Icosahedral truncate (EntityTopic, 11)
From Hi.gher. Space
(Difference between revisions)
(polytope explorer integration) |
m (move Bowers acronym from Template:STS Uniform polytope as it is now being used for non-uniforms too) |
||
Line 10: | Line 10: | ||
| flayout={{FLD|a5|i|a3|er}} | | flayout={{FLD|a5|i|a3|er}} | ||
| dual=[[Pentakis dodecahedron]] | | dual=[[Pentakis dodecahedron]] | ||
+ | | bowers=Ti | ||
}}{{STS Uniform polytope | }}{{STS Uniform polytope | ||
| schlaefli=t{[[Pentagon|3,]]5} | | schlaefli=t{[[Pentagon|3,]]5} | ||
Line 15: | Line 16: | ||
| vfigure=Isosceles [[triangle]] | | vfigure=Isosceles [[triangle]] | ||
| vlayout=[[Pentagon|5]]⋅[[Hexagon|6]]<sup>2</sup> | | vlayout=[[Pentagon|5]]⋅[[Hexagon|6]]<sup>2</sup> | ||
- | |||
}}}} | }}}} | ||
== Equations == | == Equations == |
Revision as of 10:29, 2 March 2014
Equations
- Variables:
l ⇒ length of edges of the truncated icosahedron
- The hypervolumes of a truncated icosahedron are given by:
total edge length = 90l
surface area = 3(32-110+52-1(5+52-12)2-1)l2
volume = (125+52-143)l34-1
Incidence matrix
Dual: pentakis dodecahedron
# | TXID | Va | Ea | Eb | 5a | 6a | Type | Name |
---|---|---|---|---|---|---|---|---|
0 | Va | = point | ; | |||||
1 | Ea | 2 | = digon | ; | ||||
2 | Eb | 2 | = digon | ; | ||||
3 | 5a | 5 | 0 | 5 | = pentagon | ; | ||
4 | 6a | 6 | 3 | 3 | = hexagon | ; | ||
5 | C1a | 60 | 30 | 60 | 12 | 20 | = truncated icosahedron | ; |
Usage as facets
- 24× 1-facets of a truncated snub demitesseract
- 1× 1-facets of a D4.7
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 |