Dorman Luke self-dual form | |
---|---|
Tetrahedrally stellated icosahedron | |
Tetrahedrally diminished dodecahedron | |
Conway polyhedron notation | pT |
Faces | 16: 4 {3} + 12 quadrilaterals |
Edges | 30 |
Vertices | 16 |
Vertex configuration | 3.4.4.4 4.4.4 |
Symmetry group | T, [3,3]+, (332), order 12 |
Dual polyhedron | Self-dual |
Properties | convex, chiral |
Nets |
In geometry, a tetrahedrally diminished[lower-alpha 1] dodecahedron (also tetrahedrally stellated icosahedron or propello tetrahedron[1]) is a topologically self-dual polyhedron made of 16 vertices, 30 edges, and 16 faces (4 equilateral triangles and 12 identical quadrilaterals).[2]
A canonical form exists with two edge lengths at 0.849 : 1.057, assuming that the radius of the midsphere is 1. The kites remain isosceles.
It has chiral tetrahedral symmetry, and so its geometry can be constructed from pyritohedral symmetry of the pseudoicosahedron with 4 faces stellated, or from the pyritohedron, with 4 vertices diminished. Within its tetrahedral symmetry, it has geometric varied proportions. By Dorman Luke dual construction, a unique geometric proportion can be defined. The kite faces have edges of length ratio ~ 1:0.633.
Topologically, the triangles are always equilateral, while the quadrilaterals are irregular, although the two adjacent edges that meet at the vertices of a tetrahedron are equal.
As a self-dual hexadecahedron, it is one of 302404 forms, 1476 with at least order 2 symmetry, and the only one with tetrahedral symmetry.[3]
As a diminished regular dodecahedron, with 4 vertices removed, the quadrilaterals faces are trapezoids.
As a stellation of the regular icosahedron it is one of 32 stellations defined with tetrahedral symmetry. It has kite faces.[4]
In Conway polyhedron notation, it can be represented as pT, applying George W. Hart's propeller operator to a regular tetrahedron.[5]
Related polytopes and honeycombs
This polyhedron represents the vertex figure of a hyperbolic uniform honeycomb, the partially diminished icosahedral honeycomb, pd{3,5,3}, with 12 pentagonal antiprisms and 4 dodecahedron cells meeting at every vertex.
- Vertex figure projected as Schlegel diagram
Notes
- ↑ It is also less accurately called a tetrahedrally truncated dodecahedron
References
External links
- tetrahedrally truncated dodecahedron and stellated icosahedron
- Generation of an icosahedron by the intersection of five tetrahedra: geometrical and crystallographic features of the intermediate polyhedra
- VRML model as truncated regular dodecahedron
- VRML model as tetrahedrally stellated icosahedron