# procedurally generate a sphere mesh

i am looking for an algorithm ( in pseudo code) that generates the 3d coordinates of a sphere mesh like this:

the number of horizontal and lateral slices should be configurable

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Is this Homework? –  Robert P Nov 2 '10 at 20:56
no, it's not. it's for a personal project. –  clamp Nov 2 '10 at 21:57
that's called a disco ball configuration of points on a sphere as far as i know. its the easiest configuration. –  ufomorace Jul 21 '14 at 13:10

If there are M lines of latitude (horizontal) and N lines of longitude (vertical), then put dots at

(x, y, z) = (sin(Pi * m/M) cos(2Pi * n/N), sin(Pi * m/M) sin(2Pi * n/N), cos(Pi * m/M))

for each m in { 0, ..., M } and n in { 0, ..., N-1 } and draw the line segments between the dots, accordingly.

edit: maybe adjust M by 1 or 2 as required, because you should decide whether or not to count "latitude lines" at the poles

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+1, this is probably what OP is asking for. –  Alexandre C. Nov 2 '10 at 20:57
+1, because this works with any graphics library. Another Question: Is there a way to also control the radius of the sphere? –  kiltek Aug 7 '12 at 11:04
@kiltek : this gives values for (x, y, z) from 0 to 1. To scale it to any radius, just multiply each point by your desired radius. –  Carrotman42 Nov 18 '12 at 3:04
I'm trying to use this solution but looks like I really messed up. stackoverflow.com/questions/27894844/… –  lightning Jan 12 at 3:32

This is just off the top of my head without testing. It could be a good starting point. This will give you the most accurate and customizable results with the most degree of precision if you use double.

``````public void generateSphere(3DPoint center, 3DPoint northPoint, int longNum, int latNum){
//Find radius using simple length equation (distance between center and northPoint)

//Cut the line segment from northPoint to southPoint into the latitudinal number
//These will be the number of horizontal slices (ie. equator)

//Then divide 360 degrees by the longitudinal number to find the number of vertical slices.

//Use trigonometry to determine the angle and then the curcumference point for each circle starting from the top.

//Stores these points in however format you want and return the data structure.

}
``````
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nice description –  kiltek Aug 7 '12 at 12:45

just a guess, you could probably use the formula for a sphere centered at (0,0,0)

``````x²+y²+z²=1
``````

solve this for x, then loop throuh a set of values for y and z and plot them with your calculated x.

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Not sure this is a good idea, depending on the performance requirements of the project in question, as this method surely involves a `sqrt()`, which I believe is expensive. –  Victor Zamanian Dec 27 '12 at 0:30