Individual Calculations February 2023 |
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McQuillin, Danil Alsandair Total change: 95.60 | | |
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32nd annual North American Open - U2100 | Paradise, Nevada | USA | 2022-12-26 |
Rc | Ro | w | n | change | K | K*chg | Game |
1682 | 1799 | 5.50 | 7 | 0.95 | 40 | 38.00 | |
| Karthikeyan, Harishkumar | | | 1586 | USA | 1.00 | 1 | 0.23 | 40 | 9.20 | | Tang, Owen | | | 1704 | USA | 1.00 | 1 | 0.37 | 40 | 14.80 | | Yu, Avery | | | 1600 | USA | 0.50 | 1 | -0.26 | 40 | -10.40 | | Braun, Jason | | | 1756 | USA | 1.00 | 1 | 0.44 | 40 | 17.60 | | Jiang, Mathew | | | 1540 | USA | 1.00 | 1 | 0.18 | 40 | 7.20 | | Chu, Xiaoman | | | 1811 | CHN | 0.50 | 1 | 0.02 | 40 | 0.80 | | Daniels, Noah Montgomery | | | 1775 | USA | 0.50 | 1 | -0.03 | 40 | -1.20 | | Rc - average rating of rated opponents, Ro - rating of a player in a tournament, Rp - rating performance of an unrated player, W - points won in a tournament against rated opponents, N - total number of games against rated opponents, Change - change used for calculation according to formula, K - development coefficient, Kchg - rating change of a player calculated as (K * change) | | 2023 Charlotte Open - Under 2100 | Charlotte, North Carolina | USA | 2023-01-14 |
Rc | Ro | w | n | change | K | K*chg | Game |
1793 | 1799 | 4.50 | 6 | 1.44 | 40 | 57.60 | |
| Chen, Alan | | | 1638 | USA | 0.50 | 1 | -0.21 | 40 | -8.40 | | Iyer, Rohan | | | 1777 | USA | 1.00 | 1 | 0.47 | 40 | 18.80 | | Yang, Kevin | | | 1689 | USA | 1.00 | 1 | 0.35 | 40 | 14.00 | | Cadavid, Juan Miguel | c | | 1929 | COL | 0.00 | 1 | -0.32 | 40 | -12.80 | | Kumar, Sanjay | | | 1722 | USA | 1.00 | 1 | 0.39 | 40 | 15.60 | | Viera, Jeffren | | | 2002 | USA | 1.00 | 1 | 0.76 | 40 | 30.40 | | Rc - average rating of rated opponents, Ro - rating of a player in a tournament, Rp - rating performance of an unrated player, W - points won in a tournament against rated opponents, N - total number of games against rated opponents, Change - change used for calculation according to formula, K - development coefficient, Kchg - rating change of a player calculated as (K * change) | |
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