โ
Rank |
Team |
Adj. Win % |
1 |
Kansas City |
.763 |
2 |
Philadelphia |
.760 |
3 |
Baltimore |
.730 |
4 |
Jacksonville |
.707 |
5 |
Cleveland |
.690 |
6 |
Pittsburgh |
.690 |
7 |
Detroit |
.673 |
8 |
San Francisco |
.660 |
9 |
Miami |
.594 |
10 |
Houston |
.573 |
11 |
Dallas |
.564 |
12 |
Seattle |
.547 |
13 |
NY Jets |
.537 |
14 |
Atlanta |
.536 |
15 |
Buffalo |
.534 |
16 |
Indianapolis |
.533 |
17 |
Tampa Bay |
.513 |
18 |
Cincinnati |
.510 |
19 |
LA Rams |
.491 |
20 |
Minnesota |
.448 |
21 |
Tennessee |
.405 |
22 |
LA Chargers |
.394 |
23 |
New Orleans |
.393 |
24 |
Washington |
.388 |
25 |
Las Vegas |
.379 |
26 |
New England |
.362 |
27 |
NY Giants |
.334 |
28 |
Green Bay |
.323 |
29 |
Denver |
.309 |
30 |
Chicago |
.292 |
31 |
Arizona |
.221 |
32 |
Carolina |
.149 |
I'm using the Colley Matrix iteration process (https://www.colleyrankings.com/method.html)
To summarize, you take the win percentage of every team and correct it against the win percentage of their opponents. Then you have a new win percentage. And I repeat that process until the correction factor is below 0.01%. Essential this is what I would expect the win percentages to be if the teams played an average team every week.
Better top 10 list than most power ranking right now tbh