Citations:hexacontahedron

English citations of hexacontahedron

• 1990, Marcel Pierrot, Structure and Properties of Molecular Crystals, page 91:

  More precisely we are in presence of a semi-regular Catalan polyhedron: the hexacontahedron with 60 triangular faces and 32 vertices.

• 2012, Innovative Methods for Science Education, Frank & Timme, page 132:

  The outcome of this project was the construction of the rhombic hexacontahedron first as a solid made from a net (Fig. 1) and secondly as a sculpture made from slide-togethers (Fig. 2).

• 2012, A. Loeb, Space Structures, page 87:

  A pentakis dodecahedron has five times twelve-i.e., sixty-faces, but is distinguished from other hexacontahedra (hexaconta = 60) by the identification of five faces for each original pentagonal face of the dodecahedron.

• 2013, Marjorie Senechal, Shaping Space, page 71:

  Figure 5.8. Schlegel diagrams of (left) a pentagonal icositetrahedron (dual of snub cube) and (right) a pentagonal hexacontahedron (dual of the snub dodecahedron).

• 2022, Klaus D. Sattler, 21st Century Nanoscience: A Handbook (Ten-Volume Set):

  […] the pentagonal hexacontahedron (dual of the snub dodecahedron), […]

• 2023, Efraín Soto Apolinar, Illustrated Glossary for School Mathematics, page 353:

  60: hexacontahedron (also hexecontahedron).