(1) #16 Southern California (14-4) SW 2

1976.15 (5)

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# Opponent Result Effect % of Ranking Status Date Event
219 Michigan State Win 13-8 -29.67 5.06% Jan 26th Santa Barbara Invite 2019
21 California Win 13-11 5.12 5.06% Jan 26th Santa Barbara Invite 2019
10 Washington Win 13-12 10.3 5.06% Jan 26th Santa Barbara Invite 2019
74 Arizona Loss 10-11 -33.13 5.06% Jan 26th Santa Barbara Invite 2019
50 Stanford Win 13-8 8.13 5.06% Jan 27th Santa Barbara Invite 2019
42 British Columbia Loss 7-13 -45.8 5.06% Jan 27th Santa Barbara Invite 2019
30 Victoria Loss 11-13 -23.38 5.06% Jan 27th Santa Barbara Invite 2019
90 Santa Clara Win 9-3 0.56 4.97% Feb 16th Presidents Day Invite 2019
37 Illinois Win 10-1 19.08 5.25% Feb 16th Presidents Day Invite 2019
42 British Columbia Win 13-3 19.03 6.01% Feb 17th Presidents Day Invite 2019
8 Colorado Win 8-6 22.84 5.16% Feb 17th Presidents Day Invite 2019
3 Oregon Loss 8-10 -3.1 5.85% Feb 18th Presidents Day Invite 2019
21 California Win 10-4 25.91 5.25% Feb 18th Presidents Day Invite 2019
65 Florida Win 13-7 10.22 8.03% Mar 23rd Trouble in Vegas 2019
116 Nevada-Reno** Win 13-1 0 0% Ignored Mar 23rd Trouble in Vegas 2019
76 Utah Win 13-7 4.81 8.03% Mar 24th Trouble in Vegas 2019
74 Arizona Win 13-7 5.28 8.03% Mar 24th Trouble in Vegas 2019
65 Florida Win 13-8 4.87 8.03% Mar 24th Trouble in Vegas 2019
**Blowout Eligible

FAQ

The results on this page ("USAU") are the results of an implementation of the USA Ultimate Top 20 algorithm, which is used to allocate post season bids to both colleg and club ultimate teams. The data was obtained by scraping USAU's score reporting website. Learn more about the algorithm here. TL;DR, here is the rating function. Every game a team plays gets a rating equal to the opponents rating +/- the score value. With all these data points, we iterate team ratings until convergence. There is also a rule for discounting blowout games (see next FAQ)
For reference, here is handy table with frequent game scrores and the resulting game value:
"...if a team is rated more than 600 points higher than its opponent, and wins with a score that is more than twice the losing score plus one, the game is ignored for ratings purposes. However, this is only done if the winning team has at least N other results that are not being ignored, where N=5."

Translation: if a team plays a game where even earning the max point win would hurt them, they can have the game ignored provided they win by enough and have suffficient unignored results.