This category consists of compounds of the left and right handed forms of the chiral snubs. Disco has cubic symmetry with 48 vertices, all others have doic symmetry with 120 vertices. All of these are orientable.

**C68. Disco** - (DIS co) disnub cuboctahedron. Faces are 12 squares (paired), 20 triangles (paired) and 48 snub triangles. It is a compound of 2 snics.

**C69. Dissid** - (DIS sid) disnub icosidodecahedron. Faces are 24 pentagons (paired), 40 triangles (paired) and 120 snub triangles. It is a compound of 2 snids.

**C70. Disdid** - (DIS did) disnub dodecadodecahedron. Faces are 24 stars (paired), 24 pentagons (paired) and 120 snub triangles. It is a compound of 2 siddids.

**C71. Giddasid** - (GID a sid) great disnub icosidodecahedron. Faces are 24 stars (paired), 40 triangles (paired), and 120 snub triangles. It is a compound of 2 gosids.

**C72. Idisdid** - (ID iss did) inverted disnub dodecadodecahedron. Faces are 24 stars (paired), 24 pentagons (paired), and 120 snub triangles. It is a compound of 2 isdids.

**C73. Gidsid** - (GID sid) great inverted disnub icosidodecahedron. Faces are 24 stars (paired), 40 triangles (paired), and 120 snub triangles. It is a compound of 2 gisids.

**C74. Desided** - (dee SI did) disnub icosidodecadodecahedron. Faces are 24 stars (paired), 40 triangles (paired), 24 pentagons (paired), and 120 snub triangles. It is a compound of 2 sideds.

**C75. Gidrissid** - (gid DRISS sid) great inverted diretrosnub icosidodecahedron. Faces are 24 stars (paired), 40 triangles (paired), and 120 snub triangles. It is a compound of 2 girsids.

Category C9: Octahedral Continuums . . . Polyhedron Page . . .