Anatomy of a circle

A single sample of the system places a white circle at 50% of the size of the blue circle (NOTE: in PUBG, the white circle is not always 50% of the size of the size of the blue circle) at random so that all points in the white circle are inside the blue circle. Then all points on the grid are measured. Any point that's inside the circle gets +1, and a point on the circle that is within 10% of the white circle is given a score relative to how far away it is from the white circle... a point that's on the edge is given close to +1, while one that's almost 10% away will be given +.001. This means that the system considers a 10% walk bad but not as bad as being far outside the circle. The system then does 500 of these samples (You'd need an infinite number to get a perfect distribution) and averages the result.

The especially dedicated of you will be able to use the raw data for your purposes if you'd like. It's in standard array form, from 0 which is the center of the circle to 125 which is the edge. Numbers are from 0 to 1.00, indicating percent chance.

[1.0, 1.0, 1.0, 1.0, 0.9999367313180128, 0.9986404468150297, 0.9970413890752267, 0.995113502325604, 0.9928082479980698, 0.9902005835117921, 0.9872630616561682, 0.9840517890504134, 0.980550347101407, 0.976553373461051, 0.9722076357532587, 0.967497357602761, 0.9624246823734766, 0.9571053336424826, 0.9516286343692278, 0.94612357222627, 0.9407229669896956, 0.9351254547203942, 0.9293068520253042, 0.9234650680390144, 0.9172852087874577, 0.9111021186580143, 0.9048436671147936, 0.8986170829460849, 0.8924811167848394, 0.8865279562340171, 0.8803561071082144, 0.8740642539785674, 0.867617921149537, 0.8611190868941291, 0.8546409766846468, 0.8481466916913553, 0.8412188488455817, 0.8341361792215811, 0.826944717224755, 0.8195449689849721, 0.8121616818250323, 0.8046010036794278, 0.7966967577794173, 0.7882955805228881, 0.7797515899426074, 0.7714901278368425, 0.7631641541111494, 0.7545039916521514, 0.7455645559559572, 0.7367590994025525, 0.727687751237992, 0.7186881080658174, 0.7096392660572113, 0.7000650649342615, 0.6901191713892423, 0.6799958634421038, 0.669942416612496, 0.6597746046913181, 0.6489098657274684, 0.6373192821980416, 0.6254231604025522, 0.6128062049525267, 0.5997092962313659, 0.5859478383220381, 0.5710726357010453, 0.5549653723300081, 0.5370917021794863, 0.5181951879558349, 0.4984268877575565, 0.4782120650415187, 0.4578039695918819, 0.4372641244027901, 0.4170399133828898, 0.39686358062421734, 0.37680106643345435, 0.35706027882331814, 0.3380415118674604, 0.32008991127277, 0.30416243199182236, 0.28985224150807093, 0.2766982693653634, 0.2643330379739441, 0.2525761657747727, 0.24175046732113556, 0.2316646714857039, 0.22210055626049516, 0.21338052571865107, 0.20483676039106707, 0.19630003872046514, 0.188049233533329, 0.18003022394445328, 0.1722590509191713, 0.16451144754472327, 0.157073587160444, 0.14996928704575263, 0.14303265575675397, 0.13617689735512278, 0.12951755823322728, 0.12294748144283735, 0.11640475682488924, 0.11021337560132562, 0.10452085691979036, 0.09887123516247254, 0.09362315185266604, 0.08883675365821729, 0.0842586573972055, 0.07983689493438158, 0.0756189788389928, 0.07149671399274461, 0.06735517075615018, 0.06333528201432212, 0.059522108553952104, 0.05610825850114541, 0.05264938373617037, 0.04924432662737739, 0.04572853873243959, 0.04214377271782955, 0.038624695483886834, 0.03528240753642006, 0.032025514336693706, 0.028837335410834088, 0.025685864551187834, 0.022743820972404113, 0.019932164374972274, 0.017281786260247695]