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.

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.

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.

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.