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.

Cuboctahedron

Number of faces: 14

Number of edges: 24

Number of vertices: 12

Icosidodecahedron

Number of faces: 32

Number of edges: 60

Number of vertices: 30

Truncated Tetrahedron

Number of faces: 8

Number of edges: 18

Number of vertices: 12

Truncated Octahedron

Number of faces: 14

Number of edges: 36

Number of vertices: 24

Truncated Cube

Number of faces: 14

Number of edges: 36

Number of vertices: 24

Truncated Icosahedron

(soccer ball or football)

Number of faces: 32

Number of edges: 90

Number of vertices: 60

Truncated Dodecahedron

Number of faces: 32

Number of edges: 90

Number of vertices: 60

Rhombicuboctahedron

Number of faces: 26

Number of edges: 48

Number of vertices: 24

Truncated Cuboctahedron

Number of faces: 26

Number of edges: 72

Number of vertices: 48

Rhombicosidodecahedron

Number of faces: 62

Number of edges: 120

Number of vertices: 60

Truncated Icosidodecahedron

Number of faces: 62

Number of edges: 180

Number of vertices: 120

Snub Cube

Number of faces: 38

Number of edges: 60

Number of vertices: 24

Snub Dodecahedron

Number of faces: 92

Number of edges: 150

Number of vertices: 60