Skip to end of metadata
Go to start of metadata

You are viewing an old version of this page. View the current version.

Compare with Current View Page History

« Previous Version 4 Current »

This problem was contributed by Thomas Uchida at the University of Ottawa.


Frame A and point  lie on the plane :

Note that unit vector  is pointing out of the screen. The coordinates of point  are (2.1, 0.5, 0) when expressed in frame A. Frame B lies in the same plane and has the orientation shown below:


(a) Find the rotation matrix  that relates the orientation of frames A and B. Use any strategy to check your answer and explain why it is correct.

(b) For part (b) only, suppose the origins of frames A and B are coincident. Use your answer from part (a) and the expression  to compute . Recall that rotation matrices are orthogonal, which means that .

(c) Now suppose the origin of frame B is at  relative to the origin of frame A. What is the transformation matrix  that relates frames A and B?

(d) Use your answer from part (c) and the expression below to compute :

(e) Sketch frame A, frame B, and point  to confirm that your answer to part (d) is correct.


 Solution (only visible by instructors; please contact us to request access)

Unable to render {include} The included page could not be found.

  • No labels