#263 Hendrix (0-6)

avg: 65.01  •  sd: 261.38  •  top 16/20: 0%

Click on a column to sort  • 
# Opponent Result Game Rating Status Date Event
92 John Brown** Loss 0-8 950.61 Ignored Feb 24th Dust Bowl 2018
57 Kansas** Loss 0-10 1236.54 Ignored Feb 24th Dust Bowl 2018
234 Kansas State Loss 0-6 -2.34 Feb 24th Dust Bowl 2018
149 Arkansas** Loss 0-11 586.36 Ignored Feb 24th Dust Bowl 2018
251 Tulsa Loss 6-8 117.86 Feb 25th Dust Bowl 2018
206 Missouri** Loss 1-13 218.69 Ignored Feb 25th Dust Bowl 2018
**Blowout Eligible


The uncertainty of the mean is equal to the standard deviation of the set of game ratings, divided by the square root of the number of games. We treated a team’s ranking as a normally distributed random variable, with the USAU ranking as the mean and the uncertainty of the ranking as the standard deviation
  1. Calculate uncertainy for USAU ranking averge
  2. Model ranking as a normal distribution around USAU averge with standard deviation equal to uncertainty
  3. Simulate seasons by drawing a rank for each team from their distribution. Note the teams in the top 16 (club) or top 20 (college)
  4. Sum the fractions for each region for how often each of it's teams appeared in the top 16 (club) or top 20 (college)
  5. Subtract one from each fraction for "autobids"
  6. Award remainings bids to the regions with the highest remaining fraction, subtracting one from the fraction each time a bid is awarded
There is an article on Ulitworld written by Scott Dunham and I that gives a little more context (though it probably was the thing that linked you here)