The first place team as of a given race will always be at the top of the chart. The spacing from one team to the next shows relative gains/losses made from one race to the next. The legend is listed in order of rank as of last race. Nodes specify the score as of that race for that team.A: Michigan WolverinesRunning winner1122334455667788991010RankB: Cornell Big RedA: Cornell Big RedB: Pennsylvania QuakersA: Princeton TigersA: Pennsylvania QuakersA: Washington College ShoremenA: Wisconsin BadgersA: Kings Point MarinersA: Hobart & William Statesmen 1B: Hobart & William Statesmen 1A: Hobart & William Statesmen 2B: Hobart & William Statesmen 2B: Wisconsin BadgersB: Princeton TigersB: Michigan WolverinesB: Kings Point MarinersB: Washington College ShoremenA: Michigan Wolverines2(2)9(2)2(4)11(4)8(12)1(12)8(20)2(20)6(26)1(26)5(31)1(31)2(33)1(33)1(34)3(34)5(39)11(39)4(43)1(43)2(9)9(9)2(20)11(20)8(21)1(21)8(23)2(23)6(24)1(24)5(25)1(25)2(26)1(26)1(29)3(29)5(40)11(40)4(41)1(41)4(4)15(4)9(13)3(13)4(17)12(17)11(28)13(28)10(38)12(38)8(46)14(46)8(54)6(54)10(64)6(64)2(66)4(66)7(73)2(73)4(15)15(15)9(18)3(18)4(30)12(30)11(43)13(43)10(55)12(55)8(69)14(69)8(75)6(75)10(81)6(81)2(85)4(85)7(87)2(87)8(8)11(8)13(21)7(21)7(28)10(28)7(35)12(35)13(48)7(48)13(61)9(61)10(71)16(71)13(84)12(84)12(96)6(96)6(102)12(102)8(11)11(11)13(18)7(18)7(28)10(28)7(40)12(40)13(47)7(47)13(56)9(56)10(72)16(72)13(84)12(84)12(90)6(90)6(102)12(102)3(3)7(3)10(13)15(13)5(18)13(18)5(23)9(23)5(28)15(28)7(35)15(35)4(39)17(39)4(43)18(43)9(52)14(52)3(55)14(55)3(7)7(7)10(22)15(22)5(35)13(35)5(44)9(44)5(59)15(59)7(74)15(74)4(91)17(91)4(109)18(109)9(123)14(123)3(137)14(137)6(6)18(6)8(14)17(14)11(25)16(25)6(31)18(31)BKD(38)18(38)BKD(45)18(45)5(50)13(50)8(58)15(58)3(61)16(61)8(69)10(69)6(18)18(18)8(35)17(35)11(51)16(51)6(69)18(69)BKD(87)18(87)BKD(105)18(105)5(118)13(118)8(133)15(133)3(149)16(149)8(159)10(159)14(14)16(14)16(30)18(30)17(47)15(47)16(63)17(63)17(80)14(80)16(96)12(96)14(110)15(110)14(124)11(124)18(142)17(142)18(160)16(160)14(16)16(16)16(34)18(34)17(49)15(49)16(66)17(66)17(80)14(80)16(92)12(92)14(107)15(107)14(118)11(118)18(135)17(135)18(151)16(151)1(1)12(1)4(5)1(5)6(11)3(11)3(14)1(14)8(22)3(22)3(25)6(25)3(28)9(28)9(37)2(37)7(44)1(44)13(57)11(57)1(12)12(12)4(13)1(13)6(16)3(16)3(17)1(17)8(20)3(20)3(26)6(26)3(35)9(35)9(37)2(37)7(38)1(38)13(49)11(49)5(5)13(5)5(10)12(10)9(19)14(19)4(23)15(23)2(25)11(25)4(29)10(29)11(40)12(40)5(45)17(45)10(55)15(55)9(64)15(64)5(13)13(13)5(25)12(25)9(39)14(39)4(54)15(54)2(65)11(65)4(75)10(75)11(87)12(87)5(104)17(104)10(119)15(119)9(134)15(134)10(10)17(10)6(16)14(16)2(18)18(18)10(28)14(28)4(32)16(32)2(34)17(34)7(41)18(41)7(48)16(48)8(56)13(56)5(61)17(61)10(17)17(17)6(31)14(31)2(49)18(49)10(63)14(63)4(79)16(79)2(96)17(96)7(114)18(114)7(130)16(130)8(143)13(143)5(160)17(160)