Cuboctahedron

The cuboctahedron, or co, is a quasiregular polyhedron and one of the 13 Archimedean solids. It consists of 8 equilateral triangles and 6 squares, with two of each joining at a vertex. It can be derived as a rectified cube or octahedron.

The cuboctahedron has the rare property that its circumradius equals its edge length. Other notable polytopes that satisfy this property are the hexagon, the tesseract, and the icositetrachoron.

Vertex coordinates
A cuboctahedron of side length 1 has vertex coordinates given by all permutations of
 * (±$\sqrt{2}$/2, ±$\sqrt{2}$/2, 0).

Small rhombitetratetrahedron
A cuboctahedron can also be constructed in A3 symmetry, as the cantellated tetrahedron. This figure is named the small rhombitetratetrahedron, also commonly known as simply the rhombitetratetrahedron. In this form, the 8 triangles split into 2 sets of 4, and the squares alternately join to the two kinds of triangles. It can be represented as x3o3x.

Related polyhedra
The cuboctahedron is the colonel of a three-member regiment that also includes the octahemioctahedron and the cubohemioctahedron.

A cuboctahedron can be cut in half along an equatorial hexagonal section to produce 2 triangular cupolas. Since the two cupolas are in oppsoite orientations, this means the cuboctahedron can be called the triangular gyrobicupola. If one cupola is rotated 60º and then rejoined, so that triangles join to triangles and squares join to squares, the result is the triangular orthobicupola. If a hexagonal prism is inserted between the halves of a cuboctahedron, the result is an elongated triangular gyrobicupola.