Great hendecagrammic prism
Jump to navigation
Jump to search
Great hendecagrammic prism | |
---|---|
Rank | 3 |
Type | Uniform |
Notation | |
Bowers style acronym | Gishenp |
Coxeter diagram | x x11/4o () |
Elements | |
Faces | 11 squares, 2 great hendecagrams |
Edges | 11+22 |
Vertices | 22 |
Vertex figure | Isosceles triangle, edge lengths √2, √2, 2cos(4π/11) |
Measures (edge length 1) | |
Circumradius | |
Volume | |
Dihedral angles | 4–11/4: 90° |
4–4: | |
Height | 11/4–11/4: 1 |
Central density | 4 |
Number of external pieces | 24 |
Level of complexity | 6 |
Related polytopes | |
Army | Semi-uniform Henp, edge lengths (base), 1 (sides) |
Regiment | Gishenp |
Dual | Great hendecagrammic tegum |
Conjugates | Hendecagonal prism, small hendecagrammic prism, hendecagrammic prism, grand hendecagrammic prism |
Convex core | Hendecagonal prism |
Abstract & topological properties | |
Flag count | 132 |
Euler characteristic | 2 |
Orientable | Yes |
Genus | 0 |
Properties | |
Symmetry | I2(11)×A1, order 44 |
Flag orbits | 3 |
Convex | No |
Nature | Tame |
The great hendecagrammic prism or gishenp is a prismatic uniform polyhedron. It consists of 2 great hendecagrams and 11 squares. Each vertex joins one great hendecagram and two squares. As the name suggests, it is a prism based on a great hendecagram.
Vertex coordinates[edit | edit source]
The coordinates of a great hendecagrammic prism, centered at the origin and with edge length 2sin(4π/11), are given by:
- (1, 0, \pmsin(4π/11)),
- (cos(2π/11), \pmsin(2π/11), \pmsin(4π/11)),
- (cos(4π/11), \pmsin(4π/11), \pmsin(4π/11)),
- (cos(6π/11), \pmsin(6π/11), \pmsin(4π/11)),
- (cos(8π/11), \pmsin(8π/11), \pmsin(4π/11)),
- (cos(10π/11), \pmsin(10π/11), \pmsin(4π/11)).