Triangular orthobicupola

Relation to cuboctahedra

The triangular orthobicupola has a superficial resemblance to the cuboctahedron, which would be known as the triangular gyrobicupola in the nomenclature of Johnson solids — the difference is that the two triangular cupolas which make up the triangular orthobicupola are joined so that pairs of matching sides abut (hence, "ortho"); the cuboctahedron is joined so that triangles abut squares and vice versa. Given a triangular orthobicupola, a 60-degree rotation of one cupola before the joining yields a cuboctahedron. Hence, another name for the triangular orthobicupola is the anticuboctahedron.

The elongated triangular orthobicupola (J₃₅), which is constructed by elongating this solid, has a (different) special relationship with the rhombicuboctahedron.

The dual of the triangular orthobicupola is the trapezo-rhombic dodecahedron. It has 6 rhombic and 6 trapezoidal faces, and is similar to the rhombic dodecahedron.

Formulae

The following formulae for volume, surface area, and circumradius can be used if all faces are regular, with edge length a:

V = 5 2 3 a 3 ≈ 2.35702... a 3

A = 2 ( 3 + 3 ) a 2 ≈ 9.4641... a 2

The circumradius of a triangular orthobicupola is the same as the edge length (C=a).

Related polyhedra and honeycombs

The rectified cubic honeycomb can be dissected and rebuilt as a space-filling lattice of triangular orthobicupolae and square pyramids.