[size=85]A polyhedron is constructed whose V=120 vertices are the points of the trisection of the segments the same length 6th-order(g=6) of the [url=https://www.geogebra.org/m/hczvuvhg]Biscribed Pentakis Dodecahedron[/url]. [br] Geometric Constructions are in [url=https://www.geogebra.org/m/p4a5zccm]Applet[/url]: Series of polyhedra obtained by trisection (truncation) different segments of the original polyhedron, and the resulting polyhedra in [url=https://www.geogebra.org/m/uej4qnte]Applet[/url]: Serie of polyhedra obtained by trisection (truncation) segments of the Biscribed Pentakis Dodecahedron.[br][img]data:image/png;base64,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[/img][/size]