Rhodomesohedron (EntityTopic, 11)
From Hi.gher. Space
(Difference between revisions)
m |
m |
||
| Line 4: | Line 4: | ||
| genus=0 | | genus=0 | ||
| ssc2=Ki2 | | ssc2=Ki2 | ||
| - | | extra={{STS Uniform polytope | + | | extra={{STS Polytope |
| + | | flayout={{FLD|a3|line|a5}} | ||
| + | | dual=[[Rhombic triacontahedron]] | ||
| + | }}{{STS Uniform polytope | ||
| wythoff=<nowiki>2 | 3 5</nowiki> | | wythoff=<nowiki>2 | 3 5</nowiki> | ||
| schlaefli=r{[[Pentagon|5]],[[Dodecahedron|3]]} or r{[[Triangle|3]],[[Icosahedron|5]]} | | schlaefli=r{[[Pentagon|5]],[[Dodecahedron|3]]} or r{[[Triangle|3]],[[Icosahedron|5]]} | ||
| Line 12: | Line 15: | ||
| bowers=Id | | bowers=Id | ||
| kana=イド | | kana=イド | ||
| - | |||
}}}} | }}}} | ||
Revision as of 11:17, 1 November 2009
The icosidodecahedron has a convenient name as it represents both the number of faces in the polyhedron (icosidodeca = 32) and also the combination of the two regular polytopes that can be rectified to form it (icosahedron + dodecahedron).
| Notable Trishapes | |
| Regular: | tetrahedron • cube • octahedron • dodecahedron • icosahedron |
| Direct truncates: | tetrahedral truncate • cubic truncate • octahedral truncate • dodecahedral truncate • icosahedral truncate |
| Mesotruncates: | stauromesohedron • stauroperihedron • stauropantohedron • rhodomesohedron • rhodoperihedron • rhodopantohedron |
| Snubs: | snub staurohedron • snub rhodohedron |
| Curved: | sphere • torus • cylinder • cone • frustum • crind |
