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Truncated Dodecahedron (V=60) from Biscribed Pentakis Dodecahedron for the case of trisection of its 2nd-order segments

A polyhedron is constructed whose V=60 vertices are the points of the trisection of the segments the same length 2nd-order (g=2) of the Biscribed Pentakis Dodecahedron. Geometric Constructions are in Applet: Series of polyhedra obtained by trisection (truncation) different segments of the original polyhedron, and the resulting polyhedra in Applet: Serie of polyhedra obtained by trisection (truncation) segments of the Biscribed Pentakis Dodecahedron.
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1. Generating Elements of mesh modeling the surfaces of convex polyhedron and its dual image

2. Coloring edges and faces of polyhedra

Properties of polyhedra

Properties of polyhedra
Truncated Dodecahedron Vertices: 60 (60[3]) Faces: 32 (20 equilateral triangles + 12 regular decagons) Edges: 90 ---------------------------------------------------- Its dual: Vertices: 32 (20[6] + 12[5]) Faces: 60 (isosceles triangles) Edges: 90 (60 short + 30 long)