Pentagonal polytope geometry , a pentagonal polytoperegular polytope in n dimensions constructed from the Hn Coxeter group. The family was named by H. S. M. Coxeter, because the two-dimensional pentagonal polytope is a pentagon . It can be named by its Schläfli symbol as or .Family members The family starts as 1-polytopes and ends with n = 5 as infinite tessellations of 4-dimensional hyperbolic space .types of pentagonal polytopes ; they may be termed the dodecahedral icosahedral types, by their three-dimensional members. The two types are duals of each other.Dodecahedral The complete family of dodecahedral pentagonal polytopes are: Line segment , Pentagon , Dodecahedron , 120-cell , Order-3 120-cell honeycomb , 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.Icosahedral The complete family of icosahedral pentagonal polytopes are: Line segment, Pentagon, Icosahedron , 600-cell , Order-5 5-cell honeycomb , vertex figures are icosahedral pentagonal polytopes of one less dimension.Related star polytopes and honeycombs The pentagonal polytopes can be stellated to form new star regular polytopes:In three dimensions , this forms the four Kepler–Poinsot polyhedra,,,, and. In four dimensions , this forms the ten Schläfli–Hess polychora:,,,,,,,,, and. In four-dimensional hyperbolic space there are four regular star-honeycombs: Small stellated 120-cell honeycomb|, Pentagrammic-order 600-cell honeycomb|, Order-5 icosahedral 120-cell honeycomb|, and Great 120-cell honeycomb|.
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