QB vs RB Stats

http://data:image/png;base64,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

What about MacBeth in Toronto?
Where did he finish in this formula.?
Just playing some devils advocate here.
If things are not based on wins & loses for QBs

The chart isn’t showing up here so
Stanback 1.98
A. Harris 1.71
Fajardo 1.54
Banks 0.64
S. Evans 0.10
Burnham -0.26
T. Harris -0.48
D. Evans -1.06
Adams -1.30
Powell -1.40
Begelton -1.50
White -1.62
MacBeth -2.00
Reilly -2.95
Arbuckle -4.93
Nichols -4.97
Gable -5.85
Mitchell -6.28
Streveler -11.73
Jennings -13.03
Davis -13.14

These are all the ones I bothered to check. This was my best attempt at creating a numbers-based way to compare stats, but there are still flaws. The cut-off for who was included in the standard deviation, the stats used and the weights given to each of them, the balance between rate stats and raw stats were all arbitrary, so there is plenty of room for error.

If you have any questions about why certain players are rated where, I’ll add the answers to this post