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The Dov problem
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| # Counting Squares Problem | |
| # Code derived from original script by Keith Brafford | |
| # | |
| import itertools | |
| coords = [(0,0), (1,0), (2,0), (3,0), (4,0), | |
| (1.5,.5), (2,.5), (2.5,.5), | |
| (0,1), (1,1),(1.5,1), (2,1), (2.5,1), (3,1), (4,1), | |
| (1.5,1.5), (2,1.5), (2.5,1.5), | |
| (0,2), (1,2), (2,2), (3,2), (4,2), | |
| (1.5,2.5), (2,2.5), (2.5,2.5), | |
| (0,3), (1,3), (1.5,3), (2,3), (2.5,3), (3,3), (4,3), | |
| (1.5,3.5), (2,3.5), (2.5,3.5), | |
| (0,4), (1,4), (2,4), (3,4), (4,4),] | |
| def forms_square(points): | |
| # Create a set of all X and a set of all Y values in the candidate quadrilateral | |
| x,y = map(set, zip(*points)) | |
| if len(x) == 2 and len(y) == 2: | |
| return abs(x.pop() - x.pop()) == abs(y.pop() - y.pop()) | |
| else: | |
| return False | |
| points_iterator = itertools.combinations(coords, 4) | |
| num_squares = 0 | |
| for potential_square in points_iterator: | |
| if forms_square(potential_square): | |
| num_squares += 1 | |
| print num_squares, potential_square | |
| num_squares -= 1 # One known "fake square" | |
| print "%d Squares." % num_squares | |
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