Dual Geodesic Icosahedra (Page 2)

The polyhedra on this page are dual geodesic icosahedra with 392 or more faces. They are sometimes called Goldberg polyhedra, after Michael Goldberg, who described them in 1937 [1].

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Dual Geodesic Icosahedron Pattern 16 [5,2]

Dual Geodesic Icosahedron Pattern 17 [6,1]

Dual Geodesic Icosahedron Pattern 18 [4,4]

Dual Geodesic Icosahedron Pattern 19 [7,0]

Dual Geodesic Icosahedron Pattern 20 [5,3]

Dual Geodesic Icosahedron Pattern 21 [6,2]

Dual Geodesic Icosahedron Pattern 22 [7,1]

Dual Geodesic Icosahedron Pattern 23 [5,4]

Dual Geodesic Icosahedron Pattern 24 [6,3]

Dual Geodesic Icosahedron Pattern 25 [8,0]

Dual Geodesic Icosahedron Pattern 26 [7,2]

Dual Geodesic Icosahedron Pattern 27 [8,1]

Dual Geodesic Icosahedron Pattern 28 [5,5]

Dual Geodesic Icosahedron Pattern 29 [6,4]

Dual Geodesic Icosahedron Pattern 30 [7,3]

References:[1]Michael Goldberg, A Class of Multi-Symmetric Polyhedra, Tohoku Mathematical Journal 43 (1937), 104-108.