A dodecadodecahedron is a uniform polyhedron that can be constructed from rectifying a great dodecahedron or small stellated dodecahedron. In Euclidean space, it is self-intersecting and has 12 pentagonal and 12 pentagrammic faces.
Its dual is the medial rhombic triacontahedron.
Its Bowers acronym is did.
Structure and Sections[]
Subfacets[]
- 30 points (0D)
- 60 line segments (1D)
- 12 pentagons (2D)
- 12 pentagrams (2D)
- 1 dodecadodecahedron (3D)
See Also[]
- Polytope Wiki. "Dodecadodecahedron".
- Bowers, Jonathan. "Polytope Category 3: Quasiregulars".
Quasiregular polyhedra |
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thah · co · oho · cho · id · sidhid · seihid · did · sidhei · gidhei · gid · gidhid · geihid · sidtid · gitdid · gidtid |