[{"Rank": 0, "Code": 1, "Probability": 0.8131048589945102}, {"Rank": 1, "Code": 18, "Probability": 0.8057135749217591}, {"Rank": 2, "Code": 0, "Probability": 0.7789349863123611}, {"Rank": 3, "Code": 7, "Probability": 0.7703145746402044}, {"Rank": 4, "Code": 14, "Probability": 0.761179621839372}, {"Rank": 5, "Code": 11, "Probability": 0.756980607425785}, {"Rank": 6, "Code": 16, "Probability": 0.7465898765234451}, {"Rank": 7, "Code": 24, "Probability": 0.7463237307856571}, {"Rank": 8, "Code": 6, "Probability": 0.7459422172533541}, {"Rank": 9, "Code": 15, "Probability": 0.745396170246022}, {"Rank": 10, "Code": 12, "Probability": 0.7302754611075815}, {"Rank": 11, "Code": 20, "Probability": 0.7288914697420877}, {"Rank": 12, "Code": 4, "Probability": 0.7210585972823894}, {"Rank": 13, "Code": 22, "Probability": 0.6955714859571325}, {"Rank": 14, "Code": 23, "Probability": 0.6538252231763044}, {"Rank": 15, "Code": 9, "Probability": 0.653212899702525}, {"Rank": 16, "Code": 13, "Probability": 0.6220579071858828}, {"Rank": 17, "Code": 2, "Probability": 0.6137371819141264}, {"Rank": 18, "Code": 3, "Probability": 0.6094166290427849}, {"Rank": 19, "Code": 21, "Probability": 0.5958556901896871}, {"Rank": 20, "Code": 10, "Probability": 0.5949803156021537}, {"Rank": 21, "Code": 17, "Probability": 0.5008696236064976}, {"Rank": 22, "Code": 8, "Probability": 0.4948755366665718}, {"Rank": 23, "Code": 19, "Probability": 0.4496717309753657}, {"Rank": 24, "Code": 5, "Probability": 0.18689514100548976}]