I heard there are 48 regular polyhedrons. With what Jan Misali calls regular polyhedrons, are there any more?
Assumptions:
A polyhedron must lie in 3D Euclidean space.
It must be a single connected shape.
It's invalid for two vertices edges or faces to have the exact same location while remaining distinct.
If there are only 48 polyhedrons, what about 4D polytopes?
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