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.B: Cornell Big RedRunning winner11223344556677889910101111121213131414RankA: Georgetown HoyasB: Georgetown HoyasA: Navy MidshipmenB: George Washington ColonialsB: Fordham RamsA: Old Dominion MonarchsB: Hobart & William StatesmenA: Fordham RamsA: St. Mary's SeahawksA: Cornell Big RedB: St. Mary's SeahawksA: Pennsylvania QuakersA: George Washington ColonialsB: Old Dominion MonarchsA: Hobart & William StatesmenB: Navy MidshipmenB: Pennsylvania QuakersB: Cornell Big Red3(3)13(3)9(12)11(12)6(18)17(18)13(31)17(31)5(36)15(36)1(37)17(37)15(52)18(52)12(64)16(64)2(66)16(66)18(84)12(84)16(100)18(100)15(115)16(115)18(133)16(133)3(136)16(136)3(13)13(13)9(24)11(24)6(41)17(41)13(58)17(58)5(73)15(73)1(90)17(90)15(108)18(108)12(124)16(124)2(140)16(140)18(152)12(152)16(170)18(170)15(186)16(186)18(202)16(202)3(218)16(218)14(14)2(14)2(16)4(16)16(32)11(32)4(36)15(36)14(50)10(50)9(59)6(59)16(75)4(75)8(83)1(83)6(89)12(89)14(103)8(103)8(111)4(111)3(114)7(114)14(128)1(128)4(132)14(132)14(2)2(2)2(6)4(6)16(17)11(17)4(32)15(32)14(42)10(42)9(48)6(48)16(52)4(52)8(53)1(53)6(65)12(65)14(73)8(73)8(77)4(77)3(84)7(84)14(85)1(85)4(99)14(99)12(12)6(12)13(25)8(25)14(39)12(39)7(46)8(46)7(53)4(53)13(66)5(66)7(73)9(73)10(83)2(83)10(93)4(93)7(100)5(100)13(113)5(113)14(127)12(127)8(135)6(135)12(147)8(147)12(6)6(6)13(14)8(14)14(26)12(26)7(34)8(34)7(38)4(38)13(43)5(43)7(52)9(52)10(54)2(54)10(58)4(58)7(63)5(63)13(68)5(68)14(80)12(80)8(86)6(86)12(94)8(94)1(1)4(1)6(7)3(7)1(8)10(8)1(9)2(9)3(12)2(12)3(15)7(15)1(16)2(16)4(20)6(20)11(31)8(31)17(48)3(48)1(49)2(49)1(50)2(50)9(59)4(59)1(60)15(60)1(4)4(4)6(7)3(7)1(17)10(17)1(19)2(19)3(21)2(21)3(28)7(28)1(30)2(30)4(36)6(36)11(44)8(44)17(47)3(47)1(49)2(49)1(51)2(51)9(55)4(55)1(70)15(70)17(17)5(17)18(35)14(35)13(48)9(48)14(62)6(62)8(70)9(70)15(85)12(85)11(96)10(96)14(110)9(110)7(117)5(117)6(123)11(123)15(138)3(138)10(148)4(148)10(158)11(158)18(176)6(176)17(5)5(5)18(19)14(19)13(28)9(28)14(34)6(34)8(43)9(43)15(55)12(55)11(65)10(65)14(74)9(74)7(79)5(79)6(90)11(90)15(93)3(93)10(97)4(97)10(108)11(108)18(114)6(114)7(7)11(7)16(23)15(23)5(28)8(28)9(37)16(37)13(50)18(50)2(52)11(52)14(66)8(66)3(69)11(69)9(78)14(78)1(79)13(79)10(89)9(89)11(100)6(100)3(103)7(103)7(110)2(110)7(11)11(11)16(26)15(26)5(34)8(34)9(50)16(50)13(68)18(68)2(79)11(79)14(87)8(87)3(98)11(98)9(112)14(112)1(125)13(125)10(134)9(134)11(140)6(140)3(147)7(147)7(149)2(149)10(10)8(10)1(11)10(11)7(18)3(18)12(30)3(30)16(46)6(46)14(60)16(60)12(72)13(72)13(85)7(85)1(86)17(86)4(90)9(90)14(104)11(104)9(113)8(113)13(126)15(126)9(135)13(135)10(8)8(8)1(18)10(18)7(21)3(21)12(24)3(24)16(30)6(30)14(46)16(46)12(59)13(59)13(66)7(66)1(83)17(83)4(92)9(92)14(103)11(103)9(111)8(111)13(126)15(126)9(139)13(139)15(15)16(15)12(27)17(27)4(31)18(31)10(41)11(41)1(42)17(42)4(46)10(46)3(49)5(49)5(54)15(54)3(57)18(57)2(59)15(59)6(65)12(65)5(70)13(70)2(72)17(72)5(77)11(77)15(16)16(16)12(33)17(33)4(51)18(51)10(62)11(62)1(79)17(79)4(89)10(89)3(94)5(94)5(109)15(109)3(127)18(127)2(142)15(142)6(154)12(154)5(167)13(167)2(184)17(184)5(195)11(195)9(9)18(9)5(14)7(14)2(16)15(16)5(21)18(21)12(33)11(33)8(41)18(41)6(47)17(47)18(65)17(65)13(78)15(78)10(88)16(88)17(105)7(105)18(123)17(123)5(128)12(128)17(145)10(145)9(18)18(18)5(25)7(25)2(40)15(40)5(58)18(58)12(69)11(69)8(87)18(87)6(104)17(104)18(121)17(121)13(136)15(136)10(152)16(152)17(159)7(159)18(176)17(176)5(188)12(188)17(198)10(198)