Eb = # of edges on a base
Ef = # of edges on a face
E = # of edges
this formula works only for prisms and pyramids
Eb(Ef-1)=E
This one works for the dodecahedron and icosahedron
Eb(Ef-1)+(2Eb)=E
I need an opinion to know if its relevant
There are difficulties.
For prisms and pyramids, different faces have different numbers of
edges. so "Ef" might have different values.
For the dodecahedron and icosahedron, Ef is well-defined, but what is Eb?
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Searching for a relation between V, E, and F - the numbers of vertices,
edges, and faces of a polyhedron - might be a better way.
--
Christopher J. Henrich
chen...@monmouth.com
htp://www.mathinteract.com
this formula works only for prisms and pyramids
Eb(Ef-1)=E
This one works for the dodecahedron and octahedron
Eb(Ef-1)+(2Eb)=E
For laughs works on the icosahedron
F+10=E