Difference between revisions of "Tetrahedron"
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| − | + | The '''tetrahedron''' (plural ''tetrahedra'') or ''triangular pyramid'' is the simplest [[polyhedron]]. Tetrahedra have four [[vertex|vertices]], four [[triangle | triangular]] [[face]]s and six [[edge]]s. Three faces and three edges meet at each vertex. | |
| − | + | Any four points chosen in space will be the vertices of a tetrahedron as long as they do not all lie on a single [[plane]]. | |
| − | + | Regular tetrahedra, in which all edges have equal [[length]] and all faces are [[congruent]] [[equilateral triangle]]s, are one of the five types of [[Platonic solid]]s. | |
| − | + | The [[polyhedral dual]] of a tetrahedron is another tetrahedron. | |
| + | {{stub}} | ||
[[Category:Geometry]] | [[Category:Geometry]] | ||
[[Category:Platonic solids]] | [[Category:Platonic solids]] | ||
Revision as of 11:15, 22 July 2009
The tetrahedron (plural tetrahedra) or triangular pyramid is the simplest polyhedron. Tetrahedra have four vertices, four triangular faces and six edges. Three faces and three edges meet at each vertex.
Any four points chosen in space will be the vertices of a tetrahedron as long as they do not all lie on a single plane.
Regular tetrahedra, in which all edges have equal length and all faces are congruent equilateral triangles, are one of the five types of Platonic solids.
The polyhedral dual of a tetrahedron is another tetrahedron.
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