I'm not sure where I'm going with this, but here is the RPE table
1 | 2 | 3 | 4 | 5 | 6 | 7 | 8 | 9 | 10 | 11 | 12 | |
10 | 100 | 95.5 | 92.2 | 89.2 | 86.3 | 83.7 | 81.1 | 78.6 | 76.2 | 73.9 | 70.7 | 68 |
9.5 | 97.8 | 93.9 | 90.7 | 87.8 | 85 | 82.4 | 79.9 | 77.4 | 75.1 | 72.3 | 69.4 | 66.7 |
9 | 95.5 | 92.2 | 89.2 | 86.3 | 83.7 | 81.1 | 78.6 | 76.2 | 73.9 | 70.7 | 68 | 65.3 |
8.5 | 93.9 | 90.7 | 87.8 | 85 | 82.4 | 79.9 | 77.4 | 75.1 | 72.3 | 69.4 | 66.7 | 64 |
8 | 92.2 | 89.2 | 86.3 | 83.7 | 81.1 | 78.6 | 76.2 | 73.9 | 70.7 | 68 | 65.3 | 62.6 |
7.5 | 90.7 | 87.8 | 85 | 82.4 | 79.9 | 77.4 | 75.1 | 72.3 | 69.4 | 66.7 | 64 | 61.3 |
7 | 89.2 | 86.3 | 83.7 | 81.1 | 78.6 | 76.2 | 73.9 | 70.7 | 68 | 65.3 | 62.6 | 59.5 |
6.5 | 87.8 | 85 | 82.4 | 79.9 | 77.4 | 75.1 | 72.3 | 69.4 | 66.7 | 64 | 61.3 | 58.6 |
and the corresponding H values.
1 | 2 | 3 | 4 | 5 | 6 | 7 | 8 | 9 | 10 | 11 | 12 | |
10 | ∞ | 988 | 493 | 343 | 266 | 226 | 196 | 175 | 159 | 147 | 128 | 117 |
9.5 | 2066 | 537 | 347 | 269 | 222 | 194 | 173 | 157 | 145 | 130 | 117 | 108 |
9 | 494 | 329 | 257 | 213 | 188 | 168 | 153 | 141 | 132 | 116 | 107 | 100 |
8.5 | 269 | 231 | 202 | 178 | 161 | 149 | 137 | 129 | 117 | 107 | 99 | 93 |
8 | 164 | 171 | 160 | 151 | 140 | 131 | 124 | 117 | 105 | 98 | 91 | 86 |
7.5 | 116 | 134 | 133 | 129 | 124 | 117 | 113 | 104 | 96 | 90 | 85 | 80 |
7 | 86 | 107 | 113 | 112 | 109 | 106 | 103 | 93 | 88 | 83 | 79 | 73 |
6.5 | 67 | 89 | 97 | 99 | 98 | 97 | 91 | 85 | 81 | 77 | 73 | 70 |
I guess I was trying to find out whether H somehow lines up with RPE, and if one could recommend an H value for a single set.
ETA: A picture says more than 192 numbers: