\n- 6 (from 10 place of first number) * 8 (from 100 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 48000\n- 3 (from 100 place of first number) * 5 (from 1 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1500\n- 3 (from 100 place of first number) * 6 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 3 (from 100 place of first number) * 8 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 25 + 300 + 4000 + 300 + 3600 + 48000 + 1500 + 18000 + 240000 = 315725."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 822 * 962?"}, {"role": "assistant", "content": "Here are the steps for multiplying 822 * 962 using the long multiplication method.\nStep 1: Break first number 822 into its individual digits: 8 (hundreds place), 2 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 962 into its individual digits: 9 (hundreds place), 6 (tens place), and 2 (ones place).\n- 2 (from 1 place of first number) * 2 (from 1 place of second number) = 4 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 4\n- 2 (from 1 place of first number) * 6 (from 10 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 120\n- 2 (from 1 place of first number) * 9 (from 100 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1800\n- 2 (from 10 place of first number) * 2 (from 1 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 2 (from 10 place of first number) * 6 (from 10 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1200\n- 2 (from 10 place of first number) * 9 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 8 (from 100 place of first number) * 2 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 8 (from 100 place of first number) * 6 (from 10 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 48000\n- 8 (from 100 place of first number) * 9 (from 100 place of second number) = 72 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 720000\n\nNow, add all these results together:\nThe sum of 4 + 120 + 1800 + 40 + 1200 + 18000 + 1600 + 48000 + 720000 = 790764."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 632 * 527?"}, {"role": "assistant", "content": "Here are the steps for multiplying 632 * 527 using the long multiplication method.\nStep 1: Break first number 632 into its individual digits: 6 (hundreds place), 3 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 527 into its individual digits: 5 (hundreds place), 2 (tens place), and 7 (ones place).\n- 2 (from 1 place of first number) * 7 (from 1 place of second number) = 14 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 14\n- 2 (from 1 place of first number) * 2 (from 10 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 40\n- 2 (from 1 place of first number) * 5 (from 100 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1000\n- 3 (from 10 place of first number) * 7 (from 1 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 210\n- 3 (from 10 place of first number) * 2 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 3 (from 10 place of first number) * 5 (from 100 place of second number) = 15 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 15000\n- 6 (from 100 place of first number) * 7 (from 1 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4200\n- 6 (from 100 place of first number) * 2 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 6 (from 100 place of first number) * 5 (from 100 place of second number) = 30 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 300000\n\nNow, add all these results together:\nThe sum of 14 + 40 + 1000 + 210 + 600 + 15000 + 4200 + 12000 + 300000 = 333064."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 708 * 263?"}, {"role": "assistant", "content": "Here are the steps for multiplying 708 * 263 using the long multiplication method.\nStep 1: Break first number 708 into its individual digits: 7 (hundreds place), 0 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 263 into its individual digits: 2 (hundreds place), 6 (tens place), and 3 (ones place).\n- 8 (from 1 place of first number) * 3 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 8 (from 1 place of first number) * 6 (from 10 place of second number) = 48 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 480\n- 8 (from 1 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 0 (from 10 place of first number) * 3 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 6 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 2 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 7 (from 100 place of first number) * 3 (from 1 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2100\n- 7 (from 100 place of first number) * 6 (from 10 place of second number) = 42 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 42000\n- 7 (from 100 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 140000\n\nNow, add all these results together:\nThe sum of 24 + 480 + 1600 + 0 + 0 + 0 + 2100 + 42000 + 140000 = 186204."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 502 * 688?"}, {"role": "assistant", "content": "Here are the steps for multiplying 502 * 688 using the long multiplication method.\nStep 1: Break first number 502 into its individual digits: 5 (hundreds place), 0 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 688 into its individual digits: 6 (hundreds place), 8 (tens place), and 8 (ones place).\n- 2 (from 1 place of first number) * 8 (from 1 place of second number) = 16 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 16\n- 2 (from 1 place of first number) * 8 (from 10 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 160\n- 2 (from 1 place of first number) * 6 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 0 (from 10 place of first number) * 8 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 8 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 6 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 5 (from 100 place of first number) * 8 (from 1 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4000\n- 5 (from 100 place of first number) * 8 (from 10 place of second number) = 40 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 40000\n- 5 (from 100 place of first number) * 6 (from 100 place of second number) = 30 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 300000\n\nNow, add all these results together:\nThe sum of 16 + 160 + 1200 + 0 + 0 + 0 + 4000 + 40000 + 300000 = 345376."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 206 * 232?"}, {"role": "assistant", "content": "Here are the steps for multiplying 206 * 232 using the long multiplication method.\nStep 1: Break first number 206 into its individual digits: 2 (hundreds place), 0 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 232 into its individual digits: 2 (hundreds place), 3 (tens place), and 2 (ones place).\n- 6 (from 1 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 12\n- 6 (from 1 place of first number) * 3 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 6 (from 1 place of first number) * 2 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 0 (from 10 place of first number) * 2 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 3 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 2 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 2 (from 100 place of first number) * 2 (from 1 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 2 (from 100 place of first number) * 3 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 2 (from 100 place of first number) * 2 (from 100 place of second number) = 4 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n\nNow, add all these results together:\nThe sum of 12 + 180 + 1200 + 0 + 0 + 0 + 400 + 6000 + 40000 = 47792."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 903 * 187?"}, {"role": "assistant", "content": "Here are the steps for multiplying 903 * 187 using the long multiplication method.\nStep 1: Break first number 903 into its individual digits: 9 (hundreds place), 0 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 187 into its individual digits: 1 (hundreds place), 8 (tens place), and 7 (ones place).\n- 3 (from 1 place of first number) * 7 (from 1 place of second number) = 21 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 21\n- 3 (from 1 place of first number) * 8 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 3 (from 1 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 300\n- 0 (from 10 place of first number) * 7 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 8 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 1 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 9 (from 100 place of first number) * 7 (from 1 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 6300\n- 9 (from 100 place of first number) * 8 (from 10 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 72000\n- 9 (from 100 place of first number) * 1 (from 100 place of second number) = 9 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 90000\n\nNow, add all these results together:\nThe sum of 21 + 240 + 300 + 0 + 0 + 0 + 6300 + 72000 + 90000 = 168861."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 598 * 574?"}, {"role": "assistant", "content": "Here are the steps for multiplying 598 * 574 using the long multiplication method.\nStep 1: Break first number 598 into its individual digits: 5 (hundreds place), 9 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 574 into its individual digits: 5 (hundreds place), 7 (tens place), and 4 (ones place).\n- 8 (from 1 place of first number) * 4 (from 1 place of second number) = 32 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 32\n- 8 (from 1 place of first number) * 7 (from 10 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 560\n- 8 (from 1 place of first number) * 5 (from 100 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 9 (from 10 place of first number) * 4 (from 1 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 360\n- 9 (from 10 place of first number) * 7 (from 10 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 6300\n- 9 (from 10 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 45000\n- 5 (from 100 place of first number) * 4 (from 1 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2000\n- 5 (from 100 place of first number) * 7 (from 10 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 35000\n- 5 (from 100 place of first number) * 5 (from 100 place of second number) = 25 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 250000\n\nNow, add all these results together:\nThe sum of 32 + 560 + 4000 + 360 + 6300 + 45000 + 2000 + 35000 + 250000 = 343252."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 171 * 323?"}, {"role": "assistant", "content": "Here are the steps for multiplying 171 * 323 using the long multiplication method.\nStep 1: Break first number 171 into its individual digits: 1 (hundreds place), 7 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 323 into its individual digits: 3 (hundreds place), 2 (tens place), and 3 (ones place).\n- 1 (from 1 place of first number) * 3 (from 1 place of second number) = 3 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 3\n- 1 (from 1 place of first number) * 2 (from 10 place of second number) = 2 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 20\n- 1 (from 1 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 300\n- 7 (from 10 place of first number) * 3 (from 1 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 210\n- 7 (from 10 place of first number) * 2 (from 10 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1400\n- 7 (from 10 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 21000\n- 1 (from 100 place of first number) * 3 (from 1 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 1 (from 100 place of first number) * 2 (from 10 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 1 (from 100 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n\nNow, add all these results together:\nThe sum of 3 + 20 + 300 + 210 + 1400 + 21000 + 300 + 2000 + 30000 = 55233."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 171 * 757?"}, {"role": "assistant", "content": "Here are the steps for multiplying 171 * 757 using the long multiplication method.\nStep 1: Break first number 171 into its individual digits: 1 (hundreds place), 7 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 757 into its individual digits: 7 (hundreds place), 5 (tens place), and 7 (ones place).\n- 1 (from 1 place of first number) * 7 (from 1 place of second number) = 7 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 7\n- 1 (from 1 place of first number) * 5 (from 10 place of second number) = 5 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 50\n- 1 (from 1 place of first number) * 7 (from 100 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 700\n- 7 (from 10 place of first number) * 7 (from 1 place of second number) = 49 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 490\n- 7 (from 10 place of first number) * 5 (from 10 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3500\n- 7 (from 10 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 49000\n- 1 (from 100 place of first number) * 7 (from 1 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 700\n- 1 (from 100 place of first number) * 5 (from 10 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 5000\n- 1 (from 100 place of first number) * 7 (from 100 place of second number) = 7 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 70000\n\nNow, add all these results together:\nThe sum of 7 + 50 + 700 + 490 + 3500 + 49000 + 700 + 5000 + 70000 = 129447."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 563 * 579?"}, {"role": "assistant", "content": "Here are the steps for multiplying 563 * 579 using the long multiplication method.\nStep 1: Break first number 563 into its individual digits: 5 (hundreds place), 6 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 579 into its individual digits: 5 (hundreds place), 7 (tens place), and 9 (ones place).\n- 3 (from 1 place of first number) * 9 (from 1 place of second number) = 27 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 27\n- 3 (from 1 place of first number) * 7 (from 10 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 210\n- 3 (from 1 place of first number) * 5 (from 100 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1500\n- 6 (from 10 place of first number) * 9 (from 1 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 540\n- 6 (from 10 place of first number) * 7 (from 10 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4200\n- 6 (from 10 place of first number) * 5 (from 100 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n- 5 (from 100 place of first number) * 9 (from 1 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4500\n- 5 (from 100 place of first number) * 7 (from 10 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 35000\n- 5 (from 100 place of first number) * 5 (from 100 place of second number) = 25 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 250000\n\nNow, add all these results together:\nThe sum of 27 + 210 + 1500 + 540 + 4200 + 30000 + 4500 + 35000 + 250000 = 325977."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 121 * 894?"}, {"role": "assistant", "content": "Here are the steps for multiplying 121 * 894 using the long multiplication method.\nStep 1: Break first number 121 into its individual digits: 1 (hundreds place), 2 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 894 into its individual digits: 8 (hundreds place), 9 (tens place), and 4 (ones place).\n- 1 (from 1 place of first number) * 4 (from 1 place of second number) = 4 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 4\n- 1 (from 1 place of first number) * 9 (from 10 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 90\n- 1 (from 1 place of first number) * 8 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 2 (from 10 place of first number) * 4 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 2 (from 10 place of first number) * 9 (from 10 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1800\n- 2 (from 10 place of first number) * 8 (from 100 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 16000\n- 1 (from 100 place of first number) * 4 (from 1 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 1 (from 100 place of first number) * 9 (from 10 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 9000\n- 1 (from 100 place of first number) * 8 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 4 + 90 + 800 + 80 + 1800 + 16000 + 400 + 9000 + 80000 = 108174."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 759 * 371?"}, {"role": "assistant", "content": "Here are the steps for multiplying 759 * 371 using the long multiplication method.\nStep 1: Break first number 759 into its individual digits: 7 (hundreds place), 5 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 371 into its individual digits: 3 (hundreds place), 7 (tens place), and 1 (ones place).\n- 9 (from 1 place of first number) * 1 (from 1 place of second number) = 9 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 9\n- 9 (from 1 place of first number) * 7 (from 10 place of second number) = 63 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 630\n- 9 (from 1 place of first number) * 3 (from 100 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2700\n- 5 (from 10 place of first number) * 1 (from 1 place of second number) = 5 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 50\n- 5 (from 10 place of first number) * 7 (from 10 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3500\n- 5 (from 10 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 15000\n- 7 (from 100 place of first number) * 1 (from 1 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 700\n- 7 (from 100 place of first number) * 7 (from 10 place of second number) = 49 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 49000\n- 7 (from 100 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 210000\n\nNow, add all these results together:\nThe sum of 9 + 630 + 2700 + 50 + 3500 + 15000 + 700 + 49000 + 210000 = 281589."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 230 * 655?"}, {"role": "assistant", "content": "Here are the steps for multiplying 230 * 655 using the long multiplication method.\nStep 1: Break first number 230 into its individual digits: 2 (hundreds place), 3 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 655 into its individual digits: 6 (hundreds place), 5 (tens place), and 5 (ones place).\n- 0 (from 1 place of first number) * 5 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 5 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 6 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 3 (from 10 place of first number) * 5 (from 1 place of second number) = 15 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 150\n- 3 (from 10 place of first number) * 5 (from 10 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1500\n- 3 (from 10 place of first number) * 6 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 2 (from 100 place of first number) * 5 (from 1 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1000\n- 2 (from 100 place of first number) * 5 (from 10 place of second number) = 10 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 10000\n- 2 (from 100 place of first number) * 6 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 150 + 1500 + 18000 + 1000 + 10000 + 120000 = 150650."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 541 * 583?"}, {"role": "assistant", "content": "Here are the steps for multiplying 541 * 583 using the long multiplication method.\nStep 1: Break first number 541 into its individual digits: 5 (hundreds place), 4 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 583 into its individual digits: 5 (hundreds place), 8 (tens place), and 3 (ones place).\n- 1 (from 1 place of first number) * 3 (from 1 place of second number) = 3 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 3\n- 1 (from 1 place of first number) * 8 (from 10 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 80\n- 1 (from 1 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 500\n- 4 (from 10 place of first number) * 3 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 4 (from 10 place of first number) * 8 (from 10 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3200\n- 4 (from 10 place of first number) * 5 (from 100 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n- 5 (from 100 place of first number) * 3 (from 1 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1500\n- 5 (from 100 place of first number) * 8 (from 10 place of second number) = 40 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 40000\n- 5 (from 100 place of first number) * 5 (from 100 place of second number) = 25 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 250000\n\nNow, add all these results together:\nThe sum of 3 + 80 + 500 + 120 + 3200 + 20000 + 1500 + 40000 + 250000 = 315403."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 269 * 413?"}, {"role": "assistant", "content": "Here are the steps for multiplying 269 * 413 using the long multiplication method.\nStep 1: Break first number 269 into its individual digits: 2 (hundreds place), 6 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 413 into its individual digits: 4 (hundreds place), 1 (tens place), and 3 (ones place).\n- 9 (from 1 place of first number) * 3 (from 1 place of second number) = 27 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 27\n- 9 (from 1 place of first number) * 1 (from 10 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 90\n- 9 (from 1 place of first number) * 4 (from 100 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3600\n- 6 (from 10 place of first number) * 3 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 6 (from 10 place of first number) * 1 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 6 (from 10 place of first number) * 4 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 2 (from 100 place of first number) * 3 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 2 (from 100 place of first number) * 1 (from 10 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 2 (from 100 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 27 + 90 + 3600 + 180 + 600 + 24000 + 600 + 2000 + 80000 = 111097."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 719 * 777?"}, {"role": "assistant", "content": "Here are the steps for multiplying 719 * 777 using the long multiplication method.\nStep 1: Break first number 719 into its individual digits: 7 (hundreds place), 1 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 777 into its individual digits: 7 (hundreds place), 7 (tens place), and 7 (ones place).\n- 9 (from 1 place of first number) * 7 (from 1 place of second number) = 63 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 63\n- 9 (from 1 place of first number) * 7 (from 10 place of second number) = 63 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 630\n- 9 (from 1 place of first number) * 7 (from 100 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 6300\n- 1 (from 10 place of first number) * 7 (from 1 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 70\n- 1 (from 10 place of first number) * 7 (from 10 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 700\n- 1 (from 10 place of first number) * 7 (from 100 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 7000\n- 7 (from 100 place of first number) * 7 (from 1 place of second number) = 49 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4900\n- 7 (from 100 place of first number) * 7 (from 10 place of second number) = 49 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 49000\n- 7 (from 100 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 490000\n\nNow, add all these results together:\nThe sum of 63 + 630 + 6300 + 70 + 700 + 7000 + 4900 + 49000 + 490000 = 558663."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 642 * 256?"}, {"role": "assistant", "content": "Here are the steps for multiplying 642 * 256 using the long multiplication method.\nStep 1: Break first number 642 into its individual digits: 6 (hundreds place), 4 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 256 into its individual digits: 2 (hundreds place), 5 (tens place), and 6 (ones place).\n- 2 (from 1 place of first number) * 6 (from 1 place of second number) = 12 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 12\n- 2 (from 1 place of first number) * 5 (from 10 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 2 (from 1 place of first number) * 2 (from 100 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 400\n- 4 (from 10 place of first number) * 6 (from 1 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 240\n- 4 (from 10 place of first number) * 5 (from 10 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 4 (from 10 place of first number) * 2 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 6 (from 100 place of first number) * 6 (from 1 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3600\n- 6 (from 100 place of first number) * 5 (from 10 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 30000\n- 6 (from 100 place of first number) * 2 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 12 + 100 + 400 + 240 + 2000 + 8000 + 3600 + 30000 + 120000 = 164352."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 349 * 142?"}, {"role": "assistant", "content": "Here are the steps for multiplying 349 * 142 using the long multiplication method.\nStep 1: Break first number 349 into its individual digits: 3 (hundreds place), 4 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 142 into its individual digits: 1 (hundreds place), 4 (tens place), and 2 (ones place).\n- 9 (from 1 place of first number) * 2 (from 1 place of second number) = 18 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 18\n- 9 (from 1 place of first number) * 4 (from 10 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 360\n- 9 (from 1 place of first number) * 1 (from 100 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 900\n- 4 (from 10 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 4 (from 10 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1600\n- 4 (from 10 place of first number) * 1 (from 100 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 3 (from 100 place of first number) * 2 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 3 (from 100 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 3 (from 100 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n\nNow, add all these results together:\nThe sum of 18 + 360 + 900 + 80 + 1600 + 4000 + 600 + 12000 + 30000 = 49558."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 328 * 673?"}, {"role": "assistant", "content": "Here are the steps for multiplying 328 * 673 using the long multiplication method.\nStep 1: Break first number 328 into its individual digits: 3 (hundreds place), 2 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 673 into its individual digits: 6 (hundreds place), 7 (tens place), and 3 (ones place).\n- 8 (from 1 place of first number) * 3 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 8 (from 1 place of first number) * 7 (from 10 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 560\n- 8 (from 1 place of first number) * 6 (from 100 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4800\n- 2 (from 10 place of first number) * 3 (from 1 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 60\n- 2 (from 10 place of first number) * 7 (from 10 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1400\n- 2 (from 10 place of first number) * 6 (from 100 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 12000\n- 3 (from 100 place of first number) * 3 (from 1 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 900\n- 3 (from 100 place of first number) * 7 (from 10 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 21000\n- 3 (from 100 place of first number) * 6 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 24 + 560 + 4800 + 60 + 1400 + 12000 + 900 + 21000 + 180000 = 220744."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 177 * 620?"}, {"role": "assistant", "content": "Here are the steps for multiplying 177 * 620 using the long multiplication method.\nStep 1: Break first number 177 into its individual digits: 1 (hundreds place), 7 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 620 into its individual digits: 6 (hundreds place), 2 (tens place), and 0 (ones place).\n- 7 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 1 place of first number) * 2 (from 10 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 140\n- 7 (from 1 place of first number) * 6 (from 100 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4200\n- 7 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 10 place of first number) * 2 (from 10 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1400\n- 7 (from 10 place of first number) * 6 (from 100 place of second number) = 42 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 42000\n- 1 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 1 (from 100 place of first number) * 2 (from 10 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 1 (from 100 place of first number) * 6 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 0 + 140 + 4200 + 0 + 1400 + 42000 + 0 + 2000 + 60000 = 109740."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 419 * 542?"}, {"role": "assistant", "content": "Here are the steps for multiplying 419 * 542 using the long multiplication method.\nStep 1: Break first number 419 into its individual digits: 4 (hundreds place), 1 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 542 into its individual digits: 5 (hundreds place), 4 (tens place), and 2 (ones place).\n- 9 (from 1 place of first number) * 2 (from 1 place of second number) = 18 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 18\n- 9 (from 1 place of first number) * 4 (from 10 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 360\n- 9 (from 1 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4500\n- 1 (from 10 place of first number) * 2 (from 1 place of second number) = 2 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 1 (from 10 place of first number) * 4 (from 10 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 1 (from 10 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 5000\n- 4 (from 100 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 4 (from 100 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 16000\n- 4 (from 100 place of first number) * 5 (from 100 place of second number) = 20 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 200000\n\nNow, add all these results together:\nThe sum of 18 + 360 + 4500 + 20 + 400 + 5000 + 800 + 16000 + 200000 = 227098."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 605 * 466?"}, {"role": "assistant", "content": "Here are the steps for multiplying 605 * 466 using the long multiplication method.\nStep 1: Break first number 605 into its individual digits: 6 (hundreds place), 0 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 466 into its individual digits: 4 (hundreds place), 6 (tens place), and 6 (ones place).\n- 5 (from 1 place of first number) * 6 (from 1 place of second number) = 30 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 5 (from 1 place of first number) * 6 (from 10 place of second number) = 30 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 300\n- 5 (from 1 place of first number) * 4 (from 100 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 0 (from 10 place of first number) * 6 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 6 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 4 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 6 (from 100 place of first number) * 6 (from 1 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3600\n- 6 (from 100 place of first number) * 6 (from 10 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 36000\n- 6 (from 100 place of first number) * 4 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 30 + 300 + 2000 + 0 + 0 + 0 + 3600 + 36000 + 240000 = 281930."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 191 * 246?"}, {"role": "assistant", "content": "Here are the steps for multiplying 191 * 246 using the long multiplication method.\nStep 1: Break first number 191 into its individual digits: 1 (hundreds place), 9 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 246 into its individual digits: 2 (hundreds place), 4 (tens place), and 6 (ones place).\n- 1 (from 1 place of first number) * 6 (from 1 place of second number) = 6 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 6\n- 1 (from 1 place of first number) * 4 (from 10 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 40\n- 1 (from 1 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 200\n- 9 (from 10 place of first number) * 6 (from 1 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 540\n- 9 (from 10 place of first number) * 4 (from 10 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3600\n- 9 (from 10 place of first number) * 2 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 1 (from 100 place of first number) * 6 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 1 (from 100 place of first number) * 4 (from 10 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 1 (from 100 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n\nNow, add all these results together:\nThe sum of 6 + 40 + 200 + 540 + 3600 + 18000 + 600 + 4000 + 20000 = 46986."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 999 * 763?"}, {"role": "assistant", "content": "Here are the steps for multiplying 999 * 763 using the long multiplication method.\nStep 1: Break first number 999 into its individual digits: 9 (hundreds place), 9 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 763 into its individual digits: 7 (hundreds place), 6 (tens place), and 3 (ones place).\n- 9 (from 1 place of first number) * 3 (from 1 place of second number) = 27 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 27\n- 9 (from 1 place of first number) * 6 (from 10 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 540\n- 9 (from 1 place of first number) * 7 (from 100 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 6300\n- 9 (from 10 place of first number) * 3 (from 1 place of second number) = 27 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 270\n- 9 (from 10 place of first number) * 6 (from 10 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5400\n- 9 (from 10 place of first number) * 7 (from 100 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 63000\n- 9 (from 100 place of first number) * 3 (from 1 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2700\n- 9 (from 100 place of first number) * 6 (from 10 place of second number) = 54 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 54000\n- 9 (from 100 place of first number) * 7 (from 100 place of second number) = 63 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 630000\n\nNow, add all these results together:\nThe sum of 27 + 540 + 6300 + 270 + 5400 + 63000 + 2700 + 54000 + 630000 = 762237."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 788 * 188?"}, {"role": "assistant", "content": "Here are the steps for multiplying 788 * 188 using the long multiplication method.\nStep 1: Break first number 788 into its individual digits: 7 (hundreds place), 8 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 188 into its individual digits: 1 (hundreds place), 8 (tens place), and 8 (ones place).\n- 8 (from 1 place of first number) * 8 (from 1 place of second number) = 64 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 64\n- 8 (from 1 place of first number) * 8 (from 10 place of second number) = 64 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 640\n- 8 (from 1 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 8 (from 10 place of first number) * 8 (from 1 place of second number) = 64 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 640\n- 8 (from 10 place of first number) * 8 (from 10 place of second number) = 64 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 6400\n- 8 (from 10 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 7 (from 100 place of first number) * 8 (from 1 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 5600\n- 7 (from 100 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 56000\n- 7 (from 100 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 70000\n\nNow, add all these results together:\nThe sum of 64 + 640 + 800 + 640 + 6400 + 8000 + 5600 + 56000 + 70000 = 148144."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 905 * 573?"}, {"role": "assistant", "content": "Here are the steps for multiplying 905 * 573 using the long multiplication method.\nStep 1: Break first number 905 into its individual digits: 9 (hundreds place), 0 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 573 into its individual digits: 5 (hundreds place), 7 (tens place), and 3 (ones place).\n- 5 (from 1 place of first number) * 3 (from 1 place of second number) = 15 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 15\n- 5 (from 1 place of first number) * 7 (from 10 place of second number) = 35 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 350\n- 5 (from 1 place of first number) * 5 (from 100 place of second number) = 25 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2500\n- 0 (from 10 place of first number) * 3 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 7 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 5 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 9 (from 100 place of first number) * 3 (from 1 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2700\n- 9 (from 100 place of first number) * 7 (from 10 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 63000\n- 9 (from 100 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 450000\n\nNow, add all these results together:\nThe sum of 15 + 350 + 2500 + 0 + 0 + 0 + 2700 + 63000 + 450000 = 518565."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 628 * 808?"}, {"role": "assistant", "content": "Here are the steps for multiplying 628 * 808 using the long multiplication method.\nStep 1: Break first number 628 into its individual digits: 6 (hundreds place), 2 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 808 into its individual digits: 8 (hundreds place), 0 (tens place), and 8 (ones place).\n- 8 (from 1 place of first number) * 8 (from 1 place of second number) = 64 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 64\n- 8 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 8 (from 1 place of first number) * 8 (from 100 place of second number) = 64 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 6400\n- 2 (from 10 place of first number) * 8 (from 1 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 160\n- 2 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 2 (from 10 place of first number) * 8 (from 100 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 16000\n- 6 (from 100 place of first number) * 8 (from 1 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4800\n- 6 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 6 (from 100 place of first number) * 8 (from 100 place of second number) = 48 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 480000\n\nNow, add all these results together:\nThe sum of 64 + 0 + 6400 + 160 + 0 + 16000 + 4800 + 0 + 480000 = 507424."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 773 * 104?"}, {"role": "assistant", "content": "Here are the steps for multiplying 773 * 104 using the long multiplication method.\nStep 1: Break first number 773 into its individual digits: 7 (hundreds place), 7 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 104 into its individual digits: 1 (hundreds place), 0 (tens place), and 4 (ones place).\n- 3 (from 1 place of first number) * 4 (from 1 place of second number) = 12 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 12\n- 3 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 3 (from 1 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 300\n- 7 (from 10 place of first number) * 4 (from 1 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 280\n- 7 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 7 (from 10 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 7000\n- 7 (from 100 place of first number) * 4 (from 1 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2800\n- 7 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 7 (from 100 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 70000\n\nNow, add all these results together:\nThe sum of 12 + 0 + 300 + 280 + 0 + 7000 + 2800 + 0 + 70000 = 80392."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 539 * 823?"}, {"role": "assistant", "content": "Here are the steps for multiplying 539 * 823 using the long multiplication method.\nStep 1: Break first number 539 into its individual digits: 5 (hundreds place), 3 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 823 into its individual digits: 8 (hundreds place), 2 (tens place), and 3 (ones place).\n- 9 (from 1 place of first number) * 3 (from 1 place of second number) = 27 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 27\n- 9 (from 1 place of first number) * 2 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 9 (from 1 place of first number) * 8 (from 100 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 7200\n- 3 (from 10 place of first number) * 3 (from 1 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 90\n- 3 (from 10 place of first number) * 2 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 3 (from 10 place of first number) * 8 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 5 (from 100 place of first number) * 3 (from 1 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1500\n- 5 (from 100 place of first number) * 2 (from 10 place of second number) = 10 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 10000\n- 5 (from 100 place of first number) * 8 (from 100 place of second number) = 40 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 400000\n\nNow, add all these results together:\nThe sum of 27 + 180 + 7200 + 90 + 600 + 24000 + 1500 + 10000 + 400000 = 443597."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 214 * 928?"}, {"role": "assistant", "content": "Here are the steps for multiplying 214 * 928 using the long multiplication method.\nStep 1: Break first number 214 into its individual digits: 2 (hundreds place), 1 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 928 into its individual digits: 9 (hundreds place), 2 (tens place), and 8 (ones place).\n- 4 (from 1 place of first number) * 8 (from 1 place of second number) = 32 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 32\n- 4 (from 1 place of first number) * 2 (from 10 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 80\n- 4 (from 1 place of first number) * 9 (from 100 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3600\n- 1 (from 10 place of first number) * 8 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 1 (from 10 place of first number) * 2 (from 10 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 200\n- 1 (from 10 place of first number) * 9 (from 100 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 9000\n- 2 (from 100 place of first number) * 8 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 2 (from 100 place of first number) * 2 (from 10 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 2 (from 100 place of first number) * 9 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 32 + 80 + 3600 + 80 + 200 + 9000 + 1600 + 4000 + 180000 = 198592."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 662 * 600?"}, {"role": "assistant", "content": "Here are the steps for multiplying 662 * 600 using the long multiplication method.\nStep 1: Break first number 662 into its individual digits: 6 (hundreds place), 6 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 600 into its individual digits: 6 (hundreds place), 0 (tens place), and 0 (ones place).\n- 2 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 2 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 2 (from 1 place of first number) * 6 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 6 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 6 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 6 (from 10 place of first number) * 6 (from 100 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 36000\n- 6 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 6 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 6 (from 100 place of first number) * 6 (from 100 place of second number) = 36 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 360000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 1200 + 0 + 0 + 36000 + 0 + 0 + 360000 = 397200."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 806 * 877?"}, {"role": "assistant", "content": "Here are the steps for multiplying 806 * 877 using the long multiplication method.\nStep 1: Break first number 806 into its individual digits: 8 (hundreds place), 0 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 877 into its individual digits: 8 (hundreds place), 7 (tens place), and 7 (ones place).\n- 6 (from 1 place of first number) * 7 (from 1 place of second number) = 42 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 42\n- 6 (from 1 place of first number) * 7 (from 10 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 420\n- 6 (from 1 place of first number) * 8 (from 100 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4800\n- 0 (from 10 place of first number) * 7 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 7 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 8 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 8 (from 100 place of first number) * 7 (from 1 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 5600\n- 8 (from 100 place of first number) * 7 (from 10 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 56000\n- 8 (from 100 place of first number) * 8 (from 100 place of second number) = 64 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 640000\n\nNow, add all these results together:\nThe sum of 42 + 420 + 4800 + 0 + 0 + 0 + 5600 + 56000 + 640000 = 706862."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 987 * 331?"}, {"role": "assistant", "content": "Here are the steps for multiplying 987 * 331 using the long multiplication method.\nStep 1: Break first number 987 into its individual digits: 9 (hundreds place), 8 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 331 into its individual digits: 3 (hundreds place), 3 (tens place), and 1 (ones place).\n- 7 (from 1 place of first number) * 1 (from 1 place of second number) = 7 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 7\n- 7 (from 1 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 210\n- 7 (from 1 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2100\n- 8 (from 10 place of first number) * 1 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 8 (from 10 place of first number) * 3 (from 10 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2400\n- 8 (from 10 place of first number) * 3 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 9 (from 100 place of first number) * 1 (from 1 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 900\n- 9 (from 100 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 27000\n- 9 (from 100 place of first number) * 3 (from 100 place of second number) = 27 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 270000\n\nNow, add all these results together:\nThe sum of 7 + 210 + 2100 + 80 + 2400 + 24000 + 900 + 27000 + 270000 = 326697."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 241 * 589?"}, {"role": "assistant", "content": "Here are the steps for multiplying 241 * 589 using the long multiplication method.\nStep 1: Break first number 241 into its individual digits: 2 (hundreds place), 4 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 589 into its individual digits: 5 (hundreds place), 8 (tens place), and 9 (ones place).\n- 1 (from 1 place of first number) * 9 (from 1 place of second number) = 9 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 9\n- 1 (from 1 place of first number) * 8 (from 10 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 80\n- 1 (from 1 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 500\n- 4 (from 10 place of first number) * 9 (from 1 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 360\n- 4 (from 10 place of first number) * 8 (from 10 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3200\n- 4 (from 10 place of first number) * 5 (from 100 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n- 2 (from 100 place of first number) * 9 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 2 (from 100 place of first number) * 8 (from 10 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 16000\n- 2 (from 100 place of first number) * 5 (from 100 place of second number) = 10 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 100000\n\nNow, add all these results together:\nThe sum of 9 + 80 + 500 + 360 + 3200 + 20000 + 1800 + 16000 + 100000 = 141949."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 649 * 496?"}, {"role": "assistant", "content": "Here are the steps for multiplying 649 * 496 using the long multiplication method.\nStep 1: Break first number 649 into its individual digits: 6 (hundreds place), 4 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 496 into its individual digits: 4 (hundreds place), 9 (tens place), and 6 (ones place).\n- 9 (from 1 place of first number) * 6 (from 1 place of second number) = 54 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 54\n- 9 (from 1 place of first number) * 9 (from 10 place of second number) = 81 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 810\n- 9 (from 1 place of first number) * 4 (from 100 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3600\n- 4 (from 10 place of first number) * 6 (from 1 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 240\n- 4 (from 10 place of first number) * 9 (from 10 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3600\n- 4 (from 10 place of first number) * 4 (from 100 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 16000\n- 6 (from 100 place of first number) * 6 (from 1 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3600\n- 6 (from 100 place of first number) * 9 (from 10 place of second number) = 54 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 54000\n- 6 (from 100 place of first number) * 4 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 54 + 810 + 3600 + 240 + 3600 + 16000 + 3600 + 54000 + 240000 = 321904."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 655 * 701?"}, {"role": "assistant", "content": "Here are the steps for multiplying 655 * 701 using the long multiplication method.\nStep 1: Break first number 655 into its individual digits: 6 (hundreds place), 5 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 701 into its individual digits: 7 (hundreds place), 0 (tens place), and 1 (ones place).\n- 5 (from 1 place of first number) * 1 (from 1 place of second number) = 5 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 5\n- 5 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 5 (from 1 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3500\n- 5 (from 10 place of first number) * 1 (from 1 place of second number) = 5 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 50\n- 5 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 5 (from 10 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 35000\n- 6 (from 100 place of first number) * 1 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 6 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 6 (from 100 place of first number) * 7 (from 100 place of second number) = 42 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 420000\n\nNow, add all these results together:\nThe sum of 5 + 0 + 3500 + 50 + 0 + 35000 + 600 + 0 + 420000 = 459155."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 260 * 281?"}, {"role": "assistant", "content": "Here are the steps for multiplying 260 * 281 using the long multiplication method.\nStep 1: Break first number 260 into its individual digits: 2 (hundreds place), 6 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 281 into its individual digits: 2 (hundreds place), 8 (tens place), and 1 (ones place).\n- 0 (from 1 place of first number) * 1 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 8 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 2 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 6 (from 10 place of first number) * 1 (from 1 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 60\n- 6 (from 10 place of first number) * 8 (from 10 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4800\n- 6 (from 10 place of first number) * 2 (from 100 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 12000\n- 2 (from 100 place of first number) * 1 (from 1 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 200\n- 2 (from 100 place of first number) * 8 (from 10 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 16000\n- 2 (from 100 place of first number) * 2 (from 100 place of second number) = 4 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 60 + 4800 + 12000 + 200 + 16000 + 40000 = 73060."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 998 * 296?"}, {"role": "assistant", "content": "Here are the steps for multiplying 998 * 296 using the long multiplication method.\nStep 1: Break first number 998 into its individual digits: 9 (hundreds place), 9 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 296 into its individual digits: 2 (hundreds place), 9 (tens place), and 6 (ones place).\n- 8 (from 1 place of first number) * 6 (from 1 place of second number) = 48 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 48\n- 8 (from 1 place of first number) * 9 (from 10 place of second number) = 72 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 720\n- 8 (from 1 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 9 (from 10 place of first number) * 6 (from 1 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 540\n- 9 (from 10 place of first number) * 9 (from 10 place of second number) = 81 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 8100\n- 9 (from 10 place of first number) * 2 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 9 (from 100 place of first number) * 6 (from 1 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 5400\n- 9 (from 100 place of first number) * 9 (from 10 place of second number) = 81 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 81000\n- 9 (from 100 place of first number) * 2 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 48 + 720 + 1600 + 540 + 8100 + 18000 + 5400 + 81000 + 180000 = 295408."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 991 * 804?"}, {"role": "assistant", "content": "Here are the steps for multiplying 991 * 804 using the long multiplication method.\nStep 1: Break first number 991 into its individual digits: 9 (hundreds place), 9 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 804 into its individual digits: 8 (hundreds place), 0 (tens place), and 4 (ones place).\n- 1 (from 1 place of first number) * 4 (from 1 place of second number) = 4 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 4\n- 1 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 1 (from 1 place of first number) * 8 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 9 (from 10 place of first number) * 4 (from 1 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 360\n- 9 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 9 (from 10 place of first number) * 8 (from 100 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 72000\n- 9 (from 100 place of first number) * 4 (from 1 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3600\n- 9 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 9 (from 100 place of first number) * 8 (from 100 place of second number) = 72 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 720000\n\nNow, add all these results together:\nThe sum of 4 + 0 + 800 + 360 + 0 + 72000 + 3600 + 0 + 720000 = 796764."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 164 * 885?"}, {"role": "assistant", "content": "Here are the steps for multiplying 164 * 885 using the long multiplication method.\nStep 1: Break first number 164 into its individual digits: 1 (hundreds place), 6 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 885 into its individual digits: 8 (hundreds place), 8 (tens place), and 5 (ones place).\n- 4 (from 1 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 4 (from 1 place of first number) * 8 (from 10 place of second number) = 32 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 320\n- 4 (from 1 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3200\n- 6 (from 10 place of first number) * 5 (from 1 place of second number) = 30 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 6 (from 10 place of first number) * 8 (from 10 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4800\n- 6 (from 10 place of first number) * 8 (from 100 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 48000\n- 1 (from 100 place of first number) * 5 (from 1 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 500\n- 1 (from 100 place of first number) * 8 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 1 (from 100 place of first number) * 8 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 20 + 320 + 3200 + 300 + 4800 + 48000 + 500 + 8000 + 80000 = 145140."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 743 * 671?"}, {"role": "assistant", "content": "Here are the steps for multiplying 743 * 671 using the long multiplication method.\nStep 1: Break first number 743 into its individual digits: 7 (hundreds place), 4 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 671 into its individual digits: 6 (hundreds place), 7 (tens place), and 1 (ones place).\n- 3 (from 1 place of first number) * 1 (from 1 place of second number) = 3 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 3\n- 3 (from 1 place of first number) * 7 (from 10 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 210\n- 3 (from 1 place of first number) * 6 (from 100 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1800\n- 4 (from 10 place of first number) * 1 (from 1 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 4 (from 10 place of first number) * 7 (from 10 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2800\n- 4 (from 10 place of first number) * 6 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 7 (from 100 place of first number) * 1 (from 1 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 700\n- 7 (from 100 place of first number) * 7 (from 10 place of second number) = 49 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 49000\n- 7 (from 100 place of first number) * 6 (from 100 place of second number) = 42 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 420000\n\nNow, add all these results together:\nThe sum of 3 + 210 + 1800 + 40 + 2800 + 24000 + 700 + 49000 + 420000 = 498553."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 928 * 450?"}, {"role": "assistant", "content": "Here are the steps for multiplying 928 * 450 using the long multiplication method.\nStep 1: Break first number 928 into its individual digits: 9 (hundreds place), 2 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 450 into its individual digits: 4 (hundreds place), 5 (tens place), and 0 (ones place).\n- 8 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 1 place of first number) * 5 (from 10 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 8 (from 1 place of first number) * 4 (from 100 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3200\n- 2 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 2 (from 10 place of first number) * 5 (from 10 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1000\n- 2 (from 10 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 9 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 9 (from 100 place of first number) * 5 (from 10 place of second number) = 45 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 45000\n- 9 (from 100 place of first number) * 4 (from 100 place of second number) = 36 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 360000\n\nNow, add all these results together:\nThe sum of 0 + 400 + 3200 + 0 + 1000 + 8000 + 0 + 45000 + 360000 = 417600."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 111 * 375?"}, {"role": "assistant", "content": "Here are the steps for multiplying 111 * 375 using the long multiplication method.\nStep 1: Break first number 111 into its individual digits: 1 (hundreds place), 1 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 375 into its individual digits: 3 (hundreds place), 7 (tens place), and 5 (ones place).\n- 1 (from 1 place of first number) * 5 (from 1 place of second number) = 5 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 5\n- 1 (from 1 place of first number) * 7 (from 10 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 70\n- 1 (from 1 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 300\n- 1 (from 10 place of first number) * 5 (from 1 place of second number) = 5 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 50\n- 1 (from 10 place of first number) * 7 (from 10 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 700\n- 1 (from 10 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 1 (from 100 place of first number) * 5 (from 1 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 500\n- 1 (from 100 place of first number) * 7 (from 10 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 7000\n- 1 (from 100 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n\nNow, add all these results together:\nThe sum of 5 + 70 + 300 + 50 + 700 + 3000 + 500 + 7000 + 30000 = 41625."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 584 * 701?"}, {"role": "assistant", "content": "Here are the steps for multiplying 584 * 701 using the long multiplication method.\nStep 1: Break first number 584 into its individual digits: 5 (hundreds place), 8 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 701 into its individual digits: 7 (hundreds place), 0 (tens place), and 1 (ones place).\n- 4 (from 1 place of first number) * 1 (from 1 place of second number) = 4 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 4\n- 4 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 4 (from 1 place of first number) * 7 (from 100 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2800\n- 8 (from 10 place of first number) * 1 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 8 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 8 (from 10 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 56000\n- 5 (from 100 place of first number) * 1 (from 1 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 500\n- 5 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 5 (from 100 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 350000\n\nNow, add all these results together:\nThe sum of 4 + 0 + 2800 + 80 + 0 + 56000 + 500 + 0 + 350000 = 409384."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 508 * 184?"}, {"role": "assistant", "content": "Here are the steps for multiplying 508 * 184 using the long multiplication method.\nStep 1: Break first number 508 into its individual digits: 5 (hundreds place), 0 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 184 into its individual digits: 1 (hundreds place), 8 (tens place), and 4 (ones place).\n- 8 (from 1 place of first number) * 4 (from 1 place of second number) = 32 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 32\n- 8 (from 1 place of first number) * 8 (from 10 place of second number) = 64 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 640\n- 8 (from 1 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 0 (from 10 place of first number) * 4 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 8 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 1 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 5 (from 100 place of first number) * 4 (from 1 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2000\n- 5 (from 100 place of first number) * 8 (from 10 place of second number) = 40 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 40000\n- 5 (from 100 place of first number) * 1 (from 100 place of second number) = 5 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 50000\n\nNow, add all these results together:\nThe sum of 32 + 640 + 800 + 0 + 0 + 0 + 2000 + 40000 + 50000 = 93472."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 915 * 810?"}, {"role": "assistant", "content": "Here are the steps for multiplying 915 * 810 using the long multiplication method.\nStep 1: Break first number 915 into its individual digits: 9 (hundreds place), 1 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 810 into its individual digits: 8 (hundreds place), 1 (tens place), and 0 (ones place).\n- 5 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 5 (from 1 place of first number) * 1 (from 10 place of second number) = 5 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 50\n- 5 (from 1 place of first number) * 8 (from 100 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 1 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 1 (from 10 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 1 (from 10 place of first number) * 8 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 9 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 9 (from 100 place of first number) * 1 (from 10 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 9000\n- 9 (from 100 place of first number) * 8 (from 100 place of second number) = 72 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 720000\n\nNow, add all these results together:\nThe sum of 0 + 50 + 4000 + 0 + 100 + 8000 + 0 + 9000 + 720000 = 741150."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 232 * 402?"}, {"role": "assistant", "content": "Here are the steps for multiplying 232 * 402 using the long multiplication method.\nStep 1: Break first number 232 into its individual digits: 2 (hundreds place), 3 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 402 into its individual digits: 4 (hundreds place), 0 (tens place), and 2 (ones place).\n- 2 (from 1 place of first number) * 2 (from 1 place of second number) = 4 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 4\n- 2 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 2 (from 1 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 3 (from 10 place of first number) * 2 (from 1 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 60\n- 3 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 3 (from 10 place of first number) * 4 (from 100 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 12000\n- 2 (from 100 place of first number) * 2 (from 1 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 2 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 2 (from 100 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 4 + 0 + 800 + 60 + 0 + 12000 + 400 + 0 + 80000 = 93264."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 517 * 336?"}, {"role": "assistant", "content": "Here are the steps for multiplying 517 * 336 using the long multiplication method.\nStep 1: Break first number 517 into its individual digits: 5 (hundreds place), 1 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 336 into its individual digits: 3 (hundreds place), 3 (tens place), and 6 (ones place).\n- 7 (from 1 place of first number) * 6 (from 1 place of second number) = 42 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 42\n- 7 (from 1 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 210\n- 7 (from 1 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2100\n- 1 (from 10 place of first number) * 6 (from 1 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 60\n- 1 (from 10 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 300\n- 1 (from 10 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 5 (from 100 place of first number) * 6 (from 1 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3000\n- 5 (from 100 place of first number) * 3 (from 10 place of second number) = 15 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 15000\n- 5 (from 100 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 150000\n\nNow, add all these results together:\nThe sum of 42 + 210 + 2100 + 60 + 300 + 3000 + 3000 + 15000 + 150000 = 173712."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 724 * 453?"}, {"role": "assistant", "content": "Here are the steps for multiplying 724 * 453 using the long multiplication method.\nStep 1: Break first number 724 into its individual digits: 7 (hundreds place), 2 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 453 into its individual digits: 4 (hundreds place), 5 (tens place), and 3 (ones place).\n- 4 (from 1 place of first number) * 3 (from 1 place of second number) = 12 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 12\n- 4 (from 1 place of first number) * 5 (from 10 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 200\n- 4 (from 1 place of first number) * 4 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 2 (from 10 place of first number) * 3 (from 1 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 60\n- 2 (from 10 place of first number) * 5 (from 10 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1000\n- 2 (from 10 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 7 (from 100 place of first number) * 3 (from 1 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2100\n- 7 (from 100 place of first number) * 5 (from 10 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 35000\n- 7 (from 100 place of first number) * 4 (from 100 place of second number) = 28 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 280000\n\nNow, add all these results together:\nThe sum of 12 + 200 + 1600 + 60 + 1000 + 8000 + 2100 + 35000 + 280000 = 327972."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 634 * 816?"}, {"role": "assistant", "content": "Here are the steps for multiplying 634 * 816 using the long multiplication method.\nStep 1: Break first number 634 into its individual digits: 6 (hundreds place), 3 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 816 into its individual digits: 8 (hundreds place), 1 (tens place), and 6 (ones place).\n- 4 (from 1 place of first number) * 6 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 4 (from 1 place of first number) * 1 (from 10 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 40\n- 4 (from 1 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3200\n- 3 (from 10 place of first number) * 6 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 3 (from 10 place of first number) * 1 (from 10 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 300\n- 3 (from 10 place of first number) * 8 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 6 (from 100 place of first number) * 6 (from 1 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3600\n- 6 (from 100 place of first number) * 1 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 6 (from 100 place of first number) * 8 (from 100 place of second number) = 48 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 480000\n\nNow, add all these results together:\nThe sum of 24 + 40 + 3200 + 180 + 300 + 24000 + 3600 + 6000 + 480000 = 517344."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 386 * 866?"}, {"role": "assistant", "content": "Here are the steps for multiplying 386 * 866 using the long multiplication method.\nStep 1: Break first number 386 into its individual digits: 3 (hundreds place), 8 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 866 into its individual digits: 8 (hundreds place), 6 (tens place), and 6 (ones place).\n- 6 (from 1 place of first number) * 6 (from 1 place of second number) = 36 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 36\n- 6 (from 1 place of first number) * 6 (from 10 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 360\n- 6 (from 1 place of first number) * 8 (from 100 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4800\n- 8 (from 10 place of first number) * 6 (from 1 place of second number) = 48 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 480\n- 8 (from 10 place of first number) * 6 (from 10 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4800\n- 8 (from 10 place of first number) * 8 (from 100 place of second number) = 64 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 64000\n- 3 (from 100 place of first number) * 6 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 3 (from 100 place of first number) * 6 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 3 (from 100 place of first number) * 8 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 36 + 360 + 4800 + 480 + 4800 + 64000 + 1800 + 18000 + 240000 = 334276."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 194 * 854?"}, {"role": "assistant", "content": "Here are the steps for multiplying 194 * 854 using the long multiplication method.\nStep 1: Break first number 194 into its individual digits: 1 (hundreds place), 9 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 854 into its individual digits: 8 (hundreds place), 5 (tens place), and 4 (ones place).\n- 4 (from 1 place of first number) * 4 (from 1 place of second number) = 16 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 16\n- 4 (from 1 place of first number) * 5 (from 10 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 200\n- 4 (from 1 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3200\n- 9 (from 10 place of first number) * 4 (from 1 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 360\n- 9 (from 10 place of first number) * 5 (from 10 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4500\n- 9 (from 10 place of first number) * 8 (from 100 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 72000\n- 1 (from 100 place of first number) * 4 (from 1 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 1 (from 100 place of first number) * 5 (from 10 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 5000\n- 1 (from 100 place of first number) * 8 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 16 + 200 + 3200 + 360 + 4500 + 72000 + 400 + 5000 + 80000 = 165676."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 788 * 250?"}, {"role": "assistant", "content": "Here are the steps for multiplying 788 * 250 using the long multiplication method.\nStep 1: Break first number 788 into its individual digits: 7 (hundreds place), 8 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 250 into its individual digits: 2 (hundreds place), 5 (tens place), and 0 (ones place).\n- 8 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 1 place of first number) * 5 (from 10 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 8 (from 1 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 8 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 10 place of first number) * 5 (from 10 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 8 (from 10 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 16000\n- 7 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 100 place of first number) * 5 (from 10 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 35000\n- 7 (from 100 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 140000\n\nNow, add all these results together:\nThe sum of 0 + 400 + 1600 + 0 + 4000 + 16000 + 0 + 35000 + 140000 = 197000."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 429 * 534?"}, {"role": "assistant", "content": "Here are the steps for multiplying 429 * 534 using the long multiplication method.\nStep 1: Break first number 429 into its individual digits: 4 (hundreds place), 2 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 534 into its individual digits: 5 (hundreds place), 3 (tens place), and 4 (ones place).\n- 9 (from 1 place of first number) * 4 (from 1 place of second number) = 36 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 36\n- 9 (from 1 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 270\n- 9 (from 1 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4500\n- 2 (from 10 place of first number) * 4 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 2 (from 10 place of first number) * 3 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 2 (from 10 place of first number) * 5 (from 100 place of second number) = 10 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 10000\n- 4 (from 100 place of first number) * 4 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 4 (from 100 place of first number) * 3 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 4 (from 100 place of first number) * 5 (from 100 place of second number) = 20 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 200000\n\nNow, add all these results together:\nThe sum of 36 + 270 + 4500 + 80 + 600 + 10000 + 1600 + 12000 + 200000 = 229086."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 432 * 985?"}, {"role": "assistant", "content": "Here are the steps for multiplying 432 * 985 using the long multiplication method.\nStep 1: Break first number 432 into its individual digits: 4 (hundreds place), 3 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 985 into its individual digits: 9 (hundreds place), 8 (tens place), and 5 (ones place).\n- 2 (from 1 place of first number) * 5 (from 1 place of second number) = 10 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 10\n- 2 (from 1 place of first number) * 8 (from 10 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 160\n- 2 (from 1 place of first number) * 9 (from 100 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1800\n- 3 (from 10 place of first number) * 5 (from 1 place of second number) = 15 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 150\n- 3 (from 10 place of first number) * 8 (from 10 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2400\n- 3 (from 10 place of first number) * 9 (from 100 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 27000\n- 4 (from 100 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2000\n- 4 (from 100 place of first number) * 8 (from 10 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 32000\n- 4 (from 100 place of first number) * 9 (from 100 place of second number) = 36 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 360000\n\nNow, add all these results together:\nThe sum of 10 + 160 + 1800 + 150 + 2400 + 27000 + 2000 + 32000 + 360000 = 425520."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 905 * 456?"}, {"role": "assistant", "content": "Here are the steps for multiplying 905 * 456 using the long multiplication method.\nStep 1: Break first number 905 into its individual digits: 9 (hundreds place), 0 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 456 into its individual digits: 4 (hundreds place), 5 (tens place), and 6 (ones place).\n- 5 (from 1 place of first number) * 6 (from 1 place of second number) = 30 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 5 (from 1 place of first number) * 5 (from 10 place of second number) = 25 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 250\n- 5 (from 1 place of first number) * 4 (from 100 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 0 (from 10 place of first number) * 6 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 5 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 4 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 9 (from 100 place of first number) * 6 (from 1 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 5400\n- 9 (from 100 place of first number) * 5 (from 10 place of second number) = 45 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 45000\n- 9 (from 100 place of first number) * 4 (from 100 place of second number) = 36 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 360000\n\nNow, add all these results together:\nThe sum of 30 + 250 + 2000 + 0 + 0 + 0 + 5400 + 45000 + 360000 = 412680."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 182 * 597?"}, {"role": "assistant", "content": "Here are the steps for multiplying 182 * 597 using the long multiplication method.\nStep 1: Break first number 182 into its individual digits: 1 (hundreds place), 8 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 597 into its individual digits: 5 (hundreds place), 9 (tens place), and 7 (ones place).\n- 2 (from 1 place of first number) * 7 (from 1 place of second number) = 14 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 14\n- 2 (from 1 place of first number) * 9 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 2 (from 1 place of first number) * 5 (from 100 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1000\n- 8 (from 10 place of first number) * 7 (from 1 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 560\n- 8 (from 10 place of first number) * 9 (from 10 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 7200\n- 8 (from 10 place of first number) * 5 (from 100 place of second number) = 40 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n- 1 (from 100 place of first number) * 7 (from 1 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 700\n- 1 (from 100 place of first number) * 9 (from 10 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 9000\n- 1 (from 100 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 50000\n\nNow, add all these results together:\nThe sum of 14 + 180 + 1000 + 560 + 7200 + 40000 + 700 + 9000 + 50000 = 108654."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 500 * 316?"}, {"role": "assistant", "content": "Here are the steps for multiplying 500 * 316 using the long multiplication method.\nStep 1: Break first number 500 into its individual digits: 5 (hundreds place), 0 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 316 into its individual digits: 3 (hundreds place), 1 (tens place), and 6 (ones place).\n- 0 (from 1 place of first number) * 6 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 1 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 3 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 0 (from 10 place of first number) * 6 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 1 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 3 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 5 (from 100 place of first number) * 6 (from 1 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3000\n- 5 (from 100 place of first number) * 1 (from 10 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 5000\n- 5 (from 100 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 150000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 0 + 0 + 0 + 3000 + 5000 + 150000 = 158000."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 646 * 862?"}, {"role": "assistant", "content": "Here are the steps for multiplying 646 * 862 using the long multiplication method.\nStep 1: Break first number 646 into its individual digits: 6 (hundreds place), 4 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 862 into its individual digits: 8 (hundreds place), 6 (tens place), and 2 (ones place).\n- 6 (from 1 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 12\n- 6 (from 1 place of first number) * 6 (from 10 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 360\n- 6 (from 1 place of first number) * 8 (from 100 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4800\n- 4 (from 10 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 4 (from 10 place of first number) * 6 (from 10 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2400\n- 4 (from 10 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 32000\n- 6 (from 100 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 6 (from 100 place of first number) * 6 (from 10 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 36000\n- 6 (from 100 place of first number) * 8 (from 100 place of second number) = 48 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 480000\n\nNow, add all these results together:\nThe sum of 12 + 360 + 4800 + 80 + 2400 + 32000 + 1200 + 36000 + 480000 = 556852."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 137 * 275?"}, {"role": "assistant", "content": "Here are the steps for multiplying 137 * 275 using the long multiplication method.\nStep 1: Break first number 137 into its individual digits: 1 (hundreds place), 3 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 275 into its individual digits: 2 (hundreds place), 7 (tens place), and 5 (ones place).\n- 7 (from 1 place of first number) * 5 (from 1 place of second number) = 35 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 35\n- 7 (from 1 place of first number) * 7 (from 10 place of second number) = 49 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 490\n- 7 (from 1 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1400\n- 3 (from 10 place of first number) * 5 (from 1 place of second number) = 15 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 150\n- 3 (from 10 place of first number) * 7 (from 10 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2100\n- 3 (from 10 place of first number) * 2 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 1 (from 100 place of first number) * 5 (from 1 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 500\n- 1 (from 100 place of first number) * 7 (from 10 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 7000\n- 1 (from 100 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n\nNow, add all these results together:\nThe sum of 35 + 490 + 1400 + 150 + 2100 + 6000 + 500 + 7000 + 20000 = 37675."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 154 * 571?"}, {"role": "assistant", "content": "Here are the steps for multiplying 154 * 571 using the long multiplication method.\nStep 1: Break first number 154 into its individual digits: 1 (hundreds place), 5 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 571 into its individual digits: 5 (hundreds place), 7 (tens place), and 1 (ones place).\n- 4 (from 1 place of first number) * 1 (from 1 place of second number) = 4 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 4\n- 4 (from 1 place of first number) * 7 (from 10 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 280\n- 4 (from 1 place of first number) * 5 (from 100 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 5 (from 10 place of first number) * 1 (from 1 place of second number) = 5 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 50\n- 5 (from 10 place of first number) * 7 (from 10 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3500\n- 5 (from 10 place of first number) * 5 (from 100 place of second number) = 25 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 25000\n- 1 (from 100 place of first number) * 1 (from 1 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 100\n- 1 (from 100 place of first number) * 7 (from 10 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 7000\n- 1 (from 100 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 50000\n\nNow, add all these results together:\nThe sum of 4 + 280 + 2000 + 50 + 3500 + 25000 + 100 + 7000 + 50000 = 87934."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 846 * 280?"}, {"role": "assistant", "content": "Here are the steps for multiplying 846 * 280 using the long multiplication method.\nStep 1: Break first number 846 into its individual digits: 8 (hundreds place), 4 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 280 into its individual digits: 2 (hundreds place), 8 (tens place), and 0 (ones place).\n- 6 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 6 (from 1 place of first number) * 8 (from 10 place of second number) = 48 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 480\n- 6 (from 1 place of first number) * 2 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 4 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 4 (from 10 place of first number) * 8 (from 10 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3200\n- 4 (from 10 place of first number) * 2 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 8 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 100 place of first number) * 8 (from 10 place of second number) = 64 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 64000\n- 8 (from 100 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 0 + 480 + 1200 + 0 + 3200 + 8000 + 0 + 64000 + 160000 = 236880."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 474 * 696?"}, {"role": "assistant", "content": "Here are the steps for multiplying 474 * 696 using the long multiplication method.\nStep 1: Break first number 474 into its individual digits: 4 (hundreds place), 7 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 696 into its individual digits: 6 (hundreds place), 9 (tens place), and 6 (ones place).\n- 4 (from 1 place of first number) * 6 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 4 (from 1 place of first number) * 9 (from 10 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 360\n- 4 (from 1 place of first number) * 6 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 7 (from 10 place of first number) * 6 (from 1 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 420\n- 7 (from 10 place of first number) * 9 (from 10 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 6300\n- 7 (from 10 place of first number) * 6 (from 100 place of second number) = 42 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 42000\n- 4 (from 100 place of first number) * 6 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 4 (from 100 place of first number) * 9 (from 10 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 36000\n- 4 (from 100 place of first number) * 6 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 24 + 360 + 2400 + 420 + 6300 + 42000 + 2400 + 36000 + 240000 = 329904."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 148 * 317?"}, {"role": "assistant", "content": "Here are the steps for multiplying 148 * 317 using the long multiplication method.\nStep 1: Break first number 148 into its individual digits: 1 (hundreds place), 4 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 317 into its individual digits: 3 (hundreds place), 1 (tens place), and 7 (ones place).\n- 8 (from 1 place of first number) * 7 (from 1 place of second number) = 56 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 56\n- 8 (from 1 place of first number) * 1 (from 10 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 80\n- 8 (from 1 place of first number) * 3 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 4 (from 10 place of first number) * 7 (from 1 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 280\n- 4 (from 10 place of first number) * 1 (from 10 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 4 (from 10 place of first number) * 3 (from 100 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 12000\n- 1 (from 100 place of first number) * 7 (from 1 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 700\n- 1 (from 100 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 1000\n- 1 (from 100 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n\nNow, add all these results together:\nThe sum of 56 + 80 + 2400 + 280 + 400 + 12000 + 700 + 1000 + 30000 = 46916."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 844 * 168?"}, {"role": "assistant", "content": "Here are the steps for multiplying 844 * 168 using the long multiplication method.\nStep 1: Break first number 844 into its individual digits: 8 (hundreds place), 4 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 168 into its individual digits: 1 (hundreds place), 6 (tens place), and 8 (ones place).\n- 4 (from 1 place of first number) * 8 (from 1 place of second number) = 32 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 32\n- 4 (from 1 place of first number) * 6 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 4 (from 1 place of first number) * 1 (from 100 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 400\n- 4 (from 10 place of first number) * 8 (from 1 place of second number) = 32 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 320\n- 4 (from 10 place of first number) * 6 (from 10 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2400\n- 4 (from 10 place of first number) * 1 (from 100 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 8 (from 100 place of first number) * 8 (from 1 place of second number) = 64 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 6400\n- 8 (from 100 place of first number) * 6 (from 10 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 48000\n- 8 (from 100 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 32 + 240 + 400 + 320 + 2400 + 4000 + 6400 + 48000 + 80000 = 141792."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 559 * 311?"}, {"role": "assistant", "content": "Here are the steps for multiplying 559 * 311 using the long multiplication method.\nStep 1: Break first number 559 into its individual digits: 5 (hundreds place), 5 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 311 into its individual digits: 3 (hundreds place), 1 (tens place), and 1 (ones place).\n- 9 (from 1 place of first number) * 1 (from 1 place of second number) = 9 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 9\n- 9 (from 1 place of first number) * 1 (from 10 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 90\n- 9 (from 1 place of first number) * 3 (from 100 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2700\n- 5 (from 10 place of first number) * 1 (from 1 place of second number) = 5 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 50\n- 5 (from 10 place of first number) * 1 (from 10 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 500\n- 5 (from 10 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 15000\n- 5 (from 100 place of first number) * 1 (from 1 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 500\n- 5 (from 100 place of first number) * 1 (from 10 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 5000\n- 5 (from 100 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 150000\n\nNow, add all these results together:\nThe sum of 9 + 90 + 2700 + 50 + 500 + 15000 + 500 + 5000 + 150000 = 173849."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 733 * 379?"}, {"role": "assistant", "content": "Here are the steps for multiplying 733 * 379 using the long multiplication method.\nStep 1: Break first number 733 into its individual digits: 7 (hundreds place), 3 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 379 into its individual digits: 3 (hundreds place), 7 (tens place), and 9 (ones place).\n- 3 (from 1 place of first number) * 9 (from 1 place of second number) = 27 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 27\n- 3 (from 1 place of first number) * 7 (from 10 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 210\n- 3 (from 1 place of first number) * 3 (from 100 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 900\n- 3 (from 10 place of first number) * 9 (from 1 place of second number) = 27 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 270\n- 3 (from 10 place of first number) * 7 (from 10 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2100\n- 3 (from 10 place of first number) * 3 (from 100 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 9000\n- 7 (from 100 place of first number) * 9 (from 1 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 6300\n- 7 (from 100 place of first number) * 7 (from 10 place of second number) = 49 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 49000\n- 7 (from 100 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 210000\n\nNow, add all these results together:\nThe sum of 27 + 210 + 900 + 270 + 2100 + 9000 + 6300 + 49000 + 210000 = 277807."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 697 * 985?"}, {"role": "assistant", "content": "Here are the steps for multiplying 697 * 985 using the long multiplication method.\nStep 1: Break first number 697 into its individual digits: 6 (hundreds place), 9 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 985 into its individual digits: 9 (hundreds place), 8 (tens place), and 5 (ones place).\n- 7 (from 1 place of first number) * 5 (from 1 place of second number) = 35 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 35\n- 7 (from 1 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 560\n- 7 (from 1 place of first number) * 9 (from 100 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 6300\n- 9 (from 10 place of first number) * 5 (from 1 place of second number) = 45 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 450\n- 9 (from 10 place of first number) * 8 (from 10 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 7200\n- 9 (from 10 place of first number) * 9 (from 100 place of second number) = 81 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 81000\n- 6 (from 100 place of first number) * 5 (from 1 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3000\n- 6 (from 100 place of first number) * 8 (from 10 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 48000\n- 6 (from 100 place of first number) * 9 (from 100 place of second number) = 54 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 540000\n\nNow, add all these results together:\nThe sum of 35 + 560 + 6300 + 450 + 7200 + 81000 + 3000 + 48000 + 540000 = 686545."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 761 * 163?"}, {"role": "assistant", "content": "Here are the steps for multiplying 761 * 163 using the long multiplication method.\nStep 1: Break first number 761 into its individual digits: 7 (hundreds place), 6 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 163 into its individual digits: 1 (hundreds place), 6 (tens place), and 3 (ones place).\n- 1 (from 1 place of first number) * 3 (from 1 place of second number) = 3 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 3\n- 1 (from 1 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 60\n- 1 (from 1 place of first number) * 1 (from 100 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 100\n- 6 (from 10 place of first number) * 3 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 6 (from 10 place of first number) * 6 (from 10 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3600\n- 6 (from 10 place of first number) * 1 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 7 (from 100 place of first number) * 3 (from 1 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2100\n- 7 (from 100 place of first number) * 6 (from 10 place of second number) = 42 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 42000\n- 7 (from 100 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 70000\n\nNow, add all these results together:\nThe sum of 3 + 60 + 100 + 180 + 3600 + 6000 + 2100 + 42000 + 70000 = 124043."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 839 * 401?"}, {"role": "assistant", "content": "Here are the steps for multiplying 839 * 401 using the long multiplication method.\nStep 1: Break first number 839 into its individual digits: 8 (hundreds place), 3 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 401 into its individual digits: 4 (hundreds place), 0 (tens place), and 1 (ones place).\n- 9 (from 1 place of first number) * 1 (from 1 place of second number) = 9 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 9\n- 9 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 9 (from 1 place of first number) * 4 (from 100 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3600\n- 3 (from 10 place of first number) * 1 (from 1 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 3 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 3 (from 10 place of first number) * 4 (from 100 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 12000\n- 8 (from 100 place of first number) * 1 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 8 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 8 (from 100 place of first number) * 4 (from 100 place of second number) = 32 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 320000\n\nNow, add all these results together:\nThe sum of 9 + 0 + 3600 + 30 + 0 + 12000 + 800 + 0 + 320000 = 336439."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 798 * 140?"}, {"role": "assistant", "content": "Here are the steps for multiplying 798 * 140 using the long multiplication method.\nStep 1: Break first number 798 into its individual digits: 7 (hundreds place), 9 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 140 into its individual digits: 1 (hundreds place), 4 (tens place), and 0 (ones place).\n- 8 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 1 place of first number) * 4 (from 10 place of second number) = 32 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 320\n- 8 (from 1 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 9 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 9 (from 10 place of first number) * 4 (from 10 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3600\n- 9 (from 10 place of first number) * 1 (from 100 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 9000\n- 7 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 100 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 28000\n- 7 (from 100 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 70000\n\nNow, add all these results together:\nThe sum of 0 + 320 + 800 + 0 + 3600 + 9000 + 0 + 28000 + 70000 = 111720."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 115 * 707?"}, {"role": "assistant", "content": "Here are the steps for multiplying 115 * 707 using the long multiplication method.\nStep 1: Break first number 115 into its individual digits: 1 (hundreds place), 1 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 707 into its individual digits: 7 (hundreds place), 0 (tens place), and 7 (ones place).\n- 5 (from 1 place of first number) * 7 (from 1 place of second number) = 35 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 35\n- 5 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 5 (from 1 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3500\n- 1 (from 10 place of first number) * 7 (from 1 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 70\n- 1 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 1 (from 10 place of first number) * 7 (from 100 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 7000\n- 1 (from 100 place of first number) * 7 (from 1 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 700\n- 1 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 1 (from 100 place of first number) * 7 (from 100 place of second number) = 7 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 70000\n\nNow, add all these results together:\nThe sum of 35 + 0 + 3500 + 70 + 0 + 7000 + 700 + 0 + 70000 = 81305."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 975 * 352?"}, {"role": "assistant", "content": "Here are the steps for multiplying 975 * 352 using the long multiplication method.\nStep 1: Break first number 975 into its individual digits: 9 (hundreds place), 7 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 352 into its individual digits: 3 (hundreds place), 5 (tens place), and 2 (ones place).\n- 5 (from 1 place of first number) * 2 (from 1 place of second number) = 10 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 10\n- 5 (from 1 place of first number) * 5 (from 10 place of second number) = 25 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 250\n- 5 (from 1 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1500\n- 7 (from 10 place of first number) * 2 (from 1 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 140\n- 7 (from 10 place of first number) * 5 (from 10 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3500\n- 7 (from 10 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 21000\n- 9 (from 100 place of first number) * 2 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 9 (from 100 place of first number) * 5 (from 10 place of second number) = 45 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 45000\n- 9 (from 100 place of first number) * 3 (from 100 place of second number) = 27 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 270000\n\nNow, add all these results together:\nThe sum of 10 + 250 + 1500 + 140 + 3500 + 21000 + 1800 + 45000 + 270000 = 343200."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 553 * 171?"}, {"role": "assistant", "content": "Here are the steps for multiplying 553 * 171 using the long multiplication method.\nStep 1: Break first number 553 into its individual digits: 5 (hundreds place), 5 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 171 into its individual digits: 1 (hundreds place), 7 (tens place), and 1 (ones place).\n- 3 (from 1 place of first number) * 1 (from 1 place of second number) = 3 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 3\n- 3 (from 1 place of first number) * 7 (from 10 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 210\n- 3 (from 1 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 300\n- 5 (from 10 place of first number) * 1 (from 1 place of second number) = 5 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 50\n- 5 (from 10 place of first number) * 7 (from 10 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3500\n- 5 (from 10 place of first number) * 1 (from 100 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 5000\n- 5 (from 100 place of first number) * 1 (from 1 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 500\n- 5 (from 100 place of first number) * 7 (from 10 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 35000\n- 5 (from 100 place of first number) * 1 (from 100 place of second number) = 5 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 50000\n\nNow, add all these results together:\nThe sum of 3 + 210 + 300 + 50 + 3500 + 5000 + 500 + 35000 + 50000 = 94563."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 253 * 892?"}, {"role": "assistant", "content": "Here are the steps for multiplying 253 * 892 using the long multiplication method.\nStep 1: Break first number 253 into its individual digits: 2 (hundreds place), 5 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 892 into its individual digits: 8 (hundreds place), 9 (tens place), and 2 (ones place).\n- 3 (from 1 place of first number) * 2 (from 1 place of second number) = 6 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 6\n- 3 (from 1 place of first number) * 9 (from 10 place of second number) = 27 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 270\n- 3 (from 1 place of first number) * 8 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 5 (from 10 place of first number) * 2 (from 1 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 100\n- 5 (from 10 place of first number) * 9 (from 10 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4500\n- 5 (from 10 place of first number) * 8 (from 100 place of second number) = 40 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n- 2 (from 100 place of first number) * 2 (from 1 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 2 (from 100 place of first number) * 9 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 2 (from 100 place of first number) * 8 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 6 + 270 + 2400 + 100 + 4500 + 40000 + 400 + 18000 + 160000 = 225676."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 196 * 718?"}, {"role": "assistant", "content": "Here are the steps for multiplying 196 * 718 using the long multiplication method.\nStep 1: Break first number 196 into its individual digits: 1 (hundreds place), 9 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 718 into its individual digits: 7 (hundreds place), 1 (tens place), and 8 (ones place).\n- 6 (from 1 place of first number) * 8 (from 1 place of second number) = 48 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 48\n- 6 (from 1 place of first number) * 1 (from 10 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 60\n- 6 (from 1 place of first number) * 7 (from 100 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4200\n- 9 (from 10 place of first number) * 8 (from 1 place of second number) = 72 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 720\n- 9 (from 10 place of first number) * 1 (from 10 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 900\n- 9 (from 10 place of first number) * 7 (from 100 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 63000\n- 1 (from 100 place of first number) * 8 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 1 (from 100 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 1000\n- 1 (from 100 place of first number) * 7 (from 100 place of second number) = 7 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 70000\n\nNow, add all these results together:\nThe sum of 48 + 60 + 4200 + 720 + 900 + 63000 + 800 + 1000 + 70000 = 140728."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 100 * 780?"}, {"role": "assistant", "content": "Here are the steps for multiplying 100 * 780 using the long multiplication method.\nStep 1: Break first number 100 into its individual digits: 1 (hundreds place), 0 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 780 into its individual digits: 7 (hundreds place), 8 (tens place), and 0 (ones place).\n- 0 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 8 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 7 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 0 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 8 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 7 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 1 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 1 (from 100 place of first number) * 8 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 1 (from 100 place of first number) * 7 (from 100 place of second number) = 7 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 70000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 0 + 0 + 0 + 0 + 8000 + 70000 = 78000."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 510 * 510?"}, {"role": "assistant", "content": "Here are the steps for multiplying 510 * 510 using the long multiplication method.\nStep 1: Break first number 510 into its individual digits: 5 (hundreds place), 1 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 510 into its individual digits: 5 (hundreds place), 1 (tens place), and 0 (ones place).\n- 0 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 1 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 5 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 1 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 1 (from 10 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 1 (from 10 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 5000\n- 5 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 5 (from 100 place of first number) * 1 (from 10 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 5000\n- 5 (from 100 place of first number) * 5 (from 100 place of second number) = 25 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 250000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 0 + 100 + 5000 + 0 + 5000 + 250000 = 260100."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 895 * 682?"}, {"role": "assistant", "content": "Here are the steps for multiplying 895 * 682 using the long multiplication method.\nStep 1: Break first number 895 into its individual digits: 8 (hundreds place), 9 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 682 into its individual digits: 6 (hundreds place), 8 (tens place), and 2 (ones place).\n- 5 (from 1 place of first number) * 2 (from 1 place of second number) = 10 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 10\n- 5 (from 1 place of first number) * 8 (from 10 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 5 (from 1 place of first number) * 6 (from 100 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 9 (from 10 place of first number) * 2 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 9 (from 10 place of first number) * 8 (from 10 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 7200\n- 9 (from 10 place of first number) * 6 (from 100 place of second number) = 54 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 54000\n- 8 (from 100 place of first number) * 2 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 8 (from 100 place of first number) * 8 (from 10 place of second number) = 64 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 64000\n- 8 (from 100 place of first number) * 6 (from 100 place of second number) = 48 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 480000\n\nNow, add all these results together:\nThe sum of 10 + 400 + 3000 + 180 + 7200 + 54000 + 1600 + 64000 + 480000 = 610390."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 629 * 257?"}, {"role": "assistant", "content": "Here are the steps for multiplying 629 * 257 using the long multiplication method.\nStep 1: Break first number 629 into its individual digits: 6 (hundreds place), 2 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 257 into its individual digits: 2 (hundreds place), 5 (tens place), and 7 (ones place).\n- 9 (from 1 place of first number) * 7 (from 1 place of second number) = 63 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 63\n- 9 (from 1 place of first number) * 5 (from 10 place of second number) = 45 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 450\n- 9 (from 1 place of first number) * 2 (from 100 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1800\n- 2 (from 10 place of first number) * 7 (from 1 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 140\n- 2 (from 10 place of first number) * 5 (from 10 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1000\n- 2 (from 10 place of first number) * 2 (from 100 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 6 (from 100 place of first number) * 7 (from 1 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4200\n- 6 (from 100 place of first number) * 5 (from 10 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 30000\n- 6 (from 100 place of first number) * 2 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 63 + 450 + 1800 + 140 + 1000 + 4000 + 4200 + 30000 + 120000 = 161653."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 338 * 243?"}, {"role": "assistant", "content": "Here are the steps for multiplying 338 * 243 using the long multiplication method.\nStep 1: Break first number 338 into its individual digits: 3 (hundreds place), 3 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 243 into its individual digits: 2 (hundreds place), 4 (tens place), and 3 (ones place).\n- 8 (from 1 place of first number) * 3 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 8 (from 1 place of first number) * 4 (from 10 place of second number) = 32 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 320\n- 8 (from 1 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 3 (from 10 place of first number) * 3 (from 1 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 90\n- 3 (from 10 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1200\n- 3 (from 10 place of first number) * 2 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 3 (from 100 place of first number) * 3 (from 1 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 900\n- 3 (from 100 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 3 (from 100 place of first number) * 2 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 24 + 320 + 1600 + 90 + 1200 + 6000 + 900 + 12000 + 60000 = 82134."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 374 * 930?"}, {"role": "assistant", "content": "Here are the steps for multiplying 374 * 930 using the long multiplication method.\nStep 1: Break first number 374 into its individual digits: 3 (hundreds place), 7 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 930 into its individual digits: 9 (hundreds place), 3 (tens place), and 0 (ones place).\n- 4 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 4 (from 1 place of first number) * 3 (from 10 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 120\n- 4 (from 1 place of first number) * 9 (from 100 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3600\n- 7 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 10 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2100\n- 7 (from 10 place of first number) * 9 (from 100 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 63000\n- 3 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 3 (from 100 place of first number) * 3 (from 10 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 9000\n- 3 (from 100 place of first number) * 9 (from 100 place of second number) = 27 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 270000\n\nNow, add all these results together:\nThe sum of 0 + 120 + 3600 + 0 + 2100 + 63000 + 0 + 9000 + 270000 = 347820."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 295 * 377?"}, {"role": "assistant", "content": "Here are the steps for multiplying 295 * 377 using the long multiplication method.\nStep 1: Break first number 295 into its individual digits: 2 (hundreds place), 9 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 377 into its individual digits: 3 (hundreds place), 7 (tens place), and 7 (ones place).\n- 5 (from 1 place of first number) * 7 (from 1 place of second number) = 35 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 35\n- 5 (from 1 place of first number) * 7 (from 10 place of second number) = 35 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 350\n- 5 (from 1 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1500\n- 9 (from 10 place of first number) * 7 (from 1 place of second number) = 63 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 630\n- 9 (from 10 place of first number) * 7 (from 10 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 6300\n- 9 (from 10 place of first number) * 3 (from 100 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 27000\n- 2 (from 100 place of first number) * 7 (from 1 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1400\n- 2 (from 100 place of first number) * 7 (from 10 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 14000\n- 2 (from 100 place of first number) * 3 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 35 + 350 + 1500 + 630 + 6300 + 27000 + 1400 + 14000 + 60000 = 111215."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 724 * 720?"}, {"role": "assistant", "content": "Here are the steps for multiplying 724 * 720 using the long multiplication method.\nStep 1: Break first number 724 into its individual digits: 7 (hundreds place), 2 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 720 into its individual digits: 7 (hundreds place), 2 (tens place), and 0 (ones place).\n- 4 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 4 (from 1 place of first number) * 2 (from 10 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 80\n- 4 (from 1 place of first number) * 7 (from 100 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2800\n- 2 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 2 (from 10 place of first number) * 2 (from 10 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 2 (from 10 place of first number) * 7 (from 100 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 14000\n- 7 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 100 place of first number) * 2 (from 10 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 14000\n- 7 (from 100 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 490000\n\nNow, add all these results together:\nThe sum of 0 + 80 + 2800 + 0 + 400 + 14000 + 0 + 14000 + 490000 = 521280."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 254 * 766?"}, {"role": "assistant", "content": "Here are the steps for multiplying 254 * 766 using the long multiplication method.\nStep 1: Break first number 254 into its individual digits: 2 (hundreds place), 5 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 766 into its individual digits: 7 (hundreds place), 6 (tens place), and 6 (ones place).\n- 4 (from 1 place of first number) * 6 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 4 (from 1 place of first number) * 6 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 4 (from 1 place of first number) * 7 (from 100 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2800\n- 5 (from 10 place of first number) * 6 (from 1 place of second number) = 30 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 5 (from 10 place of first number) * 6 (from 10 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 5 (from 10 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 35000\n- 2 (from 100 place of first number) * 6 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 2 (from 100 place of first number) * 6 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 2 (from 100 place of first number) * 7 (from 100 place of second number) = 14 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 140000\n\nNow, add all these results together:\nThe sum of 24 + 240 + 2800 + 300 + 3000 + 35000 + 1200 + 12000 + 140000 = 194564."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 907 * 528?"}, {"role": "assistant", "content": "Here are the steps for multiplying 907 * 528 using the long multiplication method.\nStep 1: Break first number 907 into its individual digits: 9 (hundreds place), 0 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 528 into its individual digits: 5 (hundreds place), 2 (tens place), and 8 (ones place).\n- 7 (from 1 place of first number) * 8 (from 1 place of second number) = 56 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 56\n- 7 (from 1 place of first number) * 2 (from 10 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 140\n- 7 (from 1 place of first number) * 5 (from 100 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3500\n- 0 (from 10 place of first number) * 8 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 2 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 5 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 9 (from 100 place of first number) * 8 (from 1 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 7200\n- 9 (from 100 place of first number) * 2 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 9 (from 100 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 450000\n\nNow, add all these results together:\nThe sum of 56 + 140 + 3500 + 0 + 0 + 0 + 7200 + 18000 + 450000 = 478896."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 892 * 766?"}, {"role": "assistant", "content": "Here are the steps for multiplying 892 * 766 using the long multiplication method.\nStep 1: Break first number 892 into its individual digits: 8 (hundreds place), 9 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 766 into its individual digits: 7 (hundreds place), 6 (tens place), and 6 (ones place).\n- 2 (from 1 place of first number) * 6 (from 1 place of second number) = 12 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 12\n- 2 (from 1 place of first number) * 6 (from 10 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 120\n- 2 (from 1 place of first number) * 7 (from 100 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1400\n- 9 (from 10 place of first number) * 6 (from 1 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 540\n- 9 (from 10 place of first number) * 6 (from 10 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5400\n- 9 (from 10 place of first number) * 7 (from 100 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 63000\n- 8 (from 100 place of first number) * 6 (from 1 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4800\n- 8 (from 100 place of first number) * 6 (from 10 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 48000\n- 8 (from 100 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 560000\n\nNow, add all these results together:\nThe sum of 12 + 120 + 1400 + 540 + 5400 + 63000 + 4800 + 48000 + 560000 = 683272."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 889 * 296?"}, {"role": "assistant", "content": "Here are the steps for multiplying 889 * 296 using the long multiplication method.\nStep 1: Break first number 889 into its individual digits: 8 (hundreds place), 8 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 296 into its individual digits: 2 (hundreds place), 9 (tens place), and 6 (ones place).\n- 9 (from 1 place of first number) * 6 (from 1 place of second number) = 54 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 54\n- 9 (from 1 place of first number) * 9 (from 10 place of second number) = 81 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 810\n- 9 (from 1 place of first number) * 2 (from 100 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1800\n- 8 (from 10 place of first number) * 6 (from 1 place of second number) = 48 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 480\n- 8 (from 10 place of first number) * 9 (from 10 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 7200\n- 8 (from 10 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 16000\n- 8 (from 100 place of first number) * 6 (from 1 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4800\n- 8 (from 100 place of first number) * 9 (from 10 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 72000\n- 8 (from 100 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 54 + 810 + 1800 + 480 + 7200 + 16000 + 4800 + 72000 + 160000 = 263144."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 676 * 500?"}, {"role": "assistant", "content": "Here are the steps for multiplying 676 * 500 using the long multiplication method.\nStep 1: Break first number 676 into its individual digits: 6 (hundreds place), 7 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 500 into its individual digits: 5 (hundreds place), 0 (tens place), and 0 (ones place).\n- 6 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 6 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 6 (from 1 place of first number) * 5 (from 100 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 7 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 7 (from 10 place of first number) * 5 (from 100 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 35000\n- 6 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 6 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 6 (from 100 place of first number) * 5 (from 100 place of second number) = 30 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 300000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 3000 + 0 + 0 + 35000 + 0 + 0 + 300000 = 338000."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 179 * 166?"}, {"role": "assistant", "content": "Here are the steps for multiplying 179 * 166 using the long multiplication method.\nStep 1: Break first number 179 into its individual digits: 1 (hundreds place), 7 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 166 into its individual digits: 1 (hundreds place), 6 (tens place), and 6 (ones place).\n- 9 (from 1 place of first number) * 6 (from 1 place of second number) = 54 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 54\n- 9 (from 1 place of first number) * 6 (from 10 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 540\n- 9 (from 1 place of first number) * 1 (from 100 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 900\n- 7 (from 10 place of first number) * 6 (from 1 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 420\n- 7 (from 10 place of first number) * 6 (from 10 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4200\n- 7 (from 10 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 7000\n- 1 (from 100 place of first number) * 6 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 1 (from 100 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 1 (from 100 place of first number) * 1 (from 100 place of second number) = 1 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 10000\n\nNow, add all these results together:\nThe sum of 54 + 540 + 900 + 420 + 4200 + 7000 + 600 + 6000 + 10000 = 29714."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 830 * 362?"}, {"role": "assistant", "content": "Here are the steps for multiplying 830 * 362 using the long multiplication method.\nStep 1: Break first number 830 into its individual digits: 8 (hundreds place), 3 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 362 into its individual digits: 3 (hundreds place), 6 (tens place), and 2 (ones place).\n- 0 (from 1 place of first number) * 2 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 6 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 3 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 3 (from 10 place of first number) * 2 (from 1 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 60\n- 3 (from 10 place of first number) * 6 (from 10 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1800\n- 3 (from 10 place of first number) * 3 (from 100 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 9000\n- 8 (from 100 place of first number) * 2 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 8 (from 100 place of first number) * 6 (from 10 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 48000\n- 8 (from 100 place of first number) * 3 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 60 + 1800 + 9000 + 1600 + 48000 + 240000 = 300460."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 360 * 693?"}, {"role": "assistant", "content": "Here are the steps for multiplying 360 * 693 using the long multiplication method.\nStep 1: Break first number 360 into its individual digits: 3 (hundreds place), 6 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 693 into its individual digits: 6 (hundreds place), 9 (tens place), and 3 (ones place).\n- 0 (from 1 place of first number) * 3 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 9 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 6 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 6 (from 10 place of first number) * 3 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 6 (from 10 place of first number) * 9 (from 10 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5400\n- 6 (from 10 place of first number) * 6 (from 100 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 36000\n- 3 (from 100 place of first number) * 3 (from 1 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 900\n- 3 (from 100 place of first number) * 9 (from 10 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 27000\n- 3 (from 100 place of first number) * 6 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 180 + 5400 + 36000 + 900 + 27000 + 180000 = 249480."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 310 * 548?"}, {"role": "assistant", "content": "Here are the steps for multiplying 310 * 548 using the long multiplication method.\nStep 1: Break first number 310 into its individual digits: 3 (hundreds place), 1 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 548 into its individual digits: 5 (hundreds place), 4 (tens place), and 8 (ones place).\n- 0 (from 1 place of first number) * 8 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 4 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 5 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 1 (from 10 place of first number) * 8 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 1 (from 10 place of first number) * 4 (from 10 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 1 (from 10 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 5000\n- 3 (from 100 place of first number) * 8 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 3 (from 100 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 3 (from 100 place of first number) * 5 (from 100 place of second number) = 15 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 150000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 80 + 400 + 5000 + 2400 + 12000 + 150000 = 169880."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 107 * 710?"}, {"role": "assistant", "content": "Here are the steps for multiplying 107 * 710 using the long multiplication method.\nStep 1: Break first number 107 into its individual digits: 1 (hundreds place), 0 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 710 into its individual digits: 7 (hundreds place), 1 (tens place), and 0 (ones place).\n- 7 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 1 place of first number) * 1 (from 10 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 70\n- 7 (from 1 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4900\n- 0 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 1 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 7 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 1 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 1 (from 100 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 1000\n- 1 (from 100 place of first number) * 7 (from 100 place of second number) = 7 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 70000\n\nNow, add all these results together:\nThe sum of 0 + 70 + 4900 + 0 + 0 + 0 + 0 + 1000 + 70000 = 75970."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 922 * 454?"}, {"role": "assistant", "content": "Here are the steps for multiplying 922 * 454 using the long multiplication method.\nStep 1: Break first number 922 into its individual digits: 9 (hundreds place), 2 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 454 into its individual digits: 4 (hundreds place), 5 (tens place), and 4 (ones place).\n- 2 (from 1 place of first number) * 4 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 2 (from 1 place of first number) * 5 (from 10 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 2 (from 1 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 2 (from 10 place of first number) * 4 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 2 (from 10 place of first number) * 5 (from 10 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1000\n- 2 (from 10 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 9 (from 100 place of first number) * 4 (from 1 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3600\n- 9 (from 100 place of first number) * 5 (from 10 place of second number) = 45 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 45000\n- 9 (from 100 place of first number) * 4 (from 100 place of second number) = 36 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 360000\n\nNow, add all these results together:\nThe sum of 8 + 100 + 800 + 80 + 1000 + 8000 + 3600 + 45000 + 360000 = 418588."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 179 * 968?"}, {"role": "assistant", "content": "Here are the steps for multiplying 179 * 968 using the long multiplication method.\nStep 1: Break first number 179 into its individual digits: 1 (hundreds place), 7 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 968 into its individual digits: 9 (hundreds place), 6 (tens place), and 8 (ones place).\n- 9 (from 1 place of first number) * 8 (from 1 place of second number) = 72 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 72\n- 9 (from 1 place of first number) * 6 (from 10 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 540\n- 9 (from 1 place of first number) * 9 (from 100 place of second number) = 81 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 8100\n- 7 (from 10 place of first number) * 8 (from 1 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 560\n- 7 (from 10 place of first number) * 6 (from 10 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4200\n- 7 (from 10 place of first number) * 9 (from 100 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 63000\n- 1 (from 100 place of first number) * 8 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 1 (from 100 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 1 (from 100 place of first number) * 9 (from 100 place of second number) = 9 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 90000\n\nNow, add all these results together:\nThe sum of 72 + 540 + 8100 + 560 + 4200 + 63000 + 800 + 6000 + 90000 = 173272."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 907 * 187?"}, {"role": "assistant", "content": "Here are the steps for multiplying 907 * 187 using the long multiplication method.\nStep 1: Break first number 907 into its individual digits: 9 (hundreds place), 0 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 187 into its individual digits: 1 (hundreds place), 8 (tens place), and 7 (ones place).\n- 7 (from 1 place of first number) * 7 (from 1 place of second number) = 49 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 49\n- 7 (from 1 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 560\n- 7 (from 1 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 700\n- 0 (from 10 place of first number) * 7 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 8 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 1 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 9 (from 100 place of first number) * 7 (from 1 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 6300\n- 9 (from 100 place of first number) * 8 (from 10 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 72000\n- 9 (from 100 place of first number) * 1 (from 100 place of second number) = 9 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 90000\n\nNow, add all these results together:\nThe sum of 49 + 560 + 700 + 0 + 0 + 0 + 6300 + 72000 + 90000 = 169609."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 250 * 130?"}, {"role": "assistant", "content": "Here are the steps for multiplying 250 * 130 using the long multiplication method.\nStep 1: Break first number 250 into its individual digits: 2 (hundreds place), 5 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 130 into its individual digits: 1 (hundreds place), 3 (tens place), and 0 (ones place).\n- 0 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 3 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 1 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 5 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 5 (from 10 place of first number) * 3 (from 10 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1500\n- 5 (from 10 place of first number) * 1 (from 100 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 5000\n- 2 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 2 (from 100 place of first number) * 3 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 2 (from 100 place of first number) * 1 (from 100 place of second number) = 2 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 0 + 1500 + 5000 + 0 + 6000 + 20000 = 32500."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 891 * 523?"}, {"role": "assistant", "content": "Here are the steps for multiplying 891 * 523 using the long multiplication method.\nStep 1: Break first number 891 into its individual digits: 8 (hundreds place), 9 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 523 into its individual digits: 5 (hundreds place), 2 (tens place), and 3 (ones place).\n- 1 (from 1 place of first number) * 3 (from 1 place of second number) = 3 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 3\n- 1 (from 1 place of first number) * 2 (from 10 place of second number) = 2 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 20\n- 1 (from 1 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 500\n- 9 (from 10 place of first number) * 3 (from 1 place of second number) = 27 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 270\n- 9 (from 10 place of first number) * 2 (from 10 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1800\n- 9 (from 10 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 45000\n- 8 (from 100 place of first number) * 3 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 8 (from 100 place of first number) * 2 (from 10 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 16000\n- 8 (from 100 place of first number) * 5 (from 100 place of second number) = 40 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 400000\n\nNow, add all these results together:\nThe sum of 3 + 20 + 500 + 270 + 1800 + 45000 + 2400 + 16000 + 400000 = 465993."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 272 * 102?"}, {"role": "assistant", "content": "Here are the steps for multiplying 272 * 102 using the long multiplication method.\nStep 1: Break first number 272 into its individual digits: 2 (hundreds place), 7 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 102 into its individual digits: 1 (hundreds place), 0 (tens place), and 2 (ones place).\n- 2 (from 1 place of first number) * 2 (from 1 place of second number) = 4 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 4\n- 2 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 2 (from 1 place of first number) * 1 (from 100 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 200\n- 7 (from 10 place of first number) * 2 (from 1 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 140\n- 7 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 7 (from 10 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 7000\n- 2 (from 100 place of first number) * 2 (from 1 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 2 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 2 (from 100 place of first number) * 1 (from 100 place of second number) = 2 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n\nNow, add all these results together:\nThe sum of 4 + 0 + 200 + 140 + 0 + 7000 + 400 + 0 + 20000 = 27744."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 218 * 747?"}, {"role": "assistant", "content": "Here are the steps for multiplying 218 * 747 using the long multiplication method.\nStep 1: Break first number 218 into its individual digits: 2 (hundreds place), 1 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 747 into its individual digits: 7 (hundreds place), 4 (tens place), and 7 (ones place).\n- 8 (from 1 place of first number) * 7 (from 1 place of second number) = 56 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 56\n- 8 (from 1 place of first number) * 4 (from 10 place of second number) = 32 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 320\n- 8 (from 1 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5600\n- 1 (from 10 place of first number) * 7 (from 1 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 70\n- 1 (from 10 place of first number) * 4 (from 10 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 1 (from 10 place of first number) * 7 (from 100 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 7000\n- 2 (from 100 place of first number) * 7 (from 1 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1400\n- 2 (from 100 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 2 (from 100 place of first number) * 7 (from 100 place of second number) = 14 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 140000\n\nNow, add all these results together:\nThe sum of 56 + 320 + 5600 + 70 + 400 + 7000 + 1400 + 8000 + 140000 = 162846."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 762 * 847?"}, {"role": "assistant", "content": "Here are the steps for multiplying 762 * 847 using the long multiplication method.\nStep 1: Break first number 762 into its individual digits: 7 (hundreds place), 6 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 847 into its individual digits: 8 (hundreds place), 4 (tens place), and 7 (ones place).\n- 2 (from 1 place of first number) * 7 (from 1 place of second number) = 14 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 14\n- 2 (from 1 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 80\n- 2 (from 1 place of first number) * 8 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 6 (from 10 place of first number) * 7 (from 1 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 420\n- 6 (from 10 place of first number) * 4 (from 10 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2400\n- 6 (from 10 place of first number) * 8 (from 100 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 48000\n- 7 (from 100 place of first number) * 7 (from 1 place of second number) = 49 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4900\n- 7 (from 100 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 28000\n- 7 (from 100 place of first number) * 8 (from 100 place of second number) = 56 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 560000\n\nNow, add all these results together:\nThe sum of 14 + 80 + 1600 + 420 + 2400 + 48000 + 4900 + 28000 + 560000 = 645414."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 666 * 394?"}, {"role": "assistant", "content": "Here are the steps for multiplying 666 * 394 using the long multiplication method.\nStep 1: Break first number 666 into its individual digits: 6 (hundreds place), 6 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 394 into its individual digits: 3 (hundreds place), 9 (tens place), and 4 (ones place).\n- 6 (from 1 place of first number) * 4 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 6 (from 1 place of first number) * 9 (from 10 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 540\n- 6 (from 1 place of first number) * 3 (from 100 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1800\n- 6 (from 10 place of first number) * 4 (from 1 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 240\n- 6 (from 10 place of first number) * 9 (from 10 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5400\n- 6 (from 10 place of first number) * 3 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 6 (from 100 place of first number) * 4 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 6 (from 100 place of first number) * 9 (from 10 place of second number) = 54 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 54000\n- 6 (from 100 place of first number) * 3 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 24 + 540 + 1800 + 240 + 5400 + 18000 + 2400 + 54000 + 180000 = 262404."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 993 * 641?"}, {"role": "assistant", "content": "Here are the steps for multiplying 993 * 641 using the long multiplication method.\nStep 1: Break first number 993 into its individual digits: 9 (hundreds place), 9 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 641 into its individual digits: 6 (hundreds place), 4 (tens place), and 1 (ones place).\n- 3 (from 1 place of first number) * 1 (from 1 place of second number) = 3 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 3\n- 3 (from 1 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 120\n- 3 (from 1 place of first number) * 6 (from 100 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1800\n- 9 (from 10 place of first number) * 1 (from 1 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 90\n- 9 (from 10 place of first number) * 4 (from 10 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3600\n- 9 (from 10 place of first number) * 6 (from 100 place of second number) = 54 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 54000\n- 9 (from 100 place of first number) * 1 (from 1 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 900\n- 9 (from 100 place of first number) * 4 (from 10 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 36000\n- 9 (from 100 place of first number) * 6 (from 100 place of second number) = 54 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 540000\n\nNow, add all these results together:\nThe sum of 3 + 120 + 1800 + 90 + 3600 + 54000 + 900 + 36000 + 540000 = 636513."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 604 * 457?"}, {"role": "assistant", "content": "Here are the steps for multiplying 604 * 457 using the long multiplication method.\nStep 1: Break first number 604 into its individual digits: 6 (hundreds place), 0 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 457 into its individual digits: 4 (hundreds place), 5 (tens place), and 7 (ones place).\n- 4 (from 1 place of first number) * 7 (from 1 place of second number) = 28 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 28\n- 4 (from 1 place of first number) * 5 (from 10 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 200\n- 4 (from 1 place of first number) * 4 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 0 (from 10 place of first number) * 7 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 5 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 4 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 6 (from 100 place of first number) * 7 (from 1 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4200\n- 6 (from 100 place of first number) * 5 (from 10 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 30000\n- 6 (from 100 place of first number) * 4 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 28 + 200 + 1600 + 0 + 0 + 0 + 4200 + 30000 + 240000 = 276028."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 953 * 310?"}, {"role": "assistant", "content": "Here are the steps for multiplying 953 * 310 using the long multiplication method.\nStep 1: Break first number 953 into its individual digits: 9 (hundreds place), 5 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 310 into its individual digits: 3 (hundreds place), 1 (tens place), and 0 (ones place).\n- 3 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 3 (from 1 place of first number) * 1 (from 10 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 30\n- 3 (from 1 place of first number) * 3 (from 100 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 900\n- 5 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 5 (from 10 place of first number) * 1 (from 10 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 500\n- 5 (from 10 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 15000\n- 9 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 9 (from 100 place of first number) * 1 (from 10 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 9000\n- 9 (from 100 place of first number) * 3 (from 100 place of second number) = 27 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 270000\n\nNow, add all these results together:\nThe sum of 0 + 30 + 900 + 0 + 500 + 15000 + 0 + 9000 + 270000 = 295430."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 321 * 433?"}, {"role": "assistant", "content": "Here are the steps for multiplying 321 * 433 using the long multiplication method.\nStep 1: Break first number 321 into its individual digits: 3 (hundreds place), 2 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 433 into its individual digits: 4 (hundreds place), 3 (tens place), and 3 (ones place).\n- 1 (from 1 place of first number) * 3 (from 1 place of second number) = 3 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 3\n- 1 (from 1 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 30\n- 1 (from 1 place of first number) * 4 (from 100 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 400\n- 2 (from 10 place of first number) * 3 (from 1 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 60\n- 2 (from 10 place of first number) * 3 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 2 (from 10 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 3 (from 100 place of first number) * 3 (from 1 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 900\n- 3 (from 100 place of first number) * 3 (from 10 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 9000\n- 3 (from 100 place of first number) * 4 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 3 + 30 + 400 + 60 + 600 + 8000 + 900 + 9000 + 120000 = 138993."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 583 * 451?"}, {"role": "assistant", "content": "Here are the steps for multiplying 583 * 451 using the long multiplication method.\nStep 1: Break first number 583 into its individual digits: 5 (hundreds place), 8 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 451 into its individual digits: 4 (hundreds place), 5 (tens place), and 1 (ones place).\n- 3 (from 1 place of first number) * 1 (from 1 place of second number) = 3 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 3\n- 3 (from 1 place of first number) * 5 (from 10 place of second number) = 15 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 150\n- 3 (from 1 place of first number) * 4 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 8 (from 10 place of first number) * 1 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 8 (from 10 place of first number) * 5 (from 10 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 8 (from 10 place of first number) * 4 (from 100 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 32000\n- 5 (from 100 place of first number) * 1 (from 1 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 500\n- 5 (from 100 place of first number) * 5 (from 10 place of second number) = 25 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 25000\n- 5 (from 100 place of first number) * 4 (from 100 place of second number) = 20 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 200000\n\nNow, add all these results together:\nThe sum of 3 + 150 + 1200 + 80 + 4000 + 32000 + 500 + 25000 + 200000 = 262933."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 229 * 968?"}, {"role": "assistant", "content": "Here are the steps for multiplying 229 * 968 using the long multiplication method.\nStep 1: Break first number 229 into its individual digits: 2 (hundreds place), 2 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 968 into its individual digits: 9 (hundreds place), 6 (tens place), and 8 (ones place).\n- 9 (from 1 place of first number) * 8 (from 1 place of second number) = 72 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 72\n- 9 (from 1 place of first number) * 6 (from 10 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 540\n- 9 (from 1 place of first number) * 9 (from 100 place of second number) = 81 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 8100\n- 2 (from 10 place of first number) * 8 (from 1 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 160\n- 2 (from 10 place of first number) * 6 (from 10 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1200\n- 2 (from 10 place of first number) * 9 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 2 (from 100 place of first number) * 8 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 2 (from 100 place of first number) * 6 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 2 (from 100 place of first number) * 9 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 72 + 540 + 8100 + 160 + 1200 + 18000 + 1600 + 12000 + 180000 = 221672."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 751 * 513?"}, {"role": "assistant", "content": "Here are the steps for multiplying 751 * 513 using the long multiplication method.\nStep 1: Break first number 751 into its individual digits: 7 (hundreds place), 5 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 513 into its individual digits: 5 (hundreds place), 1 (tens place), and 3 (ones place).\n- 1 (from 1 place of first number) * 3 (from 1 place of second number) = 3 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 3\n- 1 (from 1 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 10\n- 1 (from 1 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 500\n- 5 (from 10 place of first number) * 3 (from 1 place of second number) = 15 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 150\n- 5 (from 10 place of first number) * 1 (from 10 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 500\n- 5 (from 10 place of first number) * 5 (from 100 place of second number) = 25 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 25000\n- 7 (from 100 place of first number) * 3 (from 1 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2100\n- 7 (from 100 place of first number) * 1 (from 10 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 7000\n- 7 (from 100 place of first number) * 5 (from 100 place of second number) = 35 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 350000\n\nNow, add all these results together:\nThe sum of 3 + 10 + 500 + 150 + 500 + 25000 + 2100 + 7000 + 350000 = 385263."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 999 * 687?"}, {"role": "assistant", "content": "Here are the steps for multiplying 999 * 687 using the long multiplication method.\nStep 1: Break first number 999 into its individual digits: 9 (hundreds place), 9 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 687 into its individual digits: 6 (hundreds place), 8 (tens place), and 7 (ones place).\n- 9 (from 1 place of first number) * 7 (from 1 place of second number) = 63 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 63\n- 9 (from 1 place of first number) * 8 (from 10 place of second number) = 72 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 720\n- 9 (from 1 place of first number) * 6 (from 100 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5400\n- 9 (from 10 place of first number) * 7 (from 1 place of second number) = 63 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 630\n- 9 (from 10 place of first number) * 8 (from 10 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 7200\n- 9 (from 10 place of first number) * 6 (from 100 place of second number) = 54 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 54000\n- 9 (from 100 place of first number) * 7 (from 1 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 6300\n- 9 (from 100 place of first number) * 8 (from 10 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 72000\n- 9 (from 100 place of first number) * 6 (from 100 place of second number) = 54 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 540000\n\nNow, add all these results together:\nThe sum of 63 + 720 + 5400 + 630 + 7200 + 54000 + 6300 + 72000 + 540000 = 686313."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 184 * 130?"}, {"role": "assistant", "content": "Here are the steps for multiplying 184 * 130 using the long multiplication method.\nStep 1: Break first number 184 into its individual digits: 1 (hundreds place), 8 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 130 into its individual digits: 1 (hundreds place), 3 (tens place), and 0 (ones place).\n- 4 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 4 (from 1 place of first number) * 3 (from 10 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 120\n- 4 (from 1 place of first number) * 1 (from 100 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 400\n- 8 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 10 place of first number) * 3 (from 10 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2400\n- 8 (from 10 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 1 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 1 (from 100 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 1 (from 100 place of first number) * 1 (from 100 place of second number) = 1 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 10000\n\nNow, add all these results together:\nThe sum of 0 + 120 + 400 + 0 + 2400 + 8000 + 0 + 3000 + 10000 = 23920."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 152 * 219?"}, {"role": "assistant", "content": "Here are the steps for multiplying 152 * 219 using the long multiplication method.\nStep 1: Break first number 152 into its individual digits: 1 (hundreds place), 5 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 219 into its individual digits: 2 (hundreds place), 1 (tens place), and 9 (ones place).\n- 2 (from 1 place of first number) * 9 (from 1 place of second number) = 18 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 18\n- 2 (from 1 place of first number) * 1 (from 10 place of second number) = 2 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 20\n- 2 (from 1 place of first number) * 2 (from 100 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 400\n- 5 (from 10 place of first number) * 9 (from 1 place of second number) = 45 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 450\n- 5 (from 10 place of first number) * 1 (from 10 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 500\n- 5 (from 10 place of first number) * 2 (from 100 place of second number) = 10 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 10000\n- 1 (from 100 place of first number) * 9 (from 1 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 900\n- 1 (from 100 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 1000\n- 1 (from 100 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n\nNow, add all these results together:\nThe sum of 18 + 20 + 400 + 450 + 500 + 10000 + 900 + 1000 + 20000 = 33288."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 265 * 583?"}, {"role": "assistant", "content": "Here are the steps for multiplying 265 * 583 using the long multiplication method.\nStep 1: Break first number 265 into its individual digits: 2 (hundreds place), 6 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 583 into its individual digits: 5 (hundreds place), 8 (tens place), and 3 (ones place).\n- 5 (from 1 place of first number) * 3 (from 1 place of second number) = 15 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 15\n- 5 (from 1 place of first number) * 8 (from 10 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 5 (from 1 place of first number) * 5 (from 100 place of second number) = 25 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2500\n- 6 (from 10 place of first number) * 3 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 6 (from 10 place of first number) * 8 (from 10 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4800\n- 6 (from 10 place of first number) * 5 (from 100 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n- 2 (from 100 place of first number) * 3 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 2 (from 100 place of first number) * 8 (from 10 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 16000\n- 2 (from 100 place of first number) * 5 (from 100 place of second number) = 10 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 100000\n\nNow, add all these results together:\nThe sum of 15 + 400 + 2500 + 180 + 4800 + 30000 + 600 + 16000 + 100000 = 154495."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 247 * 146?"}, {"role": "assistant", "content": "Here are the steps for multiplying 247 * 146 using the long multiplication method.\nStep 1: Break first number 247 into its individual digits: 2 (hundreds place), 4 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 146 into its individual digits: 1 (hundreds place), 4 (tens place), and 6 (ones place).\n- 7 (from 1 place of first number) * 6 (from 1 place of second number) = 42 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 42\n- 7 (from 1 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 280\n- 7 (from 1 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 700\n- 4 (from 10 place of first number) * 6 (from 1 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 240\n- 4 (from 10 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1600\n- 4 (from 10 place of first number) * 1 (from 100 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 2 (from 100 place of first number) * 6 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 2 (from 100 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 2 (from 100 place of first number) * 1 (from 100 place of second number) = 2 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n\nNow, add all these results together:\nThe sum of 42 + 280 + 700 + 240 + 1600 + 4000 + 1200 + 8000 + 20000 = 36062."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 425 * 452?"}, {"role": "assistant", "content": "Here are the steps for multiplying 425 * 452 using the long multiplication method.\nStep 1: Break first number 425 into its individual digits: 4 (hundreds place), 2 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 452 into its individual digits: 4 (hundreds place), 5 (tens place), and 2 (ones place).\n- 5 (from 1 place of first number) * 2 (from 1 place of second number) = 10 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 10\n- 5 (from 1 place of first number) * 5 (from 10 place of second number) = 25 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 250\n- 5 (from 1 place of first number) * 4 (from 100 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 2 (from 10 place of first number) * 2 (from 1 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 2 (from 10 place of first number) * 5 (from 10 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1000\n- 2 (from 10 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 4 (from 100 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 4 (from 100 place of first number) * 5 (from 10 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 20000\n- 4 (from 100 place of first number) * 4 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 10 + 250 + 2000 + 40 + 1000 + 8000 + 800 + 20000 + 160000 = 192100."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 742 * 399?"}, {"role": "assistant", "content": "Here are the steps for multiplying 742 * 399 using the long multiplication method.\nStep 1: Break first number 742 into its individual digits: 7 (hundreds place), 4 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 399 into its individual digits: 3 (hundreds place), 9 (tens place), and 9 (ones place).\n- 2 (from 1 place of first number) * 9 (from 1 place of second number) = 18 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 18\n- 2 (from 1 place of first number) * 9 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 2 (from 1 place of first number) * 3 (from 100 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 600\n- 4 (from 10 place of first number) * 9 (from 1 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 360\n- 4 (from 10 place of first number) * 9 (from 10 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3600\n- 4 (from 10 place of first number) * 3 (from 100 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 12000\n- 7 (from 100 place of first number) * 9 (from 1 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 6300\n- 7 (from 100 place of first number) * 9 (from 10 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 63000\n- 7 (from 100 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 210000\n\nNow, add all these results together:\nThe sum of 18 + 180 + 600 + 360 + 3600 + 12000 + 6300 + 63000 + 210000 = 296058."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 370 * 946?"}, {"role": "assistant", "content": "Here are the steps for multiplying 370 * 946 using the long multiplication method.\nStep 1: Break first number 370 into its individual digits: 3 (hundreds place), 7 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 946 into its individual digits: 9 (hundreds place), 4 (tens place), and 6 (ones place).\n- 0 (from 1 place of first number) * 6 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 4 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 9 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 7 (from 10 place of first number) * 6 (from 1 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 420\n- 7 (from 10 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2800\n- 7 (from 10 place of first number) * 9 (from 100 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 63000\n- 3 (from 100 place of first number) * 6 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 3 (from 100 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 3 (from 100 place of first number) * 9 (from 100 place of second number) = 27 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 270000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 420 + 2800 + 63000 + 1800 + 12000 + 270000 = 350020."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 897 * 837?"}, {"role": "assistant", "content": "Here are the steps for multiplying 897 * 837 using the long multiplication method.\nStep 1: Break first number 897 into its individual digits: 8 (hundreds place), 9 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 837 into its individual digits: 8 (hundreds place), 3 (tens place), and 7 (ones place).\n- 7 (from 1 place of first number) * 7 (from 1 place of second number) = 49 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 49\n- 7 (from 1 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 210\n- 7 (from 1 place of first number) * 8 (from 100 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5600\n- 9 (from 10 place of first number) * 7 (from 1 place of second number) = 63 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 630\n- 9 (from 10 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2700\n- 9 (from 10 place of first number) * 8 (from 100 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 72000\n- 8 (from 100 place of first number) * 7 (from 1 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 5600\n- 8 (from 100 place of first number) * 3 (from 10 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 24000\n- 8 (from 100 place of first number) * 8 (from 100 place of second number) = 64 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 640000\n\nNow, add all these results together:\nThe sum of 49 + 210 + 5600 + 630 + 2700 + 72000 + 5600 + 24000 + 640000 = 750789."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 767 * 740?"}, {"role": "assistant", "content": "Here are the steps for multiplying 767 * 740 using the long multiplication method.\nStep 1: Break first number 767 into its individual digits: 7 (hundreds place), 6 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 740 into its individual digits: 7 (hundreds place), 4 (tens place), and 0 (ones place).\n- 7 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 1 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 280\n- 7 (from 1 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4900\n- 6 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 6 (from 10 place of first number) * 4 (from 10 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2400\n- 6 (from 10 place of first number) * 7 (from 100 place of second number) = 42 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 42000\n- 7 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 100 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 28000\n- 7 (from 100 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 490000\n\nNow, add all these results together:\nThe sum of 0 + 280 + 4900 + 0 + 2400 + 42000 + 0 + 28000 + 490000 = 567580."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 576 * 232?"}, {"role": "assistant", "content": "Here are the steps for multiplying 576 * 232 using the long multiplication method.\nStep 1: Break first number 576 into its individual digits: 5 (hundreds place), 7 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 232 into its individual digits: 2 (hundreds place), 3 (tens place), and 2 (ones place).\n- 6 (from 1 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 12\n- 6 (from 1 place of first number) * 3 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 6 (from 1 place of first number) * 2 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 7 (from 10 place of first number) * 2 (from 1 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 140\n- 7 (from 10 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2100\n- 7 (from 10 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 14000\n- 5 (from 100 place of first number) * 2 (from 1 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1000\n- 5 (from 100 place of first number) * 3 (from 10 place of second number) = 15 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 15000\n- 5 (from 100 place of first number) * 2 (from 100 place of second number) = 10 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 100000\n\nNow, add all these results together:\nThe sum of 12 + 180 + 1200 + 140 + 2100 + 14000 + 1000 + 15000 + 100000 = 133632."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 459 * 353?"}, {"role": "assistant", "content": "Here are the steps for multiplying 459 * 353 using the long multiplication method.\nStep 1: Break first number 459 into its individual digits: 4 (hundreds place), 5 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 353 into its individual digits: 3 (hundreds place), 5 (tens place), and 3 (ones place).\n- 9 (from 1 place of first number) * 3 (from 1 place of second number) = 27 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 27\n- 9 (from 1 place of first number) * 5 (from 10 place of second number) = 45 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 450\n- 9 (from 1 place of first number) * 3 (from 100 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2700\n- 5 (from 10 place of first number) * 3 (from 1 place of second number) = 15 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 150\n- 5 (from 10 place of first number) * 5 (from 10 place of second number) = 25 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2500\n- 5 (from 10 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 15000\n- 4 (from 100 place of first number) * 3 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 4 (from 100 place of first number) * 5 (from 10 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 20000\n- 4 (from 100 place of first number) * 3 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 27 + 450 + 2700 + 150 + 2500 + 15000 + 1200 + 20000 + 120000 = 162027."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 942 * 824?"}, {"role": "assistant", "content": "Here are the steps for multiplying 942 * 824 using the long multiplication method.\nStep 1: Break first number 942 into its individual digits: 9 (hundreds place), 4 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 824 into its individual digits: 8 (hundreds place), 2 (tens place), and 4 (ones place).\n- 2 (from 1 place of first number) * 4 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 2 (from 1 place of first number) * 2 (from 10 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 40\n- 2 (from 1 place of first number) * 8 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 4 (from 10 place of first number) * 4 (from 1 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 160\n- 4 (from 10 place of first number) * 2 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 4 (from 10 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 32000\n- 9 (from 100 place of first number) * 4 (from 1 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3600\n- 9 (from 100 place of first number) * 2 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 9 (from 100 place of first number) * 8 (from 100 place of second number) = 72 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 720000\n\nNow, add all these results together:\nThe sum of 8 + 40 + 1600 + 160 + 800 + 32000 + 3600 + 18000 + 720000 = 776208."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 488 * 303?"}, {"role": "assistant", "content": "Here are the steps for multiplying 488 * 303 using the long multiplication method.\nStep 1: Break first number 488 into its individual digits: 4 (hundreds place), 8 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 303 into its individual digits: 3 (hundreds place), 0 (tens place), and 3 (ones place).\n- 8 (from 1 place of first number) * 3 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 8 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 8 (from 1 place of first number) * 3 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 8 (from 10 place of first number) * 3 (from 1 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 240\n- 8 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 8 (from 10 place of first number) * 3 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 4 (from 100 place of first number) * 3 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 4 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 4 (from 100 place of first number) * 3 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 24 + 0 + 2400 + 240 + 0 + 24000 + 1200 + 0 + 120000 = 147864."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 301 * 818?"}, {"role": "assistant", "content": "Here are the steps for multiplying 301 * 818 using the long multiplication method.\nStep 1: Break first number 301 into its individual digits: 3 (hundreds place), 0 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 818 into its individual digits: 8 (hundreds place), 1 (tens place), and 8 (ones place).\n- 1 (from 1 place of first number) * 8 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 1 (from 1 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 10\n- 1 (from 1 place of first number) * 8 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 0 (from 10 place of first number) * 8 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 1 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 8 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 3 (from 100 place of first number) * 8 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 3 (from 100 place of first number) * 1 (from 10 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 3 (from 100 place of first number) * 8 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 8 + 10 + 800 + 0 + 0 + 0 + 2400 + 3000 + 240000 = 246218."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 201 * 897?"}, {"role": "assistant", "content": "Here are the steps for multiplying 201 * 897 using the long multiplication method.\nStep 1: Break first number 201 into its individual digits: 2 (hundreds place), 0 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 897 into its individual digits: 8 (hundreds place), 9 (tens place), and 7 (ones place).\n- 1 (from 1 place of first number) * 7 (from 1 place of second number) = 7 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 7\n- 1 (from 1 place of first number) * 9 (from 10 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 90\n- 1 (from 1 place of first number) * 8 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 0 (from 10 place of first number) * 7 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 9 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 8 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 2 (from 100 place of first number) * 7 (from 1 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1400\n- 2 (from 100 place of first number) * 9 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 2 (from 100 place of first number) * 8 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 7 + 90 + 800 + 0 + 0 + 0 + 1400 + 18000 + 160000 = 180297."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 955 * 821?"}, {"role": "assistant", "content": "Here are the steps for multiplying 955 * 821 using the long multiplication method.\nStep 1: Break first number 955 into its individual digits: 9 (hundreds place), 5 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 821 into its individual digits: 8 (hundreds place), 2 (tens place), and 1 (ones place).\n- 5 (from 1 place of first number) * 1 (from 1 place of second number) = 5 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 5\n- 5 (from 1 place of first number) * 2 (from 10 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 5 (from 1 place of first number) * 8 (from 100 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 5 (from 10 place of first number) * 1 (from 1 place of second number) = 5 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 50\n- 5 (from 10 place of first number) * 2 (from 10 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1000\n- 5 (from 10 place of first number) * 8 (from 100 place of second number) = 40 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n- 9 (from 100 place of first number) * 1 (from 1 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 900\n- 9 (from 100 place of first number) * 2 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 9 (from 100 place of first number) * 8 (from 100 place of second number) = 72 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 720000\n\nNow, add all these results together:\nThe sum of 5 + 100 + 4000 + 50 + 1000 + 40000 + 900 + 18000 + 720000 = 784055."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 695 * 798?"}, {"role": "assistant", "content": "Here are the steps for multiplying 695 * 798 using the long multiplication method.\nStep 1: Break first number 695 into its individual digits: 6 (hundreds place), 9 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 798 into its individual digits: 7 (hundreds place), 9 (tens place), and 8 (ones place).\n- 5 (from 1 place of first number) * 8 (from 1 place of second number) = 40 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 5 (from 1 place of first number) * 9 (from 10 place of second number) = 45 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 450\n- 5 (from 1 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3500\n- 9 (from 10 place of first number) * 8 (from 1 place of second number) = 72 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 720\n- 9 (from 10 place of first number) * 9 (from 10 place of second number) = 81 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 8100\n- 9 (from 10 place of first number) * 7 (from 100 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 63000\n- 6 (from 100 place of first number) * 8 (from 1 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4800\n- 6 (from 100 place of first number) * 9 (from 10 place of second number) = 54 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 54000\n- 6 (from 100 place of first number) * 7 (from 100 place of second number) = 42 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 420000\n\nNow, add all these results together:\nThe sum of 40 + 450 + 3500 + 720 + 8100 + 63000 + 4800 + 54000 + 420000 = 554610."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 547 * 505?"}, {"role": "assistant", "content": "Here are the steps for multiplying 547 * 505 using the long multiplication method.\nStep 1: Break first number 547 into its individual digits: 5 (hundreds place), 4 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 505 into its individual digits: 5 (hundreds place), 0 (tens place), and 5 (ones place).\n- 7 (from 1 place of first number) * 5 (from 1 place of second number) = 35 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 35\n- 7 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 7 (from 1 place of first number) * 5 (from 100 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3500\n- 4 (from 10 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 200\n- 4 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 4 (from 10 place of first number) * 5 (from 100 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n- 5 (from 100 place of first number) * 5 (from 1 place of second number) = 25 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2500\n- 5 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 5 (from 100 place of first number) * 5 (from 100 place of second number) = 25 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 250000\n\nNow, add all these results together:\nThe sum of 35 + 0 + 3500 + 200 + 0 + 20000 + 2500 + 0 + 250000 = 276235."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 925 * 255?"}, {"role": "assistant", "content": "Here are the steps for multiplying 925 * 255 using the long multiplication method.\nStep 1: Break first number 925 into its individual digits: 9 (hundreds place), 2 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 255 into its individual digits: 2 (hundreds place), 5 (tens place), and 5 (ones place).\n- 5 (from 1 place of first number) * 5 (from 1 place of second number) = 25 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 25\n- 5 (from 1 place of first number) * 5 (from 10 place of second number) = 25 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 250\n- 5 (from 1 place of first number) * 2 (from 100 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1000\n- 2 (from 10 place of first number) * 5 (from 1 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 100\n- 2 (from 10 place of first number) * 5 (from 10 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1000\n- 2 (from 10 place of first number) * 2 (from 100 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 9 (from 100 place of first number) * 5 (from 1 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4500\n- 9 (from 100 place of first number) * 5 (from 10 place of second number) = 45 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 45000\n- 9 (from 100 place of first number) * 2 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 25 + 250 + 1000 + 100 + 1000 + 4000 + 4500 + 45000 + 180000 = 235875."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 700 * 421?"}, {"role": "assistant", "content": "Here are the steps for multiplying 700 * 421 using the long multiplication method.\nStep 1: Break first number 700 into its individual digits: 7 (hundreds place), 0 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 421 into its individual digits: 4 (hundreds place), 2 (tens place), and 1 (ones place).\n- 0 (from 1 place of first number) * 1 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 2 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 4 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 0 (from 10 place of first number) * 1 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 2 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 4 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 7 (from 100 place of first number) * 1 (from 1 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 700\n- 7 (from 100 place of first number) * 2 (from 10 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 14000\n- 7 (from 100 place of first number) * 4 (from 100 place of second number) = 28 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 280000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 0 + 0 + 0 + 700 + 14000 + 280000 = 294700."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 741 * 274?"}, {"role": "assistant", "content": "Here are the steps for multiplying 741 * 274 using the long multiplication method.\nStep 1: Break first number 741 into its individual digits: 7 (hundreds place), 4 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 274 into its individual digits: 2 (hundreds place), 7 (tens place), and 4 (ones place).\n- 1 (from 1 place of first number) * 4 (from 1 place of second number) = 4 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 4\n- 1 (from 1 place of first number) * 7 (from 10 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 70\n- 1 (from 1 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 200\n- 4 (from 10 place of first number) * 4 (from 1 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 160\n- 4 (from 10 place of first number) * 7 (from 10 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2800\n- 4 (from 10 place of first number) * 2 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 7 (from 100 place of first number) * 4 (from 1 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2800\n- 7 (from 100 place of first number) * 7 (from 10 place of second number) = 49 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 49000\n- 7 (from 100 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 140000\n\nNow, add all these results together:\nThe sum of 4 + 70 + 200 + 160 + 2800 + 8000 + 2800 + 49000 + 140000 = 203034."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 263 * 565?"}, {"role": "assistant", "content": "Here are the steps for multiplying 263 * 565 using the long multiplication method.\nStep 1: Break first number 263 into its individual digits: 2 (hundreds place), 6 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 565 into its individual digits: 5 (hundreds place), 6 (tens place), and 5 (ones place).\n- 3 (from 1 place of first number) * 5 (from 1 place of second number) = 15 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 15\n- 3 (from 1 place of first number) * 6 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 3 (from 1 place of first number) * 5 (from 100 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1500\n- 6 (from 10 place of first number) * 5 (from 1 place of second number) = 30 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 6 (from 10 place of first number) * 6 (from 10 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3600\n- 6 (from 10 place of first number) * 5 (from 100 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n- 2 (from 100 place of first number) * 5 (from 1 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1000\n- 2 (from 100 place of first number) * 6 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 2 (from 100 place of first number) * 5 (from 100 place of second number) = 10 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 100000\n\nNow, add all these results together:\nThe sum of 15 + 180 + 1500 + 300 + 3600 + 30000 + 1000 + 12000 + 100000 = 148595."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 506 * 715?"}, {"role": "assistant", "content": "Here are the steps for multiplying 506 * 715 using the long multiplication method.\nStep 1: Break first number 506 into its individual digits: 5 (hundreds place), 0 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 715 into its individual digits: 7 (hundreds place), 1 (tens place), and 5 (ones place).\n- 6 (from 1 place of first number) * 5 (from 1 place of second number) = 30 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 6 (from 1 place of first number) * 1 (from 10 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 60\n- 6 (from 1 place of first number) * 7 (from 100 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4200\n- 0 (from 10 place of first number) * 5 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 1 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 7 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 5 (from 100 place of first number) * 5 (from 1 place of second number) = 25 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2500\n- 5 (from 100 place of first number) * 1 (from 10 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 5000\n- 5 (from 100 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 350000\n\nNow, add all these results together:\nThe sum of 30 + 60 + 4200 + 0 + 0 + 0 + 2500 + 5000 + 350000 = 361790."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 805 * 445?"}, {"role": "assistant", "content": "Here are the steps for multiplying 805 * 445 using the long multiplication method.\nStep 1: Break first number 805 into its individual digits: 8 (hundreds place), 0 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 445 into its individual digits: 4 (hundreds place), 4 (tens place), and 5 (ones place).\n- 5 (from 1 place of first number) * 5 (from 1 place of second number) = 25 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 25\n- 5 (from 1 place of first number) * 4 (from 10 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 200\n- 5 (from 1 place of first number) * 4 (from 100 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 0 (from 10 place of first number) * 5 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 4 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 4 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 8 (from 100 place of first number) * 5 (from 1 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4000\n- 8 (from 100 place of first number) * 4 (from 10 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 32000\n- 8 (from 100 place of first number) * 4 (from 100 place of second number) = 32 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 320000\n\nNow, add all these results together:\nThe sum of 25 + 200 + 2000 + 0 + 0 + 0 + 4000 + 32000 + 320000 = 358225."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 701 * 780?"}, {"role": "assistant", "content": "Here are the steps for multiplying 701 * 780 using the long multiplication method.\nStep 1: Break first number 701 into its individual digits: 7 (hundreds place), 0 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 780 into its individual digits: 7 (hundreds place), 8 (tens place), and 0 (ones place).\n- 1 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 1 (from 1 place of first number) * 8 (from 10 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 80\n- 1 (from 1 place of first number) * 7 (from 100 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 700\n- 0 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 8 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 7 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 7 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 100 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 56000\n- 7 (from 100 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 490000\n\nNow, add all these results together:\nThe sum of 0 + 80 + 700 + 0 + 0 + 0 + 0 + 56000 + 490000 = 546780."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 116 * 409?"}, {"role": "assistant", "content": "Here are the steps for multiplying 116 * 409 using the long multiplication method.\nStep 1: Break first number 116 into its individual digits: 1 (hundreds place), 1 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 409 into its individual digits: 4 (hundreds place), 0 (tens place), and 9 (ones place).\n- 6 (from 1 place of first number) * 9 (from 1 place of second number) = 54 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 54\n- 6 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 6 (from 1 place of first number) * 4 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 1 (from 10 place of first number) * 9 (from 1 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 90\n- 1 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 1 (from 10 place of first number) * 4 (from 100 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 1 (from 100 place of first number) * 9 (from 1 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 900\n- 1 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 1 (from 100 place of first number) * 4 (from 100 place of second number) = 4 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n\nNow, add all these results together:\nThe sum of 54 + 0 + 2400 + 90 + 0 + 4000 + 900 + 0 + 40000 = 47444."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 309 * 253?"}, {"role": "assistant", "content": "Here are the steps for multiplying 309 * 253 using the long multiplication method.\nStep 1: Break first number 309 into its individual digits: 3 (hundreds place), 0 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 253 into its individual digits: 2 (hundreds place), 5 (tens place), and 3 (ones place).\n- 9 (from 1 place of first number) * 3 (from 1 place of second number) = 27 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 27\n- 9 (from 1 place of first number) * 5 (from 10 place of second number) = 45 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 450\n- 9 (from 1 place of first number) * 2 (from 100 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1800\n- 0 (from 10 place of first number) * 3 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 5 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 2 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 3 (from 100 place of first number) * 3 (from 1 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 900\n- 3 (from 100 place of first number) * 5 (from 10 place of second number) = 15 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 15000\n- 3 (from 100 place of first number) * 2 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 27 + 450 + 1800 + 0 + 0 + 0 + 900 + 15000 + 60000 = 78177."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 600 * 201?"}, {"role": "assistant", "content": "Here are the steps for multiplying 600 * 201 using the long multiplication method.\nStep 1: Break first number 600 into its individual digits: 6 (hundreds place), 0 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 201 into its individual digits: 2 (hundreds place), 0 (tens place), and 1 (ones place).\n- 0 (from 1 place of first number) * 1 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 2 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 0 (from 10 place of first number) * 1 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 2 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 6 (from 100 place of first number) * 1 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 6 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 6 (from 100 place of first number) * 2 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 0 + 0 + 0 + 600 + 0 + 120000 = 120600."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 365 * 657?"}, {"role": "assistant", "content": "Here are the steps for multiplying 365 * 657 using the long multiplication method.\nStep 1: Break first number 365 into its individual digits: 3 (hundreds place), 6 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 657 into its individual digits: 6 (hundreds place), 5 (tens place), and 7 (ones place).\n- 5 (from 1 place of first number) * 7 (from 1 place of second number) = 35 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 35\n- 5 (from 1 place of first number) * 5 (from 10 place of second number) = 25 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 250\n- 5 (from 1 place of first number) * 6 (from 100 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 6 (from 10 place of first number) * 7 (from 1 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 420\n- 6 (from 10 place of first number) * 5 (from 10 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 6 (from 10 place of first number) * 6 (from 100 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 36000\n- 3 (from 100 place of first number) * 7 (from 1 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2100\n- 3 (from 100 place of first number) * 5 (from 10 place of second number) = 15 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 15000\n- 3 (from 100 place of first number) * 6 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 35 + 250 + 3000 + 420 + 3000 + 36000 + 2100 + 15000 + 180000 = 239805."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 612 * 763?"}, {"role": "assistant", "content": "Here are the steps for multiplying 612 * 763 using the long multiplication method.\nStep 1: Break first number 612 into its individual digits: 6 (hundreds place), 1 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 763 into its individual digits: 7 (hundreds place), 6 (tens place), and 3 (ones place).\n- 2 (from 1 place of first number) * 3 (from 1 place of second number) = 6 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 6\n- 2 (from 1 place of first number) * 6 (from 10 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 120\n- 2 (from 1 place of first number) * 7 (from 100 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1400\n- 1 (from 10 place of first number) * 3 (from 1 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 1 (from 10 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 1 (from 10 place of first number) * 7 (from 100 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 7000\n- 6 (from 100 place of first number) * 3 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 6 (from 100 place of first number) * 6 (from 10 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 36000\n- 6 (from 100 place of first number) * 7 (from 100 place of second number) = 42 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 420000\n\nNow, add all these results together:\nThe sum of 6 + 120 + 1400 + 30 + 600 + 7000 + 1800 + 36000 + 420000 = 466956."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 188 * 873?"}, {"role": "assistant", "content": "Here are the steps for multiplying 188 * 873 using the long multiplication method.\nStep 1: Break first number 188 into its individual digits: 1 (hundreds place), 8 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 873 into its individual digits: 8 (hundreds place), 7 (tens place), and 3 (ones place).\n- 8 (from 1 place of first number) * 3 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 8 (from 1 place of first number) * 7 (from 10 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 560\n- 8 (from 1 place of first number) * 8 (from 100 place of second number) = 64 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 6400\n- 8 (from 10 place of first number) * 3 (from 1 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 240\n- 8 (from 10 place of first number) * 7 (from 10 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5600\n- 8 (from 10 place of first number) * 8 (from 100 place of second number) = 64 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 64000\n- 1 (from 100 place of first number) * 3 (from 1 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 1 (from 100 place of first number) * 7 (from 10 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 7000\n- 1 (from 100 place of first number) * 8 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 24 + 560 + 6400 + 240 + 5600 + 64000 + 300 + 7000 + 80000 = 164124."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 210 * 870?"}, {"role": "assistant", "content": "Here are the steps for multiplying 210 * 870 using the long multiplication method.\nStep 1: Break first number 210 into its individual digits: 2 (hundreds place), 1 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 870 into its individual digits: 8 (hundreds place), 7 (tens place), and 0 (ones place).\n- 0 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 7 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 8 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 1 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 1 (from 10 place of first number) * 7 (from 10 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 700\n- 1 (from 10 place of first number) * 8 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 2 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 2 (from 100 place of first number) * 7 (from 10 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 14000\n- 2 (from 100 place of first number) * 8 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 0 + 700 + 8000 + 0 + 14000 + 160000 = 182700."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 177 * 321?"}, {"role": "assistant", "content": "Here are the steps for multiplying 177 * 321 using the long multiplication method.\nStep 1: Break first number 177 into its individual digits: 1 (hundreds place), 7 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 321 into its individual digits: 3 (hundreds place), 2 (tens place), and 1 (ones place).\n- 7 (from 1 place of first number) * 1 (from 1 place of second number) = 7 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 7\n- 7 (from 1 place of first number) * 2 (from 10 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 140\n- 7 (from 1 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2100\n- 7 (from 10 place of first number) * 1 (from 1 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 70\n- 7 (from 10 place of first number) * 2 (from 10 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1400\n- 7 (from 10 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 21000\n- 1 (from 100 place of first number) * 1 (from 1 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 100\n- 1 (from 100 place of first number) * 2 (from 10 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 1 (from 100 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n\nNow, add all these results together:\nThe sum of 7 + 140 + 2100 + 70 + 1400 + 21000 + 100 + 2000 + 30000 = 56817."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 398 * 996?"}, {"role": "assistant", "content": "Here are the steps for multiplying 398 * 996 using the long multiplication method.\nStep 1: Break first number 398 into its individual digits: 3 (hundreds place), 9 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 996 into its individual digits: 9 (hundreds place), 9 (tens place), and 6 (ones place).\n- 8 (from 1 place of first number) * 6 (from 1 place of second number) = 48 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 48\n- 8 (from 1 place of first number) * 9 (from 10 place of second number) = 72 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 720\n- 8 (from 1 place of first number) * 9 (from 100 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 7200\n- 9 (from 10 place of first number) * 6 (from 1 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 540\n- 9 (from 10 place of first number) * 9 (from 10 place of second number) = 81 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 8100\n- 9 (from 10 place of first number) * 9 (from 100 place of second number) = 81 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 81000\n- 3 (from 100 place of first number) * 6 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 3 (from 100 place of first number) * 9 (from 10 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 27000\n- 3 (from 100 place of first number) * 9 (from 100 place of second number) = 27 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 270000\n\nNow, add all these results together:\nThe sum of 48 + 720 + 7200 + 540 + 8100 + 81000 + 1800 + 27000 + 270000 = 396408."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 159 * 322?"}, {"role": "assistant", "content": "Here are the steps for multiplying 159 * 322 using the long multiplication method.\nStep 1: Break first number 159 into its individual digits: 1 (hundreds place), 5 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 322 into its individual digits: 3 (hundreds place), 2 (tens place), and 2 (ones place).\n- 9 (from 1 place of first number) * 2 (from 1 place of second number) = 18 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 18\n- 9 (from 1 place of first number) * 2 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 9 (from 1 place of first number) * 3 (from 100 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2700\n- 5 (from 10 place of first number) * 2 (from 1 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 100\n- 5 (from 10 place of first number) * 2 (from 10 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1000\n- 5 (from 10 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 15000\n- 1 (from 100 place of first number) * 2 (from 1 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 200\n- 1 (from 100 place of first number) * 2 (from 10 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 1 (from 100 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n\nNow, add all these results together:\nThe sum of 18 + 180 + 2700 + 100 + 1000 + 15000 + 200 + 2000 + 30000 = 51198."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 123 * 369?"}, {"role": "assistant", "content": "Here are the steps for multiplying 123 * 369 using the long multiplication method.\nStep 1: Break first number 123 into its individual digits: 1 (hundreds place), 2 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 369 into its individual digits: 3 (hundreds place), 6 (tens place), and 9 (ones place).\n- 3 (from 1 place of first number) * 9 (from 1 place of second number) = 27 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 27\n- 3 (from 1 place of first number) * 6 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 3 (from 1 place of first number) * 3 (from 100 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 900\n- 2 (from 10 place of first number) * 9 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 2 (from 10 place of first number) * 6 (from 10 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1200\n- 2 (from 10 place of first number) * 3 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 1 (from 100 place of first number) * 9 (from 1 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 900\n- 1 (from 100 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 1 (from 100 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n\nNow, add all these results together:\nThe sum of 27 + 180 + 900 + 180 + 1200 + 6000 + 900 + 6000 + 30000 = 45387."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 382 * 889?"}, {"role": "assistant", "content": "Here are the steps for multiplying 382 * 889 using the long multiplication method.\nStep 1: Break first number 382 into its individual digits: 3 (hundreds place), 8 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 889 into its individual digits: 8 (hundreds place), 8 (tens place), and 9 (ones place).\n- 2 (from 1 place of first number) * 9 (from 1 place of second number) = 18 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 18\n- 2 (from 1 place of first number) * 8 (from 10 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 160\n- 2 (from 1 place of first number) * 8 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 8 (from 10 place of first number) * 9 (from 1 place of second number) = 72 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 720\n- 8 (from 10 place of first number) * 8 (from 10 place of second number) = 64 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 6400\n- 8 (from 10 place of first number) * 8 (from 100 place of second number) = 64 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 64000\n- 3 (from 100 place of first number) * 9 (from 1 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2700\n- 3 (from 100 place of first number) * 8 (from 10 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 24000\n- 3 (from 100 place of first number) * 8 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 18 + 160 + 1600 + 720 + 6400 + 64000 + 2700 + 24000 + 240000 = 339598."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 819 * 652?"}, {"role": "assistant", "content": "Here are the steps for multiplying 819 * 652 using the long multiplication method.\nStep 1: Break first number 819 into its individual digits: 8 (hundreds place), 1 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 652 into its individual digits: 6 (hundreds place), 5 (tens place), and 2 (ones place).\n- 9 (from 1 place of first number) * 2 (from 1 place of second number) = 18 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 18\n- 9 (from 1 place of first number) * 5 (from 10 place of second number) = 45 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 450\n- 9 (from 1 place of first number) * 6 (from 100 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5400\n- 1 (from 10 place of first number) * 2 (from 1 place of second number) = 2 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 1 (from 10 place of first number) * 5 (from 10 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 500\n- 1 (from 10 place of first number) * 6 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 8 (from 100 place of first number) * 2 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 8 (from 100 place of first number) * 5 (from 10 place of second number) = 40 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 40000\n- 8 (from 100 place of first number) * 6 (from 100 place of second number) = 48 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 480000\n\nNow, add all these results together:\nThe sum of 18 + 450 + 5400 + 20 + 500 + 6000 + 1600 + 40000 + 480000 = 533988."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 397 * 766?"}, {"role": "assistant", "content": "Here are the steps for multiplying 397 * 766 using the long multiplication method.\nStep 1: Break first number 397 into its individual digits: 3 (hundreds place), 9 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 766 into its individual digits: 7 (hundreds place), 6 (tens place), and 6 (ones place).\n- 7 (from 1 place of first number) * 6 (from 1 place of second number) = 42 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 42\n- 7 (from 1 place of first number) * 6 (from 10 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 420\n- 7 (from 1 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4900\n- 9 (from 10 place of first number) * 6 (from 1 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 540\n- 9 (from 10 place of first number) * 6 (from 10 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5400\n- 9 (from 10 place of first number) * 7 (from 100 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 63000\n- 3 (from 100 place of first number) * 6 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 3 (from 100 place of first number) * 6 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 3 (from 100 place of first number) * 7 (from 100 place of second number) = 21 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 210000\n\nNow, add all these results together:\nThe sum of 42 + 420 + 4900 + 540 + 5400 + 63000 + 1800 + 18000 + 210000 = 304102."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 970 * 640?"}, {"role": "assistant", "content": "Here are the steps for multiplying 970 * 640 using the long multiplication method.\nStep 1: Break first number 970 into its individual digits: 9 (hundreds place), 7 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 640 into its individual digits: 6 (hundreds place), 4 (tens place), and 0 (ones place).\n- 0 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 4 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 6 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 7 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 10 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2800\n- 7 (from 10 place of first number) * 6 (from 100 place of second number) = 42 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 42000\n- 9 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 9 (from 100 place of first number) * 4 (from 10 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 36000\n- 9 (from 100 place of first number) * 6 (from 100 place of second number) = 54 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 540000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 0 + 2800 + 42000 + 0 + 36000 + 540000 = 620800."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 453 * 688?"}, {"role": "assistant", "content": "Here are the steps for multiplying 453 * 688 using the long multiplication method.\nStep 1: Break first number 453 into its individual digits: 4 (hundreds place), 5 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 688 into its individual digits: 6 (hundreds place), 8 (tens place), and 8 (ones place).\n- 3 (from 1 place of first number) * 8 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 3 (from 1 place of first number) * 8 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 3 (from 1 place of first number) * 6 (from 100 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1800\n- 5 (from 10 place of first number) * 8 (from 1 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 5 (from 10 place of first number) * 8 (from 10 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 5 (from 10 place of first number) * 6 (from 100 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n- 4 (from 100 place of first number) * 8 (from 1 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3200\n- 4 (from 100 place of first number) * 8 (from 10 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 32000\n- 4 (from 100 place of first number) * 6 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 24 + 240 + 1800 + 400 + 4000 + 30000 + 3200 + 32000 + 240000 = 311664."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 908 * 903?"}, {"role": "assistant", "content": "Here are the steps for multiplying 908 * 903 using the long multiplication method.\nStep 1: Break first number 908 into its individual digits: 9 (hundreds place), 0 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 903 into its individual digits: 9 (hundreds place), 0 (tens place), and 3 (ones place).\n- 8 (from 1 place of first number) * 3 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 8 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 8 (from 1 place of first number) * 9 (from 100 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 7200\n- 0 (from 10 place of first number) * 3 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 9 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 9 (from 100 place of first number) * 3 (from 1 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2700\n- 9 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 9 (from 100 place of first number) * 9 (from 100 place of second number) = 81 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 810000\n\nNow, add all these results together:\nThe sum of 24 + 0 + 7200 + 0 + 0 + 0 + 2700 + 0 + 810000 = 819924."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 765 * 658?"}, {"role": "assistant", "content": "Here are the steps for multiplying 765 * 658 using the long multiplication method.\nStep 1: Break first number 765 into its individual digits: 7 (hundreds place), 6 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 658 into its individual digits: 6 (hundreds place), 5 (tens place), and 8 (ones place).\n- 5 (from 1 place of first number) * 8 (from 1 place of second number) = 40 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 5 (from 1 place of first number) * 5 (from 10 place of second number) = 25 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 250\n- 5 (from 1 place of first number) * 6 (from 100 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 6 (from 10 place of first number) * 8 (from 1 place of second number) = 48 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 480\n- 6 (from 10 place of first number) * 5 (from 10 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 6 (from 10 place of first number) * 6 (from 100 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 36000\n- 7 (from 100 place of first number) * 8 (from 1 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 5600\n- 7 (from 100 place of first number) * 5 (from 10 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 35000\n- 7 (from 100 place of first number) * 6 (from 100 place of second number) = 42 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 420000\n\nNow, add all these results together:\nThe sum of 40 + 250 + 3000 + 480 + 3000 + 36000 + 5600 + 35000 + 420000 = 503370."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 641 * 125?"}, {"role": "assistant", "content": "Here are the steps for multiplying 641 * 125 using the long multiplication method.\nStep 1: Break first number 641 into its individual digits: 6 (hundreds place), 4 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 125 into its individual digits: 1 (hundreds place), 2 (tens place), and 5 (ones place).\n- 1 (from 1 place of first number) * 5 (from 1 place of second number) = 5 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 5\n- 1 (from 1 place of first number) * 2 (from 10 place of second number) = 2 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 20\n- 1 (from 1 place of first number) * 1 (from 100 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 100\n- 4 (from 10 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 200\n- 4 (from 10 place of first number) * 2 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 4 (from 10 place of first number) * 1 (from 100 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 6 (from 100 place of first number) * 5 (from 1 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3000\n- 6 (from 100 place of first number) * 2 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 6 (from 100 place of first number) * 1 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 5 + 20 + 100 + 200 + 800 + 4000 + 3000 + 12000 + 60000 = 80125."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 762 * 778?"}, {"role": "assistant", "content": "Here are the steps for multiplying 762 * 778 using the long multiplication method.\nStep 1: Break first number 762 into its individual digits: 7 (hundreds place), 6 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 778 into its individual digits: 7 (hundreds place), 7 (tens place), and 8 (ones place).\n- 2 (from 1 place of first number) * 8 (from 1 place of second number) = 16 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 16\n- 2 (from 1 place of first number) * 7 (from 10 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 140\n- 2 (from 1 place of first number) * 7 (from 100 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1400\n- 6 (from 10 place of first number) * 8 (from 1 place of second number) = 48 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 480\n- 6 (from 10 place of first number) * 7 (from 10 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4200\n- 6 (from 10 place of first number) * 7 (from 100 place of second number) = 42 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 42000\n- 7 (from 100 place of first number) * 8 (from 1 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 5600\n- 7 (from 100 place of first number) * 7 (from 10 place of second number) = 49 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 49000\n- 7 (from 100 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 490000\n\nNow, add all these results together:\nThe sum of 16 + 140 + 1400 + 480 + 4200 + 42000 + 5600 + 49000 + 490000 = 592836."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 425 * 130?"}, {"role": "assistant", "content": "Here are the steps for multiplying 425 * 130 using the long multiplication method.\nStep 1: Break first number 425 into its individual digits: 4 (hundreds place), 2 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 130 into its individual digits: 1 (hundreds place), 3 (tens place), and 0 (ones place).\n- 5 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 5 (from 1 place of first number) * 3 (from 10 place of second number) = 15 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 150\n- 5 (from 1 place of first number) * 1 (from 100 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 500\n- 2 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 2 (from 10 place of first number) * 3 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 2 (from 10 place of first number) * 1 (from 100 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 4 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 4 (from 100 place of first number) * 3 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 4 (from 100 place of first number) * 1 (from 100 place of second number) = 4 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n\nNow, add all these results together:\nThe sum of 0 + 150 + 500 + 0 + 600 + 2000 + 0 + 12000 + 40000 = 55250."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 843 * 563?"}, {"role": "assistant", "content": "Here are the steps for multiplying 843 * 563 using the long multiplication method.\nStep 1: Break first number 843 into its individual digits: 8 (hundreds place), 4 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 563 into its individual digits: 5 (hundreds place), 6 (tens place), and 3 (ones place).\n- 3 (from 1 place of first number) * 3 (from 1 place of second number) = 9 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 9\n- 3 (from 1 place of first number) * 6 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 3 (from 1 place of first number) * 5 (from 100 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1500\n- 4 (from 10 place of first number) * 3 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 4 (from 10 place of first number) * 6 (from 10 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2400\n- 4 (from 10 place of first number) * 5 (from 100 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n- 8 (from 100 place of first number) * 3 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 8 (from 100 place of first number) * 6 (from 10 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 48000\n- 8 (from 100 place of first number) * 5 (from 100 place of second number) = 40 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 400000\n\nNow, add all these results together:\nThe sum of 9 + 180 + 1500 + 120 + 2400 + 20000 + 2400 + 48000 + 400000 = 474609."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 371 * 843?"}, {"role": "assistant", "content": "Here are the steps for multiplying 371 * 843 using the long multiplication method.\nStep 1: Break first number 371 into its individual digits: 3 (hundreds place), 7 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 843 into its individual digits: 8 (hundreds place), 4 (tens place), and 3 (ones place).\n- 1 (from 1 place of first number) * 3 (from 1 place of second number) = 3 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 3\n- 1 (from 1 place of first number) * 4 (from 10 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 40\n- 1 (from 1 place of first number) * 8 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 7 (from 10 place of first number) * 3 (from 1 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 210\n- 7 (from 10 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2800\n- 7 (from 10 place of first number) * 8 (from 100 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 56000\n- 3 (from 100 place of first number) * 3 (from 1 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 900\n- 3 (from 100 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 3 (from 100 place of first number) * 8 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 3 + 40 + 800 + 210 + 2800 + 56000 + 900 + 12000 + 240000 = 312753."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 395 * 320?"}, {"role": "assistant", "content": "Here are the steps for multiplying 395 * 320 using the long multiplication method.\nStep 1: Break first number 395 into its individual digits: 3 (hundreds place), 9 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 320 into its individual digits: 3 (hundreds place), 2 (tens place), and 0 (ones place).\n- 5 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 5 (from 1 place of first number) * 2 (from 10 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 5 (from 1 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1500\n- 9 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 9 (from 10 place of first number) * 2 (from 10 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1800\n- 9 (from 10 place of first number) * 3 (from 100 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 27000\n- 3 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 3 (from 100 place of first number) * 2 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 3 (from 100 place of first number) * 3 (from 100 place of second number) = 9 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 90000\n\nNow, add all these results together:\nThe sum of 0 + 100 + 1500 + 0 + 1800 + 27000 + 0 + 6000 + 90000 = 126400."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 614 * 753?"}, {"role": "assistant", "content": "Here are the steps for multiplying 614 * 753 using the long multiplication method.\nStep 1: Break first number 614 into its individual digits: 6 (hundreds place), 1 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 753 into its individual digits: 7 (hundreds place), 5 (tens place), and 3 (ones place).\n- 4 (from 1 place of first number) * 3 (from 1 place of second number) = 12 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 12\n- 4 (from 1 place of first number) * 5 (from 10 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 200\n- 4 (from 1 place of first number) * 7 (from 100 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2800\n- 1 (from 10 place of first number) * 3 (from 1 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 1 (from 10 place of first number) * 5 (from 10 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 500\n- 1 (from 10 place of first number) * 7 (from 100 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 7000\n- 6 (from 100 place of first number) * 3 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 6 (from 100 place of first number) * 5 (from 10 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 30000\n- 6 (from 100 place of first number) * 7 (from 100 place of second number) = 42 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 420000\n\nNow, add all these results together:\nThe sum of 12 + 200 + 2800 + 30 + 500 + 7000 + 1800 + 30000 + 420000 = 462342."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 845 * 661?"}, {"role": "assistant", "content": "Here are the steps for multiplying 845 * 661 using the long multiplication method.\nStep 1: Break first number 845 into its individual digits: 8 (hundreds place), 4 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 661 into its individual digits: 6 (hundreds place), 6 (tens place), and 1 (ones place).\n- 5 (from 1 place of first number) * 1 (from 1 place of second number) = 5 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 5\n- 5 (from 1 place of first number) * 6 (from 10 place of second number) = 30 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 300\n- 5 (from 1 place of first number) * 6 (from 100 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 4 (from 10 place of first number) * 1 (from 1 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 4 (from 10 place of first number) * 6 (from 10 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2400\n- 4 (from 10 place of first number) * 6 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 8 (from 100 place of first number) * 1 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 8 (from 100 place of first number) * 6 (from 10 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 48000\n- 8 (from 100 place of first number) * 6 (from 100 place of second number) = 48 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 480000\n\nNow, add all these results together:\nThe sum of 5 + 300 + 3000 + 40 + 2400 + 24000 + 800 + 48000 + 480000 = 558545."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 920 * 679?"}, {"role": "assistant", "content": "Here are the steps for multiplying 920 * 679 using the long multiplication method.\nStep 1: Break first number 920 into its individual digits: 9 (hundreds place), 2 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 679 into its individual digits: 6 (hundreds place), 7 (tens place), and 9 (ones place).\n- 0 (from 1 place of first number) * 9 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 7 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 6 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 2 (from 10 place of first number) * 9 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 2 (from 10 place of first number) * 7 (from 10 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1400\n- 2 (from 10 place of first number) * 6 (from 100 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 12000\n- 9 (from 100 place of first number) * 9 (from 1 place of second number) = 81 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 8100\n- 9 (from 100 place of first number) * 7 (from 10 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 63000\n- 9 (from 100 place of first number) * 6 (from 100 place of second number) = 54 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 540000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 180 + 1400 + 12000 + 8100 + 63000 + 540000 = 624680."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 172 * 921?"}, {"role": "assistant", "content": "Here are the steps for multiplying 172 * 921 using the long multiplication method.\nStep 1: Break first number 172 into its individual digits: 1 (hundreds place), 7 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 921 into its individual digits: 9 (hundreds place), 2 (tens place), and 1 (ones place).\n- 2 (from 1 place of first number) * 1 (from 1 place of second number) = 2 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 2\n- 2 (from 1 place of first number) * 2 (from 10 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 40\n- 2 (from 1 place of first number) * 9 (from 100 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1800\n- 7 (from 10 place of first number) * 1 (from 1 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 70\n- 7 (from 10 place of first number) * 2 (from 10 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1400\n- 7 (from 10 place of first number) * 9 (from 100 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 63000\n- 1 (from 100 place of first number) * 1 (from 1 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 100\n- 1 (from 100 place of first number) * 2 (from 10 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 1 (from 100 place of first number) * 9 (from 100 place of second number) = 9 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 90000\n\nNow, add all these results together:\nThe sum of 2 + 40 + 1800 + 70 + 1400 + 63000 + 100 + 2000 + 90000 = 158412."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 460 * 226?"}, {"role": "assistant", "content": "Here are the steps for multiplying 460 * 226 using the long multiplication method.\nStep 1: Break first number 460 into its individual digits: 4 (hundreds place), 6 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 226 into its individual digits: 2 (hundreds place), 2 (tens place), and 6 (ones place).\n- 0 (from 1 place of first number) * 6 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 2 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 2 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 6 (from 10 place of first number) * 6 (from 1 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 360\n- 6 (from 10 place of first number) * 2 (from 10 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1200\n- 6 (from 10 place of first number) * 2 (from 100 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 12000\n- 4 (from 100 place of first number) * 6 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 4 (from 100 place of first number) * 2 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 4 (from 100 place of first number) * 2 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 360 + 1200 + 12000 + 2400 + 8000 + 80000 = 103960."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 235 * 691?"}, {"role": "assistant", "content": "Here are the steps for multiplying 235 * 691 using the long multiplication method.\nStep 1: Break first number 235 into its individual digits: 2 (hundreds place), 3 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 691 into its individual digits: 6 (hundreds place), 9 (tens place), and 1 (ones place).\n- 5 (from 1 place of first number) * 1 (from 1 place of second number) = 5 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 5\n- 5 (from 1 place of first number) * 9 (from 10 place of second number) = 45 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 450\n- 5 (from 1 place of first number) * 6 (from 100 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 3 (from 10 place of first number) * 1 (from 1 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 3 (from 10 place of first number) * 9 (from 10 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2700\n- 3 (from 10 place of first number) * 6 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 2 (from 100 place of first number) * 1 (from 1 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 200\n- 2 (from 100 place of first number) * 9 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 2 (from 100 place of first number) * 6 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 5 + 450 + 3000 + 30 + 2700 + 18000 + 200 + 18000 + 120000 = 162385."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 792 * 428?"}, {"role": "assistant", "content": "Here are the steps for multiplying 792 * 428 using the long multiplication method.\nStep 1: Break first number 792 into its individual digits: 7 (hundreds place), 9 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 428 into its individual digits: 4 (hundreds place), 2 (tens place), and 8 (ones place).\n- 2 (from 1 place of first number) * 8 (from 1 place of second number) = 16 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 16\n- 2 (from 1 place of first number) * 2 (from 10 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 40\n- 2 (from 1 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 9 (from 10 place of first number) * 8 (from 1 place of second number) = 72 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 720\n- 9 (from 10 place of first number) * 2 (from 10 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1800\n- 9 (from 10 place of first number) * 4 (from 100 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 36000\n- 7 (from 100 place of first number) * 8 (from 1 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 5600\n- 7 (from 100 place of first number) * 2 (from 10 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 14000\n- 7 (from 100 place of first number) * 4 (from 100 place of second number) = 28 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 280000\n\nNow, add all these results together:\nThe sum of 16 + 40 + 800 + 720 + 1800 + 36000 + 5600 + 14000 + 280000 = 338976."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 332 * 459?"}, {"role": "assistant", "content": "Here are the steps for multiplying 332 * 459 using the long multiplication method.\nStep 1: Break first number 332 into its individual digits: 3 (hundreds place), 3 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 459 into its individual digits: 4 (hundreds place), 5 (tens place), and 9 (ones place).\n- 2 (from 1 place of first number) * 9 (from 1 place of second number) = 18 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 18\n- 2 (from 1 place of first number) * 5 (from 10 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 2 (from 1 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 3 (from 10 place of first number) * 9 (from 1 place of second number) = 27 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 270\n- 3 (from 10 place of first number) * 5 (from 10 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1500\n- 3 (from 10 place of first number) * 4 (from 100 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 12000\n- 3 (from 100 place of first number) * 9 (from 1 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2700\n- 3 (from 100 place of first number) * 5 (from 10 place of second number) = 15 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 15000\n- 3 (from 100 place of first number) * 4 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 18 + 100 + 800 + 270 + 1500 + 12000 + 2700 + 15000 + 120000 = 152388."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 570 * 167?"}, {"role": "assistant", "content": "Here are the steps for multiplying 570 * 167 using the long multiplication method.\nStep 1: Break first number 570 into its individual digits: 5 (hundreds place), 7 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 167 into its individual digits: 1 (hundreds place), 6 (tens place), and 7 (ones place).\n- 0 (from 1 place of first number) * 7 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 6 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 1 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 7 (from 10 place of first number) * 7 (from 1 place of second number) = 49 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 490\n- 7 (from 10 place of first number) * 6 (from 10 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4200\n- 7 (from 10 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 7000\n- 5 (from 100 place of first number) * 7 (from 1 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3500\n- 5 (from 100 place of first number) * 6 (from 10 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 30000\n- 5 (from 100 place of first number) * 1 (from 100 place of second number) = 5 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 50000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 490 + 4200 + 7000 + 3500 + 30000 + 50000 = 95190."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 152 * 473?"}, {"role": "assistant", "content": "Here are the steps for multiplying 152 * 473 using the long multiplication method.\nStep 1: Break first number 152 into its individual digits: 1 (hundreds place), 5 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 473 into its individual digits: 4 (hundreds place), 7 (tens place), and 3 (ones place).\n- 2 (from 1 place of first number) * 3 (from 1 place of second number) = 6 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 6\n- 2 (from 1 place of first number) * 7 (from 10 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 140\n- 2 (from 1 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 5 (from 10 place of first number) * 3 (from 1 place of second number) = 15 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 150\n- 5 (from 10 place of first number) * 7 (from 10 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3500\n- 5 (from 10 place of first number) * 4 (from 100 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n- 1 (from 100 place of first number) * 3 (from 1 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 1 (from 100 place of first number) * 7 (from 10 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 7000\n- 1 (from 100 place of first number) * 4 (from 100 place of second number) = 4 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n\nNow, add all these results together:\nThe sum of 6 + 140 + 800 + 150 + 3500 + 20000 + 300 + 7000 + 40000 = 71896."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 870 * 912?"}, {"role": "assistant", "content": "Here are the steps for multiplying 870 * 912 using the long multiplication method.\nStep 1: Break first number 870 into its individual digits: 8 (hundreds place), 7 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 912 into its individual digits: 9 (hundreds place), 1 (tens place), and 2 (ones place).\n- 0 (from 1 place of first number) * 2 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 1 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 9 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 7 (from 10 place of first number) * 2 (from 1 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 140\n- 7 (from 10 place of first number) * 1 (from 10 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 700\n- 7 (from 10 place of first number) * 9 (from 100 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 63000\n- 8 (from 100 place of first number) * 2 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 8 (from 100 place of first number) * 1 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 8 (from 100 place of first number) * 9 (from 100 place of second number) = 72 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 720000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 140 + 700 + 63000 + 1600 + 8000 + 720000 = 793440."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 970 * 115?"}, {"role": "assistant", "content": "Here are the steps for multiplying 970 * 115 using the long multiplication method.\nStep 1: Break first number 970 into its individual digits: 9 (hundreds place), 7 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 115 into its individual digits: 1 (hundreds place), 1 (tens place), and 5 (ones place).\n- 0 (from 1 place of first number) * 5 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 1 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 1 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 7 (from 10 place of first number) * 5 (from 1 place of second number) = 35 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 350\n- 7 (from 10 place of first number) * 1 (from 10 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 700\n- 7 (from 10 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 7000\n- 9 (from 100 place of first number) * 5 (from 1 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4500\n- 9 (from 100 place of first number) * 1 (from 10 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 9000\n- 9 (from 100 place of first number) * 1 (from 100 place of second number) = 9 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 90000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 350 + 700 + 7000 + 4500 + 9000 + 90000 = 111550."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 180 * 281?"}, {"role": "assistant", "content": "Here are the steps for multiplying 180 * 281 using the long multiplication method.\nStep 1: Break first number 180 into its individual digits: 1 (hundreds place), 8 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 281 into its individual digits: 2 (hundreds place), 8 (tens place), and 1 (ones place).\n- 0 (from 1 place of first number) * 1 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 8 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 2 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 8 (from 10 place of first number) * 1 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 8 (from 10 place of first number) * 8 (from 10 place of second number) = 64 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 6400\n- 8 (from 10 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 16000\n- 1 (from 100 place of first number) * 1 (from 1 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 100\n- 1 (from 100 place of first number) * 8 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 1 (from 100 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 80 + 6400 + 16000 + 100 + 8000 + 20000 = 50580."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 669 * 257?"}, {"role": "assistant", "content": "Here are the steps for multiplying 669 * 257 using the long multiplication method.\nStep 1: Break first number 669 into its individual digits: 6 (hundreds place), 6 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 257 into its individual digits: 2 (hundreds place), 5 (tens place), and 7 (ones place).\n- 9 (from 1 place of first number) * 7 (from 1 place of second number) = 63 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 63\n- 9 (from 1 place of first number) * 5 (from 10 place of second number) = 45 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 450\n- 9 (from 1 place of first number) * 2 (from 100 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1800\n- 6 (from 10 place of first number) * 7 (from 1 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 420\n- 6 (from 10 place of first number) * 5 (from 10 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 6 (from 10 place of first number) * 2 (from 100 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 12000\n- 6 (from 100 place of first number) * 7 (from 1 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4200\n- 6 (from 100 place of first number) * 5 (from 10 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 30000\n- 6 (from 100 place of first number) * 2 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 63 + 450 + 1800 + 420 + 3000 + 12000 + 4200 + 30000 + 120000 = 171933."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 520 * 649?"}, {"role": "assistant", "content": "Here are the steps for multiplying 520 * 649 using the long multiplication method.\nStep 1: Break first number 520 into its individual digits: 5 (hundreds place), 2 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 649 into its individual digits: 6 (hundreds place), 4 (tens place), and 9 (ones place).\n- 0 (from 1 place of first number) * 9 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 4 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 6 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 2 (from 10 place of first number) * 9 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 2 (from 10 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 2 (from 10 place of first number) * 6 (from 100 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 12000\n- 5 (from 100 place of first number) * 9 (from 1 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4500\n- 5 (from 100 place of first number) * 4 (from 10 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 20000\n- 5 (from 100 place of first number) * 6 (from 100 place of second number) = 30 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 300000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 180 + 800 + 12000 + 4500 + 20000 + 300000 = 337480."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 218 * 978?"}, {"role": "assistant", "content": "Here are the steps for multiplying 218 * 978 using the long multiplication method.\nStep 1: Break first number 218 into its individual digits: 2 (hundreds place), 1 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 978 into its individual digits: 9 (hundreds place), 7 (tens place), and 8 (ones place).\n- 8 (from 1 place of first number) * 8 (from 1 place of second number) = 64 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 64\n- 8 (from 1 place of first number) * 7 (from 10 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 560\n- 8 (from 1 place of first number) * 9 (from 100 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 7200\n- 1 (from 10 place of first number) * 8 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 1 (from 10 place of first number) * 7 (from 10 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 700\n- 1 (from 10 place of first number) * 9 (from 100 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 9000\n- 2 (from 100 place of first number) * 8 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 2 (from 100 place of first number) * 7 (from 10 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 14000\n- 2 (from 100 place of first number) * 9 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 64 + 560 + 7200 + 80 + 700 + 9000 + 1600 + 14000 + 180000 = 213204."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 638 * 727?"}, {"role": "assistant", "content": "Here are the steps for multiplying 638 * 727 using the long multiplication method.\nStep 1: Break first number 638 into its individual digits: 6 (hundreds place), 3 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 727 into its individual digits: 7 (hundreds place), 2 (tens place), and 7 (ones place).\n- 8 (from 1 place of first number) * 7 (from 1 place of second number) = 56 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 56\n- 8 (from 1 place of first number) * 2 (from 10 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 160\n- 8 (from 1 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5600\n- 3 (from 10 place of first number) * 7 (from 1 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 210\n- 3 (from 10 place of first number) * 2 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 3 (from 10 place of first number) * 7 (from 100 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 21000\n- 6 (from 100 place of first number) * 7 (from 1 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4200\n- 6 (from 100 place of first number) * 2 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 6 (from 100 place of first number) * 7 (from 100 place of second number) = 42 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 420000\n\nNow, add all these results together:\nThe sum of 56 + 160 + 5600 + 210 + 600 + 21000 + 4200 + 12000 + 420000 = 463826."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 586 * 127?"}, {"role": "assistant", "content": "Here are the steps for multiplying 586 * 127 using the long multiplication method.\nStep 1: Break first number 586 into its individual digits: 5 (hundreds place), 8 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 127 into its individual digits: 1 (hundreds place), 2 (tens place), and 7 (ones place).\n- 6 (from 1 place of first number) * 7 (from 1 place of second number) = 42 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 42\n- 6 (from 1 place of first number) * 2 (from 10 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 120\n- 6 (from 1 place of first number) * 1 (from 100 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 600\n- 8 (from 10 place of first number) * 7 (from 1 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 560\n- 8 (from 10 place of first number) * 2 (from 10 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1600\n- 8 (from 10 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 5 (from 100 place of first number) * 7 (from 1 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3500\n- 5 (from 100 place of first number) * 2 (from 10 place of second number) = 10 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 10000\n- 5 (from 100 place of first number) * 1 (from 100 place of second number) = 5 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 50000\n\nNow, add all these results together:\nThe sum of 42 + 120 + 600 + 560 + 1600 + 8000 + 3500 + 10000 + 50000 = 74422."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 306 * 900?"}, {"role": "assistant", "content": "Here are the steps for multiplying 306 * 900 using the long multiplication method.\nStep 1: Break first number 306 into its individual digits: 3 (hundreds place), 0 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 900 into its individual digits: 9 (hundreds place), 0 (tens place), and 0 (ones place).\n- 6 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 6 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 6 (from 1 place of first number) * 9 (from 100 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5400\n- 0 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 9 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 3 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 3 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 3 (from 100 place of first number) * 9 (from 100 place of second number) = 27 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 270000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 5400 + 0 + 0 + 0 + 0 + 0 + 270000 = 275400."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 138 * 904?"}, {"role": "assistant", "content": "Here are the steps for multiplying 138 * 904 using the long multiplication method.\nStep 1: Break first number 138 into its individual digits: 1 (hundreds place), 3 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 904 into its individual digits: 9 (hundreds place), 0 (tens place), and 4 (ones place).\n- 8 (from 1 place of first number) * 4 (from 1 place of second number) = 32 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 32\n- 8 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 8 (from 1 place of first number) * 9 (from 100 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 7200\n- 3 (from 10 place of first number) * 4 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 3 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 3 (from 10 place of first number) * 9 (from 100 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 27000\n- 1 (from 100 place of first number) * 4 (from 1 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 1 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 1 (from 100 place of first number) * 9 (from 100 place of second number) = 9 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 90000\n\nNow, add all these results together:\nThe sum of 32 + 0 + 7200 + 120 + 0 + 27000 + 400 + 0 + 90000 = 124752."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 986 * 277?"}, {"role": "assistant", "content": "Here are the steps for multiplying 986 * 277 using the long multiplication method.\nStep 1: Break first number 986 into its individual digits: 9 (hundreds place), 8 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 277 into its individual digits: 2 (hundreds place), 7 (tens place), and 7 (ones place).\n- 6 (from 1 place of first number) * 7 (from 1 place of second number) = 42 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 42\n- 6 (from 1 place of first number) * 7 (from 10 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 420\n- 6 (from 1 place of first number) * 2 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 8 (from 10 place of first number) * 7 (from 1 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 560\n- 8 (from 10 place of first number) * 7 (from 10 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5600\n- 8 (from 10 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 16000\n- 9 (from 100 place of first number) * 7 (from 1 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 6300\n- 9 (from 100 place of first number) * 7 (from 10 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 63000\n- 9 (from 100 place of first number) * 2 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 42 + 420 + 1200 + 560 + 5600 + 16000 + 6300 + 63000 + 180000 = 273122."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 915 * 324?"}, {"role": "assistant", "content": "Here are the steps for multiplying 915 * 324 using the long multiplication method.\nStep 1: Break first number 915 into its individual digits: 9 (hundreds place), 1 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 324 into its individual digits: 3 (hundreds place), 2 (tens place), and 4 (ones place).\n- 5 (from 1 place of first number) * 4 (from 1 place of second number) = 20 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 5 (from 1 place of first number) * 2 (from 10 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 5 (from 1 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1500\n- 1 (from 10 place of first number) * 4 (from 1 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 1 (from 10 place of first number) * 2 (from 10 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 200\n- 1 (from 10 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 9 (from 100 place of first number) * 4 (from 1 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3600\n- 9 (from 100 place of first number) * 2 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 9 (from 100 place of first number) * 3 (from 100 place of second number) = 27 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 270000\n\nNow, add all these results together:\nThe sum of 20 + 100 + 1500 + 40 + 200 + 3000 + 3600 + 18000 + 270000 = 296460."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 234 * 297?"}, {"role": "assistant", "content": "Here are the steps for multiplying 234 * 297 using the long multiplication method.\nStep 1: Break first number 234 into its individual digits: 2 (hundreds place), 3 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 297 into its individual digits: 2 (hundreds place), 9 (tens place), and 7 (ones place).\n- 4 (from 1 place of first number) * 7 (from 1 place of second number) = 28 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 28\n- 4 (from 1 place of first number) * 9 (from 10 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 360\n- 4 (from 1 place of first number) * 2 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 3 (from 10 place of first number) * 7 (from 1 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 210\n- 3 (from 10 place of first number) * 9 (from 10 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2700\n- 3 (from 10 place of first number) * 2 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 2 (from 100 place of first number) * 7 (from 1 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1400\n- 2 (from 100 place of first number) * 9 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 2 (from 100 place of first number) * 2 (from 100 place of second number) = 4 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n\nNow, add all these results together:\nThe sum of 28 + 360 + 800 + 210 + 2700 + 6000 + 1400 + 18000 + 40000 = 69498."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 805 * 227?"}, {"role": "assistant", "content": "Here are the steps for multiplying 805 * 227 using the long multiplication method.\nStep 1: Break first number 805 into its individual digits: 8 (hundreds place), 0 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 227 into its individual digits: 2 (hundreds place), 2 (tens place), and 7 (ones place).\n- 5 (from 1 place of first number) * 7 (from 1 place of second number) = 35 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 35\n- 5 (from 1 place of first number) * 2 (from 10 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 5 (from 1 place of first number) * 2 (from 100 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1000\n- 0 (from 10 place of first number) * 7 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 2 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 2 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 8 (from 100 place of first number) * 7 (from 1 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 5600\n- 8 (from 100 place of first number) * 2 (from 10 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 16000\n- 8 (from 100 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 35 + 100 + 1000 + 0 + 0 + 0 + 5600 + 16000 + 160000 = 182735."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 132 * 158?"}, {"role": "assistant", "content": "Here are the steps for multiplying 132 * 158 using the long multiplication method.\nStep 1: Break first number 132 into its individual digits: 1 (hundreds place), 3 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 158 into its individual digits: 1 (hundreds place), 5 (tens place), and 8 (ones place).\n- 2 (from 1 place of first number) * 8 (from 1 place of second number) = 16 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 16\n- 2 (from 1 place of first number) * 5 (from 10 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 2 (from 1 place of first number) * 1 (from 100 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 200\n- 3 (from 10 place of first number) * 8 (from 1 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 240\n- 3 (from 10 place of first number) * 5 (from 10 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1500\n- 3 (from 10 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 1 (from 100 place of first number) * 8 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 1 (from 100 place of first number) * 5 (from 10 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 5000\n- 1 (from 100 place of first number) * 1 (from 100 place of second number) = 1 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 10000\n\nNow, add all these results together:\nThe sum of 16 + 100 + 200 + 240 + 1500 + 3000 + 800 + 5000 + 10000 = 20856."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 140 * 594?"}, {"role": "assistant", "content": "Here are the steps for multiplying 140 * 594 using the long multiplication method.\nStep 1: Break first number 140 into its individual digits: 1 (hundreds place), 4 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 594 into its individual digits: 5 (hundreds place), 9 (tens place), and 4 (ones place).\n- 0 (from 1 place of first number) * 4 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 9 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 5 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 4 (from 10 place of first number) * 4 (from 1 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 160\n- 4 (from 10 place of first number) * 9 (from 10 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3600\n- 4 (from 10 place of first number) * 5 (from 100 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n- 1 (from 100 place of first number) * 4 (from 1 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 1 (from 100 place of first number) * 9 (from 10 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 9000\n- 1 (from 100 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 50000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 160 + 3600 + 20000 + 400 + 9000 + 50000 = 83160."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 846 * 760?"}, {"role": "assistant", "content": "Here are the steps for multiplying 846 * 760 using the long multiplication method.\nStep 1: Break first number 846 into its individual digits: 8 (hundreds place), 4 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 760 into its individual digits: 7 (hundreds place), 6 (tens place), and 0 (ones place).\n- 6 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 6 (from 1 place of first number) * 6 (from 10 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 360\n- 6 (from 1 place of first number) * 7 (from 100 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4200\n- 4 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 4 (from 10 place of first number) * 6 (from 10 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2400\n- 4 (from 10 place of first number) * 7 (from 100 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 28000\n- 8 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 100 place of first number) * 6 (from 10 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 48000\n- 8 (from 100 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 560000\n\nNow, add all these results together:\nThe sum of 0 + 360 + 4200 + 0 + 2400 + 28000 + 0 + 48000 + 560000 = 642960."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 545 * 872?"}, {"role": "assistant", "content": "Here are the steps for multiplying 545 * 872 using the long multiplication method.\nStep 1: Break first number 545 into its individual digits: 5 (hundreds place), 4 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 872 into its individual digits: 8 (hundreds place), 7 (tens place), and 2 (ones place).\n- 5 (from 1 place of first number) * 2 (from 1 place of second number) = 10 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 10\n- 5 (from 1 place of first number) * 7 (from 10 place of second number) = 35 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 350\n- 5 (from 1 place of first number) * 8 (from 100 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 4 (from 10 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 4 (from 10 place of first number) * 7 (from 10 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2800\n- 4 (from 10 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 32000\n- 5 (from 100 place of first number) * 2 (from 1 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1000\n- 5 (from 100 place of first number) * 7 (from 10 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 35000\n- 5 (from 100 place of first number) * 8 (from 100 place of second number) = 40 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 400000\n\nNow, add all these results together:\nThe sum of 10 + 350 + 4000 + 80 + 2800 + 32000 + 1000 + 35000 + 400000 = 475240."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 447 * 712?"}, {"role": "assistant", "content": "Here are the steps for multiplying 447 * 712 using the long multiplication method.\nStep 1: Break first number 447 into its individual digits: 4 (hundreds place), 4 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 712 into its individual digits: 7 (hundreds place), 1 (tens place), and 2 (ones place).\n- 7 (from 1 place of first number) * 2 (from 1 place of second number) = 14 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 14\n- 7 (from 1 place of first number) * 1 (from 10 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 70\n- 7 (from 1 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4900\n- 4 (from 10 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 4 (from 10 place of first number) * 1 (from 10 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 4 (from 10 place of first number) * 7 (from 100 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 28000\n- 4 (from 100 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 4 (from 100 place of first number) * 1 (from 10 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 4 (from 100 place of first number) * 7 (from 100 place of second number) = 28 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 280000\n\nNow, add all these results together:\nThe sum of 14 + 70 + 4900 + 80 + 400 + 28000 + 800 + 4000 + 280000 = 318264."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 832 * 626?"}, {"role": "assistant", "content": "Here are the steps for multiplying 832 * 626 using the long multiplication method.\nStep 1: Break first number 832 into its individual digits: 8 (hundreds place), 3 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 626 into its individual digits: 6 (hundreds place), 2 (tens place), and 6 (ones place).\n- 2 (from 1 place of first number) * 6 (from 1 place of second number) = 12 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 12\n- 2 (from 1 place of first number) * 2 (from 10 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 40\n- 2 (from 1 place of first number) * 6 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 3 (from 10 place of first number) * 6 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 3 (from 10 place of first number) * 2 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 3 (from 10 place of first number) * 6 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 8 (from 100 place of first number) * 6 (from 1 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4800\n- 8 (from 100 place of first number) * 2 (from 10 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 16000\n- 8 (from 100 place of first number) * 6 (from 100 place of second number) = 48 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 480000\n\nNow, add all these results together:\nThe sum of 12 + 40 + 1200 + 180 + 600 + 18000 + 4800 + 16000 + 480000 = 520832."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 600 * 634?"}, {"role": "assistant", "content": "Here are the steps for multiplying 600 * 634 using the long multiplication method.\nStep 1: Break first number 600 into its individual digits: 6 (hundreds place), 0 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 634 into its individual digits: 6 (hundreds place), 3 (tens place), and 4 (ones place).\n- 0 (from 1 place of first number) * 4 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 3 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 6 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 0 (from 10 place of first number) * 4 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 3 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 6 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 6 (from 100 place of first number) * 4 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 6 (from 100 place of first number) * 3 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 6 (from 100 place of first number) * 6 (from 100 place of second number) = 36 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 360000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 0 + 0 + 0 + 2400 + 18000 + 360000 = 380400."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 826 * 963?"}, {"role": "assistant", "content": "Here are the steps for multiplying 826 * 963 using the long multiplication method.\nStep 1: Break first number 826 into its individual digits: 8 (hundreds place), 2 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 963 into its individual digits: 9 (hundreds place), 6 (tens place), and 3 (ones place).\n- 6 (from 1 place of first number) * 3 (from 1 place of second number) = 18 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 18\n- 6 (from 1 place of first number) * 6 (from 10 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 360\n- 6 (from 1 place of first number) * 9 (from 100 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5400\n- 2 (from 10 place of first number) * 3 (from 1 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 60\n- 2 (from 10 place of first number) * 6 (from 10 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1200\n- 2 (from 10 place of first number) * 9 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 8 (from 100 place of first number) * 3 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 8 (from 100 place of first number) * 6 (from 10 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 48000\n- 8 (from 100 place of first number) * 9 (from 100 place of second number) = 72 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 720000\n\nNow, add all these results together:\nThe sum of 18 + 360 + 5400 + 60 + 1200 + 18000 + 2400 + 48000 + 720000 = 795438."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 184 * 495?"}, {"role": "assistant", "content": "Here are the steps for multiplying 184 * 495 using the long multiplication method.\nStep 1: Break first number 184 into its individual digits: 1 (hundreds place), 8 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 495 into its individual digits: 4 (hundreds place), 9 (tens place), and 5 (ones place).\n- 4 (from 1 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 4 (from 1 place of first number) * 9 (from 10 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 360\n- 4 (from 1 place of first number) * 4 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 8 (from 10 place of first number) * 5 (from 1 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 8 (from 10 place of first number) * 9 (from 10 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 7200\n- 8 (from 10 place of first number) * 4 (from 100 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 32000\n- 1 (from 100 place of first number) * 5 (from 1 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 500\n- 1 (from 100 place of first number) * 9 (from 10 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 9000\n- 1 (from 100 place of first number) * 4 (from 100 place of second number) = 4 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n\nNow, add all these results together:\nThe sum of 20 + 360 + 1600 + 400 + 7200 + 32000 + 500 + 9000 + 40000 = 91080."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 653 * 185?"}, {"role": "assistant", "content": "Here are the steps for multiplying 653 * 185 using the long multiplication method.\nStep 1: Break first number 653 into its individual digits: 6 (hundreds place), 5 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 185 into its individual digits: 1 (hundreds place), 8 (tens place), and 5 (ones place).\n- 3 (from 1 place of first number) * 5 (from 1 place of second number) = 15 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 15\n- 3 (from 1 place of first number) * 8 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 3 (from 1 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 300\n- 5 (from 10 place of first number) * 5 (from 1 place of second number) = 25 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 250\n- 5 (from 10 place of first number) * 8 (from 10 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 5 (from 10 place of first number) * 1 (from 100 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 5000\n- 6 (from 100 place of first number) * 5 (from 1 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3000\n- 6 (from 100 place of first number) * 8 (from 10 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 48000\n- 6 (from 100 place of first number) * 1 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 15 + 240 + 300 + 250 + 4000 + 5000 + 3000 + 48000 + 60000 = 120805."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 159 * 918?"}, {"role": "assistant", "content": "Here are the steps for multiplying 159 * 918 using the long multiplication method.\nStep 1: Break first number 159 into its individual digits: 1 (hundreds place), 5 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 918 into its individual digits: 9 (hundreds place), 1 (tens place), and 8 (ones place).\n- 9 (from 1 place of first number) * 8 (from 1 place of second number) = 72 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 72\n- 9 (from 1 place of first number) * 1 (from 10 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 90\n- 9 (from 1 place of first number) * 9 (from 100 place of second number) = 81 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 8100\n- 5 (from 10 place of first number) * 8 (from 1 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 5 (from 10 place of first number) * 1 (from 10 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 500\n- 5 (from 10 place of first number) * 9 (from 100 place of second number) = 45 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 45000\n- 1 (from 100 place of first number) * 8 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 1 (from 100 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 1000\n- 1 (from 100 place of first number) * 9 (from 100 place of second number) = 9 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 90000\n\nNow, add all these results together:\nThe sum of 72 + 90 + 8100 + 400 + 500 + 45000 + 800 + 1000 + 90000 = 145962."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 218 * 199?"}, {"role": "assistant", "content": "Here are the steps for multiplying 218 * 199 using the long multiplication method.\nStep 1: Break first number 218 into its individual digits: 2 (hundreds place), 1 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 199 into its individual digits: 1 (hundreds place), 9 (tens place), and 9 (ones place).\n- 8 (from 1 place of first number) * 9 (from 1 place of second number) = 72 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 72\n- 8 (from 1 place of first number) * 9 (from 10 place of second number) = 72 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 720\n- 8 (from 1 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 1 (from 10 place of first number) * 9 (from 1 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 90\n- 1 (from 10 place of first number) * 9 (from 10 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 900\n- 1 (from 10 place of first number) * 1 (from 100 place of second number) = 1 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 1000\n- 2 (from 100 place of first number) * 9 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 2 (from 100 place of first number) * 9 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 2 (from 100 place of first number) * 1 (from 100 place of second number) = 2 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n\nNow, add all these results together:\nThe sum of 72 + 720 + 800 + 90 + 900 + 1000 + 1800 + 18000 + 20000 = 43382."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 457 * 485?"}, {"role": "assistant", "content": "Here are the steps for multiplying 457 * 485 using the long multiplication method.\nStep 1: Break first number 457 into its individual digits: 4 (hundreds place), 5 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 485 into its individual digits: 4 (hundreds place), 8 (tens place), and 5 (ones place).\n- 7 (from 1 place of first number) * 5 (from 1 place of second number) = 35 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 35\n- 7 (from 1 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 560\n- 7 (from 1 place of first number) * 4 (from 100 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2800\n- 5 (from 10 place of first number) * 5 (from 1 place of second number) = 25 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 250\n- 5 (from 10 place of first number) * 8 (from 10 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 5 (from 10 place of first number) * 4 (from 100 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n- 4 (from 100 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2000\n- 4 (from 100 place of first number) * 8 (from 10 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 32000\n- 4 (from 100 place of first number) * 4 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 35 + 560 + 2800 + 250 + 4000 + 20000 + 2000 + 32000 + 160000 = 221645."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 503 * 336?"}, {"role": "assistant", "content": "Here are the steps for multiplying 503 * 336 using the long multiplication method.\nStep 1: Break first number 503 into its individual digits: 5 (hundreds place), 0 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 336 into its individual digits: 3 (hundreds place), 3 (tens place), and 6 (ones place).\n- 3 (from 1 place of first number) * 6 (from 1 place of second number) = 18 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 18\n- 3 (from 1 place of first number) * 3 (from 10 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 90\n- 3 (from 1 place of first number) * 3 (from 100 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 900\n- 0 (from 10 place of first number) * 6 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 3 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 3 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 5 (from 100 place of first number) * 6 (from 1 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3000\n- 5 (from 100 place of first number) * 3 (from 10 place of second number) = 15 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 15000\n- 5 (from 100 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 150000\n\nNow, add all these results together:\nThe sum of 18 + 90 + 900 + 0 + 0 + 0 + 3000 + 15000 + 150000 = 169008."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 460 * 844?"}, {"role": "assistant", "content": "Here are the steps for multiplying 460 * 844 using the long multiplication method.\nStep 1: Break first number 460 into its individual digits: 4 (hundreds place), 6 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 844 into its individual digits: 8 (hundreds place), 4 (tens place), and 4 (ones place).\n- 0 (from 1 place of first number) * 4 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 4 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 8 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 6 (from 10 place of first number) * 4 (from 1 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 240\n- 6 (from 10 place of first number) * 4 (from 10 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2400\n- 6 (from 10 place of first number) * 8 (from 100 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 48000\n- 4 (from 100 place of first number) * 4 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 4 (from 100 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 16000\n- 4 (from 100 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 320000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 240 + 2400 + 48000 + 1600 + 16000 + 320000 = 388240."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 486 * 975?"}, {"role": "assistant", "content": "Here are the steps for multiplying 486 * 975 using the long multiplication method.\nStep 1: Break first number 486 into its individual digits: 4 (hundreds place), 8 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 975 into its individual digits: 9 (hundreds place), 7 (tens place), and 5 (ones place).\n- 6 (from 1 place of first number) * 5 (from 1 place of second number) = 30 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 6 (from 1 place of first number) * 7 (from 10 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 420\n- 6 (from 1 place of first number) * 9 (from 100 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5400\n- 8 (from 10 place of first number) * 5 (from 1 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 8 (from 10 place of first number) * 7 (from 10 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5600\n- 8 (from 10 place of first number) * 9 (from 100 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 72000\n- 4 (from 100 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2000\n- 4 (from 100 place of first number) * 7 (from 10 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 28000\n- 4 (from 100 place of first number) * 9 (from 100 place of second number) = 36 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 360000\n\nNow, add all these results together:\nThe sum of 30 + 420 + 5400 + 400 + 5600 + 72000 + 2000 + 28000 + 360000 = 473850."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 461 * 222?"}, {"role": "assistant", "content": "Here are the steps for multiplying 461 * 222 using the long multiplication method.\nStep 1: Break first number 461 into its individual digits: 4 (hundreds place), 6 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 222 into its individual digits: 2 (hundreds place), 2 (tens place), and 2 (ones place).\n- 1 (from 1 place of first number) * 2 (from 1 place of second number) = 2 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 2\n- 1 (from 1 place of first number) * 2 (from 10 place of second number) = 2 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 20\n- 1 (from 1 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 200\n- 6 (from 10 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 6 (from 10 place of first number) * 2 (from 10 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1200\n- 6 (from 10 place of first number) * 2 (from 100 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 12000\n- 4 (from 100 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 4 (from 100 place of first number) * 2 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 4 (from 100 place of first number) * 2 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 2 + 20 + 200 + 120 + 1200 + 12000 + 800 + 8000 + 80000 = 102342."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 406 * 685?"}, {"role": "assistant", "content": "Here are the steps for multiplying 406 * 685 using the long multiplication method.\nStep 1: Break first number 406 into its individual digits: 4 (hundreds place), 0 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 685 into its individual digits: 6 (hundreds place), 8 (tens place), and 5 (ones place).\n- 6 (from 1 place of first number) * 5 (from 1 place of second number) = 30 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 6 (from 1 place of first number) * 8 (from 10 place of second number) = 48 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 480\n- 6 (from 1 place of first number) * 6 (from 100 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3600\n- 0 (from 10 place of first number) * 5 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 8 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 6 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 4 (from 100 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2000\n- 4 (from 100 place of first number) * 8 (from 10 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 32000\n- 4 (from 100 place of first number) * 6 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 30 + 480 + 3600 + 0 + 0 + 0 + 2000 + 32000 + 240000 = 278110."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 700 * 295?"}, {"role": "assistant", "content": "Here are the steps for multiplying 700 * 295 using the long multiplication method.\nStep 1: Break first number 700 into its individual digits: 7 (hundreds place), 0 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 295 into its individual digits: 2 (hundreds place), 9 (tens place), and 5 (ones place).\n- 0 (from 1 place of first number) * 5 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 9 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 2 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 0 (from 10 place of first number) * 5 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 9 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 2 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 7 (from 100 place of first number) * 5 (from 1 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3500\n- 7 (from 100 place of first number) * 9 (from 10 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 63000\n- 7 (from 100 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 140000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 0 + 0 + 0 + 3500 + 63000 + 140000 = 206500."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 494 * 489?"}, {"role": "assistant", "content": "Here are the steps for multiplying 494 * 489 using the long multiplication method.\nStep 1: Break first number 494 into its individual digits: 4 (hundreds place), 9 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 489 into its individual digits: 4 (hundreds place), 8 (tens place), and 9 (ones place).\n- 4 (from 1 place of first number) * 9 (from 1 place of second number) = 36 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 36\n- 4 (from 1 place of first number) * 8 (from 10 place of second number) = 32 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 320\n- 4 (from 1 place of first number) * 4 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 9 (from 10 place of first number) * 9 (from 1 place of second number) = 81 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 810\n- 9 (from 10 place of first number) * 8 (from 10 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 7200\n- 9 (from 10 place of first number) * 4 (from 100 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 36000\n- 4 (from 100 place of first number) * 9 (from 1 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3600\n- 4 (from 100 place of first number) * 8 (from 10 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 32000\n- 4 (from 100 place of first number) * 4 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 36 + 320 + 1600 + 810 + 7200 + 36000 + 3600 + 32000 + 160000 = 241566."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 450 * 740?"}, {"role": "assistant", "content": "Here are the steps for multiplying 450 * 740 using the long multiplication method.\nStep 1: Break first number 450 into its individual digits: 4 (hundreds place), 5 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 740 into its individual digits: 7 (hundreds place), 4 (tens place), and 0 (ones place).\n- 0 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 4 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 7 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 5 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 5 (from 10 place of first number) * 4 (from 10 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 5 (from 10 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 35000\n- 4 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 4 (from 100 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 16000\n- 4 (from 100 place of first number) * 7 (from 100 place of second number) = 28 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 280000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 0 + 2000 + 35000 + 0 + 16000 + 280000 = 333000."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 471 * 728?"}, {"role": "assistant", "content": "Here are the steps for multiplying 471 * 728 using the long multiplication method.\nStep 1: Break first number 471 into its individual digits: 4 (hundreds place), 7 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 728 into its individual digits: 7 (hundreds place), 2 (tens place), and 8 (ones place).\n- 1 (from 1 place of first number) * 8 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 1 (from 1 place of first number) * 2 (from 10 place of second number) = 2 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 20\n- 1 (from 1 place of first number) * 7 (from 100 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 700\n- 7 (from 10 place of first number) * 8 (from 1 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 560\n- 7 (from 10 place of first number) * 2 (from 10 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1400\n- 7 (from 10 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 49000\n- 4 (from 100 place of first number) * 8 (from 1 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3200\n- 4 (from 100 place of first number) * 2 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 4 (from 100 place of first number) * 7 (from 100 place of second number) = 28 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 280000\n\nNow, add all these results together:\nThe sum of 8 + 20 + 700 + 560 + 1400 + 49000 + 3200 + 8000 + 280000 = 342888."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 357 * 648?"}, {"role": "assistant", "content": "Here are the steps for multiplying 357 * 648 using the long multiplication method.\nStep 1: Break first number 357 into its individual digits: 3 (hundreds place), 5 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 648 into its individual digits: 6 (hundreds place), 4 (tens place), and 8 (ones place).\n- 7 (from 1 place of first number) * 8 (from 1 place of second number) = 56 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 56\n- 7 (from 1 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 280\n- 7 (from 1 place of first number) * 6 (from 100 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4200\n- 5 (from 10 place of first number) * 8 (from 1 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 5 (from 10 place of first number) * 4 (from 10 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 5 (from 10 place of first number) * 6 (from 100 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n- 3 (from 100 place of first number) * 8 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 3 (from 100 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 3 (from 100 place of first number) * 6 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 56 + 280 + 4200 + 400 + 2000 + 30000 + 2400 + 12000 + 180000 = 231336."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 960 * 532?"}, {"role": "assistant", "content": "Here are the steps for multiplying 960 * 532 using the long multiplication method.\nStep 1: Break first number 960 into its individual digits: 9 (hundreds place), 6 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 532 into its individual digits: 5 (hundreds place), 3 (tens place), and 2 (ones place).\n- 0 (from 1 place of first number) * 2 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 3 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 5 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 6 (from 10 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 6 (from 10 place of first number) * 3 (from 10 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1800\n- 6 (from 10 place of first number) * 5 (from 100 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n- 9 (from 100 place of first number) * 2 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 9 (from 100 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 27000\n- 9 (from 100 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 450000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 120 + 1800 + 30000 + 1800 + 27000 + 450000 = 510720."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 651 * 345?"}, {"role": "assistant", "content": "Here are the steps for multiplying 651 * 345 using the long multiplication method.\nStep 1: Break first number 651 into its individual digits: 6 (hundreds place), 5 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 345 into its individual digits: 3 (hundreds place), 4 (tens place), and 5 (ones place).\n- 1 (from 1 place of first number) * 5 (from 1 place of second number) = 5 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 5\n- 1 (from 1 place of first number) * 4 (from 10 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 40\n- 1 (from 1 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 300\n- 5 (from 10 place of first number) * 5 (from 1 place of second number) = 25 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 250\n- 5 (from 10 place of first number) * 4 (from 10 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 5 (from 10 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 15000\n- 6 (from 100 place of first number) * 5 (from 1 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3000\n- 6 (from 100 place of first number) * 4 (from 10 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 24000\n- 6 (from 100 place of first number) * 3 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 5 + 40 + 300 + 250 + 2000 + 15000 + 3000 + 24000 + 180000 = 224595."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 771 * 775?"}, {"role": "assistant", "content": "Here are the steps for multiplying 771 * 775 using the long multiplication method.\nStep 1: Break first number 771 into its individual digits: 7 (hundreds place), 7 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 775 into its individual digits: 7 (hundreds place), 7 (tens place), and 5 (ones place).\n- 1 (from 1 place of first number) * 5 (from 1 place of second number) = 5 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 5\n- 1 (from 1 place of first number) * 7 (from 10 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 70\n- 1 (from 1 place of first number) * 7 (from 100 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 700\n- 7 (from 10 place of first number) * 5 (from 1 place of second number) = 35 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 350\n- 7 (from 10 place of first number) * 7 (from 10 place of second number) = 49 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4900\n- 7 (from 10 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 49000\n- 7 (from 100 place of first number) * 5 (from 1 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3500\n- 7 (from 100 place of first number) * 7 (from 10 place of second number) = 49 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 49000\n- 7 (from 100 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 490000\n\nNow, add all these results together:\nThe sum of 5 + 70 + 700 + 350 + 4900 + 49000 + 3500 + 49000 + 490000 = 597525."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 535 * 900?"}, {"role": "assistant", "content": "Here are the steps for multiplying 535 * 900 using the long multiplication method.\nStep 1: Break first number 535 into its individual digits: 5 (hundreds place), 3 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 900 into its individual digits: 9 (hundreds place), 0 (tens place), and 0 (ones place).\n- 5 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 5 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 5 (from 1 place of first number) * 9 (from 100 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4500\n- 3 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 3 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 3 (from 10 place of first number) * 9 (from 100 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 27000\n- 5 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 5 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 5 (from 100 place of first number) * 9 (from 100 place of second number) = 45 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 450000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 4500 + 0 + 0 + 27000 + 0 + 0 + 450000 = 481500."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 941 * 323?"}, {"role": "assistant", "content": "Here are the steps for multiplying 941 * 323 using the long multiplication method.\nStep 1: Break first number 941 into its individual digits: 9 (hundreds place), 4 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 323 into its individual digits: 3 (hundreds place), 2 (tens place), and 3 (ones place).\n- 1 (from 1 place of first number) * 3 (from 1 place of second number) = 3 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 3\n- 1 (from 1 place of first number) * 2 (from 10 place of second number) = 2 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 20\n- 1 (from 1 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 300\n- 4 (from 10 place of first number) * 3 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 4 (from 10 place of first number) * 2 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 4 (from 10 place of first number) * 3 (from 100 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 12000\n- 9 (from 100 place of first number) * 3 (from 1 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2700\n- 9 (from 100 place of first number) * 2 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 9 (from 100 place of first number) * 3 (from 100 place of second number) = 27 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 270000\n\nNow, add all these results together:\nThe sum of 3 + 20 + 300 + 120 + 800 + 12000 + 2700 + 18000 + 270000 = 303943."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 250 * 421?"}, {"role": "assistant", "content": "Here are the steps for multiplying 250 * 421 using the long multiplication method.\nStep 1: Break first number 250 into its individual digits: 2 (hundreds place), 5 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 421 into its individual digits: 4 (hundreds place), 2 (tens place), and 1 (ones place).\n- 0 (from 1 place of first number) * 1 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 2 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 4 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 5 (from 10 place of first number) * 1 (from 1 place of second number) = 5 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 50\n- 5 (from 10 place of first number) * 2 (from 10 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1000\n- 5 (from 10 place of first number) * 4 (from 100 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n- 2 (from 100 place of first number) * 1 (from 1 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 200\n- 2 (from 100 place of first number) * 2 (from 10 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 2 (from 100 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 50 + 1000 + 20000 + 200 + 4000 + 80000 = 105250."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 900 * 835?"}, {"role": "assistant", "content": "Here are the steps for multiplying 900 * 835 using the long multiplication method.\nStep 1: Break first number 900 into its individual digits: 9 (hundreds place), 0 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 835 into its individual digits: 8 (hundreds place), 3 (tens place), and 5 (ones place).\n- 0 (from 1 place of first number) * 5 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 3 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 8 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 0 (from 10 place of first number) * 5 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 3 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 8 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 9 (from 100 place of first number) * 5 (from 1 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4500\n- 9 (from 100 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 27000\n- 9 (from 100 place of first number) * 8 (from 100 place of second number) = 72 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 720000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 0 + 0 + 0 + 4500 + 27000 + 720000 = 751500."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 579 * 331?"}, {"role": "assistant", "content": "Here are the steps for multiplying 579 * 331 using the long multiplication method.\nStep 1: Break first number 579 into its individual digits: 5 (hundreds place), 7 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 331 into its individual digits: 3 (hundreds place), 3 (tens place), and 1 (ones place).\n- 9 (from 1 place of first number) * 1 (from 1 place of second number) = 9 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 9\n- 9 (from 1 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 270\n- 9 (from 1 place of first number) * 3 (from 100 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2700\n- 7 (from 10 place of first number) * 1 (from 1 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 70\n- 7 (from 10 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2100\n- 7 (from 10 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 21000\n- 5 (from 100 place of first number) * 1 (from 1 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 500\n- 5 (from 100 place of first number) * 3 (from 10 place of second number) = 15 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 15000\n- 5 (from 100 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 150000\n\nNow, add all these results together:\nThe sum of 9 + 270 + 2700 + 70 + 2100 + 21000 + 500 + 15000 + 150000 = 191649."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 616 * 334?"}, {"role": "assistant", "content": "Here are the steps for multiplying 616 * 334 using the long multiplication method.\nStep 1: Break first number 616 into its individual digits: 6 (hundreds place), 1 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 334 into its individual digits: 3 (hundreds place), 3 (tens place), and 4 (ones place).\n- 6 (from 1 place of first number) * 4 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 6 (from 1 place of first number) * 3 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 6 (from 1 place of first number) * 3 (from 100 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1800\n- 1 (from 10 place of first number) * 4 (from 1 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 1 (from 10 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 300\n- 1 (from 10 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 6 (from 100 place of first number) * 4 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 6 (from 100 place of first number) * 3 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 6 (from 100 place of first number) * 3 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 24 + 180 + 1800 + 40 + 300 + 3000 + 2400 + 18000 + 180000 = 205744."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 706 * 782?"}, {"role": "assistant", "content": "Here are the steps for multiplying 706 * 782 using the long multiplication method.\nStep 1: Break first number 706 into its individual digits: 7 (hundreds place), 0 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 782 into its individual digits: 7 (hundreds place), 8 (tens place), and 2 (ones place).\n- 6 (from 1 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 12\n- 6 (from 1 place of first number) * 8 (from 10 place of second number) = 48 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 480\n- 6 (from 1 place of first number) * 7 (from 100 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4200\n- 0 (from 10 place of first number) * 2 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 8 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 7 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 7 (from 100 place of first number) * 2 (from 1 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1400\n- 7 (from 100 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 56000\n- 7 (from 100 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 490000\n\nNow, add all these results together:\nThe sum of 12 + 480 + 4200 + 0 + 0 + 0 + 1400 + 56000 + 490000 = 552092."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 873 * 336?"}, {"role": "assistant", "content": "Here are the steps for multiplying 873 * 336 using the long multiplication method.\nStep 1: Break first number 873 into its individual digits: 8 (hundreds place), 7 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 336 into its individual digits: 3 (hundreds place), 3 (tens place), and 6 (ones place).\n- 3 (from 1 place of first number) * 6 (from 1 place of second number) = 18 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 18\n- 3 (from 1 place of first number) * 3 (from 10 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 90\n- 3 (from 1 place of first number) * 3 (from 100 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 900\n- 7 (from 10 place of first number) * 6 (from 1 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 420\n- 7 (from 10 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2100\n- 7 (from 10 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 21000\n- 8 (from 100 place of first number) * 6 (from 1 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4800\n- 8 (from 100 place of first number) * 3 (from 10 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 24000\n- 8 (from 100 place of first number) * 3 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 18 + 90 + 900 + 420 + 2100 + 21000 + 4800 + 24000 + 240000 = 293328."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 820 * 244?"}, {"role": "assistant", "content": "Here are the steps for multiplying 820 * 244 using the long multiplication method.\nStep 1: Break first number 820 into its individual digits: 8 (hundreds place), 2 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 244 into its individual digits: 2 (hundreds place), 4 (tens place), and 4 (ones place).\n- 0 (from 1 place of first number) * 4 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 4 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 2 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 2 (from 10 place of first number) * 4 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 2 (from 10 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 2 (from 10 place of first number) * 2 (from 100 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 8 (from 100 place of first number) * 4 (from 1 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3200\n- 8 (from 100 place of first number) * 4 (from 10 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 32000\n- 8 (from 100 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 80 + 800 + 4000 + 3200 + 32000 + 160000 = 200080."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 468 * 197?"}, {"role": "assistant", "content": "Here are the steps for multiplying 468 * 197 using the long multiplication method.\nStep 1: Break first number 468 into its individual digits: 4 (hundreds place), 6 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 197 into its individual digits: 1 (hundreds place), 9 (tens place), and 7 (ones place).\n- 8 (from 1 place of first number) * 7 (from 1 place of second number) = 56 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 56\n- 8 (from 1 place of first number) * 9 (from 10 place of second number) = 72 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 720\n- 8 (from 1 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 6 (from 10 place of first number) * 7 (from 1 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 420\n- 6 (from 10 place of first number) * 9 (from 10 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5400\n- 6 (from 10 place of first number) * 1 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 4 (from 100 place of first number) * 7 (from 1 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2800\n- 4 (from 100 place of first number) * 9 (from 10 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 36000\n- 4 (from 100 place of first number) * 1 (from 100 place of second number) = 4 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n\nNow, add all these results together:\nThe sum of 56 + 720 + 800 + 420 + 5400 + 6000 + 2800 + 36000 + 40000 = 92196."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 307 * 546?"}, {"role": "assistant", "content": "Here are the steps for multiplying 307 * 546 using the long multiplication method.\nStep 1: Break first number 307 into its individual digits: 3 (hundreds place), 0 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 546 into its individual digits: 5 (hundreds place), 4 (tens place), and 6 (ones place).\n- 7 (from 1 place of first number) * 6 (from 1 place of second number) = 42 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 42\n- 7 (from 1 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 280\n- 7 (from 1 place of first number) * 5 (from 100 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3500\n- 0 (from 10 place of first number) * 6 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 4 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 5 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 3 (from 100 place of first number) * 6 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 3 (from 100 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 3 (from 100 place of first number) * 5 (from 100 place of second number) = 15 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 150000\n\nNow, add all these results together:\nThe sum of 42 + 280 + 3500 + 0 + 0 + 0 + 1800 + 12000 + 150000 = 167622."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 177 * 637?"}, {"role": "assistant", "content": "Here are the steps for multiplying 177 * 637 using the long multiplication method.\nStep 1: Break first number 177 into its individual digits: 1 (hundreds place), 7 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 637 into its individual digits: 6 (hundreds place), 3 (tens place), and 7 (ones place).\n- 7 (from 1 place of first number) * 7 (from 1 place of second number) = 49 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 49\n- 7 (from 1 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 210\n- 7 (from 1 place of first number) * 6 (from 100 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4200\n- 7 (from 10 place of first number) * 7 (from 1 place of second number) = 49 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 490\n- 7 (from 10 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2100\n- 7 (from 10 place of first number) * 6 (from 100 place of second number) = 42 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 42000\n- 1 (from 100 place of first number) * 7 (from 1 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 700\n- 1 (from 100 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 1 (from 100 place of first number) * 6 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 49 + 210 + 4200 + 490 + 2100 + 42000 + 700 + 3000 + 60000 = 112749."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 230 * 926?"}, {"role": "assistant", "content": "Here are the steps for multiplying 230 * 926 using the long multiplication method.\nStep 1: Break first number 230 into its individual digits: 2 (hundreds place), 3 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 926 into its individual digits: 9 (hundreds place), 2 (tens place), and 6 (ones place).\n- 0 (from 1 place of first number) * 6 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 2 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 9 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 3 (from 10 place of first number) * 6 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 3 (from 10 place of first number) * 2 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 3 (from 10 place of first number) * 9 (from 100 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 27000\n- 2 (from 100 place of first number) * 6 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 2 (from 100 place of first number) * 2 (from 10 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 2 (from 100 place of first number) * 9 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 180 + 600 + 27000 + 1200 + 4000 + 180000 = 212980."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 699 * 564?"}, {"role": "assistant", "content": "Here are the steps for multiplying 699 * 564 using the long multiplication method.\nStep 1: Break first number 699 into its individual digits: 6 (hundreds place), 9 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 564 into its individual digits: 5 (hundreds place), 6 (tens place), and 4 (ones place).\n- 9 (from 1 place of first number) * 4 (from 1 place of second number) = 36 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 36\n- 9 (from 1 place of first number) * 6 (from 10 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 540\n- 9 (from 1 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4500\n- 9 (from 10 place of first number) * 4 (from 1 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 360\n- 9 (from 10 place of first number) * 6 (from 10 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5400\n- 9 (from 10 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 45000\n- 6 (from 100 place of first number) * 4 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 6 (from 100 place of first number) * 6 (from 10 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 36000\n- 6 (from 100 place of first number) * 5 (from 100 place of second number) = 30 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 300000\n\nNow, add all these results together:\nThe sum of 36 + 540 + 4500 + 360 + 5400 + 45000 + 2400 + 36000 + 300000 = 394236."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 740 * 715?"}, {"role": "assistant", "content": "Here are the steps for multiplying 740 * 715 using the long multiplication method.\nStep 1: Break first number 740 into its individual digits: 7 (hundreds place), 4 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 715 into its individual digits: 7 (hundreds place), 1 (tens place), and 5 (ones place).\n- 0 (from 1 place of first number) * 5 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 1 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 7 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 4 (from 10 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 200\n- 4 (from 10 place of first number) * 1 (from 10 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 4 (from 10 place of first number) * 7 (from 100 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 28000\n- 7 (from 100 place of first number) * 5 (from 1 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3500\n- 7 (from 100 place of first number) * 1 (from 10 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 7000\n- 7 (from 100 place of first number) * 7 (from 100 place of second number) = 49 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 490000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 200 + 400 + 28000 + 3500 + 7000 + 490000 = 529100."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 520 * 704?"}, {"role": "assistant", "content": "Here are the steps for multiplying 520 * 704 using the long multiplication method.\nStep 1: Break first number 520 into its individual digits: 5 (hundreds place), 2 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 704 into its individual digits: 7 (hundreds place), 0 (tens place), and 4 (ones place).\n- 0 (from 1 place of first number) * 4 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 7 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 2 (from 10 place of first number) * 4 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 2 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 2 (from 10 place of first number) * 7 (from 100 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 14000\n- 5 (from 100 place of first number) * 4 (from 1 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2000\n- 5 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 5 (from 100 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 350000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 80 + 0 + 14000 + 2000 + 0 + 350000 = 366080."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 419 * 630?"}, {"role": "assistant", "content": "Here are the steps for multiplying 419 * 630 using the long multiplication method.\nStep 1: Break first number 419 into its individual digits: 4 (hundreds place), 1 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 630 into its individual digits: 6 (hundreds place), 3 (tens place), and 0 (ones place).\n- 9 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 9 (from 1 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 270\n- 9 (from 1 place of first number) * 6 (from 100 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5400\n- 1 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 1 (from 10 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 300\n- 1 (from 10 place of first number) * 6 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 4 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 4 (from 100 place of first number) * 3 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 4 (from 100 place of first number) * 6 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 0 + 270 + 5400 + 0 + 300 + 6000 + 0 + 12000 + 240000 = 263970."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 418 * 459?"}, {"role": "assistant", "content": "Here are the steps for multiplying 418 * 459 using the long multiplication method.\nStep 1: Break first number 418 into its individual digits: 4 (hundreds place), 1 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 459 into its individual digits: 4 (hundreds place), 5 (tens place), and 9 (ones place).\n- 8 (from 1 place of first number) * 9 (from 1 place of second number) = 72 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 72\n- 8 (from 1 place of first number) * 5 (from 10 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 8 (from 1 place of first number) * 4 (from 100 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3200\n- 1 (from 10 place of first number) * 9 (from 1 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 90\n- 1 (from 10 place of first number) * 5 (from 10 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 500\n- 1 (from 10 place of first number) * 4 (from 100 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 4 (from 100 place of first number) * 9 (from 1 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3600\n- 4 (from 100 place of first number) * 5 (from 10 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 20000\n- 4 (from 100 place of first number) * 4 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 72 + 400 + 3200 + 90 + 500 + 4000 + 3600 + 20000 + 160000 = 191862."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 171 * 319?"}, {"role": "assistant", "content": "Here are the steps for multiplying 171 * 319 using the long multiplication method.\nStep 1: Break first number 171 into its individual digits: 1 (hundreds place), 7 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 319 into its individual digits: 3 (hundreds place), 1 (tens place), and 9 (ones place).\n- 1 (from 1 place of first number) * 9 (from 1 place of second number) = 9 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 9\n- 1 (from 1 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 10\n- 1 (from 1 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 300\n- 7 (from 10 place of first number) * 9 (from 1 place of second number) = 63 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 630\n- 7 (from 10 place of first number) * 1 (from 10 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 700\n- 7 (from 10 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 21000\n- 1 (from 100 place of first number) * 9 (from 1 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 900\n- 1 (from 100 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 1000\n- 1 (from 100 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n\nNow, add all these results together:\nThe sum of 9 + 10 + 300 + 630 + 700 + 21000 + 900 + 1000 + 30000 = 54549."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 263 * 260?"}, {"role": "assistant", "content": "Here are the steps for multiplying 263 * 260 using the long multiplication method.\nStep 1: Break first number 263 into its individual digits: 2 (hundreds place), 6 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 260 into its individual digits: 2 (hundreds place), 6 (tens place), and 0 (ones place).\n- 3 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 3 (from 1 place of first number) * 6 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 3 (from 1 place of first number) * 2 (from 100 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 600\n- 6 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 6 (from 10 place of first number) * 6 (from 10 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3600\n- 6 (from 10 place of first number) * 2 (from 100 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 12000\n- 2 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 2 (from 100 place of first number) * 6 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 2 (from 100 place of first number) * 2 (from 100 place of second number) = 4 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n\nNow, add all these results together:\nThe sum of 0 + 180 + 600 + 0 + 3600 + 12000 + 0 + 12000 + 40000 = 68380."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 623 * 299?"}, {"role": "assistant", "content": "Here are the steps for multiplying 623 * 299 using the long multiplication method.\nStep 1: Break first number 623 into its individual digits: 6 (hundreds place), 2 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 299 into its individual digits: 2 (hundreds place), 9 (tens place), and 9 (ones place).\n- 3 (from 1 place of first number) * 9 (from 1 place of second number) = 27 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 27\n- 3 (from 1 place of first number) * 9 (from 10 place of second number) = 27 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 270\n- 3 (from 1 place of first number) * 2 (from 100 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 600\n- 2 (from 10 place of first number) * 9 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 2 (from 10 place of first number) * 9 (from 10 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1800\n- 2 (from 10 place of first number) * 2 (from 100 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 6 (from 100 place of first number) * 9 (from 1 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 5400\n- 6 (from 100 place of first number) * 9 (from 10 place of second number) = 54 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 54000\n- 6 (from 100 place of first number) * 2 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 27 + 270 + 600 + 180 + 1800 + 4000 + 5400 + 54000 + 120000 = 186277."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 572 * 830?"}, {"role": "assistant", "content": "Here are the steps for multiplying 572 * 830 using the long multiplication method.\nStep 1: Break first number 572 into its individual digits: 5 (hundreds place), 7 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 830 into its individual digits: 8 (hundreds place), 3 (tens place), and 0 (ones place).\n- 2 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 2 (from 1 place of first number) * 3 (from 10 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 60\n- 2 (from 1 place of first number) * 8 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 7 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 10 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2100\n- 7 (from 10 place of first number) * 8 (from 100 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 56000\n- 5 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 5 (from 100 place of first number) * 3 (from 10 place of second number) = 15 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 15000\n- 5 (from 100 place of first number) * 8 (from 100 place of second number) = 40 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 400000\n\nNow, add all these results together:\nThe sum of 0 + 60 + 1600 + 0 + 2100 + 56000 + 0 + 15000 + 400000 = 474760."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 478 * 126?"}, {"role": "assistant", "content": "Here are the steps for multiplying 478 * 126 using the long multiplication method.\nStep 1: Break first number 478 into its individual digits: 4 (hundreds place), 7 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 126 into its individual digits: 1 (hundreds place), 2 (tens place), and 6 (ones place).\n- 8 (from 1 place of first number) * 6 (from 1 place of second number) = 48 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 48\n- 8 (from 1 place of first number) * 2 (from 10 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 160\n- 8 (from 1 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 7 (from 10 place of first number) * 6 (from 1 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 420\n- 7 (from 10 place of first number) * 2 (from 10 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1400\n- 7 (from 10 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 7000\n- 4 (from 100 place of first number) * 6 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 4 (from 100 place of first number) * 2 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 4 (from 100 place of first number) * 1 (from 100 place of second number) = 4 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n\nNow, add all these results together:\nThe sum of 48 + 160 + 800 + 420 + 1400 + 7000 + 2400 + 8000 + 40000 = 60228."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 149 * 382?"}, {"role": "assistant", "content": "Here are the steps for multiplying 149 * 382 using the long multiplication method.\nStep 1: Break first number 149 into its individual digits: 1 (hundreds place), 4 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 382 into its individual digits: 3 (hundreds place), 8 (tens place), and 2 (ones place).\n- 9 (from 1 place of first number) * 2 (from 1 place of second number) = 18 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 18\n- 9 (from 1 place of first number) * 8 (from 10 place of second number) = 72 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 720\n- 9 (from 1 place of first number) * 3 (from 100 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2700\n- 4 (from 10 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 4 (from 10 place of first number) * 8 (from 10 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3200\n- 4 (from 10 place of first number) * 3 (from 100 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 12000\n- 1 (from 100 place of first number) * 2 (from 1 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 200\n- 1 (from 100 place of first number) * 8 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 1 (from 100 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n\nNow, add all these results together:\nThe sum of 18 + 720 + 2700 + 80 + 3200 + 12000 + 200 + 8000 + 30000 = 56918."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 424 * 728?"}, {"role": "assistant", "content": "Here are the steps for multiplying 424 * 728 using the long multiplication method.\nStep 1: Break first number 424 into its individual digits: 4 (hundreds place), 2 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 728 into its individual digits: 7 (hundreds place), 2 (tens place), and 8 (ones place).\n- 4 (from 1 place of first number) * 8 (from 1 place of second number) = 32 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 32\n- 4 (from 1 place of first number) * 2 (from 10 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 80\n- 4 (from 1 place of first number) * 7 (from 100 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2800\n- 2 (from 10 place of first number) * 8 (from 1 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 160\n- 2 (from 10 place of first number) * 2 (from 10 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 2 (from 10 place of first number) * 7 (from 100 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 14000\n- 4 (from 100 place of first number) * 8 (from 1 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3200\n- 4 (from 100 place of first number) * 2 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 4 (from 100 place of first number) * 7 (from 100 place of second number) = 28 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 280000\n\nNow, add all these results together:\nThe sum of 32 + 80 + 2800 + 160 + 400 + 14000 + 3200 + 8000 + 280000 = 308672."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 184 * 801?"}, {"role": "assistant", "content": "Here are the steps for multiplying 184 * 801 using the long multiplication method.\nStep 1: Break first number 184 into its individual digits: 1 (hundreds place), 8 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 801 into its individual digits: 8 (hundreds place), 0 (tens place), and 1 (ones place).\n- 4 (from 1 place of first number) * 1 (from 1 place of second number) = 4 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 4\n- 4 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 4 (from 1 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3200\n- 8 (from 10 place of first number) * 1 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 8 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 8 (from 10 place of first number) * 8 (from 100 place of second number) = 64 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 64000\n- 1 (from 100 place of first number) * 1 (from 1 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 100\n- 1 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 1 (from 100 place of first number) * 8 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 4 + 0 + 3200 + 80 + 0 + 64000 + 100 + 0 + 80000 = 147384."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 371 * 441?"}, {"role": "assistant", "content": "Here are the steps for multiplying 371 * 441 using the long multiplication method.\nStep 1: Break first number 371 into its individual digits: 3 (hundreds place), 7 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 441 into its individual digits: 4 (hundreds place), 4 (tens place), and 1 (ones place).\n- 1 (from 1 place of first number) * 1 (from 1 place of second number) = 1 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 1\n- 1 (from 1 place of first number) * 4 (from 10 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 40\n- 1 (from 1 place of first number) * 4 (from 100 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 400\n- 7 (from 10 place of first number) * 1 (from 1 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 70\n- 7 (from 10 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2800\n- 7 (from 10 place of first number) * 4 (from 100 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 28000\n- 3 (from 100 place of first number) * 1 (from 1 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 3 (from 100 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 3 (from 100 place of first number) * 4 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 1 + 40 + 400 + 70 + 2800 + 28000 + 300 + 12000 + 120000 = 163611."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 442 * 201?"}, {"role": "assistant", "content": "Here are the steps for multiplying 442 * 201 using the long multiplication method.\nStep 1: Break first number 442 into its individual digits: 4 (hundreds place), 4 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 201 into its individual digits: 2 (hundreds place), 0 (tens place), and 1 (ones place).\n- 2 (from 1 place of first number) * 1 (from 1 place of second number) = 2 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 2\n- 2 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 2 (from 1 place of first number) * 2 (from 100 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 400\n- 4 (from 10 place of first number) * 1 (from 1 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 4 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 4 (from 10 place of first number) * 2 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 4 (from 100 place of first number) * 1 (from 1 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 4 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 4 (from 100 place of first number) * 2 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 2 + 0 + 400 + 40 + 0 + 8000 + 400 + 0 + 80000 = 88842."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 526 * 742?"}, {"role": "assistant", "content": "Here are the steps for multiplying 526 * 742 using the long multiplication method.\nStep 1: Break first number 526 into its individual digits: 5 (hundreds place), 2 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 742 into its individual digits: 7 (hundreds place), 4 (tens place), and 2 (ones place).\n- 6 (from 1 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 12\n- 6 (from 1 place of first number) * 4 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 6 (from 1 place of first number) * 7 (from 100 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4200\n- 2 (from 10 place of first number) * 2 (from 1 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 2 (from 10 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 2 (from 10 place of first number) * 7 (from 100 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 14000\n- 5 (from 100 place of first number) * 2 (from 1 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1000\n- 5 (from 100 place of first number) * 4 (from 10 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 20000\n- 5 (from 100 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 350000\n\nNow, add all these results together:\nThe sum of 12 + 240 + 4200 + 40 + 800 + 14000 + 1000 + 20000 + 350000 = 390292."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 747 * 169?"}, {"role": "assistant", "content": "Here are the steps for multiplying 747 * 169 using the long multiplication method.\nStep 1: Break first number 747 into its individual digits: 7 (hundreds place), 4 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 169 into its individual digits: 1 (hundreds place), 6 (tens place), and 9 (ones place).\n- 7 (from 1 place of first number) * 9 (from 1 place of second number) = 63 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 63\n- 7 (from 1 place of first number) * 6 (from 10 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 420\n- 7 (from 1 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 700\n- 4 (from 10 place of first number) * 9 (from 1 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 360\n- 4 (from 10 place of first number) * 6 (from 10 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2400\n- 4 (from 10 place of first number) * 1 (from 100 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 7 (from 100 place of first number) * 9 (from 1 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 6300\n- 7 (from 100 place of first number) * 6 (from 10 place of second number) = 42 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 42000\n- 7 (from 100 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 70000\n\nNow, add all these results together:\nThe sum of 63 + 420 + 700 + 360 + 2400 + 4000 + 6300 + 42000 + 70000 = 126243."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 808 * 939?"}, {"role": "assistant", "content": "Here are the steps for multiplying 808 * 939 using the long multiplication method.\nStep 1: Break first number 808 into its individual digits: 8 (hundreds place), 0 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 939 into its individual digits: 9 (hundreds place), 3 (tens place), and 9 (ones place).\n- 8 (from 1 place of first number) * 9 (from 1 place of second number) = 72 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 72\n- 8 (from 1 place of first number) * 3 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 8 (from 1 place of first number) * 9 (from 100 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 7200\n- 0 (from 10 place of first number) * 9 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 3 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 9 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 8 (from 100 place of first number) * 9 (from 1 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 7200\n- 8 (from 100 place of first number) * 3 (from 10 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 24000\n- 8 (from 100 place of first number) * 9 (from 100 place of second number) = 72 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 720000\n\nNow, add all these results together:\nThe sum of 72 + 240 + 7200 + 0 + 0 + 0 + 7200 + 24000 + 720000 = 758712."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 414 * 598?"}, {"role": "assistant", "content": "Here are the steps for multiplying 414 * 598 using the long multiplication method.\nStep 1: Break first number 414 into its individual digits: 4 (hundreds place), 1 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 598 into its individual digits: 5 (hundreds place), 9 (tens place), and 8 (ones place).\n- 4 (from 1 place of first number) * 8 (from 1 place of second number) = 32 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 32\n- 4 (from 1 place of first number) * 9 (from 10 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 360\n- 4 (from 1 place of first number) * 5 (from 100 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 1 (from 10 place of first number) * 8 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 1 (from 10 place of first number) * 9 (from 10 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 900\n- 1 (from 10 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 5000\n- 4 (from 100 place of first number) * 8 (from 1 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3200\n- 4 (from 100 place of first number) * 9 (from 10 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 36000\n- 4 (from 100 place of first number) * 5 (from 100 place of second number) = 20 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 200000\n\nNow, add all these results together:\nThe sum of 32 + 360 + 2000 + 80 + 900 + 5000 + 3200 + 36000 + 200000 = 247572."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 119 * 313?"}, {"role": "assistant", "content": "Here are the steps for multiplying 119 * 313 using the long multiplication method.\nStep 1: Break first number 119 into its individual digits: 1 (hundreds place), 1 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 313 into its individual digits: 3 (hundreds place), 1 (tens place), and 3 (ones place).\n- 9 (from 1 place of first number) * 3 (from 1 place of second number) = 27 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 27\n- 9 (from 1 place of first number) * 1 (from 10 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 90\n- 9 (from 1 place of first number) * 3 (from 100 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2700\n- 1 (from 10 place of first number) * 3 (from 1 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 1 (from 10 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 1 (from 10 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 1 (from 100 place of first number) * 3 (from 1 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 1 (from 100 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 1000\n- 1 (from 100 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n\nNow, add all these results together:\nThe sum of 27 + 90 + 2700 + 30 + 100 + 3000 + 300 + 1000 + 30000 = 37247."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 533 * 761?"}, {"role": "assistant", "content": "Here are the steps for multiplying 533 * 761 using the long multiplication method.\nStep 1: Break first number 533 into its individual digits: 5 (hundreds place), 3 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 761 into its individual digits: 7 (hundreds place), 6 (tens place), and 1 (ones place).\n- 3 (from 1 place of first number) * 1 (from 1 place of second number) = 3 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 3\n- 3 (from 1 place of first number) * 6 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 3 (from 1 place of first number) * 7 (from 100 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2100\n- 3 (from 10 place of first number) * 1 (from 1 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 3 (from 10 place of first number) * 6 (from 10 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1800\n- 3 (from 10 place of first number) * 7 (from 100 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 21000\n- 5 (from 100 place of first number) * 1 (from 1 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 500\n- 5 (from 100 place of first number) * 6 (from 10 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 30000\n- 5 (from 100 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 350000\n\nNow, add all these results together:\nThe sum of 3 + 180 + 2100 + 30 + 1800 + 21000 + 500 + 30000 + 350000 = 405613."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 172 * 178?"}, {"role": "assistant", "content": "Here are the steps for multiplying 172 * 178 using the long multiplication method.\nStep 1: Break first number 172 into its individual digits: 1 (hundreds place), 7 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 178 into its individual digits: 1 (hundreds place), 7 (tens place), and 8 (ones place).\n- 2 (from 1 place of first number) * 8 (from 1 place of second number) = 16 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 16\n- 2 (from 1 place of first number) * 7 (from 10 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 140\n- 2 (from 1 place of first number) * 1 (from 100 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 200\n- 7 (from 10 place of first number) * 8 (from 1 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 560\n- 7 (from 10 place of first number) * 7 (from 10 place of second number) = 49 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4900\n- 7 (from 10 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 7000\n- 1 (from 100 place of first number) * 8 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 1 (from 100 place of first number) * 7 (from 10 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 7000\n- 1 (from 100 place of first number) * 1 (from 100 place of second number) = 1 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 10000\n\nNow, add all these results together:\nThe sum of 16 + 140 + 200 + 560 + 4900 + 7000 + 800 + 7000 + 10000 = 30616."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 109 * 170?"}, {"role": "assistant", "content": "Here are the steps for multiplying 109 * 170 using the long multiplication method.\nStep 1: Break first number 109 into its individual digits: 1 (hundreds place), 0 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 170 into its individual digits: 1 (hundreds place), 7 (tens place), and 0 (ones place).\n- 9 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 9 (from 1 place of first number) * 7 (from 10 place of second number) = 63 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 630\n- 9 (from 1 place of first number) * 1 (from 100 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 900\n- 0 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 7 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 1 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 1 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 1 (from 100 place of first number) * 7 (from 10 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 7000\n- 1 (from 100 place of first number) * 1 (from 100 place of second number) = 1 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 10000\n\nNow, add all these results together:\nThe sum of 0 + 630 + 900 + 0 + 0 + 0 + 0 + 7000 + 10000 = 18530."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 754 * 992?"}, {"role": "assistant", "content": "Here are the steps for multiplying 754 * 992 using the long multiplication method.\nStep 1: Break first number 754 into its individual digits: 7 (hundreds place), 5 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 992 into its individual digits: 9 (hundreds place), 9 (tens place), and 2 (ones place).\n- 4 (from 1 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 4 (from 1 place of first number) * 9 (from 10 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 360\n- 4 (from 1 place of first number) * 9 (from 100 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3600\n- 5 (from 10 place of first number) * 2 (from 1 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 100\n- 5 (from 10 place of first number) * 9 (from 10 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4500\n- 5 (from 10 place of first number) * 9 (from 100 place of second number) = 45 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 45000\n- 7 (from 100 place of first number) * 2 (from 1 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1400\n- 7 (from 100 place of first number) * 9 (from 10 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 63000\n- 7 (from 100 place of first number) * 9 (from 100 place of second number) = 63 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 630000\n\nNow, add all these results together:\nThe sum of 8 + 360 + 3600 + 100 + 4500 + 45000 + 1400 + 63000 + 630000 = 747968."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 592 * 784?"}, {"role": "assistant", "content": "Here are the steps for multiplying 592 * 784 using the long multiplication method.\nStep 1: Break first number 592 into its individual digits: 5 (hundreds place), 9 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 784 into its individual digits: 7 (hundreds place), 8 (tens place), and 4 (ones place).\n- 2 (from 1 place of first number) * 4 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 2 (from 1 place of first number) * 8 (from 10 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 160\n- 2 (from 1 place of first number) * 7 (from 100 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1400\n- 9 (from 10 place of first number) * 4 (from 1 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 360\n- 9 (from 10 place of first number) * 8 (from 10 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 7200\n- 9 (from 10 place of first number) * 7 (from 100 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 63000\n- 5 (from 100 place of first number) * 4 (from 1 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2000\n- 5 (from 100 place of first number) * 8 (from 10 place of second number) = 40 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 40000\n- 5 (from 100 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 350000\n\nNow, add all these results together:\nThe sum of 8 + 160 + 1400 + 360 + 7200 + 63000 + 2000 + 40000 + 350000 = 464128."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 928 * 910?"}, {"role": "assistant", "content": "Here are the steps for multiplying 928 * 910 using the long multiplication method.\nStep 1: Break first number 928 into its individual digits: 9 (hundreds place), 2 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 910 into its individual digits: 9 (hundreds place), 1 (tens place), and 0 (ones place).\n- 8 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 1 place of first number) * 1 (from 10 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 80\n- 8 (from 1 place of first number) * 9 (from 100 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 7200\n- 2 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 2 (from 10 place of first number) * 1 (from 10 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 200\n- 2 (from 10 place of first number) * 9 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 9 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 9 (from 100 place of first number) * 1 (from 10 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 9000\n- 9 (from 100 place of first number) * 9 (from 100 place of second number) = 81 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 810000\n\nNow, add all these results together:\nThe sum of 0 + 80 + 7200 + 0 + 200 + 18000 + 0 + 9000 + 810000 = 844480."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 905 * 715?"}, {"role": "assistant", "content": "Here are the steps for multiplying 905 * 715 using the long multiplication method.\nStep 1: Break first number 905 into its individual digits: 9 (hundreds place), 0 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 715 into its individual digits: 7 (hundreds place), 1 (tens place), and 5 (ones place).\n- 5 (from 1 place of first number) * 5 (from 1 place of second number) = 25 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 25\n- 5 (from 1 place of first number) * 1 (from 10 place of second number) = 5 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 50\n- 5 (from 1 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3500\n- 0 (from 10 place of first number) * 5 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 1 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 7 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 9 (from 100 place of first number) * 5 (from 1 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4500\n- 9 (from 100 place of first number) * 1 (from 10 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 9000\n- 9 (from 100 place of first number) * 7 (from 100 place of second number) = 63 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 630000\n\nNow, add all these results together:\nThe sum of 25 + 50 + 3500 + 0 + 0 + 0 + 4500 + 9000 + 630000 = 647075."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 415 * 501?"}, {"role": "assistant", "content": "Here are the steps for multiplying 415 * 501 using the long multiplication method.\nStep 1: Break first number 415 into its individual digits: 4 (hundreds place), 1 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 501 into its individual digits: 5 (hundreds place), 0 (tens place), and 1 (ones place).\n- 5 (from 1 place of first number) * 1 (from 1 place of second number) = 5 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 5\n- 5 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 5 (from 1 place of first number) * 5 (from 100 place of second number) = 25 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2500\n- 1 (from 10 place of first number) * 1 (from 1 place of second number) = 1 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 10\n- 1 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 1 (from 10 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 5000\n- 4 (from 100 place of first number) * 1 (from 1 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 4 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 4 (from 100 place of first number) * 5 (from 100 place of second number) = 20 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 200000\n\nNow, add all these results together:\nThe sum of 5 + 0 + 2500 + 10 + 0 + 5000 + 400 + 0 + 200000 = 207915."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 358 * 424?"}, {"role": "assistant", "content": "Here are the steps for multiplying 358 * 424 using the long multiplication method.\nStep 1: Break first number 358 into its individual digits: 3 (hundreds place), 5 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 424 into its individual digits: 4 (hundreds place), 2 (tens place), and 4 (ones place).\n- 8 (from 1 place of first number) * 4 (from 1 place of second number) = 32 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 32\n- 8 (from 1 place of first number) * 2 (from 10 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 160\n- 8 (from 1 place of first number) * 4 (from 100 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3200\n- 5 (from 10 place of first number) * 4 (from 1 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 200\n- 5 (from 10 place of first number) * 2 (from 10 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1000\n- 5 (from 10 place of first number) * 4 (from 100 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n- 3 (from 100 place of first number) * 4 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 3 (from 100 place of first number) * 2 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 3 (from 100 place of first number) * 4 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 32 + 160 + 3200 + 200 + 1000 + 20000 + 1200 + 6000 + 120000 = 151792."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 881 * 808?"}, {"role": "assistant", "content": "Here are the steps for multiplying 881 * 808 using the long multiplication method.\nStep 1: Break first number 881 into its individual digits: 8 (hundreds place), 8 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 808 into its individual digits: 8 (hundreds place), 0 (tens place), and 8 (ones place).\n- 1 (from 1 place of first number) * 8 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 1 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 1 (from 1 place of first number) * 8 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 8 (from 10 place of first number) * 8 (from 1 place of second number) = 64 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 640\n- 8 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 8 (from 10 place of first number) * 8 (from 100 place of second number) = 64 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 64000\n- 8 (from 100 place of first number) * 8 (from 1 place of second number) = 64 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 6400\n- 8 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 8 (from 100 place of first number) * 8 (from 100 place of second number) = 64 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 640000\n\nNow, add all these results together:\nThe sum of 8 + 0 + 800 + 640 + 0 + 64000 + 6400 + 0 + 640000 = 711848."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 671 * 916?"}, {"role": "assistant", "content": "Here are the steps for multiplying 671 * 916 using the long multiplication method.\nStep 1: Break first number 671 into its individual digits: 6 (hundreds place), 7 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 916 into its individual digits: 9 (hundreds place), 1 (tens place), and 6 (ones place).\n- 1 (from 1 place of first number) * 6 (from 1 place of second number) = 6 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 6\n- 1 (from 1 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 10\n- 1 (from 1 place of first number) * 9 (from 100 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 900\n- 7 (from 10 place of first number) * 6 (from 1 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 420\n- 7 (from 10 place of first number) * 1 (from 10 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 700\n- 7 (from 10 place of first number) * 9 (from 100 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 63000\n- 6 (from 100 place of first number) * 6 (from 1 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3600\n- 6 (from 100 place of first number) * 1 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 6 (from 100 place of first number) * 9 (from 100 place of second number) = 54 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 540000\n\nNow, add all these results together:\nThe sum of 6 + 10 + 900 + 420 + 700 + 63000 + 3600 + 6000 + 540000 = 614636."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 133 * 840?"}, {"role": "assistant", "content": "Here are the steps for multiplying 133 * 840 using the long multiplication method.\nStep 1: Break first number 133 into its individual digits: 1 (hundreds place), 3 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 840 into its individual digits: 8 (hundreds place), 4 (tens place), and 0 (ones place).\n- 3 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 3 (from 1 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 120\n- 3 (from 1 place of first number) * 8 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 3 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 3 (from 10 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1200\n- 3 (from 10 place of first number) * 8 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 1 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 1 (from 100 place of first number) * 4 (from 10 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 1 (from 100 place of first number) * 8 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 0 + 120 + 2400 + 0 + 1200 + 24000 + 0 + 4000 + 80000 = 111720."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 490 * 154?"}, {"role": "assistant", "content": "Here are the steps for multiplying 490 * 154 using the long multiplication method.\nStep 1: Break first number 490 into its individual digits: 4 (hundreds place), 9 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 154 into its individual digits: 1 (hundreds place), 5 (tens place), and 4 (ones place).\n- 0 (from 1 place of first number) * 4 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 5 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 1 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 9 (from 10 place of first number) * 4 (from 1 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 360\n- 9 (from 10 place of first number) * 5 (from 10 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4500\n- 9 (from 10 place of first number) * 1 (from 100 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 9000\n- 4 (from 100 place of first number) * 4 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 4 (from 100 place of first number) * 5 (from 10 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 20000\n- 4 (from 100 place of first number) * 1 (from 100 place of second number) = 4 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 360 + 4500 + 9000 + 1600 + 20000 + 40000 = 75460."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 547 * 877?"}, {"role": "assistant", "content": "Here are the steps for multiplying 547 * 877 using the long multiplication method.\nStep 1: Break first number 547 into its individual digits: 5 (hundreds place), 4 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 877 into its individual digits: 8 (hundreds place), 7 (tens place), and 7 (ones place).\n- 7 (from 1 place of first number) * 7 (from 1 place of second number) = 49 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 49\n- 7 (from 1 place of first number) * 7 (from 10 place of second number) = 49 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 490\n- 7 (from 1 place of first number) * 8 (from 100 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5600\n- 4 (from 10 place of first number) * 7 (from 1 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 280\n- 4 (from 10 place of first number) * 7 (from 10 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2800\n- 4 (from 10 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 32000\n- 5 (from 100 place of first number) * 7 (from 1 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3500\n- 5 (from 100 place of first number) * 7 (from 10 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 35000\n- 5 (from 100 place of first number) * 8 (from 100 place of second number) = 40 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 400000\n\nNow, add all these results together:\nThe sum of 49 + 490 + 5600 + 280 + 2800 + 32000 + 3500 + 35000 + 400000 = 479719."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 927 * 282?"}, {"role": "assistant", "content": "Here are the steps for multiplying 927 * 282 using the long multiplication method.\nStep 1: Break first number 927 into its individual digits: 9 (hundreds place), 2 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 282 into its individual digits: 2 (hundreds place), 8 (tens place), and 2 (ones place).\n- 7 (from 1 place of first number) * 2 (from 1 place of second number) = 14 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 14\n- 7 (from 1 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 560\n- 7 (from 1 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1400\n- 2 (from 10 place of first number) * 2 (from 1 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 2 (from 10 place of first number) * 8 (from 10 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1600\n- 2 (from 10 place of first number) * 2 (from 100 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 9 (from 100 place of first number) * 2 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 9 (from 100 place of first number) * 8 (from 10 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 72000\n- 9 (from 100 place of first number) * 2 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 14 + 560 + 1400 + 40 + 1600 + 4000 + 1800 + 72000 + 180000 = 261414."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 178 * 966?"}, {"role": "assistant", "content": "Here are the steps for multiplying 178 * 966 using the long multiplication method.\nStep 1: Break first number 178 into its individual digits: 1 (hundreds place), 7 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 966 into its individual digits: 9 (hundreds place), 6 (tens place), and 6 (ones place).\n- 8 (from 1 place of first number) * 6 (from 1 place of second number) = 48 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 48\n- 8 (from 1 place of first number) * 6 (from 10 place of second number) = 48 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 480\n- 8 (from 1 place of first number) * 9 (from 100 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 7200\n- 7 (from 10 place of first number) * 6 (from 1 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 420\n- 7 (from 10 place of first number) * 6 (from 10 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4200\n- 7 (from 10 place of first number) * 9 (from 100 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 63000\n- 1 (from 100 place of first number) * 6 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 1 (from 100 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 1 (from 100 place of first number) * 9 (from 100 place of second number) = 9 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 90000\n\nNow, add all these results together:\nThe sum of 48 + 480 + 7200 + 420 + 4200 + 63000 + 600 + 6000 + 90000 = 171948."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 345 * 363?"}, {"role": "assistant", "content": "Here are the steps for multiplying 345 * 363 using the long multiplication method.\nStep 1: Break first number 345 into its individual digits: 3 (hundreds place), 4 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 363 into its individual digits: 3 (hundreds place), 6 (tens place), and 3 (ones place).\n- 5 (from 1 place of first number) * 3 (from 1 place of second number) = 15 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 15\n- 5 (from 1 place of first number) * 6 (from 10 place of second number) = 30 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 300\n- 5 (from 1 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1500\n- 4 (from 10 place of first number) * 3 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 4 (from 10 place of first number) * 6 (from 10 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2400\n- 4 (from 10 place of first number) * 3 (from 100 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 12000\n- 3 (from 100 place of first number) * 3 (from 1 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 900\n- 3 (from 100 place of first number) * 6 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 3 (from 100 place of first number) * 3 (from 100 place of second number) = 9 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 90000\n\nNow, add all these results together:\nThe sum of 15 + 300 + 1500 + 120 + 2400 + 12000 + 900 + 18000 + 90000 = 125235."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 720 * 380?"}, {"role": "assistant", "content": "Here are the steps for multiplying 720 * 380 using the long multiplication method.\nStep 1: Break first number 720 into its individual digits: 7 (hundreds place), 2 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 380 into its individual digits: 3 (hundreds place), 8 (tens place), and 0 (ones place).\n- 0 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 8 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 3 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 2 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 2 (from 10 place of first number) * 8 (from 10 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1600\n- 2 (from 10 place of first number) * 3 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 7 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 100 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 56000\n- 7 (from 100 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 210000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 0 + 1600 + 6000 + 0 + 56000 + 210000 = 273600."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 672 * 448?"}, {"role": "assistant", "content": "Here are the steps for multiplying 672 * 448 using the long multiplication method.\nStep 1: Break first number 672 into its individual digits: 6 (hundreds place), 7 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 448 into its individual digits: 4 (hundreds place), 4 (tens place), and 8 (ones place).\n- 2 (from 1 place of first number) * 8 (from 1 place of second number) = 16 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 16\n- 2 (from 1 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 80\n- 2 (from 1 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 7 (from 10 place of first number) * 8 (from 1 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 560\n- 7 (from 10 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2800\n- 7 (from 10 place of first number) * 4 (from 100 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 28000\n- 6 (from 100 place of first number) * 8 (from 1 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4800\n- 6 (from 100 place of first number) * 4 (from 10 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 24000\n- 6 (from 100 place of first number) * 4 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 16 + 80 + 800 + 560 + 2800 + 28000 + 4800 + 24000 + 240000 = 301056."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 867 * 182?"}, {"role": "assistant", "content": "Here are the steps for multiplying 867 * 182 using the long multiplication method.\nStep 1: Break first number 867 into its individual digits: 8 (hundreds place), 6 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 182 into its individual digits: 1 (hundreds place), 8 (tens place), and 2 (ones place).\n- 7 (from 1 place of first number) * 2 (from 1 place of second number) = 14 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 14\n- 7 (from 1 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 560\n- 7 (from 1 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 700\n- 6 (from 10 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 6 (from 10 place of first number) * 8 (from 10 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4800\n- 6 (from 10 place of first number) * 1 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 8 (from 100 place of first number) * 2 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 8 (from 100 place of first number) * 8 (from 10 place of second number) = 64 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 64000\n- 8 (from 100 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 14 + 560 + 700 + 120 + 4800 + 6000 + 1600 + 64000 + 80000 = 157794."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 226 * 741?"}, {"role": "assistant", "content": "Here are the steps for multiplying 226 * 741 using the long multiplication method.\nStep 1: Break first number 226 into its individual digits: 2 (hundreds place), 2 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 741 into its individual digits: 7 (hundreds place), 4 (tens place), and 1 (ones place).\n- 6 (from 1 place of first number) * 1 (from 1 place of second number) = 6 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 6\n- 6 (from 1 place of first number) * 4 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 6 (from 1 place of first number) * 7 (from 100 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4200\n- 2 (from 10 place of first number) * 1 (from 1 place of second number) = 2 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 2 (from 10 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 2 (from 10 place of first number) * 7 (from 100 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 14000\n- 2 (from 100 place of first number) * 1 (from 1 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 200\n- 2 (from 100 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 2 (from 100 place of first number) * 7 (from 100 place of second number) = 14 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 140000\n\nNow, add all these results together:\nThe sum of 6 + 240 + 4200 + 20 + 800 + 14000 + 200 + 8000 + 140000 = 167466."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 804 * 278?"}, {"role": "assistant", "content": "Here are the steps for multiplying 804 * 278 using the long multiplication method.\nStep 1: Break first number 804 into its individual digits: 8 (hundreds place), 0 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 278 into its individual digits: 2 (hundreds place), 7 (tens place), and 8 (ones place).\n- 4 (from 1 place of first number) * 8 (from 1 place of second number) = 32 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 32\n- 4 (from 1 place of first number) * 7 (from 10 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 280\n- 4 (from 1 place of first number) * 2 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 0 (from 10 place of first number) * 8 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 7 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 2 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 8 (from 100 place of first number) * 8 (from 1 place of second number) = 64 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 6400\n- 8 (from 100 place of first number) * 7 (from 10 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 56000\n- 8 (from 100 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 32 + 280 + 800 + 0 + 0 + 0 + 6400 + 56000 + 160000 = 223512."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 158 * 951?"}, {"role": "assistant", "content": "Here are the steps for multiplying 158 * 951 using the long multiplication method.\nStep 1: Break first number 158 into its individual digits: 1 (hundreds place), 5 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 951 into its individual digits: 9 (hundreds place), 5 (tens place), and 1 (ones place).\n- 8 (from 1 place of first number) * 1 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 8 (from 1 place of first number) * 5 (from 10 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 8 (from 1 place of first number) * 9 (from 100 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 7200\n- 5 (from 10 place of first number) * 1 (from 1 place of second number) = 5 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 50\n- 5 (from 10 place of first number) * 5 (from 10 place of second number) = 25 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2500\n- 5 (from 10 place of first number) * 9 (from 100 place of second number) = 45 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 45000\n- 1 (from 100 place of first number) * 1 (from 1 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 100\n- 1 (from 100 place of first number) * 5 (from 10 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 5000\n- 1 (from 100 place of first number) * 9 (from 100 place of second number) = 9 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 90000\n\nNow, add all these results together:\nThe sum of 8 + 400 + 7200 + 50 + 2500 + 45000 + 100 + 5000 + 90000 = 150258."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 111 * 661?"}, {"role": "assistant", "content": "Here are the steps for multiplying 111 * 661 using the long multiplication method.\nStep 1: Break first number 111 into its individual digits: 1 (hundreds place), 1 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 661 into its individual digits: 6 (hundreds place), 6 (tens place), and 1 (ones place).\n- 1 (from 1 place of first number) * 1 (from 1 place of second number) = 1 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 1\n- 1 (from 1 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 60\n- 1 (from 1 place of first number) * 6 (from 100 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 600\n- 1 (from 10 place of first number) * 1 (from 1 place of second number) = 1 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 10\n- 1 (from 10 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 1 (from 10 place of first number) * 6 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 1 (from 100 place of first number) * 1 (from 1 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 100\n- 1 (from 100 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 1 (from 100 place of first number) * 6 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 1 + 60 + 600 + 10 + 600 + 6000 + 100 + 6000 + 60000 = 73371."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 304 * 142?"}, {"role": "assistant", "content": "Here are the steps for multiplying 304 * 142 using the long multiplication method.\nStep 1: Break first number 304 into its individual digits: 3 (hundreds place), 0 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 142 into its individual digits: 1 (hundreds place), 4 (tens place), and 2 (ones place).\n- 4 (from 1 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 4 (from 1 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 160\n- 4 (from 1 place of first number) * 1 (from 100 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 400\n- 0 (from 10 place of first number) * 2 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 4 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 1 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 3 (from 100 place of first number) * 2 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 3 (from 100 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 3 (from 100 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n\nNow, add all these results together:\nThe sum of 8 + 160 + 400 + 0 + 0 + 0 + 600 + 12000 + 30000 = 43168."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 675 * 592?"}, {"role": "assistant", "content": "Here are the steps for multiplying 675 * 592 using the long multiplication method.\nStep 1: Break first number 675 into its individual digits: 6 (hundreds place), 7 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 592 into its individual digits: 5 (hundreds place), 9 (tens place), and 2 (ones place).\n- 5 (from 1 place of first number) * 2 (from 1 place of second number) = 10 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 10\n- 5 (from 1 place of first number) * 9 (from 10 place of second number) = 45 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 450\n- 5 (from 1 place of first number) * 5 (from 100 place of second number) = 25 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2500\n- 7 (from 10 place of first number) * 2 (from 1 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 140\n- 7 (from 10 place of first number) * 9 (from 10 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 6300\n- 7 (from 10 place of first number) * 5 (from 100 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 35000\n- 6 (from 100 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 6 (from 100 place of first number) * 9 (from 10 place of second number) = 54 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 54000\n- 6 (from 100 place of first number) * 5 (from 100 place of second number) = 30 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 300000\n\nNow, add all these results together:\nThe sum of 10 + 450 + 2500 + 140 + 6300 + 35000 + 1200 + 54000 + 300000 = 399600."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 725 * 994?"}, {"role": "assistant", "content": "Here are the steps for multiplying 725 * 994 using the long multiplication method.\nStep 1: Break first number 725 into its individual digits: 7 (hundreds place), 2 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 994 into its individual digits: 9 (hundreds place), 9 (tens place), and 4 (ones place).\n- 5 (from 1 place of first number) * 4 (from 1 place of second number) = 20 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 5 (from 1 place of first number) * 9 (from 10 place of second number) = 45 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 450\n- 5 (from 1 place of first number) * 9 (from 100 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4500\n- 2 (from 10 place of first number) * 4 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 2 (from 10 place of first number) * 9 (from 10 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1800\n- 2 (from 10 place of first number) * 9 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 7 (from 100 place of first number) * 4 (from 1 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2800\n- 7 (from 100 place of first number) * 9 (from 10 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 63000\n- 7 (from 100 place of first number) * 9 (from 100 place of second number) = 63 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 630000\n\nNow, add all these results together:\nThe sum of 20 + 450 + 4500 + 80 + 1800 + 18000 + 2800 + 63000 + 630000 = 720650."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 461 * 264?"}, {"role": "assistant", "content": "Here are the steps for multiplying 461 * 264 using the long multiplication method.\nStep 1: Break first number 461 into its individual digits: 4 (hundreds place), 6 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 264 into its individual digits: 2 (hundreds place), 6 (tens place), and 4 (ones place).\n- 1 (from 1 place of first number) * 4 (from 1 place of second number) = 4 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 4\n- 1 (from 1 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 60\n- 1 (from 1 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 200\n- 6 (from 10 place of first number) * 4 (from 1 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 240\n- 6 (from 10 place of first number) * 6 (from 10 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3600\n- 6 (from 10 place of first number) * 2 (from 100 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 12000\n- 4 (from 100 place of first number) * 4 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 4 (from 100 place of first number) * 6 (from 10 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 24000\n- 4 (from 100 place of first number) * 2 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 4 + 60 + 200 + 240 + 3600 + 12000 + 1600 + 24000 + 80000 = 121704."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 380 * 195?"}, {"role": "assistant", "content": "Here are the steps for multiplying 380 * 195 using the long multiplication method.\nStep 1: Break first number 380 into its individual digits: 3 (hundreds place), 8 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 195 into its individual digits: 1 (hundreds place), 9 (tens place), and 5 (ones place).\n- 0 (from 1 place of first number) * 5 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 9 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 1 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 8 (from 10 place of first number) * 5 (from 1 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 8 (from 10 place of first number) * 9 (from 10 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 7200\n- 8 (from 10 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 3 (from 100 place of first number) * 5 (from 1 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1500\n- 3 (from 100 place of first number) * 9 (from 10 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 27000\n- 3 (from 100 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 400 + 7200 + 8000 + 1500 + 27000 + 30000 = 74100."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 916 * 877?"}, {"role": "assistant", "content": "Here are the steps for multiplying 916 * 877 using the long multiplication method.\nStep 1: Break first number 916 into its individual digits: 9 (hundreds place), 1 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 877 into its individual digits: 8 (hundreds place), 7 (tens place), and 7 (ones place).\n- 6 (from 1 place of first number) * 7 (from 1 place of second number) = 42 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 42\n- 6 (from 1 place of first number) * 7 (from 10 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 420\n- 6 (from 1 place of first number) * 8 (from 100 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4800\n- 1 (from 10 place of first number) * 7 (from 1 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 70\n- 1 (from 10 place of first number) * 7 (from 10 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 700\n- 1 (from 10 place of first number) * 8 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 9 (from 100 place of first number) * 7 (from 1 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 6300\n- 9 (from 100 place of first number) * 7 (from 10 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 63000\n- 9 (from 100 place of first number) * 8 (from 100 place of second number) = 72 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 720000\n\nNow, add all these results together:\nThe sum of 42 + 420 + 4800 + 70 + 700 + 8000 + 6300 + 63000 + 720000 = 803332."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 154 * 338?"}, {"role": "assistant", "content": "Here are the steps for multiplying 154 * 338 using the long multiplication method.\nStep 1: Break first number 154 into its individual digits: 1 (hundreds place), 5 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 338 into its individual digits: 3 (hundreds place), 3 (tens place), and 8 (ones place).\n- 4 (from 1 place of first number) * 8 (from 1 place of second number) = 32 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 32\n- 4 (from 1 place of first number) * 3 (from 10 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 120\n- 4 (from 1 place of first number) * 3 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 5 (from 10 place of first number) * 8 (from 1 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 5 (from 10 place of first number) * 3 (from 10 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1500\n- 5 (from 10 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 15000\n- 1 (from 100 place of first number) * 8 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 1 (from 100 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 1 (from 100 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n\nNow, add all these results together:\nThe sum of 32 + 120 + 1200 + 400 + 1500 + 15000 + 800 + 3000 + 30000 = 52052."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 955 * 335?"}, {"role": "assistant", "content": "Here are the steps for multiplying 955 * 335 using the long multiplication method.\nStep 1: Break first number 955 into its individual digits: 9 (hundreds place), 5 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 335 into its individual digits: 3 (hundreds place), 3 (tens place), and 5 (ones place).\n- 5 (from 1 place of first number) * 5 (from 1 place of second number) = 25 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 25\n- 5 (from 1 place of first number) * 3 (from 10 place of second number) = 15 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 150\n- 5 (from 1 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1500\n- 5 (from 10 place of first number) * 5 (from 1 place of second number) = 25 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 250\n- 5 (from 10 place of first number) * 3 (from 10 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1500\n- 5 (from 10 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 15000\n- 9 (from 100 place of first number) * 5 (from 1 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4500\n- 9 (from 100 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 27000\n- 9 (from 100 place of first number) * 3 (from 100 place of second number) = 27 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 270000\n\nNow, add all these results together:\nThe sum of 25 + 150 + 1500 + 250 + 1500 + 15000 + 4500 + 27000 + 270000 = 319925."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 688 * 586?"}, {"role": "assistant", "content": "Here are the steps for multiplying 688 * 586 using the long multiplication method.\nStep 1: Break first number 688 into its individual digits: 6 (hundreds place), 8 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 586 into its individual digits: 5 (hundreds place), 8 (tens place), and 6 (ones place).\n- 8 (from 1 place of first number) * 6 (from 1 place of second number) = 48 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 48\n- 8 (from 1 place of first number) * 8 (from 10 place of second number) = 64 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 640\n- 8 (from 1 place of first number) * 5 (from 100 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 8 (from 10 place of first number) * 6 (from 1 place of second number) = 48 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 480\n- 8 (from 10 place of first number) * 8 (from 10 place of second number) = 64 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 6400\n- 8 (from 10 place of first number) * 5 (from 100 place of second number) = 40 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n- 6 (from 100 place of first number) * 6 (from 1 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3600\n- 6 (from 100 place of first number) * 8 (from 10 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 48000\n- 6 (from 100 place of first number) * 5 (from 100 place of second number) = 30 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 300000\n\nNow, add all these results together:\nThe sum of 48 + 640 + 4000 + 480 + 6400 + 40000 + 3600 + 48000 + 300000 = 403168."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 593 * 777?"}, {"role": "assistant", "content": "Here are the steps for multiplying 593 * 777 using the long multiplication method.\nStep 1: Break first number 593 into its individual digits: 5 (hundreds place), 9 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 777 into its individual digits: 7 (hundreds place), 7 (tens place), and 7 (ones place).\n- 3 (from 1 place of first number) * 7 (from 1 place of second number) = 21 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 21\n- 3 (from 1 place of first number) * 7 (from 10 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 210\n- 3 (from 1 place of first number) * 7 (from 100 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2100\n- 9 (from 10 place of first number) * 7 (from 1 place of second number) = 63 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 630\n- 9 (from 10 place of first number) * 7 (from 10 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 6300\n- 9 (from 10 place of first number) * 7 (from 100 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 63000\n- 5 (from 100 place of first number) * 7 (from 1 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3500\n- 5 (from 100 place of first number) * 7 (from 10 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 35000\n- 5 (from 100 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 350000\n\nNow, add all these results together:\nThe sum of 21 + 210 + 2100 + 630 + 6300 + 63000 + 3500 + 35000 + 350000 = 460761."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 716 * 481?"}, {"role": "assistant", "content": "Here are the steps for multiplying 716 * 481 using the long multiplication method.\nStep 1: Break first number 716 into its individual digits: 7 (hundreds place), 1 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 481 into its individual digits: 4 (hundreds place), 8 (tens place), and 1 (ones place).\n- 6 (from 1 place of first number) * 1 (from 1 place of second number) = 6 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 6\n- 6 (from 1 place of first number) * 8 (from 10 place of second number) = 48 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 480\n- 6 (from 1 place of first number) * 4 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 1 (from 10 place of first number) * 1 (from 1 place of second number) = 1 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 10\n- 1 (from 10 place of first number) * 8 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 1 (from 10 place of first number) * 4 (from 100 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 7 (from 100 place of first number) * 1 (from 1 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 700\n- 7 (from 100 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 56000\n- 7 (from 100 place of first number) * 4 (from 100 place of second number) = 28 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 280000\n\nNow, add all these results together:\nThe sum of 6 + 480 + 2400 + 10 + 800 + 4000 + 700 + 56000 + 280000 = 344396."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 186 * 529?"}, {"role": "assistant", "content": "Here are the steps for multiplying 186 * 529 using the long multiplication method.\nStep 1: Break first number 186 into its individual digits: 1 (hundreds place), 8 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 529 into its individual digits: 5 (hundreds place), 2 (tens place), and 9 (ones place).\n- 6 (from 1 place of first number) * 9 (from 1 place of second number) = 54 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 54\n- 6 (from 1 place of first number) * 2 (from 10 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 120\n- 6 (from 1 place of first number) * 5 (from 100 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 8 (from 10 place of first number) * 9 (from 1 place of second number) = 72 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 720\n- 8 (from 10 place of first number) * 2 (from 10 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1600\n- 8 (from 10 place of first number) * 5 (from 100 place of second number) = 40 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n- 1 (from 100 place of first number) * 9 (from 1 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 900\n- 1 (from 100 place of first number) * 2 (from 10 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 1 (from 100 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 50000\n\nNow, add all these results together:\nThe sum of 54 + 120 + 3000 + 720 + 1600 + 40000 + 900 + 2000 + 50000 = 98394."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 932 * 607?"}, {"role": "assistant", "content": "Here are the steps for multiplying 932 * 607 using the long multiplication method.\nStep 1: Break first number 932 into its individual digits: 9 (hundreds place), 3 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 607 into its individual digits: 6 (hundreds place), 0 (tens place), and 7 (ones place).\n- 2 (from 1 place of first number) * 7 (from 1 place of second number) = 14 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 14\n- 2 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 2 (from 1 place of first number) * 6 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 3 (from 10 place of first number) * 7 (from 1 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 210\n- 3 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 3 (from 10 place of first number) * 6 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 9 (from 100 place of first number) * 7 (from 1 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 6300\n- 9 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 9 (from 100 place of first number) * 6 (from 100 place of second number) = 54 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 540000\n\nNow, add all these results together:\nThe sum of 14 + 0 + 1200 + 210 + 0 + 18000 + 6300 + 0 + 540000 = 565724."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 495 * 535?"}, {"role": "assistant", "content": "Here are the steps for multiplying 495 * 535 using the long multiplication method.\nStep 1: Break first number 495 into its individual digits: 4 (hundreds place), 9 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 535 into its individual digits: 5 (hundreds place), 3 (tens place), and 5 (ones place).\n- 5 (from 1 place of first number) * 5 (from 1 place of second number) = 25 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 25\n- 5 (from 1 place of first number) * 3 (from 10 place of second number) = 15 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 150\n- 5 (from 1 place of first number) * 5 (from 100 place of second number) = 25 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2500\n- 9 (from 10 place of first number) * 5 (from 1 place of second number) = 45 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 450\n- 9 (from 10 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2700\n- 9 (from 10 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 45000\n- 4 (from 100 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2000\n- 4 (from 100 place of first number) * 3 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 4 (from 100 place of first number) * 5 (from 100 place of second number) = 20 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 200000\n\nNow, add all these results together:\nThe sum of 25 + 150 + 2500 + 450 + 2700 + 45000 + 2000 + 12000 + 200000 = 264825."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 937 * 320?"}, {"role": "assistant", "content": "Here are the steps for multiplying 937 * 320 using the long multiplication method.\nStep 1: Break first number 937 into its individual digits: 9 (hundreds place), 3 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 320 into its individual digits: 3 (hundreds place), 2 (tens place), and 0 (ones place).\n- 7 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 1 place of first number) * 2 (from 10 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 140\n- 7 (from 1 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2100\n- 3 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 3 (from 10 place of first number) * 2 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 3 (from 10 place of first number) * 3 (from 100 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 9000\n- 9 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 9 (from 100 place of first number) * 2 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 9 (from 100 place of first number) * 3 (from 100 place of second number) = 27 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 270000\n\nNow, add all these results together:\nThe sum of 0 + 140 + 2100 + 0 + 600 + 9000 + 0 + 18000 + 270000 = 299840."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 405 * 219?"}, {"role": "assistant", "content": "Here are the steps for multiplying 405 * 219 using the long multiplication method.\nStep 1: Break first number 405 into its individual digits: 4 (hundreds place), 0 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 219 into its individual digits: 2 (hundreds place), 1 (tens place), and 9 (ones place).\n- 5 (from 1 place of first number) * 9 (from 1 place of second number) = 45 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 45\n- 5 (from 1 place of first number) * 1 (from 10 place of second number) = 5 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 50\n- 5 (from 1 place of first number) * 2 (from 100 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1000\n- 0 (from 10 place of first number) * 9 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 1 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 2 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 4 (from 100 place of first number) * 9 (from 1 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3600\n- 4 (from 100 place of first number) * 1 (from 10 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 4 (from 100 place of first number) * 2 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 45 + 50 + 1000 + 0 + 0 + 0 + 3600 + 4000 + 80000 = 88695."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 171 * 578?"}, {"role": "assistant", "content": "Here are the steps for multiplying 171 * 578 using the long multiplication method.\nStep 1: Break first number 171 into its individual digits: 1 (hundreds place), 7 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 578 into its individual digits: 5 (hundreds place), 7 (tens place), and 8 (ones place).\n- 1 (from 1 place of first number) * 8 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 1 (from 1 place of first number) * 7 (from 10 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 70\n- 1 (from 1 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 500\n- 7 (from 10 place of first number) * 8 (from 1 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 560\n- 7 (from 10 place of first number) * 7 (from 10 place of second number) = 49 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4900\n- 7 (from 10 place of first number) * 5 (from 100 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 35000\n- 1 (from 100 place of first number) * 8 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 1 (from 100 place of first number) * 7 (from 10 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 7000\n- 1 (from 100 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 50000\n\nNow, add all these results together:\nThe sum of 8 + 70 + 500 + 560 + 4900 + 35000 + 800 + 7000 + 50000 = 98838."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 252 * 115?"}, {"role": "assistant", "content": "Here are the steps for multiplying 252 * 115 using the long multiplication method.\nStep 1: Break first number 252 into its individual digits: 2 (hundreds place), 5 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 115 into its individual digits: 1 (hundreds place), 1 (tens place), and 5 (ones place).\n- 2 (from 1 place of first number) * 5 (from 1 place of second number) = 10 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 10\n- 2 (from 1 place of first number) * 1 (from 10 place of second number) = 2 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 20\n- 2 (from 1 place of first number) * 1 (from 100 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 200\n- 5 (from 10 place of first number) * 5 (from 1 place of second number) = 25 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 250\n- 5 (from 10 place of first number) * 1 (from 10 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 500\n- 5 (from 10 place of first number) * 1 (from 100 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 5000\n- 2 (from 100 place of first number) * 5 (from 1 place of second number) = 10 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1000\n- 2 (from 100 place of first number) * 1 (from 10 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 2 (from 100 place of first number) * 1 (from 100 place of second number) = 2 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n\nNow, add all these results together:\nThe sum of 10 + 20 + 200 + 250 + 500 + 5000 + 1000 + 2000 + 20000 = 28980."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 172 * 349?"}, {"role": "assistant", "content": "Here are the steps for multiplying 172 * 349 using the long multiplication method.\nStep 1: Break first number 172 into its individual digits: 1 (hundreds place), 7 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 349 into its individual digits: 3 (hundreds place), 4 (tens place), and 9 (ones place).\n- 2 (from 1 place of first number) * 9 (from 1 place of second number) = 18 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 18\n- 2 (from 1 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 80\n- 2 (from 1 place of first number) * 3 (from 100 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 600\n- 7 (from 10 place of first number) * 9 (from 1 place of second number) = 63 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 630\n- 7 (from 10 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2800\n- 7 (from 10 place of first number) * 3 (from 100 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 21000\n- 1 (from 100 place of first number) * 9 (from 1 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 900\n- 1 (from 100 place of first number) * 4 (from 10 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 1 (from 100 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n\nNow, add all these results together:\nThe sum of 18 + 80 + 600 + 630 + 2800 + 21000 + 900 + 4000 + 30000 = 60028."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 838 * 153?"}, {"role": "assistant", "content": "Here are the steps for multiplying 838 * 153 using the long multiplication method.\nStep 1: Break first number 838 into its individual digits: 8 (hundreds place), 3 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 153 into its individual digits: 1 (hundreds place), 5 (tens place), and 3 (ones place).\n- 8 (from 1 place of first number) * 3 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 8 (from 1 place of first number) * 5 (from 10 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 8 (from 1 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 3 (from 10 place of first number) * 3 (from 1 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 90\n- 3 (from 10 place of first number) * 5 (from 10 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1500\n- 3 (from 10 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 8 (from 100 place of first number) * 3 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 8 (from 100 place of first number) * 5 (from 10 place of second number) = 40 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 40000\n- 8 (from 100 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 24 + 400 + 800 + 90 + 1500 + 3000 + 2400 + 40000 + 80000 = 128214."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 800 * 885?"}, {"role": "assistant", "content": "Here are the steps for multiplying 800 * 885 using the long multiplication method.\nStep 1: Break first number 800 into its individual digits: 8 (hundreds place), 0 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 885 into its individual digits: 8 (hundreds place), 8 (tens place), and 5 (ones place).\n- 0 (from 1 place of first number) * 5 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 8 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 8 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 0 (from 10 place of first number) * 5 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 8 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 8 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 8 (from 100 place of first number) * 5 (from 1 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4000\n- 8 (from 100 place of first number) * 8 (from 10 place of second number) = 64 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 64000\n- 8 (from 100 place of first number) * 8 (from 100 place of second number) = 64 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 640000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 0 + 0 + 0 + 4000 + 64000 + 640000 = 708000."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 713 * 404?"}, {"role": "assistant", "content": "Here are the steps for multiplying 713 * 404 using the long multiplication method.\nStep 1: Break first number 713 into its individual digits: 7 (hundreds place), 1 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 404 into its individual digits: 4 (hundreds place), 0 (tens place), and 4 (ones place).\n- 3 (from 1 place of first number) * 4 (from 1 place of second number) = 12 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 12\n- 3 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 3 (from 1 place of first number) * 4 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 1 (from 10 place of first number) * 4 (from 1 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 1 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 1 (from 10 place of first number) * 4 (from 100 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 7 (from 100 place of first number) * 4 (from 1 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2800\n- 7 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 7 (from 100 place of first number) * 4 (from 100 place of second number) = 28 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 280000\n\nNow, add all these results together:\nThe sum of 12 + 0 + 1200 + 40 + 0 + 4000 + 2800 + 0 + 280000 = 288052."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 802 * 107?"}, {"role": "assistant", "content": "Here are the steps for multiplying 802 * 107 using the long multiplication method.\nStep 1: Break first number 802 into its individual digits: 8 (hundreds place), 0 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 107 into its individual digits: 1 (hundreds place), 0 (tens place), and 7 (ones place).\n- 2 (from 1 place of first number) * 7 (from 1 place of second number) = 14 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 14\n- 2 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 2 (from 1 place of first number) * 1 (from 100 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 200\n- 0 (from 10 place of first number) * 7 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 1 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 8 (from 100 place of first number) * 7 (from 1 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 5600\n- 8 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 8 (from 100 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 14 + 0 + 200 + 0 + 0 + 0 + 5600 + 0 + 80000 = 85814."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 186 * 277?"}, {"role": "assistant", "content": "Here are the steps for multiplying 186 * 277 using the long multiplication method.\nStep 1: Break first number 186 into its individual digits: 1 (hundreds place), 8 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 277 into its individual digits: 2 (hundreds place), 7 (tens place), and 7 (ones place).\n- 6 (from 1 place of first number) * 7 (from 1 place of second number) = 42 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 42\n- 6 (from 1 place of first number) * 7 (from 10 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 420\n- 6 (from 1 place of first number) * 2 (from 100 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1200\n- 8 (from 10 place of first number) * 7 (from 1 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 560\n- 8 (from 10 place of first number) * 7 (from 10 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 5600\n- 8 (from 10 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 16000\n- 1 (from 100 place of first number) * 7 (from 1 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 700\n- 1 (from 100 place of first number) * 7 (from 10 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 7000\n- 1 (from 100 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n\nNow, add all these results together:\nThe sum of 42 + 420 + 1200 + 560 + 5600 + 16000 + 700 + 7000 + 20000 = 51522."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 791 * 402?"}, {"role": "assistant", "content": "Here are the steps for multiplying 791 * 402 using the long multiplication method.\nStep 1: Break first number 791 into its individual digits: 7 (hundreds place), 9 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 402 into its individual digits: 4 (hundreds place), 0 (tens place), and 2 (ones place).\n- 1 (from 1 place of first number) * 2 (from 1 place of second number) = 2 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 2\n- 1 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 1 (from 1 place of first number) * 4 (from 100 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 400\n- 9 (from 10 place of first number) * 2 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 9 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 9 (from 10 place of first number) * 4 (from 100 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 36000\n- 7 (from 100 place of first number) * 2 (from 1 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1400\n- 7 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 7 (from 100 place of first number) * 4 (from 100 place of second number) = 28 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 280000\n\nNow, add all these results together:\nThe sum of 2 + 0 + 400 + 180 + 0 + 36000 + 1400 + 0 + 280000 = 317982."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 901 * 182?"}, {"role": "assistant", "content": "Here are the steps for multiplying 901 * 182 using the long multiplication method.\nStep 1: Break first number 901 into its individual digits: 9 (hundreds place), 0 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 182 into its individual digits: 1 (hundreds place), 8 (tens place), and 2 (ones place).\n- 1 (from 1 place of first number) * 2 (from 1 place of second number) = 2 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 2\n- 1 (from 1 place of first number) * 8 (from 10 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 80\n- 1 (from 1 place of first number) * 1 (from 100 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 100\n- 0 (from 10 place of first number) * 2 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 8 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 1 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 9 (from 100 place of first number) * 2 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 9 (from 100 place of first number) * 8 (from 10 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 72000\n- 9 (from 100 place of first number) * 1 (from 100 place of second number) = 9 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 90000\n\nNow, add all these results together:\nThe sum of 2 + 80 + 100 + 0 + 0 + 0 + 1800 + 72000 + 90000 = 163982."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 312 * 966?"}, {"role": "assistant", "content": "Here are the steps for multiplying 312 * 966 using the long multiplication method.\nStep 1: Break first number 312 into its individual digits: 3 (hundreds place), 1 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 966 into its individual digits: 9 (hundreds place), 6 (tens place), and 6 (ones place).\n- 2 (from 1 place of first number) * 6 (from 1 place of second number) = 12 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 12\n- 2 (from 1 place of first number) * 6 (from 10 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 120\n- 2 (from 1 place of first number) * 9 (from 100 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1800\n- 1 (from 10 place of first number) * 6 (from 1 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 60\n- 1 (from 10 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 1 (from 10 place of first number) * 9 (from 100 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 9000\n- 3 (from 100 place of first number) * 6 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 3 (from 100 place of first number) * 6 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 3 (from 100 place of first number) * 9 (from 100 place of second number) = 27 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 270000\n\nNow, add all these results together:\nThe sum of 12 + 120 + 1800 + 60 + 600 + 9000 + 1800 + 18000 + 270000 = 301392."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 274 * 640?"}, {"role": "assistant", "content": "Here are the steps for multiplying 274 * 640 using the long multiplication method.\nStep 1: Break first number 274 into its individual digits: 2 (hundreds place), 7 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 640 into its individual digits: 6 (hundreds place), 4 (tens place), and 0 (ones place).\n- 4 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 4 (from 1 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 160\n- 4 (from 1 place of first number) * 6 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 7 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 10 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2800\n- 7 (from 10 place of first number) * 6 (from 100 place of second number) = 42 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 42000\n- 2 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 2 (from 100 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 2 (from 100 place of first number) * 6 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 0 + 160 + 2400 + 0 + 2800 + 42000 + 0 + 8000 + 120000 = 175360."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 624 * 785?"}, {"role": "assistant", "content": "Here are the steps for multiplying 624 * 785 using the long multiplication method.\nStep 1: Break first number 624 into its individual digits: 6 (hundreds place), 2 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 785 into its individual digits: 7 (hundreds place), 8 (tens place), and 5 (ones place).\n- 4 (from 1 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 4 (from 1 place of first number) * 8 (from 10 place of second number) = 32 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 320\n- 4 (from 1 place of first number) * 7 (from 100 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2800\n- 2 (from 10 place of first number) * 5 (from 1 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 100\n- 2 (from 10 place of first number) * 8 (from 10 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1600\n- 2 (from 10 place of first number) * 7 (from 100 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 14000\n- 6 (from 100 place of first number) * 5 (from 1 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3000\n- 6 (from 100 place of first number) * 8 (from 10 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 48000\n- 6 (from 100 place of first number) * 7 (from 100 place of second number) = 42 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 420000\n\nNow, add all these results together:\nThe sum of 20 + 320 + 2800 + 100 + 1600 + 14000 + 3000 + 48000 + 420000 = 489840."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 140 * 410?"}, {"role": "assistant", "content": "Here are the steps for multiplying 140 * 410 using the long multiplication method.\nStep 1: Break first number 140 into its individual digits: 1 (hundreds place), 4 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 410 into its individual digits: 4 (hundreds place), 1 (tens place), and 0 (ones place).\n- 0 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 1 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 4 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 4 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 4 (from 10 place of first number) * 1 (from 10 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 4 (from 10 place of first number) * 4 (from 100 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 16000\n- 1 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 1 (from 100 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 1000\n- 1 (from 100 place of first number) * 4 (from 100 place of second number) = 4 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 0 + 400 + 16000 + 0 + 1000 + 40000 = 57400."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 764 * 256?"}, {"role": "assistant", "content": "Here are the steps for multiplying 764 * 256 using the long multiplication method.\nStep 1: Break first number 764 into its individual digits: 7 (hundreds place), 6 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 256 into its individual digits: 2 (hundreds place), 5 (tens place), and 6 (ones place).\n- 4 (from 1 place of first number) * 6 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 4 (from 1 place of first number) * 5 (from 10 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 200\n- 4 (from 1 place of first number) * 2 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 6 (from 10 place of first number) * 6 (from 1 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 360\n- 6 (from 10 place of first number) * 5 (from 10 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 6 (from 10 place of first number) * 2 (from 100 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 12000\n- 7 (from 100 place of first number) * 6 (from 1 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4200\n- 7 (from 100 place of first number) * 5 (from 10 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 35000\n- 7 (from 100 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 140000\n\nNow, add all these results together:\nThe sum of 24 + 200 + 800 + 360 + 3000 + 12000 + 4200 + 35000 + 140000 = 195584."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 282 * 116?"}, {"role": "assistant", "content": "Here are the steps for multiplying 282 * 116 using the long multiplication method.\nStep 1: Break first number 282 into its individual digits: 2 (hundreds place), 8 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 116 into its individual digits: 1 (hundreds place), 1 (tens place), and 6 (ones place).\n- 2 (from 1 place of first number) * 6 (from 1 place of second number) = 12 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 12\n- 2 (from 1 place of first number) * 1 (from 10 place of second number) = 2 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 20\n- 2 (from 1 place of first number) * 1 (from 100 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 200\n- 8 (from 10 place of first number) * 6 (from 1 place of second number) = 48 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 480\n- 8 (from 10 place of first number) * 1 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 8 (from 10 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 2 (from 100 place of first number) * 6 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 2 (from 100 place of first number) * 1 (from 10 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 2 (from 100 place of first number) * 1 (from 100 place of second number) = 2 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n\nNow, add all these results together:\nThe sum of 12 + 20 + 200 + 480 + 800 + 8000 + 1200 + 2000 + 20000 = 32712."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 608 * 302?"}, {"role": "assistant", "content": "Here are the steps for multiplying 608 * 302 using the long multiplication method.\nStep 1: Break first number 608 into its individual digits: 6 (hundreds place), 0 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 302 into its individual digits: 3 (hundreds place), 0 (tens place), and 2 (ones place).\n- 8 (from 1 place of first number) * 2 (from 1 place of second number) = 16 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 16\n- 8 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 8 (from 1 place of first number) * 3 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 0 (from 10 place of first number) * 2 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 3 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 6 (from 100 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 6 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 6 (from 100 place of first number) * 3 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 16 + 0 + 2400 + 0 + 0 + 0 + 1200 + 0 + 180000 = 183616."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 873 * 555?"}, {"role": "assistant", "content": "Here are the steps for multiplying 873 * 555 using the long multiplication method.\nStep 1: Break first number 873 into its individual digits: 8 (hundreds place), 7 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 555 into its individual digits: 5 (hundreds place), 5 (tens place), and 5 (ones place).\n- 3 (from 1 place of first number) * 5 (from 1 place of second number) = 15 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 15\n- 3 (from 1 place of first number) * 5 (from 10 place of second number) = 15 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 150\n- 3 (from 1 place of first number) * 5 (from 100 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1500\n- 7 (from 10 place of first number) * 5 (from 1 place of second number) = 35 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 350\n- 7 (from 10 place of first number) * 5 (from 10 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3500\n- 7 (from 10 place of first number) * 5 (from 100 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 35000\n- 8 (from 100 place of first number) * 5 (from 1 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4000\n- 8 (from 100 place of first number) * 5 (from 10 place of second number) = 40 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 40000\n- 8 (from 100 place of first number) * 5 (from 100 place of second number) = 40 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 400000\n\nNow, add all these results together:\nThe sum of 15 + 150 + 1500 + 350 + 3500 + 35000 + 4000 + 40000 + 400000 = 484515."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 882 * 761?"}, {"role": "assistant", "content": "Here are the steps for multiplying 882 * 761 using the long multiplication method.\nStep 1: Break first number 882 into its individual digits: 8 (hundreds place), 8 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 761 into its individual digits: 7 (hundreds place), 6 (tens place), and 1 (ones place).\n- 2 (from 1 place of first number) * 1 (from 1 place of second number) = 2 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 2\n- 2 (from 1 place of first number) * 6 (from 10 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 120\n- 2 (from 1 place of first number) * 7 (from 100 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1400\n- 8 (from 10 place of first number) * 1 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 8 (from 10 place of first number) * 6 (from 10 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4800\n- 8 (from 10 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 56000\n- 8 (from 100 place of first number) * 1 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 8 (from 100 place of first number) * 6 (from 10 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 48000\n- 8 (from 100 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 560000\n\nNow, add all these results together:\nThe sum of 2 + 120 + 1400 + 80 + 4800 + 56000 + 800 + 48000 + 560000 = 671202."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 819 * 675?"}, {"role": "assistant", "content": "Here are the steps for multiplying 819 * 675 using the long multiplication method.\nStep 1: Break first number 819 into its individual digits: 8 (hundreds place), 1 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 675 into its individual digits: 6 (hundreds place), 7 (tens place), and 5 (ones place).\n- 9 (from 1 place of first number) * 5 (from 1 place of second number) = 45 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 45\n- 9 (from 1 place of first number) * 7 (from 10 place of second number) = 63 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 630\n- 9 (from 1 place of first number) * 6 (from 100 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5400\n- 1 (from 10 place of first number) * 5 (from 1 place of second number) = 5 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 50\n- 1 (from 10 place of first number) * 7 (from 10 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 700\n- 1 (from 10 place of first number) * 6 (from 100 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 6000\n- 8 (from 100 place of first number) * 5 (from 1 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4000\n- 8 (from 100 place of first number) * 7 (from 10 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 56000\n- 8 (from 100 place of first number) * 6 (from 100 place of second number) = 48 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 480000\n\nNow, add all these results together:\nThe sum of 45 + 630 + 5400 + 50 + 700 + 6000 + 4000 + 56000 + 480000 = 552825."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 420 * 416?"}, {"role": "assistant", "content": "Here are the steps for multiplying 420 * 416 using the long multiplication method.\nStep 1: Break first number 420 into its individual digits: 4 (hundreds place), 2 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 416 into its individual digits: 4 (hundreds place), 1 (tens place), and 6 (ones place).\n- 0 (from 1 place of first number) * 6 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 1 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 4 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 2 (from 10 place of first number) * 6 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 2 (from 10 place of first number) * 1 (from 10 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 200\n- 2 (from 10 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 4 (from 100 place of first number) * 6 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 4 (from 100 place of first number) * 1 (from 10 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 4 (from 100 place of first number) * 4 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 120 + 200 + 8000 + 2400 + 4000 + 160000 = 174720."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 229 * 799?"}, {"role": "assistant", "content": "Here are the steps for multiplying 229 * 799 using the long multiplication method.\nStep 1: Break first number 229 into its individual digits: 2 (hundreds place), 2 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 799 into its individual digits: 7 (hundreds place), 9 (tens place), and 9 (ones place).\n- 9 (from 1 place of first number) * 9 (from 1 place of second number) = 81 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 81\n- 9 (from 1 place of first number) * 9 (from 10 place of second number) = 81 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 810\n- 9 (from 1 place of first number) * 7 (from 100 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 6300\n- 2 (from 10 place of first number) * 9 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 2 (from 10 place of first number) * 9 (from 10 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1800\n- 2 (from 10 place of first number) * 7 (from 100 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 14000\n- 2 (from 100 place of first number) * 9 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 2 (from 100 place of first number) * 9 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 2 (from 100 place of first number) * 7 (from 100 place of second number) = 14 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 140000\n\nNow, add all these results together:\nThe sum of 81 + 810 + 6300 + 180 + 1800 + 14000 + 1800 + 18000 + 140000 = 182971."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 109 * 802?"}, {"role": "assistant", "content": "Here are the steps for multiplying 109 * 802 using the long multiplication method.\nStep 1: Break first number 109 into its individual digits: 1 (hundreds place), 0 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 802 into its individual digits: 8 (hundreds place), 0 (tens place), and 2 (ones place).\n- 9 (from 1 place of first number) * 2 (from 1 place of second number) = 18 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 18\n- 9 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 9 (from 1 place of first number) * 8 (from 100 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 7200\n- 0 (from 10 place of first number) * 2 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 8 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 1 (from 100 place of first number) * 2 (from 1 place of second number) = 2 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 200\n- 1 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 1 (from 100 place of first number) * 8 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 18 + 0 + 7200 + 0 + 0 + 0 + 200 + 0 + 80000 = 87418."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 512 * 771?"}, {"role": "assistant", "content": "Here are the steps for multiplying 512 * 771 using the long multiplication method.\nStep 1: Break first number 512 into its individual digits: 5 (hundreds place), 1 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 771 into its individual digits: 7 (hundreds place), 7 (tens place), and 1 (ones place).\n- 2 (from 1 place of first number) * 1 (from 1 place of second number) = 2 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 2\n- 2 (from 1 place of first number) * 7 (from 10 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 140\n- 2 (from 1 place of first number) * 7 (from 100 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1400\n- 1 (from 10 place of first number) * 1 (from 1 place of second number) = 1 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 10\n- 1 (from 10 place of first number) * 7 (from 10 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 700\n- 1 (from 10 place of first number) * 7 (from 100 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 7000\n- 5 (from 100 place of first number) * 1 (from 1 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 500\n- 5 (from 100 place of first number) * 7 (from 10 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 35000\n- 5 (from 100 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 350000\n\nNow, add all these results together:\nThe sum of 2 + 140 + 1400 + 10 + 700 + 7000 + 500 + 35000 + 350000 = 394752."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 779 * 449?"}, {"role": "assistant", "content": "Here are the steps for multiplying 779 * 449 using the long multiplication method.\nStep 1: Break first number 779 into its individual digits: 7 (hundreds place), 7 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 449 into its individual digits: 4 (hundreds place), 4 (tens place), and 9 (ones place).\n- 9 (from 1 place of first number) * 9 (from 1 place of second number) = 81 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 81\n- 9 (from 1 place of first number) * 4 (from 10 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 360\n- 9 (from 1 place of first number) * 4 (from 100 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3600\n- 7 (from 10 place of first number) * 9 (from 1 place of second number) = 63 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 630\n- 7 (from 10 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2800\n- 7 (from 10 place of first number) * 4 (from 100 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 28000\n- 7 (from 100 place of first number) * 9 (from 1 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 6300\n- 7 (from 100 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 28000\n- 7 (from 100 place of first number) * 4 (from 100 place of second number) = 28 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 280000\n\nNow, add all these results together:\nThe sum of 81 + 360 + 3600 + 630 + 2800 + 28000 + 6300 + 28000 + 280000 = 349771."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 863 * 674?"}, {"role": "assistant", "content": "Here are the steps for multiplying 863 * 674 using the long multiplication method.\nStep 1: Break first number 863 into its individual digits: 8 (hundreds place), 6 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 674 into its individual digits: 6 (hundreds place), 7 (tens place), and 4 (ones place).\n- 3 (from 1 place of first number) * 4 (from 1 place of second number) = 12 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 12\n- 3 (from 1 place of first number) * 7 (from 10 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 210\n- 3 (from 1 place of first number) * 6 (from 100 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1800\n- 6 (from 10 place of first number) * 4 (from 1 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 240\n- 6 (from 10 place of first number) * 7 (from 10 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4200\n- 6 (from 10 place of first number) * 6 (from 100 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 36000\n- 8 (from 100 place of first number) * 4 (from 1 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3200\n- 8 (from 100 place of first number) * 7 (from 10 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 56000\n- 8 (from 100 place of first number) * 6 (from 100 place of second number) = 48 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 480000\n\nNow, add all these results together:\nThe sum of 12 + 210 + 1800 + 240 + 4200 + 36000 + 3200 + 56000 + 480000 = 581662."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 347 * 223?"}, {"role": "assistant", "content": "Here are the steps for multiplying 347 * 223 using the long multiplication method.\nStep 1: Break first number 347 into its individual digits: 3 (hundreds place), 4 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 223 into its individual digits: 2 (hundreds place), 2 (tens place), and 3 (ones place).\n- 7 (from 1 place of first number) * 3 (from 1 place of second number) = 21 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 21\n- 7 (from 1 place of first number) * 2 (from 10 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 140\n- 7 (from 1 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1400\n- 4 (from 10 place of first number) * 3 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 4 (from 10 place of first number) * 2 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 4 (from 10 place of first number) * 2 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 3 (from 100 place of first number) * 3 (from 1 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 900\n- 3 (from 100 place of first number) * 2 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 3 (from 100 place of first number) * 2 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 21 + 140 + 1400 + 120 + 800 + 8000 + 900 + 6000 + 60000 = 77381."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 764 * 517?"}, {"role": "assistant", "content": "Here are the steps for multiplying 764 * 517 using the long multiplication method.\nStep 1: Break first number 764 into its individual digits: 7 (hundreds place), 6 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 517 into its individual digits: 5 (hundreds place), 1 (tens place), and 7 (ones place).\n- 4 (from 1 place of first number) * 7 (from 1 place of second number) = 28 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 28\n- 4 (from 1 place of first number) * 1 (from 10 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 40\n- 4 (from 1 place of first number) * 5 (from 100 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 6 (from 10 place of first number) * 7 (from 1 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 420\n- 6 (from 10 place of first number) * 1 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 6 (from 10 place of first number) * 5 (from 100 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n- 7 (from 100 place of first number) * 7 (from 1 place of second number) = 49 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4900\n- 7 (from 100 place of first number) * 1 (from 10 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 7000\n- 7 (from 100 place of first number) * 5 (from 100 place of second number) = 35 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 350000\n\nNow, add all these results together:\nThe sum of 28 + 40 + 2000 + 420 + 600 + 30000 + 4900 + 7000 + 350000 = 394988."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 904 * 247?"}, {"role": "assistant", "content": "Here are the steps for multiplying 904 * 247 using the long multiplication method.\nStep 1: Break first number 904 into its individual digits: 9 (hundreds place), 0 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 247 into its individual digits: 2 (hundreds place), 4 (tens place), and 7 (ones place).\n- 4 (from 1 place of first number) * 7 (from 1 place of second number) = 28 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 28\n- 4 (from 1 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 160\n- 4 (from 1 place of first number) * 2 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 0 (from 10 place of first number) * 7 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 4 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 2 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 9 (from 100 place of first number) * 7 (from 1 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 6300\n- 9 (from 100 place of first number) * 4 (from 10 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 36000\n- 9 (from 100 place of first number) * 2 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 28 + 160 + 800 + 0 + 0 + 0 + 6300 + 36000 + 180000 = 223288."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 494 * 555?"}, {"role": "assistant", "content": "Here are the steps for multiplying 494 * 555 using the long multiplication method.\nStep 1: Break first number 494 into its individual digits: 4 (hundreds place), 9 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 555 into its individual digits: 5 (hundreds place), 5 (tens place), and 5 (ones place).\n- 4 (from 1 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 4 (from 1 place of first number) * 5 (from 10 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 200\n- 4 (from 1 place of first number) * 5 (from 100 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 9 (from 10 place of first number) * 5 (from 1 place of second number) = 45 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 450\n- 9 (from 10 place of first number) * 5 (from 10 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4500\n- 9 (from 10 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 45000\n- 4 (from 100 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2000\n- 4 (from 100 place of first number) * 5 (from 10 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 20000\n- 4 (from 100 place of first number) * 5 (from 100 place of second number) = 20 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 200000\n\nNow, add all these results together:\nThe sum of 20 + 200 + 2000 + 450 + 4500 + 45000 + 2000 + 20000 + 200000 = 274170."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 558 * 150?"}, {"role": "assistant", "content": "Here are the steps for multiplying 558 * 150 using the long multiplication method.\nStep 1: Break first number 558 into its individual digits: 5 (hundreds place), 5 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 150 into its individual digits: 1 (hundreds place), 5 (tens place), and 0 (ones place).\n- 8 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 1 place of first number) * 5 (from 10 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 8 (from 1 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 5 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 5 (from 10 place of first number) * 5 (from 10 place of second number) = 25 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2500\n- 5 (from 10 place of first number) * 1 (from 100 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 5000\n- 5 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 5 (from 100 place of first number) * 5 (from 10 place of second number) = 25 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 25000\n- 5 (from 100 place of first number) * 1 (from 100 place of second number) = 5 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 50000\n\nNow, add all these results together:\nThe sum of 0 + 400 + 800 + 0 + 2500 + 5000 + 0 + 25000 + 50000 = 83700."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 138 * 420?"}, {"role": "assistant", "content": "Here are the steps for multiplying 138 * 420 using the long multiplication method.\nStep 1: Break first number 138 into its individual digits: 1 (hundreds place), 3 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 420 into its individual digits: 4 (hundreds place), 2 (tens place), and 0 (ones place).\n- 8 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 1 place of first number) * 2 (from 10 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 160\n- 8 (from 1 place of first number) * 4 (from 100 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3200\n- 3 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 3 (from 10 place of first number) * 2 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 3 (from 10 place of first number) * 4 (from 100 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 12000\n- 1 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 1 (from 100 place of first number) * 2 (from 10 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 1 (from 100 place of first number) * 4 (from 100 place of second number) = 4 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n\nNow, add all these results together:\nThe sum of 0 + 160 + 3200 + 0 + 600 + 12000 + 0 + 2000 + 40000 = 57960."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 998 * 618?"}, {"role": "assistant", "content": "Here are the steps for multiplying 998 * 618 using the long multiplication method.\nStep 1: Break first number 998 into its individual digits: 9 (hundreds place), 9 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 618 into its individual digits: 6 (hundreds place), 1 (tens place), and 8 (ones place).\n- 8 (from 1 place of first number) * 8 (from 1 place of second number) = 64 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 64\n- 8 (from 1 place of first number) * 1 (from 10 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 80\n- 8 (from 1 place of first number) * 6 (from 100 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4800\n- 9 (from 10 place of first number) * 8 (from 1 place of second number) = 72 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 720\n- 9 (from 10 place of first number) * 1 (from 10 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 900\n- 9 (from 10 place of first number) * 6 (from 100 place of second number) = 54 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 54000\n- 9 (from 100 place of first number) * 8 (from 1 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 7200\n- 9 (from 100 place of first number) * 1 (from 10 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 9000\n- 9 (from 100 place of first number) * 6 (from 100 place of second number) = 54 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 540000\n\nNow, add all these results together:\nThe sum of 64 + 80 + 4800 + 720 + 900 + 54000 + 7200 + 9000 + 540000 = 616764."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 420 * 472?"}, {"role": "assistant", "content": "Here are the steps for multiplying 420 * 472 using the long multiplication method.\nStep 1: Break first number 420 into its individual digits: 4 (hundreds place), 2 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 472 into its individual digits: 4 (hundreds place), 7 (tens place), and 2 (ones place).\n- 0 (from 1 place of first number) * 2 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 7 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 4 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 2 (from 10 place of first number) * 2 (from 1 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 2 (from 10 place of first number) * 7 (from 10 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1400\n- 2 (from 10 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 4 (from 100 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 4 (from 100 place of first number) * 7 (from 10 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 28000\n- 4 (from 100 place of first number) * 4 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 40 + 1400 + 8000 + 800 + 28000 + 160000 = 198240."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 324 * 145?"}, {"role": "assistant", "content": "Here are the steps for multiplying 324 * 145 using the long multiplication method.\nStep 1: Break first number 324 into its individual digits: 3 (hundreds place), 2 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 145 into its individual digits: 1 (hundreds place), 4 (tens place), and 5 (ones place).\n- 4 (from 1 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 4 (from 1 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 160\n- 4 (from 1 place of first number) * 1 (from 100 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 400\n- 2 (from 10 place of first number) * 5 (from 1 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 100\n- 2 (from 10 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 2 (from 10 place of first number) * 1 (from 100 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 3 (from 100 place of first number) * 5 (from 1 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1500\n- 3 (from 100 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 3 (from 100 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n\nNow, add all these results together:\nThe sum of 20 + 160 + 400 + 100 + 800 + 2000 + 1500 + 12000 + 30000 = 46980."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 956 * 646?"}, {"role": "assistant", "content": "Here are the steps for multiplying 956 * 646 using the long multiplication method.\nStep 1: Break first number 956 into its individual digits: 9 (hundreds place), 5 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 646 into its individual digits: 6 (hundreds place), 4 (tens place), and 6 (ones place).\n- 6 (from 1 place of first number) * 6 (from 1 place of second number) = 36 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 36\n- 6 (from 1 place of first number) * 4 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 6 (from 1 place of first number) * 6 (from 100 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3600\n- 5 (from 10 place of first number) * 6 (from 1 place of second number) = 30 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 5 (from 10 place of first number) * 4 (from 10 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 5 (from 10 place of first number) * 6 (from 100 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n- 9 (from 100 place of first number) * 6 (from 1 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 5400\n- 9 (from 100 place of first number) * 4 (from 10 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 36000\n- 9 (from 100 place of first number) * 6 (from 100 place of second number) = 54 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 540000\n\nNow, add all these results together:\nThe sum of 36 + 240 + 3600 + 300 + 2000 + 30000 + 5400 + 36000 + 540000 = 617576."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 727 * 647?"}, {"role": "assistant", "content": "Here are the steps for multiplying 727 * 647 using the long multiplication method.\nStep 1: Break first number 727 into its individual digits: 7 (hundreds place), 2 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 647 into its individual digits: 6 (hundreds place), 4 (tens place), and 7 (ones place).\n- 7 (from 1 place of first number) * 7 (from 1 place of second number) = 49 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 49\n- 7 (from 1 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 280\n- 7 (from 1 place of first number) * 6 (from 100 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4200\n- 2 (from 10 place of first number) * 7 (from 1 place of second number) = 14 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 140\n- 2 (from 10 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 2 (from 10 place of first number) * 6 (from 100 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 12000\n- 7 (from 100 place of first number) * 7 (from 1 place of second number) = 49 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4900\n- 7 (from 100 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 28000\n- 7 (from 100 place of first number) * 6 (from 100 place of second number) = 42 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 420000\n\nNow, add all these results together:\nThe sum of 49 + 280 + 4200 + 140 + 800 + 12000 + 4900 + 28000 + 420000 = 470369."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 436 * 196?"}, {"role": "assistant", "content": "Here are the steps for multiplying 436 * 196 using the long multiplication method.\nStep 1: Break first number 436 into its individual digits: 4 (hundreds place), 3 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 196 into its individual digits: 1 (hundreds place), 9 (tens place), and 6 (ones place).\n- 6 (from 1 place of first number) * 6 (from 1 place of second number) = 36 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 36\n- 6 (from 1 place of first number) * 9 (from 10 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 540\n- 6 (from 1 place of first number) * 1 (from 100 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 600\n- 3 (from 10 place of first number) * 6 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 3 (from 10 place of first number) * 9 (from 10 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2700\n- 3 (from 10 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 4 (from 100 place of first number) * 6 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 4 (from 100 place of first number) * 9 (from 10 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 36000\n- 4 (from 100 place of first number) * 1 (from 100 place of second number) = 4 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n\nNow, add all these results together:\nThe sum of 36 + 540 + 600 + 180 + 2700 + 3000 + 2400 + 36000 + 40000 = 85456."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 928 * 741?"}, {"role": "assistant", "content": "Here are the steps for multiplying 928 * 741 using the long multiplication method.\nStep 1: Break first number 928 into its individual digits: 9 (hundreds place), 2 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 741 into its individual digits: 7 (hundreds place), 4 (tens place), and 1 (ones place).\n- 8 (from 1 place of first number) * 1 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 8 (from 1 place of first number) * 4 (from 10 place of second number) = 32 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 320\n- 8 (from 1 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5600\n- 2 (from 10 place of first number) * 1 (from 1 place of second number) = 2 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 2 (from 10 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 2 (from 10 place of first number) * 7 (from 100 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 14000\n- 9 (from 100 place of first number) * 1 (from 1 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 900\n- 9 (from 100 place of first number) * 4 (from 10 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 36000\n- 9 (from 100 place of first number) * 7 (from 100 place of second number) = 63 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 630000\n\nNow, add all these results together:\nThe sum of 8 + 320 + 5600 + 20 + 800 + 14000 + 900 + 36000 + 630000 = 687648."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 361 * 418?"}, {"role": "assistant", "content": "Here are the steps for multiplying 361 * 418 using the long multiplication method.\nStep 1: Break first number 361 into its individual digits: 3 (hundreds place), 6 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 418 into its individual digits: 4 (hundreds place), 1 (tens place), and 8 (ones place).\n- 1 (from 1 place of first number) * 8 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 1 (from 1 place of first number) * 1 (from 10 place of second number) = 1 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 10\n- 1 (from 1 place of first number) * 4 (from 100 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 400\n- 6 (from 10 place of first number) * 8 (from 1 place of second number) = 48 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 480\n- 6 (from 10 place of first number) * 1 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 6 (from 10 place of first number) * 4 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 3 (from 100 place of first number) * 8 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 3 (from 100 place of first number) * 1 (from 10 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 3000\n- 3 (from 100 place of first number) * 4 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 8 + 10 + 400 + 480 + 600 + 24000 + 2400 + 3000 + 120000 = 150898."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 679 * 608?"}, {"role": "assistant", "content": "Here are the steps for multiplying 679 * 608 using the long multiplication method.\nStep 1: Break first number 679 into its individual digits: 6 (hundreds place), 7 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 608 into its individual digits: 6 (hundreds place), 0 (tens place), and 8 (ones place).\n- 9 (from 1 place of first number) * 8 (from 1 place of second number) = 72 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 72\n- 9 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 9 (from 1 place of first number) * 6 (from 100 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5400\n- 7 (from 10 place of first number) * 8 (from 1 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 560\n- 7 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 7 (from 10 place of first number) * 6 (from 100 place of second number) = 42 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 42000\n- 6 (from 100 place of first number) * 8 (from 1 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4800\n- 6 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 6 (from 100 place of first number) * 6 (from 100 place of second number) = 36 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 360000\n\nNow, add all these results together:\nThe sum of 72 + 0 + 5400 + 560 + 0 + 42000 + 4800 + 0 + 360000 = 412832."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 575 * 904?"}, {"role": "assistant", "content": "Here are the steps for multiplying 575 * 904 using the long multiplication method.\nStep 1: Break first number 575 into its individual digits: 5 (hundreds place), 7 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 904 into its individual digits: 9 (hundreds place), 0 (tens place), and 4 (ones place).\n- 5 (from 1 place of first number) * 4 (from 1 place of second number) = 20 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 20\n- 5 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 5 (from 1 place of first number) * 9 (from 100 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4500\n- 7 (from 10 place of first number) * 4 (from 1 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 280\n- 7 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 7 (from 10 place of first number) * 9 (from 100 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 63000\n- 5 (from 100 place of first number) * 4 (from 1 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2000\n- 5 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 5 (from 100 place of first number) * 9 (from 100 place of second number) = 45 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 450000\n\nNow, add all these results together:\nThe sum of 20 + 0 + 4500 + 280 + 0 + 63000 + 2000 + 0 + 450000 = 519800."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 688 * 350?"}, {"role": "assistant", "content": "Here are the steps for multiplying 688 * 350 using the long multiplication method.\nStep 1: Break first number 688 into its individual digits: 6 (hundreds place), 8 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 350 into its individual digits: 3 (hundreds place), 5 (tens place), and 0 (ones place).\n- 8 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 1 place of first number) * 5 (from 10 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 8 (from 1 place of first number) * 3 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 8 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 10 place of first number) * 5 (from 10 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 8 (from 10 place of first number) * 3 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 6 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 6 (from 100 place of first number) * 5 (from 10 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 30000\n- 6 (from 100 place of first number) * 3 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 0 + 400 + 2400 + 0 + 4000 + 24000 + 0 + 30000 + 180000 = 240800."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 627 * 882?"}, {"role": "assistant", "content": "Here are the steps for multiplying 627 * 882 using the long multiplication method.\nStep 1: Break first number 627 into its individual digits: 6 (hundreds place), 2 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 882 into its individual digits: 8 (hundreds place), 8 (tens place), and 2 (ones place).\n- 7 (from 1 place of first number) * 2 (from 1 place of second number) = 14 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 14\n- 7 (from 1 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 560\n- 7 (from 1 place of first number) * 8 (from 100 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5600\n- 2 (from 10 place of first number) * 2 (from 1 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 2 (from 10 place of first number) * 8 (from 10 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1600\n- 2 (from 10 place of first number) * 8 (from 100 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 16000\n- 6 (from 100 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 6 (from 100 place of first number) * 8 (from 10 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 48000\n- 6 (from 100 place of first number) * 8 (from 100 place of second number) = 48 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 480000\n\nNow, add all these results together:\nThe sum of 14 + 560 + 5600 + 40 + 1600 + 16000 + 1200 + 48000 + 480000 = 553014."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 604 * 544?"}, {"role": "assistant", "content": "Here are the steps for multiplying 604 * 544 using the long multiplication method.\nStep 1: Break first number 604 into its individual digits: 6 (hundreds place), 0 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 544 into its individual digits: 5 (hundreds place), 4 (tens place), and 4 (ones place).\n- 4 (from 1 place of first number) * 4 (from 1 place of second number) = 16 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 16\n- 4 (from 1 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 160\n- 4 (from 1 place of first number) * 5 (from 100 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 0 (from 10 place of first number) * 4 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 4 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 5 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 6 (from 100 place of first number) * 4 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 6 (from 100 place of first number) * 4 (from 10 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 24000\n- 6 (from 100 place of first number) * 5 (from 100 place of second number) = 30 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 300000\n\nNow, add all these results together:\nThe sum of 16 + 160 + 2000 + 0 + 0 + 0 + 2400 + 24000 + 300000 = 328576."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 456 * 733?"}, {"role": "assistant", "content": "Here are the steps for multiplying 456 * 733 using the long multiplication method.\nStep 1: Break first number 456 into its individual digits: 4 (hundreds place), 5 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 733 into its individual digits: 7 (hundreds place), 3 (tens place), and 3 (ones place).\n- 6 (from 1 place of first number) * 3 (from 1 place of second number) = 18 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 18\n- 6 (from 1 place of first number) * 3 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 6 (from 1 place of first number) * 7 (from 100 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4200\n- 5 (from 10 place of first number) * 3 (from 1 place of second number) = 15 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 150\n- 5 (from 10 place of first number) * 3 (from 10 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1500\n- 5 (from 10 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 35000\n- 4 (from 100 place of first number) * 3 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 4 (from 100 place of first number) * 3 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 4 (from 100 place of first number) * 7 (from 100 place of second number) = 28 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 280000\n\nNow, add all these results together:\nThe sum of 18 + 180 + 4200 + 150 + 1500 + 35000 + 1200 + 12000 + 280000 = 334248."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 801 * 195?"}, {"role": "assistant", "content": "Here are the steps for multiplying 801 * 195 using the long multiplication method.\nStep 1: Break first number 801 into its individual digits: 8 (hundreds place), 0 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 195 into its individual digits: 1 (hundreds place), 9 (tens place), and 5 (ones place).\n- 1 (from 1 place of first number) * 5 (from 1 place of second number) = 5 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 5\n- 1 (from 1 place of first number) * 9 (from 10 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 90\n- 1 (from 1 place of first number) * 1 (from 100 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 100\n- 0 (from 10 place of first number) * 5 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 9 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 1 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 8 (from 100 place of first number) * 5 (from 1 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4000\n- 8 (from 100 place of first number) * 9 (from 10 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 72000\n- 8 (from 100 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 5 + 90 + 100 + 0 + 0 + 0 + 4000 + 72000 + 80000 = 156195."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 181 * 348?"}, {"role": "assistant", "content": "Here are the steps for multiplying 181 * 348 using the long multiplication method.\nStep 1: Break first number 181 into its individual digits: 1 (hundreds place), 8 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 348 into its individual digits: 3 (hundreds place), 4 (tens place), and 8 (ones place).\n- 1 (from 1 place of first number) * 8 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 1 (from 1 place of first number) * 4 (from 10 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 40\n- 1 (from 1 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 300\n- 8 (from 10 place of first number) * 8 (from 1 place of second number) = 64 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 640\n- 8 (from 10 place of first number) * 4 (from 10 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3200\n- 8 (from 10 place of first number) * 3 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 1 (from 100 place of first number) * 8 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 1 (from 100 place of first number) * 4 (from 10 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 1 (from 100 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n\nNow, add all these results together:\nThe sum of 8 + 40 + 300 + 640 + 3200 + 24000 + 800 + 4000 + 30000 = 62988."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 115 * 361?"}, {"role": "assistant", "content": "Here are the steps for multiplying 115 * 361 using the long multiplication method.\nStep 1: Break first number 115 into its individual digits: 1 (hundreds place), 1 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 361 into its individual digits: 3 (hundreds place), 6 (tens place), and 1 (ones place).\n- 5 (from 1 place of first number) * 1 (from 1 place of second number) = 5 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 5\n- 5 (from 1 place of first number) * 6 (from 10 place of second number) = 30 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 300\n- 5 (from 1 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1500\n- 1 (from 10 place of first number) * 1 (from 1 place of second number) = 1 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 10\n- 1 (from 10 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 1 (from 10 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 1 (from 100 place of first number) * 1 (from 1 place of second number) = 1 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 100\n- 1 (from 100 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 1 (from 100 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n\nNow, add all these results together:\nThe sum of 5 + 300 + 1500 + 10 + 600 + 3000 + 100 + 6000 + 30000 = 41515."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 842 * 799?"}, {"role": "assistant", "content": "Here are the steps for multiplying 842 * 799 using the long multiplication method.\nStep 1: Break first number 842 into its individual digits: 8 (hundreds place), 4 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 799 into its individual digits: 7 (hundreds place), 9 (tens place), and 9 (ones place).\n- 2 (from 1 place of first number) * 9 (from 1 place of second number) = 18 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 18\n- 2 (from 1 place of first number) * 9 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 2 (from 1 place of first number) * 7 (from 100 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1400\n- 4 (from 10 place of first number) * 9 (from 1 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 360\n- 4 (from 10 place of first number) * 9 (from 10 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3600\n- 4 (from 10 place of first number) * 7 (from 100 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 28000\n- 8 (from 100 place of first number) * 9 (from 1 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 7200\n- 8 (from 100 place of first number) * 9 (from 10 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 72000\n- 8 (from 100 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 560000\n\nNow, add all these results together:\nThe sum of 18 + 180 + 1400 + 360 + 3600 + 28000 + 7200 + 72000 + 560000 = 672758."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 237 * 943?"}, {"role": "assistant", "content": "Here are the steps for multiplying 237 * 943 using the long multiplication method.\nStep 1: Break first number 237 into its individual digits: 2 (hundreds place), 3 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 943 into its individual digits: 9 (hundreds place), 4 (tens place), and 3 (ones place).\n- 7 (from 1 place of first number) * 3 (from 1 place of second number) = 21 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 21\n- 7 (from 1 place of first number) * 4 (from 10 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 280\n- 7 (from 1 place of first number) * 9 (from 100 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 6300\n- 3 (from 10 place of first number) * 3 (from 1 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 90\n- 3 (from 10 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1200\n- 3 (from 10 place of first number) * 9 (from 100 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 27000\n- 2 (from 100 place of first number) * 3 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 2 (from 100 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 2 (from 100 place of first number) * 9 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 21 + 280 + 6300 + 90 + 1200 + 27000 + 600 + 8000 + 180000 = 223491."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 923 * 575?"}, {"role": "assistant", "content": "Here are the steps for multiplying 923 * 575 using the long multiplication method.\nStep 1: Break first number 923 into its individual digits: 9 (hundreds place), 2 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 575 into its individual digits: 5 (hundreds place), 7 (tens place), and 5 (ones place).\n- 3 (from 1 place of first number) * 5 (from 1 place of second number) = 15 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 15\n- 3 (from 1 place of first number) * 7 (from 10 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 210\n- 3 (from 1 place of first number) * 5 (from 100 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1500\n- 2 (from 10 place of first number) * 5 (from 1 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 100\n- 2 (from 10 place of first number) * 7 (from 10 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1400\n- 2 (from 10 place of first number) * 5 (from 100 place of second number) = 10 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 10000\n- 9 (from 100 place of first number) * 5 (from 1 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4500\n- 9 (from 100 place of first number) * 7 (from 10 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 63000\n- 9 (from 100 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 450000\n\nNow, add all these results together:\nThe sum of 15 + 210 + 1500 + 100 + 1400 + 10000 + 4500 + 63000 + 450000 = 530725."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 498 * 337?"}, {"role": "assistant", "content": "Here are the steps for multiplying 498 * 337 using the long multiplication method.\nStep 1: Break first number 498 into its individual digits: 4 (hundreds place), 9 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 337 into its individual digits: 3 (hundreds place), 3 (tens place), and 7 (ones place).\n- 8 (from 1 place of first number) * 7 (from 1 place of second number) = 56 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 56\n- 8 (from 1 place of first number) * 3 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 8 (from 1 place of first number) * 3 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 9 (from 10 place of first number) * 7 (from 1 place of second number) = 63 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 630\n- 9 (from 10 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2700\n- 9 (from 10 place of first number) * 3 (from 100 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 27000\n- 4 (from 100 place of first number) * 7 (from 1 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2800\n- 4 (from 100 place of first number) * 3 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 4 (from 100 place of first number) * 3 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 56 + 240 + 2400 + 630 + 2700 + 27000 + 2800 + 12000 + 120000 = 167826."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 651 * 339?"}, {"role": "assistant", "content": "Here are the steps for multiplying 651 * 339 using the long multiplication method.\nStep 1: Break first number 651 into its individual digits: 6 (hundreds place), 5 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 339 into its individual digits: 3 (hundreds place), 3 (tens place), and 9 (ones place).\n- 1 (from 1 place of first number) * 9 (from 1 place of second number) = 9 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 9\n- 1 (from 1 place of first number) * 3 (from 10 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 30\n- 1 (from 1 place of first number) * 3 (from 100 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 300\n- 5 (from 10 place of first number) * 9 (from 1 place of second number) = 45 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 450\n- 5 (from 10 place of first number) * 3 (from 10 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1500\n- 5 (from 10 place of first number) * 3 (from 100 place of second number) = 15 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 15000\n- 6 (from 100 place of first number) * 9 (from 1 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 5400\n- 6 (from 100 place of first number) * 3 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 6 (from 100 place of first number) * 3 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 9 + 30 + 300 + 450 + 1500 + 15000 + 5400 + 18000 + 180000 = 220689."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 803 * 719?"}, {"role": "assistant", "content": "Here are the steps for multiplying 803 * 719 using the long multiplication method.\nStep 1: Break first number 803 into its individual digits: 8 (hundreds place), 0 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 719 into its individual digits: 7 (hundreds place), 1 (tens place), and 9 (ones place).\n- 3 (from 1 place of first number) * 9 (from 1 place of second number) = 27 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 27\n- 3 (from 1 place of first number) * 1 (from 10 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 30\n- 3 (from 1 place of first number) * 7 (from 100 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2100\n- 0 (from 10 place of first number) * 9 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 1 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 7 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 8 (from 100 place of first number) * 9 (from 1 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 7200\n- 8 (from 100 place of first number) * 1 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 8 (from 100 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 560000\n\nNow, add all these results together:\nThe sum of 27 + 30 + 2100 + 0 + 0 + 0 + 7200 + 8000 + 560000 = 577357."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 467 * 879?"}, {"role": "assistant", "content": "Here are the steps for multiplying 467 * 879 using the long multiplication method.\nStep 1: Break first number 467 into its individual digits: 4 (hundreds place), 6 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 879 into its individual digits: 8 (hundreds place), 7 (tens place), and 9 (ones place).\n- 7 (from 1 place of first number) * 9 (from 1 place of second number) = 63 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 63\n- 7 (from 1 place of first number) * 7 (from 10 place of second number) = 49 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 490\n- 7 (from 1 place of first number) * 8 (from 100 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5600\n- 6 (from 10 place of first number) * 9 (from 1 place of second number) = 54 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 540\n- 6 (from 10 place of first number) * 7 (from 10 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4200\n- 6 (from 10 place of first number) * 8 (from 100 place of second number) = 48 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 48000\n- 4 (from 100 place of first number) * 9 (from 1 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3600\n- 4 (from 100 place of first number) * 7 (from 10 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 28000\n- 4 (from 100 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 320000\n\nNow, add all these results together:\nThe sum of 63 + 490 + 5600 + 540 + 4200 + 48000 + 3600 + 28000 + 320000 = 410493."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 491 * 875?"}, {"role": "assistant", "content": "Here are the steps for multiplying 491 * 875 using the long multiplication method.\nStep 1: Break first number 491 into its individual digits: 4 (hundreds place), 9 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 875 into its individual digits: 8 (hundreds place), 7 (tens place), and 5 (ones place).\n- 1 (from 1 place of first number) * 5 (from 1 place of second number) = 5 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 5\n- 1 (from 1 place of first number) * 7 (from 10 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 70\n- 1 (from 1 place of first number) * 8 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 9 (from 10 place of first number) * 5 (from 1 place of second number) = 45 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 450\n- 9 (from 10 place of first number) * 7 (from 10 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 6300\n- 9 (from 10 place of first number) * 8 (from 100 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 72000\n- 4 (from 100 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2000\n- 4 (from 100 place of first number) * 7 (from 10 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 28000\n- 4 (from 100 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 320000\n\nNow, add all these results together:\nThe sum of 5 + 70 + 800 + 450 + 6300 + 72000 + 2000 + 28000 + 320000 = 429625."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 699 * 813?"}, {"role": "assistant", "content": "Here are the steps for multiplying 699 * 813 using the long multiplication method.\nStep 1: Break first number 699 into its individual digits: 6 (hundreds place), 9 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 813 into its individual digits: 8 (hundreds place), 1 (tens place), and 3 (ones place).\n- 9 (from 1 place of first number) * 3 (from 1 place of second number) = 27 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 27\n- 9 (from 1 place of first number) * 1 (from 10 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 90\n- 9 (from 1 place of first number) * 8 (from 100 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 7200\n- 9 (from 10 place of first number) * 3 (from 1 place of second number) = 27 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 270\n- 9 (from 10 place of first number) * 1 (from 10 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 900\n- 9 (from 10 place of first number) * 8 (from 100 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 72000\n- 6 (from 100 place of first number) * 3 (from 1 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1800\n- 6 (from 100 place of first number) * 1 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 6 (from 100 place of first number) * 8 (from 100 place of second number) = 48 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 480000\n\nNow, add all these results together:\nThe sum of 27 + 90 + 7200 + 270 + 900 + 72000 + 1800 + 6000 + 480000 = 568287."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 937 * 979?"}, {"role": "assistant", "content": "Here are the steps for multiplying 937 * 979 using the long multiplication method.\nStep 1: Break first number 937 into its individual digits: 9 (hundreds place), 3 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 979 into its individual digits: 9 (hundreds place), 7 (tens place), and 9 (ones place).\n- 7 (from 1 place of first number) * 9 (from 1 place of second number) = 63 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 63\n- 7 (from 1 place of first number) * 7 (from 10 place of second number) = 49 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 490\n- 7 (from 1 place of first number) * 9 (from 100 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 6300\n- 3 (from 10 place of first number) * 9 (from 1 place of second number) = 27 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 270\n- 3 (from 10 place of first number) * 7 (from 10 place of second number) = 21 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2100\n- 3 (from 10 place of first number) * 9 (from 100 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 27000\n- 9 (from 100 place of first number) * 9 (from 1 place of second number) = 81 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 8100\n- 9 (from 100 place of first number) * 7 (from 10 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 63000\n- 9 (from 100 place of first number) * 9 (from 100 place of second number) = 81 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 810000\n\nNow, add all these results together:\nThe sum of 63 + 490 + 6300 + 270 + 2100 + 27000 + 8100 + 63000 + 810000 = 917323."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 656 * 716?"}, {"role": "assistant", "content": "Here are the steps for multiplying 656 * 716 using the long multiplication method.\nStep 1: Break first number 656 into its individual digits: 6 (hundreds place), 5 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 716 into its individual digits: 7 (hundreds place), 1 (tens place), and 6 (ones place).\n- 6 (from 1 place of first number) * 6 (from 1 place of second number) = 36 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 36\n- 6 (from 1 place of first number) * 1 (from 10 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 60\n- 6 (from 1 place of first number) * 7 (from 100 place of second number) = 42 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4200\n- 5 (from 10 place of first number) * 6 (from 1 place of second number) = 30 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 5 (from 10 place of first number) * 1 (from 10 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 500\n- 5 (from 10 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 35000\n- 6 (from 100 place of first number) * 6 (from 1 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3600\n- 6 (from 100 place of first number) * 1 (from 10 place of second number) = 6 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 6000\n- 6 (from 100 place of first number) * 7 (from 100 place of second number) = 42 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 420000\n\nNow, add all these results together:\nThe sum of 36 + 60 + 4200 + 300 + 500 + 35000 + 3600 + 6000 + 420000 = 469696."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 539 * 941?"}, {"role": "assistant", "content": "Here are the steps for multiplying 539 * 941 using the long multiplication method.\nStep 1: Break first number 539 into its individual digits: 5 (hundreds place), 3 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 941 into its individual digits: 9 (hundreds place), 4 (tens place), and 1 (ones place).\n- 9 (from 1 place of first number) * 1 (from 1 place of second number) = 9 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 9\n- 9 (from 1 place of first number) * 4 (from 10 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 360\n- 9 (from 1 place of first number) * 9 (from 100 place of second number) = 81 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 8100\n- 3 (from 10 place of first number) * 1 (from 1 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 3 (from 10 place of first number) * 4 (from 10 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1200\n- 3 (from 10 place of first number) * 9 (from 100 place of second number) = 27 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 27000\n- 5 (from 100 place of first number) * 1 (from 1 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 500\n- 5 (from 100 place of first number) * 4 (from 10 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 20000\n- 5 (from 100 place of first number) * 9 (from 100 place of second number) = 45 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 450000\n\nNow, add all these results together:\nThe sum of 9 + 360 + 8100 + 30 + 1200 + 27000 + 500 + 20000 + 450000 = 507199."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 846 * 112?"}, {"role": "assistant", "content": "Here are the steps for multiplying 846 * 112 using the long multiplication method.\nStep 1: Break first number 846 into its individual digits: 8 (hundreds place), 4 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 112 into its individual digits: 1 (hundreds place), 1 (tens place), and 2 (ones place).\n- 6 (from 1 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 12\n- 6 (from 1 place of first number) * 1 (from 10 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 60\n- 6 (from 1 place of first number) * 1 (from 100 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 600\n- 4 (from 10 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 4 (from 10 place of first number) * 1 (from 10 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 4 (from 10 place of first number) * 1 (from 100 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 8 (from 100 place of first number) * 2 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 8 (from 100 place of first number) * 1 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 8 (from 100 place of first number) * 1 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 12 + 60 + 600 + 80 + 400 + 4000 + 1600 + 8000 + 80000 = 94752."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 548 * 767?"}, {"role": "assistant", "content": "Here are the steps for multiplying 548 * 767 using the long multiplication method.\nStep 1: Break first number 548 into its individual digits: 5 (hundreds place), 4 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 767 into its individual digits: 7 (hundreds place), 6 (tens place), and 7 (ones place).\n- 8 (from 1 place of first number) * 7 (from 1 place of second number) = 56 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 56\n- 8 (from 1 place of first number) * 6 (from 10 place of second number) = 48 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 480\n- 8 (from 1 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5600\n- 4 (from 10 place of first number) * 7 (from 1 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 280\n- 4 (from 10 place of first number) * 6 (from 10 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2400\n- 4 (from 10 place of first number) * 7 (from 100 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 28000\n- 5 (from 100 place of first number) * 7 (from 1 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3500\n- 5 (from 100 place of first number) * 6 (from 10 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 30000\n- 5 (from 100 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 350000\n\nNow, add all these results together:\nThe sum of 56 + 480 + 5600 + 280 + 2400 + 28000 + 3500 + 30000 + 350000 = 420316."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 658 * 990?"}, {"role": "assistant", "content": "Here are the steps for multiplying 658 * 990 using the long multiplication method.\nStep 1: Break first number 658 into its individual digits: 6 (hundreds place), 5 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 990 into its individual digits: 9 (hundreds place), 9 (tens place), and 0 (ones place).\n- 8 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 1 place of first number) * 9 (from 10 place of second number) = 72 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 720\n- 8 (from 1 place of first number) * 9 (from 100 place of second number) = 72 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 7200\n- 5 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 5 (from 10 place of first number) * 9 (from 10 place of second number) = 45 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 4500\n- 5 (from 10 place of first number) * 9 (from 100 place of second number) = 45 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 45000\n- 6 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 6 (from 100 place of first number) * 9 (from 10 place of second number) = 54 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 54000\n- 6 (from 100 place of first number) * 9 (from 100 place of second number) = 54 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 540000\n\nNow, add all these results together:\nThe sum of 0 + 720 + 7200 + 0 + 4500 + 45000 + 0 + 54000 + 540000 = 651420."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 133 * 629?"}, {"role": "assistant", "content": "Here are the steps for multiplying 133 * 629 using the long multiplication method.\nStep 1: Break first number 133 into its individual digits: 1 (hundreds place), 3 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 629 into its individual digits: 6 (hundreds place), 2 (tens place), and 9 (ones place).\n- 3 (from 1 place of first number) * 9 (from 1 place of second number) = 27 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 27\n- 3 (from 1 place of first number) * 2 (from 10 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 60\n- 3 (from 1 place of first number) * 6 (from 100 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1800\n- 3 (from 10 place of first number) * 9 (from 1 place of second number) = 27 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 270\n- 3 (from 10 place of first number) * 2 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 3 (from 10 place of first number) * 6 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 1 (from 100 place of first number) * 9 (from 1 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 900\n- 1 (from 100 place of first number) * 2 (from 10 place of second number) = 2 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 1 (from 100 place of first number) * 6 (from 100 place of second number) = 6 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 60000\n\nNow, add all these results together:\nThe sum of 27 + 60 + 1800 + 270 + 600 + 18000 + 900 + 2000 + 60000 = 83657."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 809 * 644?"}, {"role": "assistant", "content": "Here are the steps for multiplying 809 * 644 using the long multiplication method.\nStep 1: Break first number 809 into its individual digits: 8 (hundreds place), 0 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 644 into its individual digits: 6 (hundreds place), 4 (tens place), and 4 (ones place).\n- 9 (from 1 place of first number) * 4 (from 1 place of second number) = 36 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 36\n- 9 (from 1 place of first number) * 4 (from 10 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 360\n- 9 (from 1 place of first number) * 6 (from 100 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 5400\n- 0 (from 10 place of first number) * 4 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 4 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 6 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 8 (from 100 place of first number) * 4 (from 1 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3200\n- 8 (from 100 place of first number) * 4 (from 10 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 32000\n- 8 (from 100 place of first number) * 6 (from 100 place of second number) = 48 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 480000\n\nNow, add all these results together:\nThe sum of 36 + 360 + 5400 + 0 + 0 + 0 + 3200 + 32000 + 480000 = 520996."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 852 * 741?"}, {"role": "assistant", "content": "Here are the steps for multiplying 852 * 741 using the long multiplication method.\nStep 1: Break first number 852 into its individual digits: 8 (hundreds place), 5 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 741 into its individual digits: 7 (hundreds place), 4 (tens place), and 1 (ones place).\n- 2 (from 1 place of first number) * 1 (from 1 place of second number) = 2 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 2\n- 2 (from 1 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 80\n- 2 (from 1 place of first number) * 7 (from 100 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1400\n- 5 (from 10 place of first number) * 1 (from 1 place of second number) = 5 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 50\n- 5 (from 10 place of first number) * 4 (from 10 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2000\n- 5 (from 10 place of first number) * 7 (from 100 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 35000\n- 8 (from 100 place of first number) * 1 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 8 (from 100 place of first number) * 4 (from 10 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 32000\n- 8 (from 100 place of first number) * 7 (from 100 place of second number) = 56 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 560000\n\nNow, add all these results together:\nThe sum of 2 + 80 + 1400 + 50 + 2000 + 35000 + 800 + 32000 + 560000 = 631332."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 216 * 453?"}, {"role": "assistant", "content": "Here are the steps for multiplying 216 * 453 using the long multiplication method.\nStep 1: Break first number 216 into its individual digits: 2 (hundreds place), 1 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 453 into its individual digits: 4 (hundreds place), 5 (tens place), and 3 (ones place).\n- 6 (from 1 place of first number) * 3 (from 1 place of second number) = 18 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 18\n- 6 (from 1 place of first number) * 5 (from 10 place of second number) = 30 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 300\n- 6 (from 1 place of first number) * 4 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 1 (from 10 place of first number) * 3 (from 1 place of second number) = 3 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 1 (from 10 place of first number) * 5 (from 10 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 500\n- 1 (from 10 place of first number) * 4 (from 100 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 2 (from 100 place of first number) * 3 (from 1 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 600\n- 2 (from 100 place of first number) * 5 (from 10 place of second number) = 10 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 10000\n- 2 (from 100 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 18 + 300 + 2400 + 30 + 500 + 4000 + 600 + 10000 + 80000 = 97848."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 416 * 174?"}, {"role": "assistant", "content": "Here are the steps for multiplying 416 * 174 using the long multiplication method.\nStep 1: Break first number 416 into its individual digits: 4 (hundreds place), 1 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 174 into its individual digits: 1 (hundreds place), 7 (tens place), and 4 (ones place).\n- 6 (from 1 place of first number) * 4 (from 1 place of second number) = 24 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 24\n- 6 (from 1 place of first number) * 7 (from 10 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 420\n- 6 (from 1 place of first number) * 1 (from 100 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 600\n- 1 (from 10 place of first number) * 4 (from 1 place of second number) = 4 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 40\n- 1 (from 10 place of first number) * 7 (from 10 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 700\n- 1 (from 10 place of first number) * 1 (from 100 place of second number) = 1 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 1000\n- 4 (from 100 place of first number) * 4 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 4 (from 100 place of first number) * 7 (from 10 place of second number) = 28 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 28000\n- 4 (from 100 place of first number) * 1 (from 100 place of second number) = 4 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n\nNow, add all these results together:\nThe sum of 24 + 420 + 600 + 40 + 700 + 1000 + 1600 + 28000 + 40000 = 72384."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 914 * 567?"}, {"role": "assistant", "content": "Here are the steps for multiplying 914 * 567 using the long multiplication method.\nStep 1: Break first number 914 into its individual digits: 9 (hundreds place), 1 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 567 into its individual digits: 5 (hundreds place), 6 (tens place), and 7 (ones place).\n- 4 (from 1 place of first number) * 7 (from 1 place of second number) = 28 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 28\n- 4 (from 1 place of first number) * 6 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 4 (from 1 place of first number) * 5 (from 100 place of second number) = 20 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2000\n- 1 (from 10 place of first number) * 7 (from 1 place of second number) = 7 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 70\n- 1 (from 10 place of first number) * 6 (from 10 place of second number) = 6 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 600\n- 1 (from 10 place of first number) * 5 (from 100 place of second number) = 5 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 5000\n- 9 (from 100 place of first number) * 7 (from 1 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 6300\n- 9 (from 100 place of first number) * 6 (from 10 place of second number) = 54 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 54000\n- 9 (from 100 place of first number) * 5 (from 100 place of second number) = 45 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 450000\n\nNow, add all these results together:\nThe sum of 28 + 240 + 2000 + 70 + 600 + 5000 + 6300 + 54000 + 450000 = 518238."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 468 * 522?"}, {"role": "assistant", "content": "Here are the steps for multiplying 468 * 522 using the long multiplication method.\nStep 1: Break first number 468 into its individual digits: 4 (hundreds place), 6 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 522 into its individual digits: 5 (hundreds place), 2 (tens place), and 2 (ones place).\n- 8 (from 1 place of first number) * 2 (from 1 place of second number) = 16 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 16\n- 8 (from 1 place of first number) * 2 (from 10 place of second number) = 16 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 160\n- 8 (from 1 place of first number) * 5 (from 100 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 6 (from 10 place of first number) * 2 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 6 (from 10 place of first number) * 2 (from 10 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1200\n- 6 (from 10 place of first number) * 5 (from 100 place of second number) = 30 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 30000\n- 4 (from 100 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 800\n- 4 (from 100 place of first number) * 2 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 4 (from 100 place of first number) * 5 (from 100 place of second number) = 20 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 200000\n\nNow, add all these results together:\nThe sum of 16 + 160 + 4000 + 120 + 1200 + 30000 + 800 + 8000 + 200000 = 244296."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 155 * 807?"}, {"role": "assistant", "content": "Here are the steps for multiplying 155 * 807 using the long multiplication method.\nStep 1: Break first number 155 into its individual digits: 1 (hundreds place), 5 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 807 into its individual digits: 8 (hundreds place), 0 (tens place), and 7 (ones place).\n- 5 (from 1 place of first number) * 7 (from 1 place of second number) = 35 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 35\n- 5 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 5 (from 1 place of first number) * 8 (from 100 place of second number) = 40 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 5 (from 10 place of first number) * 7 (from 1 place of second number) = 35 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 350\n- 5 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 5 (from 10 place of first number) * 8 (from 100 place of second number) = 40 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n- 1 (from 100 place of first number) * 7 (from 1 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 700\n- 1 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 1 (from 100 place of first number) * 8 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 35 + 0 + 4000 + 350 + 0 + 40000 + 700 + 0 + 80000 = 125085."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 746 * 485?"}, {"role": "assistant", "content": "Here are the steps for multiplying 746 * 485 using the long multiplication method.\nStep 1: Break first number 746 into its individual digits: 7 (hundreds place), 4 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 485 into its individual digits: 4 (hundreds place), 8 (tens place), and 5 (ones place).\n- 6 (from 1 place of first number) * 5 (from 1 place of second number) = 30 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 30\n- 6 (from 1 place of first number) * 8 (from 10 place of second number) = 48 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 480\n- 6 (from 1 place of first number) * 4 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 4 (from 10 place of first number) * 5 (from 1 place of second number) = 20 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 200\n- 4 (from 10 place of first number) * 8 (from 10 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3200\n- 4 (from 10 place of first number) * 4 (from 100 place of second number) = 16 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 16000\n- 7 (from 100 place of first number) * 5 (from 1 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3500\n- 7 (from 100 place of first number) * 8 (from 10 place of second number) = 56 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 56000\n- 7 (from 100 place of first number) * 4 (from 100 place of second number) = 28 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 280000\n\nNow, add all these results together:\nThe sum of 30 + 480 + 2400 + 200 + 3200 + 16000 + 3500 + 56000 + 280000 = 361810."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 573 * 196?"}, {"role": "assistant", "content": "Here are the steps for multiplying 573 * 196 using the long multiplication method.\nStep 1: Break first number 573 into its individual digits: 5 (hundreds place), 7 (tens place), and 3 (ones place).\nStep 2: Similarly, break second number 196 into its individual digits: 1 (hundreds place), 9 (tens place), and 6 (ones place).\n- 3 (from 1 place of first number) * 6 (from 1 place of second number) = 18 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 18\n- 3 (from 1 place of first number) * 9 (from 10 place of second number) = 27 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 270\n- 3 (from 1 place of first number) * 1 (from 100 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 300\n- 7 (from 10 place of first number) * 6 (from 1 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 420\n- 7 (from 10 place of first number) * 9 (from 10 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 6300\n- 7 (from 10 place of first number) * 1 (from 100 place of second number) = 7 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 7000\n- 5 (from 100 place of first number) * 6 (from 1 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 3000\n- 5 (from 100 place of first number) * 9 (from 10 place of second number) = 45 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 45000\n- 5 (from 100 place of first number) * 1 (from 100 place of second number) = 5 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 50000\n\nNow, add all these results together:\nThe sum of 18 + 270 + 300 + 420 + 6300 + 7000 + 3000 + 45000 + 50000 = 112308."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 120 * 245?"}, {"role": "assistant", "content": "Here are the steps for multiplying 120 * 245 using the long multiplication method.\nStep 1: Break first number 120 into its individual digits: 1 (hundreds place), 2 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 245 into its individual digits: 2 (hundreds place), 4 (tens place), and 5 (ones place).\n- 0 (from 1 place of first number) * 5 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 4 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 2 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 2 (from 10 place of first number) * 5 (from 1 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 100\n- 2 (from 10 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 800\n- 2 (from 10 place of first number) * 2 (from 100 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 4000\n- 1 (from 100 place of first number) * 5 (from 1 place of second number) = 5 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 500\n- 1 (from 100 place of first number) * 4 (from 10 place of second number) = 4 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 4000\n- 1 (from 100 place of first number) * 2 (from 100 place of second number) = 2 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 100 + 800 + 4000 + 500 + 4000 + 20000 = 29400."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 310 * 908?"}, {"role": "assistant", "content": "Here are the steps for multiplying 310 * 908 using the long multiplication method.\nStep 1: Break first number 310 into its individual digits: 3 (hundreds place), 1 (tens place), and 0 (ones place).\nStep 2: Similarly, break second number 908 into its individual digits: 9 (hundreds place), 0 (tens place), and 8 (ones place).\n- 0 (from 1 place of first number) * 8 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 1 place of first number) * 9 (from 100 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 1 (from 10 place of first number) * 8 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 1 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 1 (from 10 place of first number) * 9 (from 100 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 9000\n- 3 (from 100 place of first number) * 8 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 3 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 3 (from 100 place of first number) * 9 (from 100 place of second number) = 27 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 270000\n\nNow, add all these results together:\nThe sum of 0 + 0 + 0 + 80 + 0 + 9000 + 2400 + 0 + 270000 = 281480."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 249 * 946?"}, {"role": "assistant", "content": "Here are the steps for multiplying 249 * 946 using the long multiplication method.\nStep 1: Break first number 249 into its individual digits: 2 (hundreds place), 4 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 946 into its individual digits: 9 (hundreds place), 4 (tens place), and 6 (ones place).\n- 9 (from 1 place of first number) * 6 (from 1 place of second number) = 54 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 54\n- 9 (from 1 place of first number) * 4 (from 10 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 360\n- 9 (from 1 place of first number) * 9 (from 100 place of second number) = 81 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 8100\n- 4 (from 10 place of first number) * 6 (from 1 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 240\n- 4 (from 10 place of first number) * 4 (from 10 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1600\n- 4 (from 10 place of first number) * 9 (from 100 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 36000\n- 2 (from 100 place of first number) * 6 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 2 (from 100 place of first number) * 4 (from 10 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 8000\n- 2 (from 100 place of first number) * 9 (from 100 place of second number) = 18 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 180000\n\nNow, add all these results together:\nThe sum of 54 + 360 + 8100 + 240 + 1600 + 36000 + 1200 + 8000 + 180000 = 235554."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 234 * 762?"}, {"role": "assistant", "content": "Here are the steps for multiplying 234 * 762 using the long multiplication method.\nStep 1: Break first number 234 into its individual digits: 2 (hundreds place), 3 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 762 into its individual digits: 7 (hundreds place), 6 (tens place), and 2 (ones place).\n- 4 (from 1 place of first number) * 2 (from 1 place of second number) = 8 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 8\n- 4 (from 1 place of first number) * 6 (from 10 place of second number) = 24 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 240\n- 4 (from 1 place of first number) * 7 (from 100 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2800\n- 3 (from 10 place of first number) * 2 (from 1 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 60\n- 3 (from 10 place of first number) * 6 (from 10 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1800\n- 3 (from 10 place of first number) * 7 (from 100 place of second number) = 21 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 21000\n- 2 (from 100 place of first number) * 2 (from 1 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 2 (from 100 place of first number) * 6 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 2 (from 100 place of first number) * 7 (from 100 place of second number) = 14 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 140000\n\nNow, add all these results together:\nThe sum of 8 + 240 + 2800 + 60 + 1800 + 21000 + 400 + 12000 + 140000 = 178308."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 431 * 856?"}, {"role": "assistant", "content": "Here are the steps for multiplying 431 * 856 using the long multiplication method.\nStep 1: Break first number 431 into its individual digits: 4 (hundreds place), 3 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 856 into its individual digits: 8 (hundreds place), 5 (tens place), and 6 (ones place).\n- 1 (from 1 place of first number) * 6 (from 1 place of second number) = 6 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 6\n- 1 (from 1 place of first number) * 5 (from 10 place of second number) = 5 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 50\n- 1 (from 1 place of first number) * 8 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 3 (from 10 place of first number) * 6 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 3 (from 10 place of first number) * 5 (from 10 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1500\n- 3 (from 10 place of first number) * 8 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 4 (from 100 place of first number) * 6 (from 1 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2400\n- 4 (from 100 place of first number) * 5 (from 10 place of second number) = 20 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 20000\n- 4 (from 100 place of first number) * 8 (from 100 place of second number) = 32 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 320000\n\nNow, add all these results together:\nThe sum of 6 + 50 + 800 + 180 + 1500 + 24000 + 2400 + 20000 + 320000 = 368936."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 399 * 431?"}, {"role": "assistant", "content": "Here are the steps for multiplying 399 * 431 using the long multiplication method.\nStep 1: Break first number 399 into its individual digits: 3 (hundreds place), 9 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 431 into its individual digits: 4 (hundreds place), 3 (tens place), and 1 (ones place).\n- 9 (from 1 place of first number) * 1 (from 1 place of second number) = 9 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 9\n- 9 (from 1 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 270\n- 9 (from 1 place of first number) * 4 (from 100 place of second number) = 36 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3600\n- 9 (from 10 place of first number) * 1 (from 1 place of second number) = 9 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 90\n- 9 (from 10 place of first number) * 3 (from 10 place of second number) = 27 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2700\n- 9 (from 10 place of first number) * 4 (from 100 place of second number) = 36 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 36000\n- 3 (from 100 place of first number) * 1 (from 1 place of second number) = 3 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 3 (from 100 place of first number) * 3 (from 10 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 9000\n- 3 (from 100 place of first number) * 4 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 9 + 270 + 3600 + 90 + 2700 + 36000 + 300 + 9000 + 120000 = 171969."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 219 * 108?"}, {"role": "assistant", "content": "Here are the steps for multiplying 219 * 108 using the long multiplication method.\nStep 1: Break first number 219 into its individual digits: 2 (hundreds place), 1 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 108 into its individual digits: 1 (hundreds place), 0 (tens place), and 8 (ones place).\n- 9 (from 1 place of first number) * 8 (from 1 place of second number) = 72 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 72\n- 9 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 9 (from 1 place of first number) * 1 (from 100 place of second number) = 9 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 900\n- 1 (from 10 place of first number) * 8 (from 1 place of second number) = 8 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 80\n- 1 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 1 (from 10 place of first number) * 1 (from 100 place of second number) = 1 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 1000\n- 2 (from 100 place of first number) * 8 (from 1 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1600\n- 2 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 2 (from 100 place of first number) * 1 (from 100 place of second number) = 2 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 20000\n\nNow, add all these results together:\nThe sum of 72 + 0 + 900 + 80 + 0 + 1000 + 1600 + 0 + 20000 = 23652."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 367 * 435?"}, {"role": "assistant", "content": "Here are the steps for multiplying 367 * 435 using the long multiplication method.\nStep 1: Break first number 367 into its individual digits: 3 (hundreds place), 6 (tens place), and 7 (ones place).\nStep 2: Similarly, break second number 435 into its individual digits: 4 (hundreds place), 3 (tens place), and 5 (ones place).\n- 7 (from 1 place of first number) * 5 (from 1 place of second number) = 35 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 35\n- 7 (from 1 place of first number) * 3 (from 10 place of second number) = 21 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 210\n- 7 (from 1 place of first number) * 4 (from 100 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2800\n- 6 (from 10 place of first number) * 5 (from 1 place of second number) = 30 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 300\n- 6 (from 10 place of first number) * 3 (from 10 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1800\n- 6 (from 10 place of first number) * 4 (from 100 place of second number) = 24 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 24000\n- 3 (from 100 place of first number) * 5 (from 1 place of second number) = 15 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1500\n- 3 (from 100 place of first number) * 3 (from 10 place of second number) = 9 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 9000\n- 3 (from 100 place of first number) * 4 (from 100 place of second number) = 12 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 120000\n\nNow, add all these results together:\nThe sum of 35 + 210 + 2800 + 300 + 1800 + 24000 + 1500 + 9000 + 120000 = 159645."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 228 * 476?"}, {"role": "assistant", "content": "Here are the steps for multiplying 228 * 476 using the long multiplication method.\nStep 1: Break first number 228 into its individual digits: 2 (hundreds place), 2 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 476 into its individual digits: 4 (hundreds place), 7 (tens place), and 6 (ones place).\n- 8 (from 1 place of first number) * 6 (from 1 place of second number) = 48 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 48\n- 8 (from 1 place of first number) * 7 (from 10 place of second number) = 56 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 560\n- 8 (from 1 place of first number) * 4 (from 100 place of second number) = 32 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3200\n- 2 (from 10 place of first number) * 6 (from 1 place of second number) = 12 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 120\n- 2 (from 10 place of first number) * 7 (from 10 place of second number) = 14 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1400\n- 2 (from 10 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 8000\n- 2 (from 100 place of first number) * 6 (from 1 place of second number) = 12 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 1200\n- 2 (from 100 place of first number) * 7 (from 10 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 14000\n- 2 (from 100 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 80000\n\nNow, add all these results together:\nThe sum of 48 + 560 + 3200 + 120 + 1400 + 8000 + 1200 + 14000 + 80000 = 108528."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 682 * 438?"}, {"role": "assistant", "content": "Here are the steps for multiplying 682 * 438 using the long multiplication method.\nStep 1: Break first number 682 into its individual digits: 6 (hundreds place), 8 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 438 into its individual digits: 4 (hundreds place), 3 (tens place), and 8 (ones place).\n- 2 (from 1 place of first number) * 8 (from 1 place of second number) = 16 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 16\n- 2 (from 1 place of first number) * 3 (from 10 place of second number) = 6 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 60\n- 2 (from 1 place of first number) * 4 (from 100 place of second number) = 8 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 800\n- 8 (from 10 place of first number) * 8 (from 1 place of second number) = 64 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 640\n- 8 (from 10 place of first number) * 3 (from 10 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 2400\n- 8 (from 10 place of first number) * 4 (from 100 place of second number) = 32 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 32000\n- 6 (from 100 place of first number) * 8 (from 1 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4800\n- 6 (from 100 place of first number) * 3 (from 10 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 18000\n- 6 (from 100 place of first number) * 4 (from 100 place of second number) = 24 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 240000\n\nNow, add all these results together:\nThe sum of 16 + 60 + 800 + 640 + 2400 + 32000 + 4800 + 18000 + 240000 = 298716."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 956 * 879?"}, {"role": "assistant", "content": "Here are the steps for multiplying 956 * 879 using the long multiplication method.\nStep 1: Break first number 956 into its individual digits: 9 (hundreds place), 5 (tens place), and 6 (ones place).\nStep 2: Similarly, break second number 879 into its individual digits: 8 (hundreds place), 7 (tens place), and 9 (ones place).\n- 6 (from 1 place of first number) * 9 (from 1 place of second number) = 54 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 54\n- 6 (from 1 place of first number) * 7 (from 10 place of second number) = 42 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 420\n- 6 (from 1 place of first number) * 8 (from 100 place of second number) = 48 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 4800\n- 5 (from 10 place of first number) * 9 (from 1 place of second number) = 45 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 450\n- 5 (from 10 place of first number) * 7 (from 10 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3500\n- 5 (from 10 place of first number) * 8 (from 100 place of second number) = 40 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 40000\n- 9 (from 100 place of first number) * 9 (from 1 place of second number) = 81 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 8100\n- 9 (from 100 place of first number) * 7 (from 10 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 63000\n- 9 (from 100 place of first number) * 8 (from 100 place of second number) = 72 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 720000\n\nNow, add all these results together:\nThe sum of 54 + 420 + 4800 + 450 + 3500 + 40000 + 8100 + 63000 + 720000 = 840324."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 605 * 629?"}, {"role": "assistant", "content": "Here are the steps for multiplying 605 * 629 using the long multiplication method.\nStep 1: Break first number 605 into its individual digits: 6 (hundreds place), 0 (tens place), and 5 (ones place).\nStep 2: Similarly, break second number 629 into its individual digits: 6 (hundreds place), 2 (tens place), and 9 (ones place).\n- 5 (from 1 place of first number) * 9 (from 1 place of second number) = 45 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 45\n- 5 (from 1 place of first number) * 2 (from 10 place of second number) = 10 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 100\n- 5 (from 1 place of first number) * 6 (from 100 place of second number) = 30 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 3000\n- 0 (from 10 place of first number) * 9 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 0 (from 10 place of first number) * 2 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 0 (from 10 place of first number) * 6 (from 100 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 0\n- 6 (from 100 place of first number) * 9 (from 1 place of second number) = 54 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 5400\n- 6 (from 100 place of first number) * 2 (from 10 place of second number) = 12 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 12000\n- 6 (from 100 place of first number) * 6 (from 100 place of second number) = 36 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 360000\n\nNow, add all these results together:\nThe sum of 45 + 100 + 3000 + 0 + 0 + 0 + 5400 + 12000 + 360000 = 380545."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 778 * 250?"}, {"role": "assistant", "content": "Here are the steps for multiplying 778 * 250 using the long multiplication method.\nStep 1: Break first number 778 into its individual digits: 7 (hundreds place), 7 (tens place), and 8 (ones place).\nStep 2: Similarly, break second number 250 into its individual digits: 2 (hundreds place), 5 (tens place), and 0 (ones place).\n- 8 (from 1 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 8 (from 1 place of first number) * 5 (from 10 place of second number) = 40 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 400\n- 8 (from 1 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 1600\n- 7 (from 10 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 10 place of first number) * 5 (from 10 place of second number) = 35 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 3500\n- 7 (from 10 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 14000\n- 7 (from 100 place of first number) * 0 (from 1 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 0\n- 7 (from 100 place of first number) * 5 (from 10 place of second number) = 35 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 35000\n- 7 (from 100 place of first number) * 2 (from 100 place of second number) = 14 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 140000\n\nNow, add all these results together:\nThe sum of 0 + 400 + 1600 + 0 + 3500 + 14000 + 0 + 35000 + 140000 = 194500."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 291 * 702?"}, {"role": "assistant", "content": "Here are the steps for multiplying 291 * 702 using the long multiplication method.\nStep 1: Break first number 291 into its individual digits: 2 (hundreds place), 9 (tens place), and 1 (ones place).\nStep 2: Similarly, break second number 702 into its individual digits: 7 (hundreds place), 0 (tens place), and 2 (ones place).\n- 1 (from 1 place of first number) * 2 (from 1 place of second number) = 2 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 2\n- 1 (from 1 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 1 (from 1 place of first number) * 7 (from 100 place of second number) = 7 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 700\n- 9 (from 10 place of first number) * 2 (from 1 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 180\n- 9 (from 10 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 9 (from 10 place of first number) * 7 (from 100 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 63000\n- 2 (from 100 place of first number) * 2 (from 1 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 400\n- 2 (from 100 place of first number) * 0 (from 10 place of second number) = 0 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 0\n- 2 (from 100 place of first number) * 7 (from 100 place of second number) = 14 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 140000\n\nNow, add all these results together:\nThe sum of 2 + 0 + 700 + 180 + 0 + 63000 + 400 + 0 + 140000 = 204282."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 774 * 694?"}, {"role": "assistant", "content": "Here are the steps for multiplying 774 * 694 using the long multiplication method.\nStep 1: Break first number 774 into its individual digits: 7 (hundreds place), 7 (tens place), and 4 (ones place).\nStep 2: Similarly, break second number 694 into its individual digits: 6 (hundreds place), 9 (tens place), and 4 (ones place).\n- 4 (from 1 place of first number) * 4 (from 1 place of second number) = 16 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 16\n- 4 (from 1 place of first number) * 9 (from 10 place of second number) = 36 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 360\n- 4 (from 1 place of first number) * 6 (from 100 place of second number) = 24 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 2400\n- 7 (from 10 place of first number) * 4 (from 1 place of second number) = 28 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 280\n- 7 (from 10 place of first number) * 9 (from 10 place of second number) = 63 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 6300\n- 7 (from 10 place of first number) * 6 (from 100 place of second number) = 42 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 42000\n- 7 (from 100 place of first number) * 4 (from 1 place of second number) = 28 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 2800\n- 7 (from 100 place of first number) * 9 (from 10 place of second number) = 63 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 63000\n- 7 (from 100 place of first number) * 6 (from 100 place of second number) = 42 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 420000\n\nNow, add all these results together:\nThe sum of 16 + 360 + 2400 + 280 + 6300 + 42000 + 2800 + 63000 + 420000 = 537156."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 799 * 927?"}, {"role": "assistant", "content": "Here are the steps for multiplying 799 * 927 using the long multiplication method.\nStep 1: Break first number 799 into its individual digits: 7 (hundreds place), 9 (tens place), and 9 (ones place).\nStep 2: Similarly, break second number 927 into its individual digits: 9 (hundreds place), 2 (tens place), and 7 (ones place).\n- 9 (from 1 place of first number) * 7 (from 1 place of second number) = 63 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 63\n- 9 (from 1 place of first number) * 2 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 9 (from 1 place of first number) * 9 (from 100 place of second number) = 81 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 8100\n- 9 (from 10 place of first number) * 7 (from 1 place of second number) = 63 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 630\n- 9 (from 10 place of first number) * 2 (from 10 place of second number) = 18 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 1800\n- 9 (from 10 place of first number) * 9 (from 100 place of second number) = 81 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 81000\n- 7 (from 100 place of first number) * 7 (from 1 place of second number) = 49 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 4900\n- 7 (from 100 place of first number) * 2 (from 10 place of second number) = 14 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 14000\n- 7 (from 100 place of first number) * 9 (from 100 place of second number) = 63 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 630000\n\nNow, add all these results together:\nThe sum of 63 + 180 + 8100 + 630 + 1800 + 81000 + 4900 + 14000 + 630000 = 740673."}]} +{"messages": [{"role": "user", "content": "What is the multiplication of 892 * 297?"}, {"role": "assistant", "content": "Here are the steps for multiplying 892 * 297 using the long multiplication method.\nStep 1: Break first number 892 into its individual digits: 8 (hundreds place), 9 (tens place), and 2 (ones place).\nStep 2: Similarly, break second number 297 into its individual digits: 2 (hundreds place), 9 (tens place), and 7 (ones place).\n- 2 (from 1 place of first number) * 7 (from 1 place of second number) = 14 -> Shift it 0 places to the left (because we are multiplying with the 1 place of the second number) to get 14\n- 2 (from 1 place of first number) * 9 (from 10 place of second number) = 18 -> Shift it 1 places to the left (because we are multiplying with the 10 place of the second number) to get 180\n- 2 (from 1 place of first number) * 2 (from 100 place of second number) = 4 -> Shift it 2 places to the left (because we are multiplying with the 100 place of the second number) to get 400\n- 9 (from 10 place of first number) * 7 (from 1 place of second number) = 63 -> Shift it 1 places to the left (because we are multiplying with the 1 place of the second number) to get 630\n- 9 (from 10 place of first number) * 9 (from 10 place of second number) = 81 -> Shift it 2 places to the left (because we are multiplying with the 10 place of the second number) to get 8100\n- 9 (from 10 place of first number) * 2 (from 100 place of second number) = 18 -> Shift it 3 places to the left (because we are multiplying with the 100 place of the second number) to get 18000\n- 8 (from 100 place of first number) * 7 (from 1 place of second number) = 56 -> Shift it 2 places to the left (because we are multiplying with the 1 place of the second number) to get 5600\n- 8 (from 100 place of first number) * 9 (from 10 place of second number) = 72 -> Shift it 3 places to the left (because we are multiplying with the 10 place of the second number) to get 72000\n- 8 (from 100 place of first number) * 2 (from 100 place of second number) = 16 -> Shift it 4 places to the left (because we are multiplying with the 100 place of the second number) to get 160000\n\nNow, add all these results together:\nThe sum of 14 + 180 + 400 + 630 + 8100 + 18000 + 5600 + 72000 + 160000 = 264924."}]}