[{"Rank": 0, "Code": 13, "Probability": 0.6936248891812096}, {"Rank": 1, "Code": 17, "Probability": 0.6442761818061045}, {"Rank": 2, "Code": 1, "Probability": 0.64391792026291}, {"Rank": 3, "Code": 3, "Probability": 0.6416430128692794}, {"Rank": 4, "Code": 5, "Probability": 0.6221317512546243}, {"Rank": 5, "Code": 2, "Probability": 0.6216112288350757}, {"Rank": 6, "Code": 0, "Probability": 0.6039249169490193}, {"Rank": 7, "Code": 7, "Probability": 0.524164671356514}, {"Rank": 8, "Code": 4, "Probability": 0.5188851220667079}, {"Rank": 9, "Code": 14, "Probability": 0.5043077441383843}, {"Rank": 10, "Code": 9, "Probability": 0.4946829676527328}, {"Rank": 11, "Code": 11, "Probability": 0.48544160013499194}, {"Rank": 12, "Code": 22, "Probability": 0.48519630964488014}, {"Rank": 13, "Code": 16, "Probability": 0.47651440863310746}, {"Rank": 14, "Code": 18, "Probability": 0.4619286016256482}, {"Rank": 15, "Code": 19, "Probability": 0.4439442862413153}, {"Rank": 16, "Code": 15, "Probability": 0.4068437476554837}, {"Rank": 17, "Code": 8, "Probability": 0.3901492085896462}, {"Rank": 18, "Code": 21, "Probability": 0.3875237233922494}, {"Rank": 19, "Code": 10, "Probability": 0.38246463932545527}, {"Rank": 20, "Code": 12, "Probability": 0.3284297494610421}, {"Rank": 21, "Code": 6, "Probability": 0.31783219176045674}, {"Rank": 22, "Code": 20, "Probability": 0.30637511081879043}]