Givens
1 X,y,and Z the world coordinate system 2i,j,k another coordinate system. 3the cosines in which each of i,j, and k make with the X,Y,Z.
problem
 how to rotate the i,j,k system about i or j or k??

If you have the cosines of the angles formed by pairing each of i,j,k with each of xhat, yhat, and zhat (nine angles altogether), you have the makings for the direction cosine matrix. For example, see http://www.ae.illinois.edu/~tbretl/ae403/handouts/06dcm.pdf (or just google direction cosine matrix). The direction cosine matrix is just another name for a transformation or rotation matrix. Be careful, though!



You can first create either a rotation matrix or a quaternion. Then you use that to transform your vectors. You can find the code to create a rotation matrix or a quaternion in pretty much any 3d maths library. If I recall correctly you calculated the rotation quaternion as(assuming normalized axis):


