Elongated triangular pyramid

Elongated triangular pyramid
Elongated triangular pyramid
Type	Johnson; J6 - J7 - J8
Faces	1+3 triangles; 3 squares
Edges	12
Vertices	7
Vertex configuration	1(33); 3(3.42); 3(32.42)
Symmetry group	C3v
Dual polyhedron	self
Properties	convex
Net

In geometry, the elongated triangular pyramid is one of the Johnson solids (J₇). Norman Johnson discovered elongated triangular pyramids. As the name suggests, it can be constructed by elongating a tetrahedron by attaching a triangular prism to its base. Like any elongated pyramid, the resulting solid is self-dual.

The 92 Johnson solids were named and described by Norman Johnson in 1966.

Formulae

The following formulae (the volume and surface area) can be used if all edges ("a") are the same length.^[1]

$V=({\frac {1}{12}}({\sqrt {2}}+3{\sqrt {3}}))a\approx 0.550864...a$

$A=(3+{\sqrt {3}})a\approx 4.73205...a$

If the edges are not the same length, use the individual formulae for the tetrahedron and triangular prism separately, and then, add the results together.

References

^ Stephen Wolfram, "Elongated triangular pyramid" from Wolfram Alpha. Retreived July 21, 2010.

External links

This polyhedron-related article is a stub. You can help Wikipedia by expanding it.

[1] Stephen Wolfram, "Elongated triangular pyramid" from Wolfram Alpha. Retreived July 21, 2010.

[1]