Images . Polyhedron(V=120) from Biscribed Pentakis Dodecahedron for the case of trisection of its 6th-order segments
![Image](https://beta.geogebra.org/resource/sczjrs6h/3YJk3YRbun2DABKp/material-sczjrs6h.png)
The elements of the Biscribed Pentakis Dodecahedron(6).
Vertices: V = 120.
Faces: F =152. 120{3}+12{5}+20{6}.
Edges: E =270. 30+60+120+60- The order of the number of edges in this polyhedron according to their length.
![Image](https://beta.geogebra.org/resource/fsnjwgey/jX4EAN1HkuG2d658/material-fsnjwgey.png)
![Image](https://beta.geogebra.org/resource/e45gpbdb/4SRceOzfL08YCume/material-e45gpbdb.png)
![Image](https://beta.geogebra.org/resource/pvgjafuh/pw5oQQMrmvMykvOA/material-pvgjafuh.png)
![Image](https://beta.geogebra.org/resource/ey3sqbpg/QZkRk3XXInTdPmdb/material-ey3sqbpg.png)
The elements of the dual to the Biscribed Pentakis Dodecahedron(6).
Vertices: V =152.
Faces: F =240. 180{3}+60{4}.
Edges: E =390. 120+60+60+60+60+30- The order of the number of edges in this polyhedron are according to their length.
![Image](https://beta.geogebra.org/resource/heu8mduw/SBxvDWdidVQjOZFW/material-heu8mduw.png)
![Image](https://beta.geogebra.org/resource/uffh8vda/QlCOoJoJPpk2V0Ji/material-uffh8vda.png)
![Image](https://beta.geogebra.org/resource/jynpyvdt/zPFgU4QZWIdx881r/material-jynpyvdt.png)