TLP contents
Main pages
- Aims
- Before you start
- Introduction
- Basic concept
- Demonstration of projection
- Important properties of the stereographic projection
- The Wulff net
- Use of the Wulff net in constructing a stereogram
- Plotting poles on the stereogram through use of the Wulff net
- Identifying poles on a stereogram through use of the Wulff net
- Applications of the Stereographic Projection - Slip
- Interactive Wulff net
- Summary
- Questions
- Going further
Additional pages
Media resources
- Single crystal slip and Diehl's rule (Flash)
- Animation of angular relationships (Flash)
- Animation of projection of a plane pole (Flash)
- Animation of projection of a plane (Flash)
- Animation of projection from different poles (Flash)
- Animation of tetrads (Flash)
- Animation of angular relationships (Flash)
- Symmetry notation (Flash)
- Animation of diads (Flash)
- Animation of all rotational axes (Flash)
- Animation of projection of cubic planes (Flash)
- Animation of all projected elements (Flash)
- Animation of projection from two projection points (Flash)
- Basics of the Wulff net (Flash)
- Plotting poles by the intersection of great circles (Flash)
- Plotting poles by the intersection of small circles (Flash)
- Identifying poles and vector addition (Flash)
- Exercise your skills with the Wulff net (Flash)
- The Wulff net (image)
- A fluorite crystal (image)
- The Wulff net (image)
© 2004-2013 University of Cambridge.
