Elegant way the find the Vertices of a Cube

Nearly every OpenGL tutorial lets you implement drawing a cube. Therefore the vertices of the cube are needed. In the example code I saw a long list defining every vertex. But I would like to compute the vertices of a cube rather that using a overlong list of precomputed coordinates.

A cube is made of eight vertices and twelve triangles. Vertices are defined by x, y, and z. Triangles are defined each by the indexes of three vertices.

Is there an elegant way to compute the vertices and the element indexes of a cube?

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It takes more code to generate a cube than it does to just write out 8 vertices. –  Pubby Dec 19 '12 at 13:36
Just specifying the vertices and elements is by far the easiest solution. –  Andreas Brinck Dec 19 '12 at 13:47
Sad to head that, but you might be right. –  danijar Dec 19 '12 at 13:54
I think this is a very valid question, and I am sure you can generate the vertices and vertex indices. –  Jakob Dec 19 '12 at 13:57
@YoshiHi. Movement and Rotation is done later by matrix calculation. It is just about generating vertices and indices of a cube. –  danijar Dec 19 '12 at 14:01

When i was "porting" the csg.js project to Java I've found some cute code which generated cube with selected center point and radius. (I know it's JS, but anyway)

``````// Construct an axis-aligned solid cuboid. Optional parameters are `center` and
// `radius`, which default to `[0, 0, 0]` and `[1, 1, 1]`. The radius can be
// specified using a single number or a list of three numbers, one for each axis.
//
// Example code:
//
//     var cube = CSG.cube({
//       center: [0, 0, 0],
//     });
CSG.cube = function(options) {
options = options || {};
var c = new CSG.Vector(options.center || [0, 0, 0]);
return CSG.fromPolygons([
[[0, 4, 6, 2], [-1, 0, 0]],
[[1, 3, 7, 5], [+1, 0, 0]],
[[0, 1, 5, 4], [0, -1, 0]],
[[2, 6, 7, 3], [0, +1, 0]],
[[0, 2, 3, 1], [0, 0, -1]],
[[4, 5, 7, 6], [0, 0, +1]]
].map(function(info) {
return new CSG.Polygon(info[0].map(function(i) {
var pos = new CSG.Vector(
c.x + r[0] * (2 * !!(i & 1) - 1),
c.y + r[1] * (2 * !!(i & 2) - 1),
c.z + r[2] * (2 * !!(i & 4) - 1)
);
return new CSG.Vertex(pos, new CSG.Vector(info[1]));
}));
}));
};
``````
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Thanks, exactly what I was looking for ! –  Ray Hulha May 25 '13 at 15:20