Snub polyhedron

Class	Number and properties
Polyhedron
Platonic solids	(5, convex, regular)
Archimedean solids	(13, convex, uniform)
Kepler–Poinsot polyhedra	(4, regular, non-convex)
Uniform polyhedra	(75, uniform)
Prismatoid: prisms, antiprisms etc.	(4 infinite uniform classes)
Polyhedra tilings	(11 regular, in the plane)
Quasi-regular polyhedra	(8)
Johnson solids	(92, convex, non-uniform)
Pyramids and Bipyramids	(infinite)
Stellations	Stellations
Polyhedral compounds	(5 regular)
Deltahedra	(Deltahedra, equilateral triangle faces)
Snub polyhedra	(12 uniform, not mirror image)
Zonohedron	(Zonohedra, faces have 180°symmetry)
Dual polyhedron
Self-dual polyhedron	(infinite)
Catalan solid	(13, Archimedean dual)

A snub polyhedron is a polyhedron obtained by adding extra triangles around each vertex.

Chiral snub polyhedra do not have reflection symmetry and hence have two enantiomorphous forms which are reflections of each other. Their symmetry groups are all point groups and are one of:

O - chiral octahedral symmetry;the rotation group of the cube and octahedron; order 24.
I - chiral icosahedral symmetry; the rotation group of the icosahedron and the dodecahedron; order 60.

Snub cube Snic V 24,E 60,F 38=(8+24){3}+6{4} χ=2, group=O, 1/2B₃, [4,3]⁺, (432), order 24 \| 2 3 4 - 3.3.3.3.4 W17, U12, K17, C24	Snub dodecahedron Snid V 60,E 150,F 92=(20+60){3}+12{5} χ=2, group=I, 1/2H₃, [5,3]⁺, (532), order 60 \| 2 3 5 - 3.3.3.3.5 W18, U29, K34, C32	Inverted snub dodecadodecahedron Isdid V 60,E 150,F 84=60{3}+12{5}+12{5/2} χ=−6, group=I, [5,3]⁺, 532 \| 5/3 2 5 - 3.3.5.3.5/3 W114, U60, K65, C76
Great snub dodecicosidodecahedron Gisdid V 60,E 180,F 104=(20+60){3}+(12+12){5/2} χ=−16, group=I, [5,3]⁺, 532 \| 5/3 5/2 3 - 3.3.3.5/2.3.5/3 W115, U64, K69, C80	Great inverted snub icosidodecahedron Gisid V 60,E 150,F 92=(20+60){3}+12{5/2} χ=2, group=I, [5,3]⁺, 532 \| 5/3 2 3 - 3⁴.5/3 W116, U69, K74, C73	Snub icosidodecadodecahedron Sided V 60,E 180,F 104=(20+60){3}+12{5}+12{5/2} χ=−16, group=I, [5,3]⁺, 532 \| 5/3 3 5 - 3.3.3.5.3.5/3 W112, U46, K51, C58
Snub dodecadodecahedron Siddid V 60,E 150,F 84=60{3}+12{5}+12{5/2} χ=−6, group=I, [5,3]⁺, 532 \| 2 5/2 5 - 3.3.5/2.3.5 W111, U40, K45, C49	Great retrosnub icosidodecahedron Girsid V 60,E 150,F 92=(20+60){3}+12{5/2} χ=2, group=I, [5,3]⁺, 532 \| 2 3/2 5/3 - (3⁴.5/2)/2 W117, U74, K79, C90 Great inverted retrosnub icosidodecahedron	Great snub icosidodecahedron Gosid V 60,E 150,F 92=(20+60){3}+12{5/2} χ=2, group=I, [5,3]⁺, 532 \| 2 5/2 3 - 3⁴.5/2 W113, U57, K62, C88

The reflexible snub polyhedron where two polygons share the same the same facial planes. They have reflection symmetry across these planes and symmetry group I_h.

Small snub icosicosidodecahedron Seside V 60,E 180,F 112=(40+60){3}+12{5/2} χ=−8, group=I_h, [5,3], *532 \| 5/2 3 3 - 3⁵.5/2 W110, U32, K37, C41	Small retrosnub icosicosidodecahedron Sirsid V 60,E 180,F 112=(40+60){3}+12{5/2} χ=−8, group=I_h, [5,3], *532 \| 3/2 3/2 5/2 - (3⁵.5/3)/2 W118, U72, K77, C91 Small inverted retrosnub icosicosidodecahedron

Great dirhombicosidodecahedron Gidrid V 60,E 240,F 124=40{3}+60{4}+24{5/2} χ=−56, group=I_h, [5,3], *532 \| 3/2 5/3 3 5/2 - 4.5/3.4.3.4.5/2.4.3/2 W119, U75, K80, C92

Nonuniform snubs

Two of the Johnson solids are also called snubs: the snub disphenoid (symmetry group D_2d) and the snub square antiprism (symmetry group D_4d). Each is formed by splitting a polyhedron in two (along existing edges) and filling the gap with triangles. Neither is chiral.

Snub cube Snic V 24,E 60,F 38=(8+24){3}+6{4} χ=2, group=O, 1/2B₃, [4,3]⁺, (432), order 24 \| 2 3 4 - 3.3.3.3.4 W17, U12, K17, C24	Snub dodecahedron Snid V 60,E 150,F 92=(20+60){3}+12{5} χ=2, group=I, 1/2H₃, [5,3]⁺, (532), order 60 \| 2 3 5 - 3.3.3.3.5 W18, U29, K34, C32	Inverted snub dodecadodecahedron Isdid V 60,E 150,F 84=60{3}+12{5}+12{5/2} χ=−6, group=I, [5,3]⁺, 532 \| 5/3 2 5 - 3.3.5.3.5/3 W114, U60, K65, C76
Great snub dodecicosidodecahedron Gisdid V 60,E 180,F 104=(20+60){3}+(12+12){5/2} χ=−16, group=I, [5,3]⁺, 532 \| 5/3 5/2 3 - 3.3.3.5/2.3.5/3 W115, U64, K69, C80	Great inverted snub icosidodecahedron Gisid V 60,E 150,F 92=(20+60){3}+12{5/2} χ=2, group=I, [5,3]⁺, 532 \| 5/3 2 3 - 3⁴.5/3 W116, U69, K74, C73	Snub icosidodecadodecahedron Sided V 60,E 180,F 104=(20+60){3}+12{5}+12{5/2} χ=−16, group=I, [5,3]⁺, 532 \| 5/3 3 5 - 3.3.3.5.3.5/3 W112, U46, K51, C58
Snub dodecadodecahedron Siddid V 60,E 150,F 84=60{3}+12{5}+12{5/2} χ=−6, group=I, [5,3]⁺, 532 \| 2 5/2 5 - 3.3.5/2.3.5 W111, U40, K45, C49	Great retrosnub icosidodecahedron Girsid V 60,E 150,F 92=(20+60){3}+12{5/2} χ=2, group=I, [5,3]⁺, 532 \| 2 3/2 5/3 - (3⁴.5/2)/2 W117, U74, K79, C90 Great inverted retrosnub icosidodecahedron	Great snub icosidodecahedron Gosid V 60,E 150,F 92=(20+60){3}+12{5/2} χ=2, group=I, [5,3]⁺, 532 \| 2 5/2 3 - 3⁴.5/2 W113, U57, K62, C88

Nonuniform snubs

See also