| rdfs:comment
| - Regular polytopes and uniform prismatic names proposed by Jonathan Bowers Every regular polytope below can be replaced by a convex uniform polytope.
* 2D
* {p} - polygon
* 3D:
* {p,q} - polyhedron
* {} x {p} - prism
* 4D:
* {p,q,r} - polychoron
* {} x {p,q} - hedrism
* {p} x {q} - duoprism
* 5D:
* {p,q,r,s} - polyteron
* {} x {p,q,r} - chorism
* {p} x {q,r} - gonahedrism
* {} x {p} x {q} - duoprismism
* 6D:
* {p,q,r,s,t} - polypeton
* {} x {p,q,r,s} - terism
* {p} x {p,r,s} - gonachorism
* {p,q} x {r,s} - duohedrism
* {} x {p} x {q,r} – gonahedrismism
* {p} x {q} x {r} – triprism
* 7D:
* {p,q,r,s,t,u} - polyexon
* {} x {p,q,r,s,t} - petism
* {p} x {q,r,s,t} - gonaterism
* {p,q} x
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| abstract
| - Regular polytopes and uniform prismatic names proposed by Jonathan Bowers Every regular polytope below can be replaced by a convex uniform polytope.
* 2D
* {p} - polygon
* 3D:
* {p,q} - polyhedron
* {} x {p} - prism
* 4D:
* {p,q,r} - polychoron
* {} x {p,q} - hedrism
* {p} x {q} - duoprism
* 5D:
* {p,q,r,s} - polyteron
* {} x {p,q,r} - chorism
* {p} x {q,r} - gonahedrism
* {} x {p} x {q} - duoprismism
* 6D:
* {p,q,r,s,t} - polypeton
* {} x {p,q,r,s} - terism
* {p} x {p,r,s} - gonachorism
* {p,q} x {r,s} - duohedrism
* {} x {p} x {q,r} – gonahedrismism
* {p} x {q} x {r} – triprism
* 7D:
* {p,q,r,s,t,u} - polyexon
* {} x {p,q,r,s,t} - petism
* {p} x {q,r,s,t} - gonaterism
* {p,q} x {r,s,t} - hedrochorism
* {} x {p} x {q,r,s} - gonachorismism
* {} x {p,q} x {r,s} - duohedrismism
* {p} x {q} x {r,s} - duogonahedrism
* {} x {p} x {q} x {r} – triprismism
* ...
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