3D transformations

CS 248 - Introduction to Computer Graphics
Autumn Quarter, 2003
Marc Levoy
Lecture notes for Tuesday, October 28


Table of contents:



Thus, the 3D Cartesian coordinates occupy the W = 1 three-dimensional subspace within 4D homogeneous space.





n = 3 in the above taxonomy.

In other words, linear mappings in 2D are those that can be accomplished using a 2 x 2 matrix multiplication with the coordinates (not raised to any power) as inputs.

* For this reason, the W = 1 plane is sometimes called the 2D affine space associated with the 3D homogeneous coordinate space.

Note also that this perspective foreshortening required a division (by W) to accomplish!

The columns of this chart are assumed to be in the same space. In particular, if we are talking about rigid, affine, and projective transformations in Rn-1 with respect to the taxonomy, then the linear column also refers to linear transformations in Rn-1, not in Rn.


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Last update: October 23, 2003 01:47:09 PM