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.Arizona State Sun DevilsRunning winner1A1B2A2B3A3B4A4B5A5B6A6B7A7B8A8B9A9B10A10BRankSouthern Cal Trojans 1UC Santa Barbara GauchosCal Poly Mustang 1UC San Diego Tritons 1UC Los Angeles Bruins 1Cal Poly Mustang 2Southern Cal Trojans 3Southern Cal Trojans 2UC Los Angeles Bruins 3Cal Poly Mustang 3UC San Diego Tritons 2UC Santa Cruz Banana Slug'sUC San Diego Tritons 3UC Los Angeles Bruins 2UC Los Angeles Bruins 4Cal Poly Mustang 4UC San Diego Tritons 4Westmont College WarriorsArizona State Sun Devils18(18)16(34)19(53)17(70)19(89)11(100)18(118)15(133)19(152)18(170)18(188)19(207)19(226)17(243)19(262)19(281)19(300)12(312)19(331)17(348)1(1)2(3)9(12)3(15)6(21)4(25)5(30)9(39)4(43)8(51)2(53)3(56)1(57)9(66)3(69)9(78)5(83)13(96)3(99)9(108)13(13)4(17)10(27)5(32)12(44)3(47)DSQ(67)3(70)8(78)3(81)8(89)14(103)10(113)7(120)11(131)7(138)8(146)3(149)8(157)5(162)14(14)7(21)5(26)1(27)10(37)7(44)7(51)10(61)9(70)6(76)15(91)8(99)11(110)6(116)16(132)13(145)12(157)11(168)12(180)4(184)DNF(20)18(38)16(54)18(72)16(88)13(101)12(113)17(130)5(135)17(152)DNF(172)15(187)9(196)19(215)14(229)18(247)18(265)15(280)16(296)12(308)6(6)5(11)6(17)8(25)9(34)5(39)9(48)6(54)10(64)10(74)6(80)7(87)8(95)4(99)8(107)5(112)7(119)2(121)7(128)3(131)17(17)11(28)18(46)11(57)18(75)18(93)17(110)11(121)16(137)9(146)17(163)12(175)17(192)5(197)15(212)12(224)15(239)7(246)15(261)10(271)8(8)3(11)11(22)4(26)11(37)9(46)14(60)12(72)15(87)7(94)9(103)4(107)16(123)2(125)9(134)10(144)9(153)10(163)9(172)6(178)15(15)13(28)13(41)15(56)14(70)17(87)10(97)13(110)17(127)16(143)14(157)18(175)13(188)18(206)12(218)16(234)17(251)18(269)17(286)13(299)2(2)12(14)3(17)10(27)4(31)2(33)4(37)2(39)2(41)13(54)4(58)9(67)7(74)10(84)5(89)1(90)3(93)8(101)2(103)14(117)12(12)10(22)12(34)9(43)7(50)12(62)13(75)8(83)14(97)4(101)12(113)11(124)6(130)8(138)10(148)14(162)10(172)4(176)11(187)11(198)4(4)14(18)15(33)14(47)8(55)16(71)11(82)16(98)11(109)2(111)10(121)6(127)14(141)16(157)13(170)15(185)13(198)19(217)13(230)19(249)16(36)17(73)17(90)13(103)15(118)15(133)16(149)14(163)18(181)19(200)16(216)17(233)18(251)12(263)18(281)8(289)11(300)17(317)18(335)8(343)7(7)6(13)2(15)7(22)2(24)8(32)1(33)1(34)3(37)5(42)3(45)5(50)2(52)3(55)1(56)3(59)6(65)1(66)1(67)2(69)10(30)9(59)7(66)12(78)13(91)6(97)8(105)4(109)13(122)11(133)11(144)13(157)12(169)11(180)7(187)2(189)16(205)6(211)10(221)7(228)5(5)1(6)1(7)2(9)1(10)1(11)3(14)5(19)1(20)1(21)1(22)2(24)3(27)1(28)2(30)4(34)2(36)9(45)5(50)1(51)3(3)8(11)4(15)16(31)5(36)10(46)6(52)18(70)7(77)12(89)7(96)10(106)4(110)13(123)4(127)6(133)4(137)16(153)4(157)15(172)11(11)15(26)14(40)6(46)3(49)14(63)2(65)7(72)6(78)15(93)5(98)1(99)5(104)14(118)6(124)11(135)1(136)5(141)6(147)16(163)9(29)19(68)8(76)19(95)17(112)19(131)15(146)19(165)12(177)14(191)13(204)16(220)15(235)15(250)17(267)17(284)14(298)14(312)14(326)18(344)