[size=85]Generating Elements of mesh modeling the surfaces of polyhedron, its dual image and the coloring of their edges and faces can be found in the [url=https://www.geogebra.org/m/subjtdqg]applet[/url]. [/size]

[size=85]The elements of the Biscribed Pentakis Dodecahedron(5). [br][b]Vertices: [/b] V = 120.[br][b]Faces: [/b] F =152. 80{3}+60{4}+12{5}.[br][b]Edges: [/b] E =270. 30+120+60+60- The order of the number of edges in this polyhedron are according to their length.[br][/size]

[size=85]The elements of the[b] dual[/b] to the Biscribed Pentakis Dodecahedron(5).[br][b]Vertices:[/b] V =152.[br][b]Faces:[/b] F =240. 180{3}+60{4}.[br][b]Edges:[/b] E =390. 60+30+120+60+60+60 The order of the number of edges in this polyhedron are according to their length.[/size][br]