From f9e597e2132ff9c4862971bc9ff8256409f79172 Mon Sep 17 00:00:00 2001 From: Gabriel Date: Sat, 19 Oct 2024 00:47:04 -0500 Subject: [PATCH] Update index.html --- index.html | 79 ++++++++++++++++++++++++++++-------------------------- 1 file changed, 41 insertions(+), 38 deletions(-) diff --git a/index.html b/index.html index ada6bbb..79c1f21 100644 --- a/index.html +++ b/index.html @@ -66,12 +66,15 @@

### Entropy,

https://mathworld.wolfram.com/PrimePartition.html + +

`` *key words: radio waves, partitions, prime numbers characteristics, Riemann hypothesis, Bernoulli distribution, Likelihood function, Euler product, meromorphic function, sets, summation, Laurent series, addition, series, pattern, gravity, imaginary numbers, complex analysis, isolated singularities, entropy, Agoh–Giuga conjecture, Euler product, Banach space, Prime partition, Guiga number, Carmichael number, number theory * `` - +

+ 970,462.32026163842254755194171738 95426903.18473885 ``` @@ -79,7 +82,7 @@

### Entropy,

``` ``` - +

TY - BOOK AU - Zeidler, Eberhard PY - 2006/01/01 @@ -94,58 +97,58 @@

### Entropy,

``` - -It's my lucky day. I solved for prime numbers. I was messing around with equations and papers and homework and math. Got into prime numbers based off ideas of 10 digit numbers and divisibility, and into Bernoulli’s distribution. I went through [partitions]( +

It's my lucky day. I solved for prime numbers. I was messing around with equations and papers and homework and math. Got into prime numbers based off ideas of 10 digit numbers and divisibility, and into Bernoulli’s distribution. I went through [partitions]( https://scholar.google.com/citations?view_op=view_citation&hl=en&user=4wpjDroAAAAJ&citation_for_view=4wpjDroAAAAJ:u5HHmVD_uO8C), into [Bernoullis distribution](https://en.wikipedia.org/wiki/Bernoulli_distribution), and [numbers](https://en.wikipedia.org/wiki/Bernoulli_number), from [Fermat’s little theorem](https://en.wikipedia.org/wiki/Proofs_of_Fermat's_little_theorem), and unto of course my flavor into the interpretations and sudo math., inlcuding... +

q = 1 - p since p − 1 ≡ −1 (mod p) q = -1 - +

-1 not trivial zero equality between a sum and a product +

+1 sum = product +q = -1 + q = -1 * n : inf + 1 - p = -1 * n + (1-p)/n = -1 + -1/n - p/n = -1 + + 1/n + p/n = 1 -1 sum = product -q = -1 -q = -1 * n : inf -1 - p = -1 * n -(1-p)/n = -1 --1/n - p/n = -1 + p - 1 = -1 mod p + p = 0 -1/n + p/n = 1 + 1/n + 0/n = 1 + n =/= 0 -p - 1 = -1 mod p -p = 0 + 1/n + 0/n - 1 = 0 + 1((x/n) + 0/n - (x)) = 0 -1/n + 0/n = 1 -n =/= 0 + 1 ((xn^[1/2]) + 0/n - (x)) = 0 + n = {Integral{log(e)}} -1/n + 0/n - 1 = 0 -1((x/n) + 0/n - (x)) = 0 + the Riemann hypothesis is the conjecture that the Riemann zeta function has its zeros only at the negative even integers and complex numbers with real part ⁠1/2 -1c ((xn^[1/2]) + 0/n - (x)) = 0 -n = {Integral{log(e)}} + x = sqrt(x^2 + 1) + x = {0, |x| - 1} + x = {0, (|log(e)| - 1) * } = {0, .5657055181} + {.567055181, .5052250171} + {b,c} graph +b is divisible by 7, c is divisible by 11 +11 and 7 are prime numbers -the Riemann hypothesis is the conjecture that the Riemann zeta function has its zeros only at the negative even integers and complex numbers with real part ⁠1/2 +11 and 7 at integer magnitude = b and c + b / 7 = 81,007,883 + refract at magnitude change: .81007883 + c / 11 = 205,004,561 : 2.05004561 -x = sqrt(x^2 + 1) -x = {0, |x| - 1} -x = {0, (|log(e)| - 1) * } = {0, .5657055181} -{.567055181, .5052250171} -{b,c} graph -b is divisible by 7, c is divisible by 11 -11 and 7 are prime numbers - -11 and 7 at integer magnitude = b and c -b / 7 = 81,007,883 -refract at magnitude change: .81007883 -c / 11 = 205,004,561 : 2.05004561 - -remember |log(e)| - 1 = .5675055181 -.56570055 = 56570055 is divisible by 3 -.5675955181 = 5675955181 is divisible by 13 -.567055181 = 567055181 is divisible by 7 + remember |log(e)| - 1 = .5675055181 + .56570055 = 56570055 is divisible by 3 + .5675955181 = 5675955181 is divisible by 13 + .567055181 = 567055181 is divisible by 7 x = log(e) e * pi = 8.5397 .81007883 + .5675055181 =