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Pictures of Archimedean Solids


The thirteen Archimedean polyhedra are semi-regular convex polyhedra composed of two or more types of regular polygons meeting in identical vertices.
For nets click on the links to the right of the pictures.


Paper Model Cuboctahedron

Cuboctahedron
Number of faces: 14
Number of edges: 24
Number of vertices: 12

icosidodecahedron

Icosidodecahedron
Number of faces: 32
Number of edges: 60
Number of vertices: 30

Paper Model Truncated Tetrahedron truncated tetrahedron

Truncated Tetrahedron
Number of faces: 8
Number of edges: 18
Number of vertices: 12




Paper model truncated octahedron

Truncated Octahedron
Number of faces: 14
Number of edges: 36
Number of vertices: 24

Paper model truncated cube

Truncated Cube
Number of faces: 14
Number of edges: 36
Number of vertices: 24

Paper model truncated icosahedron (football) black and white football (truncated icosahedron)

Truncated Icosahedron
(football)
Number of faces: 32
Number of edges: 90
Number of vertices: 60

Paper model truncated dodecahedron

Truncated Dodecahedron
Number of faces: 32
Number of edges: 90
Number of vertices: 60




Paper Model Rhombicuboctahedron

Rhombicuboctahedron
Number of faces: 26
Number of edges: 48
Number of vertices: 24

Paper Model Truncated Cuboctahedron

Truncated Cuboctahedron
Number of faces: 26
Number of edges: 72
Number of vertices: 48

Paper Model Rhombicosidodecahedron

Rhombicosidodecahedron
Number of faces: 62
Number of edges: 120
Number of vertices: 60

Paper Model Truncated Icosidodecahedron

Truncated Icosidodecahedron
Number of faces: 62
Number of edges: 180
Number of vertices: 120

Paper Model Snub Cube Paper Model Snub Cube (miror image)

Snub Cube
Number of faces: 38
Number of edges: 60
Number of vertices: 24

Paper Model Snub Dodecahedron

Snub Dodecahedron
Number of faces: 92
Number of edges: 150
Number of vertices: 60






Archimedean Solids:
Archimedean Solids


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