Home > Selection: icosatetrahedra

Icosatetrahedra
(polyhedra with 24 faces)

Paper model pentagonal icositetrahedron

Pentagonal Icositetrahedron
Number of faces: 24
Number of edges: 60
Number of vertices: 38

Paper model dodecadodecahedron

Dodecadodecahedron
Number of faces: 24
Number of edges: 60
Number of vertices: 30

Paper Model Compound of Four Cubes

Compound Of Four Cubes
Number of faces: 24
Number of edges: 48
Number of vertices: 32

Paper model great rhombihexacron Paper model great rhombihexacron

Great Rhombihexacron
Number of faces: 24
Number of edges: 48
Number of vertices: 18

tetrakis hexahedron tetrakis hexahedron (equilateral triangles)

Tetrakis Hexahedron
Number of faces: 24
Number of edges: 36
Number of vertices: 14

icositetrahedron icositetrahedron

Icositetrahedron
Number of faces: 24
Number of edges: 36
Number of vertices: 14

triakis octahedron small triakisoctahedron

Small Triakisoctahedron
Number of faces: 24
Number of edges: 36
Number of vertices: 14

half closed hexagonal kaleidocycle half closed hexagonal kaleidocycle

Half Closed Hexagonal Kaleidocycle
Number of faces: 24
Number of edges: 30
Number of vertices: 12

open hexagonal kaleidocycle open hexagonal kaleidocycle

Open Hexagonal Kaleidocycle
Number of faces: 24
Number of edges: 30
Number of vertices: 12

quarter closed hexagonal kaleidocycle quarter closed hexagonal kaleidocycle

Quarter Closed Hexagonal Kaleidocycle
Number of faces: 24
Number of edges: 30
Number of vertices: 12

seven twelfths closed hexagonal kaleidocycle seven twelfths closed hexagonal kaleidocycle

Seven Twelfths Closed Hexagonal Kaleidocycle
Number of faces: 24
Number of edges: 30
Number of vertices: 12

Paper model hexagonal kaleidocycle Paper model hexagonal kaleidocycle

Hexagonal Kaleidocycle
Number of faces: 24
Number of edges: 30
Number of vertices: 12

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Polyhedra ordered by number of faces

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