I want to get a random 2D slice from a 3D volume in a computer program for generating noise. I decided to use a rotation matrix, which I understand has to be a member of the rotation group SO(3). How can I create a uniformly random member of this group?
Choose three random values u_{1}, u_{2}, and u_{3} between 0 and 1. A uniform random quaternion is given by:
You can then generate the appropriate rotation matrix using this formula:



You can draw a random 3D vector, formed by the composition of three independent random variables as each axis. You can then define this vector to be the normal vector of your random 2D slice as well as the distance of that 2D slice from the origin. I'm pretty sure (although without a formal proof) that this approach should give a uniform distribution over possible 2D slices (That previous statement is fundamentally informal). Edit: On second thought, you should probably draw an independent variable to represent the distance of the 2D slice from the origin. Otherwise, you'll have a distribution of 2D slices that are more likely to be around a certain distance away from the origin. 

