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.

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))
– dmakOct 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 brinkOct 15 '11 at 19:48