Great hendecagrammic prism

Great hendecagrammic prism
Rank3
TypeUniform
Notation
Bowers style acronymGishenp
Coxeter diagramx x11/4o ()
Elements
Faces11 squares, 2 great hendecagrams
Edges11+22
Vertices22
Vertex figureIsosceles triangle, edge lengths 2, 2, 2cos(4π/11)
Measures (edge length 1)
Circumradius${\displaystyle {\frac {\sqrt {1+{\frac {1}{\sin ^{2}{\frac {4\pi }{11}}}}}}{2}}\approx 0.74306}$
Volume${\displaystyle {\frac {11}{4\tan {\frac {4\pi }{11}}}}\approx 1.25588}$
Dihedral angles4–11/4: 90°
4–4: ${\displaystyle {\frac {3\pi }{11}}\approx 49.09091^{\circ }}$
Height11/4–11/4: 1
Central density4
Number of external pieces24
Level of complexity6
Related polytopes
ArmySemi-uniform Henp, edge lengths ${\displaystyle {\frac {\sin {\frac {\pi }{11}}}{\sin {\frac {4\pi }{11}}}}}$ (base), 1 (sides)
RegimentGishenp
DualGreat hendecagrammic tegum
ConjugatesHendecagonal prism, small hendecagrammic prism, hendecagrammic prism, grand hendecagrammic prism
Convex coreHendecagonal prism
Abstract & topological properties
Flag count132
Euler characteristic2
OrientableYes
Genus0
Properties
SymmetryI2(11)×A1, order 44
ConvexNo
NatureTame

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

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)).