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I have a set of points on the plane (300 000 points). How do I find a polygon with equal cosines of angles and equal sides where vertices of polygon are some of points? The more number of sides and more lengths of sides the better.

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Sounds more like a question for math.stackexchange.com – DeCaf Oct 15 '11 at 19:38
It is not hypothetical exercise. I have input file with 300 000 points and i have to find points that are vertices of some polygon with specified proprties)) – dmak Oct 15 '11 at 19:45
Which part are you having trouble with? Calculating the angles? Closing the polygon? Or something else? – Robert Harvey Oct 15 '11 at 19:46
Also, if this is homework, you might as well disclose that now, as our responses have to be more measured if this is homework. – Robert Harvey Oct 15 '11 at 19:47
hmm! ignoring roundoff precision (if you needed to code it)... for N points there are 2^N possible subsets, each of which might make a polygon. Could omit a few, the 0, 1, and 2-point subsets, but still a lot. Interesting to note that a regular hexagon includes 2 triangles, and a dodecagon (12-gon) includes 4 triangles, or 3 squares, or 2 hexagons. Feels like you could "bin" the subsets into prime-numbers of points, and then build up in multiples. Any even N-gon is composed of N/2 point pairs with matching diameters. Interesting! – david van brink Oct 15 '11 at 19:48
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