[{"Rank": 0, "Code": 18, "Probability": 0.8238217892015207}, {"Rank": 1, "Code": 1, "Probability": 0.792335363751882}, {"Rank": 2, "Code": 0, "Probability": 0.7679922020302207}, {"Rank": 3, "Code": 16, "Probability": 0.7462805447128497}, {"Rank": 4, "Code": 23, "Probability": 0.7456699498025996}, {"Rank": 5, "Code": 7, "Probability": 0.7386604953391129}, {"Rank": 6, "Code": 15, "Probability": 0.7301679955146249}, {"Rank": 7, "Code": 9, "Probability": 0.72828744481119}, {"Rank": 8, "Code": 6, "Probability": 0.7125705813202085}, {"Rank": 9, "Code": 11, "Probability": 0.6954371343561825}, {"Rank": 10, "Code": 21, "Probability": 0.6853536527532724}, {"Rank": 11, "Code": 4, "Probability": 0.6840664294615755}, {"Rank": 12, "Code": 3, "Probability": 0.6835311609259056}, {"Rank": 13, "Code": 12, "Probability": 0.6641375437423945}, {"Rank": 14, "Code": 14, "Probability": 0.6414596622714847}, {"Rank": 15, "Code": 20, "Probability": 0.611794908654178}, {"Rank": 16, "Code": 24, "Probability": 0.5979117602056401}, {"Rank": 17, "Code": 8, "Probability": 0.5962994773862569}, {"Rank": 18, "Code": 22, "Probability": 0.5711874975781595}, {"Rank": 19, "Code": 2, "Probability": 0.5153986458432835}, {"Rank": 20, "Code": 13, "Probability": 0.5098291810878991}, {"Rank": 21, "Code": 17, "Probability": 0.5038146080078579}, {"Rank": 22, "Code": 10, "Probability": 0.46299332149284766}, {"Rank": 23, "Code": 19, "Probability": 0.35886606891157347}, {"Rank": 24, "Code": 5, "Probability": 0.17617821079847928}]