186zpi
186 zeta peak index (abbreviated 186zpi), is the equal-step tuning system obtained from the 186st peak of the Riemann zeta function.
| Tuning | Strength | Closest EDO | Integer limit | ||||||
|---|---|---|---|---|---|---|---|---|---|
| ZPI | Steps per octave | Step size (cents) | Height | Integral | Gap | EDO | Octave (cents) | Consistent | Distinct |
| 186zpi | 41.3438354846780 | 29.0248832971658 | 1.876590 | 0.241233 | 11.567493 | 41edo | 1190.02021518380 | 2 | 2 |
Theory
Record on the Riemann zeta function with primes 2 and 3 removed
186zpi sets a height record on the Riemann zeta function with primes 2 and 3 removed. The previous record is 125zpi and the next one is 565zpi. It is important to highlight that the optimal equal tunings obtained by excluding the prime numbers 2 and 3 from the Riemann zeta function differs very slightly from the optimal equal tuning corresponding to the same peaks on the unmodified Riemann zeta function.
| Unmodified Riemann zeta function | Riemann zeta function with primes 2 and 3 removed | |||||||||
|---|---|---|---|---|---|---|---|---|---|---|
| Tuning | Strength | Closest EDO | Tuning | Strength | Closest EDO | |||||
| ZPI | Steps per octave | Step size (cents) | Height | EDO | Octave (cents) | Steps per octave | Step size (cents) | Height | EDO | Octave (cents) |
| 125zpi | 30.6006474885974 | 39.2148564976330 | 1.468164 | 31edo | 1215.66055142662 | 30.5974484926723 | 39.2189564527704 | 3.769318 | 31edo | 1215.78765003588 |
| 186zpi | 41.3438354846780 | 29.0248832971658 | 1.876590 | 41edo | 1190.02021518380 | 41.3477989230936 | 29.0221010852836 | 4.469823 | 41edo | 1189.90614449663 |
| 565zpi | 98.6209462564991 | 12.1678005084130 | 2.305330 | 99edo | 1204.61225033289 | 98.6257548378926 | 12.1672072570942 | 4.883729 | 99edo | 1204.55351845233 |
Harmonic series
As a non-octave, non-tritave scale, 186zpi features a well-balanced harmonic series segment from 5 to 9, and performs exceptionally well across all prime harmonics from 5 to 23, with the exception of 19.
| Harmonic | 2 | 3 | 4 | 5 | 6 | 7 | 8 | 9 | 10 | 11 | 12 | 13 | 14 | 15 | 16 | |
|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
| Error | Absolute (¢) | -10.0 | +13.7 | +9.1 | +0.1 | +3.7 | -1.9 | -0.9 | -1.7 | -9.9 | -0.8 | -6.3 | +0.3 | -11.9 | +13.8 | -10.9 |
| Relative (%) | -34.4 | +47.2 | +31.2 | +0.3 | +12.8 | -6.7 | -3.2 | -5.7 | -34.1 | -2.6 | -21.6 | +1.0 | -41.1 | +47.4 | -37.5 | |
| Step | 41 | 66 | 83 | 96 | 107 | 116 | 124 | 131 | 137 | 143 | 148 | 153 | 157 | 162 | 165 | |
| Harmonic | 17 | 18 | 19 | 20 | 21 | 22 | 23 | 24 | 25 | 26 | 27 | 28 | 29 | 30 | 31 | 32 | |
|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
| Error | Absolute (¢) | +0.2 | -11.6 | +10.9 | +9.1 | +11.7 | -10.7 | -0.6 | +12.8 | +0.2 | -9.7 | +12.0 | +7.1 | +4.4 | +3.8 | +5.1 | +8.2 |
| Relative (%) | +0.9 | -40.1 | +37.4 | +31.5 | +40.5 | -37.0 | -2.1 | +44.0 | +0.5 | -33.4 | +41.5 | +24.6 | +15.2 | +13.0 | +17.5 | +28.1 | |
| Step | 169 | 172 | 176 | 179 | 182 | 184 | 187 | 190 | 192 | 194 | 197 | 199 | 201 | 203 | 205 | 207 | |
Approximation of EDONOIs
Based on harmonics with less than 1 cent of error, 186zpi can be approximated by 96ed5, 124ed8 (or every 3 steps of 124edo), 143ed11, 153ed13, 169ed17, 187ed23, and 192ed25.
Intervals and notation
There are several ways to approach notation. The simplest method involves using the notations from 41edo. However, this method does not preserve octave compression when rendered by notation software. To address this issue, consider using the ups and downs notation from 124edo at every 3-degree step (i.e., the edonoi 124ed8).
It is important to note that 124edo provides two possible fifths (3/2). The closest one, from the val <124 197] (i.e. the patent val), is the fifth mapped to 73 steps of 124edo with a relative error of +46.465%. The second closest, from the val <124 196] (i.e. the val 124b), is mapped to 72 steps of 124edo with a relative error of -53.535%. This second fifth, which appears in 124ed8, also corresponds to the fifth of 31edo. Therefore, we choose to use the ups and downs notation of the 124b temperament, denoted as <124 196].
| JI ratios are comprised of 32-integer limit ratios, and are stylized as follows to indicate their accuracy:
|
Whole tone = 20 steps Limma = 12 steps Apotome = 8 steps | |||
| Degree | Cents | Ratios | Ups and Downs Notation | Step |
|---|---|---|---|---|
| 0 | 0.000 | P1 | 0 | |
| 1 | 29.025 | ^^^1 | 3 | |
| 2 | 58.050 | 32/31, 31/30, 30/29, 29/28, 28/27, 27/26, 26/25, 25/24 | vvA1, ^^d2 | 6 |
| 3 | 87.075 | 24/23, 23/22, 22/21, 21/20, 20/19, 19/18, 18/17 | vvvm2 | 9 |
| 4 | 116.100 | 17/16, 16/15, 31/29, 15/14, 29/27, 14/13 | m2 | 12 |
| 5 | 145.124 | 27/25, 13/12, 25/23, 12/11, 23/21 | ^^^m2 | 15 |
| 6 | 174.149 | 11/10, 32/29, 21/19, 31/28, 10/9 | vvM2 | 18 |
| 7 | 203.174 | 29/26, 19/17, 28/25, 9/8, 26/23, 17/15 | ^M2 | 21 |
| 8 | 232.199 | 25/22, 8/7, 31/27, 23/20 | ^4M2 | 24 |
| 9 | 261.224 | 15/13, 22/19, 29/25, 7/6 | ^^^d3 | 27 |
| 10 | 290.249 | 27/23, 20/17, 13/11, 32/27, 19/16, 25/21, 31/26 | vvm3 | 30 |
| 11 | 319.274 | 6/5, 29/24, 23/19 | ^m3 | 33 |
| 12 | 348.299 | 17/14, 28/23, 11/9, 27/22, 16/13 | ~3 | 36 |
| 13 | 377.323 | 21/17, 26/21, 31/25, 5/4 | vM3 | 39 |
| 14 | 406.348 | 29/23, 24/19, 19/15, 14/11 | ^^M3 | 42 |
| 15 | 435.373 | 23/18, 32/25, 9/7, 31/24, 22/17 | vvvA3 | 45 |
| 16 | 464.398 | 13/10, 30/23, 17/13, 21/16, 25/19, 29/22 | v44 | 48 |
| 17 | 493.423 | 4/3 | v4 | 51 |
| 18 | 522.448 | 31/23, 27/20, 23/17, 19/14, 15/11 | ^^4 | 54 |
| 19 | 551.473 | 26/19, 11/8, 29/21, 18/13 | vvvA4 | 57 |
| 20 | 580.498 | 25/18, 32/23, 7/5, 31/22 | A4 | 60 |
| 21 | 609.523 | 24/17, 17/12, 27/19, 10/7 | vd5 | 63 |
| 22 | 638.547 | 23/16, 13/9, 29/20, 16/11 | ^^d5 | 66 |
| 23 | 667.572 | 19/13, 22/15, 25/17, 28/19, 31/21 | vvv5 | 69 |
| 24 | 696.597 | 3/2 | P5 | 72 |
| 25 | 725.622 | 32/21, 29/19, 26/17, 23/15 | ^^^5 | 75 |
| 26 | 754.647 | 20/13, 17/11, 31/20, 14/9 | vvA5, ^^d6 | 78 |
| 27 | 783.672 | 25/16, 11/7, 30/19, 19/12 | vvvm6 | 81 |
| 28 | 812.697 | 27/17, 8/5, 29/18 | m6 | 84 |
| 29 | 841.722 | 21/13, 13/8, 31/19, 18/11 | ^^^m6 | 87 |
| 30 | 870.746 | 23/14, 28/17, 5/3 | vvM6 | 90 |
| 31 | 899.771 | 32/19, 27/16, 22/13 | ^M6 | 93 |
| 32 | 928.796 | 17/10, 29/17, 12/7, 31/18 | ^4M6 | 96 |
| 33 | 957.821 | 19/11, 26/15, 7/4 | ^^^d7 | 99 |
| 34 | 986.846 | 30/17, 23/13, 16/9 | vvm7 | 102 |
| 35 | 1015.871 | 25/14, 9/5, 29/16 | ^m7 | 105 |
| 36 | 1044.896 | 20/11, 31/17, 11/6 | ~7 | 108 |
| 37 | 1073.921 | 24/13, 13/7, 28/15, 15/8 | vM7 | 111 |
| 38 | 1102.946 | 32/17, 17/9, 19/10 | ^^M7 | 114 |
| 39 | 1131.970 | 21/11, 23/12, 25/13, 27/14, 29/15, 31/16 | vvvA7 | 117 |
| 40 | 1160.995 | v41 +1 oct | 120 | |
| 41 | 1190.020 | 2/1 | v1 +1 oct | 123 |
| 42 | 1219.045 | ^^1 +1 oct | 126 | |
| 43 | 1248.070 | 31/15, 29/14 | vvvA1 +1 oct | 129 |
| 44 | 1277.095 | 27/13, 25/12, 23/11, 21/10 | v4m2 +1 oct | 132 |
| 45 | 1306.120 | 19/9, 17/8, 32/15, 15/7 | vm2 +1 oct | 135 |
| 46 | 1335.145 | 28/13, 13/6 | ^^m2 +1 oct | 138 |
| 47 | 1364.170 | 24/11, 11/5, 31/14 | vvvM2 +1 oct | 141 |
| 48 | 1393.194 | 20/9, 29/13, 9/4 | M2 +1 oct | 144 |
| 49 | 1422.219 | 25/11, 16/7 | ^^^M2 +1 oct | 147 |
| 50 | 1451.244 | 23/10, 30/13 | vvA2 +1 oct, ^^d3 +1 oct | 150 |
| 51 | 1480.269 | 7/3, 26/11 | vvvm3 +1 oct | 153 |
| 52 | 1509.294 | 19/8, 31/13, 12/5 | m3 +1 oct | 156 |
| 53 | 1538.319 | 29/12, 17/7, 22/9 | ^^^m3 +1 oct | 159 |
| 54 | 1567.344 | 27/11, 32/13 | vvM3 +1 oct | 162 |
| 55 | 1596.369 | 5/2 | ^M3 +1 oct | 165 |
| 56 | 1625.393 | 28/11, 23/9, 18/7 | ^4M3 +1 oct | 168 |
| 57 | 1654.418 | 31/12, 13/5 | ^^^d4 +1 oct | 171 |
| 58 | 1683.443 | 21/8, 29/11 | vv4 +1 oct | 174 |
| 59 | 1712.468 | 8/3, 27/10 | ^4 +1 oct | 177 |
| 60 | 1741.493 | 19/7, 30/11, 11/4 | ~4 +1 oct | 180 |
| 61 | 1770.518 | 25/9, 14/5 | vA4 +1 oct | 183 |
| 62 | 1799.543 | 31/11, 17/6 | ^^A4 +1 oct, vvd5 +1 oct | 186 |
| 63 | 1828.568 | 20/7, 23/8, 26/9 | ^d5 +1 oct | 189 |
| 64 | 1857.593 | 29/10, 32/11 | ~5 +1 oct | 192 |
| 65 | 1886.617 | v5 +1 oct | 195 | |
| 66 | 1915.642 | 3/1 | ^^5 +1 oct | 198 |
| 67 | 1944.667 | 31/10 | vvvA5 +1 oct | 201 |
| 68 | 1973.692 | 28/9, 25/8, 22/7 | v4m6 +1 oct | 204 |
| 69 | 2002.717 | 19/6, 16/5 | vm6 +1 oct | 207 |
| 70 | 2031.742 | 29/9, 13/4 | ^^m6 +1 oct | 210 |
| 71 | 2060.767 | 23/7 | vvvM6 +1 oct | 213 |
| 72 | 2089.792 | 10/3 | M6 +1 oct | 216 |
| 73 | 2118.816 | 27/8, 17/5, 24/7 | ^^^M6 +1 oct | 219 |
| 74 | 2147.841 | 31/9 | vvA6 +1 oct, ^^d7 +1 oct | 222 |
| 75 | 2176.866 | 7/2 | vvvm7 +1 oct | 225 |
| 76 | 2205.891 | 32/9, 25/7, 18/5 | m7 +1 oct | 228 |
| 77 | 2234.916 | 29/8, 11/3 | ^^^m7 +1 oct | 231 |
| 78 | 2263.941 | 26/7 | vvM7 +1 oct | 234 |
| 79 | 2292.966 | 15/4 | ^M7 +1 oct | 237 |
| 80 | 2321.991 | 19/5, 23/6 | ^4M7 +1 oct | 240 |
| 81 | 2351.016 | 27/7, 31/8 | ^^^d1 +2 oct | 243 |
| 82 | 2380.040 | vv1 +2 oct | 246 | |
| 83 | 2409.065 | 4/1 | ^1 +2 oct | 249 |
| 84 | 2438.090 | ^41 +2 oct | 252 | |
| 85 | 2467.115 | 29/7, 25/6 | ^^^d2 +2 oct | 255 |
| 86 | 2496.140 | 21/5, 17/4 | vvm2 +2 oct | 258 |
| 87 | 2525.165 | 30/7, 13/3 | ^m2 +2 oct | 261 |
| 88 | 2554.190 | 22/5 | ~2 +2 oct | 264 |
| 89 | 2583.215 | 31/7 | vM2 +2 oct | 267 |
| 90 | 2612.239 | 9/2 | ^^M2 +2 oct | 270 |
| 91 | 2641.264 | 32/7, 23/5 | vvvA2 +2 oct | 273 |
| 92 | 2670.289 | 14/3 | v4m3 +2 oct | 276 |
| 93 | 2699.314 | 19/4 | vm3 +2 oct | 279 |
| 94 | 2728.339 | 24/5, 29/6 | ^^m3 +2 oct | 282 |
| 95 | 2757.364 | vvvM3 +2 oct | 285 | |
| 96 | 2786.389 | 5/1 | M3 +2 oct | 288 |
| 97 | 2815.414 | ^^^M3 +2 oct | 291 | |
| 98 | 2844.439 | 31/6, 26/5 | vvA3 +2 oct, ^^d4 +2 oct | 294 |
| 99 | 2873.463 | 21/4 | vvv4 +2 oct | 297 |
| 100 | 2902.488 | 16/3 | P4 +2 oct | 300 |
| 101 | 2931.513 | 27/5 | ^^^4 +2 oct | 303 |
| 102 | 2960.538 | 11/2 | vvA4 +2 oct | 306 |
| 103 | 2989.563 | 28/5, 17/3 | ^A4 +2 oct | 309 |
| 104 | 3018.588 | 23/4 | d5 +2 oct | 312 |
| 105 | 3047.613 | 29/5 | ^^^d5 +2 oct | 315 |
| 106 | 3076.638 | vv5 +2 oct | 318 | |
| 107 | 3105.663 | 6/1 | ^5 +2 oct | 321 |
| 108 | 3134.687 | ^45 +2 oct | 324 | |
| 109 | 3163.712 | 31/5, 25/4 | ^^^d6 +2 oct | 327 |
| 110 | 3192.737 | 19/3 | vvm6 +2 oct | 330 |
| 111 | 3221.762 | 32/5 | ^m6 +2 oct | 333 |
| 112 | 3250.787 | 13/2 | ~6 +2 oct | 336 |
| 113 | 3279.812 | 20/3 | vM6 +2 oct | 339 |
| 114 | 3308.837 | 27/4 | ^^M6 +2 oct | 342 |
| 115 | 3337.862 | vvvA6 +2 oct | 345 | |
| 116 | 3366.886 | 7/1 | v4m7 +2 oct | 348 |
| 117 | 3395.911 | vm7 +2 oct | 351 | |
| 118 | 3424.936 | 29/4 | ^^m7 +2 oct | 354 |
| 119 | 3453.961 | 22/3 | vvvM7 +2 oct | 357 |
| 120 | 3482.986 | 15/2 | M7 +2 oct | 360 |
| 121 | 3512.011 | 23/3 | ^^^M7 +2 oct | 363 |
| 122 | 3541.036 | 31/4 | vvA7 +2 oct, ^^d1 +3 oct | 366 |
| 123 | 3570.061 | vvv1 +3 oct | 369 | |
| 124 | 3599.086 | 8/1 | P1 +3 oct | 372 |
| 125 | 3628.110 | ^^^1 +3 oct | 375 | |
| 126 | 3657.135 | 25/3 | vvA1 +3 oct, ^^d2 +3 oct | 378 |
| 127 | 3686.160 | vvvm2 +3 oct | 381 | |
| 128 | 3715.185 | 17/2 | m2 +3 oct | 384 |
| 129 | 3744.210 | 26/3 | ^^^m2 +3 oct | 387 |
| 130 | 3773.235 | vvM2 +3 oct | 390 | |
| 131 | 3802.260 | 9/1 | ^M2 +3 oct | 393 |
| 132 | 3831.285 | ^4M2 +3 oct | 396 | |
| 133 | 3860.309 | 28/3 | ^^^d3 +3 oct | 399 |
| 134 | 3889.334 | 19/2 | vvm3 +3 oct | 402 |
| 135 | 3918.359 | 29/3 | ^m3 +3 oct | 405 |
| 136 | 3947.384 | ~3 +3 oct | 408 | |
| 137 | 3976.409 | 10/1 | vM3 +3 oct | 411 |
| 138 | 4005.434 | ^^M3 +3 oct | 414 | |
| 139 | 4034.459 | 31/3 | vvvA3 +3 oct | 417 |
| 140 | 4063.484 | 21/2 | v44 +3 oct | 420 |
| 141 | 4092.509 | 32/3 | v4 +3 oct | 423 |
| 142 | 4121.533 | ^^4 +3 oct | 426 | |
| 143 | 4150.558 | 11/1 | vvvA4 +3 oct | 429 |
| 144 | 4179.583 | A4 +3 oct | 432 | |
| 145 | 4208.608 | vd5 +3 oct | 435 | |
| 146 | 4237.633 | 23/2 | ^^d5 +3 oct | 438 |
| 147 | 4266.658 | vvv5 +3 oct | 441 | |
| 148 | 4295.683 | 12/1 | P5 +3 oct | 444 |
| 149 | 4324.708 | ^^^5 +3 oct | 447 | |
| 150 | 4353.732 | vvA5 +3 oct, ^^d6 +3 oct | 450 | |
| 151 | 4382.757 | 25/2 | vvvm6 +3 oct | 453 |
| 152 | 4411.782 | m6 +3 oct | 456 | |
| 153 | 4440.807 | 13/1 | ^^^m6 +3 oct | 459 |
| 154 | 4469.832 | vvM6 +3 oct | 462 | |
| 155 | 4498.857 | 27/2 | ^M6 +3 oct | 465 |
| 156 | 4527.882 | ^4M6 +3 oct | 468 | |
| 157 | 4556.907 | 14/1 | ^^^d7 +3 oct | 471 |
| 158 | 4585.932 | vvm7 +3 oct | 474 | |
| 159 | 4614.956 | ^m7 +3 oct | 477 | |
| 160 | 4643.981 | 29/2 | ~7 +3 oct | 480 |
| 161 | 4673.006 | vM7 +3 oct | 483 | |
| 162 | 4702.031 | 15/1 | ^^M7 +3 oct | 486 |
| 163 | 4731.056 | 31/2 | vvvA7 +3 oct | 489 |
| 164 | 4760.081 | v41 +4 oct | 492 | |
| 165 | 4789.106 | 16/1 | v1 +4 oct | 495 |
| 166 | 4818.131 | ^^1 +4 oct | 498 | |
| 167 | 4847.156 | vvvA1 +4 oct | 501 | |
| 168 | 4876.180 | v4m2 +4 oct | 504 | |
| 169 | 4905.205 | 17/1 | vm2 +4 oct | 507 |
| 170 | 4934.230 | ^^m2 +4 oct | 510 | |
| 171 | 4963.255 | vvvM2 +4 oct | 513 | |
| 172 | 4992.280 | 18/1 | M2 +4 oct | 516 |
| 173 | 5021.305 | ^^^M2 +4 oct | 519 | |
| 174 | 5050.330 | vvA2 +4 oct, ^^d3 +4 oct | 522 | |
| 175 | 5079.355 | vvvm3 +4 oct | 525 | |
| 176 | 5108.379 | 19/1 | m3 +4 oct | 528 |
| 177 | 5137.404 | ^^^m3 +4 oct | 531 | |
| 178 | 5166.429 | vvM3 +4 oct | 534 | |
| 179 | 5195.454 | 20/1 | ^M3 +4 oct | 537 |
| 180 | 5224.479 | ^4M3 +4 oct | 540 | |
| 181 | 5253.504 | ^^^d4 +4 oct | 543 | |
| 182 | 5282.529 | 21/1 | vv4 +4 oct | 546 |
| 183 | 5311.554 | ^4 +4 oct | 549 | |
| 184 | 5340.579 | 22/1 | ~4 +4 oct | 552 |
| 185 | 5369.603 | vA4 +4 oct | 555 | |
| 186 | 5398.628 | ^^A4 +4 oct, vvd5 +4 oct | 558 | |
| 187 | 5427.653 | 23/1 | ^d5 +4 oct | 561 |
| 188 | 5456.678 | ~5 +4 oct | 564 | |
| 189 | 5485.703 | v5 +4 oct | 567 | |
| 190 | 5514.728 | 24/1 | ^^5 +4 oct | 570 |
| 191 | 5543.753 | vvvA5 +4 oct | 573 | |
| 192 | 5572.778 | 25/1 | v4m6 +4 oct | 576 |
| 193 | 5601.802 | vm6 +4 oct | 579 | |
| 194 | 5630.827 | 26/1 | ^^m6 +4 oct | 582 |
| 195 | 5659.852 | vvvM6 +4 oct | 585 | |
| 196 | 5688.877 | M6 +4 oct | 588 | |
| 197 | 5717.902 | 27/1 | ^^^M6 +4 oct | 591 |
| 198 | 5746.927 | vvA6 +4 oct, ^^d7 +4 oct | 594 | |
| 199 | 5775.952 | 28/1 | vvvm7 +4 oct | 597 |
| 200 | 5804.977 | m7 +4 oct | 600 | |
| 201 | 5834.002 | 29/1 | ^^^m7 +4 oct | 603 |
| 202 | 5863.026 | vvM7 +4 oct | 606 | |
| 203 | 5892.051 | 30/1 | ^M7 +4 oct | 609 |
| 204 | 5921.076 | ^4M7 +4 oct | 612 | |
| 205 | 5950.101 | 31/1 | ^^^d1 +5 oct | 615 |
| 206 | 5979.126 | vv1 +5 oct | 618 | |
| 207 | 6008.151 | 32/1 | ^1 +5 oct | 621 |
Approximation to JI
The following table illustrates the representation of the 32-integer limit intervals in 186zpi. Prime harmonics are in bold; inconsistent intervals are in italic.
| Ratio | Error (abs, ¢) | Error (rel, %) |
|---|---|---|
| 17/13 | +0.030 | +0.102 |
| 5/1 | -0.075 | -0.259 |
| 25/17 | +0.100 | +0.344 |
| 25/13 | +0.129 | +0.446 |
| 23/11 | -0.138 | -0.477 |
| 25/1 | -0.150 | -0.517 |
| 11/8 | -0.155 | -0.533 |
| 17/5 | -0.175 | -0.602 |
| 13/5 | -0.204 | -0.704 |
| 17/1 | -0.250 | -0.861 |
| 13/1 | -0.279 | -0.963 |
| 9/7 | -0.289 | -0.996 |
| 23/8 | -0.293 | -1.011 |
| 23/1 | +0.621 | +2.140 |
| 31/29 | -0.641 | -2.209 |
| 30/29 | +0.642 | +2.211 |
| 23/5 | +0.696 | +2.399 |
| 29/6 | -0.717 | -2.470 |
| 9/8 | +0.736 | +2.535 |
| 11/1 | +0.760 | +2.617 |
| 25/23 | -0.771 | -2.657 |
| 11/5 | +0.835 | +2.876 |
| 23/17 | +0.871 | +3.001 |
| 21/19 | -0.881 | -3.037 |
| 11/9 | -0.891 | -3.069 |
| 23/13 | +0.901 | +3.103 |
| 25/11 | -0.910 | -3.135 |
| 8/1 | +0.914 | +3.151 |
| 8/5 | +0.990 | +3.409 |
| 17/11 | -1.009 | -3.478 |
| 8/7 | -1.025 | -3.531 |
| 23/9 | -1.029 | -3.546 |
| 13/11 | -1.039 | -3.580 |
| 25/8 | -1.065 | -3.668 |
| 17/8 | -1.164 | -4.012 |
| 27/19 | -1.171 | -4.033 |
| 11/7 | -1.180 | -4.065 |
| 13/8 | -1.194 | -4.114 |
| 31/30 | -1.283 | -4.420 |
| 23/7 | -1.318 | -4.542 |
| 31/6 | -1.358 | -4.679 |
| 9/1 | +1.650 | +5.686 |
| 9/5 | +1.725 | +5.944 |
| 20/19 | +1.726 | +5.947 |
| 25/9 | -1.800 | -6.203 |
| 19/4 | -1.801 | -6.205 |
| 17/9 | -1.900 | -6.547 |
| 24/19 | -1.906 | -6.568 |
| 13/9 | -1.930 | -6.649 |
| 7/1 | +1.939 | +6.682 |
| 7/5 | +2.015 | +6.941 |
| 31/28 | +2.060 | +7.099 |
| 25/7 | -2.090 | -7.199 |
| 17/7 | -2.189 | -7.543 |
| 13/7 | -2.219 | -7.645 |
| 21/20 | -2.607 | -8.984 |
| 21/4 | -2.683 | -9.242 |
| 29/28 | +2.702 | +9.308 |
| 32/19 | +2.716 | +9.356 |
| 19/3 | +2.821 | +9.719 |
| 19/15 | +2.896 | +9.977 |
| 27/20 | -2.897 | -9.980 |
| 27/4 | -2.972 | -10.238 |
| 32/31 | -3.085 | -10.630 |
| 15/14 | +3.343 | +11.519 |
| 14/3 | -3.418 | -11.777 |
| 13/6 | +3.428 | +11.811 |
| 17/6 | +3.458 | +11.913 |
| 30/13 | -3.503 | -12.069 |
| 30/17 | -3.533 | -12.171 |
| 25/6 | +3.557 | +12.256 |
| 32/21 | +3.597 | +12.393 |
| 6/5 | -3.632 | -12.515 |
| 6/1 | -3.708 | -12.774 |
| 32/29 | -3.726 | -12.839 |
| 28/19 | +3.741 | +12.887 |
| 30/1 | -3.783 | -13.032 |
| 32/27 | +3.886 | +13.389 |
| 31/4 | +4.000 | +13.781 |
| 31/20 | +4.075 | +14.039 |
| 29/13 | -4.145 | -14.280 |
| 29/17 | -4.174 | -14.382 |
| 29/25 | -4.274 | -14.726 |
| 23/6 | +4.329 | +14.914 |
| 12/7 | +4.333 | +14.928 |
| 29/5 | -4.349 | -14.985 |
| 16/15 | -4.368 | -15.050 |
| 30/23 | -4.404 | -15.172 |
| 29/1 | -4.424 | -15.243 |
| 16/3 | -4.443 | -15.309 |
| 11/6 | +4.467 | +15.391 |
| 22/15 | -4.523 | -15.583 |
| 30/11 | -4.542 | -15.649 |
| 20/3 | +4.547 | +15.666 |
| 22/3 | -4.598 | -15.842 |
| 4/3 | +4.622 | +15.924 |
| 29/4 | +4.641 | +15.990 |
| 15/4 | -4.697 | -16.183 |
| 29/20 | +4.716 | +16.248 |
| 31/13 | -4.786 | -16.489 |
| 31/17 | -4.816 | -16.591 |
| 28/27 | +4.911 | +16.920 |
| 31/25 | -4.915 | -16.935 |
| 31/5 | -4.990 | -17.194 |
| 29/23 | -5.046 | -17.383 |
| 31/1 | -5.066 | -17.452 |
| 27/14 | +5.069 | +17.463 |
| 29/11 | -5.184 | -17.860 |
| 15/2 | +5.283 | +18.201 |
| 29/8 | -5.339 | -18.394 |
| 3/2 | +5.358 | +18.459 |
| 10/3 | -5.433 | -18.718 |
| 12/11 | +5.513 | +18.993 |
| 32/3 | +5.536 | +19.075 |
| 26/15 | -5.562 | -19.164 |
| 32/15 | +5.612 | +19.334 |
| 26/3 | -5.637 | -19.422 |
| 7/6 | +5.647 | +19.456 |
| 23/12 | -5.651 | -19.470 |
| 31/23 | -5.687 | -19.592 |
| 30/7 | -5.722 | -19.714 |
| 31/19 | +5.801 | +19.986 |
| 31/11 | -5.825 | -20.069 |
| 31/8 | -5.980 | -20.603 |
| 29/9 | -6.075 | -20.929 |
| 27/16 | +6.094 | +20.994 |
| 19/14 | +6.239 | +21.496 |
| 27/22 | +6.248 | +21.528 |
| 12/1 | +6.272 | +21.610 |
| 12/5 | +6.347 | +21.869 |
| 29/7 | -6.364 | -21.925 |
| 21/16 | +6.383 | +21.991 |
| 25/12 | -6.422 | -22.127 |
| 29/19 | +6.442 | +22.195 |
| 17/12 | -6.522 | -22.471 |
| 19/18 | +6.528 | +22.492 |
| 22/21 | -6.538 | -22.524 |
| 13/12 | -6.552 | -22.573 |
| 28/3 | +6.561 | +22.606 |
| 28/15 | +6.637 | +22.865 |
| 31/21 | +6.682 | +23.023 |
| 31/9 | -6.716 | -23.138 |
| 28/13 | -6.846 | -23.588 |
| 28/17 | -6.876 | -23.690 |
| 31/27 | +6.972 | +24.019 |
| 28/25 | -6.976 | -24.034 |
| 31/7 | -7.005 | -24.134 |
| 27/2 | +7.008 | +24.145 |
| 28/5 | -7.051 | -24.292 |
| 27/10 | +7.083 | +24.404 |
| 30/19 | +7.084 | +24.406 |
| 28/1 | -7.126 | -24.551 |
| 19/6 | -7.159 | -24.665 |
| 19/16 | +7.264 | +25.027 |
| 27/26 | +7.288 | +25.108 |
| 21/2 | +7.297 | +25.141 |
| 29/21 | +7.324 | +25.232 |
| 21/10 | +7.372 | +25.400 |
| 22/19 | -7.419 | -25.561 |
| 26/21 | -7.577 | -26.104 |
| 29/27 | +7.613 | +26.228 |
| 31/24 | +7.707 | +26.554 |
| 28/23 | -7.747 | -26.691 |
| 26/7 | +7.761 | +26.739 |
| 32/13 | -7.871 | -27.119 |
| 28/11 | -7.886 | -27.168 |
| 32/17 | -7.901 | -27.221 |
| 10/7 | +7.965 | +27.443 |
| 32/25 | -8.001 | -27.565 |
| 7/2 | -8.040 | -27.702 |
| 26/9 | +8.050 | +27.735 |
| 32/5 | -8.076 | -27.824 |
| 32/1 | -8.151 | -28.082 |
| 19/2 | +8.179 | +28.178 |
| 19/10 | +8.254 | +28.437 |
| 10/9 | +8.254 | +28.439 |
| 9/2 | -8.329 | -28.698 |
| 29/24 | +8.348 | +28.763 |
| 26/19 | -8.458 | -29.141 |
| 31/3 | +8.622 | +29.705 |
| 31/15 | +8.697 | +29.964 |
| 32/23 | -8.772 | -30.222 |
| 28/9 | -8.776 | -30.237 |
| 13/4 | +8.786 | +30.270 |
| 22/7 | +8.800 | +30.319 |
| 17/4 | +8.815 | +30.372 |
| 20/13 | -8.861 | -30.529 |
| 20/17 | -8.891 | -30.631 |
| 32/11 | -8.910 | -30.699 |
| 25/4 | +8.915 | +30.716 |
| 26/11 | +8.941 | +30.803 |
| 16/7 | +8.955 | +30.852 |
| 5/4 | +8.990 | +30.974 |
| 4/1 | -9.065 | -31.233 |
| 26/23 | +9.079 | +31.281 |
| 22/9 | +9.089 | +31.315 |
| 20/1 | -9.140 | -31.492 |
| 11/10 | -9.145 | -31.508 |
| 11/2 | -9.220 | -31.766 |
| 16/9 | +9.244 | +31.848 |
| 29/3 | +9.263 | +31.914 |
| 23/10 | -9.284 | -31.985 |
| 29/15 | +9.338 | +32.173 |
| 23/2 | -9.359 | -32.243 |
| 23/4 | +9.686 | +33.373 |
| 18/7 | +9.691 | +33.387 |
| 26/1 | +9.700 | +33.421 |
| 23/20 | +9.762 | +33.632 |
| 26/5 | +9.775 | +33.679 |
| 32/9 | -9.801 | -33.768 |
| 11/4 | +9.825 | +33.850 |
| 26/25 | +9.850 | +33.938 |
| 20/11 | -9.900 | -34.109 |
| 10/1 | +9.905 | +34.125 |
| 26/17 | +9.950 | +34.282 |
| 2/1 | +9.980 | +34.384 |
| 5/2 | -10.055 | -34.642 |
| 32/7 | -10.090 | -34.764 |
| 23/22 | -10.118 | -34.861 |
| 25/2 | -10.130 | -34.901 |
| 16/11 | +10.135 | +34.917 |
| 17/10 | -10.155 | -34.986 |
| 13/10 | -10.184 | -35.088 |
| 17/2 | -10.230 | -35.244 |
| 13/2 | -10.259 | -35.346 |
| 14/9 | +10.269 | +35.380 |
| 23/16 | -10.273 | -35.394 |
| 19/13 | -10.587 | -36.475 |
| 19/17 | -10.617 | -36.577 |
| 29/12 | -10.697 | -36.853 |
| 9/4 | +10.716 | +36.919 |
| 25/19 | +10.716 | +36.921 |
| 22/1 | +10.739 | +37.001 |
| 20/9 | -10.791 | -37.177 |
| 19/5 | -10.791 | -37.180 |
| 22/5 | +10.814 | +37.259 |
| 19/1 | -10.866 | -37.438 |
| 18/11 | +10.870 | +37.452 |
| 25/22 | -10.890 | -37.518 |
| 16/1 | +10.894 | +37.534 |
| 16/5 | +10.969 | +37.793 |
| 22/17 | +10.989 | +37.862 |
| 7/4 | +11.005 | +37.915 |
| 23/18 | -11.009 | -37.929 |
| 22/13 | +11.019 | +37.964 |
| 25/16 | -11.044 | -38.052 |
| 20/7 | -11.080 | -38.174 |
| 17/16 | -11.144 | -38.395 |
| 14/11 | +11.160 | +38.448 |
| 16/13 | +11.174 | +38.497 |
| 23/14 | -11.298 | -38.925 |
| 31/12 | -11.338 | -39.062 |
| 21/13 | -11.468 | -39.512 |
| 23/19 | +11.488 | +39.579 |
| 21/17 | -11.498 | -39.614 |
| 25/21 | +11.598 | +39.958 |
| 19/11 | -11.626 | -40.056 |
| 18/1 | +11.630 | +40.069 |
| 21/5 | -11.673 | -40.216 |
| 18/5 | +11.705 | +40.328 |
| 21/1 | -11.748 | -40.475 |
| 27/13 | -11.758 | -40.508 |
| 25/18 | -11.780 | -40.587 |
| 19/8 | -11.781 | -40.589 |
| 27/17 | -11.787 | -40.610 |
| 18/17 | +11.880 | +40.930 |
| 19/12 | +11.886 | +40.952 |
| 27/25 | -11.887 | -40.954 |
| 18/13 | +11.910 | +41.032 |
| 14/1 | +11.919 | +41.066 |
| 27/5 | -11.962 | -41.213 |
| 14/5 | +11.994 | +41.324 |
| 27/1 | -12.037 | -41.471 |
| 31/14 | +12.040 | +41.482 |
| 25/14 | -12.069 | -41.583 |
| 17/14 | -12.169 | -41.926 |
| 14/13 | +12.199 | +42.028 |
| 31/18 | +12.329 | +42.478 |
| 23/21 | +12.369 | +42.615 |
| 24/13 | -12.493 | -43.044 |
| 21/11 | -12.507 | -43.092 |
| 19/9 | -12.517 | -43.124 |
| 24/17 | -12.523 | -43.146 |
| 25/24 | +12.623 | +43.489 |
| 27/23 | -12.658 | -43.611 |
| 21/8 | -12.662 | -43.626 |
| 29/14 | +12.681 | +43.691 |
| 24/5 | -12.698 | -43.748 |
| 24/1 | -12.773 | -44.006 |
| 27/11 | -12.797 | -44.089 |
| 19/7 | -12.806 | -44.120 |
| 27/8 | -12.951 | -44.622 |
| 29/18 | +12.970 | +44.687 |
| 31/16 | +13.065 | +45.014 |
| 31/22 | +13.220 | +45.547 |
| 15/7 | +13.323 | +45.902 |
| 24/23 | -13.394 | -46.147 |
| 7/3 | -13.398 | -46.161 |
| 13/3 | +13.408 | +46.194 |
| 17/3 | +13.437 | +46.296 |
| 15/13 | -13.483 | -46.453 |
| 17/15 | +13.513 | +46.555 |
| 24/11 | -13.532 | -46.624 |
| 25/3 | +13.537 | +46.640 |
| 5/3 | +13.612 | +46.898 |
| 3/1 | -13.687 | -47.157 |
| 29/16 | +13.706 | +47.223 |
| 15/1 | -13.762 | -47.416 |
| 29/22 | +13.861 | +47.756 |
| 27/7 | -13.976 | -48.153 |
| 31/2 | +13.980 | +48.164 |
| 31/10 | +14.055 | +48.423 |
| 29/26 | -14.125 | -48.664 |
| 31/26 | +14.259 | +49.127 |
| 23/3 | +14.308 | +49.297 |
| 24/7 | +14.313 | +49.312 |
| 29/10 | -14.329 | -49.368 |
| 15/8 | +14.348 | +49.434 |
| 23/15 | +14.384 | +49.556 |
| 29/2 | -14.404 | -49.627 |
| 8/3 | -14.423 | -49.692 |
| 11/3 | +14.447 | +49.774 |
| 15/11 | +14.503 | +49.967 |