I have been given what must surely be the largest model yet made of my dodecahedron whose adjacent faces meet at right angles, except on one edge where they meet at 45°.
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I have been given what must surely be the largest model yet made of my dodecahedron whose adjacent faces meet at right angles, except on one edge where they meet at 45°.
(Yes, I do need to find a better name for it.)
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F myrmepropagandist shared this topic
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I have been given what must surely be the largest model yet made of my dodecahedron whose adjacent faces meet at right angles, except on one edge where they meet at 45°.
(Yes, I do need to find a better name for it.)
Concave polytopes aren't something I've thought about much... it always seemed so overwhelming. How did you find this one? Did you fold an existing hedron?
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Concave polytopes aren't something I've thought about much... it always seemed so overwhelming. How did you find this one? Did you fold an existing hedron?
@futurebird That’s an excellent question. The answer is not terribly easy to convey in written form, but I made an attempt in https://s3.boskent.com/single-angle-polyhedra/g4g-paper.pdf
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@futurebird That’s an excellent question. The answer is not terribly easy to convey in written form, but I made an attempt in https://s3.boskent.com/single-angle-polyhedra/g4g-paper.pdf
This is amazing! Thank you.
