Pentagonal polytope

The family starts as 1-polytopes and ends with n = 5 as infinite tessellations of 4-dimensional hyperbolic space.

There are two types of pentagonal polytopes; they may be termed the dodecahedral and icosahedral types, by their three-dimensional members. The two types are duals of each other.

Dodecahedral

The complete family of dodecahedral pentagonal polytopes are:

1. Line segment, { }
2. Pentagon, {5}
3. Dodecahedron, {5, 3} (12 pentagonal faces)
4. 120-cell, {5, 3, 3} (120 dodecahedral cells)
5. Order-3 120-cell honeycomb, {5, 3, 3, 3} (tessellates hyperbolic 4-space (∞ 120-cell facets)

The facets of each dodecahedral pentagonal polytope are the dodecahedral pentagonal polytopes of one less dimension. Their vertex figures are the simplices of one less dimension.

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Dodecahedral pentagonal polytopes

n	Coxeter group	Petrie polygon projection	Name Coxeter diagram Schläfli symbol	Facets	Elements
					Vertices	Edges	Faces	Cells	4-faces
1	${\displaystyle H_{1}}$ [ ] (order 2)		Line segment { }	2 vertices	2
2	${\displaystyle H_{2}}$ [5] (order 10)		Pentagon {5}	5 edges	5	5
3	${\displaystyle H_{3}}$ [5,3] (order 120)		Dodecahedron {5, 3}	12 pentagons	20	30	12
4	${\displaystyle H_{4}}$ [5,3,3] (order 14400)		120-cell {5, 3, 3}	120 dodecahedra	600	1200	720	120
5	${\displaystyle {\bar {H}}_{4}}$ [5,3,3,3] (order ∞)		120-cell honeycomb {5, 3, 3, 3}	∞ 120-cells	∞	∞	∞	∞	∞

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Icosahedral

The complete family of icosahedral pentagonal polytopes are:

1. Line segment, { }
2. Pentagon, {5}
3. Icosahedron, {3, 5} (20 triangular faces)
4. 600-cell, {3, 3, 5} (600 tetrahedron cells)
5. Order-5 5-cell honeycomb, {3, 3, 3, 5} (tessellates hyperbolic 4-space (∞ 5-cell facets)

The facets of each icosahedral pentagonal polytope are the simplices of one less dimension. Their vertex figures are icosahedral pentagonal polytopes of one less dimension.

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Icosahedral pentagonal polytopes

n	Coxeter group	Petrie polygon projection	Name Coxeter diagram Schläfli symbol	Facets	Elements
					Vertices	Edges	Faces	Cells	4-faces
1	${\displaystyle H_{1}}$ [ ] (order 2)		Line segment { }	2 vertices	2
2	${\displaystyle H_{2}}$ [5] (order 10)		Pentagon {5}	5 Edges	5	5
3	${\displaystyle H_{3}}$ [5,3] (order 120)		Icosahedron {3, 5}	20 equilateral triangles	12	30	20
4	${\displaystyle H_{4}}$ [5,3,3] (order 14400)		600-cell {3, 3, 5}	600 tetrahedra	120	720	1200	600
5	${\displaystyle {\bar {H}}_{4}}$ [5,3,3,3] (order ∞)		Order-5 5-cell honeycomb {3, 3, 3, 5}	∞ 5-cells	∞	∞	∞	∞	∞

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The pentagonal polytopes can be stellated to form new star regular polytopes:

• In two dimensions, we obtain the pentagram {5/2},
• In three dimensions, this forms the four Kepler–Poinsot polyhedra, {3,5/2}, {5/2,3}, {5,5/2}, and {5/2,5}.
• In four dimensions, this forms the ten Schläfli–Hess polychora: {3,5,5/2}, {5/2,5,3}, {5,5/2,5}, {5,3,5/2}, {5/2,3,5}, {5/2,5,5/2}, {5,5/2,3}, {3,5/2,5}, {3,3,5/2}, and {5/2,3,3}.
• In four-dimensional hyperbolic space there are four regular star-honeycombs: {5/2,5,3,3}, {3,3,5,5/2}, {3,5,5/2,5}, and {5,5/2,5,3}.

In some cases, the star pentagonal polytopes are themselves counted among the pentagonal polytopes.^[1]

Like other polytopes, regular stars can be combined with their duals to form compounds;

• In two dimensions, a decagrammic star figure {10/2} is formed,
• In three dimensions, we obtain the compound of dodecahedron and icosahedron,
• In four dimensions, we obtain the compound of 120-cell and 600-cell.

Star polytopes can also be combined.