Waterman's Polyhedral Muration chart
copyright by Steve Waterman June 2010
Note: To view WRL files, download the latest version of Cortona from here
All Polyhedron Volumes = the shortest edge3
times the volume / √e values below.
SYMMETRY C2v
WATERMAN SOLIDS rhombic dodcahedral swept from 1,1,1/2
Click on blue numbers to view polyhedron.
Conway Dual Geodesicized Zonohedrified
√ |
name |
C |
D |
G |
Z |
√e |
total volume |
||
|---|---|---|---|---|---|---|---|---|---|
√3 |
10 2/3 |
||||||||
√3 |
22 2/3 |
||||||||
√3 |
42 2/3 |
||||||||
√3 |
82 2/3 |
||||||||
√3 |
96 |
||||||||
√3 |
114 2/3 |
||||||||
√3 |
160 |
||||||||
√3 |
188 |
||||||||
√3 |
242 2/3 |
||||||||
√3 |
317 1/3 |
||||||||
√3 |
332 |
||||||||
√3 |
382 2/3 |
||||||||
√3 |
438 2/3 |
||||||||
√3 |
460 |
||||||||
√3 |
570 2/3 |
||||||||
√3 |
602 2/3 |