Pentagrammic antiprism

In geometry, the pentagrammic antiprism is one in an infinite set of nonconvex antiprisms formed by triangle sides and two regular star polygon caps, in this case two pentagrams.

Uniform pentagrammic antiprism
TypePrismatic uniform polyhedron
ElementsF = 12, E = 20
V = 10 (χ = 2)
Faces by sides10{3}+2{5/2}
Schläfli symbolsr{2,5/2}
Wythoff symbol| 2 2 5/2
Coxeter diagram
SymmetryD5h, [5,2], (*552), order 20
Rotation groupD5, [5,2]+, (55), order 10
Index referencesU79(a)
DualPentagrammic trapezohedron
Propertiesnonconvex

Vertex figure
3.3.3.5/2
3D model of a (uniform) pentagrammic antiprism

It has 12 faces, 20 edges and 10 vertices. This polyhedron is identified with the indexed name U79 as a uniform polyhedron.[1]

Note that the pentagram face has an ambiguous interior because it is self-intersecting. The central pentagon region can be considered interior or exterior depending on how interior is defined. One definition of interior is the set of points that have a ray that crosses the boundary an odd number of times to escape the perimeter.

In either case, it is best to show the pentagram boundary line to distinguish it from a concave decagon.

An alternative representation with hollow centers to the pentagrams. The pentagrammic trapezohedron is the dual to the pentagrammic antiprism.

Net

Net (fold the dotted line in the centre in the opposite direction to all the other lines):

References

See also

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