Truncated pentakis dodecahedron
The truncated pentakis dodecahedron is a convex polyhedron constructed as a truncation of the pentakis dodecahedron. It is Goldberg polyhedron GV(3,0), with pentagonal faces separated by an edge-direct distance of 3 steps.
Truncated pentakis dodecahedron | |
---|---|
Conway notation | tkD |
Goldberg polyhedron | GPV(3,0) or {5+,3}3,0 |
Fullerene | C180[1] |
Faces | 92: 12 pentagons 20+60 hexagons |
Edges | 270 (2 types) |
Vertices | 180 (2 types) |
Vertex configuration | (60) 5.6.6 (120) 6.6.6 |
Symmetry group | Icosahedral (Ih) |
Dual polyhedron | Pentahexakis truncated icosahedron |
Properties | convex |
Related polyhedra
It is in an infinite sequence of Goldberg polyhedra:
Index | GP(1,0) | GP(2,0) | GP(3,0) | GP(4,0) | GP(5,0) | GP(6,0) | GP(7,0) | GP(8,0)... |
---|---|---|---|---|---|---|---|---|
Image | D |
kD |
tkD |
|||||
Duals | I |
cD |
ktI |
References
- Deza, A.; Deza, M.; Grishukhin, V. (1998), "Fullerenes and coordination polyhedra versus half-cube embeddings", Discrete Mathematics, 192 (1): 41–80, doi:10.1016/S0012-365X(98)00065-X, archived from the original on 2007-02-06.
- Antoine Deza, Michel Deza, Viatcheslav Grishukhin, Fullerenes and coordination polyhedra versus half-cube embeddings, 1998 PDF
External links
- VTML polyhedral generator Try "tkD" (Conway polyhedron notation)
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