Prove that it is impossible to make a football out of exactly 9 squares and (m) octagons,

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Prove that it is impossible to make a football out of exactly 9 squares and $m$ octagons, where $m \geq 4$. (In this context, a "football" is a convex polyhedron in which at least 3 edges meet at each vertex.)

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A Concise Introduction To Pure Mathematics

ISBN: 9781498722926

4th Edition

Authors: Martin Liebeck

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Question Posted: May 19, 2024 12:01 PM

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Prove that it is impossible to make a football out of exactly 9 squares and (m) octagons,

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A Concise Introduction To Pure Mathematics

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