[{"Rank": 0, "Code": 18, "Probability": 0.7302086643842682}, {"Rank": 1, "Code": 1, "Probability": 0.7122983852197481}, {"Rank": 2, "Code": 11, "Probability": 0.7120884002465787}, {"Rank": 3, "Code": 14, "Probability": 0.7096903606249246}, {"Rank": 4, "Code": 24, "Probability": 0.7079389948188851}, {"Rank": 5, "Code": 4, "Probability": 0.7023902669627826}, {"Rank": 6, "Code": 15, "Probability": 0.6953675124137519}, {"Rank": 7, "Code": 20, "Probability": 0.6923927481347771}, {"Rank": 8, "Code": 22, "Probability": 0.6886118908972776}, {"Rank": 9, "Code": 16, "Probability": 0.6813052618341531}, {"Rank": 10, "Code": 6, "Probability": 0.6727492312808395}, {"Rank": 11, "Code": 7, "Probability": 0.6396941323381355}, {"Rank": 12, "Code": 10, "Probability": 0.6270392173722839}, {"Rank": 13, "Code": 0, "Probability": 0.6191690727511295}, {"Rank": 14, "Code": 2, "Probability": 0.6183911528197579}, {"Rank": 15, "Code": 9, "Probability": 0.6138341097188824}, {"Rank": 16, "Code": 23, "Probability": 0.611980769194973}, {"Rank": 17, "Code": 3, "Probability": 0.6020143330948899}, {"Rank": 18, "Code": 13, "Probability": 0.5720714521058132}, {"Rank": 19, "Code": 21, "Probability": 0.5656053708769063}, {"Rank": 20, "Code": 17, "Probability": 0.4895971641229604}, {"Rank": 21, "Code": 19, "Probability": 0.4829304678762881}, {"Rank": 22, "Code": 12, "Probability": 0.4527270219275521}, {"Rank": 23, "Code": 8, "Probability": 0.4198495685245436}, {"Rank": 24, "Code": 5, "Probability": 0.2697913356157319}]