[{"Rank": 0, "Code": 1, "Probability": 0.7263717689509169}, {"Rank": 1, "Code": 17, "Probability": 0.7237595997924338}, {"Rank": 2, "Code": 2, "Probability": 0.722827194909637}, {"Rank": 3, "Code": 5, "Probability": 0.6859255773009789}, {"Rank": 4, "Code": 13, "Probability": 0.670472194483589}, {"Rank": 5, "Code": 3, "Probability": 0.6535358299319147}, {"Rank": 6, "Code": 0, "Probability": 0.6253914009827128}, {"Rank": 7, "Code": 14, "Probability": 0.5631100827503}, {"Rank": 8, "Code": 22, "Probability": 0.5579922238215067}, {"Rank": 9, "Code": 4, "Probability": 0.5396531444683565}, {"Rank": 10, "Code": 11, "Probability": 0.5227933602019164}, {"Rank": 11, "Code": 8, "Probability": 0.4968967008442233}, {"Rank": 12, "Code": 15, "Probability": 0.49226966158122754}, {"Rank": 13, "Code": 7, "Probability": 0.48377167100625285}, {"Rank": 14, "Code": 18, "Probability": 0.4837068215587649}, {"Rank": 15, "Code": 9, "Probability": 0.47995524738909734}, {"Rank": 16, "Code": 16, "Probability": 0.436007474878611}, {"Rank": 17, "Code": 6, "Probability": 0.357233436346571}, {"Rank": 18, "Code": 12, "Probability": 0.35675737868827884}, {"Rank": 19, "Code": 21, "Probability": 0.35506206752432323}, {"Rank": 20, "Code": 19, "Probability": 0.3534675793773552}, {"Rank": 21, "Code": 10, "Probability": 0.34564549079888574}, {"Rank": 22, "Code": 20, "Probability": 0.2736282310490832}]