Images . Rhombicosidodecahedron from Biscribed Pentakis Dodecahedron for the case of trisection of its 1st-order segments
[size=85] Elements in polyhedron Biscribed Pentakis Dodecahedron(1)[br][b]Vertices:[/b] V = 120.[br][b]Faces:[/b] F =122. 20{3}+(30+60){4}+12{5}[br][b]Edges:[/b] E =240. 60+60+60+60- The order of the number of edges in this polyhedron are according to their length.[/size]
[size=85] If we assume that all quadrilaterals lie in the same plane, then our polyhedron approximately looks like[br]ht[url=https://robertlovespi.net/2014/06/02/zonish-versions-of-the-rhombicosidodecahedron/]tps://robertlovespi.net/2014/06/02/zonish-versions-of-the-rhombicosidodecahedron/[/url][br][br]Elements in polyhedron Biscribed Pentakis Dodecahedron(1)[br][b]Vertices:[/b] V =120.[br][b]Faces [/b]F =62. 20{3}+(30){8}+12{5}[br][b]Edges:[/b] E =180. 60+60+60- The order of the number of edges in this polyhedron according to their length.[/size]
[size=85] The elements of the [b]dual[/b] to the Biscribed Pentakis Dodecahedron(1):[br][b]Vertices:[/b] V = 122.[br][b]Faces: [/b]F =240. 240{3} [br][b]Edges: [/b]E =360. 60+60+60+60+120- The order of the number of edges in this polyhedron are according to their length.[/size]
