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Re: [Visualpython-users] covering a sphere with patches
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From: Anton S. <br...@po...> - 2012-04-18 04:27:08
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On 2012-4-17 10:12, Joe Heafner wrote: > Can someone direct me to an algorithm for covering a sphere with > patches of equal area for the purposes of illustrating the surface > integral in Gauss's law? I've tried three so far and can't get > good results. The problem is mostly with the poles and in the > foreshortening of the patches near the poles. Is there a standard > algorithm for this somewhere? Rectangular surfaces are easy. The key thing to remember is that equally spaced parallel planes cut the sphere into bands of equal area. http://maths.anu.edu.au/~leopardi/Leopardi-Sphere-PhD-Thesis.pdf (5.8MB) gives a partition of the sphere into relatively compact "rectangles" of equal area. I think it even covers spheres of higher dimension. -- Anton Sherwood *\\* www.bendwavy.org *\\* www.zazzle.com/tamfang |
