Pentagonal pyramid

Pentagonal pyramid

Type	Johnson J₁ - J₂ - J₃
Faces	5 triangles 1 pentagon
Edges	10
Vertices	6
Vertex configuration	5(3².5) (3⁵)
Schläfli symbol	( ) ∨ {5}
Symmetry group	C_5v, [5], (*55)
Rotation group	C₅, [5]⁺, (55)
Dual polyhedron	self
Properties	convex
Net

In geometry, a pentagonal pyramid is a pyramid with a pentagonal base upon which are erected five triangular faces that meet at a point (the vertex). Like any pyramid, it is self-dual.

The regular pentagonal pyramid has a base that is a regular pentagon and lateral faces that are equilateral triangles. It is one of the Johnson solids (J₂). Its height H, from the midpoint of the pentagonal face to the apex, (as a function of a, where a is the side length), can be computed as:

H={\sqrt {{{\frac {5-{\sqrt {5}}}{10}}}}}\,a\approx 0.5257\,a.

Its surface area, A, can be computed as the area of pentagonal base plus five times the area of one triangle:

A=\left({\frac {{\sqrt {25+10{\sqrt {5}}}}}{4}}+5{\frac {{\sqrt {3}}}{4}}\right)a^{2}\approx 3.8855\,a^{2}.

Its volume when an edge length is known can be figured out with this formula:

V={\frac {5+{\sqrt {5}}}{24}}\,a^{3}\approx 0.3015\,a^{3}.

It can be seen as the "lid" of an icosahedron; the rest of the icosahedron forms a gyroelongated pentagonal pyramid, J₁₁, one of the 92 Johnson solids named and described by Norman Johnson in 1966.

More generally an order-2 vertex-uniform pentagonal pyramid can be defined with a regular pentagonal base and 5 isosceles triangle sides of any height.

Related polyhedra

The pentagrammic star pyramid has the same vertex arrangement, but connected onto a pentagram base:

Regular pyramids
Triangular	Square	Pentagonal	Hexagonal	Heptagonal	Octagonal...
Regular	Equilateral		Isosceles

Pentagonal frustum is a pentagonal pyramid with its apex truncated	The vertex of an icosahedron is at the top of a pentagonal pyramid

Dual polyhedron

The pentagonal pyramid is topologically a self-dual polyhedron. The dual edge lengths are different due to the polar reciprocation.

Dual pentagonal pyramid	Net of dual

External links

Eric W. Weisstein, Pentagonal pyramid (Johnson solid) at MathWorld.
Virtual Reality Polyhedra www.georgehart.com: The Encyclopedia of Polyhedra ( VRML model)

Convex polyhedra

Platonic solids (regular)

Archimedean solids
(semiregular or uniform)

Catalan solids
(duals of Archimedean)

Dihedral regular

dihedron
hosohedron

Dihedral uniform

prisms antiprisms

duals:	bipyramids trapezohedra

Dihedral others

Degenerate polyhedra are in italics.

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