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.Hampton can dilikoglu '23Running winner1234567891011121314RankSt. Mary's Leo Boucher '22Navy Gavin McJones '23Hobart & William Charles Carraway '22Kings Point Carrson Pearce '21Christopher Newport Vir Menon '20Kings Point Luke Welker '21Navy Connor Bayless '21Georgetown Thomas McCann '22Hobart & William Jake Vickers '22Hobart & William Collin Porter '23George Washington Cameron Feves '22Kings Point David Pearce '23Queen's Robert Juhasz '21George Washington Michael Ehnot '22George Washington Soenke Jordan '21Queen's William Bruce '21George Washington Owen Timms '23Hampton can dilikoglu '235(5)4(9)11(20)7(27)8(35)6(41)16(57)15(72)11(83)3(86)2(88)11(99)18(117)4(121)9(9)13(22)10(32)10(42)9(51)10(61)17(78)11(89)8(97)16(113)18(131)13(144)14(158)10(168)3(3)5(8)12(20)6(26)11(37)8(45)12(57)6(63)7(70)11(81)3(84)17(101)16(117)12(129)18(18)16(34)14(48)12(60)14(74)17(91)14(105)14(119)18(137)17(154)13(167)4(171)4(175)8(183)11(11)17(28)18(46)8(54)1(55)15(70)9(79)17(96)16(112)6(118)10(128)15(143)8(151)6(157)14(14)8(22)8(30)3(33)16(49)11(60)13(73)5(78)10(88)13(101)14(115)3(118)6(124)1(125)16(16)10(26)16(42)16(58)18(76)18(94)18(112)8(120)9(129)18(147)16(163)18(181)17(198)17(215)13(13)2(15)2(17)13(30)3(33)1(34)2(36)2(38)13(51)9(60)7(67)1(68)2(70)13(83)7(7)14(21)15(36)5(41)15(56)9(65)15(80)7(87)4(91)7(98)6(104)12(116)5(121)5(126)15(15)6(21)6(27)1(28)7(35)5(40)7(47)10(57)12(69)15(84)9(93)10(103)10(113)14(127)17(17)9(26)13(39)14(53)17(70)14(84)10(94)12(106)17(123)10(133)15(148)7(155)15(170)11(181)2(2)18(20)9(29)11(40)12(52)4(56)8(64)18(82)14(96)14(110)17(127)16(143)7(150)3(153)12(12)7(19)4(23)2(25)2(27)2(29)3(32)1(33)1(34)8(42)5(47)8(55)3(58)9(67)4(4)15(19)17(36)18(54)13(67)7(74)5(79)16(95)6(101)5(106)12(118)9(127)9(136)15(151)6(6)3(9)3(12)15(27)6(33)12(45)11(56)4(60)2(62)2(64)1(65)6(71)12(83)2(85)10(10)11(21)1(22)9(31)10(41)16(57)4(61)3(64)3(67)12(79)8(87)5(92)13(105)18(123)1(1)12(13)5(18)17(35)4(39)3(42)1(43)13(56)5(61)1(62)4(66)2(68)1(69)7(76)8(8)1(9)7(16)4(20)5(25)13(38)6(44)9(53)15(68)4(72)11(83)14(97)11(108)16(124)