Difference between revisions of "Octahedron"
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− | + | In Euclidean [[geometry]], an octahedron is any polyhedron with eight [[face]]s. The term is most frequently to refer to a polyhedron with eight [[triangular]] faces, with three meeting at each [[vertex]]. | |
The [[regular]] [[octahedron]] has eight [[equilateral triangle]] faces and is one of the five [[Platonic solid]]s. It has six vertices, twelve edges, and is [[dual]] to the [[cube (geometry)|cube]]. | The [[regular]] [[octahedron]] has eight [[equilateral triangle]] faces and is one of the five [[Platonic solid]]s. It has six vertices, twelve edges, and is [[dual]] to the [[cube (geometry)|cube]]. | ||
Revision as of 19:55, 9 November 2007
This article is a stub. Help us out by expanding it. An octahedron is a type of polyhedron.
Definition
In Euclidean geometry, an octahedron is any polyhedron with eight faces. The term is most frequently to refer to a polyhedron with eight triangular faces, with three meeting at each vertex. The regular octahedron has eight equilateral triangle faces and is one of the five Platonic solids. It has six vertices, twelve edges, and is dual to the cube.
The regular octahedron can be decomposed into two square pyramids by a plane constructed perpendicular to the space diagonal joining two opposite vertices.
Related Formulae
- The surface area of a regular octahedron with side length is
- The volume of a regular octahedron with side length is