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Great dodecicosacron

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Polyhedron with 60 faces
Great dodecicosacron
Type Star polyhedron
Face
Elements F = 60, E = 120
V = 32 (χ = −28)
Symmetry group Ih, , *532
Index references DU63
dual polyhedron Great dodecicosahedron
3D model of a great dodecicosacron

In geometry, the great dodecicosacron (or great dipteral trisicosahedron) is the dual of the great dodecicosahedron (U63). It has 60 intersecting bow-tie-shaped faces.

Proportions

Each face has two angles of arccos ( 3 4 + 1 20 5 ) 30.480 324 565 36 {\displaystyle \arccos({\frac {3}{4}}+{\frac {1}{20}}{\sqrt {5}})\approx 30.480\,324\,565\,36^{\circ }} and two angles of arccos ( 5 12 + 1 4 5 ) 81.816 127 508 183 {\displaystyle \arccos(-{\frac {5}{12}}+{\frac {1}{4}}{\sqrt {5}})\approx 81.816\,127\,508\,183^{\circ }} . The diagonals of each antiparallelogram intersect at an angle of arccos ( 5 12 1 60 5 ) 67.703 547 926 46 {\displaystyle \arccos({\frac {5}{12}}-{\frac {1}{60}}{\sqrt {5}})\approx 67.703\,547\,926\,46^{\circ }} . The dihedral angle equals arccos ( 44 + 3 5 61 ) 127.686 523 427 48 {\displaystyle \arccos({\frac {-44+3{\sqrt {5}}}{61}})\approx 127.686\,523\,427\,48^{\circ }} . The ratio between the lengths of the long edges and the short ones equals 1 2 + 1 2 5 {\displaystyle {\frac {1}{2}}+{\frac {1}{2}}{\sqrt {5}}} , which is the golden ratio. Part of each face lies inside the solid, hence is invisible in solid models.

References

External links

Weisstein, Eric W. "Great dodecicosacron". MathWorld.

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