31 great circles of the spherical icosahedron geometry , the 31 great circles of the spherical icosahedron circles in icosahedral symmetry . It was first identified by Buckminster Fuller and is used in construction of geodesic domes .Construction The 31 great circles can be seen in 3 sets: 15 , 10, and 6 , each representing edges of a polyhedron projected onto a sphere . Fifteen great circles represent the edges of a disdyakis triacontahedron , the dual of a truncated icosidodecahedron . Six more great circles represent the edges of an icosidodecahedron , and the last ten great circles come from the edges of the uniform star dodecadodecahedron , making pentagrams with vertices at the edge centers of the icosahedron .intersection , positioned at the 12 vertices, and center of the 30 edges, and 20 faces of a regular icosahedron .Images The 31 great circles are shown here in 3 directions, with 5-fold, 3-fold, and 2-fold symmetry. There are 4 types of right spherical triangles by the intersected great circles, seen by color in the right image.
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