In geometry, there are seven uniform and uniform dual polyhedra named as ditrigonal.[1]
Ditrigonal vertex figures edit
There are five uniform ditrigonal polyhedra, all with icosahedral symmetry.[1]
The three uniform star polyhedron with Wythoff symbol of the form 3 | p q or 3/2 | p q are ditrigonal, at least if p and q are not 2. Each polyhedron includes two types of faces, being of triangles, pentagons, or pentagrams. Their vertex configurations are of the form p.q.p.q.p.q or (p.q)3 with a symmetry of order 3. Here, term ditrigonal refers to a hexagon having a symmetry of order 3 (triangular symmetry) acting with 2 rotational orbits on the 6 angles of the vertex figure (the word ditrigonal means "having two sets of 3 angles").[2]
Type | Small ditrigonal icosidodecahedron | Ditrigonal dodecadodecahedron | Great ditrigonal icosidodecahedron |
---|---|---|---|
Image | |||
Vertex figure | |||
Vertex configuration | 3.5⁄2.3.5⁄2.3.5⁄2 | 5.5⁄3.5.5⁄3.5.5⁄3 | (3.5.3.5.3.5)/2 |
Faces | 32 20 {3}, 12 { 5⁄2 } |
24 12 {5}, 12 { 5⁄2 } |
32 20 {3}, 12 {5} |
Wythoff symbol | 3 | 5/2 3 | 3 | 5/3 5 | 3 | 3/2 5 |
Coxeter diagram |
Other uniform ditrigonal polyhedra edit
The small ditrigonal dodecicosidodecahedron and the great ditrigonal dodecicosidodecahedron are also uniform.
Their duals are respectively the small ditrigonal dodecacronic hexecontahedron and great ditrigonal dodecacronic hexecontahedron.[1]
See also edit
References edit
Notes edit
- ^ a b c Har'El, 1993
- ^ Uniform Polyhedron, Mathworld (retrieved 10 June 2016)
Bibliography edit
- Coxeter, H.S.M., M.S. Longuet-Higgins and J.C.P Miller, Uniform Polyhedra, Phil. Trans. 246 A (1954) pp. 401–450.
- Har'El, Z. Uniform Solution for Uniform Polyhedra., Geometriae Dedicata 47, 57–110, 1993. Zvi Har’El, Kaleido software, Images, dual images
Further reading edit
- Johnson, N.; The Theory of Uniform Polytopes and Honeycombs, Ph.D. Dissertation, University of Toronto, 1966 [1]
- Skilling, J. (1975), "The complete set of uniform polyhedra", Philosophical Transactions of the Royal Society of London. Series A. Mathematical and Physical Sciences, 278 (1278): 111–135, doi:10.1098/rsta.1975.0022, ISSN 0080-4614, JSTOR 74475, MR 0365333, S2CID 122634260