Bipyramid
[bahy-pir-uh-mid]
| Set of bipyramids | |
|---|---|
(Example hexagonal form) | |
| Faces | 2n triangles |
| Edges | 3n |
| Vertices | n+2 |
| Face configuration | V4.4.n |
| Symmetry group | Dnh |
| Dual polyhedron | 2n-gonal prism |
| Properties | convex, face-transitive |
| Net | |
An n-agonal bipyramid or dipyramid is a polyhedron formed by joining an n-agonal pyramid and its mirror image base-to-base.
The referenced n-agon in the name of the bipyramids is not an external face but an internal one, existing on the primary symmetry plane which connects the two pyramid halves.
The face-transitive bipyramids are the dual polyhedra of the uniform prisms and will generally have isosceles triangle faces.
A bipyramid can be projected on a sphere or globe as n equally spaced lines of longitude going from pole to pole, and bisected by a line around the equator.
Bipyramid faces, projected as spherical triangles, represent the fundamental domains in the dihedral symmetry Dnh.
Equilateral triangle bipyramids
Only three kinds of bipyramids can have all edges of the same length (which implies that all faces are equilateral triangles): the triangular, tetragonal, and pentagonal bipyramids. The tetragonal bipyramid with identical edges, or regular octahedron, counts among the Platonic solids, while the triangular and pentagonal bipyramids with identical edges count among the Johnson solids (J12 and J13).
Triangular bipyramid | Tetragonal bipyramid | Pentagonal bipyramid |
Forms
- Triangular bipyramid - 6 faces - dual triangular prism
- Tetragonal bipyramid (the regular octahedron is a special case) - 8 faces - dual cube
- Pentagonal bipyramid - 10 faces - dual pentagonal prism
- Hexagonal bipyramid - 12 faces - dual hexagonal prism
- Heptagonal bipyramid - 14 faces - dual heptagonal prism
- Octagonal bipyramid - 16 faces - dual octagonal prism
- Enneagonal bipyramid - 18 faces - dual enneagonal prism
- Decagonal bipyramid - 20 faces - dual decagonal prism
- ...n-agonal bipyramid - 2n faces - dual n-agonal prism
3 | 4 | 5 | 6 | 8 | 10 |
Symmetry groups
If the base is regular and the line through the apexes intersects the base at its center, the symmetry group of the n-agonal bipyramid has dihedral symmetry Dnh of order 4n, except in the case of a regular octahedron, which has the larger octahedral symmetry group Oh of order 48, which has three versions of D4h as subgroups. The rotation group is Dn of order 2n, except in the case of a regular octahedron, which has the larger symmetry group O of order 24, which has three versions of D4 as subgroups.Star bipyramids
Self-intersecting bipyramids exist with a star polygon central figure, defined by triangular faces connecting each polygon edge to these two points.
For example, a pentagrammic dipyramid is an isohedral star polyhedron composed of 10 intersecting isoceles triangles. It is the dual to the pentagrammic prism.
External links
- The Uniform Polyhedra
- Virtual Reality Polyhedra The Encyclopedia of Polyhedra
This article is licensed under the GNU Free Documentation License.
Last updated on Saturday September 20, 2008 at 04:58:57 PDT (GMT -0700)
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