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The general formula is the same for the two systems. The main difference is the memory at which old events vs the recent event are weighed in.
FIDE uses a K factor. This is the number that you multiply your "differential" by. For example FIDE > 2400 have a K of 10. I play a tournament with one game and beat a player with my rating. My expected score is 0.5, but I get 1, so my differential is 0.5 Multiply by the K and I gain 5 rating points.
CFC uses a memory of 25 games. If I again play one game and beat a player of the same rating of me, I gain 400/25 = 16 points.
If you want to work in the same system - the CFC K factor is 32, while the FIDE memory is 80.
Also the memory for CFC players > 2200 is 50 (K of 16), while the K factor for FIDE < 2400 is 15 (memory of 53.3).
All this means that FIDE ratings are less volatile than CFC ratings.
What I wonder about is how all of the thousands of FIDE junior rated players are going to get their points to improve from 1400 to 2000 or wherever they peak at. FIDE only recently lowered the floor below 2000, and I don't see how deflation won't become rampant in a few years. There probably isn't a lot of adult vs junior interaction in a lot of countries.
The only contravening factor is that when 2400+ play 2400- the lower rated players will be more volatile, and thus will over time will put a few points into the system that way, assuming they are more likely to be improving.
It may also be that players quit when there ratings are at an ebb, and thus they leave rating points in the pool that they may have been able to win back in the normal course of a player's +/- a certain mark.
I think we should be all interested to see how FIDE handles the eventual drain on professional player's ratings by the amateurs rise through the ranks.
FIDE uses a K factor. This is the number that you multiply your "differential" by. For example FIDE > 2400 have a K of 10. I play a tournament with one game and beat a player with my rating. My expected score is 0.5, but I get 1, so my differential is 0.5 Multiply by the K and I gain 5 rating points.
CFC uses a memory of 25 games. If I again play one game and beat a player of the same rating of me, I gain 400/25 = 16 points.
If you want to work in the same system - the CFC K factor is 32, while the FIDE memory is 80.
Also the memory for CFC players > 2200 is 50 (K of 16), while the K factor for FIDE < 2400 is 15 (memory of 53.3).
All this means that FIDE ratings are less volatile than CFC ratings.
What I wonder about is how all of the thousands of FIDE junior rated players are going to get their points to improve from 1400 to 2000 or wherever they peak at. FIDE only recently lowered the floor below 2000, and I don't see how deflation won't become rampant in a few years. There probably isn't a lot of adult vs junior interaction in a lot of countries.
The only contravening factor is that when 2400+ play 2400- the lower rated players will be more volatile, and thus will over time will put a few points into the system that way, assuming they are more likely to be improving.
It may also be that players quit when there ratings are at an ebb, and thus they leave rating points in the pool that they may have been able to win back in the normal course of a player's +/- a certain mark.
I think we should be all interested to see how FIDE handles the eventual drain on professional player's ratings by the amateurs rise through the ranks.
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