Why are there always triangles used by drawing surfaces in 3D? And not squares or other shapes?

Triangles can never be nonplanar; anything with more than 3 points can be nonplanar and thus unrenderable unless converted to triangles. For example: A square is two triangles that are on the same plane, if all the points that make up the square are coplanar. It takes a lot of calculations to make sure all the points are coplanar, thus all polygons that are greater than 3 points are precalculated by decimating them into triangles and tested to make sure all the points are coplanar once, instead of on every frame that gets rendered. Here is good reference about polygon meshes. Planar Mesh NonPlanar Mesh and one more example that might make it clearer The nonplanar mesh is degenerate and can't be sorted or rendered correctly in any sane manner. Triangles don't have this problem. Efficiency Triangles also are very memory efficient and can be sorted, and rendered extremely fast when using Triangle Strips which only need 1 point to be stored for each additional triangle after the first. and Triangle Fans which is a special case of a Triangle Strip. 


Since 3 points are the minimum necessary to define a planar surface any shape can be simulated using many triangles, and efficient algorithms exist to rapidly paint triangles onto the screen. 


Basically any complex (surface) structure can be represented as a bunch of triangles. The triangle is the most atomic and primitive geometry. Hence it is used as base for almost anything. Nevertheless most 3D engines provide you with more complex primitives like spheres, cones, cylinders, donuts, whatnot. Check your libraries documentation. 


protected by Jarrod Roberson Jan 31 '13 at 4:48
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