# Alchemist Cup Qualifiers

 1 . Adam Logan 2162.89   -3.11
Adam Logan has a qualifying average of 2162.89, which is a difference of -3.11 compared to their current rating of 2166. They have played 128 Collins games in 9 tournaments during the qualification period. If they maintain their current rating for all future tournaments in the qualification period, it will take exactly 0 tournament(s) to bring their qualifying average within 10 rating points of their current rating. Their current qualifying average is ${ 19466 \over 9 } = 2162.89$ After 0 additional tournament(s) with an end rating of 2166, their new qualifying average will be ${ 19466 + 0(2166) \over 9 + 0} = { 19466 \over 9 } = 2162.89$ which is a difference of -3.11 compared to their current rating.
 2 . Evan Berofsky 2032.33   +1.33
Evan Berofsky has a qualifying average of 2032.33, which is a difference of +1.33 compared to their current rating of 2031. They have played 121 Collins games in 6 tournaments during the qualification period. If they maintain their current rating for all future tournaments in the qualification period, it will take exactly 0 tournament(s) to bring their qualifying average within 10 rating points of their current rating. Their current qualifying average is ${ 12194 \over 6 } = 2032.33$ After 0 additional tournament(s) with an end rating of 2031, their new qualifying average will be ${ 12194 + 0(2031) \over 6 + 0} = { 12194 \over 6 } = 2032.33$ which is a difference of 1.33 compared to their current rating.
 3 . Jackson Smylie 1992.00   -6
Jackson Smylie has a qualifying average of 1992.00, which is a difference of -6 compared to their current rating of 1998. They have played 38 Collins games in 5 tournaments during the qualification period. If they maintain their current rating for all future tournaments in the qualification period, it will take exactly 0 tournament(s) to bring their qualifying average within 10 rating points of their current rating. Their current qualifying average is ${ 9960 \over 5 } = 1992.00$ After 0 additional tournament(s) with an end rating of 1998, their new qualifying average will be ${ 9960 + 0(1998) \over 5 + 0} = { 9960 \over 5 } = 1992.00$ which is a difference of -6.00 compared to their current rating.
 4 . Matthew Tunnicliffe 1950.60   +11.6
Matthew Tunnicliffe has a qualifying average of 1950.60, which is a difference of +11.6 compared to their current rating of 1939. They have played 46 Collins games in 5 tournaments during the qualification period. If they maintain their current rating for all future tournaments in the qualification period, it will take exactly 1 tournament(s) to bring their qualifying average within 10 rating points of their current rating. Their current qualifying average is ${ 9753 \over 5 } = 1950.60$ After 1 additional tournament(s) with an end rating of 1939, their new qualifying average will be ${ 9753 + 1(1939) \over 5 + 1} = { 11692 \over 6 } = 1948.67$ which is a difference of 9.67 compared to their current rating.
 5 . Joshua Sokol* 1925.00   -13
Joshua Sokol has a qualifying average of 1925.00, which is a difference of -13 compared to their current rating of 1938. They have played 26 Collins games in 3 tournaments during the qualification period. If they maintain their current rating for all future tournaments in the qualification period, it will take exactly 1 tournament(s) to bring their qualifying average within 10 rating points of their current rating. Their current qualifying average is ${ 5775 \over 3 } = 1925.00$ After 1 additional tournament(s) with an end rating of 1938, their new qualifying average will be ${ 5775 + 1(1938) \over 3 + 1} = { 7713 \over 4 } = 1928.25$ which is a difference of -9.75 compared to their current rating.
*Joshua Sokol has played fewer than the minimum 30 games required to qualify.
 6 . Joshua Castellano 1919.13   -19.87
Joshua Castellano has a qualifying average of 1919.13, which is a difference of -19.87 compared to their current rating of 1939. They have played 529 Collins games in 39 tournaments during the qualification period. If they maintain their current rating for all future tournaments in the qualification period, it will take exactly 39 tournament(s) to bring their qualifying average within 10 rating points of their current rating. Their current qualifying average is ${ 74846 \over 39 } = 1919.13$ After 39 additional tournament(s) with an end rating of 1939, their new qualifying average will be ${ 74846 + 39(1939) \over 39 + 39} = { 150467 \over 78 } = 1929.06$ which is a difference of -9.94 compared to their current rating.
 7 . Jesse Matthews* 1886.00   +0
Jesse Matthews has a qualifying average of 1886.00, which is a difference of +0 compared to their current rating of 1886. They have played 20 Collins games in 1 tournaments during the qualification period. If they maintain their current rating for all future tournaments in the qualification period, it will take exactly 0 tournament(s) to bring their qualifying average within 10 rating points of their current rating. Their current qualifying average is ${ 1886 \over 1 } = 1886.00$ After 0 additional tournament(s) with an end rating of 1886, their new qualifying average will be ${ 1886 + 0(1886) \over 1 + 0} = { 1886 \over 1 } = 1886.00$ which is a difference of 0.00 compared to their current rating.
*Jesse Matthews has played fewer than the minimum 30 games required to qualify.
 8 . Tony Leah 1870.50   -58.5
Tony Leah has a qualifying average of 1870.50, which is a difference of -58.5 compared to their current rating of 1929. They have played 207 Collins games in 20 tournaments during the qualification period. If they maintain their current rating for all future tournaments in the qualification period, it will take exactly 98 tournament(s) to bring their qualifying average within 10 rating points of their current rating. Their current qualifying average is ${ 37410 \over 20 } = 1870.50$ After 98 additional tournament(s) with an end rating of 1929, their new qualifying average will be ${ 37410 + 98(1929) \over 20 + 98} = { 226452 \over 118 } = 1919.08$ which is a difference of -9.92 compared to their current rating.
 9 . Shan Abbasi 1757.70   +27.7
Shan Abbasi has a qualifying average of 1757.70, which is a difference of +27.7 compared to their current rating of 1730. They have played 123 Collins games in 10 tournaments during the qualification period. If they maintain their current rating for all future tournaments in the qualification period, it will take exactly 18 tournament(s) to bring their qualifying average within 10 rating points of their current rating. Their current qualifying average is ${ 17577 \over 10 } = 1757.70$ After 18 additional tournament(s) with an end rating of 1730, their new qualifying average will be ${ 17577 + 18(1730) \over 10 + 18} = { 48717 \over 28 } = 1739.89$ which is a difference of 9.89 compared to their current rating.

### Registered Players for United States

 1 . Dave Wiegand 2193.89   +56.89
Dave Wiegand has a qualifying average of 2193.89, which is a difference of +56.89 compared to their current rating of 2137. They have played 281 Collins games in 18 tournaments during the qualification period. If they maintain their current rating for all future tournaments in the qualification period, it will take exactly 85 tournament(s) to bring their qualifying average within 10 rating points of their current rating. Their current qualifying average is ${ 39490 \over 18 } = 2193.89$ After 85 additional tournament(s) with an end rating of 2137, their new qualifying average will be ${ 39490 + 85(2137) \over 18 + 85} = { 221135 \over 103 } = 2146.94$ which is a difference of 9.94 compared to their current rating.
 2 . Will Anderson 2085.93   -77.07
Will Anderson has a qualifying average of 2085.93, which is a difference of -77.07 compared to their current rating of 2163. They have played 250 Collins games in 15 tournaments during the qualification period. If they maintain their current rating for all future tournaments in the qualification period, it will take exactly 101 tournament(s) to bring their qualifying average within 10 rating points of their current rating. Their current qualifying average is ${ 31289 \over 15 } = 2085.93$ After 101 additional tournament(s) with an end rating of 2163, their new qualifying average will be ${ 31289 + 101(2163) \over 15 + 101} = { 249752 \over 116 } = 2153.03$ which is a difference of -9.97 compared to their current rating.
 3 . Austin Shin 2077.45   -49.55
Austin Shin has a qualifying average of 2077.45, which is a difference of -49.55 compared to their current rating of 2127. They have played 172 Collins games in 11 tournaments during the qualification period. If they maintain their current rating for all future tournaments in the qualification period, it will take exactly 44 tournament(s) to bring their qualifying average within 10 rating points of their current rating. Their current qualifying average is ${ 22852 \over 11 } = 2077.45$ After 44 additional tournament(s) with an end rating of 2127, their new qualifying average will be ${ 22852 + 44(2127) \over 11 + 44} = { 116440 \over 55 } = 2117.09$ which is a difference of -9.91 compared to their current rating.
 4 . David Koenig 2061.18   -17.82
David Koenig has a qualifying average of 2061.18, which is a difference of -17.82 compared to their current rating of 2079. They have played 160 Collins games in 11 tournaments during the qualification period. If they maintain their current rating for all future tournaments in the qualification period, it will take exactly 9 tournament(s) to bring their qualifying average within 10 rating points of their current rating. Their current qualifying average is ${ 22673 \over 11 } = 2061.18$ After 9 additional tournament(s) with an end rating of 2079, their new qualifying average will be ${ 22673 + 9(2079) \over 11 + 9} = { 41384 \over 20 } = 2069.20$ which is a difference of -9.80 compared to their current rating.
 5 . Conrad Bassett-Bouchard 2059.82   -34.18
Conrad Bassett-Bouchard has a qualifying average of 2059.82, which is a difference of -34.18 compared to their current rating of 2094. They have played 136 Collins games in 11 tournaments during the qualification period. If they maintain their current rating for all future tournaments in the qualification period, it will take exactly 27 tournament(s) to bring their qualifying average within 10 rating points of their current rating. Their current qualifying average is ${ 22658 \over 11 } = 2059.82$ After 27 additional tournament(s) with an end rating of 2094, their new qualifying average will be ${ 22658 + 27(2094) \over 11 + 27} = { 79196 \over 38 } = 2084.11$ which is a difference of -9.89 compared to their current rating.
 6 . Evans Clinchy 2056.20   +45.2
Evans Clinchy has a qualifying average of 2056.20, which is a difference of +45.2 compared to their current rating of 2011. They have played 157 Collins games in 10 tournaments during the qualification period. If they maintain their current rating for all future tournaments in the qualification period, it will take exactly 36 tournament(s) to bring their qualifying average within 10 rating points of their current rating. Their current qualifying average is ${ 20562 \over 10 } = 2056.20$ After 36 additional tournament(s) with an end rating of 2011, their new qualifying average will be ${ 20562 + 36(2011) \over 10 + 36} = { 92958 \over 46 } = 2020.83$ which is a difference of 9.83 compared to their current rating.
 7 . Jesse Day 2048.61   -28.39
Jesse Day has a qualifying average of 2048.61, which is a difference of -28.39 compared to their current rating of 2077. They have played 250 Collins games in 18 tournaments during the qualification period. If they maintain their current rating for all future tournaments in the qualification period, it will take exactly 34 tournament(s) to bring their qualifying average within 10 rating points of their current rating. Their current qualifying average is ${ 36875 \over 18 } = 2048.61$ After 34 additional tournament(s) with an end rating of 2077, their new qualifying average will be ${ 36875 + 34(2077) \over 18 + 34} = { 107493 \over 52 } = 2067.17$ which is a difference of -9.83 compared to their current rating.
 8 . Jason Keller 2037.33   -26.67
Jason Keller has a qualifying average of 2037.33, which is a difference of -26.67 compared to their current rating of 2064. They have played 380 Collins games in 21 tournaments during the qualification period. If they maintain their current rating for all future tournaments in the qualification period, it will take exactly 36 tournament(s) to bring their qualifying average within 10 rating points of their current rating. Their current qualifying average is ${ 42784 \over 21 } = 2037.33$ After 36 additional tournament(s) with an end rating of 2064, their new qualifying average will be ${ 42784 + 36(2064) \over 21 + 36} = { 117088 \over 57 } = 2054.18$ which is a difference of -9.82 compared to their current rating.
 9 . Rob Robinsky 2033.40   +11.4
Rob Robinsky has a qualifying average of 2033.40, which is a difference of +11.4 compared to their current rating of 2022. They have played 94 Collins games in 5 tournaments during the qualification period. If they maintain their current rating for all future tournaments in the qualification period, it will take exactly 1 tournament(s) to bring their qualifying average within 10 rating points of their current rating. Their current qualifying average is ${ 10167 \over 5 } = 2033.40$ After 1 additional tournament(s) with an end rating of 2022, their new qualifying average will be ${ 10167 + 1(2022) \over 5 + 1} = { 12189 \over 6 } = 2031.50$ which is a difference of 9.50 compared to their current rating.
 10 . Chris Lipe 2031.87   -30.13
Chris Lipe has a qualifying average of 2031.87, which is a difference of -30.13 compared to their current rating of 2062. They have played 262 Collins games in 15 tournaments during the qualification period. If they maintain their current rating for all future tournaments in the qualification period, it will take exactly 31 tournament(s) to bring their qualifying average within 10 rating points of their current rating. Their current qualifying average is ${ 30478 \over 15 } = 2031.87$ After 31 additional tournament(s) with an end rating of 2062, their new qualifying average will be ${ 30478 + 31(2062) \over 15 + 31} = { 94400 \over 46 } = 2052.17$ which is a difference of -9.83 compared to their current rating.
 11 . Matthew O'Connor' 1995.00   -30
Matthew O'Connor' has a qualifying average of 1995.00, which is a difference of -30 compared to their current rating of 2025. They have played 452 Collins games in 37 tournaments during the qualification period. If they maintain their current rating for all future tournaments in the qualification period, it will take exactly 75 tournament(s) to bring their qualifying average within 10 rating points of their current rating. Their current qualifying average is ${ 73815 \over 37 } = 1995.00$ After 75 additional tournament(s) with an end rating of 2025, their new qualifying average will be ${ 73815 + 75(2025) \over 37 + 75} = { 225690 \over 112 } = 2015.09$ which is a difference of -9.91 compared to their current rating.
 12 . Ben Schoenbrun 1979.27   -40.73
Ben Schoenbrun has a qualifying average of 1979.27, which is a difference of -40.73 compared to their current rating of 2020. They have played 222 Collins games in 15 tournaments during the qualification period. If they maintain their current rating for all future tournaments in the qualification period, it will take exactly 47 tournament(s) to bring their qualifying average within 10 rating points of their current rating. Their current qualifying average is ${ 29689 \over 15 } = 1979.27$ After 47 additional tournament(s) with an end rating of 2020, their new qualifying average will be ${ 29689 + 47(2020) \over 15 + 47} = { 124629 \over 62 } = 2010.15$ which is a difference of -9.85 compared to their current rating.
 13 . Rasheed Balogun 1939.88   +29.88
Rasheed Balogun has a qualifying average of 1939.88, which is a difference of +29.88 compared to their current rating of 1910. They have played 343 Collins games in 25 tournaments during the qualification period. If they maintain their current rating for all future tournaments in the qualification period, it will take exactly 50 tournament(s) to bring their qualifying average within 10 rating points of their current rating. Their current qualifying average is ${ 48497 \over 25 } = 1939.88$ After 50 additional tournament(s) with an end rating of 1910, their new qualifying average will be ${ 48497 + 50(1910) \over 25 + 50} = { 143997 \over 75 } = 1919.96$ which is a difference of 9.96 compared to their current rating.
 14 . Cesar Del Solar 1835.00   -17
Cesar Del Solar has a qualifying average of 1835.00, which is a difference of -17 compared to their current rating of 1852. They have played 72 Collins games in 8 tournaments during the qualification period. If they maintain their current rating for all future tournaments in the qualification period, it will take exactly 6 tournament(s) to bring their qualifying average within 10 rating points of their current rating. Their current qualifying average is ${ 14680 \over 8 } = 1835.00$ After 6 additional tournament(s) with an end rating of 1852, their new qualifying average will be ${ 14680 + 6(1852) \over 8 + 6} = { 25792 \over 14 } = 1842.29$ which is a difference of -9.71 compared to their current rating.
 15 . Lucas Freeman 1803.50   +9.5
Lucas Freeman has a qualifying average of 1803.50, which is a difference of +9.5 compared to their current rating of 1794. They have played 52 Collins games in 2 tournaments during the qualification period. If they maintain their current rating for all future tournaments in the qualification period, it will take exactly 0 tournament(s) to bring their qualifying average within 10 rating points of their current rating. Their current qualifying average is ${ 3607 \over 2 } = 1803.50$ After 0 additional tournament(s) with an end rating of 1794, their new qualifying average will be ${ 3607 + 0(1794) \over 2 + 0} = { 3607 \over 2 } = 1803.50$ which is a difference of 9.50 compared to their current rating.
 16 . Puneet Sharma 1790.56   +50.56
Puneet Sharma has a qualifying average of 1790.56, which is a difference of +50.56 compared to their current rating of 1740. They have played 306 Collins games in 18 tournaments during the qualification period. If they maintain their current rating for all future tournaments in the qualification period, it will take exactly 74 tournament(s) to bring their qualifying average within 10 rating points of their current rating. Their current qualifying average is ${ 32230 \over 18 } = 1790.56$ After 74 additional tournament(s) with an end rating of 1740, their new qualifying average will be ${ 32230 + 74(1740) \over 18 + 74} = { 160990 \over 92 } = 1749.89$ which is a difference of 9.89 compared to their current rating.