23edo: Difference between revisions
→Theory: it's not necessarily viewed as an rtt temperament |
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However, one can also map 3/2 to 14 degrees of 23-EDO without significantly increasing the error, taking us to a [[7-limit]] temperament where two 'broad 3/2's equals 7/3, meaning 28/27 is tempered out, and six 4/3's octave-reduced equals 5/4, meaning 4096/3645 is tempered out. Both of these are very large commas, so this is not at all an accurate temperament, but it is related to [[13edo|13-EDO]] and [[18edo|18-EDO]] and produces [[MOSScales|MOS scales]] of 5 and 8 notes: 5 5 4 5 4 (the [[3L 2s|"anti-pentatonic"]]) and 4 1 4 1 4 4 1 4 (the "quarter-tone" version of the Blackwood/[http://en.wikipedia.org/wiki/Paul_Rapoport_%28music_critic%29 Rapoport]/Wilson 13-EDO "subminor" scale). Alternatively we can treat this temperament as a 2.9.21 subgroup, and instead of calling 9 degrees of 23-EDO a Sub-"4/3", we can call it 21/16. Here three 21/16's gets us to 9/4, meaning 1029/1024 is tempered out. This allows us to treat a triad of 0-4-9 degrees of 23-EDO as an approximation to 16:18:21, and 0-5-9 as 1/(16:18:21); both of these triads are abundant in the 8-note MOS scale. | However, one can also map 3/2 to 14 degrees of 23-EDO without significantly increasing the error, taking us to a [[7-limit]] temperament where two 'broad 3/2's equals 7/3, meaning 28/27 is tempered out, and six 4/3's octave-reduced equals 5/4, meaning 4096/3645 is tempered out. Both of these are very large commas, so this is not at all an accurate temperament, but it is related to [[13edo|13-EDO]] and [[18edo|18-EDO]] and produces [[MOSScales|MOS scales]] of 5 and 8 notes: 5 5 4 5 4 (the [[3L 2s|"anti-pentatonic"]]) and 4 1 4 1 4 4 1 4 (the "quarter-tone" version of the Blackwood/[http://en.wikipedia.org/wiki/Paul_Rapoport_%28music_critic%29 Rapoport]/Wilson 13-EDO "subminor" scale). Alternatively we can treat this temperament as a 2.9.21 subgroup, and instead of calling 9 degrees of 23-EDO a Sub-"4/3", we can call it 21/16. Here three 21/16's gets us to 9/4, meaning 1029/1024 is tempered out. This allows us to treat a triad of 0-4-9 degrees of 23-EDO as an approximation to 16:18:21, and 0-5-9 as 1/(16:18:21); both of these triads are abundant in the 8-note MOS scale. | ||
===Differences between distributionally-even scales and smaller edos=== | |||
{| class="wikitable" | |||
|+ | |||
! N | |||
!L-Nedo | |||
!s-Nedo | |||
|- | |||
|2 | |||
|26.087¢ | |||
| -26.087¢ | |||
|- | |||
|3 | |||
|17.391¢ | |||
| -34.783¢ | |||
|- | |||
|4 | |||
|13.0435¢ | |||
| -39.13¢ | |||
|- | |||
|5 | |||
|20.87¢ | |||
| -31.314¢ | |||
|- | |||
|6 | |||
| 8.696¢ | |||
| -43.478¢ | |||
|- | |||
| 7 | |||
|37.267¢ | |||
| -14.907¢ | |||
|- | |||
|8 | |||
| 6.522¢ | |||
| -45.652¢ | |||
|- | |||
|9 | |||
|23.188¢ | |||
| -28.9855¢ | |||
|- | |||
|10 | |||
|36.522¢ | |||
| -15.652¢ | |||
|- | |||
|11 | |||
|47.431¢ | |||
| -4.743¢ | |||
|- | |||
|12 | |||
|4.348¢ | |||
| -47.826¢ | |||
|- | |||
|13 | |||
|12.04¢ | |||
| -40.134¢ | |||
|- | |||
|14 | |||
|18.6335¢ | |||
| -33.54¢ | |||
|- | |||
| 15 | |||
|24.348¢ | |||
| -27.826¢ | |||
|- | |||
|16 | |||
|29.348¢ | |||
| -22.826¢ | |||
|- | |||
| 17 | |||
|33.76¢ | |||
| -18.414¢ | |||
|- | |||
|18 | |||
|37.681¢ | |||
| -14.493¢ | |||
|- | |||
|19 | |||
|41.19¢ | |||
| -10.984¢ | |||
|- | |||
|20 | |||
|44.348¢ | |||
| -7.826¢ | |||
|- | |||
|21 | |||
|47.205¢ | |||
| -4.969¢ | |||
|- | |||
|22 | |||
|49.802¢ | |||
| -2.371¢ | |||
|} | |||
== Selected just intervals == | == Selected just intervals == | ||
{| class="wikitable center-all" | {| class="wikitable center-all" | ||