Dodecahedral prism
| Dodecahedral prism | |
|---|---|
 Schlegel diagram Only one dodecahedral cell shown |
|
| Type | Prismatic uniform polychoron |
| Uniform index | 57 |
| Schläfli symbol | {5,3}x{} |
| Coxeter-Dynkin |      |
| Cells | 2 (5.5.5) 12 (4.4.5)  |
| Faces | 30 {4} 24 {5} |
| Edges | 80 |
| Vertices | 40 |
| Vertex configuration | Equilateral-triangular pyramid |
| Symmetry group | [5,3,2], order 240 |
| Properties | convex |
In geometry, a dodecahedral prism is a convex uniform polychoron (four dimensional polytope). This polychoron has 14 polyhedral cells: 2 dodecahedra connected by 12 pentagonal prisms. It has 54 faces: 30 squares and 24 pentagons. It has 80 edges and 40 vertices.
It can be constructed by creating two coinciding dodecahedra in 3-space, and translating each copy in opposite perpendicular directions in 4-space until their separation equals their edge length.
Alternative names:
- Dodecahedral dyadic prism Norman W. Johnson
- Dope (for dodecahedral prism) Jonathan Bowers
- Dodecahedral hyperprism
It is one of 18 convex uniform polyhedral prisms created by using uniform prisms to connect pairs of parallel Platonic solids or Archimedean solids.
[edit] Structure
The dodecahedral prism consists of two dodecahedra connected to each other via 12 pentagonal prisms. The pentagonal prisms are joined to each other via their square faces.
[edit] Projections
The pentagonal-prism-first orthographic projection of the dodecahedral prism into 3D space has a decagonal envelope (see diagram). Two of the pentagonal prisms project to the center of this volume, each surrounded by 5 other pentagonal prisms. They form two sets (each consisting of a central pentagonal prism surrounded by 5 other non-uniform pentagonal prisms) that cover the volume of the decagonal prism twice. The two dodecahedra project onto the decagonal faces of the envelope.
The dodecahedron-first orthographic projection of the dodecahedral prism into 3D space has a dodecahedral envelope. The two dodecahedral cells project onto the entire volume of this envelope, while the 12 decagonal prismic cells project onto its 12 pentagonal faces.
[edit] External links
- 6. Convex uniform prismatic polychora - Model 57, George Olshevsky.
- Richard Klitzing, 4D uniform polytopes (polychora), x o3o5x - dope
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