Debated the question of the percentile difference, with the rating (regular and quick) groups of one rating (regular rating) class to the next rating (quick rating) class. It is not a question of one player having a regular rating in one rating class and a quick rating in a different rating class. Being a question on the percentitle difference from one rating (regular rating) group on the next rating (quick rating) group, finding the percentitle on one set (rating class of quick) to its own equal (rating class of regular) set group.
All (adult and scholastic) active members as of November 1, 2004.
(regular ratings / quick ratings) = percentile (quick ratings percentile into regular ratings)
Senior Masters: (300 regular / 153 quick) = 51.00%
Masters: (922 regular / 390 quick) = 42.30%
Experts: (2299 regular / 1047 quick) = 45.54%
Class A: 43.39%
Class B: 43.31%
Class C: 46.60%
Class D: 48.98%
Class E: 60.44%
Class F: 66.32%
Class G: 66.41%
Class H: 64.56%
Class I: 65.69%
Class J: 66.65%
All (adult) active members as of November 1, 2004.
Senior Masters: 51.00%
Masters: 42.47%
Experts: 45.93%
Class A: 43.35%
Class B: 43.37%
Class C: 46.15%
Class D: 47.00%
Class E: 56.17%
Class F: 63.00%
Class G: 64.01%
Class H: 65.60%
Class I: 68.79%
Class J: 71.57%
All (scholastic) active members as of November 1, 2004.
Senior Masters: (none)
Masters: (6 regular / 1 quick) = 16.67%
Experts: (9 regular / 2 quick) = 33.33%
Class A: 58.98%
Class B: 40.79%
Class C: 56.67%
Class D: 64.48%
Class E: 73.10%
Class F: 71.71%
Class G: 69.60%
Class H: 63.25%
Class I: 61.54%
Class J: 59.27%