Playoff odds are calculated by generating 250 Monte Carlo simulations and comparing the results.
You can choose a different n by selecting one of these options:
You can also edit the n_simulations= value in the URL.
However, the more simulations that are run, the longer the page will take to load.
Playoff simulation
Team
Owner
Projected Wins
Projected Losses
Projected Ties
Projected Points For
Playoff Odds
Greg's Gridion Gang
Greg Zukosky
11.0
2.0
0.0
1643.5
100.0%
Philip's unBroken Team
Philip Johnson
10.0
3.0
0.0
1669.7
100.0%
Soil Cop
Djan Chandra
8.0
5.0
0.0
1660.6
100.0%
Gronkey Tonk Women
Ryan Heusner
8.0
5.0
0.0
1571.7
100.0%
Bernoulli Bandits
Mark Delisio
6.0
7.0
0.0
1588.6
100.0%
phish phry
Daniel Dephillips
6.0
7.0
0.0
1429.1
100.0%
Go Taylors Boyfriend
Andrea Butchko
5.0
8.0
0.0
1412.9
0.0%
Denver Orange Crush
Mark Graeser
4.0
9.0
0.0
1440.3
0.0%
Kupp Fiction
James Kovalik
4.0
9.0
0.0
1430.3
0.0%
Rock Bottom
Ian Barchock
3.0
10.0
0.0
1413.8
0.0%
Note that for this league, 6 teams make the playoffs. All playoff odds are based on simulation results alone. Values of 0% or 100% do not necessarily mean that a team has been mathematically eliminated or clinched a playoff spot.
Final position distribution
Team
Owner
1st
2nd
3rd
4th
5th
6th
7th
8th
9th
10th
Playoff Odds
Greg's Gridion Gang
Greg Zukosky
100.0%
0.0%
0.0%
0.0%
0.0%
0.0%
0.0%
0.0%
0.0%
0.0%
100.0%
Philip's unBroken Team
Philip Johnson
0.0%
100.0%
0.0%
0.0%
0.0%
0.0%
0.0%
0.0%
0.0%
0.0%
100.0%
Soil Cop
Djan Chandra
0.0%
0.0%
100.0%
0.0%
0.0%
0.0%
0.0%
0.0%
0.0%
0.0%
100.0%
Gronkey Tonk Women
Ryan Heusner
0.0%
0.0%
0.0%
100.0%
0.0%
0.0%
0.0%
0.0%
0.0%
0.0%
100.0%
Bernoulli Bandits
Mark Delisio
0.0%
0.0%
0.0%
0.0%
100.0%
0.0%
0.0%
0.0%
0.0%
0.0%
100.0%
phish phry
Daniel Dephillips
0.0%
0.0%
0.0%
0.0%
0.0%
100.0%
0.0%
0.0%
0.0%
0.0%
100.0%
Go Taylors Boyfriend
Andrea Butchko
0.0%
0.0%
0.0%
0.0%
0.0%
0.0%
100.0%
0.0%
0.0%
0.0%
0.0%
Denver Orange Crush
Mark Graeser
0.0%
0.0%
0.0%
0.0%
0.0%
0.0%
0.0%
100.0%
0.0%
0.0%
0.0%
Kupp Fiction
James Kovalik
0.0%
0.0%
0.0%
0.0%
0.0%
0.0%
0.0%
0.0%
100.0%
0.0%
0.0%
Rock Bottom
Ian Barchock
0.0%
0.0%
0.0%
0.0%
0.0%
0.0%
0.0%
0.0%
0.0%
100.0%
0.0%
Note that for this league, 6 teams make the playoffs. All playoff odds are based on simulation results alone. Values of 0% or 100% do not necessarily mean that a team has been mathematically eliminated or clinched a playoff spot.
Seeding outcomes
Team
Owner
1st overall
1st in division
Make playoffs
Last in division
Last overall
Greg's Gridion Gang
Greg Zukosky
100.0%
100.0%
100.0%
0.0%
0.0%
phish phry
Daniel Dephillips
0.0%
0.0%
100.0%
0.0%
0.0%
Soil Cop
Djan Chandra
0.0%
0.0%
100.0%
0.0%
0.0%
Bernoulli Bandits
Mark Delisio
0.0%
0.0%
100.0%
0.0%
0.0%
Philip's unBroken Team
Philip Johnson
0.0%
0.0%
100.0%
0.0%
0.0%
Gronkey Tonk Women
Ryan Heusner
0.0%
0.0%
100.0%
0.0%
0.0%
Go Taylors Boyfriend
Andrea Butchko
0.0%
0.0%
0.0%
0.0%
0.0%
Kupp Fiction
James Kovalik
0.0%
0.0%
0.0%
0.0%
0.0%
Denver Orange Crush
Mark Graeser
0.0%
0.0%
0.0%
0.0%
0.0%
Rock Bottom
Ian Barchock
0.0%
0.0%
0.0%
100.0%
100.0%
Note that for this league, 6 teams make the playoffs. All playoff odds are based on simulation results alone. Values of 0% or 100% do not necessarily mean that a team has been mathematically eliminated or clinched a playoff spot.
Remaining strength of schedule (for Weeks 0-0)
Team
Owner
Blended difficulty
Opp's Points For
Opp's Win %
Opp's Power Ranking
Philip's unBroken Team
Philip Johnson
47.5
0.0
0.000
0.0
Denver Orange Crush
Mark Graeser
47.5
0.0
0.000
0.0
Soil Cop
Djan Chandra
47.5
0.0
0.000
0.0
Greg's Gridion Gang
Greg Zukosky
47.5
0.0
0.000
0.0
Gronkey Tonk Women
Ryan Heusner
47.5
0.0
0.000
0.0
Go Taylors Boyfriend
Andrea Butchko
47.5
0.0
0.000
0.0
Rock Bottom
Ian Barchock
47.5
0.0
0.000
0.0
Kupp Fiction
James Kovalik
47.5
0.0
0.000
0.0
phish phry
Daniel Dephillips
47.5
0.0
0.000
0.0
Bernoulli Bandits
Mark Delisio
47.5
0.0
0.000
0.0
Blended difficulty accounts for the points for, winning %, and power ranking of each team's remaining opponents.
Each team's schedule is then compared to the hardest and easiest possible schedule.
