Can anyone tell me the formula for determining what combination of x,y,z rotation values will give the same result as a normalized object(no rotation) in 3d space?
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If you know both the end result and the initial state, then it's just basic matrix multiplication. You'd have to find the angles used to rotate the object (one for the xaxis, yaxis and zaxis) and leftmultiply your coordinate vectors by this guy: 


Choosing uniformly distributed random angles [pi, pi] will not lead to a uniformly random rotation axis on the sphere! Wikipedia has a nice explanation about this phenomenon, which is called the "gimbal lock". See "Fast Random Rotation Matrices" by James Arvo for one algorithm that produces uniformly random rotations. 

