Let S be a set of 31 equally spaced points on a circle centered at O,

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Let S be a set of 31 equally spaced points on a circle centered at O, and consider a uniformly random pair of distinct points A and B (A,B∈S). The probability that the perpendicular bisectors of OA and OB intersect strictly inside the circle can be expressed as m/n, where m,n are relatively prime positive integers. Find m+n.

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