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Surprisingly ALL of the Catalan solids have a single dihedral angle, even with different types of edges. The last section here can be expanded to all 13 solids, but no time for me for now! (Listed in Williams book in numeric values, but not all exact values given there.) Tom Ruen 05:56, 5 October 2006 (UTC)
- In fact, all the duals of the uniform polyhedra have a single dihedral angle. This is a consequence of the fact that their duals (the uniform polyhedra) have all regular faces. (Thanks to Rckrone for explaining it to me at WP:RD/MATH.) Even the two pseudo-uniform polyhedra work. Double sharp (talk) 04:42, 6 May 2012 (UTC)
- Approximate values for the dihedral angles may be obtained using Stella (except for the hemipolyhedra, which are, however, infinite stellations of another convex polyhedron). Double sharp (talk) 04:43, 6 May 2012 (UTC)
- Only the duals of Miller's monster and Skilling's figure may pose problems. Double sharp (talk) 04:48, 6 May 2012 (UTC)
- Approximate values for the dihedral angles may be obtained using Stella (except for the hemipolyhedra, which are, however, infinite stellations of another convex polyhedron). Double sharp (talk) 04:43, 6 May 2012 (UTC)
Think we should extend for all uniforms? E.g. for truncated icosahedron, give values for both the {5}-{6} and {6}-{6} edges. Double sharp (talk) 14:47, 28 April 2014 (UTC)
Almost all dihedral angles can be found on this (a little bit technical) site: [1]. 83.117.113.106 (talk) 22:18, 4 December 2014 (UTC)