Square orthobicupola

From Wikipedia, the free encyclopedia

Square orthobicupola
Square orthobicupola
Type Johnson
J27 - J28 - J29
Faces 8 triangles
10 squares
Edges 32
Vertices 16
Vertex configuration 8 of 32.42
8 of 3.43
Symmetry group D4h
Dual polyhedron -
Properties convex
Net of Square orthobicupola

Net of Square orthobicupola


In geometry, the square orthobicupola is one of the Johnson solids (J28). As the name suggests, it can be constructed by joining two square cupolae (J4) along their octagonal bases, matching like faces. A 45-degree rotation of one cupola before the joining yields a square gyrobicupola (J29).

The square orthobicupola is the second in an infinite set of orthobicupolae.

The square orthobicupola can be elongated by the insertion of an octagonal prism between its two cupolae to yield a rhombicuboctahedron, or collapsed by the removal of an irregular hexagonal prism to yield an elongated square dipyramid (J15), which itself is merely an elongated octahedron.

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

[edit] External link


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