Final Exam 1 08

The of an orthonormal matrix is equal to its inverse

Info iconThis preview shows page 1. Sign up to view the full content.

View Full Document Right Arrow Icon
This is the end of the preview. Sign up to access the rest of the document.

Unformatted text preview: __ of an orthonormal matrix is equal to its inverse. The __________________ parameterization of 3D rotations is plagued by the fearful phenomena known as gimbal lock. Final Exam CS 184: Foundations of Computer Graphics Fall 2008 Prof. James O’Brien page 4 of 15 __________________ encode 3D rotations as point in 4D space. Waiting until the last day to start working on your raytracer assignment is a ____________ idea. ____________ law can be used to compute the angle that transmitted ray will make with the normal of a transparent material’s surface. The “P” in BSP-Tree stands for __________________. __________________ is a special case of perspective projection where the viewer is infi- nitely far away. In the context of a scan-line renderer, Z-buffers are used for ________________________ . A bump map is used to change the __________________ vectors when shading an object. The normal vector at a point on a parametric surface is given by the of two vectors tangent to the surface at that point. __________________ When two curve segments join at a point and both curves approach that point with the same tangent vector, the joining is said to be ______ continuous. When two curve segments join at a point and both curves approach that point with the same derivative, the joining is said to be ______ continuous. NURBS are b-splines that use __________________ for control points. In Catmull-Clark subdivision, the number of quads grows by a factor of subdivision. ______ for each level of ____________ are the dimensionless units used to measure solid angles. When the view p...
View Full Document

This note was uploaded on 01/24/2014 for the course CS 184 taught by Professor Staff during the Fall '08 term at Berkeley.

Ask a homework question - tutors are online