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My less-than-perfect results from guesstimating the angles for my geodesic panel dome model led me to think about how I could have gotten it exactly right the first time. Clearly I have not studied enough solid geometry. The first part of solving a problem is stating it correctly. Looking at the partial model, the completed state would appear to have twelve pentagonal junctions making it a dodecahedron. If I wanted to achieve best symmetry, what I think I would want is to have all the vertices at the same distance from the center. This approach seems fairly straightforward: all I have to do is arrange to have the center vertex of each pentagon and each of the vertices at the outside tips of each triangle at the same distance from the center of the dodecahedron. With a little bit of trigonometry, the included angle between the 5 triangles of the pentagon falls out. This may not be the correct approach, but one trial would tell. My stumbling block is that I don't have a shortcut for calculating the distance from the center of the icosahedron to the surface. (Perhaps with a bit of study of the incomplete model one will become obvious, but I haven't tried really hard yet.) So, how do I solve this little problem of solid geometry? And what is everyone else contending with, either from a position of knowledge or (as in my case) ignorance seeking enlightenment?
1 responses total.
It looks like its worked out at http://www.nas.com/~kunkel/dodec/dodec.htm
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