Xenharmonikon
Scales from the 18 printed issues of Xenharmonikon, an informal journal of experimental music, published 1974–2006.
1696 scales
| File | Description | Notes | Period (¢) | Limit |
|---|---|---|---|---|
| xen02-wilson-arabic | Classic Arabic System of 17 tones (for Gary) | 17 | 1200.0 | 5 |
| xen02-wilson-combination-sets | 1*3*5*7*9*11 Combination Sets - 1 3 5 7 9 11 Diamondic Cross-Set | 32 | 1200.0 | 11 |
| xen02-wilson-indic | Indic system of 22 s'ruti (for you, Lou) | 22 | 1200.0 | 5 |
| xen03-colvig-gamelan-7-11 | Colvig's American Gamelan 7-11 scale | 5 | 1200.0 | 11 |
| xen03-secor-partch | Partch Monophonic Fabric | 43 | 1200.0 | 11 |
| xen03-wilson-acute-05 | Acute, linear-mapped intonational system, 5 notes | 5 | 1200.0 | 7 |
| xen03-wilson-acute-07 | Acute, linear-mapped intonational system, 7 notes | 7 | 1200.0 | 7 |
| xen03-wilson-acute-12 | Acute, linear-mapped intonational system, 12 notes | 12 | 1200.0 | 7 |
| xen03-wilson-acute-17 | Acute, linear-mapped intonational system, 17 notes | 17 | 1200.0 | 7 |
| xen03-wilson-acute-22 | Acute, linear-mapped intonational system, 22 notes | 22 | 1200.0 | 7 |
| xen03-wilson-baglama | Turkish Baglama Scale (as inferred from string lengths by E.W.) | 17 | 1200.0 | 11 |
| xen03-wilson-negative-05 | Negative, linear-mapped intonational system, 5 notes | 5 | 1200.0 | 5 |
| xen03-wilson-negative-07 | Negative, linear-mapped intonational system, 7 notes | 7 | 1200.0 | 5 |
| xen03-wilson-negative-12 | Negative, linear-mapped intonational system, 12 notes | 12 | 1200.0 | 5 |
| xen03-wilson-negative-19 | Negative, linear-mapped intonational system, 19 notes | 19 | 1200.0 | 7 |
| xen03-wilson-negative-31 | Negative, linear-mapped intonational system, 31 notes | 31 | 1200.0 | 11 |
| xen03-wilson-partch | Harry Partch's Scale on the Bosanquet keyboard | 41 | 1200.0 | 11 |
| xen03-wilson-positive-05 | Positive, linear-mapped intonational system, 5 notes | 5 | 1200.0 | 3 |
| xen03-wilson-positive-07 | Positive, linear-mapped intonational system, 7 notes | 7 | 1200.0 | 3 |
| xen03-wilson-positive-12 | Positive, linear-mapped intonational system, 12 notes | 12 | 1200.0 | 3 |
| xen03-wilson-positive-17 | Positive, linear-mapped intonational system, 17 notes | 17 | 1200.0 | 5 |
| xen03-wilson-positive-29 | Positive, linear-mapped intonational system, 29 notes | 29 | 1200.0 | 7 |
| xen03-wilson-positive-41 | Positive, linear-mapped intonational system, 41 notes | 41 | 1200.0 | 11 |
| xen05-harrison-cinna | Scale for 'Incidental Music for Corneille's "Cinna"' | 12 | 1200.0 | 7 |
| xen05-secor-2 | Secor No. 2 | 12 | 1200.0 | |
| xen05-secor-3 | Secor No. 3 | 12 | 1200.0 | |
| xen05-secor-high-tolerance | Secor 15-limit high tolerance temperament | 29 | 1200.0 | |
| xen05-secor-high-tolerance-19 | Secor 15-limit high tolerance temperament, 19-tone subset | 19 | 1200.0 | |
| xen05-secor-high-tolerance-31 | Secor 15-limit high tolerance temperament, extended for 31-tone keyboard | 31 | 1200.0 | |
| xen05-walker-golden | Scale used in the composition 'The Golden Net' | 21 | 1200.0 | 11 |
| xen05-wilson-scott | A Scale for Scott | 19 | 1200.0 | 5 |
| xen06-london-ditone-diatonic | Tuning for 'Eight Pieces for Harp in Ditone Diatonic' | 7 | 1200.0 | 3 |
| xen06-polansky-study-1 | Octave I and II tuning for 'Piano Study #5 (For JPR)' | 12 | 1200.0 | 7 |
| xen06-polansky-study-3 | Octave III tuning for 'Piano Study #5 (For JPR)' | 12 | 1200.0 | 13 |
| xen06-polansky-study-4 | Octave IV tuning for 'Piano Study #5 (For JPR)' | 12 | 1200.0 | 11 |
| xen06-polansky-study-full | Full four octave tuning for 'Piano Study #5 (For JPR)' | 48 | 4800.0 | 13 |
| xen06-vyshnegradski-nonoctave-1 | Non-octave scale based on the subminor ninth | 8 | 1250.0 | |
| xen06-vyshnegradski-nonoctave-2 | Non-octave scale based on the neutral sixth | 5 | 850.0 | |
| xen06-vyshnegradski-nonoctave-3 | Non-octave scale based on the double octave | 11 | 2400.0 | |
| xen06-wilson-clavichord-19 | Scale for the Clavichord-19 | 19 | 1200.0 | 11 |
| xen07-chalmers-19-31 | 19-31 | 19 | 1200.0 | 7 |
| xen07-chalmers-19-31-equal | 19 of 31-Equal | 19 | 1200.0 | |
| xen07-chalmers-19-50-equal | 19 of 50 Equal | 19 | 1200.0 | |
| xen07-chalmers-19-equal | 19-Equal | 19 | 1200.0 | |
| xen07-chalmers-ariel | Ariel | 19 | 1200.0 | 5 |
| xen07-chalmers-chalmers | Chalmers | 19 | 1200.0 | 7 |
| xen07-chalmers-diaphonic-a | Wilson's Diaphonic Cycles A | 19 | 1200.0 | 31 |
| xen07-chalmers-diaphonic-b | Wilson's Diaphonic Cycles B | 19 | 1200.0 | 31 |
| xen07-chalmers-diaphonic-c | Wilson's Diaphonic Cycles C | 19 | 1200.0 | 31 |
| xen07-chalmers-diaphonic-d | Wilson's Diaphonic Cycles D | 19 | 1200.0 | 31 |
| xen07-chalmers-fifth-comma | 19 of 1/5 Comma | 19 | 1200.0 | |
| xen07-chalmers-fokker | Fokker | 19 | 1200.0 | 5 |
| xen07-chalmers-fokker-h | Fokker-H | 19 | 1200.0 | 5 |
| xen07-chalmers-fokker-k | Fokker-K | 19 | 1200.0 | 5 |
| xen07-chalmers-fokker-l | Fokker-L | 19 | 1200.0 | 7 |
| xen07-chalmers-hanson | Hanson-19 | 19 | 1200.0 | |
| xen07-chalmers-hanson-just | Hanson-19 | 19 | 1200.0 | 5 |
| xen07-chalmers-kornerup | Kornerup | 19 | 1200.0 | |
| xen07-chalmers-lst | 3.5.7 LST | 19 | 1200.0 | |
| xen07-chalmers-mandelbaum-1 | Mandelbaum-1 | 19 | 1200.0 | 5 |
| xen07-chalmers-mandelbaum-2 | Mandelbaum-2 | 19 | 1200.0 | 7 |
| xen07-chalmers-meantone | 19 of Meantone | 19 | 1200.0 | |
| xen07-chalmers-mercator | Mercator | 19 | 1200.0 | |
| xen07-chalmers-opelt | Opelt | 19 | 1200.0 | 5 |
| xen07-chalmers-partch | Partch | 19 | 1200.0 | 7 |
| xen07-chalmers-perrett | Perrett | 19 | 1200.0 | 7 |
| xen07-chalmers-rvf-1 | RVF-1 | 19 | 1200.0 | |
| xen07-chalmers-rvf-2 | RVF-2 | 19 | 1200.0 | |
| xen07-chalmers-rvf-3 | RVF-3 | 19 | 1200.0 | |
| xen07-chalmers-scalatron | Scalatron-19 | 19 | 1200.0 | 5 |
| xen07-chalmers-sixth-comma | 19 of 1/6 Comma | 19 | 1200.0 | |
| xen07-chalmers-smith | Smith-19 | 19 | 1200.0 | |
| xen07-chalmers-smith-just | Smith-19 | 19 | 1200.0 | 7 |
| xen07-chalmers-two-ninth-comma | 19 of 2/9 Comma | 19 | 1200.0 | |
| xen07-chalmers-two-seventh-comma | 19 of 2/7 Comma | 19 | 1200.0 | |
| xen07-chalmers-wurschmidt-1 | Wurschmidt-1 | 19 | 1200.0 | 5 |
| xen07-chalmers-wurschmidt-2 | Wurschmidt-2 | 19 | 1200.0 | 5 |
| xen07-forster-diamond | Tuning of the Diamond Marimba II | 41 | 1200.0 | 13 |
| xen07-harrison-thoughts-1 | Pelog based on partials 12/13/14/17/18/19/21 | 7 | 1200.0 | 19 |
| xen07-harrison-thoughts-2 | Pelog based on partials 10/11/12/14/15/16/18 | 7 | 1200.0 | 11 |
| xen07-harrison-thoughts-3 | Pelog based on partials 30/32/35/40/44/47/54 | 7 | 1200.0 | 47 |
| xen07-harrison-thoughts-4 | Slendro with steps 8/7, 7/6, 9/8, 8/7, 7/6 | 5 | 1200.0 | 7 |
| xen07-harrison-thoughts-5 | Slendro based on partials 12/14/16/18/21 | 5 | 1200.0 | 7 |
| xen07-harrison-thoughts-6 | Slendro based on partials 12/14/16/19/21 | 5 | 1200.0 | 19 |
| xen07-harrison-thoughts-7 | Slendro with steps 5/4, 16/15, 9/8, 81/64, 256/243 | 5 | 1200.0 | 5 |
| xen07-harrison-thoughts-8 | Partials 6/7/8/9/11 | 5 | 1200.0 | 11 |
| xen07-london-didymus | Scale for 'Solo in Didymus's Chromatic' | 7 | 1200.0 | 5 |
| xen07-morrison-decimal | Just approximation to ten tone equal temperament. | 10 | 1200.0 | 13 |
| xen07-rosenthal-four-duets-1 | Scale for part I of 'Four duets for bowed psaltery and harp' | 7 | 1200.0 | 5 |
| xen07-rosenthal-four-duets-2 | Scale for part II of 'Four duets for bowed psaltery and harp' | 8 | 1200.0 | 5 |
| xen07-rosenthal-four-duets-3 | Scale for parts III and IV of 'Four duets for bowed psaltery and harp' | 7 | 1200.0 | 5 |
| xen07-rosenthal-helix | Scale for 'Helix Song' | 10 | 1200.0 | 11 |
| xen07-walker-fathomless | Scale for '...out of the fathomless Dark / into the limitless Light...' | 21 | 1200.0 | 7 |
| xen09-chalmers-tritriadic-1-11-13 | Tritriadic scale built from 1:11:13 | 7 | 1200.0 | 13 |
| xen09-chalmers-tritriadic-1-3-5 | Tritriadic scale built from 1:3:5 | 7 | 1200.0 | 5 |
| xen09-chalmers-tritriadic-1-3-7 | Tritriadic scale built from 1:3:7 | 7 | 1200.0 | 7 |
| xen09-chalmers-tritriadic-1-5-11 | Tritriadic scale built from 1:5:11 | 7 | 1200.0 | 11 |
| xen09-chalmers-tritriadic-1-5-13 | Tritriadic scale built from 1:5:13 | 7 | 1200.0 | 13 |
| xen09-chalmers-tritriadic-1-5-7 | Tritriadic scale built from 1:5:7 | 7 | 1200.0 | 7 |
| xen09-chalmers-tritriadic-1-7-11 | Tritriadic scale built from 1:7:11 | 7 | 1200.0 | 11 |
| xen09-chalmers-tritriadic-1-7-9 | Tritriadic scale built from 1:7:9 | 7 | 1200.0 | 7 |
| xen09-chalmers-tritriadic-10-11-12 | Tritriadic scale built from 10:11:12 | 7 | 1200.0 | 11 |
| xen09-chalmers-tritriadic-10-11-15 | Tritriadic scale built from 10:11:15 | 7 | 1200.0 | 11 |
| xen09-chalmers-tritriadic-10-12-15 | Tritriadic scale built from 10:12:15 | 7 | 1200.0 | 5 |
| xen09-chalmers-tritriadic-10-13-15 | Tritriadic scale built from 10:13:15 | 7 | 1200.0 | 13 |
| xen09-chalmers-tritriadic-10-13-18 | Tritriadic scale built from 10:13:18 | 7 | 1200.0 | 13 |
| xen09-chalmers-tritriadic-10-14-15 | Tritriadic scale built from 10:14:15 | 7 | 1200.0 | 7 |
| xen09-chalmers-tritriadic-10-15-11 | Tritriadic scale built from 10:15:11 | 7 | 1200.0 | 11 |
| xen09-chalmers-tritriadic-11-13-15 | Tritriadic scale built from 11:13:15 | 7 | 1200.0 | 13 |
| xen09-chalmers-tritriadic-11-14-20 | Tritriadic scale built from 11:14:20 | 7 | 1200.0 | 11 |
| xen09-chalmers-tritriadic-11-15-20 | Tritriadic scale built from 11:15:20 | 7 | 1200.0 | 11 |
| xen09-chalmers-tritriadic-11-16-20 | Tritriadic scale built from 11:16:20 | 7 | 1200.0 | 11 |
| xen09-chalmers-tritriadic-11-18-15 | Tritriadic scale built from 11:18:15 | 7 | 1200.0 | 11 |
| xen09-chalmers-tritriadic-11-20-18 | Tritriadic scale built from 11:20:18 | 7 | 1200.0 | 11 |
| xen09-chalmers-tritriadic-11-8-6 | Tritriadic scale built from 11:8:6 | 7 | 1200.0 | 11 |
| xen09-chalmers-tritriadic-12-13-18 | Tritriadic scale built from 12:13:18 | 7 | 1200.0 | 13 |
| xen09-chalmers-tritriadic-12-17-18 | Tritriadic scale built from 12:17:18 | 7 | 1200.0 | 17 |
| xen09-chalmers-tritriadic-13-14-16 | Tritriadic scale built from 13:14:16 | 7 | 1200.0 | 13 |
| xen09-chalmers-tritriadic-14-15-17 | Tritriadic scale built from 14:15:17 | 7 | 1200.0 | 17 |
| xen09-chalmers-tritriadic-14-16-17 | Tritriadic scale built from 14:16:17 | 7 | 1200.0 | 17 |
| xen09-chalmers-tritriadic-14-16-21 | Tritriadic scale built from 14:16:21 | 7 | 1200.0 | 7 |
| xen09-chalmers-tritriadic-14-17-21 | Tritriadic scale built from 14:17:21 | 7 | 1200.0 | 17 |
| xen09-chalmers-tritriadic-14-18-21 | Tritriadic scale built from 14:18:21 | 7 | 1200.0 | 7 |
| xen09-chalmers-tritriadic-15-18-22 | Tritriadic scale built from 15:18:22 | 7 | 1200.0 | 11 |
| xen09-chalmers-tritriadic-16-19-24 | Tritriadic scale built from 16:19:24 | 7 | 1200.0 | 19 |
| xen09-chalmers-tritriadic-16-21-24 | Tritriadic scale built from 16:21:24 | 7 | 1200.0 | 7 |
| xen09-chalmers-tritriadic-17-15-14 | Tritriadic scale built from 17:15:14 | 7 | 1200.0 | 17 |
| xen09-chalmers-tritriadic-17-16-14 | Tritriadic scale built from 17:16:14 | 7 | 1200.0 | 17 |
| xen09-chalmers-tritriadic-17-19-21 | Tritriadic scale built from 17:19:21 | 7 | 1200.0 | 19 |
| xen09-chalmers-tritriadic-18-22-27 | Tritriadic scale built from 18:22:27 | 7 | 1200.0 | 11 |
| xen09-chalmers-tritriadic-21-19-17 | Tritriadic scale built from 21:19:17 | 7 | 1200.0 | 19 |
| xen09-chalmers-tritriadic-22-24-27 | Tritriadic scale built from 22:24:27 | 7 | 1200.0 | 11 |
| xen09-chalmers-tritriadic-22-24-33 | Tritriadic scale built from 22:24:33 | 7 | 1200.0 | 11 |
| xen09-chalmers-tritriadic-22-25-27 | Tritriadic scale built from 22:25:27 | 7 | 1200.0 | 11 |
| xen09-chalmers-tritriadic-22-26-33 | Tritriadic scale built from 22:26:33 | 7 | 1200.0 | 13 |
| xen09-chalmers-tritriadic-22-27-33 | Tritriadic scale built from 22:27:33 | 7 | 1200.0 | 11 |
| xen09-chalmers-tritriadic-22-28-33 | Tritriadic scale built from 22:28:33 | 7 | 1200.0 | 11 |
| xen09-chalmers-tritriadic-22-33-24 | Tritriadic scale built from 22:33:24 | 7 | 1200.0 | 11 |
| xen09-chalmers-tritriadic-24-33-44 | Tritriadic scale built from 24:33:44 | 7 | 1200.0 | 11 |
| xen09-chalmers-tritriadic-24-35-26 | Tritriadic scale built from 24:35:26 | 7 | 1200.0 | 13 |
| xen09-chalmers-tritriadic-26-30-39 | Tritriadic scale built from 26:30:39 | 7 | 1200.0 | 13 |
| xen09-chalmers-tritriadic-26-32-39 | Tritriadic scale built from 26:32:39 | 7 | 1200.0 | 13 |
| xen09-chalmers-tritriadic-26-33-39 | Tritriadic scale built from 26:33:39 | 7 | 1200.0 | 13 |
| xen09-chalmers-tritriadic-26-34-39 | Tritriadic scale built from 26:34:39 | 7 | 1200.0 | 17 |
| xen09-chalmers-tritriadic-26-35-48 | Tritriadic scale built from 26:35:48 | 7 | 1200.0 | 13 |
| xen09-chalmers-tritriadic-27-24-22 | Tritriadic scale built from 27:24:22 | 7 | 1200.0 | 11 |
| xen09-chalmers-tritriadic-27-25-22 | Tritriadic scale built from 27:25:22 | 7 | 1200.0 | 11 |
| xen09-chalmers-tritriadic-28-33-42 | Tritriadic scale built from 28:33:42 | 7 | 1200.0 | 11 |
| xen09-chalmers-tritriadic-3-4-5 | Tritriadic scale built from 3:4:5 | 7 | 1200.0 | 5 |
| xen09-chalmers-tritriadic-3-5-7 | Tritriadic scale built from 3:5:7 | 7 | 1200.0 | 7 |
| xen09-chalmers-tritriadic-3-7-9 | Tritriadic scale built from 3:7:9 | 7 | 1200.0 | 7 |
| xen09-chalmers-tritriadic-32-39-48 | Tritriadic scale built from 32:39:48 | 7 | 1200.0 | 13 |
| xen09-chalmers-tritriadic-34-36-51 | Tritriadic scale built from 34:36:51 | 7 | 1200.0 | 17 |
| xen09-chalmers-tritriadic-34-39-51 | Tritriadic scale built from 34:39:51 | 7 | 1200.0 | 17 |
| xen09-chalmers-tritriadic-34-42-51 | Tritriadic scale built from 34:42:51 | 7 | 1200.0 | 17 |
| xen09-chalmers-tritriadic-38-48-47 | Tritriadic scale built from 38:48:47 | 7 | 1200.0 | 47 |
| xen09-chalmers-tritriadic-4-5-6 | Tritriadic scale built from 4:5:6 | 7 | 1200.0 | 5 |
| xen09-chalmers-tritriadic-5-6-7 | Tritriadic scale built from 5:6:7 | 7 | 1200.0 | 7 |
| xen09-chalmers-tritriadic-5-7-9 | Tritriadic scale built from 5:7:9 | 7 | 1200.0 | 7 |
| xen09-chalmers-tritriadic-5-9-8 | Tritriadic scale built from 5:9:8 | 7 | 1200.0 | 5 |
| xen09-chalmers-tritriadic-54-64-81 | Tritriadic scale built from 54:64:81 | 7 | 1200.0 | 3 |
| xen09-chalmers-tritriadic-6-10-11 | Tritriadic scale built from 6:10:11 | 7 | 1200.0 | 11 |
| xen09-chalmers-tritriadic-6-7-8 | Tritriadic scale built from 6:7:8 | 7 | 1200.0 | 7 |
| xen09-chalmers-tritriadic-6-7-9 | Tritriadic scale built from 6:7:9 | 7 | 1200.0 | 7 |
| xen09-chalmers-tritriadic-6-8-11 | Tritriadic scale built from 6:8:11 | 7 | 1200.0 | 11 |
| xen09-chalmers-tritriadic-64-81-96 | Tritriadic scale built from 64:81:96 | 7 | 1200.0 | 3 |
| xen09-chalmers-tritriadic-7-10-13 | Tritriadic scale built from 7:10:13 | 7 | 1200.0 | 13 |
| xen09-chalmers-tritriadic-7-11-13 | Tritriadic scale built from 7:11:13 | 7 | 1200.0 | 13 |
| xen09-chalmers-tritriadic-7-8-11 | Tritriadic scale built from 7:8:11 | 7 | 1200.0 | 11 |
| xen09-chalmers-tritriadic-7-9-11 | Tritriadic scale built from 7:9:11 | 7 | 1200.0 | 11 |
| xen09-chalmers-tritriadic-7-9-13 | Tritriadic scale built from 7:9:13 | 7 | 1200.0 | 13 |
| xen09-chalmers-tritriadic-8-11-12 | Tritriadic scale built from 8:11:12 | 7 | 1200.0 | 11 |
| xen09-chalmers-tritriadic-8-14-13 | Tritriadic scale built from 8:14:13 | 7 | 1200.0 | 13 |
| xen09-chalmers-tritriadic-8-9-10 | Tritriadic scale built from 8:9:10 | 7 | 1200.0 | 5 |
| xen09-chalmers-tritriadic-9-10-11 | Tritriadic scale built from 9:10:11 | 7 | 1200.0 | 11 |
| xen09-chalmers-tritriadic-9-11-13 | Tritriadic scale built from 9:11:13 | 7 | 1200.0 | 13 |
| xen09-chalmers-tritriadic-9-13-10 | Tritriadic scale built from 9:13:10 | 7 | 1200.0 | 13 |
| xen09-chalmers-tritriadic-9-7-10 | Tritriadic scale built from 9:7:10 | 7 | 1200.0 | 7 |
| xen09-grady-dekany-a | Dekany A | 10 | 1200.0 | 11 |
| xen09-grady-dekany-b | Dekany B | 10 | 1200.0 | 11 |
| xen09-polansky-will-you-miss-me | Scale for 'Will You Miss Me' | 17 | 1200.0 | 13 |
| xen09-wilson-marwa-02-01 | Marwa permutation 1 from Figure 2, Pythagoras 256/243 9/8 9/8 | 7 | 1200.0 | 3 |
| xen09-wilson-marwa-02-02 | Marwa permutation 2 from Figure 2, Pythagoras 256/243 9/8 9/8 | 7 | 1200.0 | 3 |
| xen09-wilson-marwa-02-03 | Marwa permutation 3 from Figure 2, Pythagoras 256/243 9/8 9/8 | 7 | 1200.0 | 3 |
| xen09-wilson-marwa-02-04 | Marwa permutation 4 from Figure 2, Pythagoras 256/243 9/8 9/8 | 7 | 1200.0 | 3 |
| xen09-wilson-marwa-02-05 | Marwa permutation 5 from Figure 2, Pythagoras 256/243 9/8 9/8 | 7 | 1200.0 | 3 |
| xen09-wilson-marwa-02-06 | Marwa permutation 6 from Figure 2, Pythagoras 256/243 9/8 9/8 | 7 | 1200.0 | 3 |
| xen09-wilson-marwa-03-01 | Marwa permutation 1 from Figure 3, Ptolemy 16/15 9/8 10/9 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-03-02 | Marwa permutation 2 from Figure 3, Ptolemy 16/15 9/8 10/9 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-03-03 | Marwa permutation 3 from Figure 3, Ptolemy 16/15 9/8 10/9 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-03-04 | Marwa permutation 4 from Figure 3, Ptolemy 16/15 9/8 10/9 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-03-05 | Marwa permutation 5 from Figure 3, Ptolemy 16/15 9/8 10/9 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-03-06 | Marwa permutation 6 from Figure 3, Ptolemy 16/15 9/8 10/9 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-03-07 | Marwa permutation 7 from Figure 3, Ptolemy 16/15 9/8 10/9 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-03-08 | Marwa permutation 8 from Figure 3, Ptolemy 16/15 9/8 10/9 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-03-09 | Marwa permutation 9 from Figure 3, Ptolemy 16/15 9/8 10/9 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-03-10 | Marwa permutation 10 from Figure 3, Ptolemy 16/15 9/8 10/9 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-03-11 | Marwa permutation 11 from Figure 3, Ptolemy 16/15 9/8 10/9 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-03-12 | Marwa permutation 12 from Figure 3, Ptolemy 16/15 9/8 10/9 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-03-13 | Marwa permutation 13 from Figure 3, Ptolemy 16/15 9/8 10/9 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-03-14 | Marwa permutation 14 from Figure 3, Ptolemy 16/15 9/8 10/9 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-03-15 | Marwa permutation 15 from Figure 3, Ptolemy 16/15 9/8 10/9 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-04-01 | Marwa permutation 1 from Figure 4, Didymus 16/15 10/9 9/8 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-04-02 | Marwa permutation 2 from Figure 4, Didymus 16/15 10/9 9/8 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-04-03 | Marwa permutation 3 from Figure 4, Didymus 16/15 10/9 9/8 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-04-04 | Marwa permutation 4 from Figure 4, Didymus 16/15 10/9 9/8 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-04-05 | Marwa permutation 5 from Figure 4, Didymus 16/15 10/9 9/8 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-04-06 | Marwa permutation 6 from Figure 4, Didymus 16/15 10/9 9/8 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-04-07 | Marwa permutation 7 from Figure 4, Didymus 16/15 10/9 9/8 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-04-08 | Marwa permutation 8 from Figure 4, Didymus 16/15 10/9 9/8 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-04-09 | Marwa permutation 9 from Figure 4, Didymus 16/15 10/9 9/8 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-04-10 | Marwa permutation 10 from Figure 4, Didymus 16/15 10/9 9/8 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-04-11 | Marwa permutation 11 from Figure 4, Didymus 16/15 10/9 9/8 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-04-12 | Marwa permutation 12 from Figure 4, Didymus 16/15 10/9 9/8 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-04-13 | Marwa permutation 13 from Figure 4, Didymus 16/15 10/9 9/8 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-04-14 | Marwa permutation 14 from Figure 4, Didymus 16/15 10/9 9/8 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-04-15 | Marwa permutation 15 from Figure 4, Didymus 16/15 10/9 9/8 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-05-01 | Marwa permutation 1 from Figure 5, Pythagoras 256/243 9/8 9/8 | 7 | 1200.0 | 3 |
| xen09-wilson-marwa-06-01 | Marwa permutation 1 from Figure 6, Didymus/Ptolemy 16/15 9/8 10/9 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-06-02 | Marwa permutation 2 from Figure 6, Didymus/Ptolemy 16/15 9/8 10/9 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-06-03 | Marwa permutation 3 from Figure 6, Didymus/Ptolemy 16/15 9/8 10/9 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-06-04 | Marwa permutation 4 from Figure 6, Didymus/Ptolemy 16/15 9/8 10/9 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-06-05 | Marwa permutation 5 from Figure 6, Didymus/Ptolemy 16/15 9/8 10/9 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-06-06 | Marwa permutation 6 from Figure 6, Didymus/Ptolemy 16/15 9/8 10/9 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-07-01 | Marwa permutation 1 from Figure 7, Archytas 28/27 8/7 9/8 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-07-02 | Marwa permutation 2 from Figure 7, Archytas 28/27 8/7 9/8 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-07-03 | Marwa permutation 3 from Figure 7, Archytas 28/27 8/7 9/8 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-07-04 | Marwa permutation 4 from Figure 7, Archytas 28/27 8/7 9/8 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-07-05 | Marwa permutation 5 from Figure 7, Archytas 28/27 8/7 9/8 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-07-06 | Marwa permutation 6 from Figure 7, Archytas 28/27 8/7 9/8 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-07-07 | Marwa permutation 7 from Figure 7, Archytas 28/27 8/7 9/8 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-07-08 | Marwa permutation 8 from Figure 7, Archytas 28/27 8/7 9/8 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-07-09 | Marwa permutation 9 from Figure 7, Archytas 28/27 8/7 9/8 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-07-10 | Marwa permutation 10 from Figure 7, Archytas 28/27 8/7 9/8 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-07-11 | Marwa permutation 11 from Figure 7, Archytas 28/27 8/7 9/8 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-07-12 | Marwa permutation 12 from Figure 7, Archytas 28/27 8/7 9/8 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-07-13 | Marwa permutation 13 from Figure 7, Archytas 28/27 8/7 9/8 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-07-14 | Marwa permutation 14 from Figure 7, Archytas 28/27 8/7 9/8 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-07-15 | Marwa permutation 15 from Figure 7, Archytas 28/27 8/7 9/8 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-08-01 | Marwa permutation 1 from Figure 8, Archytas 28/27 8/7 9/8 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-08-02 | Marwa permutation 2 from Figure 8, Archytas 28/27 8/7 9/8 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-08-03 | Marwa permutation 3 from Figure 8, Archytas 28/27 8/7 9/8 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-08-04 | Marwa permutation 4 from Figure 8, Archytas 28/27 8/7 9/8 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-08-05 | Marwa permutation 5 from Figure 8, Archytas 28/27 8/7 9/8 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-08-06 | Marwa permutation 6 from Figure 8, Archytas 28/27 8/7 9/8 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-09-01 | Marwa permutation 1 from Figure 9, Hawkins 16/15 135/128 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-09-02 | Marwa permutation 2 from Figure 9, Hawkins 16/15 135/128 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-09-03 | Marwa permutation 3 from Figure 9, Hawkins 16/15 135/128 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-09-04 | Marwa permutation 4 from Figure 9, Hawkins 16/15 135/128 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-09-05 | Marwa permutation 5 from Figure 9, Hawkins 16/15 135/128 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-09-06 | Marwa permutation 6 from Figure 9, Hawkins 16/15 135/128 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-09-07 | Marwa permutation 7 from Figure 9, Hawkins 16/15 135/128 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-09-08 | Marwa permutation 8 from Figure 9, Hawkins 16/15 135/128 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-09-09 | Marwa permutation 9 from Figure 9, Hawkins 16/15 135/128 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-09-10 | Marwa permutation 10 from Figure 9, Hawkins 16/15 135/128 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-09-11 | Marwa permutation 11 from Figure 9, Hawkins 16/15 135/128 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-09-12 | Marwa permutation 12 from Figure 9, Hawkins 16/15 135/128 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-09-13 | Marwa permutation 13 from Figure 9, Hawkins 16/15 135/128 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-09-14 | Marwa permutation 14 from Figure 9, Hawkins 16/15 135/128 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-09-15 | Marwa permutation 15 from Figure 9, Hawkins 16/15 135/128 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-09-16 | Marwa permutation 16 from Figure 9, Hawkins 16/15 135/128 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-09-17 | Marwa permutation 17 from Figure 9, Hawkins 16/15 135/128 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-09-18 | Marwa permutation 18 from Figure 9, Hawkins 16/15 135/128 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-09-19 | Marwa permutation 19 from Figure 9, Hawkins 16/15 135/128 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-09-20 | Marwa permutation 20 from Figure 9, Hawkins 16/15 135/128 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-10-01 | Marwa permutation 1 from Figure 10, Ptolemy 7/6 12/11 22/21 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-10-02 | Marwa permutation 2 from Figure 10, Ptolemy 7/6 12/11 22/21 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-10-03 | Marwa permutation 3 from Figure 10, Ptolemy 7/6 12/11 22/21 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-10-04 | Marwa permutation 4 from Figure 10, Ptolemy 7/6 12/11 22/21 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-10-05 | Marwa permutation 5 from Figure 10, Ptolemy 7/6 12/11 22/21 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-10-06 | Marwa permutation 6 from Figure 10, Ptolemy 7/6 12/11 22/21 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-10-07 | Marwa permutation 7 from Figure 10, Ptolemy 7/6 12/11 22/21 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-10-08 | Marwa permutation 8 from Figure 10, Ptolemy 7/6 12/11 22/21 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-10-09 | Marwa permutation 9 from Figure 10, Ptolemy 7/6 12/11 22/21 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-10-10 | Marwa permutation 10 from Figure 10, Ptolemy 7/6 12/11 22/21 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-10-11 | Marwa permutation 11 from Figure 10, Ptolemy 7/6 12/11 22/21 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-10-12 | Marwa permutation 12 from Figure 10, Ptolemy 7/6 12/11 22/21 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-10-13 | Marwa permutation 13 from Figure 10, Ptolemy 7/6 12/11 22/21 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-10-14 | Marwa permutation 14 from Figure 10, Ptolemy 7/6 12/11 22/21 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-10-15 | Marwa permutation 15 from Figure 10, Ptolemy 7/6 12/11 22/21 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-10-16 | Marwa permutation 16 from Figure 10, Ptolemy 7/6 12/11 22/21 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-10-17 | Marwa permutation 17 from Figure 10, Ptolemy 7/6 12/11 22/21 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-10-18 | Marwa permutation 18 from Figure 10, Ptolemy 7/6 12/11 22/21 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-10-19 | Marwa permutation 19 from Figure 10, Ptolemy 7/6 12/11 22/21 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-10-20 | Marwa permutation 20 from Figure 10, Ptolemy 7/6 12/11 22/21 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-11a-01 | Marwa permutation 1 from Figure 11a, Hawkins 16/15 135/128 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-11a-02 | Marwa permutation 2 from Figure 11a, Hawkins 16/15 135/128 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-11a-03 | Marwa permutation 3 from Figure 11a, Hawkins 16/15 135/128 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-11a-04 | Marwa permutation 4 from Figure 11a, Hawkins 16/15 135/128 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-11a-05 | Marwa permutation 5 from Figure 11a, Hawkins 16/15 135/128 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-11a-06 | Marwa permutation 6 from Figure 11a, Hawkins 16/15 135/128 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-11a-07 | Marwa permutation 7 from Figure 11a, Hawkins 16/15 135/128 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-11a-08 | Marwa permutation 8 from Figure 11a, Hawkins 16/15 135/128 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-11a-09 | Marwa permutation 9 from Figure 11a, Hawkins 16/15 135/128 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-11a-10 | Marwa permutation 10 from Figure 11a, Hawkins 16/15 135/128 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-11b-01 | Marwa permutation 1 from Figure 11b, Hawkins 135/128 16/15 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-11b-02 | Marwa permutation 2 from Figure 11b, Hawkins 135/128 16/15 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-11b-03 | Marwa permutation 3 from Figure 11b, Hawkins 135/128 16/15 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-11b-04 | Marwa permutation 4 from Figure 11b, Hawkins 135/128 16/15 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-11b-05 | Marwa permutation 5 from Figure 11b, Hawkins 135/128 16/15 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-11b-06 | Marwa permutation 6 from Figure 11b, Hawkins 135/128 16/15 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-11b-07 | Marwa permutation 7 from Figure 11b, Hawkins 135/128 16/15 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-11b-08 | Marwa permutation 8 from Figure 11b, Hawkins 135/128 16/15 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-11b-09 | Marwa permutation 9 from Figure 11b, Hawkins 135/128 16/15 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-11b-10 | Marwa permutation 10 from Figure 11b, Hawkins 135/128 16/15 32/27 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-12-01 | Marwa permutation 1 from Figure 12, Helmholtz 16/15 16/15 75/64 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-12-02 | Marwa permutation 2 from Figure 12, Helmholtz 16/15 16/15 75/64 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-12-03 | Marwa permutation 3 from Figure 12, Helmholtz 16/15 16/15 75/64 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-12-04 | Marwa permutation 4 from Figure 12, Helmholtz 16/15 16/15 75/64 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-12-05 | Marwa permutation 5 from Figure 12, Helmholtz 16/15 16/15 75/64 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-12-06 | Marwa permutation 6 from Figure 12, Helmholtz 16/15 16/15 75/64 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-12-07 | Marwa permutation 7 from Figure 12, Helmholtz 16/15 16/15 75/64 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-12-08 | Marwa permutation 8 from Figure 12, Helmholtz 16/15 16/15 75/64 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-12-09 | Marwa permutation 9 from Figure 12, Helmholtz 16/15 16/15 75/64 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-12-10 | Marwa permutation 10 from Figure 12, Helmholtz 16/15 16/15 75/64 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-13-01 | Marwa permutation 1 from Figure 13, Al-Farabi 10/9 10/9 27/25 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-13-02 | Marwa permutation 2 from Figure 13, Al-Farabi 10/9 10/9 27/25 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-13-03 | Marwa permutation 3 from Figure 13, Al-Farabi 10/9 10/9 27/25 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-13-04 | Marwa permutation 4 from Figure 13, Al-Farabi 10/9 10/9 27/25 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-13-05 | Marwa permutation 5 from Figure 13, Al-Farabi 10/9 10/9 27/25 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-13-06 | Marwa permutation 6 from Figure 13, Al-Farabi 10/9 10/9 27/25 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-13-07 | Marwa permutation 7 from Figure 13, Al-Farabi 10/9 10/9 27/25 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-13-08 | Marwa permutation 8 from Figure 13, Al-Farabi 10/9 10/9 27/25 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-13-09 | Marwa permutation 9 from Figure 13, Al-Farabi 10/9 10/9 27/25 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-13-10 | Marwa permutation 10 from Figure 13, Al-Farabi 10/9 10/9 27/25 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-14a-01 | Marwa permutation 1 from Figure 14a, Didymus 16/15 25/24 6/5 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-14a-02 | Marwa permutation 2 from Figure 14a, Didymus 16/15 25/24 6/5 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-14a-03 | Marwa permutation 3 from Figure 14a, Didymus 16/15 25/24 6/5 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-14a-04 | Marwa permutation 4 from Figure 14a, Didymus 16/15 25/24 6/5 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-14a-05 | Marwa permutation 5 from Figure 14a, Didymus 16/15 25/24 6/5 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-14a-06 | Marwa permutation 6 from Figure 14a, Didymus 16/15 25/24 6/5 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-14a-07 | Marwa permutation 7 from Figure 14a, Didymus 16/15 25/24 6/5 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-14a-08 | Marwa permutation 8 from Figure 14a, Didymus 16/15 25/24 6/5 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-14a-09 | Marwa permutation 9 from Figure 14a, Didymus 16/15 25/24 6/5 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-14a-10 | Marwa permutation 10 from Figure 14a, Didymus 16/15 25/24 6/5 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-14b-01 | Marwa permutation 1 from Figure 14b, Didymus 25/24 16/15 6/5 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-14b-02 | Marwa permutation 2 from Figure 14b, Didymus 25/24 16/15 6/5 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-14b-03 | Marwa permutation 3 from Figure 14b, Didymus 25/24 16/15 6/5 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-14b-04 | Marwa permutation 4 from Figure 14b, Didymus 25/24 16/15 6/5 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-14b-05 | Marwa permutation 5 from Figure 14b, Didymus 25/24 16/15 6/5 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-14b-06 | Marwa permutation 6 from Figure 14b, Didymus 25/24 16/15 6/5 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-14b-07 | Marwa permutation 7 from Figure 14b, Didymus 25/24 16/15 6/5 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-14b-08 | Marwa permutation 8 from Figure 14b, Didymus 25/24 16/15 6/5 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-14b-09 | Marwa permutation 9 from Figure 14b, Didymus 25/24 16/15 6/5 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-14b-10 | Marwa permutation 10 from Figure 14b, Didymus 25/24 16/15 6/5 | 7 | 1200.0 | 5 |
| xen09-wilson-marwa-15a-01 | Marwa permutation 1 from Figure 15a, Ptolemy 12/11 22/21 7/6 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-15a-02 | Marwa permutation 2 from Figure 15a, Ptolemy 12/11 22/21 7/6 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-15a-03 | Marwa permutation 3 from Figure 15a, Ptolemy 12/11 22/21 7/6 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-15a-04 | Marwa permutation 4 from Figure 15a, Ptolemy 12/11 22/21 7/6 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-15a-05 | Marwa permutation 5 from Figure 15a, Ptolemy 12/11 22/21 7/6 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-15a-06 | Marwa permutation 6 from Figure 15a, Ptolemy 12/11 22/21 7/6 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-15a-07 | Marwa permutation 7 from Figure 15a, Ptolemy 12/11 22/21 7/6 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-15a-08 | Marwa permutation 8 from Figure 15a, Ptolemy 12/11 22/21 7/6 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-15a-09 | Marwa permutation 9 from Figure 15a, Ptolemy 12/11 22/21 7/6 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-15a-10 | Marwa permutation 10 from Figure 15a, Ptolemy 12/11 22/21 7/6 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-15b-01 | Marwa permutation 1 from Figure 15b, Ptolemy 22/21 12/11 7/6 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-15b-02 | Marwa permutation 2 from Figure 15b, Ptolemy 22/21 12/11 7/6 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-15b-03 | Marwa permutation 3 from Figure 15b, Ptolemy 22/21 12/11 7/6 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-15b-04 | Marwa permutation 4 from Figure 15b, Ptolemy 22/21 12/11 7/6 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-15b-05 | Marwa permutation 5 from Figure 15b, Ptolemy 22/21 12/11 7/6 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-15b-06 | Marwa permutation 6 from Figure 15b, Ptolemy 22/21 12/11 7/6 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-15b-07 | Marwa permutation 7 from Figure 15b, Ptolemy 22/21 12/11 7/6 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-15b-08 | Marwa permutation 8 from Figure 15b, Ptolemy 22/21 12/11 7/6 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-15b-09 | Marwa permutation 9 from Figure 15b, Ptolemy 22/21 12/11 7/6 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-15b-10 | Marwa permutation 10 from Figure 15b, Ptolemy 22/21 12/11 7/6 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-16a-01 | Marwa permutation 1 from Figure 16a, Schlesinger 16/15 15/13 13/12 | 7 | 1200.0 | 13 |
| xen09-wilson-marwa-16a-02 | Marwa permutation 2 from Figure 16a, Schlesinger 16/15 15/13 13/12 | 7 | 1200.0 | 13 |
| xen09-wilson-marwa-16a-03 | Marwa permutation 3 from Figure 16a, Schlesinger 16/15 15/13 13/12 | 7 | 1200.0 | 13 |
| xen09-wilson-marwa-16a-04 | Marwa permutation 4 from Figure 16a, Schlesinger 16/15 15/13 13/12 | 7 | 1200.0 | 13 |
| xen09-wilson-marwa-16a-05 | Marwa permutation 5 from Figure 16a, Schlesinger 16/15 15/13 13/12 | 7 | 1200.0 | 13 |
| xen09-wilson-marwa-16a-06 | Marwa permutation 6 from Figure 16a, Schlesinger 16/15 15/13 13/12 | 7 | 1200.0 | 13 |
| xen09-wilson-marwa-16a-07 | Marwa permutation 7 from Figure 16a, Schlesinger 16/15 15/13 13/12 | 7 | 1200.0 | 13 |
| xen09-wilson-marwa-16a-08 | Marwa permutation 8 from Figure 16a, Schlesinger 16/15 15/13 13/12 | 7 | 1200.0 | 13 |
| xen09-wilson-marwa-16a-09 | Marwa permutation 9 from Figure 16a, Schlesinger 16/15 15/13 13/12 | 7 | 1200.0 | 13 |
| xen09-wilson-marwa-16a-10 | Marwa permutation 10 from Figure 16a, Schlesinger 16/15 15/13 13/12 | 7 | 1200.0 | 13 |
| xen09-wilson-marwa-16b-01 | Marwa permutation 1 from Figure 16b, Schlesinger 13/12 15/13 16/15 | 7 | 1200.0 | 13 |
| xen09-wilson-marwa-16b-02 | Marwa permutation 2 from Figure 16b, Schlesinger 13/12 15/13 16/15 | 7 | 1200.0 | 13 |
| xen09-wilson-marwa-16b-03 | Marwa permutation 3 from Figure 16b, Schlesinger 13/12 15/13 16/15 | 7 | 1200.0 | 13 |
| xen09-wilson-marwa-16b-04 | Marwa permutation 4 from Figure 16b, Schlesinger 13/12 15/13 16/15 | 7 | 1200.0 | 13 |
| xen09-wilson-marwa-16b-05 | Marwa permutation 5 from Figure 16b, Schlesinger 13/12 15/13 16/15 | 7 | 1200.0 | 13 |
| xen09-wilson-marwa-16b-06 | Marwa permutation 6 from Figure 16b, Schlesinger 13/12 15/13 16/15 | 7 | 1200.0 | 13 |
| xen09-wilson-marwa-16b-07 | Marwa permutation 7 from Figure 16b, Schlesinger 13/12 15/13 16/15 | 7 | 1200.0 | 13 |
| xen09-wilson-marwa-16b-08 | Marwa permutation 8 from Figure 16b, Schlesinger 13/12 15/13 16/15 | 7 | 1200.0 | 13 |
| xen09-wilson-marwa-16b-09 | Marwa permutation 9 from Figure 16b, Schlesinger 13/12 15/13 16/15 | 7 | 1200.0 | 13 |
| xen09-wilson-marwa-16b-10 | Marwa permutation 10 from Figure 16b, Schlesinger 13/12 15/13 16/15 | 7 | 1200.0 | 13 |
| xen09-wilson-marwa-17a-01 | Marwa permutation 1 from Figure 17a, Archytas 28/27 36/35 5/4 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-17a-02 | Marwa permutation 2 from Figure 17a, Archytas 28/27 36/35 5/4 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-17a-03 | Marwa permutation 3 from Figure 17a, Archytas 28/27 36/35 5/4 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-17a-04 | Marwa permutation 4 from Figure 17a, Archytas 28/27 36/35 5/4 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-17a-05 | Marwa permutation 5 from Figure 17a, Archytas 28/27 36/35 5/4 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-17a-06 | Marwa permutation 6 from Figure 17a, Archytas 28/27 36/35 5/4 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-17a-07 | Marwa permutation 7 from Figure 17a, Archytas 28/27 36/35 5/4 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-17a-08 | Marwa permutation 8 from Figure 17a, Archytas 28/27 36/35 5/4 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-17a-09 | Marwa permutation 9 from Figure 17a, Archytas 28/27 36/35 5/4 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-17a-10 | Marwa permutation 10 from Figure 17a, Archytas 28/27 36/35 5/4 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-17b-01 | Marwa permutation 1 from Figure 17b, Archytas 36/35 28/27 5/4 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-17b-02 | Marwa permutation 2 from Figure 17b, Archytas 36/35 28/27 5/4 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-17b-03 | Marwa permutation 3 from Figure 17b, Archytas 36/35 28/27 5/4 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-17b-04 | Marwa permutation 4 from Figure 17b, Archytas 36/35 28/27 5/4 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-17b-05 | Marwa permutation 5 from Figure 17b, Archytas 36/35 28/27 5/4 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-17b-06 | Marwa permutation 6 from Figure 17b, Archytas 36/35 28/27 5/4 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-17b-07 | Marwa permutation 7 from Figure 17b, Archytas 36/35 28/27 5/4 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-17b-08 | Marwa permutation 8 from Figure 17b, Archytas 36/35 28/27 5/4 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-17b-09 | Marwa permutation 9 from Figure 17b, Archytas 36/35 28/27 5/4 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-17b-10 | Marwa permutation 10 from Figure 17b, Archytas 36/35 28/27 5/4 | 7 | 1200.0 | 7 |
| xen09-wilson-marwa-18a-01 | Marwa permutation 1 from Figure 18a, Ptolemy 12/11 11/10 10/9 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-18a-02 | Marwa permutation 2 from Figure 18a, Ptolemy 12/11 11/10 10/9 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-18a-03 | Marwa permutation 3 from Figure 18a, Ptolemy 12/11 11/10 10/9 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-18a-04 | Marwa permutation 4 from Figure 18a, Ptolemy 12/11 11/10 10/9 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-18a-05 | Marwa permutation 5 from Figure 18a, Ptolemy 12/11 11/10 10/9 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-18a-06 | Marwa permutation 6 from Figure 18a, Ptolemy 12/11 11/10 10/9 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-18a-07 | Marwa permutation 7 from Figure 18a, Ptolemy 12/11 11/10 10/9 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-18a-08 | Marwa permutation 8 from Figure 18a, Ptolemy 12/11 11/10 10/9 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-18a-09 | Marwa permutation 9 from Figure 18a, Ptolemy 12/11 11/10 10/9 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-18a-10 | Marwa permutation 10 from Figure 18a, Ptolemy 12/11 11/10 10/9 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-18b-01 | Marwa permutation 1 from Figure 18b, Ptolemy 10/9 11/10 12/11 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-18b-02 | Marwa permutation 2 from Figure 18b, Ptolemy 10/9 11/10 12/11 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-18b-03 | Marwa permutation 3 from Figure 18b, Ptolemy 10/9 11/10 12/11 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-18b-04 | Marwa permutation 4 from Figure 18b, Ptolemy 10/9 11/10 12/11 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-18b-05 | Marwa permutation 5 from Figure 18b, Ptolemy 10/9 11/10 12/11 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-18b-06 | Marwa permutation 6 from Figure 18b, Ptolemy 10/9 11/10 12/11 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-18b-07 | Marwa permutation 7 from Figure 18b, Ptolemy 10/9 11/10 12/11 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-18b-08 | Marwa permutation 8 from Figure 18b, Ptolemy 10/9 11/10 12/11 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-18b-09 | Marwa permutation 9 from Figure 18b, Ptolemy 10/9 11/10 12/11 | 7 | 1200.0 | 11 |
| xen09-wilson-marwa-18b-10 | Marwa permutation 10 from Figure 18b, Ptolemy 10/9 11/10 12/11 | 7 | 1200.0 | 11 |
| xen10-chalmers-tritriadic-13-23-21 | Tritriadic scale built from 13:23:21 | 7 | 1200.0 | 23 |
| xen10-chalmers-tritriadic-15-27-25 | Tritriadic scale built from 15:27:25 | 7 | 1200.0 | 5 |
| xen10-chalmers-tritriadic-17-13-19 | Tritriadic scale built from 17:13:19 | 7 | 1200.0 | 19 |
| xen10-chalmers-tritriadic-17-21-25 | Tritriadic scale built from 17:21:25 | 7 | 1200.0 | 17 |
| xen10-chalmers-tritriadic-17-25-19 | Tritriadic scale built from 17:25:19 | 7 | 1200.0 | 19 |
| xen10-chalmers-tritriadic-17-5-25 | Tritriadic scale built from 17:5:25 | 7 | 1200.0 | 17 |
| xen10-chalmers-tritriadic-17-7-23 | Tritriadic scale built from 17:7:23 | 7 | 1200.0 | 23 |
| xen10-chalmers-tritriadic-19-21-23 | Tritriadic scale built from 19:21:23 | 7 | 1200.0 | 23 |
| xen10-chalmers-tritriadic-19-27-21 | Tritriadic scale built from 19:27:21 | 7 | 1200.0 | 19 |
| xen10-chalmers-tritriadic-19-7-21 | Tritriadic scale built from 19:7:21 | 7 | 1200.0 | 19 |
| xen10-chalmers-tritriadic-21-1-23 | Tritriadic scale built from 21:1:23 | 7 | 1200.0 | 23 |
| xen10-chalmers-tritriadic-21-15-23 | Tritriadic scale built from 21:15:23 | 7 | 1200.0 | 23 |
| xen10-chalmers-tritriadic-23-17-25 | Tritriadic scale built from 23:17:25 | 7 | 1200.0 | 23 |
| xen10-chalmers-tritriadic-3-11-15 | Tritriadic scale built from 3:11:15 | 7 | 1200.0 | 11 |
| xen10-chalmers-tritriadic-5-1-27 | Tritriadic scale built from 5:1:27 | 7 | 1200.0 | 5 |
| xen10-chalmers-tritriadic-5-17-27 | Tritriadic scale built from 5:17:27 | 7 | 1200.0 | 17 |
| xen10-chalmers-tritriadic-5-27-9 | Tritriadic scale built from 5:27:9 | 7 | 1200.0 | 5 |
| xen10-chalmers-tritriadic-7-19-25 | Tritriadic scale built from 7:19:25 | 7 | 1200.0 | 19 |
| xen10-chalmers-tritriadic-7-23-19 | Tritriadic scale built from 7:23:19 | 7 | 1200.0 | 23 |
| xen10-chalmers-tritriadic-7-25-23 | Tritriadic scale built from 7:25:23 | 7 | 1200.0 | 23 |
| xen10-chalmers-tritriadic-7-3-19 | Tritriadic scale built from 7:3:19 | 7 | 1200.0 | 19 |
| xen10-chalmers-tritriadic-7-9-25 | Tritriadic scale built from 7:9:25 | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-01-01 | Purvi modulation 1 from Figure 1, Pythagoras (9/8 9/8 256/243) all 3 permutations | 7 | 1200.0 | 3 |
| xen10-wilson-purvi-01-02 | Purvi modulation 2 from Figure 1, Pythagoras (9/8 9/8 256/243) all 3 permutations | 7 | 1200.0 | 3 |
| xen10-wilson-purvi-01-03 | Purvi modulation 3 from Figure 1, Pythagoras (9/8 9/8 256/243) all 3 permutations | 7 | 1200.0 | 3 |
| xen10-wilson-purvi-01-04 | Purvi modulation 4 from Figure 1, Pythagoras (9/8 9/8 256/243) all 3 permutations | 7 | 1200.0 | 3 |
| xen10-wilson-purvi-01-05 | Purvi modulation 5 from Figure 1, Pythagoras (9/8 9/8 256/243) all 3 permutations | 7 | 1200.0 | 3 |
| xen10-wilson-purvi-01-06 | Purvi modulation 6 from Figure 1, Pythagoras (9/8 9/8 256/243) all 3 permutations | 7 | 1200.0 | 3 |
| xen10-wilson-purvi-01-07 | Purvi modulation 7 from Figure 1, Pythagoras (9/8 9/8 256/243) all 3 permutations | 7 | 1200.0 | 3 |
| xen10-wilson-purvi-02a-01 | Purvi modulation 1 from Figure 2a, Helmholtz (75/64 16/15 16/15), (16/15 16/15 75/64) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-02a-02 | Purvi modulation 2 from Figure 2a, Helmholtz (75/64 16/15 16/15), (16/15 16/15 75/64) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-02a-03 | Purvi modulation 3 from Figure 2a, Helmholtz (75/64 16/15 16/15), (16/15 16/15 75/64) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-02a-04 | Purvi modulation 4 from Figure 2a, Helmholtz (75/64 16/15 16/15), (16/15 16/15 75/64) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-02a-05 | Purvi modulation 5 from Figure 2a, Helmholtz (75/64 16/15 16/15), (16/15 16/15 75/64) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-02a-06 | Purvi modulation 6 from Figure 2a, Helmholtz (75/64 16/15 16/15), (16/15 16/15 75/64) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-02a-07 | Purvi modulation 7 from Figure 2a, Helmholtz (75/64 16/15 16/15), (16/15 16/15 75/64) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-02b-01 | Purvi modulation 1 from Figure 2b, Helmholtz (16/15 75/64 16/15) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-02b-02 | Purvi modulation 2 from Figure 2b, Helmholtz (16/15 75/64 16/15) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-02b-03 | Purvi modulation 3 from Figure 2b, Helmholtz (16/15 75/64 16/15) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-02b-04 | Purvi modulation 4 from Figure 2b, Helmholtz (16/15 75/64 16/15) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-02b-05 | Purvi modulation 5 from Figure 2b, Helmholtz (16/15 75/64 16/15) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-02b-06 | Purvi modulation 6 from Figure 2b, Helmholtz (16/15 75/64 16/15) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-02b-07 | Purvi modulation 7 from Figure 2b, Helmholtz (16/15 75/64 16/15) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-03a-01 | Purvi modulation 1 from Figure 3a, Al-Farabi (8/7 8/7 49/48), (49/48 8/7 8/7) | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-03a-02 | Purvi modulation 2 from Figure 3a, Al-Farabi (8/7 8/7 49/48), (49/48 8/7 8/7) | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-03a-03 | Purvi modulation 3 from Figure 3a, Al-Farabi (8/7 8/7 49/48), (49/48 8/7 8/7) | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-03a-04 | Purvi modulation 4 from Figure 3a, Al-Farabi (8/7 8/7 49/48), (49/48 8/7 8/7) | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-03a-05 | Purvi modulation 5 from Figure 3a, Al-Farabi (8/7 8/7 49/48), (49/48 8/7 8/7) | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-03a-06 | Purvi modulation 6 from Figure 3a, Al-Farabi (8/7 8/7 49/48), (49/48 8/7 8/7) | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-03a-07 | Purvi modulation 7 from Figure 3a, Al-Farabi (8/7 8/7 49/48), (49/48 8/7 8/7) | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-03b-01 | Purvi modulation 1 from Figure 3b, Al-Farabi (8/7 49/48 8/7) | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-03b-02 | Purvi modulation 2 from Figure 3b, Al-Farabi (8/7 49/48 8/7) | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-03b-03 | Purvi modulation 3 from Figure 3b, Al-Farabi (8/7 49/48 8/7) | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-03b-04 | Purvi modulation 4 from Figure 3b, Al-Farabi (8/7 49/48 8/7) | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-03b-05 | Purvi modulation 5 from Figure 3b, Al-Farabi (8/7 49/48 8/7) | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-03b-06 | Purvi modulation 6 from Figure 3b, Al-Farabi (8/7 49/48 8/7) | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-03b-07 | Purvi modulation 7 from Figure 3b, Al-Farabi (8/7 49/48 8/7) | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-04-01 | Purvi modulation 1 from Figure 4, Archytas (8/7 9/8 28/27) all 6 permutations | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-04-02 | Purvi modulation 2 from Figure 4, Archytas (8/7 9/8 28/27) all 6 permutations | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-04-03 | Purvi modulation 3 from Figure 4, Archytas (8/7 9/8 28/27) all 6 permutations | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-04-04 | Purvi modulation 4 from Figure 4, Archytas (8/7 9/8 28/27) all 6 permutations | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-04-05 | Purvi modulation 5 from Figure 4, Archytas (8/7 9/8 28/27) all 6 permutations | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-04-06 | Purvi modulation 6 from Figure 4, Archytas (8/7 9/8 28/27) all 6 permutations | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-04-07 | Purvi modulation 7 from Figure 4, Archytas (8/7 9/8 28/27) all 6 permutations | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-05-01 | Purvi modulation 1 from Figure 5, Didymus/Ptolemy (10/9 9/8 16/15) all 6 permutations | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-05-02 | Purvi modulation 2 from Figure 5, Didymus/Ptolemy (10/9 9/8 16/15) all 6 permutations | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-05-03 | Purvi modulation 3 from Figure 5, Didymus/Ptolemy (10/9 9/8 16/15) all 6 permutations | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-05-04 | Purvi modulation 4 from Figure 5, Didymus/Ptolemy (10/9 9/8 16/15) all 6 permutations | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-05-05 | Purvi modulation 5 from Figure 5, Didymus/Ptolemy (10/9 9/8 16/15) all 6 permutations | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-05-06 | Purvi modulation 6 from Figure 5, Didymus/Ptolemy (10/9 9/8 16/15) all 6 permutations | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-05-07 | Purvi modulation 7 from Figure 5, Didymus/Ptolemy (10/9 9/8 16/15) all 6 permutations | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-06a-01 | Purvi modulation 1 from Figure 6a, Al-Farabi (10/9 10/9 27/25), (27/25 10/9 10/9) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-06a-02 | Purvi modulation 2 from Figure 6a, Al-Farabi (10/9 10/9 27/25), (27/25 10/9 10/9) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-06a-03 | Purvi modulation 3 from Figure 6a, Al-Farabi (10/9 10/9 27/25), (27/25 10/9 10/9) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-06a-04 | Purvi modulation 4 from Figure 6a, Al-Farabi (10/9 10/9 27/25), (27/25 10/9 10/9) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-06a-05 | Purvi modulation 5 from Figure 6a, Al-Farabi (10/9 10/9 27/25), (27/25 10/9 10/9) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-06a-06 | Purvi modulation 6 from Figure 6a, Al-Farabi (10/9 10/9 27/25), (27/25 10/9 10/9) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-06a-07 | Purvi modulation 7 from Figure 6a, Al-Farabi (10/9 10/9 27/25), (27/25 10/9 10/9) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-06b-01 | Purvi modulation 1 from Figure 6b, Al-Farabi (10/9 27/25 10/9) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-06b-02 | Purvi modulation 2 from Figure 6b, Al-Farabi (10/9 27/25 10/9) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-06b-03 | Purvi modulation 3 from Figure 6b, Al-Farabi (10/9 27/25 10/9) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-06b-04 | Purvi modulation 4 from Figure 6b, Al-Farabi (10/9 27/25 10/9) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-06b-05 | Purvi modulation 5 from Figure 6b, Al-Farabi (10/9 27/25 10/9) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-06b-06 | Purvi modulation 6 from Figure 6b, Al-Farabi (10/9 27/25 10/9) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-06b-07 | Purvi modulation 7 from Figure 6b, Al-Farabi (10/9 27/25 10/9) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-07a-01 | Purvi modulation 1 from Figure 7a, Kathleen Schlesinger (13/12 16/15 15/13), (15/13 13/12 16/15) | 7 | 1200.0 | 13 |
| xen10-wilson-purvi-07a-02 | Purvi modulation 2 from Figure 7a, Kathleen Schlesinger (13/12 16/15 15/13), (15/13 13/12 16/15) | 7 | 1200.0 | 13 |
| xen10-wilson-purvi-07a-03 | Purvi modulation 3 from Figure 7a, Kathleen Schlesinger (13/12 16/15 15/13), (15/13 13/12 16/15) | 7 | 1200.0 | 13 |
| xen10-wilson-purvi-07a-04 | Purvi modulation 4 from Figure 7a, Kathleen Schlesinger (13/12 16/15 15/13), (15/13 13/12 16/15) | 7 | 1200.0 | 13 |
| xen10-wilson-purvi-07a-05 | Purvi modulation 5 from Figure 7a, Kathleen Schlesinger (13/12 16/15 15/13), (15/13 13/12 16/15) | 7 | 1200.0 | 13 |
| xen10-wilson-purvi-07a-06 | Purvi modulation 6 from Figure 7a, Kathleen Schlesinger (13/12 16/15 15/13), (15/13 13/12 16/15) | 7 | 1200.0 | 13 |
| xen10-wilson-purvi-07a-07 | Purvi modulation 7 from Figure 7a, Kathleen Schlesinger (13/12 16/15 15/13), (15/13 13/12 16/15) | 7 | 1200.0 | 13 |
| xen10-wilson-purvi-07b-01 | Purvi modulation 1 from Figure 7b, Kathleen Schlesinger (15/13 16/15 13/12), (16/15 13/12 15/13) | 7 | 1200.0 | 13 |
| xen10-wilson-purvi-07b-02 | Purvi modulation 2 from Figure 7b, Kathleen Schlesinger (15/13 16/15 13/12), (16/15 13/12 15/13) | 7 | 1200.0 | 13 |
| xen10-wilson-purvi-07b-03 | Purvi modulation 3 from Figure 7b, Kathleen Schlesinger (15/13 16/15 13/12), (16/15 13/12 15/13) | 7 | 1200.0 | 13 |
| xen10-wilson-purvi-07b-04 | Purvi modulation 4 from Figure 7b, Kathleen Schlesinger (15/13 16/15 13/12), (16/15 13/12 15/13) | 7 | 1200.0 | 13 |
| xen10-wilson-purvi-07b-05 | Purvi modulation 5 from Figure 7b, Kathleen Schlesinger (15/13 16/15 13/12), (16/15 13/12 15/13) | 7 | 1200.0 | 13 |
| xen10-wilson-purvi-07b-06 | Purvi modulation 6 from Figure 7b, Kathleen Schlesinger (15/13 16/15 13/12), (16/15 13/12 15/13) | 7 | 1200.0 | 13 |
| xen10-wilson-purvi-07b-07 | Purvi modulation 7 from Figure 7b, Kathleen Schlesinger (15/13 16/15 13/12), (16/15 13/12 15/13) | 7 | 1200.0 | 13 |
| xen10-wilson-purvi-07c-01 | Purvi modulation 1 from Figure 7c, Kathleen Schlesinger (16/15 15/13 13/12), (13/12 15/13 16/15) | 7 | 1200.0 | 13 |
| xen10-wilson-purvi-07c-02 | Purvi modulation 2 from Figure 7c, Kathleen Schlesinger (16/15 15/13 13/12), (13/12 15/13 16/15) | 7 | 1200.0 | 13 |
| xen10-wilson-purvi-07c-03 | Purvi modulation 3 from Figure 7c, Kathleen Schlesinger (16/15 15/13 13/12), (13/12 15/13 16/15) | 7 | 1200.0 | 13 |
| xen10-wilson-purvi-07c-04 | Purvi modulation 4 from Figure 7c, Kathleen Schlesinger (16/15 15/13 13/12), (13/12 15/13 16/15) | 7 | 1200.0 | 13 |
| xen10-wilson-purvi-07c-05 | Purvi modulation 5 from Figure 7c, Kathleen Schlesinger (16/15 15/13 13/12), (13/12 15/13 16/15) | 7 | 1200.0 | 13 |
| xen10-wilson-purvi-07c-06 | Purvi modulation 6 from Figure 7c, Kathleen Schlesinger (16/15 15/13 13/12), (13/12 15/13 16/15) | 7 | 1200.0 | 13 |
| xen10-wilson-purvi-07c-07 | Purvi modulation 7 from Figure 7c, Kathleen Schlesinger (16/15 15/13 13/12), (13/12 15/13 16/15) | 7 | 1200.0 | 13 |
| xen10-wilson-purvi-08a-01 | Purvi modulation 1 from Figure 8a, Ptolemy (12/11 22/21 7/6), (7/6 12/11 22/21) | 7 | 1200.0 | 11 |
| xen10-wilson-purvi-08a-02 | Purvi modulation 2 from Figure 8a, Ptolemy (12/11 22/21 7/6), (7/6 12/11 22/21) | 7 | 1200.0 | 11 |
| xen10-wilson-purvi-08a-03 | Purvi modulation 3 from Figure 8a, Ptolemy (12/11 22/21 7/6), (7/6 12/11 22/21) | 7 | 1200.0 | 11 |
| xen10-wilson-purvi-08a-04 | Purvi modulation 4 from Figure 8a, Ptolemy (12/11 22/21 7/6), (7/6 12/11 22/21) | 7 | 1200.0 | 11 |
| xen10-wilson-purvi-08a-05 | Purvi modulation 5 from Figure 8a, Ptolemy (12/11 22/21 7/6), (7/6 12/11 22/21) | 7 | 1200.0 | 11 |
| xen10-wilson-purvi-08a-06 | Purvi modulation 6 from Figure 8a, Ptolemy (12/11 22/21 7/6), (7/6 12/11 22/21) | 7 | 1200.0 | 11 |
| xen10-wilson-purvi-08a-07 | Purvi modulation 7 from Figure 8a, Ptolemy (12/11 22/21 7/6), (7/6 12/11 22/21) | 7 | 1200.0 | 11 |
| xen10-wilson-purvi-08b-01 | Purvi modulation 1 from Figure 8b, Ptolemy (7/6 22/21 12/11), (22/21 12/11 7/6) | 7 | 1200.0 | 11 |
| xen10-wilson-purvi-08b-02 | Purvi modulation 2 from Figure 8b, Ptolemy (7/6 22/21 12/11), (22/21 12/11 7/6) | 7 | 1200.0 | 11 |
| xen10-wilson-purvi-08b-03 | Purvi modulation 3 from Figure 8b, Ptolemy (7/6 22/21 12/11), (22/21 12/11 7/6) | 7 | 1200.0 | 11 |
| xen10-wilson-purvi-08b-04 | Purvi modulation 4 from Figure 8b, Ptolemy (7/6 22/21 12/11), (22/21 12/11 7/6) | 7 | 1200.0 | 11 |
| xen10-wilson-purvi-08b-05 | Purvi modulation 5 from Figure 8b, Ptolemy (7/6 22/21 12/11), (22/21 12/11 7/6) | 7 | 1200.0 | 11 |
| xen10-wilson-purvi-08b-06 | Purvi modulation 6 from Figure 8b, Ptolemy (7/6 22/21 12/11), (22/21 12/11 7/6) | 7 | 1200.0 | 11 |
| xen10-wilson-purvi-08b-07 | Purvi modulation 7 from Figure 8b, Ptolemy (7/6 22/21 12/11), (22/21 12/11 7/6) | 7 | 1200.0 | 11 |
| xen10-wilson-purvi-08c-01 | Purvi modulation 1 from Figure 8c, Ptolemy (22/21 7/6 12/11), (12/11 7/6 22/21) | 7 | 1200.0 | 11 |
| xen10-wilson-purvi-08c-02 | Purvi modulation 2 from Figure 8c, Ptolemy (22/21 7/6 12/11), (12/11 7/6 22/21) | 7 | 1200.0 | 11 |
| xen10-wilson-purvi-08c-03 | Purvi modulation 3 from Figure 8c, Ptolemy (22/21 7/6 12/11), (12/11 7/6 22/21) | 7 | 1200.0 | 11 |
| xen10-wilson-purvi-08c-04 | Purvi modulation 4 from Figure 8c, Ptolemy (22/21 7/6 12/11), (12/11 7/6 22/21) | 7 | 1200.0 | 11 |
| xen10-wilson-purvi-08c-05 | Purvi modulation 5 from Figure 8c, Ptolemy (22/21 7/6 12/11), (12/11 7/6 22/21) | 7 | 1200.0 | 11 |
| xen10-wilson-purvi-08c-06 | Purvi modulation 6 from Figure 8c, Ptolemy (22/21 7/6 12/11), (12/11 7/6 22/21) | 7 | 1200.0 | 11 |
| xen10-wilson-purvi-08c-07 | Purvi modulation 7 from Figure 8c, Ptolemy (22/21 7/6 12/11), (12/11 7/6 22/21) | 7 | 1200.0 | 11 |
| xen10-wilson-purvi-09a-01 | Purvi modulation 1 from Figure 9a, Hawkins (135/128 16/15 32/27), (32/27 135/128 16/15) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-09a-02 | Purvi modulation 2 from Figure 9a, Hawkins (135/128 16/15 32/27), (32/27 135/128 16/15) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-09a-03 | Purvi modulation 3 from Figure 9a, Hawkins (135/128 16/15 32/27), (32/27 135/128 16/15) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-09a-04 | Purvi modulation 4 from Figure 9a, Hawkins (135/128 16/15 32/27), (32/27 135/128 16/15) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-09a-05 | Purvi modulation 5 from Figure 9a, Hawkins (135/128 16/15 32/27), (32/27 135/128 16/15) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-09a-06 | Purvi modulation 6 from Figure 9a, Hawkins (135/128 16/15 32/27), (32/27 135/128 16/15) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-09a-07 | Purvi modulation 7 from Figure 9a, Hawkins (135/128 16/15 32/27), (32/27 135/128 16/15) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-09b-01 | Purvi modulation 1 from Figure 9b, Hawkins (32/27 16/15 135/128), (16/15 135/128 32/27) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-09b-02 | Purvi modulation 2 from Figure 9b, Hawkins (32/27 16/15 135/128), (16/15 135/128 32/27) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-09b-03 | Purvi modulation 3 from Figure 9b, Hawkins (32/27 16/15 135/128), (16/15 135/128 32/27) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-09b-04 | Purvi modulation 4 from Figure 9b, Hawkins (32/27 16/15 135/128), (16/15 135/128 32/27) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-09b-05 | Purvi modulation 5 from Figure 9b, Hawkins (32/27 16/15 135/128), (16/15 135/128 32/27) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-09b-06 | Purvi modulation 6 from Figure 9b, Hawkins (32/27 16/15 135/128), (16/15 135/128 32/27) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-09b-07 | Purvi modulation 7 from Figure 9b, Hawkins (32/27 16/15 135/128), (16/15 135/128 32/27) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-09c-01 | Purvi modulation 1 from Figure 9c, Hawkins (135/128 32/27 16/15) (16/15 32/27 135/128) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-09c-02 | Purvi modulation 2 from Figure 9c, Hawkins (135/128 32/27 16/15) (16/15 32/27 135/128) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-09c-03 | Purvi modulation 3 from Figure 9c, Hawkins (135/128 32/27 16/15) (16/15 32/27 135/128) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-09c-04 | Purvi modulation 4 from Figure 9c, Hawkins (135/128 32/27 16/15) (16/15 32/27 135/128) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-09c-05 | Purvi modulation 5 from Figure 9c, Hawkins (135/128 32/27 16/15) (16/15 32/27 135/128) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-09c-06 | Purvi modulation 6 from Figure 9c, Hawkins (135/128 32/27 16/15) (16/15 32/27 135/128) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-09c-07 | Purvi modulation 7 from Figure 9c, Hawkins (135/128 32/27 16/15) (16/15 32/27 135/128) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-10a-01 | Purvi modulation 1 from Figure 10a, Didymus (16/15 25/24 6/5), (6/5 16/15 25/24) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-10a-02 | Purvi modulation 2 from Figure 10a, Didymus (16/15 25/24 6/5), (6/5 16/15 25/24) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-10a-03 | Purvi modulation 3 from Figure 10a, Didymus (16/15 25/24 6/5), (6/5 16/15 25/24) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-10a-04 | Purvi modulation 4 from Figure 10a, Didymus (16/15 25/24 6/5), (6/5 16/15 25/24) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-10a-05 | Purvi modulation 5 from Figure 10a, Didymus (16/15 25/24 6/5), (6/5 16/15 25/24) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-10a-06 | Purvi modulation 6 from Figure 10a, Didymus (16/15 25/24 6/5), (6/5 16/15 25/24) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-10a-07 | Purvi modulation 7 from Figure 10a, Didymus (16/15 25/24 6/5), (6/5 16/15 25/24) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-10b-01 | Purvi modulation 1 from Figure 10b, Didymus (6/5 25/24 16/15), (25/24 16/15 6/5) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-10b-02 | Purvi modulation 2 from Figure 10b, Didymus (6/5 25/24 16/15), (25/24 16/15 6/5) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-10b-03 | Purvi modulation 3 from Figure 10b, Didymus (6/5 25/24 16/15), (25/24 16/15 6/5) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-10b-04 | Purvi modulation 4 from Figure 10b, Didymus (6/5 25/24 16/15), (25/24 16/15 6/5) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-10b-05 | Purvi modulation 5 from Figure 10b, Didymus (6/5 25/24 16/15), (25/24 16/15 6/5) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-10b-06 | Purvi modulation 6 from Figure 10b, Didymus (6/5 25/24 16/15), (25/24 16/15 6/5) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-10b-07 | Purvi modulation 7 from Figure 10b, Didymus (6/5 25/24 16/15), (25/24 16/15 6/5) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-10c-01 | Purvi modulation 1 from Figure 10c, Didymus (25/24 6/5 16/15), (16/15 6/5 25/24) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-10c-02 | Purvi modulation 2 from Figure 10c, Didymus (25/24 6/5 16/15), (16/15 6/5 25/24) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-10c-03 | Purvi modulation 3 from Figure 10c, Didymus (25/24 6/5 16/15), (16/15 6/5 25/24) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-10c-04 | Purvi modulation 4 from Figure 10c, Didymus (25/24 6/5 16/15), (16/15 6/5 25/24) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-10c-05 | Purvi modulation 5 from Figure 10c, Didymus (25/24 6/5 16/15), (16/15 6/5 25/24) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-10c-06 | Purvi modulation 6 from Figure 10c, Didymus (25/24 6/5 16/15), (16/15 6/5 25/24) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-10c-07 | Purvi modulation 7 from Figure 10c, Didymus (25/24 6/5 16/15), (16/15 6/5 25/24) | 7 | 1200.0 | 5 |
| xen10-wilson-purvi-11a-01 | Purvi modulation 1 from Figure 11a, Archytas (28/27 36/35 5/4), (5/4 28/27 36/35) | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-11a-02 | Purvi modulation 2 from Figure 11a, Archytas (28/27 36/35 5/4), (5/4 28/27 36/35) | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-11a-03 | Purvi modulation 3 from Figure 11a, Archytas (28/27 36/35 5/4), (5/4 28/27 36/35) | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-11a-04 | Purvi modulation 4 from Figure 11a, Archytas (28/27 36/35 5/4), (5/4 28/27 36/35) | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-11a-05 | Purvi modulation 5 from Figure 11a, Archytas (28/27 36/35 5/4), (5/4 28/27 36/35) | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-11a-06 | Purvi modulation 6 from Figure 11a, Archytas (28/27 36/35 5/4), (5/4 28/27 36/35) | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-11a-07 | Purvi modulation 7 from Figure 11a, Archytas (28/27 36/35 5/4), (5/4 28/27 36/35) | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-11b-01 | Purvi modulation 1 from Figure 11b, Archytas (5/4 36/35 28/27), (36/35 28/27 5/4) | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-11b-02 | Purvi modulation 2 from Figure 11b, Archytas (5/4 36/35 28/27), (36/35 28/27 5/4) | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-11b-03 | Purvi modulation 3 from Figure 11b, Archytas (5/4 36/35 28/27), (36/35 28/27 5/4) | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-11b-04 | Purvi modulation 4 from Figure 11b, Archytas (5/4 36/35 28/27), (36/35 28/27 5/4) | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-11b-05 | Purvi modulation 5 from Figure 11b, Archytas (5/4 36/35 28/27), (36/35 28/27 5/4) | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-11b-06 | Purvi modulation 6 from Figure 11b, Archytas (5/4 36/35 28/27), (36/35 28/27 5/4) | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-11b-07 | Purvi modulation 7 from Figure 11b, Archytas (5/4 36/35 28/27), (36/35 28/27 5/4) | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-11c-01 | Purvi modulation 1 from Figure 11c, Archytas (28/27 5/4 36/35), (36/35 5/4 28/27) | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-11c-02 | Purvi modulation 2 from Figure 11c, Archytas (28/27 5/4 36/35), (36/35 5/4 28/27) | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-11c-03 | Purvi modulation 3 from Figure 11c, Archytas (28/27 5/4 36/35), (36/35 5/4 28/27) | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-11c-04 | Purvi modulation 4 from Figure 11c, Archytas (28/27 5/4 36/35), (36/35 5/4 28/27) | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-11c-05 | Purvi modulation 5 from Figure 11c, Archytas (28/27 5/4 36/35), (36/35 5/4 28/27) | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-11c-06 | Purvi modulation 6 from Figure 11c, Archytas (28/27 5/4 36/35), (36/35 5/4 28/27) | 7 | 1200.0 | 7 |
| xen10-wilson-purvi-11c-07 | Purvi modulation 7 from Figure 11c, Archytas (28/27 5/4 36/35), (36/35 5/4 28/27) | 7 | 1200.0 | 7 |
| xen10-wolf-sands | Scale from 'Trio: The Sands' | 12 | 1200.0 | 7 |
| xen11-chalmers-tetrachordal-04-01 | Sterea, a Lyra tuning: Tonic Diatonic | 7 | 1200.0 | 7 |
| xen11-chalmers-tetrachordal-04-02a | Malaka, a Lyra tuning: Soft or Intense Chromatic and Tonic Diatonic | 7 | 1200.0 | 7 |
| xen11-chalmers-tetrachordal-04-02b | Malaka, a Lyra tuning: Soft or Intense Chromatic and Tonic Diatonic | 7 | 1200.0 | 11 |
| xen11-chalmers-tetrachordal-04-03 | Metabolika, another Lyra tuning: Soft Diatonic and Tonic Diatonic | 7 | 1200.0 | 7 |
| xen11-chalmers-tetrachordal-04-04 | Iasti-Aiolikai, a Kithara tuning: Tonic Diatonic and Ditonic Diatonic | 7 | 1200.0 | 7 |
| xen11-chalmers-tetrachordal-04-05 | Iastia or Lydia, Kithara tunings: Intense Diatonic and Tonic Diatonic | 7 | 1200.0 | 7 |
| xen11-chalmers-tetrachordal-06-01 | Transposition by A | 7 | 1200.0 | 7 |
| xen11-chalmers-tetrachordal-06-02 | Transposition by B | 7 | 1200.0 | 7 |
| xen11-chalmers-tetrachordal-06-03 | Transposition by 4/3, Mixolydian Mode | 7 | 1200.0 | 7 |
| xen11-chalmers-tetrachordal-06-04 | Transposition by 3/2, Dorian Mode | 7 | 1200.0 | 7 |
| xen11-chalmers-tetrachordal-06-05 | Transposition by 2/B | 7 | 1200.0 | 7 |
| xen11-chalmers-tetrachordal-06-06 | Transposition by 2/A | 7 | 1200.0 | 7 |
| xen11-chalmers-tetrachordal-06-07 | Transposition by 9/8 & 3/2, Hypodorian Mode | 7 | 1200.0 | 7 |
| xen11-chalmers-tetrachordal-06-08 | Transposition by 4/3B | 7 | 1200.0 | 7 |
| xen11-chalmers-tetrachordal-06-09 | Transposition by 4/3A | 7 | 1200.0 | 7 |
| xen11-chalmers-tetrachordal-06-10 | Transposition by A/B | 7 | 1200.0 | 7 |
| xen11-chalmers-tetrachordal-06-11 | Transposition by B/A | 7 | 1200.0 | 7 |
| xen11-chalmers-tetrachordal-08-01 | Transposition and Inversion by A, 6 tones, a Hexany | 6 | 1200.0 | 7 |
| xen11-chalmers-tetrachordal-08-02 | Transposition and Inversion by B, 6 tones, a Hexany | 6 | 1200.0 | 7 |
| xen11-chalmers-tetrachordal-08-03 | Transposition and Inversion by 4/3, 7 tones, Psi-Mixolydian | 7 | 1200.0 | 7 |
| xen11-chalmers-tetrachordal-08-04 | Transposition and Inversion by 3/2, 7 tones, Psi-Dorian | 7 | 1200.0 | 7 |
| xen11-chalmers-tetrachordal-08-05 | Transposition and Inversion by 2/B, 8 tones, an Octony | 8 | 1200.0 | 7 |
| xen11-chalmers-tetrachordal-08-06 | Transposition and Inversion by 2/A, 8 tones, an Octony | 8 | 1200.0 | 7 |
| xen11-chalmers-tetrachordal-08-07 | Transposition and Inversion by 9/8 & 3/2, 7 tones, Psi-Hypodorian 1 | 7 | 1200.0 | 7 |
| xen11-chalmers-tetrachordal-08-08 | Transposition and Inversion by 9/8 & 3/2, 7 tones, Psi-Hypodorian 2 | 7 | 1200.0 | 7 |
| xen11-chalmers-tetrachordal-08-09 | Transposition and Inversion by 1/1, 6 tones, a Hexany | 6 | 1200.0 | 7 |
| xen11-chalmers-tetrachordal-08-10 | Transposition and Inversion by 4/3B, 8 tones, an Octony | 8 | 1200.0 | 7 |
| xen11-chalmers-tetrachordal-08-11 | Transposition and Inversion by 4/3A, 8 tones, an Octony | 8 | 1200.0 | 7 |
| xen11-chalmers-tetrachordal-08-12 | Tetrachordal Hexany, 6 tones, A-Mode | 6 | 1200.0 | 7 |
| xen11-chalmers-tetrachordal-08-13 | Euler's Genus Musicum, 8 tones, an Octony | 8 | 1200.0 | 7 |
| xen11-chalmers-tetrachordal-08-14 | Transposition and Inversion by B/A, 8 tones, an Octony | 8 | 1200.0 | 7 |
| xen11-chalmers-tetrachordal-08-15 | Transposition and Inversion by A/B, 8 tones, an Octony | 8 | 1200.0 | 7 |
| xen11-chalmers-tetrachordal-10-01 | Thirteen Tone Octave Modular Diamond | 13 | 1200.0 | 7 |
| xen11-chalmers-tetrachordal-10-02 | Eight Tone Fourth Modular Diamond | 8 | 1200.0 | 7 |
| xen11-chalmers-tetrachordal-10-03 | Prime-Prime and Inverted-Inverted Heptatonic Diamonds, 27 Tones | 27 | 1200.0 | 7 |
| xen11-chalmers-tetrachordal-10-04 | Prime-Inverted Heptatonic Diamond, 25 Tones | 25 | 1200.0 | 7 |
| xen11-chalmers-tetrachordal-10-05 | Inverted-Prime Heptatonic Diamond, 25 Tones | 25 | 1200.0 | 7 |
| xen11-chalmers-tetrachordal-10-06 | Stellated Tetrachordal Hexany, 14 Tones | 14 | 1200.0 | 7 |
| xen11-chalmers-tetrachordal-10-07 | Stellated Hexany, Entry #1 of Table 7., 14 tones, Permuted Tetrachord | 14 | 1200.0 | 7 |
| xen11-garcia-linear-29 | Linear series of alternating 15/13 and 52/45 | 29 | 1200.0 | 13 |
| xen11-wilsonsmithgrady-marimba | Marimba design, Inverted D'alessandro Kbd Program | 36 | 1200.0 | 11 |
| xen11-wolf-pelog | Pelog based on stacking 7/6 | 7 | 1202.1 | |
| xen11-wolf-pelog-2 | Pelog based on stacking 7/6, pitches 2 and 6 lowered | 7 | 1202.1 | |
| xen11-wolf-pelog-extended | Pelog based on stacking 7/6, extended to 9 tones | 9 | 1202.1 | |
| xen12-chalmers-tritriadic-dm-1-21-23 | Tritriadic D->M scale built from 1:21:23 | 7 | 1200.0 | 23 |
| xen12-chalmers-tritriadic-dm-1-3-11 | Tritriadic D->M scale built from 1:3:11 | 7 | 1200.0 | 11 |
| xen12-chalmers-tritriadic-dm-1-5-27 | Tritriadic D->M scale built from 1:5:27 | 7 | 1200.0 | 5 |
| xen12-chalmers-tritriadic-dm-1-7-17 | Tritriadic D->M scale built from 1:7:17 | 7 | 1200.0 | 17 |
| xen12-chalmers-tritriadic-dm-11-27-9 | Tritriadic D->M scale built from 11:27:9 | 7 | 1200.0 | 11 |
| xen12-chalmers-tritriadic-dm-11-5-3 | Tritriadic D->M scale built from 11:5:3 | 7 | 1200.0 | 11 |
| xen12-chalmers-tritriadic-dm-13-17-19 | Tritriadic D->M scale built from 13:17:19 | 7 | 1200.0 | 19 |
| xen12-chalmers-tritriadic-dm-13-23-7 | Tritriadic D->M scale built from 13:23:7 | 7 | 1200.0 | 23 |
| xen12-chalmers-tritriadic-dm-13-9-5 | Tritriadic D->M scale built from 13:9:5 | 7 | 1200.0 | 13 |
| xen12-chalmers-tritriadic-dm-15-11-5 | Tritriadic D->M scale built from 15:11:5 | 7 | 1200.0 | 11 |
| xen12-chalmers-tritriadic-dm-15-21-23 | Tritriadic D->M scale built from 15:21:23 | 7 | 1200.0 | 23 |
| xen12-chalmers-tritriadic-dm-17-21-7 | Tritriadic D->M scale built from 17:21:7 | 7 | 1200.0 | 17 |
| xen12-chalmers-tritriadic-dm-17-23-25 | Tritriadic D->M scale built from 17:23:25 | 7 | 1200.0 | 23 |
| xen12-chalmers-tritriadic-dm-17-27-5 | Tritriadic D->M scale built from 17:27:5 | 7 | 1200.0 | 17 |
| xen12-chalmers-tritriadic-dm-19-21-17 | Tritriadic D->M scale built from 19:21:17 | 7 | 1200.0 | 19 |
| xen12-chalmers-tritriadic-dm-19-25-7 | Tritriadic D->M scale built from 19:25:7 | 7 | 1200.0 | 19 |
| xen12-chalmers-tritriadic-dm-21-23-19 | Tritriadic D->M scale built from 21:23:19 | 7 | 1200.0 | 23 |
| xen12-chalmers-tritriadic-dm-21-25-17 | Tritriadic D->M scale built from 21:25:17 | 7 | 1200.0 | 17 |
| xen12-chalmers-tritriadic-dm-23-19-7 | Tritriadic D->M scale built from 23:19:7 | 7 | 1200.0 | 23 |
| xen12-chalmers-tritriadic-dm-23-21-13 | Tritriadic D->M scale built from 23:21:13 | 7 | 1200.0 | 23 |
| xen12-chalmers-tritriadic-dm-25-19-17 | Tritriadic D->M scale built from 25:19:17 | 7 | 1200.0 | 19 |
| xen12-chalmers-tritriadic-dm-25-23-7 | Tritriadic D->M scale built from 25:23:7 | 7 | 1200.0 | 23 |
| xen12-chalmers-tritriadic-dm-25-27-11 | Tritriadic D->M scale built from 25:27:11 | 7 | 1200.0 | 11 |
| xen12-chalmers-tritriadic-dm-27-21-19 | Tritriadic D->M scale built from 27:21:19 | 7 | 1200.0 | 19 |
| xen12-chalmers-tritriadic-dm-27-23-17 | Tritriadic D->M scale built from 27:23:17 | 7 | 1200.0 | 23 |
| xen12-chalmers-tritriadic-dm-27-25-15 | Tritriadic D->M scale built from 27:25:15 | 7 | 1200.0 | 5 |
| xen12-chalmers-tritriadic-dm-27-9-5 | Tritriadic D->M scale built from 27:9:5 | 7 | 1200.0 | 5 |
| xen12-chalmers-tritriadic-dm-3-11-27 | Tritriadic D->M scale built from 3:11:27 | 7 | 1200.0 | 11 |
| xen12-chalmers-tritriadic-dm-3-5-15 | Tritriadic D->M scale built from 3:5:15 | 7 | 1200.0 | 5 |
| xen12-chalmers-tritriadic-dm-3-7-19 | Tritriadic D->M scale built from 3:7:19 | 7 | 1200.0 | 19 |
| xen12-chalmers-tritriadic-dm-5-15-27 | Tritriadic D->M scale built from 5:15:27 | 7 | 1200.0 | 5 |
| xen12-chalmers-tritriadic-dm-5-17-25 | Tritriadic D->M scale built from 5:17:25 | 7 | 1200.0 | 17 |
| xen12-chalmers-tritriadic-dm-5-17-7 | Tritriadic D->M scale built from 5:17:7 | 7 | 1200.0 | 17 |
| xen12-chalmers-tritriadic-dm-5-3-1 | Tritriadic D->M scale built from 5:3:1 | 7 | 1200.0 | 5 |
| xen12-chalmers-tritriadic-dm-5-9-11 | Tritriadic D->M scale built from 5:9:11 | 7 | 1200.0 | 11 |
| xen12-chalmers-tritriadic-dm-7-13-1 | Tritriadic D->M scale built from 7:13:1 | 7 | 1200.0 | 13 |
| xen12-chalmers-tritriadic-dm-7-17-23 | Tritriadic D->M scale built from 7:17:23 | 7 | 1200.0 | 23 |
| xen12-chalmers-tritriadic-dm-7-19-21 | Tritriadic D->M scale built from 7:19:21 | 7 | 1200.0 | 19 |
| xen12-chalmers-tritriadic-dm-7-9-5 | Tritriadic D->M scale built from 7:9:5 | 7 | 1200.0 | 7 |
| xen12-chalmers-tritriadic-dm-9-11-15 | Tritriadic D->M scale built from 9:11:15 | 7 | 1200.0 | 11 |
| xen12-chalmers-tritriadic-dm-9-25-7 | Tritriadic D->M scale built from 9:25:7 | 7 | 1200.0 | 7 |
| xen12-chalmers-tritriadic-dm-9-5-1 | Tritriadic D->M scale built from 9:5:1 | 7 | 1200.0 | 5 |
| xen12-chalmers-tritriadic-mt-1-21-23 | Tritriadic M->T scale built from 1:21:23 | 7 | 1200.0 | 23 |
| xen12-chalmers-tritriadic-mt-11-27-9 | Tritriadic M->T scale built from 11:27:9 | 7 | 1200.0 | 11 |
| xen12-chalmers-tritriadic-mt-11-5-3 | Tritriadic M->T scale built from 11:5:3 | 7 | 1200.0 | 11 |
| xen12-chalmers-tritriadic-mt-13-17-19 | Tritriadic M->T scale built from 13:17:19 | 7 | 1200.0 | 19 |
| xen12-chalmers-tritriadic-mt-13-23-7 | Tritriadic M->T scale built from 13:23:7 | 7 | 1200.0 | 23 |
| xen12-chalmers-tritriadic-mt-13-9-5 | Tritriadic M->T scale built from 13:9:5 | 7 | 1200.0 | 13 |
| xen12-chalmers-tritriadic-mt-15-11-5 | Tritriadic M->T scale built from 15:11:5 | 7 | 1200.0 | 11 |
| xen12-chalmers-tritriadic-mt-15-21-23 | Tritriadic M->T scale built from 15:21:23 | 7 | 1200.0 | 23 |
| xen12-chalmers-tritriadic-mt-17-21-7 | Tritriadic M->T scale built from 17:21:7 | 7 | 1200.0 | 17 |
| xen12-chalmers-tritriadic-mt-17-23-25 | Tritriadic M->T scale built from 17:23:25 | 7 | 1200.0 | 23 |
| xen12-chalmers-tritriadic-mt-17-27-5 | Tritriadic M->T scale built from 17:27:5 | 7 | 1200.0 | 17 |
| xen12-chalmers-tritriadic-mt-19-21-17 | Tritriadic M->T scale built from 19:21:17 | 7 | 1200.0 | 19 |
| xen12-chalmers-tritriadic-mt-19-25-7 | Tritriadic M->T scale built from 19:25:7 | 7 | 1200.0 | 19 |
| xen12-chalmers-tritriadic-mt-21-23-19 | Tritriadic M->T scale built from 21:23:19 | 7 | 1200.0 | 23 |
| xen12-chalmers-tritriadic-mt-21-25-17 | Tritriadic M->T scale built from 21:25:17 | 7 | 1200.0 | 17 |
| xen12-chalmers-tritriadic-mt-23-19-7 | Tritriadic M->T scale built from 23:19:7 | 7 | 1200.0 | 23 |
| xen12-chalmers-tritriadic-mt-23-21-13 | Tritriadic M->T scale built from 23:21:13 | 7 | 1200.0 | 23 |
| xen12-chalmers-tritriadic-mt-25-19-17 | Tritriadic M->T scale built from 25:19:17 | 7 | 1200.0 | 19 |
| xen12-chalmers-tritriadic-mt-25-23-7 | Tritriadic M->T scale built from 25:23:7 | 7 | 1200.0 | 23 |
| xen12-chalmers-tritriadic-mt-25-27-11 | Tritriadic M->T scale built from 25:27:11 | 7 | 1200.0 | 11 |
| xen12-chalmers-tritriadic-mt-27-21-19 | Tritriadic M->T scale built from 27:21:19 | 7 | 1200.0 | 19 |
| xen12-chalmers-tritriadic-mt-27-23-17 | Tritriadic M->T scale built from 27:23:17 | 7 | 1200.0 | 23 |
| xen12-chalmers-tritriadic-mt-27-25-15 | Tritriadic M->T scale built from 27:25:15 | 7 | 1200.0 | 5 |
| xen12-chalmers-tritriadic-mt-27-5-1 | Tritriadic M->T scale built from 27:5:1 | 7 | 1200.0 | 5 |
| xen12-chalmers-tritriadic-mt-27-9-5 | Tritriadic M->T scale built from 27:9:5 | 7 | 1200.0 | 5 |
| xen12-chalmers-tritriadic-mt-3-11-27 | Tritriadic M->T scale built from 3:11:27 | 7 | 1200.0 | 11 |
| xen12-chalmers-tritriadic-mt-3-5-15 | Tritriadic M->T scale built from 3:5:15 | 7 | 1200.0 | 5 |
| xen12-chalmers-tritriadic-mt-3-7-19 | Tritriadic M->T scale built from 3:7:19 | 7 | 1200.0 | 19 |
| xen12-chalmers-tritriadic-mt-5-15-27 | Tritriadic M->T scale built from 5:15:27 | 7 | 1200.0 | 5 |
| xen12-chalmers-tritriadic-mt-5-17-25 | Tritriadic M->T scale built from 5:17:25 | 7 | 1200.0 | 17 |
| xen12-chalmers-tritriadic-mt-5-17-7 | Tritriadic M->T scale built from 5:17:7 | 7 | 1200.0 | 17 |
| xen12-chalmers-tritriadic-mt-5-9-11 | Tritriadic M->T scale built from 5:9:11 | 7 | 1200.0 | 11 |
| xen12-chalmers-tritriadic-mt-7-17-23 | Tritriadic M->T scale built from 7:17:23 | 7 | 1200.0 | 23 |
| xen12-chalmers-tritriadic-mt-7-19-21 | Tritriadic M->T scale built from 7:19:21 | 7 | 1200.0 | 19 |
| xen12-chalmers-tritriadic-mt-7-9-5 | Tritriadic M->T scale built from 7:9:5 | 7 | 1200.0 | 7 |
| xen12-chalmers-tritriadic-mt-9-11-15 | Tritriadic M->T scale built from 9:11:15 | 7 | 1200.0 | 11 |
| xen12-chalmers-tritriadic-mt-9-25-7 | Tritriadic M->T scale built from 9:25:7 | 7 | 1200.0 | 7 |
| xen12-hanson-02-ten | Ten tones, Figure 2 | 10 | 1200.0 | 5 |
| xen12-hanson-06-53-just | 53 tones, tonal function, Figure 6 | 53 | 1200.0 | 5 |
| xen12-hanson-06-basic | Basic group of 19 of 53 tones, Figure 6 | 19 | 1200.0 | |
| xen12-hanson-06-basic-just | Basic group of 19 of 53 tones, tonal function, Figure 6 | 19 | 1200.0 | 5 |
| xen12-hanson-11-chain-19 | Chain of minor thirds in 19EDO, Figure 11 | 19 | 1200.0 | |
| xen12-hanson-11-chain-34 | Chain of minor thirds in 34EDO, Figure 11 | 19 | 1200.0 | |
| xen12-hanson-11-chain-72 | Chain of minor thirds in 72EDO, Figure 11 | 19 | 1200.0 | |
| xen12-hanson-11-chain-87 | Chain of minor thirds in 87EDO, Figure 11 | 19 | 1200.0 | |
| xen12-hanson-12-ogdoadic-diamond | Ogdoadic Diamond, Figure 12 | 49 | 1200.0 | 13 |
| xen12-hanson-13-three-ogdoadic-diamonds | 3 Ogdoadic Diamonds (at 1/1, 4/3 & 3/2), Figure 13 | 91 | 1200.0 | 13 |
| xen12-wilson-02-hexany | 3-5-7-11 Hexany, Figure 2 | 6 | 1200.0 | 11 |
| xen12-wilson-06-mandala | The 3-5-7-11 Mandala, Figure 6 | 14 | 1200.0 | 11 |
| xen12-wilson-06b-genus | 3*5*7*11 Genus, Figure 6b | 16 | 1200.0 | 11 |
| xen12-wilson-06c-4C1-tetrany | 3-5-7-11 4C1 tetrany, Figure 6c | 4 | 1200.0 | 11 |
| xen12-wilson-06c-4C3-tetrany | 3-5-7-11 4C3 tetrany, Figure 6c | 4 | 1200.0 | 11 |
| xen12-wilson-06d-diamond | 1-3-5-7 diamond, Figure 6d | 13 | 1200.0 | 7 |
| xen12-wilson-06d-major-tetrad | 1-3-5-7 major tetrad, Figure 6d | 4 | 1200.0 | 7 |
| xen12-wilson-06d-minor-tetrad | 1-3-5-7 minor tetrad, Figure 6d | 4 | 1200.0 | 7 |
| xen12-wilson-07-eikosany | 1-3-7-9-11-15 Eikosany, Figure 7 | 20 | 1200.0 | 11 |
| xen12-wilson-07-eikosany-extended | 1-3-7-9-11-15 Eikosany with two added tones, Figure 7 | 22 | 1200.0 | 11 |
| xen12-wilson-08-4C1-tetrany-00 | 1-3-7-9 4C1 Tetrany, Figure 8 | 4 | 1200.0 | 7 |
| xen12-wilson-08-4C1-tetrany-01 | 1-3-7-11 4C1 Tetrany, Figure 8 | 4 | 1200.0 | 11 |
| xen12-wilson-08-4C1-tetrany-02 | 1-3-7-15 4C1 Tetrany, Figure 8 | 4 | 1200.0 | 7 |
| xen12-wilson-08-4C1-tetrany-03 | 1-3-9-11 4C1 Tetrany, Figure 8 | 4 | 1200.0 | 11 |
| xen12-wilson-08-4C1-tetrany-04 | 1-3-9-15 4C1 Tetrany, Figure 8 | 4 | 1200.0 | 5 |
| xen12-wilson-08-4C1-tetrany-05 | 1-3-11-15 4C1 Tetrany, Figure 8 | 4 | 1200.0 | 11 |
| xen12-wilson-08-4C1-tetrany-06 | 1-7-9-11 4C1 Tetrany, Figure 8 | 4 | 1200.0 | 11 |
| xen12-wilson-08-4C1-tetrany-07 | 1-7-9-15 4C1 Tetrany, Figure 8 | 4 | 1200.0 | 7 |
| xen12-wilson-08-4C1-tetrany-08 | 1-7-11-15 4C1 Tetrany, Figure 8 | 4 | 1200.0 | 11 |
| xen12-wilson-08-4C1-tetrany-09 | 1-9-11-15 4C1 Tetrany, Figure 8 | 4 | 1200.0 | 11 |
| xen12-wilson-08-4C1-tetrany-10 | 3-7-9-11 4C1 Tetrany, Figure 8 | 4 | 1200.0 | 11 |
| xen12-wilson-08-4C1-tetrany-11 | 3-7-9-15 4C1 Tetrany, Figure 8 | 4 | 1200.0 | 7 |
| xen12-wilson-08-4C1-tetrany-12 | 3-7-11-15 4C1 Tetrany, Figure 8 | 4 | 1200.0 | 11 |
| xen12-wilson-08-4C1-tetrany-13 | 3-9-11-15 4C1 Tetrany, Figure 8 | 4 | 1200.0 | 11 |
| xen12-wilson-08-4C1-tetrany-14 | 7-9-11-15 4C1 Tetrany, Figure 8 | 4 | 1200.0 | 11 |
| xen12-wilson-08-4C3-tetrany-00 | 1-3-7-9 4C3 Tetrany, Figure 8 | 4 | 1200.0 | 7 |
| xen12-wilson-08-4C3-tetrany-01 | 1-3-7-11 4C3 Tetrany, Figure 8 | 4 | 1200.0 | 11 |
| xen12-wilson-08-4C3-tetrany-02 | 1-3-7-15 4C3 Tetrany, Figure 8 | 4 | 1200.0 | 7 |
| xen12-wilson-08-4C3-tetrany-03 | 1-3-9-11 4C3 Tetrany, Figure 8 | 4 | 1200.0 | 11 |
| xen12-wilson-08-4C3-tetrany-04 | 1-3-9-15 4C3 Tetrany, Figure 8 | 4 | 1200.0 | 5 |
| xen12-wilson-08-4C3-tetrany-05 | 1-3-11-15 4C3 Tetrany, Figure 8 | 4 | 1200.0 | 11 |
| xen12-wilson-08-4C3-tetrany-06 | 1-7-9-11 4C3 Tetrany, Figure 8 | 4 | 1200.0 | 11 |
| xen12-wilson-08-4C3-tetrany-07 | 1-7-9-15 4C3 Tetrany, Figure 8 | 4 | 1200.0 | 7 |
| xen12-wilson-08-4C3-tetrany-08 | 1-7-11-15 4C3 Tetrany, Figure 8 | 4 | 1200.0 | 11 |
| xen12-wilson-08-4C3-tetrany-09 | 1-9-11-15 4C3 Tetrany, Figure 8 | 4 | 1200.0 | 11 |
| xen12-wilson-08-4C3-tetrany-10 | 3-7-9-11 4C3 Tetrany, Figure 8 | 4 | 1200.0 | 11 |
| xen12-wilson-08-4C3-tetrany-11 | 3-7-9-15 4C3 Tetrany, Figure 8 | 4 | 1200.0 | 7 |
| xen12-wilson-08-4C3-tetrany-12 | 3-7-11-15 4C3 Tetrany, Figure 8 | 4 | 1200.0 | 11 |
| xen12-wilson-08-4C3-tetrany-13 | 3-9-11-15 4C3 Tetrany, Figure 8 | 4 | 1200.0 | 11 |
| xen12-wilson-08-4C3-tetrany-14 | 7-9-11-15 4C3 Tetrany, Figure 8 | 4 | 1200.0 | 11 |
| xen12-wilson-09-4C2-hexany-00 | 1-3-7-9 4C2 Hexany, Figure 9 | 6 | 1200.0 | 7 |
| xen12-wilson-09-4C2-hexany-01 | 1-3-7-11 4C2 Hexany, Figure 9 | 6 | 1200.0 | 11 |
| xen12-wilson-09-4C2-hexany-02 | 1-3-7-15 4C2 Hexany, Figure 9 | 6 | 1200.0 | 7 |
| xen12-wilson-09-4C2-hexany-03 | 1-3-9-11 4C2 Hexany, Figure 9 | 6 | 1200.0 | 11 |
| xen12-wilson-09-4C2-hexany-04 | 1-3-9-15 4C2 Hexany, Figure 9 | 6 | 1200.0 | 5 |
| xen12-wilson-09-4C2-hexany-05 | 1-3-11-15 4C2 Hexany, Figure 9 | 6 | 1200.0 | 11 |
| xen12-wilson-09-4C2-hexany-06 | 1-7-9-11 4C2 Hexany, Figure 9 | 6 | 1200.0 | 11 |
| xen12-wilson-09-4C2-hexany-07 | 1-7-9-15 4C2 Hexany, Figure 9 | 6 | 1200.0 | 7 |
| xen12-wilson-09-4C2-hexany-08 | 1-7-11-15 4C2 Hexany, Figure 9 | 6 | 1200.0 | 11 |
| xen12-wilson-09-4C2-hexany-09 | 1-9-11-15 4C2 Hexany, Figure 9 | 6 | 1200.0 | 11 |
| xen12-wilson-09-4C2-hexany-10 | 3-7-9-11 4C2 Hexany, Figure 9 | 6 | 1200.0 | 11 |
| xen12-wilson-09-4C2-hexany-11 | 3-7-9-15 4C2 Hexany, Figure 9 | 6 | 1200.0 | 7 |
| xen12-wilson-09-4C2-hexany-12 | 3-7-11-15 4C2 Hexany, Figure 9 | 6 | 1200.0 | 11 |
| xen12-wilson-09-4C2-hexany-13 | 3-9-11-15 4C2 Hexany, Figure 9 | 6 | 1200.0 | 11 |
| xen12-wilson-09-4C2-hexany-14 | 7-9-11-15 4C2 Hexany, Figure 9 | 6 | 1200.0 | 11 |
| xen12-wilson-13-eikosany | 1-3-5-7-9-11 Eikosany, Figure 13 | 20 | 1200.0 | 11 |
| xen12-wilson-14-diamond | 1-3-5-7-9-11 Diamond, Figure 14 | 29 | 1200.0 | 11 |
| xen12-wilson-15-diamond-eikosany-intersection | Intersection of Diamond & Eikosany (1 3 5 7 9 11), Figure 15 | 10 | 1200.0 | 11 |
| xen12-wilson-15-diamond-eikosany-union | Union of Diamond & Eikosany (1 3 5 7 9 11), see Figure 15 | 37 | 1200.0 | 11 |
| xen12-wilson-20b-genus | Combination-product Sets (0,6) thru (6,6) 1 3 5 7 9 11, Figure 20b | 32 | 1200.0 | 11 |
| xen12-wilson-23-dalessandro | Genus 3*3*3*5*7*11*11 (& 8 pigtails), D'Alessandro, Figure 23 | 56 | 1200.0 | 11 |
| xen12-wilson-23-genus | Genus 3*3*3*5*7*11*11, subset of D'Alessandro, see Figure 23 | 48 | 1200.0 | 11 |
| xen12-wilson-23-repeated-1 | Lattice for Genus 3*3*3*5*7*11 (plus 6 pigtails), Repeated Patterins in "Dalessandro", Figure 23 | 38 | 1200.0 | 11 |
| xen12-wilson-23-repeated-2 | Lattice for Genus 3*3*3*5*7 (plus 4 pigtails), Repeated Patterins in "Dalessandro", Figure 23 | 20 | 1200.0 | 11 |
| xen12-wilson-24-dalessandro | "D'alessandro", 1.3.5.7.9.11 Combination-Product Set series, Figure 24 | 38 | 1200.0 | 11 |
| xen12-wilson-25-6C1-hexany | 1.3.5.7.9.11 6C1 Hexany, Figure 25 | 6 | 1200.0 | 11 |
| xen12-wilson-25-6C2-pentadekany | 1.3.5.7.9.11 6C2 Pentadekany, Figure 25 | 15 | 1200.0 | 11 |
| xen12-wilson-25-6C3-eikosany | 1.3.5.7.9.11 6C3 Eikosany, Figure 25 | 20 | 1200.0 | 11 |
| xen12-wilson-25-6C4-pentadekany | 1.3.5.7.9.11 6C4 Pentadekany, Figure 25 | 15 | 1200.0 | 11 |
| xen12-wilson-25-6C5-hexany | 1.3.5.7.9.11 6C5 Hexany, Figure 25 | 6 | 1200.0 | 11 |
| xen12-wilson-26-inverted-dallesandro | inverted "D'alessandro", Figure 26 | 36 | 1200.0 | 11 |
| xen12-wilson-30-double-dekany | 5C2 + 5C3 1-5-7-11-15 Double-Dekany, Figure 30 | 14 | 1200.0 | 11 |
| xen12-wilson-31-pentadic-diamond | 1-5-7-11-15 Pentadic Diamond, Figure 31 | 21 | 1200.0 | 11 |
| xen12-wilson-32-dekany | 5C2 1.5.7.11.15 Dekany, Figure 32 | 10 | 1200.0 | 11 |
| xen12-wilson-33-dekany | 5C3 1.5.7.11.15 Dekany, Figure 33 | 10 | 1200.0 | 11 |
| xen12-wilson-38-4C1-tetrany-00 | 1-3-5-7 4C1 Tetrany, Figure 38 | 4 | 1200.0 | 7 |
| xen12-wilson-38-4C1-tetrany-01 | 1-3-5-9 4C1 Tetrany, Figure 38 | 4 | 1200.0 | 5 |
| xen12-wilson-38-4C1-tetrany-02 | 1-3-5-11 4C1 Tetrany, Figure 38 | 4 | 1200.0 | 11 |
| xen12-wilson-38-4C1-tetrany-06 | 1-5-7-9 4C1 Tetrany, Figure 38 | 4 | 1200.0 | 7 |
| xen12-wilson-38-4C1-tetrany-07 | 1-5-7-11 4C1 Tetrany, Figure 38 | 4 | 1200.0 | 11 |
| xen12-wilson-38-4C1-tetrany-08 | 1-5-9-11 4C1 Tetrany, Figure 38 | 4 | 1200.0 | 11 |
| xen12-wilson-38-4C1-tetrany-10 | 3-5-7-9 4C1 Tetrany, Figure 38 | 4 | 1200.0 | 7 |
| xen12-wilson-38-4C1-tetrany-11 | 3-5-7-11 4C1 Tetrany, Figure 38 | 4 | 1200.0 | 11 |
| xen12-wilson-38-4C1-tetrany-12 | 3-5-9-11 4C1 Tetrany, Figure 38 | 4 | 1200.0 | 11 |
| xen12-wilson-38-4C1-tetrany-14 | 5-7-9-11 4C1 Tetrany, Figure 38 | 4 | 1200.0 | 11 |
| xen12-wilson-38-4C3-tetrany-00 | 1-3-5-7 4C3 Tetrany, Figure 38 | 4 | 1200.0 | 7 |
| xen12-wilson-38-4C3-tetrany-01 | 1-3-5-9 4C3 Tetrany, Figure 38 | 4 | 1200.0 | 5 |
| xen12-wilson-38-4C3-tetrany-02 | 1-3-5-11 4C3 Tetrany, Figure 38 | 4 | 1200.0 | 11 |
| xen12-wilson-38-4C3-tetrany-06 | 1-5-7-9 4C3 Tetrany, Figure 38 | 4 | 1200.0 | 7 |
| xen12-wilson-38-4C3-tetrany-07 | 1-5-7-11 4C3 Tetrany, Figure 38 | 4 | 1200.0 | 11 |
| xen12-wilson-38-4C3-tetrany-08 | 1-5-9-11 4C3 Tetrany, Figure 38 | 4 | 1200.0 | 11 |
| xen12-wilson-38-4C3-tetrany-10 | 3-5-7-9 4C3 Tetrany, Figure 38 | 4 | 1200.0 | 7 |
| xen12-wilson-38-4C3-tetrany-11 | 3-5-7-11 4C3 Tetrany, Figure 38 | 4 | 1200.0 | 11 |
| xen12-wilson-38-4C3-tetrany-12 | 3-5-9-11 4C3 Tetrany, Figure 38 | 4 | 1200.0 | 11 |
| xen12-wilson-38-4C3-tetrany-14 | 5-7-9-11 4C3 Tetrany, Figure 38 | 4 | 1200.0 | 11 |
| xen12-wilson-39-4C2-hexany-00 | 1-3-5-7 4C2 Hexany, Figure 39 | 6 | 1200.0 | 7 |
| xen12-wilson-39-4C2-hexany-01 | 1-3-5-9 4C2 Hexany, Figure 39 | 6 | 1200.0 | 5 |
| xen12-wilson-39-4C2-hexany-02 | 1-3-5-11 4C2 Hexany, Figure 39 | 6 | 1200.0 | 11 |
| xen12-wilson-39-4C2-hexany-06 | 1-5-7-9 4C2 Hexany, Figure 39 | 6 | 1200.0 | 7 |
| xen12-wilson-39-4C2-hexany-07 | 1-5-7-11 4C2 Hexany, Figure 39 | 6 | 1200.0 | 11 |
| xen12-wilson-39-4C2-hexany-08 | 1-5-9-11 4C2 Hexany, Figure 39 | 6 | 1200.0 | 11 |
| xen12-wilson-39-4C2-hexany-10 | 3-5-7-9 4C2 Hexany, Figure 39 | 6 | 1200.0 | 7 |
| xen12-wilson-39-4C2-hexany-11 | 3-5-7-11 4C2 Hexany, Figure 39 | 6 | 1200.0 | 11 |
| xen12-wilson-39-4C2-hexany-12 | 3-5-9-11 4C2 Hexany, Figure 39 | 6 | 1200.0 | 11 |
| xen12-wilson-39-4C2-hexany-14 | 5-7-9-11 4C2 Hexany, Figure 39 | 6 | 1200.0 | 11 |
| xen12-wilson-40-5C2-dekany-00 | 1-3-5-7-9 5C2 Dekany, Figure 40 | 10 | 1200.0 | 7 |
| xen12-wilson-40-5C2-dekany-01 | 1-3-5-7-11 5C2 Dekany, Figure 40 | 10 | 1200.0 | 11 |
| xen12-wilson-40-5C2-dekany-02 | 1-3-5-9-11 5C2 Dekany, Figure 40 | 10 | 1200.0 | 11 |
| xen12-wilson-40-5C2-dekany-03 | 1-3-7-9-11 5C2 Dekany, Figure 40 | 10 | 1200.0 | 11 |
| xen12-wilson-40-5C2-dekany-04 | 1-5-7-9-11 5C2 Dekany, Figure 40 | 10 | 1200.0 | 11 |
| xen12-wilson-40-5C2-dekany-05 | 3-5-7-9-11 5C2 Dekany, Figure 40 | 10 | 1200.0 | 11 |
| xen12-wilson-40-5C3-dekany-00 | 1-3-5-7-9 5C3 Dekany, Figure 40 | 10 | 1200.0 | 7 |
| xen12-wilson-40-5C3-dekany-01 | 1-3-5-7-11 5C3 Dekany, Figure 40 | 10 | 1200.0 | 11 |
| xen12-wilson-40-5C3-dekany-02 | 1-3-5-9-11 5C3 Dekany, Figure 40 | 10 | 1200.0 | 11 |
| xen12-wilson-40-5C3-dekany-03 | 1-3-7-9-11 5C3 Dekany, Figure 40 | 10 | 1200.0 | 11 |
| xen12-wilson-40-5C3-dekany-04 | 1-5-7-9-11 5C3 Dekany, Figure 40 | 10 | 1200.0 | 11 |
| xen12-wilson-40-5C3-dekany-05 | 3-5-7-9-11 5C3 Dekany, Figure 40 | 10 | 1200.0 | 11 |
| xen12-wilson-41-hexadic-tileburst-1 | Four Hexadic Tilebursts, Figure 41, top left | 16 | 1200.0 | 11 |
| xen12-wilson-41-hexadic-tileburst-2 | Four Hexadic Tilebursts, Figure 41, top right | 16 | 1200.0 | 11 |
| xen12-wilson-41-hexadic-tileburst-3 | Four Hexadic Tilebursts, Figure 41, bottom left | 16 | 1200.0 | 11 |
| xen12-wilson-41-hexadic-tileburst-4 | Four Hexadic Tilebursts, Figure 41, bottom right | 16 | 1200.0 | 11 |
| xen12-wilson-42-ogdoadic-tileburst-1 | Four Ogdoadic Tilebursts, Figure 42, top left | 28 | 1200.0 | 13 |
| xen12-wilson-42-ogdoadic-tileburst-2 | Four Ogdoadic Tilebursts, Figure 42, top right | 28 | 1200.0 | 13 |
| xen12-wilson-42-ogdoadic-tileburst-3 | Four Ogdoadic Tilebursts, Figure 42, bottom left | 28 | 1200.0 | 13 |
| xen12-wilson-42-ogdoadic-tileburst-4 | Four Ogdoadic Tilebursts, Figure 42, bottom right | 27 | 1200.0 | 13 |
| xen13-chalmers-13tet-5L3S | 5L+3S Eight-Tone Moment of Symmetry (MOS) | 8 | 1200.0 | |
| xen13-grady-19-1 | 19 tone scale 1 | 19 | 1200.0 | 7 |
| xen13-grady-19-2 | 19 tone scale 2 | 19 | 1200.0 | 11 |
| xen13-grady-sophia | Sophia, 1.3.5.7.9 Double Dexany | 14 | 1200.0 | 7 |
| xen13-mclaren-difference-table | 9-tone difference table scale | 9 | 1200.0 | |
| xen13-mclaren-factorable-numbers | Factorable numbers scale | 5 | 884.4 | 13 |
| xen13-mclaren-finite-continued-fraction-1 | Finite continued fraction scale #1 | 9 | 1151.3 | |
| xen13-mclaren-infinite-continued-fraction-1 | Infinite continued fraction scale #1 | 14 | 1080.8 | |
| xen13-mclaren-infinite-continued-fraction-2 | Infinite continued fraction scale #2 | 14 | 1187.3 | |
| xen13-mclaren-infinite-continued-fraction-3 | Infinite continued fraction scale #3 | 16 | 1174.5 | |
| xen13-mclaren-log-factorial-1 | Log factorial scale #1 | 5 | 1644.2 | |
| xen13-mclaren-log-factorial-2 | Log factorial scale #2 | 5 | 1644.2 | |
| xen13-mclaren-prime-indices | Prime indices scale | 12 | 1007.7 | 11 |
| xen13-mclaren-recurrence-1 | Fibonacci scale (recurrence scale #1) | 8 | 1200.0 | 89 |
| xen13-mclaren-recurrence-2 | Recurrence scale #2 | 7 | 1200.0 | 2273 |
| xen13-mclaren-totient | n/totient(n) scale | 12 | 1088.3 | 31 |
| xen13-morrison-7-steps-per-11-over-5 | 7 steps per 11:5 | 7 | 1365.0 | |
| xen13-rapoport-13tet-diatonic | 13-tet diatonic scale | 10 | 1200.0 | |
| xen14-darreg-telephone | Notes used for two-tone signalling on push-button telephones | 7 | 1474.0 | |
| xen14-darreg-telephone-14 | Streched 14-tone equal temperament approximating push-button telephone tones | 14 | 1215.0 | |
| xen14-mclaren-nonoctave-12-3 | Enrique Moreno's 12th root of 3 non-octave scale | 12 | 1902.0 | |
| xen14-mclaren-nonoctave-13-3 | Pierce-Bohlen scale, 13th root of 3 | 13 | 1902.0 | |
| xen14-mclaren-nonoctave-14-3 | 14th root of 3 non-octave scale | 14 | 1902.0 | |
| xen14-mclaren-nonoctave-15-3 | 15th root of 3 non-octave scale | 15 | 1902.0 | |
| xen14-mclaren-nonoctave-16-3 | 16th root of 3 non-octave scale | 16 | 1902.0 | |
| xen14-mclaren-nonoctave-17-3 | 17th root of 3 non-octave scale | 17 | 1902.0 | |
| xen14-mclaren-nonoctave-21-17 | 21st root of 17 non-octave scale | 21 | 4905.0 | |
| xen14-mclaren-nonoctave-25-5 | Stockhausen's Studie II 25th root of 5 non-octave scale | 25 | 2786.3 | |
| xen14-mclaren-nonoctave-30-3 | Erv Wilson's 30th root of 3 non-octave scale | 30 | 1902.0 | |
| xen14-mclaren-nonoctave-31-5 | 31st root of 5 non-octave scale | 31 | 2786.3 | |
| xen14-mclaren-nonoctave-37-31 | 37th root of 31 non-octave scale | 37 | 5945.0 | |
| xen14-mclaren-nonoctave-38-7 | 38th root of 7 non-octave scale | 38 | 3368.8 | |
| xen14-mclaren-nonoctave-44-5 | Erv Wilson's 44th root of 5 non-octave scale | 44 | 2786.3 | |
| xen14-mclaren-nonoctave-e-pi | (e to the pi)th root of pi non-octave scale | 1 | 85.6 | |
| xen14-mclaren-nonoctave-phi-5 | John McBryde's 5th root of phi | 5 | 833.1 | |
| xen14-mclaren-nonoctave-phi-7 | John McBryde's 7th root of phi | 7 | 833.1 | |
| xen14-mclaren-nonoctave-phi-9 | Walter O'Connell's 9 parts of Golden Section | 9 | 833.1 | |
| xen14-polansky-horn | Scale from 'Horn' | 21 | 1200.0 | 17 |
| xen15-chalmers-stretched-14-1 | Least-Squares Stretched 14-Tone Equal Temperament, Table 4 | 14 | 1213.5 | |
| xen15-chalmers-stretched-14-2 | Least-Squares Stretched 14-Tone Equal Temperament, Table 6 | 14 | 1209.5 | |
| xen15-chalmers-triadic-diamond-11-9 | Triadic diamond for M=11/9, D=3/2 | 7 | 1200.0 | 11 |
| xen15-chalmers-triadic-diamond-11-9-tetrachord | Upper tetrachord 88/81 * 243/242 * 11/9 of triadic diamond for M=11/9, D=3/2 | 3 | 498.0 | 11 |
| xen15-chalmers-triadic-diamond-13-11 | Triadic diamond for M=13/11, D=3/2 | 7 | 1200.0 | 13 |
| xen15-chalmers-triadic-diamond-13-11-tetrachord | Upper tetrachord 104/99 * 363/338 * 13/11 of triadic diamond for M=13/11, D=3/2 | 3 | 498.0 | 13 |
| xen15-chalmers-triadic-diamond-14-11 | Triadic diamond for M=14/11, D=3/2 | 7 | 1200.0 | 11 |
| xen15-chalmers-triadic-diamond-14-11-tetrachord | Upper tetrachord 22/21 * 392/363 * 33/28 of triadic diamond for M=14/11, D=3/2 | 3 | 498.0 | 11 |
| xen15-chalmers-triadic-diamond-15-13 | Triadic diamond for M=15/13, D=3/2 | 7 | 1200.0 | 13 |
| xen15-chalmers-triadic-diamond-15-13-tetrachord | Upper tetrachord 40/39 * 169/150 * 15/13 of triadic diamond for M=15/13, D=3/2 | 3 | 498.0 | 13 |
| xen15-chalmers-triadic-diamond-16-13 | Triadic diamond for M=16/13, D=3/2 | 7 | 1200.0 | 13 |
| xen15-chalmers-triadic-diamond-16-13-tetrachord | Upper tetrachord 13/12 * 512/507 * 39/32 of triadic diamond for M=16/13, D=3/2 | 3 | 498.0 | 13 |
| xen15-chalmers-triadic-diamond-17-13 | Triadic diamond for M=17/13, D=3/2 | 7 | 1200.0 | 17 |
| xen15-chalmers-triadic-diamond-17-13-tetrachord | Upper tetrachord 52/51 * 578/507 * 39/34 of triadic diamond for M=17/13, D=3/2 | 3 | 498.0 | 17 |
| xen15-chalmers-triadic-diamond-17-14 | Triadic diamond for M=17/14, D=3/2 | 7 | 1200.0 | 17 |
| xen15-chalmers-triadic-diamond-17-14-tetrachord | Upper tetrachord 68/63 * 294/289 * 17/14 of triadic diamond for M=17/14, D=3/2 | 3 | 498.0 | 17 |
| xen15-chalmers-triadic-diamond-19-16 | Triadic diamond for M=19/16, D=3/2 | 7 | 1200.0 | 19 |
| xen15-chalmers-triadic-diamond-19-16-tetrachord | Upper tetrachord 19/18 * 384/361 * 19/16 of triadic diamond for M=19/16, D=3/2 | 3 | 498.0 | 19 |
| xen15-chalmers-triadic-diamond-22-17 | Triadic diamond for M=22/17, D=3/2 | 7 | 1200.0 | 17 |
| xen15-chalmers-triadic-diamond-22-17-tetrachord | Upper tetrachord 34/33 * 968/867 * 51/44 of triadic diamond for M=22/17, D=3/2 | 3 | 498.0 | 17 |
| xen15-chalmers-triadic-diamond-23-18 | Triadic diamond for M=23/18, D=3/2 | 7 | 1200.0 | 23 |
| xen15-chalmers-triadic-diamond-23-18-tetrachord | Upper tetrachord 24/23 * 529/486 * 27/23 of triadic diamond for M=23/18, D=3/2 | 3 | 498.0 | 23 |
| xen15-chalmers-triadic-diamond-23-19 | Triadic diamond for M=23/19, D=3/2 | 7 | 1200.0 | 23 |
| xen15-chalmers-triadic-diamond-23-19-tetrachord | Upper tetrachord 184/171 * 1083/1058 * 23/19 of triadic diamond for M=23/19, D=3/2 | 3 | 498.0 | 23 |
| xen15-chalmers-triadic-diamond-23-20 | Triadic diamond for M=23/20, D=3/2 | 7 | 1200.0 | 23 |
| xen15-chalmers-triadic-diamond-23-20-tetrachord | Upper tetrachord 46/45 * 600/529 * 23/20 of triadic diamond for M=23/20, D=3/2 | 3 | 498.0 | 23 |
| xen15-chalmers-triadic-diamond-26-21 | Triadic diamond for M=26/21, D=3/2 | 7 | 1200.0 | 13 |
| xen15-chalmers-triadic-diamond-26-21-tetrachord | Upper tetrachord 14/13 * 1352/1323 * 63/52 of triadic diamond for M=26/21, D=3/2 | 3 | 498.0 | 13 |
| xen15-chalmers-triadic-diamond-32-25 | Triadic diamond for M=32/25, D=3/2 | 7 | 1200.0 | 5 |
| xen15-chalmers-triadic-diamond-32-25-tetrachord | Upper tetrachord 25/24 * 2048/1875 * 75/64 of triadic diamond for M=32/25, D=3/2 | 3 | 498.0 | 5 |
| xen15-chalmers-triadic-diamond-34-27 | Triadic diamond for M=34/27, D=3/2 | 7 | 1200.0 | 17 |
| xen15-chalmers-triadic-diamond-34-27-tetrachord | Upper tetrachord 18/17 * 2312/2187 * 81/68 of triadic diamond for M=34/27, D=3/2 | 3 | 498.0 | 17 |
| xen15-chalmers-triadic-diamond-35-27 | Triadic diamond for M=35/27, D=3/2 | 7 | 1200.0 | 7 |
| xen15-chalmers-triadic-diamond-35-27-tetrachord | Upper tetrachord 36/35 * 2450/2187 * 81/70 of triadic diamond for M=35/27, D=3/2 | 3 | 498.0 | 7 |
| xen15-chalmers-triadic-diamond-40-33 | Triadic diamond for M=40/33, D=3/2 | 7 | 1200.0 | 11 |
| xen15-chalmers-triadic-diamond-40-33-tetrachord | Upper tetrachord 320/297 * 3267/3200 * 40/33 of triadic diamond for M=40/33, D=3/2 | 3 | 498.0 | 11 |
| xen15-chalmers-triadic-diamond-5-4 | Triadic diamond for M=5/4, D=3/2 | 7 | 1200.0 | 5 |
| xen15-chalmers-triadic-diamond-5-4-tetrachord | Upper tetrachord 16/15 * 25/24 * 6/5 of triadic diamond for M=5/4, D=3/2 | 3 | 498.0 | 5 |
| xen15-chalmers-triadic-diamond-56-45 | Triadic diamond for M=56/45, D=3/2 | 7 | 1200.0 | 7 |
| xen15-chalmers-triadic-diamond-56-45-tetrachord | Upper tetrachord 15/14 * 6272/6075 * 135/112 of triadic diamond for M=56/45, D=3/2 | 3 | 498.0 | 7 |
| xen15-chalmers-triadic-diamond-64-51 | Triadic diamond for M=64/51, D=3/2 | 7 | 1200.0 | 17 |
| xen15-chalmers-triadic-diamond-64-51-tetrachord | Upper tetrachord 17/16 * 8192/7803 * 153/128 of triadic diamond for M=64/51, D=3/2 | 3 | 498.0 | 17 |
| xen15-chalmers-triadic-diamond-7-6 | Triadic diamond for M=7/6, D=3/2 | 7 | 1200.0 | 7 |
| xen15-chalmers-triadic-diamond-7-6-tetrachord | Upper tetrachord 28/27 * 54/49 * 7/6 of triadic diamond for M=7/6, D=3/2 | 3 | 498.0 | 7 |
| xen15-chalmers-triadic-diamond-8-7 | Triadic diamond for M=8/7, D=3/2 | 7 | 1200.0 | 7 |
| xen15-chalmers-triadic-diamond-8-7-tetrachord | Upper tetrachord 64/63 * 147/128 * 8/7 of triadic diamond for M=8/7, D=3/2 | 3 | 498.0 | 7 |
| xen15-chalmers-triadic-diamond-81-64 | Triadic diamond for M=81/64, D=3/2 | 7 | 1200.0 | 3 |
| xen15-chalmers-triadic-diamond-81-64-tetrachord | Upper tetrachord 256/243 * 2187/2048 * 32/27 of triadic diamond for M=81/64, D=3/2 | 3 | 498.0 | 3 |
| xen15-chalmers-triadic-diamond-8192-6561 | Triadic diamond for M=8192/6561, D=3/2 | 7 | 1200.0 | 3 |
| xen15-chalmers-triadic-diamond-8192-6561-tetrachord | Upper tetrachord 2187/2048 * 134217728/129140163 * 19683/16384 of triadic diamond for M=8192/6561, D=3/2 | 3 | 498.0 | 3 |
| xen15-chalmers-triadic-reversed-diamond-11-9 | Triadic reversed diamond for M=11/9, D=3/2 | 7 | 1200.0 | 11 |
| xen15-chalmers-triadic-reversed-diamond-11-9-tetrachord | Tetrachord 12/11 * 121/108 * 12/11 of triadic reversed diamond for M=11/9, D=3/2 | 3 | 498.0 | 11 |
| xen15-chalmers-triadic-reversed-diamond-13-10 | Triadic reversed diamond for M=13/10, D=3/2 | 7 | 1200.0 | 13 |
| xen15-chalmers-triadic-reversed-diamond-13-10-tetrachord | Tetrachord 40/39 * 507/400 * 40/39 of triadic reversed diamond for M=13/10, D=3/2 | 3 | 498.0 | 13 |
| xen15-chalmers-triadic-reversed-diamond-13-11 | Triadic reversed diamond for M=13/11, D=3/2 | 7 | 1200.0 | 13 |
| xen15-chalmers-triadic-reversed-diamond-13-11-tetrachord | Tetrachord 44/39 * 507/484 * 44/39 of triadic reversed diamond for M=13/11, D=3/2 | 3 | 498.0 | 13 |
| xen15-chalmers-triadic-reversed-diamond-14-11 | Triadic reversed diamond for M=14/11, D=3/2 | 7 | 1200.0 | 11 |
| xen15-chalmers-triadic-reversed-diamond-14-11-tetrachord | Tetrachord 22/21 * 147/121 * 22/21 of triadic reversed diamond for M=14/11, D=3/2 | 3 | 498.0 | 11 |
| xen15-chalmers-triadic-reversed-diamond-15-13 | Triadic reversed diamond for M=15/13, D=3/2 | 7 | 1200.0 | 13 |
| xen15-chalmers-triadic-reversed-diamond-15-13-tetrachord | Tetrachord 15/13 * 676/675 * 15/13 of triadic reversed diamond for M=15/13, D=3/2 | 3 | 498.0 | 13 |
| xen15-chalmers-triadic-reversed-diamond-16-13 | Triadic reversed diamond for M=16/13, D=3/2 | 7 | 1200.0 | 13 |
| xen15-chalmers-triadic-reversed-diamond-16-13-tetrachord | Tetrachord 13/12 * 192/169 * 13/12 of triadic reversed diamond for M=16/13, D=3/2 | 3 | 498.0 | 13 |
| xen15-chalmers-triadic-reversed-diamond-17-13 | Triadic reversed diamond for M=17/13, D=3/2 | 7 | 1200.0 | 17 |
| xen15-chalmers-triadic-reversed-diamond-17-13-tetrachord | Tetrachord 52/51 * 867/676 * 52/51 of triadic reversed diamond for M=17/13, D=3/2 | 3 | 498.0 | 17 |
| xen15-chalmers-triadic-reversed-diamond-17-14 | Triadic reversed diamond for M=17/14, D=3/2 | 7 | 1200.0 | 17 |
| xen15-chalmers-triadic-reversed-diamond-17-14-tetrachord | Tetrachord 56/51 * 867/784 * 56/51 of triadic reversed diamond for M=17/14, D=3/2 | 3 | 498.0 | 17 |
| xen15-chalmers-triadic-reversed-diamond-19-16 | Triadic reversed diamond for M=19/16, D=3/2 | 7 | 1200.0 | 19 |
| xen15-chalmers-triadic-reversed-diamond-19-16-tetrachord | Tetrachord 64/57 * 1083/1024 * 64/57 of triadic reversed diamond for M=19/16, D=3/2 | 3 | 498.0 | 19 |
| xen15-chalmers-triadic-reversed-diamond-21-16 | Triadic reversed diamond for M=21/16, D=3/2 | 7 | 1200.0 | 7 |
| xen15-chalmers-triadic-reversed-diamond-21-16-tetrachord | Tetrachord 64/63 * 1323/1024 * 64/63 of triadic reversed diamond for M=21/16, D=3/2 | 3 | 498.0 | 7 |
| xen15-chalmers-triadic-reversed-diamond-21-17 | Triadic reversed diamond for M=21/17, D=3/2 | 7 | 1200.0 | 17 |
| xen15-chalmers-triadic-reversed-diamond-21-17-tetrachord | Tetrachord 68/63 * 1323/1156 * 68/63 of triadic reversed diamond for M=21/17, D=3/2 | 3 | 498.0 | 17 |
| xen15-chalmers-triadic-reversed-diamond-22-17 | Triadic reversed diamond for M=22/17, D=3/2 | 7 | 1200.0 | 17 |
| xen15-chalmers-triadic-reversed-diamond-22-17-tetrachord | Tetrachord 34/33 * 363/289 * 34/33 of triadic reversed diamond for M=22/17, D=3/2 | 3 | 498.0 | 17 |
| xen15-chalmers-triadic-reversed-diamond-23-18 | Triadic reversed diamond for M=23/18, D=3/2 | 7 | 1200.0 | 23 |
| xen15-chalmers-triadic-reversed-diamond-23-18-tetrachord | Tetrachord 24/23 * 529/432 * 24/23 of triadic reversed diamond for M=23/18, D=3/2 | 3 | 498.0 | 23 |
| xen15-chalmers-triadic-reversed-diamond-23-19 | Triadic reversed diamond for M=23/19, D=3/2 | 7 | 1200.0 | 23 |
| xen15-chalmers-triadic-reversed-diamond-23-19-tetrachord | Tetrachord 76/69 * 1587/1444 * 76/69 of triadic reversed diamond for M=23/19, D=3/2 | 3 | 498.0 | 23 |
| xen15-chalmers-triadic-reversed-diamond-23-20 | Triadic reversed diamond for M=23/20, D=3/2 | 7 | 1200.0 | 23 |
| xen15-chalmers-triadic-reversed-diamond-23-20-tetrachord | Tetrachord 23/20 * 1600/1587 * 23/20 of triadic reversed diamond for M=23/20, D=3/2 | 3 | 498.0 | 23 |
| xen15-chalmers-triadic-reversed-diamond-24-19 | Triadic reversed diamond for M=24/19, D=3/2 | 7 | 1200.0 | 19 |
| xen15-chalmers-triadic-reversed-diamond-24-19-tetrachord | Tetrachord 19/18 * 432/361 * 19/18 of triadic reversed diamond for M=24/19, D=3/2 | 3 | 498.0 | 19 |
| xen15-chalmers-triadic-reversed-diamond-26-21 | Triadic reversed diamond for M=26/21, D=3/2 | 7 | 1200.0 | 13 |
| xen15-chalmers-triadic-reversed-diamond-26-21-tetrachord | Tetrachord 14/13 * 169/147 * 14/13 of triadic reversed diamond for M=26/21, D=3/2 | 3 | 498.0 | 13 |
| xen15-chalmers-triadic-reversed-diamond-27-22 | Triadic reversed diamond for M=27/22, D=3/2 | 7 | 1200.0 | 11 |
| xen15-chalmers-triadic-reversed-diamond-27-22-tetrachord | Tetrachord 88/81 * 2187/1936 * 88/81 of triadic reversed diamond for M=27/22, D=3/2 | 3 | 498.0 | 11 |
| xen15-chalmers-triadic-reversed-diamond-27-23 | Triadic reversed diamond for M=27/23, D=3/2 | 7 | 1200.0 | 23 |
| xen15-chalmers-triadic-reversed-diamond-27-23-tetrachord | Tetrachord 92/81 * 2187/2116 * 92/81 of triadic reversed diamond for M=27/23, D=3/2 | 3 | 498.0 | 23 |
| xen15-chalmers-triadic-reversed-diamond-30-23 | Triadic reversed diamond for M=30/23, D=3/2 | 7 | 1200.0 | 23 |
| xen15-chalmers-triadic-reversed-diamond-30-23-tetrachord | Tetrachord 46/45 * 675/529 * 46/45 of triadic reversed diamond for M=30/23, D=3/2 | 3 | 498.0 | 23 |
| xen15-chalmers-triadic-reversed-diamond-32-25 | Triadic reversed diamond for M=32/25, D=3/2 | 7 | 1200.0 | 5 |
| xen15-chalmers-triadic-reversed-diamond-32-25-tetrachord | Tetrachord 25/24 * 768/625 * 25/24 of triadic reversed diamond for M=32/25, D=3/2 | 3 | 498.0 | 5 |
| xen15-chalmers-triadic-reversed-diamond-32-27 | Triadic reversed diamond for M=32/27, D=3/2 | 7 | 1200.0 | 3 |
| xen15-chalmers-triadic-reversed-diamond-32-27-tetrachord | Tetrachord 9/8 * 256/243 * 9/8 of triadic reversed diamond for M=32/27, D=3/2 | 3 | 498.0 | 3 |
| xen15-chalmers-triadic-reversed-diamond-33-26 | Triadic reversed diamond for M=33/26, D=3/2 | 7 | 1200.0 | 13 |
| xen15-chalmers-triadic-reversed-diamond-33-26-tetrachord | Tetrachord 104/99 * 3267/2704 * 104/99 of triadic reversed diamond for M=33/26, D=3/2 | 3 | 498.0 | 13 |
| xen15-chalmers-triadic-reversed-diamond-33-28 | Triadic reversed diamond for M=33/28, D=3/2 | 7 | 1200.0 | 11 |
| xen15-chalmers-triadic-reversed-diamond-33-28-tetrachord | Tetrachord 112/99 * 3267/3136 * 112/99 of triadic reversed diamond for M=33/28, D=3/2 | 3 | 498.0 | 11 |
| xen15-chalmers-triadic-reversed-diamond-34-27 | Triadic reversed diamond for M=34/27, D=3/2 | 7 | 1200.0 | 17 |
| xen15-chalmers-triadic-reversed-diamond-34-27-tetrachord | Tetrachord 18/17 * 289/243 * 18/17 of triadic reversed diamond for M=34/27, D=3/2 | 3 | 498.0 | 17 |
| xen15-chalmers-triadic-reversed-diamond-35-27 | Triadic reversed diamond for M=35/27, D=3/2 | 7 | 1200.0 | 7 |
| xen15-chalmers-triadic-reversed-diamond-35-27-tetrachord | Tetrachord 36/35 * 1225/972 * 36/35 of triadic reversed diamond for M=35/27, D=3/2 | 3 | 498.0 | 7 |
| xen15-chalmers-triadic-reversed-diamond-39-32 | Triadic reversed diamond for M=39/32, D=3/2 | 7 | 1200.0 | 13 |
| xen15-chalmers-triadic-reversed-diamond-39-32-tetrachord | Tetrachord 128/117 * 4563/4096 * 128/117 of triadic reversed diamond for M=39/32, D=3/2 | 3 | 498.0 | 13 |
| xen15-chalmers-triadic-reversed-diamond-39-34 | Triadic reversed diamond for M=39/34, D=3/2 | 7 | 1200.0 | 17 |
| xen15-chalmers-triadic-reversed-diamond-39-34-tetrachord | Tetrachord 39/34 * 4624/4563 * 39/34 of triadic reversed diamond for M=39/34, D=3/2 | 3 | 498.0 | 17 |
| xen15-chalmers-triadic-reversed-diamond-40-33 | Triadic reversed diamond for M=40/33, D=3/2 | 7 | 1200.0 | 11 |
| xen15-chalmers-triadic-reversed-diamond-40-33-tetrachord | Tetrachord 11/10 * 400/363 * 11/10 of triadic reversed diamond for M=40/33, D=3/2 | 3 | 498.0 | 11 |
| xen15-chalmers-triadic-reversed-diamond-5-4 | Triadic reversed diamond for M=5/4, D=3/2 | 7 | 1200.0 | 5 |
| xen15-chalmers-triadic-reversed-diamond-5-4-tetrachord | Tetrachord 16/15 * 75/64 * 16/15 of triadic reversed diamond for M=5/4, D=3/2 | 3 | 498.0 | 5 |
| xen15-chalmers-triadic-reversed-diamond-56-45 | Triadic reversed diamond for M=56/45, D=3/2 | 7 | 1200.0 | 7 |
| xen15-chalmers-triadic-reversed-diamond-56-45-tetrachord | Tetrachord 15/14 * 784/675 * 15/14 of triadic reversed diamond for M=56/45, D=3/2 | 3 | 498.0 | 7 |
| xen15-chalmers-triadic-reversed-diamond-57-46 | Triadic reversed diamond for M=57/46, D=3/2 | 7 | 1200.0 | 23 |
| xen15-chalmers-triadic-reversed-diamond-57-46-tetrachord | Tetrachord 184/171 * 9747/8464 * 184/171 of triadic reversed diamond for M=57/46, D=3/2 | 3 | 498.0 | 23 |
| xen15-chalmers-triadic-reversed-diamond-6-5 | Triadic reversed diamond for M=6/5, D=3/2 | 7 | 1200.0 | 5 |
| xen15-chalmers-triadic-reversed-diamond-6-5-tetrachord | Tetrachord 10/9 * 27/25 * 10/9 of triadic reversed diamond for M=6/5, D=3/2 | 3 | 498.0 | 5 |
| xen15-chalmers-triadic-reversed-diamond-64-51 | Triadic reversed diamond for M=64/51, D=3/2 | 7 | 1200.0 | 17 |
| xen15-chalmers-triadic-reversed-diamond-64-51-tetrachord | Tetrachord 17/16 * 1024/867 * 17/16 of triadic reversed diamond for M=64/51, D=3/2 | 3 | 498.0 | 17 |
| xen15-chalmers-triadic-reversed-diamond-7-6 | Triadic reversed diamond for M=7/6, D=3/2 | 7 | 1200.0 | 7 |
| xen15-chalmers-triadic-reversed-diamond-7-6-tetrachord | Tetrachord 8/7 * 49/48 * 8/7 of triadic reversed diamond for M=7/6, D=3/2 | 3 | 498.0 | 7 |
| xen15-chalmers-triadic-reversed-diamond-81-64 | Triadic reversed diamond for M=81/64, D=3/2 | 7 | 1200.0 | 3 |
| xen15-chalmers-triadic-reversed-diamond-81-64-tetrachord | Tetrachord 256/243 * 19683/16384 * 256/243 of triadic reversed diamond for M=81/64, D=3/2 | 3 | 498.0 | 3 |
| xen15-chalmers-triadic-reversed-diamond-8192-6561 | Triadic reversed diamond for M=8192/6561, D=3/2 | 7 | 1200.0 | 3 |
| xen15-chalmers-triadic-reversed-diamond-8192-6561-tetrachord | Tetrachord 2187/2048 * 16777216/14348907 * 2187/2048 of triadic reversed diamond for M=8192/6561, D=3/2 | 3 | 498.0 | 3 |
| xen15-chalmers-triadic-reversed-diamond-9-7 | Triadic reversed diamond for M=9/7, D=3/2 | 7 | 1200.0 | 7 |
| xen15-chalmers-triadic-reversed-diamond-9-7-tetrachord | Tetrachord 28/27 * 243/196 * 28/27 of triadic reversed diamond for M=9/7, D=3/2 | 3 | 498.0 | 7 |
| xen15-gilson-archytas-chromatic | Archytas' Chromatic | 7 | 1200.0 | 7 |
| xen15-gilson-archytas-diatonic | Archytas' Diatonic (or Ptolemy's Diatonic Tonaion) | 7 | 1200.0 | 7 |
| xen15-gilson-archytas-enharmonic | Archytas' Enharmonic | 7 | 1200.0 | 7 |
| xen15-gilson-aristoxenus-chromatic-hemiolon | Aristoxenus' Chromatic Hemiolon | 7 | 1200.0 | 37 |
| xen15-gilson-aristoxenus-chromatic-malakon | Aristoxenus' Chromatic Malakon | 7 | 1200.0 | 29 |
| xen15-gilson-aristoxenus-chromatic-tonikon | Aristoxenus' Chromatic Tonikon (or Eratosthenes' Chromatic) | 7 | 1200.0 | 19 |
| xen15-gilson-aristoxenus-diatonic-malakon | Aristoxenus' Diatonic Malakon | 7 | 1200.0 | 19 |
| xen15-gilson-aristoxenus-diatonic-syntonon | Aristoxenus' Diatonic Syntonon | 7 | 1200.0 | 19 |
| xen15-gilson-aristoxenus-enharmonic | Aristoxenus' Enharmonic | 7 | 1200.0 | 19 |
| xen15-gilson-didymus-chromatic | Didymus Chromatic | 7 | 1200.0 | 5 |
| xen15-gilson-didymus-diatonic | Didymus' Diatonic | 7 | 1200.0 | 5 |
| xen15-gilson-eratosthenes-diatonic | Eratosthenes' Diatonic (or Ptolemy's Diatonic Ditonaion) | 7 | 1200.0 | 3 |
| xen15-gilson-eratosthenes-enharmonic | Eratosthenes' Enharmonic | 7 | 1200.0 | 23 |
| xen15-gilson-generalized-just-1 | Ten note just scale, two rows and five columns of chart on p.119 | 10 | 1200.0 | 5 |
| xen15-gilson-generalized-just-2 | Scale based on product (25/24)**2 * (21/20)**3 * 16/15 * (8/7)**3 = 2 | 9 | 1200.0 | 7 |
| xen15-gilson-generalized-just-3 | Scale based on product (21/20)**3 * (16/15)**2 * (15/14)**3 * (10/9)**2 = 2 | 10 | 1200.0 | 7 |
| xen15-gilson-generalized-pythagorean-11-8-11 | Generalized Pythagorean Scale, 11/8 stacked 11=5+6 times | 11 | 1200.0 | |
| xen15-gilson-generalized-pythagorean-11-8-13 | Generalized Pythagorean Scale, 11/8 stacked 13=6+7 times | 13 | 1200.0 | |
| xen15-gilson-generalized-pythagorean-11-8-24 | Generalized Pythagorean Scale, 11/8 stacked 24=11+13 times | 24 | 1200.0 | |
| xen15-gilson-generalized-pythagorean-11-8-37 | Generalized Pythagorean Scale, 11/8 stacked 37=17+20 times | 37 | 1200.0 | |
| xen15-gilson-generalized-pythagorean-13-8-10 | Generalized Pythagorean Scale, 13/8 stacked 10=7+3 times | 10 | 1200.0 | |
| xen15-gilson-generalized-pythagorean-13-8-3 | Generalized Pythagorean Scale, 13/8 stacked 3=2+1 times | 3 | 1200.0 | 13 |
| xen15-gilson-generalized-pythagorean-13-8-7 | Generalized Pythagorean Scale, 13/8 stacked 7=5+2 times | 7 | 1200.0 | 13 |
| xen15-gilson-generalized-pythagorean-15-8-10 | Generalized Pythagorean Scale, 15/8 stacked 10=9+1 times | 10 | 1200.0 | |
| xen15-gilson-generalized-pythagorean-15-8-11 | Generalized Pythagorean Scale, 15/8 stacked 11=10+1 times | 11 | 1200.0 | |
| xen15-gilson-generalized-pythagorean-15-8-32 | Generalized Pythagorean Scale, 15/8 stacked 32=29+3 times | 32 | 1200.0 | |
| xen15-gilson-generalized-pythagorean-15-8-43 | Generalized Pythagorean Scale, 15/8 stacked 43=39+4 times | 43 | 1200.0 | |
| xen15-gilson-generalized-pythagorean-18-17-12 | Generalized Pythagorean Scale, 18/17 stacked 12=1+11 times | 12 | 1200.0 | |
| xen15-gilson-generalized-pythagorean-3-2-12 | Generalized Pythagorean Scale, 3/2 stacked 12=7+5 times | 12 | 1200.0 | 3 |
| xen15-gilson-generalized-pythagorean-3-2-41 | Generalized Pythagorean Scale, 3/2 stacked 41=24+17 times | 41 | 1200.0 | |
| xen15-gilson-generalized-pythagorean-3-2-5 | Generalized Pythagorean Scale, 3/2 stacked 5=3+2 times | 5 | 1200.0 | 3 |
| xen15-gilson-generalized-pythagorean-3-2-53 | Generalized Pythagorean Scale, 3/2 stacked 53=31+22 times | 53 | 1200.0 | |
| xen15-gilson-generalized-pythagorean-5-4-28 | Generalized Pythagorean Scale, 5/4 stacked 28=9+19 times | 28 | 1200.0 | |
| xen15-gilson-generalized-pythagorean-5-4-59 | Generalized Pythagorean Scale, 5/4 stacked 59=19+40 times | 59 | 1200.0 | |
| xen15-gilson-generalized-pythagorean-7-4-26 | Generalized Pythagorean Scale, 7/4 stacked 26=21+5 times | 26 | 1200.0 | |
| xen15-gilson-generalized-pythagorean-7-4-5 | Generalized Pythagorean Scale, 7/4 stacked 5=4+1 times | 5 | 1200.0 | 7 |
| xen15-gilson-just-chromatic | Just Intonation Chromatic Scale (JICS) | 12 | 1200.0 | 5 |
| xen15-gilson-just-diatonic | Just Intonation Diatonic Scale (JIDS) | 7 | 1200.0 | 5 |
| xen15-gilson-just-pentatonic | Just Intonation Pentatonic Scale (JIPS) | 5 | 1200.0 | 5 |
| xen15-gilson-ptolemy-chromatic-malakon | Ptolemy's Chromatic Malakon | 7 | 1200.0 | 7 |
| xen15-gilson-ptolemy-chromatic-syntonon | Ptolemy's Chromatic Syntonon | 7 | 1200.0 | 11 |
| xen15-gilson-ptolemy-diatonic-hemiolon | Ptolemy's Diatonic Hemiolon | 7 | 1200.0 | 11 |
| xen15-gilson-ptolemy-diatonic-malakon | Ptolemy's Diatonic Malakon | 7 | 1200.0 | 7 |
| xen15-gilson-ptolemy-diatonic-syntonon | Ptolemy's Diatonic Syntonon | 7 | 1200.0 | 5 |
| xen15-gilson-pythagorean-chromatic | Pythagorean Intonation Chromatic Scale (PICS) | 12 | 1200.0 | 3 |
| xen15-gilson-pythagorean-diatonic | Pythagorean Intonation Diatonic Scale (PIDS) | 7 | 1200.0 | 3 |
| xen15-gilson-pythagorean-pentatonic | Pythagorean Intonation Pentatonic Scale (PIPS) | 5 | 1200.0 | 3 |
| xen15-leedy-mixolydian | Just mixolydian | 7 | 1200.0 | 7 |
| xen15-mclaren-e | e scale | 7 | 1731.2 | |
| xen15-mclaren-integrated | Integrated non-self-similar scale #1 | 5 | 951.0 | |
| xen15-mclaren-metal-bar | Metal bar scale | 14 | 1200.0 | |
| xen15-mclaren-pi | pi scale | 7 | 1981.8 | |
| xen15-mclaren-root-3 | Square root of 3 scale | 9 | 951.0 | |
| xen15-mclaren-root-5 | Square root of 5 scale | 8 | 1393.2 | |
| xen15-mclaren-root-7 | Square root of 7 scale | 7 | 1684.4 | |
| xen15-oconnell-golden-section-11 | 11-note scale in 25 parts of Golden Section | 11 | 833.1 | |
| xen15-oconnell-golden-section-14 | 14-note scale in 25 parts of Golden Section | 14 | 833.1 | |
| xen15-oconnell-golden-section-18 | 18 parts of the Golden Section | 18 | 833.1 | |
| xen15-oconnell-golden-section-25 | 25 parts of the Golden Section | 25 | 833.1 | |
| xen15-oconnell-golden-section-25-pure | 25 pure octaves reduced by phi | 25 | 833.1 | |
| xen15-oconnell-golden-section-7 | 7-note scale in 25 parts of Golden Section | 7 | 833.1 | |
| xen15-oconnell-golden-section-9 | 9-note scale in 25 parts of Golden Section | 9 | 833.1 | |
| xen16-burt-commas | Tuning for COMMAS | 13 | 1200.0 | 7 |
| xen16-burt-drones-01 | Scale 1 from Drones 1994 #2 | 12 | 1200.0 | 7 |
| xen16-burt-drones-02 | Scale 2 from Drones 1994 #2 | 11 | 1200.0 | 7 |
| xen16-burt-drones-03 | Scale 3 from Drones 1994 #2 | 12 | 1200.0 | 7 |
| xen16-burt-drones-04 | Scale 4 from Drones 1994 #2 | 11 | 1200.0 | 7 |
| xen16-burt-drones-05 | Scale 5 from Drones 1994 #2 | 11 | 1200.0 | 7 |
| xen16-burt-drones-06 | Scale 6 from Drones 1994 #2 | 12 | 1200.0 | 7 |
| xen16-burt-drones-07 | Scale 7 from Drones 1994 #2 | 11 | 1200.0 | 7 |
| xen16-burt-drones-08 | Scale 8 from Drones 1994 #2 | 12 | 1200.0 | 7 |
| xen16-burt-drones-09 | Scale 9 from Drones 1994 #2 | 11 | 1200.0 | 7 |
| xen16-burt-drones-10 | Scale 10 from Drones 1994 #2 | 12 | 1200.0 | 7 |
| xen16-burt-drones-11 | Scale 11 from Drones 1994 #2 | 11 | 1200.0 | 7 |
| xen16-burt-drones-12 | Scale 12 from Drones 1994 #2 | 12 | 1200.0 | 7 |
| xen16-burt-drones-all | All notes from Drones 1994 #2 | 15 | 1200.0 | 7 |
| xen16-grady-centaur | Centaur | 12 | 1200.0 | 7 |
| xen16-hero-lambdoma-08 | 8 by 8 Lambdoma matrix | 42 | 7200.0 | 7 |
| xen16-hero-lambdoma-16 | 16 by 16 Lambdoma matrix | 158 | 9600.0 | 13 |
| xen16-mclaren-carlos-alpha | Wendy Carlos' Alpha scale | 1 | 78.0 | |
| xen16-mclaren-carlos-beta | Wendy Carlos' Beta scale | 1 | 63.8 | |
| xen16-mclaren-carlos-gamma | Wendy Carlos' Gamma scale | 1 | 35.1 | |
| xen16-mclaren-nonoctave-16-5 | 16th root of 5, 6.8908 tones/octave | 16 | 2786.3 | |
| xen16-mclaren-nonoctave-20-3 | 20th root of 3, 12.6186 tones/octave | 20 | 1902.0 | |
| xen16-mclaren-nonoctave-20-5 | 20th root of 5, 8.6135 tones/octave | 20 | 2786.3 | |
| xen16-mclaren-nonoctave-24-3 | 24th root of 3, 15.1423 tones/octave | 24 | 1902.0 | |
| xen16-mclaren-nonoctave-24-5 | 24th root of 5, 10.3362 tones/octave | 24 | 2786.3 | |
| xen16-mclaren-nonoctave-24-7 | 24th root of 7, 8.549 tones/octave | 24 | 3368.8 | |
| xen16-mclaren-nonoctave-29-3 | 29th root of 3, 18.297 tones/octave | 29 | 1902.0 | |
| xen16-mclaren-nonoctave-32-5 | 32nd root of 5, 13.7816 tones/octave | 32 | 2786.3 | |
| xen16-mclaren-nonoctave-34-3 | 34th root of 3, 21.4516 tones/octave | 34 | 1902.0 | |
| xen16-mclaren-nonoctave-36-5 | 36th root of 5, 15.5044 tones/octave | 36 | 2786.3 | |
| xen16-mclaren-nonoctave-40-5 | 40th root of 5, 17.2271 tones/octave | 40 | 2786.3 | |
| xen16-mclaren-nonoctave-43-5 | 43rd root of 5, 18.5191 tones/octave | 43 | 2786.3 | |
| xen16-mclaren-nonoctave-47-5 | 47th root of 5, 20.2418 tones/octave | 47 | 2786.3 | |
| xen16-mclaren-nonoctave-52-5 | 52nd root of 5, 22.3952 tones/octave | 52 | 2786.3 | |
| xen16-mclaren-nonoctave-53-11 | 53rd root of 11, 15.3204 tones/octave | 53 | 4151.3 | |
| xen16-mclaren-nonoctave-53-7 | 53rd root of 7, 18.879 tones/octave | 53 | 3368.8 | |
| xen16-mclaren-nonoctave-54-11 | 54th root of 11, 15.6095 tones/octave | 54 | 4151.3 | |
| xen16-mclaren-nonoctave-58-7 | 58th root of 7, 20.66 tones/octave | 58 | 3368.8 | |
| xen16-mclaren-nonoctave-59-5 | 59th root of 5, 25.4099 tones/octave | 59 | 2786.3 | |
| xen16-mclaren-nonoctave-60-5 | 60th root of 5, 25.8406 tones/octave | 60 | 2786.3 | |
| xen16-mclaren-nonoctave-63-7 | 63rd root of 7, 22.4411 tones/octave | 63 | 3368.8 | |
| xen16-mclaren-nonoctave-64-5 | 64th root of 5, 27.5633 tones/octave | 64 | 2786.3 | |
| xen16-mclaren-nonoctave-65-11 | 65th root of 11, 18.7892 tones/octave | 65 | 4151.3 | |
| xen16-mclaren-nonoctave-67-5 | 67th root of 5, 28.8553 tones/octave | 67 | 2786.3 | |
| xen16-mclaren-nonoctave-67-7 | 67th root of 7, 23.8659 tones/octave | 67 | 3368.8 | |
| xen16-mclaren-nonoctave-71-5 | 71th root of 5, 30.578 tones/octave | 71 | 2786.3 | |
| xen16-mclaren-nonoctave-71-7 | 71th root of 7, 25.2907 tones/octave | 71 | 3368.8 | |
| xen16-mclaren-nonoctave-72-7 | 72nd root of 7, 25.6469 tones/octave | 72 | 3368.8 | |
| xen16-mclaren-nonoctave-77-11 | 77th root of 11, 22.258 tones/octave | 77 | 4151.3 | |
| xen16-mclaren-nonoctave-77-7 | 77th root of 7, 27.428 tones/octave | 77 | 3368.8 | |
| xen16-mclaren-nonoctave-79-5 | 79th root of 5, 34.0234 tones/octave | 79 | 2786.3 | |
| xen16-mclaren-nonoctave-87-5 | 87th root of 5, 37.4689 tones/octave | 87 | 2786.3 | |
| xen16-mclaren-nonoctave-88-11 | 88th root of 11, 25.4377 tones/octave | 88 | 4151.3 | |
| xen16-mclaren-nonoctave-88-5 | 88th root of 5, 37.8995 tones/octave | 88 | 2786.3 | |
| xen16-mclaren-nonoctave-89-11 | 89th root of 11, 25.7268 tones/octave | 89 | 4151.3 | |
| xen16-mclaren-nonoctave-95-11 | 95th root of 11, 27.4612 tones/octave | 95 | 4151.3 | |
| xen17-bohlen-harmonic-1 | 13-tone non-tempered scale | 13 | 1902.0 | 7 |
| xen17-bohlen-harmonic-2 | 12-tone non-tempered scale based on 4:7:10 triad | 12 | 1902.0 | 23 |
| xen17-chalmers-ursell-quiggle-1 | Sarn Ursell's Quiggle Temperament, first kind | 12 | 1200.0 | |
| xen17-chalmers-ursell-quiggle-2 | Sarn Ursell's Quiggle Temperament, second kind | 24 | 6699.0 | |
| xen17-erlich-alternate-pentachordal-major | Decatonic mode: Alternate Pentachordal Major | 10 | 1200.0 | |
| xen17-erlich-alternate-pentachordal-minor | Decatonic mode: Alternate Pentachordal Minor | 10 | 1200.0 | |
| xen17-erlich-dynamic-symmetrical-major | Decatonic mode: Dynamic Symmetrical Major | 10 | 1200.0 | |
| xen17-erlich-dynamic-symmetrical-minor | Decatonic mode: Dynamic Symmetrical Minor | 10 | 1200.0 | |
| xen17-erlich-standard-pentachordal-major | Decatonic mode: Standard Pentachordal Major | 10 | 1200.0 | |
| xen17-erlich-standard-pentachordal-minor | Decatonic mode: Standard Pentachordal Minor | 10 | 1200.0 | |
| xen17-erlich-static-symmetrical-major | Decatonic mode: Static Symmetrical Major | 10 | 1200.0 | |
| xen17-erlich-static-symmetrical-minor | Decatonic mode: Static Symmetrical Minor | 10 | 1200.0 | |
| xen17-erlich-unequal-22 | Unequal 22-tone tuning, Table 5 | 22 | 1200.0 | |
| xen18-ayers-table-04 | 7 Iterated Arithmetic Means between 1/1 and 2/1 | 8 | 1200.0 | 13 |
| xen18-ayers-table-05 | 6 Generalized Arithmetic Means between 1/1 and 2/1 | 7 | 1200.0 | 13 |
| xen18-ayers-table-11 | 7 Iterated Harmonic Means between 1/1 and 2/1 | 8 | 1200.0 | 13 |
| xen18-ayers-table-12 | 5 Generalized Harmonic Means between 1/1 and 2/1 | 6 | 1200.0 | 11 |
| xen18-ayers-table-13-14 | Generalized Harmonic Mean scale from Table 13 and Table 14 | 12 | 1200.0 | 19 |
| xen18-ayers-table-16 | 2nd Iteration of Musical Proportion between 1/1 and 2/1 | 7 | 1200.0 | 7 |
| xen18-ayers-table-18 | 7 Iterated Subcontraries to the Harmonic Mean | 8 | 1200.0 | 3373 |
| xen18-ayers-table-19 | 3 Iterated Harmonic Means and 3 Iterated Subcontraries to the Harmonic Mean | 7 | 1200.0 | 61 |
| xen18-ayers-table-20 | 7 Iterated Geometric Means Between 1/1 and 2/1 (8-tone Equal Temperament) | 8 | 1200.0 | |
| xen18-ayers-table-23 | Inverted Geometric Means Between 1/1 and 2/1 Produce a Symmetrical Scale | 9 | 1200.0 | 3 |
| xen18-ayers-table-24 | Generalized Geometric Means in Slendro Between 1/1 and 2/1 | 5 | 1200.0 | |
| xen18-ayers-table-26 | 7 Iterated First Subcontraries to Geometric Means between 1/1 and 2/1 | 8 | 1200.0 | |
| xen18-ayers-table-28 | 7 Iterated Second Subcontraries to Geometric Means between 1/1 and 2/1 | 8 | 1200.0 | |
| xen18-ayers-table-30 | 7 Iterated Logarithmic Means between 1/1 and 2/1 | 8 | 1200.0 | |
| xen18-ayers-table-32 | 7 Iterated Counter-Logarithmic Means between 1/1 and 2/1 | 8 | 1200.0 | |
| xen18-ayers-table-33 | Logarithmic Means scale from Table 33 | 7 | 1200.0 | |
| xen18-ayers-table-34 | 7 Iterated Root Mean Squares between 1/1 and 2/1 | 8 | 1200.0 | |
| xen18-ayers-table-35 | 7 Generalized Root Mean Squares between 1 and 2.5 | 8 | 1586.3 | |
| xen18-ayers-table-37 | 7 Iterated Harmonic Square Means between 1/1 and 2/1 | 8 | 1200.0 | 14321 |
| xen18-ayers-table-38 | Harmonic Square Means in Tetrachords between 1/1 and 4/3 and 3/2 and 2/1 | 7 | 1200.0 | 1201 |
| xen18-ayers-table-39 | 7 Iterated Root Harmonic Square Means between 1/1 and 2/1 | 8 | 1200.0 | |
| xen18-ayers-table-40 | 7 Generalized Root Harmonic Square Means between 1.0 and 1.6 | 8 | 813.7 | |
| xen18-ayers-table-41-42 | Fibonacci-Type Means scale from Table 41 and Table 42 | 7 | 1200.0 | 5 |
| xen18-ayers-table-43 | 7 Fibonacci-Type Means between 1/1 and 2/1 | 8 | 1200.0 | 17 |
| xen18-ayers-table-44 | Transposing 3 Fibonacci-Type Means to Lower Tetrachord Between 1/1 and 4/3 | 7 | 1200.0 | 13 |
| xen18-ayers-table-45 | Complementary Ratios to 3 Fibonacci-Type Means for Lower Tetrachord Between 1/1 and 4/3 | 7 | 1200.0 | 13 |
| xen18-ayers-table-46 | Reciprocals of Golden Mean in P4 | 3 | 498.0 | |
| xen18-ayers-table-47 | Reciprocals of Golden Mean in Octave | 5 | 1200.0 | |
| xen18-ayers-table-48 | 7 Iterated Reciprocals of Golden Means between 1/1 and 2/1 | 8 | 1200.0 | |
| xen18-ayers-table-49 | 7 Iterated First Unnamed Means between 1/1 and 2/1 | 8 | 1200.0 | 17 |
| xen18-ayers-table-54 | 7 Iterated First Unnamed Means between 1/1 and 2/1, Weighted by Ratio 3/2 | 8 | 1200.0 | 53 |
| xen18-ayers-table-55 | First Unnamed Mean scale from window in Table 55 | 7 | 1200.0 | 13 |
| xen18-ayers-table-56 | 7 Iterated Second Unnamed Means between 1/1 and 2/1 | 8 | 1200.0 | 157 |
| xen18-ayers-table-59 | 7 Iterated Second Unnamed Means between 1/1 and 2/1, Weighted by Ratio 3/2 | 8 | 1200.0 | 23 |
| xen18-ayers-table-61 | 7 Iterated Third Unnamed Means between 1/1 and 2/1 | 8 | 1200.0 | |
| xen18-ayers-table-62 | 7 Iterated Fourth Unnamed Means between 1/1 and 2/1 | 8 | 1200.0 | 17 |
| xen18-ayers-table-63 | Didymos' Chromatic Tetrachord | 3 | 498.0 | 5 |
| xen18-ayers-table-64 | Archytas' Enharmonic Tetrachord | 3 | 498.0 | 7 |
| xen18-ayers-table-65 | 7 Iterated Mediants between 1/1 and 2/1 | 8 | 1200.0 | 7 |
| xen18-ayers-table-71 | 7 Weighted Mediants between 1/1 and 2/1 | 8 | 1200.0 | 7 |
| xen18-darreg-djami-17 | Seventeen-tone system | 17 | 1200.0 | |
| xen18-darreg-djami-busalik | Maqam Busalik | 7 | 1200.0 | |
| xen18-darreg-djami-hidjaz | Maqam Hidjaz | 7 | 1200.0 | |
| xen18-darreg-djami-husayni | Maqam Husayni | 7 | 1200.0 | |
| xen18-darreg-djami-iraq-1 | Maqam Iraq, without bakiye | 7 | 1200.0 | |
| xen18-darreg-djami-iraq-2 | Maqam Iraq, with bakiye | 8 | 1200.0 | |
| xen18-darreg-djami-isfahan-1 | Maqam Isfahan, bakiye between seventh and eighth degrees | 8 | 1200.0 | |
| xen18-darreg-djami-isfahan-2 | Maqam Isfahan, bakiye between sixth and seventh degrees | 8 | 1200.0 | |
| xen18-darreg-djami-nawa | Maqam Nawa | 7 | 1200.0 | |
| xen18-darreg-djami-rahawi | Maqam Rahawi | 7 | 1200.0 | |
| xen18-darreg-djami-rast | Maqam Rast | 7 | 1200.0 | |
| xen18-darreg-djami-ushshak | Maqam Ushshak | 7 | 1200.0 | |
| xen18-darreg-djami-zangule | Maqam Zangule | 7 | 1200.0 | |
| xen18-erlich-amity-02 | 1L 1s MOS for Amity, L=860.38, s=339.47 | 2 | 1199.8 | |
| xen18-erlich-amity-03 | 1L 2s MOS for Amity, L=520.91, s=339.47 | 3 | 1199.8 | |
| xen18-erlich-amity-04 | 3L 1s MOS for Amity, L=339.47, s=181.44 | 4 | 1199.8 | |
| xen18-erlich-amity-07 | 4L 3s MOS for Amity, L=181.44, s=158.03 | 7 | 1199.8 | |
| xen18-erlich-amity-11 | 7L 4s MOS for Amity, L=158.03, s=23.41 | 11 | 1199.8 | |
| xen18-erlich-amity-18 | 7L 11s MOS for Amity, L=134.62, s=23.41 | 18 | 1199.8 | |
| xen18-erlich-amity-25 | 7L 18s MOS for Amity, L=111.21, s=23.41 | 25 | 1199.8 | |
| xen18-erlich-amity-32 | 7L 25s MOS for Amity, L=87.80, s=23.41 | 32 | 1199.8 | |
| xen18-erlich-amity-39 | 7L 32s MOS for Amity, L=64.39, s=23.41 | 39 | 1199.8 | |
| xen18-erlich-amity-46 | 7L 39s MOS for Amity, L=40.98, s=23.41 | 46 | 1199.8 | |
| xen18-erlich-amity-53 | 46L 7s MOS for Amity, L=23.41, s=17.57 | 53 | 1199.8 | |
| xen18-erlich-augene-03 | 3L MOS for Augene, L=399.02 | 3 | 1197.1 | |
| xen18-erlich-augene-06 | 3L 3s MOS for Augene, L=306.56, s=92.46 | 6 | 1197.1 | |
| xen18-erlich-augene-09 | 3L 6s MOS for Augene, L=214.10, s=92.46 | 9 | 1197.1 | |
| xen18-erlich-augene-12 | 3L 9s MOS for Augene, L=121.64, s=92.46 | 12 | 1197.1 | |
| xen18-erlich-augene-15 | 12L 3s MOS for Augene, L=92.46, s=29.18 | 15 | 1197.1 | |
| xen18-erlich-augene-27 | 12L 15s MOS for Augene, L=63.28, s=29.18 | 27 | 1197.1 | |
| xen18-erlich-augene-39 | 12L 27s MOS for Augene, L=34.10, s=29.18 | 39 | 1197.1 | |
| xen18-erlich-augmented-03 | 3L MOS for Augmented, L=399.02 | 3 | 1197.1 | |
| xen18-erlich-augmented-06 | 3L 3s MOS for Augmented, L=305.87, s=93.15 | 6 | 1197.1 | |
| xen18-erlich-augmented-09 | 3L 6s MOS for Augmented, L=212.72, s=93.15 | 9 | 1197.1 | |
| xen18-erlich-augmented-12 | 3L 9s MOS for Augmented, L=119.57, s=93.15 | 12 | 1197.1 | |
| xen18-erlich-augmented-15 | 12L 3s MOS for Augmented, L=93.15, s=26.42 | 15 | 1197.1 | |
| xen18-erlich-augmented-27 | 12L 15s MOS for Augmented, L=66.73, s=26.42 | 27 | 1197.1 | |
| xen18-erlich-august-03 | 3L MOS for August, L=399.99 | 3 | 1200.0 | |
| xen18-erlich-august-06 | 3L 3s MOS for August, L=292.68, s=107.31 | 6 | 1200.0 | |
| xen18-erlich-august-09 | 3L 6s MOS for August, L=185.37, s=107.31 | 9 | 1200.0 | |
| xen18-erlich-august-12 | 9L 3s MOS for August, L=107.31, s=78.06 | 12 | 1200.0 | |
| xen18-erlich-august-21 | 12L 9s MOS for August, L=78.06, s=29.25 | 21 | 1200.0 | |
| xen18-erlich-beatles-02 | 1L 1s MOS for Beatles, L=842.38, s=354.72 | 2 | 1197.1 | |
| xen18-erlich-beatles-03 | 1L 2s MOS for Beatles, L=487.66, s=354.72 | 3 | 1197.1 | |
| xen18-erlich-beatles-04 | 3L 1s MOS for Beatles, L=354.72, s=132.94 | 4 | 1197.1 | |
| xen18-erlich-beatles-07 | 3L 4s MOS for Beatles, L=221.78, s=132.94 | 7 | 1197.1 | |
| xen18-erlich-beatles-10 | 7L 3s MOS for Beatles, L=132.94, s=88.84 | 10 | 1197.1 | |
| xen18-erlich-beatles-17 | 10L 7s MOS for Beatles, L=88.84, s=44.10 | 17 | 1197.1 | |
| xen18-erlich-beatles-27 | 10L 17s MOS for Beatles, L=44.74, s=44.10 | 27 | 1197.1 | |
| xen18-erlich-beatles-37 | 27L 10s MOS for Beatles, L=44.10, s=0.64 | 37 | 1197.1 | |
| xen18-erlich-blacksmith-05 | 5L MOS for Blacksmith, L=239.18 | 5 | 1195.9 | |
| xen18-erlich-blacksmith-10 | 5L 5s MOS for Blacksmith, L=155.35, s=83.83 | 10 | 1195.9 | |
| xen18-erlich-blacksmith-15 | 10L 5s MOS for Blacksmith, L=83.83, s=71.52 | 15 | 1195.9 | |
| xen18-erlich-blacksmith-25 | 15L 10s MOS for Blacksmith, L=71.52, s=12.31 | 25 | 1195.9 | |
| xen18-erlich-blackwood-05 | 5L MOS for Blackwood, L=238.87 | 5 | 1194.3 | |
| xen18-erlich-blackwood-10 | 5L 5s MOS for Blackwood, L=158.78, s=80.09 | 10 | 1194.3 | |
| xen18-erlich-blackwood-15 | 10L 5s MOS for Blackwood, L=80.09, s=78.69 | 15 | 1194.3 | |
| xen18-erlich-blackwood-25 | 15L 10s MOS for Blackwood, L=78.69, s=1.40 | 25 | 1194.3 | |
| xen18-erlich-bug-02 | 1L 1s MOS for Bug, L=939.7, s=260.3 | 2 | 1200.0 | |
| xen18-erlich-bug-03 | 1L 2s MOS for Bug, L=679.4, s=260.3 | 3 | 1200.0 | |
| xen18-erlich-bug-04 | 1L 3s MOS for Bug, L=419.1, s=260.3 | 4 | 1200.0 | |
| xen18-erlich-bug-05 | 4L 1s MOS for Bug, L=260.3, s=158.8 | 5 | 1200.0 | |
| xen18-erlich-bug-09 | 5L 4s MOS for Bug, L=158.8, s=101.5 | 9 | 1200.0 | |
| xen18-erlich-catler-12 | 12L MOS for Catler, L=99.81 | 12 | 1197.7 | |
| xen18-erlich-catler-24 | 12L 12s MOS for Catler, L=75.22, s=24.59 | 24 | 1197.7 | |
| xen18-erlich-catler-36 | 12L 24s MOS for Catler, L=50.63, s=24.59 | 36 | 1197.7 | |
| xen18-erlich-catler-48 | 12L 36s MOS for Catler, L=26.04, s=24.59 | 48 | 1197.7 | |
| xen18-erlich-compton-12 | 12L MOS for Compton, L=100.05 | 12 | 1200.6 | |
| xen18-erlich-compton-24 | 12L 12s MOS for Compton, L=84.92, s=15.13 | 24 | 1200.6 | |
| xen18-erlich-compton-36 | 12L 24s MOS for Compton, L=69.79, s=15.13 | 36 | 1200.6 | |
| xen18-erlich-compton-48 | 12L 36s MOS for Compton, L=54.66, s=15.13 | 48 | 1200.6 | |
| xen18-erlich-compton-60 | 12L 48s MOS for Compton, L=39.53, s=15.13 | 60 | 1200.6 | |
| xen18-erlich-compton-72 | 12L 60s MOS for Compton, L=24.40, s=15.13 | 72 | 1200.6 | |
| xen18-erlich-cynder-02 | 1L 1s MOS for Cynder, L=969.18, s=232.52 | 2 | 1201.7 | |
| xen18-erlich-cynder-03 | 1L 2s MOS for Cynder, L=736.66, s=232.52 | 3 | 1201.7 | |
| xen18-erlich-cynder-04 | 1L 3s MOS for Cynder, L=504.14, s=232.52 | 4 | 1201.7 | |
| xen18-erlich-cynder-05 | 1L 4s MOS for Cynder, L=271.62, s=232.52 | 5 | 1201.7 | |
| xen18-erlich-cynder-06 | 5L 1s MOS for Cynder, L=232.52, s=39.10 | 6 | 1201.7 | |
| xen18-erlich-cynder-11 | 5L 6s MOS for Cynder, L=193.42, s=39.10 | 11 | 1201.7 | |
| xen18-erlich-cynder-16 | 5L 11s MOS for Cynder, L=154.32, s=39.10 | 16 | 1201.7 | |
| xen18-erlich-cynder-21 | 5L 16s MOS for Cynder, L=115.22, s=39.10 | 21 | 1201.7 | |
| xen18-erlich-cynder-26 | 5L 21s MOS for Cynder, L=76.12, s=39.10 | 26 | 1201.7 | |
| xen18-erlich-cynder-31 | 26L 5s MOS for Cynder, L=39.10, s=37.02 | 31 | 1201.7 | |
| xen18-erlich-dicot-02 | 1L 1s MOS for Dicot, L=854.44, s=353.22 | 2 | 1207.7 | |
| xen18-erlich-dicot-03 | 1L 2s MOS for Dicot, L=501.22, s=353.22 | 3 | 1207.7 | |
| xen18-erlich-dicot-04 | 3L 1s MOS for Dicot, L=353.22, s=148.00 | 4 | 1207.7 | |
| xen18-erlich-dicot-07 | 3L 4s MOS for Dicot, L=205.22, s=148.00 | 7 | 1207.7 | |
| xen18-erlich-dicot-10 | 7L 3s MOS for Dicot, L=148.00, s=57.22 | 10 | 1207.7 | |
| xen18-erlich-dicot-17 | 7L 10s MOS for Dicot, L=90.78, s=57.22 | 17 | 1207.7 | |
| xen18-erlich-dimipent-04 | 4L MOS for Dimipent, L=299.16 | 4 | 1196.6 | |
| xen18-erlich-dimipent-08 | 4L 4s MOS for Dimipent, L=197.49, s=101.67 | 8 | 1196.6 | |
| xen18-erlich-dimipent-12 | 8L 4s MOS for Dimipent, L=101.67, s=95.82 | 12 | 1196.6 | |
| xen18-erlich-dimipent-20 | 12L 8s MOS for Dimipent, L=95.82, s=5.85 | 20 | 1196.6 | |
| xen18-erlich-dimisept-04 | 4L MOS for Dimisept, L=298.53 | 4 | 1194.1 | |
| xen18-erlich-dimisept-08 | 4L 4s MOS for Dimisept, L=197.08, s=101.45 | 8 | 1194.1 | |
| xen18-erlich-dimisept-12 | 8L 4s MOS for Dimisept, L=101.45, s=95.63 | 12 | 1194.1 | |
| xen18-erlich-dimisept-20 | 12L 8s MOS for Dimisept, L=95.63, s=5.82 | 20 | 1194.1 | |
| xen18-erlich-dominant-02 | 1L 1s MOS for Dominant, L=699.35, s=495.88 | 2 | 1195.2 | |
| xen18-erlich-dominant-03 | 2L 1s MOS for Dominant, L=495.88, s=203.47 | 3 | 1195.2 | |
| xen18-erlich-dominant-05 | 2L 3s MOS for Dominant, L=292.41, s=203.47 | 5 | 1195.2 | |
| xen18-erlich-dominant-07 | 5L 2s MOS for Dominant, L=203.47, s=88.94 | 7 | 1195.2 | |
| xen18-erlich-dominant-12 | 5L 7s MOS for Dominant, L=114.53, s=88.94 | 12 | 1195.2 | |
| xen18-erlich-dominant-17 | 12L 5s MOS for Dominant, L=88.94, s=25.59 | 17 | 1195.2 | |
| xen18-erlich-doublewide-02 | 2L MOS for Doublewide, L=599.28 | 2 | 1198.6 | |
| xen18-erlich-doublewide-04 | 2L 2s MOS for Doublewide, L=326.96, s=272.32 | 4 | 1198.6 | |
| xen18-erlich-doublewide-06 | 4L 2s MOS for Doublewide, L=272.32, s=54.64 | 6 | 1198.6 | |
| xen18-erlich-doublewide-10 | 4L 6s MOS for Doublewide, L=217.68, s=54.64 | 10 | 1198.6 | |
| xen18-erlich-doublewide-14 | 4L 10s MOS for Doublewide, L=163.04, s=54.64 | 14 | 1198.6 | |
| xen18-erlich-doublewide-18 | 4L 14s MOS for Doublewide, L=108.40, s=54.64 | 18 | 1198.6 | |
| xen18-erlich-doublewide-22 | 18L 4s MOS for Doublewide, L=54.64, s=53.76 | 22 | 1198.6 | |
| xen18-erlich-doublewide-40 | 22L 18s MOS for Doublewide, L=53.76, s=0.88 | 40 | 1198.6 | |
| xen18-erlich-ennealimmal-09 | 9L MOS for Ennealimmal, L=133.337 | 9 | 1200.0 | |
| xen18-erlich-ennealimmal-18 | 9L 9s MOS for Ennealimmal, L=84.313, s=49.024 | 18 | 1200.0 | |
| xen18-erlich-ennealimmal-27 | 18L 9s MOS for Ennealimmal, L=49.024, s=35.289 | 27 | 1200.0 | |
| xen18-erlich-ennealimmal-45 | 27L 18s MOS for Ennealimmal, L=35.289, s=13.735 | 45 | 1200.0 | |
| xen18-erlich-ennealimmal-72 | 27L 45s MOS for Ennealimmal, L=21.554, s=13.735 | 72 | 1200.0 | |
| xen18-erlich-ennealimmal-99 | 72L 27s MOS for Ennealimmal, L=13.735, s=7.819 | 99 | 1200.0 | |
| xen18-erlich-father-02 | 1L 1s MOS for Father, L=738.5, s=447.4 | 2 | 1185.9 | |
| xen18-erlich-father-03 | 2L 1s MOS for Father, L=447.4, s=291.1 | 3 | 1185.9 | |
| xen18-erlich-father-05 | 3L 2s MOS for Father, L=291.1, s=156.3 | 5 | 1185.9 | |
| xen18-erlich-father-08 | 5L 3s MOS for Father, L=156.3, s=134.8 | 8 | 1185.9 | |
| xen18-erlich-flattone-02 | 1L 1s MOS for Flattone, L=695.40, s=507.14 | 2 | 1202.5 | |
| xen18-erlich-flattone-03 | 2L 1s MOS for Flattone, L=507.14, s=188.26 | 3 | 1202.5 | |
| xen18-erlich-flattone-05 | 2L 3s MOS for Flattone, L=318.88, s=188.26 | 5 | 1202.5 | |
| xen18-erlich-flattone-07 | 5L 2s MOS for Flattone, L=188.26, s=130.62 | 7 | 1202.5 | |
| xen18-erlich-flattone-12 | 7L 5s MOS for Flattone, L=130.62, s=57.64 | 12 | 1202.5 | |
| xen18-erlich-flattone-19 | 7L 12s MOS for Flattone, L=72.98, s=57.64 | 19 | 1202.5 | |
| xen18-erlich-flattone-26 | 19L 7s MOS for Flattone, L=57.64, s=15.34 | 26 | 1202.5 | |
| xen18-erlich-flattone-45 | 19L 26s MOS for Flattone, L=42.30, s=15.34 | 45 | 1202.5 | |
| xen18-erlich-garibaldi-02 | 1L 1s MOS for Garibaldi, L=702.64, s=498.12 | 2 | 1200.8 | |
| xen18-erlich-garibaldi-03 | 2L 1s MOS for Garibaldi, L=498.12, s=204.52 | 3 | 1200.8 | |
| xen18-erlich-garibaldi-05 | 2L 3s MOS for Garibaldi, L=293.60, s=204.52 | 5 | 1200.8 | |
| xen18-erlich-garibaldi-07 | 5L 2s MOS for Garibaldi, L=204.52, s=89.08 | 7 | 1200.8 | |
| xen18-erlich-garibaldi-12 | 5L 7s MOS for Garibaldi, L=115.44, s=89.08 | 12 | 1200.8 | |
| xen18-erlich-garibaldi-17 | 12L 5s MOS for Garibaldi, L=89.08, s=26.36 | 17 | 1200.8 | |
| xen18-erlich-garibaldi-29 | 12L 17s MOS for Garibaldi, L=62.72, s=26.36 | 29 | 1200.8 | |
| xen18-erlich-garibaldi-41 | 12L 29s MOS for Garibaldi, L=36.36, s=26.36 | 41 | 1200.8 | |
| xen18-erlich-garibaldi-53 | 41L 12s MOS for Garibaldi, L=26.36, s=10.00 | 53 | 1200.8 | |
| xen18-erlich-hanson-02 | 1L 1s MOS for Hanson, L=883.22, s=317.07 | 2 | 1200.3 | |
| xen18-erlich-hanson-03 | 1L 2s MOS for Hanson, L=566.15, s=317.07 | 3 | 1200.3 | |
| xen18-erlich-hanson-04 | 3L 1s MOS for Hanson, L=317.07, s=249.08 | 4 | 1200.3 | |
| xen18-erlich-hanson-07 | 4L 3s MOS for Hanson, L=249.08, s=67.99 | 7 | 1200.3 | |
| xen18-erlich-hanson-11 | 4L 7s MOS for Hanson, L=181.09, s=67.99 | 11 | 1200.3 | |
| xen18-erlich-hanson-15 | 4L 11s MOS for Hanson, L=113.10, s=67.99 | 15 | 1200.3 | |
| xen18-erlich-hanson-19 | 15L 4s MOS for Hanson, L=67.99, s=45.11 | 19 | 1200.3 | |
| xen18-erlich-hanson-34 | 19L 15s MOS for Hanson, L=45.11, s=22.88 | 34 | 1200.3 | |
| xen18-erlich-hanson-53 | 34L 19s MOS for Hanson, L=22.88, s=22.23 | 53 | 1200.3 | |
| xen18-erlich-hedgehog-02 | 2L MOS for Hedgehog, L=598.45 | 2 | 1196.9 | |
| xen18-erlich-hedgehog-04 | 2L 2s MOS for Hedgehog, L=436.13, s=162.32 | 4 | 1196.9 | |
| xen18-erlich-hedgehog-06 | 2L 4s MOS for Hedgehog, L=273.81, s=162.32 | 6 | 1196.9 | |
| xen18-erlich-hedgehog-08 | 6L 2s MOS for Hedgehog, L=162.32, s=111.49 | 8 | 1196.9 | |
| xen18-erlich-hedgehog-14 | 8L 6s MOS for Hedgehog, L=111.49, s=50.83 | 14 | 1196.9 | |
| xen18-erlich-hedgehog-22 | 8L 14s MOS for Hedgehog, L=60.66, s=50.83 | 22 | 1196.9 | |
| xen18-erlich-hedgehog-30 | 22L 8s MOS for Hedgehog, L=50.83, s=9.83 | 30 | 1196.9 | |
| xen18-erlich-helmholtz-02 | 1L 1s MOS for Helmholtz, L=701.79, s=498.28 | 2 | 1200.1 | |
| xen18-erlich-helmholtz-03 | 2L 1s MOS for Helmholtz, L=498.28, s=203.51 | 3 | 1200.1 | |
| xen18-erlich-helmholtz-05 | 2L 3s MOS for Helmholtz, L=294.77, s=203.51 | 5 | 1200.1 | |
| xen18-erlich-helmholtz-07 | 5L 2s MOS for Helmholtz, L=203.51, s=91.26 | 7 | 1200.1 | |
| xen18-erlich-helmholtz-12 | 5L 7s MOS for Helmholtz, L=112.25, s=91.26 | 12 | 1200.1 | |
| xen18-erlich-helmholtz-17 | 12L 5s MOS for Helmholtz, L=91.26, s=20.99 | 17 | 1200.1 | |
| xen18-erlich-helmholtz-29 | 12L 17s MOS for Helmholtz, L=70.27, s=20.99 | 29 | 1200.1 | |
| xen18-erlich-helmholtz-41 | 12L 29s MOS for Helmholtz, L=49.28, s=20.99 | 41 | 1200.1 | |
| xen18-erlich-helmholtz-53 | 12L 41s MOS for Helmholtz, L=28.29, s=20.99 | 53 | 1200.1 | |
| xen18-erlich-injera-02 | 2L MOS for Injera, L=600.89 | 2 | 1201.8 | |
| xen18-erlich-injera-04 | 2L 2s MOS for Injera, L=507.28, s=93.61 | 4 | 1201.8 | |
| xen18-erlich-injera-06 | 2L 4s MOS for Injera, L=413.67, s=93.61 | 6 | 1201.8 | |
| xen18-erlich-injera-08 | 2L 6s MOS for Injera, L=320.06, s=93.61 | 8 | 1201.8 | |
| xen18-erlich-injera-10 | 2L 8s MOS for Injera, L=226.45, s=93.61 | 10 | 1201.8 | |
| xen18-erlich-injera-12 | 2L 10s MOS for Injera, L=132.84, s=93.61 | 12 | 1201.8 | |
| xen18-erlich-injera-14 | 12L 2s MOS for Injera, L=93.61, s=39.23 | 14 | 1201.8 | |
| xen18-erlich-injera-26 | 12L 14s MOS for Injera, L=54.38, s=39.23 | 26 | 1201.8 | |
| xen18-erlich-injera-38 | 26L 12s MOS for Injera, L=39.23, s=15.15 | 38 | 1201.8 | |
| xen18-erlich-keemun-02 | 1L 1s MOS for Keemun, L=885.35, s=317.84 | 2 | 1203.2 | |
| xen18-erlich-keemun-03 | 1L 2s MOS for Keemun, L=567.51, s=317.84 | 3 | 1203.2 | |
| xen18-erlich-keemun-04 | 3L 1s MOS for Keemun, L=317.84, s=249.67 | 4 | 1203.2 | |
| xen18-erlich-keemun-07 | 4L 3s MOS for Keemun, L=249.67, s=68.17 | 7 | 1203.2 | |
| xen18-erlich-keemun-11 | 4L 7s MOS for Keemun, L=181.50, s=68.17 | 11 | 1203.2 | |
| xen18-erlich-keemun-15 | 4L 11s MOS for Keemun, L=113.33, s=68.17 | 15 | 1203.2 | |
| xen18-erlich-keemun-19 | 15L 4s MOS for Keemun, L=68.17, s=45.16 | 19 | 1203.2 | |
| xen18-erlich-keemun-34 | 19L 15s MOS for Keemun, L=45.16, s=23.01 | 34 | 1203.2 | |
| xen18-erlich-lemba-02 | 2L MOS for Lemba, L=601.70 | 2 | 1203.4 | |
| xen18-erlich-lemba-04 | 2L 2s MOS for Lemba, L=370.83, s=230.87 | 4 | 1203.4 | |
| xen18-erlich-lemba-06 | 4L 2s MOS for Lemba, L=230.87, s=139.96 | 6 | 1203.4 | |
| xen18-erlich-lemba-10 | 6L 4s MOS for Lemba, L=139.96, s=90.91 | 10 | 1203.4 | |
| xen18-erlich-lemba-16 | 10L 6s MOS for Lemba, L=90.91, s=49.05 | 16 | 1203.4 | |
| xen18-erlich-lemba-26 | 16L 10s MOS for Lemba, L=49.05, s=41.86 | 26 | 1203.4 | |
| xen18-erlich-lemba-42 | 26L 16s MOS for Lemba, L=41.86, s=7.19 | 42 | 1203.4 | |
| xen18-erlich-liese-02 | 1L 1s MOS for Liese, L=633.57, s=569.05 | 2 | 1202.6 | |
| xen18-erlich-liese-03 | 2L 1s MOS for Liese, L=569.05, s=64.52 | 3 | 1202.6 | |
| xen18-erlich-liese-05 | 2L 3s MOS for Liese, L=504.53, s=64.52 | 5 | 1202.6 | |
| xen18-erlich-liese-07 | 2L 5s MOS for Liese, L=440.01, s=64.52 | 7 | 1202.6 | |
| xen18-erlich-liese-09 | 2L 7s MOS for Liese, L=375.49, s=64.52 | 9 | 1202.6 | |
| xen18-erlich-liese-11 | 2L 9s MOS for Liese, L=310.97, s=64.52 | 11 | 1202.6 | |
| xen18-erlich-liese-13 | 2L 11s MOS for Liese, L=246.45, s=64.52 | 13 | 1202.6 | |
| xen18-erlich-liese-15 | 2L 13s MOS for Liese, L=181.93, s=64.52 | 15 | 1202.6 | |
| xen18-erlich-liese-17 | 2L 15s MOS for Liese, L=117.41, s=64.52 | 17 | 1202.6 | |
| xen18-erlich-liese-19 | 17L 2s MOS for Liese, L=64.52, s=52.89 | 19 | 1202.6 | |
| xen18-erlich-liese-36 | 19L 17s MOS for Liese, L=52.89, s=11.63 | 36 | 1202.6 | |
| xen18-erlich-liese-55 | 19L 36s MOS for Liese, L=41.26, s=11.63 | 55 | 1202.6 | |
| xen18-erlich-luna-02 | 1L 1s MOS for Luna, L=1006.784, s=193.196 | 2 | 1200.0 | |
| xen18-erlich-luna-03 | 1L 2s MOS for Luna, L=813.588, s=193.196 | 3 | 1200.0 | |
| xen18-erlich-luna-04 | 1L 3s MOS for Luna, L=620.392, s=193.196 | 4 | 1200.0 | |
| xen18-erlich-luna-05 | 1L 4s MOS for Luna, L=427.196, s=193.196 | 5 | 1200.0 | |
| xen18-erlich-luna-06 | 1L 5s MOS for Luna, L=234.000, s=193.196 | 6 | 1200.0 | |
| xen18-erlich-luna-07 | 6L 1s MOS for Luna, L=193.196, s=40.804 | 7 | 1200.0 | |
| xen18-erlich-luna-13 | 6L 7s MOS for Luna, L=152.392, s=40.804 | 13 | 1200.0 | |
| xen18-erlich-luna-19 | 6L 13s MOS for Luna, L=111.588, s=40.804 | 19 | 1200.0 | |
| xen18-erlich-luna-25 | 6L 19s MOS for Luna, L=70.784, s=40.804 | 25 | 1200.0 | |
| xen18-erlich-luna-31 | 25L 6s MOS for Luna, L=40.804, s=29.980 | 31 | 1200.0 | |
| xen18-erlich-luna-56 | 31L 25s MOS for Luna, L=29.980, s=10.824 | 56 | 1200.0 | |
| xen18-erlich-luna-87 | 31L 56s MOS for Luna, L=19.156, s=10.824 | 87 | 1200.0 | |
| xen18-erlich-magic-02 | 1L 1s MOS for Magic, L=820.48, s=380.80 | 2 | 1201.3 | |
| xen18-erlich-magic-03 | 1L 2s MOS for Magic, L=439.68, s=380.80 | 3 | 1201.3 | |
| xen18-erlich-magic-04 | 3L 1s MOS for Magic, L=380.80, s=58.88 | 4 | 1201.3 | |
| xen18-erlich-magic-07 | 3L 4s MOS for Magic, L=321.92, s=58.88 | 7 | 1201.3 | |
| xen18-erlich-magic-10 | 3L 7s MOS for Magic, L=263.04, s=58.88 | 10 | 1201.3 | |
| xen18-erlich-magic-13 | 3L 10s MOS for Magic, L=204.16, s=58.88 | 13 | 1201.3 | |
| xen18-erlich-magic-16 | 3L 13s MOS for Magic, L=145.28, s=58.88 | 16 | 1201.3 | |
| xen18-erlich-magic-19 | 3L 16s MOS for Magic, L=86.40, s=58.88 | 19 | 1201.3 | |
| xen18-erlich-magic-22 | 19L 3s MOS for Magic, L=58.88, s=27.52 | 22 | 1201.3 | |
| xen18-erlich-magic-41 | 19L 22s MOS for Magic, L=31.36, s=27.52 | 41 | 1201.3 | |
| xen18-erlich-magic-60 | 41L 19s MOS for Magic, L=27.52, s=3.84 | 60 | 1201.3 | |
| xen18-erlich-mavila-02 | 1L 1s MOS for Mavila, L=685.03, s=521.52 | 2 | 1206.5 | |
| xen18-erlich-mavila-03 | 2L 1s MOS for Mavila, L=521.52, s=163.51 | 3 | 1206.5 | |
| xen18-erlich-mavila-05 | 2L 3s MOS for Mavila, L=358.01, s=163.51 | 5 | 1206.5 | |
| xen18-erlich-mavila-07 | 2L 5s MOS for Mavila, L=194.50, s=163.51 | 7 | 1206.5 | |
| xen18-erlich-mavila-09 | 7L 2s MOS for Mavila, L=163.51, s=30.99 | 9 | 1206.5 | |
| xen18-erlich-mavila-16 | 7L 9s MOS for Mavila, L=132.52, s=30.99 | 16 | 1206.5 | |
| xen18-erlich-meantone-02 | 1L 1s MOS for Meantone, L=697.57, s=504.13 | 2 | 1201.7 | |
| xen18-erlich-meantone-03 | 2L 1s MOS for Meantone, L=504.13, s=193.44 | 3 | 1201.7 | |
| xen18-erlich-meantone-05 | 2L 3s MOS for Meantone, L=310.69, s=193.44 | 5 | 1201.7 | |
| xen18-erlich-meantone-07 | 5L 2s MOS for Meantone, L=193.44, s=117.25 | 7 | 1201.7 | |
| xen18-erlich-meantone-12 | 7L 5s MOS for Meantone, L=117.25, s=76.19 | 12 | 1201.7 | |
| xen18-erlich-meantone-19 | 12L 7s MOS for Meantone, L=76.19, s=41.06 | 19 | 1201.7 | |
| xen18-erlich-meantone-31 | 19L 12s MOS for Meantone, L=41.06, s=35.13 | 31 | 1201.7 | |
| xen18-erlich-meantone-50 | 31L 19s MOS for Meantone, L=35.13, s=5.93 | 50 | 1201.7 | |
| xen18-erlich-miracle-02 | 1L 1s MOS for Miracle, L=1083.91, s=116.72 | 2 | 1200.6 | |
| xen18-erlich-miracle-03 | 1L 2s MOS for Miracle, L=967.19, s=116.72 | 3 | 1200.6 | |
| xen18-erlich-miracle-04 | 1L 3s MOS for Miracle, L=850.47, s=116.72 | 4 | 1200.6 | |
| xen18-erlich-miracle-05 | 1L 4s MOS for Miracle, L=733.75, s=116.72 | 5 | 1200.6 | |
| xen18-erlich-miracle-06 | 1L 5s MOS for Miracle, L=617.03, s=116.72 | 6 | 1200.6 | |
| xen18-erlich-miracle-07 | 1L 6s MOS for Miracle, L=500.31, s=116.72 | 7 | 1200.6 | |
| xen18-erlich-miracle-08 | 1L 7s MOS for Miracle, L=383.59, s=116.72 | 8 | 1200.6 | |
| xen18-erlich-miracle-09 | 1L 8s MOS for Miracle, L=266.87, s=116.72 | 9 | 1200.6 | |
| xen18-erlich-miracle-10 | 1L 9s MOS for Miracle, L=150.15, s=116.72 | 10 | 1200.6 | |
| xen18-erlich-miracle-11 | 10L 1s MOS for Miracle, L=116.72, s=33.43 | 11 | 1200.6 | |
| xen18-erlich-miracle-21 | 10L 11s MOS for Miracle, L=83.29, s=33.43 | 21 | 1200.6 | |
| xen18-erlich-miracle-31 | 10L 21s MOS for Miracle, L=49.86, s=33.43 | 31 | 1200.6 | |
| xen18-erlich-miracle-41 | 31L 10s MOS for Miracle, L=33.43, s=16.43 | 41 | 1200.6 | |
| xen18-erlich-miracle-72 | 31L 41s MOS for Miracle, L=17.00, s=16.43 | 72 | 1200.6 | |
| xen18-erlich-myna-02 | 1L 1s MOS for Myna, L=888.94, s=309.89 | 2 | 1198.8 | |
| xen18-erlich-myna-03 | 1L 2s MOS for Myna, L=579.05, s=309.89 | 3 | 1198.8 | |
| xen18-erlich-myna-04 | 3L 1s MOS for Myna, L=309.89, s=269.16 | 4 | 1198.8 | |
| xen18-erlich-myna-07 | 4L 3s MOS for Myna, L=269.16, s=40.73 | 7 | 1198.8 | |
| xen18-erlich-myna-11 | 4L 7s MOS for Myna, L=228.43, s=40.73 | 11 | 1198.8 | |
| xen18-erlich-myna-15 | 4L 11s MOS for Myna, L=187.70, s=40.73 | 15 | 1198.8 | |
| xen18-erlich-myna-19 | 4L 15s MOS for Myna, L=146.97, s=40.73 | 19 | 1198.8 | |
| xen18-erlich-myna-23 | 4L 19s MOS for Myna, L=106.24, s=40.73 | 23 | 1198.8 | |
| xen18-erlich-myna-27 | 4L 23s MOS for Myna, L=65.51, s=40.73 | 27 | 1198.8 | |
| xen18-erlich-myna-31 | 27L 4s MOS for Myna, L=40.73, s=24.78 | 31 | 1198.8 | |
| xen18-erlich-myna-58 | 31L 27s MOS for Myna, L=24.78, s=15.95 | 58 | 1198.8 | |
| xen18-erlich-nautilus-02 | 1L 1s MOS for Nautilus, L=1119.69, s=82.97 | 2 | 1202.7 | |
| xen18-erlich-nautilus-03 | 1L 2s MOS for Nautilus, L=1036.72, s=82.97 | 3 | 1202.7 | |
| xen18-erlich-nautilus-04 | 1L 3s MOS for Nautilus, L=953.75, s=82.97 | 4 | 1202.7 | |
| xen18-erlich-nautilus-05 | 1L 4s MOS for Nautilus, L=870.78, s=82.97 | 5 | 1202.7 | |
| xen18-erlich-nautilus-06 | 1L 5s MOS for Nautilus, L=787.81, s=82.97 | 6 | 1202.7 | |
| xen18-erlich-nautilus-07 | 1L 6s MOS for Nautilus, L=704.84, s=82.97 | 7 | 1202.7 | |
| xen18-erlich-nautilus-08 | 1L 7s MOS for Nautilus, L=621.87, s=82.97 | 8 | 1202.7 | |
| xen18-erlich-nautilus-09 | 1L 8s MOS for Nautilus, L=538.90, s=82.97 | 9 | 1202.7 | |
| xen18-erlich-nautilus-10 | 1L 9s MOS for Nautilus, L=455.93, s=82.97 | 10 | 1202.7 | |
| xen18-erlich-nautilus-11 | 1L 10s MOS for Nautilus, L=372.96, s=82.97 | 11 | 1202.7 | |
| xen18-erlich-nautilus-12 | 1L 11s MOS for Nautilus, L=289.99, s=82.97 | 12 | 1202.7 | |
| xen18-erlich-nautilus-13 | 1L 12s MOS for Nautilus, L=207.02, s=82.97 | 13 | 1202.7 | |
| xen18-erlich-nautilus-14 | 1L 13s MOS for Nautilus, L=124.05, s=82.97 | 14 | 1202.7 | |
| xen18-erlich-nautilus-15 | 14L 1s MOS for Nautilus, L=82.97, s=41.08 | 15 | 1202.7 | |
| xen18-erlich-nautilus-29 | 14L 15s MOS for Nautilus, L=41.89, s=41.08 | 29 | 1202.7 | |
| xen18-erlich-nautilus-43 | 29L 14s MOS for Nautilus, L=41.08, s=0.81 | 43 | 1202.7 | |
| xen18-erlich-negripent-02 | 1L 1s MOS for Negripent, L=1075.68, s=126.14 | 2 | 1201.8 | |
| xen18-erlich-negripent-03 | 1L 2s MOS for Negripent, L=949.54, s=126.14 | 3 | 1201.8 | |
| xen18-erlich-negripent-04 | 1L 3s MOS for Negripent, L=823.40, s=126.14 | 4 | 1201.8 | |
| xen18-erlich-negripent-05 | 1L 4s MOS for Negripent, L=697.26, s=126.14 | 5 | 1201.8 | |
| xen18-erlich-negripent-06 | 1L 5s MOS for Negripent, L=571.12, s=126.14 | 6 | 1201.8 | |
| xen18-erlich-negripent-07 | 1L 6s MOS for Negripent, L=444.98, s=126.14 | 7 | 1201.8 | |
| xen18-erlich-negripent-08 | 1L 7s MOS for Negripent, L=318.84, s=126.14 | 8 | 1201.8 | |
| xen18-erlich-negripent-09 | 1L 8s MOS for Negripent, L=192.70, s=126.14 | 9 | 1201.8 | |
| xen18-erlich-negripent-10 | 9L 1s MOS for Negripent, L=126.14, s=66.56 | 10 | 1201.8 | |
| xen18-erlich-negripent-19 | 10L 9s MOS for Negripent, L=66.56, s=59.58 | 19 | 1201.8 | |
| xen18-erlich-negripent-29 | 19L 10s MOS for Negripent, L=59.58, s=6.98 | 29 | 1201.8 | |
| xen18-erlich-negrisept-02 | 1L 1s MOS for Negrisept, L=1078.35, s=124.84 | 2 | 1203.2 | |
| xen18-erlich-negrisept-03 | 1L 2s MOS for Negrisept, L=953.51, s=124.84 | 3 | 1203.2 | |
| xen18-erlich-negrisept-04 | 1L 3s MOS for Negrisept, L=828.67, s=124.84 | 4 | 1203.2 | |
| xen18-erlich-negrisept-05 | 1L 4s MOS for Negrisept, L=703.83, s=124.84 | 5 | 1203.2 | |
| xen18-erlich-negrisept-06 | 1L 5s MOS for Negrisept, L=578.99, s=124.84 | 6 | 1203.2 | |
| xen18-erlich-negrisept-07 | 1L 6s MOS for Negrisept, L=454.15, s=124.84 | 7 | 1203.2 | |
| xen18-erlich-negrisept-08 | 1L 7s MOS for Negrisept, L=329.31, s=124.84 | 8 | 1203.2 | |
| xen18-erlich-negrisept-09 | 1L 8s MOS for Negrisept, L=204.47, s=124.84 | 9 | 1203.2 | |
| xen18-erlich-negrisept-10 | 9L 1s MOS for Negrisept, L=124.84, s=79.63 | 10 | 1203.2 | |
| xen18-erlich-negrisept-19 | 10L 9s MOS for Negrisept, L=79.63, s=45.21 | 19 | 1203.2 | |
| xen18-erlich-negrisept-29 | 19L 10s MOS for Negrisept, L=45.21, s=34.42 | 29 | 1203.2 | |
| xen18-erlich-orson-02 | 1L 1s MOS for Orson, L=928.59, s=271.65 | 2 | 1200.2 | |
| xen18-erlich-orson-03 | 1L 2s MOS for Orson, L=656.94, s=271.65 | 3 | 1200.2 | |
| xen18-erlich-orson-04 | 1L 3s MOS for Orson, L=385.29, s=271.65 | 4 | 1200.2 | |
| xen18-erlich-orson-05 | 4L 1s MOS for Orson, L=271.65, s=113.64 | 5 | 1200.2 | |
| xen18-erlich-orson-09 | 4L 5s MOS for Orson, L=158.01, s=113.64 | 9 | 1200.2 | |
| xen18-erlich-orson-13 | 9L 4s MOS for Orson, L=113.64, s=44.37 | 13 | 1200.2 | |
| xen18-erlich-orson-22 | 9L 13s MOS for Orson, L=69.27, s=44.37 | 22 | 1200.2 | |
| xen18-erlich-orson-31 | 22L 9s MOS for Orson, L=44.37, s=24.90 | 31 | 1200.2 | |
| xen18-erlich-orson-53 | 31L 22s MOS for Orson, L=24.90, s=19.47 | 53 | 1200.2 | |
| xen18-erlich-orwell-02 | 1L 1s MOS for Orwell, L=928.04, s=271.49 | 2 | 1199.5 | |
| xen18-erlich-orwell-03 | 1L 2s MOS for Orwell, L=656.55, s=271.49 | 3 | 1199.5 | |
| xen18-erlich-orwell-04 | 1L 3s MOS for Orwell, L=385.06, s=271.49 | 4 | 1199.5 | |
| xen18-erlich-orwell-05 | 4L 1s MOS for Orwell, L=271.49, s=113.57 | 5 | 1199.5 | |
| xen18-erlich-orwell-09 | 4L 5s MOS for Orwell, L=157.92, s=113.57 | 9 | 1199.5 | |
| xen18-erlich-orwell-13 | 9L 4s MOS for Orwell, L=113.57, s=44.35 | 13 | 1199.5 | |
| xen18-erlich-orwell-22 | 9L 13s MOS for Orwell, L=69.22, s=44.35 | 22 | 1199.5 | |
| xen18-erlich-orwell-31 | 22L 9s MOS for Orwell, L=44.35, s=24.87 | 31 | 1199.5 | |
| xen18-erlich-orwell-53 | 31L 22s MOS for Orwell, L=24.87, s=19.48 | 53 | 1199.5 | |
| xen18-erlich-pajara-02 | 2L MOS for Pajara, L=598.45 | 2 | 1196.9 | |
| xen18-erlich-pajara-04 | 2L 2s MOS for Pajara, L=491.88, s=106.57 | 4 | 1196.9 | |
| xen18-erlich-pajara-06 | 2L 4s MOS for Pajara, L=385.31, s=106.57 | 6 | 1196.9 | |
| xen18-erlich-pajara-08 | 2L 6s MOS for Pajara, L=278.74, s=106.57 | 8 | 1196.9 | |
| xen18-erlich-pajara-10 | 2L 8s MOS for Pajara, L=172.17, s=106.57 | 10 | 1196.9 | |
| xen18-erlich-pajara-12 | 10L 2s MOS for Pajara, L=106.57, s=65.60 | 12 | 1196.9 | |
| xen18-erlich-pajara-22 | 12L 10s MOS for Pajara, L=65.60, s=40.97 | 22 | 1196.9 | |
| xen18-erlich-pajara-34 | 22L 12s MOS for Pajara, L=40.97, s=24.63 | 34 | 1196.9 | |
| xen18-erlich-passion-02 | 1L 1s MOS for Passion, L=1099.91, s=98.40 | 2 | 1198.3 | |
| xen18-erlich-passion-03 | 1L 2s MOS for Passion, L=1001.51, s=98.40 | 3 | 1198.3 | |
| xen18-erlich-passion-04 | 1L 3s MOS for Passion, L=903.11, s=98.40 | 4 | 1198.3 | |
| xen18-erlich-passion-05 | 1L 4s MOS for Passion, L=804.71, s=98.40 | 5 | 1198.3 | |
| xen18-erlich-passion-06 | 1L 5s MOS for Passion, L=706.31, s=98.40 | 6 | 1198.3 | |
| xen18-erlich-passion-07 | 1L 6s MOS for Passion, L=607.91, s=98.40 | 7 | 1198.3 | |
| xen18-erlich-passion-08 | 1L 7s MOS for Passion, L=509.51, s=98.40 | 8 | 1198.3 | |
| xen18-erlich-passion-09 | 1L 8s MOS for Passion, L=411.11, s=98.40 | 9 | 1198.3 | |
| xen18-erlich-passion-10 | 1L 9s MOS for Passion, L=312.71, s=98.40 | 10 | 1198.3 | |
| xen18-erlich-passion-11 | 1L 10s MOS for Passion, L=214.31, s=98.40 | 11 | 1198.3 | |
| xen18-erlich-passion-12 | 1L 11s MOS for Passion, L=115.91, s=98.40 | 12 | 1198.3 | |
| xen18-erlich-passion-13 | 12L 1s MOS for Passion, L=98.40, s=17.51 | 13 | 1198.3 | |
| xen18-erlich-passion-25 | 12L 13s MOS for Passion, L=80.89, s=17.51 | 25 | 1198.3 | |
| xen18-erlich-passion-37 | 12L 25s MOS for Passion, L=63.38, s=17.51 | 37 | 1198.3 | |
| xen18-erlich-passion-49 | 12L 37s MOS for Passion, L=45.87, s=17.51 | 49 | 1198.3 | |
| xen18-erlich-porcupine-02 | 1L 1s MOS for Porcupine, L=1034.59, s=162.32 | 2 | 1196.9 | |
| xen18-erlich-porcupine-03 | 1L 2s MOS for Porcupine, L=872.27, s=162.32 | 3 | 1196.9 | |
| xen18-erlich-porcupine-04 | 1L 3s MOS for Porcupine, L=709.95, s=162.32 | 4 | 1196.9 | |
| xen18-erlich-porcupine-05 | 1L 4s MOS for Porcupine, L=547.63, s=162.32 | 5 | 1196.9 | |
| xen18-erlich-porcupine-06 | 1L 5s MOS for Porcupine, L=385.31, s=162.32 | 6 | 1196.9 | |
| xen18-erlich-porcupine-07 | 1L 6s MOS for Porcupine, L=222.99, s=162.32 | 7 | 1196.9 | |
| xen18-erlich-porcupine-08 | 7L 1s MOS for Porcupine, L=162.32, s=60.67 | 8 | 1196.9 | |
| xen18-erlich-porcupine-15 | 7L 8s MOS for Porcupine, L=101.65, s=60.67 | 15 | 1196.9 | |
| xen18-erlich-porcupine-22 | 15L 7s MOS for Porcupine, L=60.67, s=40.98 | 22 | 1196.9 | |
| xen18-erlich-porcupine-37 | 22L 15s MOS for Porcupine, L=40.98, s=19.69 | 37 | 1196.9 | |
| xen18-erlich-ripple-02 | 1L 1s MOS for Ripple, L=1101.33, s=101.99 | 2 | 1203.3 | |
| xen18-erlich-ripple-03 | 1L 2s MOS for Ripple, L=999.34, s=101.99 | 3 | 1203.3 | |
| xen18-erlich-ripple-04 | 1L 3s MOS for Ripple, L=897.35, s=101.99 | 4 | 1203.3 | |
| xen18-erlich-ripple-05 | 1L 4s MOS for Ripple, L=795.36, s=101.99 | 5 | 1203.3 | |
| xen18-erlich-ripple-06 | 1L 5s MOS for Ripple, L=693.37, s=101.99 | 6 | 1203.3 | |
| xen18-erlich-ripple-07 | 1L 6s MOS for Ripple, L=591.38, s=101.99 | 7 | 1203.3 | |
| xen18-erlich-ripple-08 | 1L 7s MOS for Ripple, L=489.39, s=101.99 | 8 | 1203.3 | |
| xen18-erlich-ripple-09 | 1L 8s MOS for Ripple, L=387.40, s=101.99 | 9 | 1203.3 | |
| xen18-erlich-ripple-10 | 1L 9s MOS for Ripple, L=285.41, s=101.99 | 10 | 1203.3 | |
| xen18-erlich-ripple-11 | 1L 10s MOS for Ripple, L=183.42, s=101.99 | 11 | 1203.3 | |
| xen18-erlich-ripple-12 | 11L 1s MOS for Ripple, L=101.99, s=81.43 | 12 | 1203.3 | |
| xen18-erlich-ripple-23 | 12L 11s MOS for Ripple, L=81.43, s=20.56 | 23 | 1203.3 | |
| xen18-erlich-ripple-35 | 12L 23s MOS for Ripple, L=60.87, s=20.56 | 35 | 1203.3 | |
| xen18-erlich-semaphore-02 | 1L 1s MOS for Semaphore, L=951.19, s=252.48 | 2 | 1203.7 | |
| xen18-erlich-semaphore-03 | 1L 2s MOS for Semaphore, L=698.71, s=252.48 | 3 | 1203.7 | |
| xen18-erlich-semaphore-04 | 1L 3s MOS for Semaphore, L=446.23, s=252.48 | 4 | 1203.7 | |
| xen18-erlich-semaphore-05 | 4L 1s MOS for Semaphore, L=252.48, s=193.75 | 5 | 1203.7 | |
| xen18-erlich-semaphore-09 | 5L 4s MOS for Semaphore, L=193.75, s=58.73 | 9 | 1203.7 | |
| xen18-erlich-semaphore-14 | 5L 9s MOS for Semaphore, L=135.02, s=58.73 | 14 | 1203.7 | |
| xen18-erlich-semaphore-19 | 5L 14s MOS for Semaphore, L=76.29, s=58.73 | 19 | 1203.7 | |
| xen18-erlich-semaphore-24 | 19L 5s MOS for Semaphore, L=58.73, s=17.56 | 24 | 1203.7 | |
| xen18-erlich-sensipent-02 | 1L 1s MOS for Sensipent, L=756.60, s=442.99 | 2 | 1199.6 | |
| xen18-erlich-sensipent-03 | 2L 1s MOS for Sensipent, L=442.99, s=313.61 | 3 | 1199.6 | |
| xen18-erlich-sensipent-05 | 3L 2s MOS for Sensipent, L=313.61, s=129.38 | 5 | 1199.6 | |
| xen18-erlich-sensipent-08 | 3L 5s MOS for Sensipent, L=184.23, s=129.38 | 8 | 1199.6 | |
| xen18-erlich-sensipent-11 | 8L 3s MOS for Sensipent, L=129.38, s=54.85 | 11 | 1199.6 | |
| xen18-erlich-sensipent-19 | 8L 11s MOS for Sensipent, L=74.53, s=54.85 | 19 | 1199.6 | |
| xen18-erlich-sensipent-27 | 19L 8s MOS for Sensipent, L=54.85, s=19.68 | 27 | 1199.6 | |
| xen18-erlich-sensipent-46 | 19L 27s MOS for Sensipent, L=35.17, s=19.68 | 46 | 1199.6 | |
| xen18-erlich-sensisept-02 | 1L 1s MOS for Sensisept, L=755.23, s=443.16 | 2 | 1198.4 | |
| xen18-erlich-sensisept-03 | 2L 1s MOS for Sensisept, L=443.16, s=312.07 | 3 | 1198.4 | |
| xen18-erlich-sensisept-05 | 3L 2s MOS for Sensisept, L=312.07, s=131.09 | 5 | 1198.4 | |
| xen18-erlich-sensisept-08 | 3L 5s MOS for Sensisept, L=180.98, s=131.09 | 8 | 1198.4 | |
| xen18-erlich-sensisept-11 | 8L 3s MOS for Sensisept, L=131.09, s=49.89 | 11 | 1198.4 | |
| xen18-erlich-sensisept-19 | 8L 11s MOS for Sensisept, L=81.20, s=49.89 | 19 | 1198.4 | |
| xen18-erlich-sensisept-27 | 19L 8s MOS for Sensisept, L=49.89, s=31.31 | 27 | 1198.4 | |
| xen18-erlich-sensisept-46 | 27L 19s MOS for Sensisept, L=31.31, s=18.58 | 46 | 1198.4 | |
| xen18-erlich-srutal-02 | 2L MOS for Srutal, L=599.56 | 2 | 1199.1 | |
| xen18-erlich-srutal-04 | 2L 2s MOS for Srutal, L=494.86, s=104.70 | 4 | 1199.1 | |
| xen18-erlich-srutal-06 | 2L 4s MOS for Srutal, L=390.16, s=104.70 | 6 | 1199.1 | |
| xen18-erlich-srutal-08 | 2L 6s MOS for Srutal, L=285.46, s=104.70 | 8 | 1199.1 | |
| xen18-erlich-srutal-10 | 2L 8s MOS for Srutal, L=180.76, s=104.70 | 10 | 1199.1 | |
| xen18-erlich-srutal-12 | 10L 2s MOS for Srutal, L=104.70, s=76.06 | 12 | 1199.1 | |
| xen18-erlich-srutal-22 | 12L 10s MOS for Srutal, L=76.06, s=28.64 | 22 | 1199.1 | |
| xen18-erlich-srutal-34 | 12L 22s MOS for Srutal, L=47.42, s=28.64 | 34 | 1199.1 | |
| xen18-erlich-srutal-46 | 34L 12s MOS for Srutal, L=28.64, s=18.78 | 46 | 1199.1 | |
| xen18-erlich-superpyth-02 | 1L 1s MOS for Superpyth, L=708.17, s=489.43 | 2 | 1197.6 | |
| xen18-erlich-superpyth-03 | 2L 1s MOS for Superpyth, L=489.43, s=218.74 | 3 | 1197.6 | |
| xen18-erlich-superpyth-05 | 2L 3s MOS for Superpyth, L=270.69, s=218.74 | 5 | 1197.6 | |
| xen18-erlich-superpyth-07 | 5L 2s MOS for Superpyth, L=218.74, s=51.95 | 7 | 1197.6 | |
| xen18-erlich-superpyth-12 | 5L 7s MOS for Superpyth, L=166.79, s=51.95 | 12 | 1197.6 | |
| xen18-erlich-superpyth-17 | 5L 12s MOS for Superpyth, L=114.84, s=51.95 | 17 | 1197.6 | |
| xen18-erlich-superpyth-22 | 5L 17s MOS for Superpyth, L=62.89, s=51.95 | 22 | 1197.6 | |
| xen18-erlich-superpyth-27 | 22L 5s MOS for Superpyth, L=51.95, s=10.94 | 27 | 1197.6 | |
| xen18-erlich-tetracot-02 | 1L 1s MOS for Tetracot, L=1022.92, s=176.11 | 2 | 1199.0 | |
| xen18-erlich-tetracot-03 | 1L 2s MOS for Tetracot, L=846.81, s=176.11 | 3 | 1199.0 | |
| xen18-erlich-tetracot-04 | 1L 3s MOS for Tetracot, L=670.70, s=176.11 | 4 | 1199.0 | |
| xen18-erlich-tetracot-05 | 1L 4s MOS for Tetracot, L=494.59, s=176.11 | 5 | 1199.0 | |
| xen18-erlich-tetracot-06 | 1L 5s MOS for Tetracot, L=318.48, s=176.11 | 6 | 1199.0 | |
| xen18-erlich-tetracot-07 | 6L 1s MOS for Tetracot, L=176.11, s=142.37 | 7 | 1199.0 | |
| xen18-erlich-tetracot-13 | 7L 6s MOS for Tetracot, L=142.37, s=33.74 | 13 | 1199.0 | |
| xen18-erlich-tetracot-20 | 7L 13s MOS for Tetracot, L=108.63, s=33.74 | 20 | 1199.0 | |
| xen18-erlich-tetracot-27 | 7L 20s MOS for Tetracot, L=74.89, s=33.74 | 27 | 1199.0 | |
| xen18-erlich-tetracot-34 | 7L 27s MOS for Tetracot, L=41.15, s=33.74 | 34 | 1199.0 | |
| xen18-erlich-tetracot-41 | 34L 7s MOS for Tetracot, L=33.74, s=7.41 | 41 | 1199.0 | |
| xen18-erlich-vishnu-02 | 2L MOS for Vishnu, L=599.97 | 2 | 1199.9 | |
| xen18-erlich-vishnu-04 | 2L 2s MOS for Vishnu, L=528.82, s=71.15 | 4 | 1199.9 | |
| xen18-erlich-vishnu-06 | 2L 4s MOS for Vishnu, L=457.67, s=71.15 | 6 | 1199.9 | |
| xen18-erlich-vishnu-08 | 2L 6s MOS for Vishnu, L=386.52, s=71.15 | 8 | 1199.9 | |
| xen18-erlich-vishnu-10 | 2L 8s MOS for Vishnu, L=315.37, s=71.15 | 10 | 1199.9 | |
| xen18-erlich-vishnu-12 | 2L 10s MOS for Vishnu, L=244.22, s=71.15 | 12 | 1199.9 | |
| xen18-erlich-vishnu-14 | 2L 12s MOS for Vishnu, L=173.07, s=71.15 | 14 | 1199.9 | |
| xen18-erlich-vishnu-16 | 2L 14s MOS for Vishnu, L=101.92, s=71.15 | 16 | 1199.9 | |
| xen18-erlich-vishnu-18 | 16L 2s MOS for Vishnu, L=71.15, s=30.77 | 18 | 1199.9 | |
| xen18-erlich-vishnu-34 | 16L 18s MOS for Vishnu, L=40.38, s=30.77 | 34 | 1199.9 | |
| xen18-erlich-vishnu-50 | 34L 16s MOS for Vishnu, L=30.77, s=9.61 | 50 | 1199.9 | |
| xen18-erlich-vishnu-84 | 34L 50s MOS for Vishnu, L=21.16, s=9.61 | 84 | 1199.9 | |
| xen18-erlich-wurschmidt-02 | 1L 1s MOS for Wurschmidt, L=812.05, s=387.64 | 2 | 1199.7 | |
| xen18-erlich-wurschmidt-03 | 1L 2s MOS for Wurschmidt, L=424.41, s=387.64 | 3 | 1199.7 | |
| xen18-erlich-wurschmidt-04 | 3L 1s MOS for Wurschmidt, L=387.64, s=36.77 | 4 | 1199.7 | |
| xen18-erlich-wurschmidt-07 | 3L 4s MOS for Wurschmidt, L=350.87, s=36.77 | 7 | 1199.7 | |
| xen18-erlich-wurschmidt-10 | 3L 7s MOS for Wurschmidt, L=314.10, s=36.77 | 10 | 1199.7 | |
| xen18-erlich-wurschmidt-13 | 3L 10s MOS for Wurschmidt, L=277.33, s=36.77 | 13 | 1199.7 | |
| xen18-erlich-wurschmidt-16 | 3L 13s MOS for Wurschmidt, L=240.56, s=36.77 | 16 | 1199.7 | |
| xen18-erlich-wurschmidt-19 | 3L 16s MOS for Wurschmidt, L=203.79, s=36.77 | 19 | 1199.7 | |
| xen18-erlich-wurschmidt-22 | 3L 19s MOS for Wurschmidt, L=167.02, s=36.77 | 22 | 1199.7 | |
| xen18-erlich-wurschmidt-25 | 3L 22s MOS for Wurschmidt, L=130.25, s=36.77 | 25 | 1199.7 | |
| xen18-erlich-wurschmidt-28 | 3L 25s MOS for Wurschmidt, L=93.48, s=36.77 | 28 | 1199.7 | |
| xen18-erlich-wurschmidt-31 | 3L 28s MOS for Wurschmidt, L=56.71, s=36.77 | 31 | 1199.7 | |
| xen18-erlich-wurschmidt-34 | 31L 3s MOS for Wurschmidt, L=36.77, s=19.94 | 34 | 1199.7 | |
| xen18-erlich-wurschmidt-65 | 34L 31s MOS for Wurschmidt, L=19.94, s=16.83 | 65 | 1199.7 | |
| xen18-keenan-blackjack-guitar | Fret tunings for a blackjack guitar fretboard | 21 | 1200.0 | |
| xen18-keenan-just-blackjack | 7-limit just-ification of Blackjack | 21 | 1200.0 | 7 |
| xen18-mitchell-fractal-1 | Geordan's Scale, by eyeball | 10 | 1200.0 | |
| xen18-mitchell-fractal-2 | Geordan's Scale, Erv Wilson's calculation | 10 | 1200.0 | |
| xen18-schulter-707-10 | Ab-B portion in 17-WT | 10 | 1200.0 | |
| xen18-schulter-707-12 | Temperament with fifth of 707.22045 | 12 | 1200.0 | |
| xen18-schulter-707-17 | Temperament with fifth of 707.22045 | 17 | 1200.0 | |
| xen18-schulter-707-24 | Temperament with fifth of 707.22045 | 24 | 1200.0 | |
| xen18-schulter-707-56 | Temperament with fifth of 707.22045 | 56 | 1200.0 | |
| xen18-schulter-archytan-1-2-12 | 1/2-Archytan temperament | 12 | 1200.0 | |
| xen18-schulter-archytan-1-2-17 | 1/2-Archytan temperament | 17 | 1200.0 | |
| xen18-schulter-archytan-1-3-12 | 1/3-Archytan temperament | 12 | 1200.0 | |
| xen18-schulter-archytan-1-3-17 | 1/3-Archytan temperament | 17 | 1200.0 | |
| xen18-schulter-archytan-1-4-12 | 1/4-Archytan temperament | 12 | 1200.0 | |
| xen18-schulter-archytan-1-4-17 | 1/4-Archytan temperament | 17 | 1200.0 | |
| xen18-schulter-archytan-1-5-12 | 1/5-Archytan temperament | 12 | 1200.0 | |
| xen18-schulter-archytan-1-5-17 | 1/5-Archytan temperament | 17 | 1200.0 | |
| xen18-schulter-archytan-5-26-12 | 5/26-Archytan temperament | 12 | 1200.0 | |
| xen18-schulter-archytan-5-26-17 | 5/26-Archytan temperament | 17 | 1200.0 | |
| xen18-schulter-circulating | 17-note circulating temperament | 17 | 1200.0 | |
| xen18-schulter-didymic-1-4-12 | 1/4-Didymic temperament | 12 | 1200.0 | |
| xen18-schulter-didymic-1-4-17 | 1/4-Didymic temperament | 17 | 1200.0 | |
| xen18-schulter-harrison | A JI scale of Lou Harrison | 5 | 1200.0 | 7 |
| xen18-schulter-harrison-17-wt | 17-WT realization of a JI scale of Lou Harrison | 5 | 1200.0 | |
| xen18-schulter-pelog-like | A Pelog-like pentatonic in 17-WT | 5 | 1200.0 | |
| xen18-schulter-pure-11-14 | Temperament with pure 11:14 major thirds, fifth of 704.377 cents | 12 | 1200.0 | |
| xen18-schulter-pure-11-14-17 | Temperament with pure 11:14 major thirds, fifth of 704.377 cents | 17 | 1200.0 | |
| xen18-schulter-pure-11-14-24 | Temperament with pure 11:14 major thirds, fifth of 704.377 cents | 24 | 1200.0 | |
| xen18-schulter-pythagorean | 12-note Pythagorean tuning | 12 | 1200.0 | 3 |
| xen18-schulter-symmetrical | A JI version of a symmetrical scale in 17-WT | 7 | 1200.0 | 13 |
| xen18-schulter-zalzal | Zalzal's scale | 7 | 1200.0 | 11 |
| xen18-schulter-zalzal-d | Zalzal's scale in 17-WT, on D | 7 | 1200.0 | |
| xen18-schulter-zalzal-g | Mode of Zalzal's scale in 17-WT, on G | 7 | 1200.0 | |
| xen18-secor-11-17-mos | MOS generated by 11o17 | 11 | 1200.0 | |
| xen18-secor-13-limit-1-just | 13-limit just scale | 7 | 1200.0 | 13 |
| xen18-secor-13-limit-1-tempered | 13-limit tempered scale | 7 | 1200.0 | |
| xen18-secor-13-limit-2-just | 13-limit just scale, enharmonic alteration | 7 | 1200.0 | 13 |
| xen18-secor-13-limit-2-tempered | 13-limit tempered scale, enharmonic alteration | 7 | 1200.0 | |
| xen18-secor-17-plus-5-wt | Secor 17+5 Temperament | 22 | 1200.0 | |
| xen18-secor-17-wt | Secor 17-tone Well Temperament | 17 | 1200.0 | |
| xen18-secor-neutral-second-mos-1 | MOS generated by a neutral second | 9 | 1200.0 | |
| xen18-secor-neutral-second-mos-2 | MOS generated by a neutral second | 8 | 1200.0 | |
| xen18-secor-neutral-third-mos-1-just | MOS generated by a neutral third, just | 7 | 1200.0 | 13 |
| xen18-secor-neutral-third-mos-1-tempered | MOS generated by a neutral third, tempered | 7 | 1200.0 | |
| xen18-secor-neutral-third-mos-2-just | Transposition of a mode of MOS generated by a neutral third, just | 7 | 1200.0 | 13 |
| xen18-secor-neutral-third-mos-2-tempered | Transposition of a mode of MOS generated by a neutral third, tempered | 7 | 1200.0 |