This is a short list of the zonohedra
which happen to be on hand here. They fall into three groups:
A) Duals to quasi-regular polyhedra
The first element of each triple is a regular or quasi-regular
polyhedron. The second is its dual, which in
each case is a zonohedron. The third is their compound.
octahedron
cube
compound of octahedron
and dual
cuboctahedron
rhombic dodecahedron
compound of cuboctahedron
and dual
icosidodecahedron
rhombic triacontahedron
compound of icosidodecahedron
and dual
dodecadodecahedron
medial rhombic triacontahedron
compound of
dodecadodecahedron and dual
great icosidodecahedron
great rhombic triacontahedron
compound
of great icosidodecahedron and dual
B) Parallelepipeds
"random parallelepiped"
random rhombic parallelepiped
"pointy-shaped" rhombic parallelepiped
"flat-shaped" rhombic parallelepiped
right parallelepiped.
cube.
C) Other Zonohedra
"random" zonohedron with 42 faces
rhombic enneacontahedron
20-zone polar zonohedron
zonohedrifiation
of the truncated tetrahedron, 12 zones
zonohedrification of the
truncated cube, 12 zones
zonohedrification
of the truncated octahedron, 12 zones
zonohedrification of
the rhombicuboctahedron, 12 zones
zonohedrification
of the truncated cuboctahedron, 24 zones
zonohedrification of the snub
cube, 24-zones
zonohedrification
of the truncated icosahedron, 30 zones
zonohedrification
of the truncated dodecahedron, 30 zones
zonohedrification
of the rhombicoidodecahedron, 30 zones
7-zone truncated rhombic dodecahedron
10 zoner, based on 2-fold and 3-fold
octahedral axes
13 zoner, based on all the octahedral
symmetry axes
16 zoner, based on 3-fold and
5-fold icosahedral axes
21 zoner, based on 2-fold and
5-fold icosahedral axes
25 zoner, based on 2-fold and
3-fold icosahedral axes
31 zoner, based on all the
icosahedral symmetry axes
36 zoner, based on three mutually orthogonal
24-gons