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3d17.mp
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3d17.mp
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% tex/conc/mp/3d17.mp 2012-5-8 Alan U. Kennington.
% $Id: tex/conc/mp/3d17.mp 09c178b650 2012-05-08 03:58:47Z Alan U. Kennington $
% 3d graphic: Sphere S^2 in perspective.
input 3dmax.mp
input mapmax.mp
%%%%%%%%%%%%%%%%%%%%%%%%%
% figure 1 %
%%%%%%%%%%%%%%%%%%%%%%%%%
beginfig(1);
numeric A[][]; % The current 4x3 transformation matrix.
numeric p[][], q[][]; % Lists of 3-vectors.
pair w[]; % Coordinate pairs on the drawing canvas.
numeric s; % The screen scale factor.
path pat[];
color vcol;
penARROW := 0.5bp;
penVEC := 0.9bp;
penPT := 2.5bp;
penLAT := 0.5bp;
penLATT := 0.7bp;
penLONG := 0.5bp;
penLONGG := 0.7bp;
% Multiplier and orientation angles for viewer.
dv := 10; % Distance of camera from centre of sphere.
ph_v := 45; % Angle phi.
th_v := 40; % Angle theta.
Z_set_rpt(p0)(dv, ph_v, th_v); % Position of viewer.
Z_set(q0)(0, 0, 0); % Centre of picture.
A_set_pq(A)(p0)(q0); % Set the perspective matrix.
s := 700; % Some sort of magnification/zoom factor.
R := 1; % Radius of the sphere.
%- - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
% Constant-latitude circles.
nR := 12; % 12 points around the equator.
nlat := 9; % Number for dividing the latitude of 90 degrees.
% nlat := 3; % Number for dividing the latitude of 90 degrees.
% Constant-longitude circles.
mR := 20; % 40 points along the longitude line.
% nlong := 12; % Number for dividing the longitude of 180 degrees.
nlong := 6; % Number for dividing the longitude of 180 degrees.
Z_set(p11)(0,0,0); % Centre of the sphere.
% Draw the sphere.
A_draw_lat_hide(A)(s)(p11)(R, nlat, nR, penLAT, penLATT)(p0);
A_draw_long_hide(A)(s)(p11)(R, nlong, mR, penLONG, penLONGG)(p0);
% Add some vectors to demonstrate parallel transport.
pickup pencircle scaled penVEC;
vlen := 0.35; % Length of vector.
vcol := 0.0white; % Colour of vector.
% Phi = 0 degrees.
A_north_draw(A)(s)(q0)(R, 0, 0, vlen, vcol);
A_north_draw(A)(s)(q0)(R, 0, 30, vlen, vcol);
A_north_draw(A)(s)(q0)(R, 0, 60, vlen, vcol);
A_north_draw(A)(s)(q0)(R, 0, 90, vlen, vcol);
% A_north_draw(A)(s)(q0)(R, 0, 90/4, vlen, vcol);
% A_north_draw(A)(s)(q0)(R, 0, 90/2, vlen, vcol);
% A_north_draw(A)(s)(q0)(R, 0, 3*90/4, vlen, vcol);
% Phi = 90 degrees.
A_north_draw(A)(s)(q0)(R, 90, 0, vlen, vcol);
A_north_draw(A)(s)(q0)(R, 90, 30, vlen, vcol);
A_north_draw(A)(s)(q0)(R, 90, 60, vlen, vcol);
A_north_draw(A)(s)(q0)(R, 90, 90, vlen, vcol);
% Phi = 30, 60 degrees.
A_north_draw(A)(s)(q0)(R, 15, 0, vlen, vcol);
A_north_draw(A)(s)(q0)(R, 30, 0, vlen, vcol);
A_north_draw(A)(s)(q0)(R, 45, 0, vlen, vcol);
A_north_draw(A)(s)(q0)(R, 60, 0, vlen, vcol);
A_north_draw(A)(s)(q0)(R, 75, 0, vlen, vcol);
% End point.
pickup pencircle scaled penARROW;
Z_set_rpt(p10)(R,0,90);
A_calc_w(A)(w10)(p10)(s);
w11 := w10 + (4,4)*5;
w10 := w10 + (0.5pt,3pt);
drawarrow w11{dir-170}..{dir-90}w10 withcolor 0.5white;
label.rt(btex Finish here etex, w11);
% Save the current picture bounding box.
bbx := bboxmargin;
bboxmargin := 0;
pat1 := bbox currentpicture;
bboxmargin := bbx;
% Start point.
pickup pencircle scaled penARROW;
Z_set_rpt(p10)(R,0,0);
A_calc_w(A)(w10)(p10)(s);
w11 := w10 + (-4,-4)*5;
S_arrowspaces(w11,w10,2pt,2.5pt,1,0.5white);
label.bot(btex Start here etex, w11);
pickup pencircle scaled penPT;
draw w10;
pickup pencircle scaled penARROW;
% Draw Muenchen.
alon := 11+34/60;
alat := 48+8/60;
% Draw Bologna.
% alon := 11+20/60;
% alat := 44+29/60;
% Draw Genova.
% alon := 8+57/60;
% alat := 44+25/60;
Z_set_rpt(p10)(R,alon,alat);
A_calc_w(A)(w10)(p10)(s);
w11 := w10 + (-9,-3)*5;
% S_arrowspaces(w11,w10,2pt,4pt,1,0.5white);
S_arrowspaces(w11,w10,2pt,3pt,1,0.5white);
label.lft(btex M\"unchen etex, w11);
% label.lft(btex Bologna etex, w11);
% label.lft(btex Genova etex, w11);
pickup pencircle scaled penPT;
draw w10;
% Draw Hanoi.
pickup pencircle scaled penARROW;
alon := 105+51/60;
alat := 21+2/60;
Z_set_rpt(p10)(R,alon,alat);
A_calc_w(A)(w10)(p10)(s);
w11 := w10 + (5,2)*5;
S_arrowspaces(w11,w10,1.5pt,3pt,1,0.5white);
label.rt(btex H\`a N\d{\^o}i etex, w11);
pickup pencircle scaled penPT;
draw w10;
setbounds currentpicture to pat1;
%==============================================================================
% Second copy.
w30 := (-7.3cm,0cm); % Shift of first image to left of second image.
% picture pic;
% pic := currentpicture shifted w30;
% currentpicture := pic;
currentpicture := currentpicture shifted w30;
% Multiplier and orientation angles for viewer.
dv := 10; % Distance of camera from centre of sphere.
ph_v := 45; % Angle phi.
th_v := 60; % Angle theta.
Z_set_rpt(p0)(dv, ph_v, th_v); % Position of viewer.
Z_set(q0)(0, 0, 0); % Centre of picture.
A_set_pq(A)(p0)(q0); % Set the perspective matrix.
s := 700; % Some sort of magnification/zoom factor.
R := 1; % Radius of the sphere.
%- - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - - -
% Constant-latitude circles.
nR := 12; % 12 points around the equator.
nlat := 9; % Number for dividing the latitude of 90 degrees.
% nlat := 3; % Number for dividing the latitude of 90 degrees.
% Constant-longitude circles.
mR := 20; % 40 points along the longitude line.
% nlong := 12; % Number for dividing the longitude of 180 degrees.
nlong := 6; % Number for dividing the longitude of 180 degrees.
Z_set(p11)(0,0,0); % Centre of the sphere.
% Draw the sphere.
A_draw_lat_hide(A)(s)(p11)(R, nlat, nR, penLAT, penLATT)(p0);
A_draw_long_hide(A)(s)(p11)(R, nlong, mR, penLONG, penLONGG)(p0);
% Add some vectors to demonstrate parallel transport.
pickup pencircle scaled penVEC;
vlen := 0.35; % Length of vector.
vcol := 0.0white; % Colour of vector.
% Phi = 0 degrees.
A_north_draw(A)(s)(q0)(R, 0, 0, vlen, vcol);
A_north_draw(A)(s)(q0)(R, 0, 30, vlen, vcol);
A_north_draw(A)(s)(q0)(R, 0, 60, vlen, vcol);
A_north_draw(A)(s)(q0)(R, 0, 90, vlen, vcol);
% A_north_draw(A)(s)(q0)(R, 0, 90/4, vlen, vcol);
% A_north_draw(A)(s)(q0)(R, 0, 90/2, vlen, vcol);
% A_north_draw(A)(s)(q0)(R, 0, 3*90/4, vlen, vcol);
% Phi = 90 degrees.
A_north_draw(A)(s)(q0)(R, 90, 0, vlen, vcol);
A_north_draw(A)(s)(q0)(R, 90, 30, vlen, vcol);
A_north_draw(A)(s)(q0)(R, 90, 60, vlen, vcol);
A_north_draw(A)(s)(q0)(R, 90, 90, vlen, vcol);
% Phi = 30, 60 degrees.
A_north_draw(A)(s)(q0)(R, 15, 0, vlen, vcol);
A_north_draw(A)(s)(q0)(R, 30, 0, vlen, vcol);
A_north_draw(A)(s)(q0)(R, 45, 0, vlen, vcol);
A_north_draw(A)(s)(q0)(R, 60, 0, vlen, vcol);
A_north_draw(A)(s)(q0)(R, 75, 0, vlen, vcol);
% End point.
pickup pencircle scaled penARROW;
Z_set_rpt(p10)(R,0,90);
A_calc_w(A)(w10)(p10)(s);
w11 := w10 + (4,8)*5;
w10 := w10 + (0.0pt,5pt);
drawarrow w11{dir-170}..{dir-90}w10 withcolor 0.5white;
label.rt(btex Finish here etex, w11);
% Save the current picture bounding box.
bbx := bboxmargin;
bboxmargin := 0;
pat1 := bbox currentpicture;
bboxmargin := bbx;
% Start point.
pickup pencircle scaled penARROW;
Z_set_rpt(p10)(R,0,0);
A_calc_w(A)(w10)(p10)(s);
w11 := w10 + (-5.5,-2)*5;
S_arrowspaces(w11,w10,2pt,2.5pt,1,0.5white);
label.bot(btex Start here etex, w11);
pickup pencircle scaled penPT;
draw w10;
pickup pencircle scaled penARROW;
% Draw Muenchen.
alon := 11+34/60;
alat := 48+8/60;
% Draw Bologna.
% alon := 11+20/60;
% alat := 44+29/60;
% Draw Genova.
% alon := 8+57/60;
% alat := 44+25/60;
Z_set_rpt(p10)(R,alon,alat);
A_calc_w(A)(w10)(p10)(s);
w11 := w10 + (-9,-3)*5;
% S_arrowspaces(w11,w10,2pt,4pt,1,0.5white);
S_arrowspaces(w11,w10,2pt,3pt,1,0.5white);
label.lft(btex M\"unchen etex, w11);
% label.lft(btex Bologna etex, w11);
% label.lft(btex Genova etex, w11);
pickup pencircle scaled penPT;
draw w10;
% Draw Hanoi.
pickup pencircle scaled penARROW;
alon := 105+51/60;
alat := 21+2/60;
Z_set_rpt(p10)(R,alon,alat);
A_calc_w(A)(w10)(p10)(s);
w11 := w10 + (4,-2)*5;
S_arrowspaces(w11,w10,1.5pt,3pt,1,0.5white);
label.rt(btex H\`a N\d{\^o}i etex, w11);
pickup pencircle scaled penPT;
draw w10;
setbounds currentpicture to pat1;
endfig;
end