How to draw a crystal ball with two-color particles inside

I am just throwing an idea with possibility of closing. I need to draw a crystal ball in which red and blue particles randomly locate. I guess I have to go with photoshop, and even tried to make the ball in an image but as this is for research paper and does not have to be fancy, I wonder if there is any way to program with R, matlab, or any other language.

• I'd use VMD for such task, but I use it on daily basis anyway, and it might be hard for beginner... Oct 23, 2012 at 15:13
• Is one supposed to use this crystal ball to divine how said ball should look? Do you have in mind a particular geometric shape/object? Something to go on, even a scribble on the back of a napkin, grabbed by your phones camera and uploaded here would help. Or open an image edit, sketch it out free hand roughly, save and upload it here. Oct 23, 2012 at 15:26
• @bla: can you tell us what you're looking for that's not found/not done well enough in the current set of answers? Apr 24, 2015 at 21:30
• no i cant, I just want to spend my rep points on things I like to see more of (more answers\options for answers). If nothing exciting will happen I'll give the bounty to the answer I liked the most. Anything wrong about that?
– bla
Apr 24, 2015 at 23:36
• nope .... just wanted to know if we were aiming for something in particular. Apr 25, 2015 at 2:23

In R, using the rgl package (R-to-OpenGL interface):

library(rgl)
n <- 100
set.seed(101)
randcoord <- function(n=100,r=1) {
d <- data.frame(rho=runif(n)*r,phi=runif(n)*2*pi,psi=runif(n)*2*pi)
with(d,data.frame(x=rho*sin(phi)*cos(psi),
y=rho*sin(phi)*sin(psi),
z=rho*cos(phi)))
}
## http://en.wikipedia.org/wiki/List_of_common_coordinate_transformations
rgl.bg(col="black")
rgl.snapshot("crystalball.png")


• that's one mighty fine-looking crystal ball, but it does seem to be leaking a bit at the bottom. :-) Oct 23, 2012 at 15:27
• yeah, I thought that setting the max radius for the particle locations would fix that, but it doesn't seem to have. I should play around more. Oct 23, 2012 at 15:28
• What is the language that you used? Oct 23, 2012 at 15:55
• Is it just me, or do those particles appear to be moving/wiggling inside the ball? At first I thought it's an animation, but it's just a png... must be some kind of optical illusion. Apr 28, 2015 at 9:34

This is very similar to Ben Bolker's answer, but I'm demonstrating how one might add a bit of an aura to the crystal ball by using some mystical coloring:

library(rgl)
lapply(seq(0.01, 1, by=0.01), function(x) rgl.spheres(0,0,0, rad=1.1*x, alpha=.01,
col=colorRampPalette(c("orange","blue"))(100)[100*x]))

xyz <- matrix(rnorm(3*100), ncol=3)
xyz <- xyz * runif(100)^(1/3) / sqrt(rowSums(xyz^2))

rgl.bg(col="black")
rgl.viewpoint(zoom=.75)
rgl.snapshot("crystalball.png")


The only difference between the two is in the lapply call. You can see that just by changing the colors in colorRampPalette you can change the look of the crystal ball significantly. The one on the left uses the lapply code above, the one on the right uses this instead:

lapply(seq(0.01, 1, by=0.01), function(x) rgl.spheres(0,0,0,rad=1.1*x, alpha=.01,
col=colorRampPalette(c("orange","yellow"))(100)[100*x]))
...code from above


Here is a different approach where you can define your own texture file and use that to color the crystal ball:

# create a texture file, get as creative as you want:
png("texture.png")
x <- seq(1,870)
y <- seq(1,610)
z <- matrix(rnorm(870*610), nrow=870)
z <- t(apply(z,1,cumsum))/100

# Swirly texture options:
# Use the Simon O'Hanlon's roll function from this answer:
# http://stackoverflow.com/questions/18791212/equivalent-to-numpy-roll-in-r/18791252#18791252
# roll <- function( x , n ){
#   if( n == 0 )
#     return( x )
#   c( tail(x,n) , head(x,-n) )
# }

# One option
# z <- mapply(function(x,y) roll(z[,x], y), x = 1:ncol(z), y=1:ncol(z))
#
# Another option
# z <- mapply(function(x,y) roll(z[,x], y), x = 1:ncol(z), y=rep(c(1:50,51:2), 10))[1:870, 1:610]
#
# One more
# z <- mapply(function(x,y) roll(z[,x], y), x = 1:ncol(z), y=rep(seq(0, 100, by=10), each=5))[1:870, 1:610]

par(mar=c(0,0,0,0))
image(x, y, z, col = colorRampPalette(c("cyan","black"))(100), axes = FALSE)
dev.off()

xyz <- matrix(rnorm(3*100), ncol=3)
xyz <- xyz * runif(100)^(1/3) / sqrt(rowSums(xyz^2))

rgl.viewpoint(phi=90, zoom=.75) # change the view if need be
rgl.bg(color="black")


!

The first image on the top left is what you get if you just run the code above, the other three are the results of using the different options in the commented out code.

• these are really pretty spectacular! Apr 28, 2015 at 1:12
• Just a small comment: you're probably better off using spheres3d() rather than rgl.spheres(). The rgl.* functions handle defaults for colours etc. in a strange way. Apr 28, 2015 at 20:44

As the question is

I wonder if there is any way to program with R, matlab, or any other language.

and TeX is Turing complete and can be considered a programming language, I took some time and created an example in LaTeX using TikZ. As the OP writes it is for a research paper, this comes with the advantage that it can directly be integrated into the paper, assuming it is also written in LaTeX.

So, here goes:

\documentclass[tikz]{standalone}
\usetikzlibrary{positioning, backgrounds}
\usepackage{pgf}
\pgfmathsetseed{\number\pdfrandomseed}

\begin{document}
\begin{tikzpicture}[background rectangle/.style={fill=black},
show background rectangle,
]

% Definitions
\def\nRed{30}
\def\nBlue{30}

% Draw all red points
\foreach \i in {1,...,\nRed}
{
% Get random coordinates
\pgfmathparse{360*rand}\let\mpsi\pgfmathresult
\pgfmathparse{360*rand}\let\mphi\pgfmathresult

% Convert to x/y/z
\pgfmathparse{\mrho*sin(\mphi)*cos(\mpsi)}\let\mx\pgfmathresult
\pgfmathparse{\mrho*sin(\mphi)*sin(\mpsi)}\let\my\pgfmathresult
\pgfmathparse{\mrho*cos(\mphi)}\let\mz\pgfmathresult

}

% Draw all blue points
\foreach \i in {1,...,\nBlue}
{
% Get random coordinates
\pgfmathparse{360*rand}\let\mpsi\pgfmathresult
\pgfmathparse{360*rand}\let\mphi\pgfmathresult

% Convert to x/y/z
\pgfmathparse{\mrho*sin(\mphi)*cos(\mpsi)}\let\mx\pgfmathresult
\pgfmathparse{\mrho*sin(\mphi)*sin(\mpsi)}\let\my\pgfmathresult
\pgfmathparse{\mrho*cos(\mphi)}\let\mz\pgfmathresult

}

% Draw ball

\end{tikzpicture}
\end{document}


And the result:

I just had to generate something as shiny as the R-answer in Matlab :) So, here is my late-night, overly complicated, super-slow solution, but my it's pretty ain't it? :)

figure(1), clf, hold on
whitebg('k')

light(...
'Color','w',...
'Position',[-3 -1 0],...
'Style','infinite')

colormap cool
brighten(0.2)

[x,y,z] = sphere(50);
surf(x,y,z);

lighting phong
alpha(.2)
grid off

blues = 2*rand(15,3)-1;
reds  = 2*rand(15,3)-1;
R     = linspace(0.001, 0.02, 20);

done = false;
while ~done

indsB = sum(blues.^2,2)>1-0.02;
if any(indsB)
done = false;
blues(indsB,:) = 2*rand(sum(indsB),3)-1;
else
done = true;
end

indsR = sum( reds.^2,2)>1-0.02;
if any(indsR)
done = false;
reds(indsR,:) = 2*rand(sum(indsR),3)-1;
else
done = done && true;
end

end

nR = numel(R);
[x,y,z] = sphere(15);
for ii = 1:size(blues,1)
for jj = 1:nR
surf(x*R(jj)-blues(ii,1), y*R(jj)-blues(ii,2), z*R(jj)-blues(ii,3), ...
'edgecolor', 'none', ...
'facecolor', [1-jj/nR 1-jj/nR 1],...
'facealpha', exp(-(jj-1)/5));
end
end

nR = numel(R);
[x,y,z] = sphere(15);
for ii = 1:size(reds,1)
for jj = 1:nR
surf(x*R(jj)-reds(ii,1), y*R(jj)-reds(ii,2), z*R(jj)-reds(ii,3), ...
'edgecolor', 'none', ...
'facecolor', [1 1-jj/nR 1-jj/nR],...
'facealpha', exp(-(jj-1)/5));
end
end

set(findobj(gca,'type','surface'),...
'FaceLighting','phong',...
'SpecularStrength',1,...
'DiffuseStrength',0.6,...
'AmbientStrength',0.9,...
'SpecularExponent',200,...
'SpecularColorReflectance',0.4 ,...
'BackFaceLighting','lit');

axis equal
view(30,60)


• Not sure why you mention it is super slow, it only takes about a second to run which seems fine for someone who is looking to make 1 picture. Apr 28, 2015 at 14:12
• True. I just know it can be an order of magnitude faster when taking more care about that. But indeed, who cares :) Apr 29, 2015 at 4:57

I'd recommend you have a look at a ray-tracing program, for instance povray. I don't know much of the language, but fiddling around with some examples I managed to produce this without too much effort.

background { color rgb <1,1,1,1> }
#include "colors.inc"
#include "glass.inc"

#declare R = 3;
#declare Rs = 0.05;
#declare Rd = R - Rs ;

camera {location <1, 10 ,1>
right <0, 4/3, 0>
up    <0,0.1,1>
look_at  <0.0 , 0.0 , 0.0>}

light_source {
z*10000
White
}

light_source{<15,25,-25> color  rgb <1,1,1> }

#declare T_05 = texture { pigment { color Clear } finish { F_Glass1 } }

#declare Ball = sphere {
<0,0,0>, R
pigment { rgbf <0.75,0.8,1,0.9> } // A blue-tinted glass

finish
{ phong 0.5 phong_size 40  // A highlight
reflection 0.2  // Glass reflects a bit
}
interior{ior 1.5}
}

#declare redsphere =    sphere {
<0,0,0>, Rs
pigment{color Red}
texture { T_05 } interior { I_Glass4 fade_color Col_Red_01 }}

#declare bluesphere =   sphere {
<0,0,0>, Rs
pigment{color Blue}
texture { T_05 } interior { I_Glass4 fade_color Col_Blue_01 }}

object{ Ball }

#declare Rnd_1 = seed (123);
#for (Cntr, 0, 200)
#declare rr = Rd* rand( Rnd_1);
#declare theta = -pi/2 + pi * rand( Rnd_1);
#declare phi = -pi+2*pi* rand( Rnd_1);
#declare xx = rr * cos(theta) * cos(phi);
#declare yy = rr * cos(theta) * sin(phi);
#declare zz = rr * sin(theta) ;
object{ bluesphere  translate  <xx , yy , zz > }
#declare rr = Rd* rand( Rnd_1);
#declare theta = -pi/2 + pi * rand( Rnd_1);
#declare phi = -pi+2*pi* rand( Rnd_1);
#declare xx = rr * cos(theta) * cos(phi);
#declare yy = rr * cos(theta) * sin(phi);
#declare zz = rr * sin(theta) ;
object{ redsphere  translate  <xx , yy , zz > }
#end

• very nice cristall ball, nice light effects with povray Apr 28, 2015 at 11:22
• can you please post the code here? It's a little long but doesn't seem too long. Apr 28, 2015 at 12:01

A bit late in the game, but here's a Matlab code that implements scatter3sph (from FEX)

figure('Color', [0.04 0.15 0.4]);
nos = 11; % number small of spheres
S= 3; %small spheres sizes
Grid_Size=256;
%Coordinates
X= Grid_Size*(0.5+rand(2*nos,1));
Y= Grid_Size*(0.5+rand(2*nos,1));
Z= Grid_Size*(0.5+rand(2*nos,1));
%Small spheres colors: (Red & Blue)
C= ones(nos,1)*[0 0 1];
C= [C;ones(nos,1)*[1 0 0]];
% Plot big Sphere
scatter3sph(Grid_Size,Grid_Size,Grid_Size,'size',220,'color',[0.9 0.9 0.9]); hold on
light('Position',[0 0 0],'Style','local');
alpha(0.45);
material shiny
% Plot small spheres
scatter3sph(X,Y,Z,'size',S,'color',C);
axis equal; axis tight; grid off
view([108 -42]);
set(gca,'Visible','off')
set(gca,'color','none')


• nice. I feel like it should be possible to get the shininess in the R example, too, but I didn't feel like messing around to figure it out. Oct 23, 2012 at 20:34

Another solution with Matlab.

[x,y,z] = sphere(50);

figure('Color',[0 0 0]);
surf(x,y,z,img,'edgeColor','none','FaceAlpha',.6,'FaceColor','texturemap')
hold on;

i = 0;
while i<100
px = randn();
py = randn();
pz = randn();
d = pdist([0 0 0; px py pz],'euclidean');
if d<1
if mod(i,2)==0
scatter3(px, py, pz,30,'ro','filled');
else
scatter3(px, py, pz,30,'bo','filled');
end
i = i+1;
end
end

hold off;
camlight;

axis equal;
axis off;


Output:

In Javascript with d3.js: http://jsfiddle.net/jjcosare/rggn86aj/6/ or > Run Code Snippet

Useful for publishing online.

var particleChangePerMs = 1000;
var particleTotal = 250;
var particleSizeInRelationToCircle = 75;

var svgWidth = (window.innerWidth > window.innerHeight) ? window.innerHeight : window.innerWidth;
var svgHeight = (window.innerHeight > window.innerWidth) ? window.innerWidth : window.innerHeight;

var circleX = svgWidth / 2;
var circleY = svgHeight / 2;
var circleRadius = (circleX / 4) + (circleY / 4);
var circleDiameter = circleRadius * 2;

var particleX = function() {
return Math.floor(Math.random() * circleDiameter) + circleX - circleRadius;
};
var particleY = function() {
return Math.floor(Math.random() * circleDiameter) + circleY - circleRadius;
};
return circleDiameter / particleSizeInRelationToCircle;
};
var particleColorList = [
'blue',
'red'
];
var particleColor = function() {
return "url(#" + particleColorList[Math.floor(Math.random() * particleColorList.length)] + "Gradient)";
};

var svg = d3.select("#quantumBall")
.append("svg")
.attr("width", svgWidth)
.attr("height", svgHeight);

.attr("cx", "50%")
.attr("cy", "50%")

.attr("offset", "80%")
.attr("stop-color", "black")

.attr("offset", "100%")
.attr("stop-color", "grey")

.attr("x1", "0%")
.attr("y1", "0%")
.attr("x2", "100%")
.attr("y2", "100%")

.attr("offset", "0%")
.attr("stop-color", "red")
.attr("stop-opacity", 1);

.attr("offset", "100%")
.attr("stop-color", "pink")
.attr("stop-opacity", 1);

.attr("x1", "0%")
.attr("y1", "0%")
.attr("x2", "100%")
.attr("y2", "100%")

.attr("offset", "0%")
.attr("stop-color", "blue")
.attr("stop-opacity", 1);

.attr("offset", "100%")
.attr("stop-color", "skyblue")
.attr("stop-opacity", 1);

svg.append("circle")
.attr("cx", circleX)
.attr("cy", circleY)

function isParticleInQuantumBall(particle) {
var x1 = circleX;
var y1 = circleY;
var x0 = particle.x;
var y0 = particle.y;
return Math.sqrt((x1 - x0) * (x1 - x0) + (y1 - y0) * (y1 - y0)) < (r1 - r0);
};

function randomizedParticles() {
d3.selectAll("svg > .particle").remove();
var particle = {};
for (var i = 0; i < particleTotal;) {
particle.x = particleX();
particle.y = particleY();
particle.color = particleColor();
if (isParticleInQuantumBall(particle)) {
svg.append("circle")
.attr("class", "particle")
.attr("cx", particle.x)
.attr("cy", particle.y)
.attr("fill", particle.color);
i++;
}
}
}

setInterval(randomizedParticles, particleChangePerMs);
<script src="https://cdnjs.cloudflare.com/ajax/libs/d3/3.4.11/d3.min.js"></script>
<div id="quantumBall"></div>

In R you can use the rasterImage function to add to a current plot, you could either create/download a nice image of a crystal ball and load it into R (see png, EBImage, or other packages) then make it semi-transparent and use rasterImage to add it to the current plot. I would probably plot your 2 colored points first, then do the image of the ball over the top (with transparency they will still be visible and look like they are inside).

A simpler approach (though probably not as nice looking) is to just draw a semitransparent grey circle using the polygon function to represent the ball.

If you want to do this in 3 dimensions then look at the rgl package, here is a basic example:

library(rgl)
open3d()