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| <h2>IMPORTED REVISION FROM WIKISPACES</h2>
| | Each [[Equal_division_of_the_octave|EDO]] has a finite number of distinct scales, assuming that the scales are equivalent up to cyclical permutation and that they are also irreducible. By irreducible is meant a scale that is not supported by a smaller EDO (e.g. 4424442, the diatonic scale in 24-EDO, is reducible because it is also contained in 12-EDO). |
| This is an imported revision from Wikispaces. The revision metadata is included below for reference:<br>
| |
| : This revision was by author [[User:Sarzadoce|Sarzadoce]] and made on <tt>2015-07-09 21:57:55 UTC</tt>.<br>
| |
| : The original revision id was <tt>555136119</tt>.<br>
| |
| : The revision comment was: <tt></tt><br>
| |
| The revision contents are below, presented both in the original Wikispaces Wikitext format, and in HTML exactly as Wikispaces rendered it.<br>
| |
| <h4>Original Wikitext content:</h4>
| |
| <div style="width:100%; max-height:400pt; overflow:auto; background-color:#f8f9fa; border: 1px solid #eaecf0; padding:0em"><pre style="margin:0px;border:none;background:none;word-wrap:break-word;white-space: pre-wrap ! important" class="old-revision-html">Each [[Equal division of the octave|EDO]] has a finite number of distinct scales, assuming that the scales are equivalent up to cyclical permutation and that they are also irreducible. By irreducible is meant a scale that is not supported by a smaller EDO (e.g. 4424442, the diatonic scale in 24-EDO, is reducible because it is also contained in 12-EDO).
| |
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| |
|
| Below is a table which counts every possible scale for a given EDO (columns) and number of steps/notes (rows). Note that the total number of scales for each EDO is given by OEIS entries [[http://oeis.org/A059966|A059966]] and [[http://oeis.org/A001037|A001037]]. | | Below is a table which counts every possible scale for a given EDO (columns) and number of steps/notes (rows). Note that the total number of scales for each EDO is given by {{OEIS|A059966}} and {{OEIS|A001037}}. |
|
| |
|
| | ==Breakdown of Scales by EDO and Number of Notes== |
|
| |
|
| ==Breakdown of Scales by EDO and Number of Notes== | | {| class="wikitable" |
| | ! colspan="2" rowspan="2"| |
| | ! colspan="16" |EDO |
| | |- |
| | | | 1 |
| | | | 2 |
| | | | 3 |
| | | | 4 |
| | | | 5 |
| | | | 6 |
| | | | 7 |
| | | | 8 |
| | | | 9 |
| | | | 10 |
| | | | 11 |
| | | | 12 |
| | | | 13 |
| | | | 14 |
| | | | 15 |
| | | | 16 |
| | |- |
| | ! rowspan="16"| N |
| | | | 1 |
| | | | 1 |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | |- |
| | | | 2 |
| | | | |
| | | | 1 |
| | | | 1 |
| | | | 1 |
| | | | 2 |
| | | | 1 |
| | | | 3 |
| | | | 2 |
| | | | 3 |
| | | | 2 |
| | | | 5 |
| | | | 2 |
| | | | 6 |
| | | | 3 |
| | | | 4 |
| | | | 4 |
| | |- |
| | | | 3 |
| | | | |
| | | | |
| | | | 1 |
| | | | 1 |
| | | | 2 |
| | | | 3 |
| | | | 5 |
| | | | 6 |
| | | | 9 |
| | | | 10 |
| | | | 15 |
| | | | 14 |
| | | | 22 |
| | | | 21 |
| | | | 28 |
| | | | 28 |
| | |- |
| | | | 4 |
| | | | |
| | | | |
| | | | |
| | | | 1 |
| | | | 1 |
| | | | 3 |
| | | | 5 |
| | | | 9 |
| | | | 14 |
| | | | 21 |
| | | | 30 |
| | | | 39 |
| | | | 55 |
| | | | 68 |
| | | | 90 |
| | | | 106 |
| | |- |
| | | | 5 |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | 1 |
| | | | 1 |
| | | | 3 |
| | | | 7 |
| | | | 14 |
| | | | 25 |
| | | | 42 |
| | | | 65 |
| | | | 99 |
| | | | 140 |
| | | | 200 |
| | | | 266 |
| | |- |
| | | | 6 |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | 1 |
| | | | 1 |
| | | | 4 |
| | | | 10 |
| | | | 22 |
| | | | 42 |
| | | | 79 |
| | | | 132 |
| | | | 216 |
| | | | 335 |
| | | | 500 |
| | |- |
| | | | 7 |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | 1 |
| | | | 1 |
| | | | 4 |
| | | | 12 |
| | | | 30 |
| | | | 66 |
| | | | 132 |
| | | | 245 |
| | | | 429 |
| | | | 714 |
| | |- |
| | | | 8 |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | 1 |
| | | | 1 |
| | | | 5 |
| | | | 15 |
| | | | 43 |
| | | | 99 |
| | | | 217 |
| | | | 429 |
| | | | 809 |
| | |- |
| | | | 9 |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | 1 |
| | | | 1 |
| | | | 5 |
| | | | 19 |
| | | | 55 |
| | | | 143 |
| | | | 335 |
| | | | 715 |
| | |- |
| | | | 10 |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | 1 |
| | | | 1 |
| | | | 6 |
| | | | 22 |
| | | | 73 |
| | | | 201 |
| | | | 504 |
| | |- |
| | | | 11 |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | 1 |
| | | | 1 |
| | | | 6 |
| | | | 26 |
| | | | 91 |
| | | | 273 |
| | |- |
| | | | 12 |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | 1 |
| | | | 1 |
| | | | 7 |
| | | | 31 |
| | | | 116 |
| | |- |
| | | | 13 |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | 1 |
| | | | 1 |
| | | | 7 |
| | | | 35 |
| | |- |
| | | | 14 |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | 1 |
| | | | 1 |
| | | | 8 |
| | |- |
| | | | 15 |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | 1 |
| | | | 1 |
| | |- |
| | | | 16 |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | |
| | | | 1 |
| | |- |
| | | colspan="2"| Total |
| | | | 1 |
| | | | 1 |
| | | | 2 |
| | | | 3 |
| | | | 6 |
| | | | 9 |
| | | | 18 |
| | | | 30 |
| | | | 56 |
| | | | 99 |
| | | | 186 |
| | | | 335 |
| | | | 630 |
| | | | 1161 |
| | | | 2182 |
| | | | 4080 |
| | |} |
|
| |
|
| || || || || || || || || || || || EDO || || || || || || || ||
| | ==Breakdown of Scales by EDO Only== |
| || || || 1 || 2 || 3 || 4 || 5 || 6 || 7 || 8 || 9 || 10 || 11 || 12 || 13 || 14 || 15 || 16 ||
| |
| || || 1 || 1 || || || || || || || || || || || || || || || ||
| |
| || || 2 || || 1 || 1 || 1 || 2 || 1 || 3 || 2 || 3 || 2 || 5 || 2 || 6 || 3 || 4 || 4 ||
| |
| || || 3 || || || 1 || 1 || 2 || 3 || 5 || 6 || 9 || 10 || 15 || 14 || 22 || 21 || 28 || 28 ||
| |
| || || 4 || || || || 1 || 1 || 3 || 5 || 9 || 14 || 21 || 30 || 39 || 55 || 68 || 90 || 106 ||
| |
| || || 5 || || || || || 1 || 1 || 3 || 7 || 14 || 25 || 42 || 65 || 99 || 140 || 200 || 266 ||
| |
| || || 6 || || || || || || 1 || 1 || 4 || 10 || 22 || 42 || 79 || 132 || 216 || 335 || 500 ||
| |
| || || 7 || || || || || || || 1 || 1 || 4 || 12 || 30 || 66 || 132 || 245 || 429 || 714 ||
| |
| || N || 8 || || || || || || || || 1 || 1 || 5 || 15 || 43 || 99 || 217 || 429 || 809 ||
| |
| || || 9 || || || || || || || || || 1 || 1 || 5 || 19 || 55 || 143 || 335 || 715 ||
| |
| || || 10 || || || || || || || || || || 1 || 1 || 6 || 22 || 73 || 201 || 504 ||
| |
| || || 11 || || || || || || || || || || || 1 || 1 || 6 || 26 || 91 || 273 ||
| |
| || || 12 || || || || || || || || || || || || 1 || 1 || 7 || 31 || 116 ||
| |
| || || 13 || || || || || || || || || || || || || 1 || 1 || 7 || 35 ||
| |
| || || 14 || || || || || || || || || || || || || || 1 || 1 || 8 ||
| |
| || || 15 || || || || || || || || || || || || || || || 1 || 1 ||
| |
| || || 16 || || || || || || || || || || || || || || || || 1 ||
| |
| || || || || || || || || || || || || || || || || || || ||
| |
| || || Total || 1 || 1 || 2 || 3 || 6 || 9 || 18 || 30 || 56 || 99 || 186 || 335 || 630 || 1161 || 2182 || 4080 ||
| |
|
| |
|
| (if someone could format this table a little better, it would be greatly appreciated)
| | {| class="wikitable" |
| | |- |
| | | | n-EDO |
| | | | Number of Scales |
|
| |
|
| | in n-EDO |
| | | | Number of Scales |
|
| |
|
| ==Breakdown of Scales by EDO Only==
| | ''up to'' n-EDO |
| | |- |
| | | | n |
| | | | f(n) |
| | | | g(n) |
| | |- |
| | | | 1 |
| | | | 1 |
| | | | 1 |
| | |- |
| | | | 2 |
| | | | 1 |
| | | | 2 |
| | |- |
| | | | 3 |
| | | | 2 |
| | | | 4 |
| | |- |
| | | | 4 |
| | | | 3 |
| | | | 7 |
| | |- |
| | | | 5 |
| | | | 6 |
| | | | 13 |
| | |- |
| | | | 6 |
| | | | 9 |
| | | | 22 |
| | |- |
| | | | 7 |
| | | | 18 |
| | | | 40 |
| | |- |
| | | | 8 |
| | | | 30 |
| | | | 70 |
| | |- |
| | | | 9 |
| | | | 56 |
| | | | 126 |
| | |- |
| | | | 10 |
| | | | 99 |
| | | | 225 |
| | |- |
| | | | 11 |
| | | | 186 |
| | | | 411 |
| | |- |
| | | | 12 |
| | | | 335 |
| | | | 746 |
| | |- |
| | | | 13 |
| | | | 630 |
| | | | 1376 |
| | |- |
| | | | 14 |
| | | | 1161 |
| | | | 2537 |
| | |- |
| | | | 15 |
| | | | 2182 |
| | | | 4719 |
| | |- |
| | | | 16 |
| | | | 4080 |
| | | | 8799 |
| | |- |
| | | | 17 |
| | | | 7710 |
| | | | 16509 |
| | |- |
| | | | 18 |
| | | | 14532 |
| | | | 31041 |
| | |- |
| | | | 19 |
| | | | 27594 |
| | | | 58635 |
| | |- |
| | | | 20 |
| | | | 52377 |
| | | | 111012 |
| | |} |
|
| |
|
| || n-EDO || Number of Scales
| | <math>f(n) = \displaystyle \sum \limits_{d \mid n} \mu(n/d) (2^{n} - 1)</math> |
| in n-EDO || Number of Scales
| |
| //up to// n-EDO ||
| |
| || n || f(n) || g(n) ||
| |
| || 1 || 1 || 1 ||
| |
| || 2 || 1 || 2 ||
| |
| || 3 || 2 || 4 ||
| |
| || 4 || 3 || 7 ||
| |
| || 5 || 6 || 13 ||
| |
| || 6 || 9 || 22 ||
| |
| || 7 || 18 || 40 ||
| |
| || 8 || 30 || 70 ||
| |
| || 9 || 56 || 126 ||
| |
| || 10 || 99 || 225 ||
| |
| || 11 || 186 || 411 ||
| |
| || 12 || 335 || 746 ||
| |
| || 13 || 630 || 1376 ||
| |
| || 14 || 1161 || 2537 ||
| |
| || 15 || 2182 || 4719 ||
| |
| || 16 || 4080 || 8799 ||
| |
| || 17 || 7710 || 16509 ||
| |
| || 18 || 14532 || 31041 ||
| |
| || 19 || 27594 || 58635 ||
| |
| || 20 || 52377 || 111012 ||
| |
|
| |
|
| [[math]]
| | <math>g(n) = \displaystyle \sum \limits_{m=1}^{n} \displaystyle \sum \limits_{d \mid m} \mu(m/d) (2^{m} - 1)</math> |
| f(n) = \displaystyle \sum \limits_{d \mid n} \mu(n/d) (2^{n} - 1)
| |
| [[math]]
| |
|
| |
|
| [[math]]
| | ==List of Scales up to 10-EDO:== |
| g(n) = \displaystyle \sum \limits_{m=1}^{n} \displaystyle \sum \limits_{d \mid m} \mu(m/d) (2^{m} - 1)
| |
| [[math]]
| |
|
| |
|
| | <span style="line-height: 1.5;"> ∆ EDO (Variety = 1)</span> |
|
| |
|
| ==List of Scales up to 10-EDO:== | | <span style="line-height: 1.5;"> ◊◊ Multi-MOS (Max Variety = 2)</span> |
|
| |
|
| <span style="line-height: 1.5;"> ∆ EDO (Variety = 1)</span>
| |
| <span style="line-height: 1.5;"> ◊◊ Multi-MOS (Max Variety = 2)</span>
| |
| †† Strict MOS (Variety = 2) | | †† Strict MOS (Variety = 2) |
|
| |
|
| ===1-EDO Scales=== | | ===1-EDO Scales=== |
|
| |
|
| 1 ∆ | | 1 ∆ |
|
| |
|
| ===2-EDO Scales=== | | ===2-EDO Scales=== |
|
| |
|
| 11 ∆ | | 11 ∆ |
|
| |
|
| ===3-EDO Scales=== | | ===3-EDO Scales=== |
|
| |
|
| 21 †† | | 21 †† |
| | |
| 111 ∆ | | 111 ∆ |
|
| |
|
| ===4-EDO Scales=== | | ===4-EDO Scales=== |
|
| |
|
| 31 †† | | 31 †† |
| | |
| 211 †† | | 211 †† |
| | |
| 1111 ∆ | | 1111 ∆ |
|
| |
|
| ===5-EDO Scales=== | | ===5-EDO Scales=== |
|
| |
|
| 32 †† | | 32 †† |
| | |
| 41 †† | | 41 †† |
| | |
| 221 †† | | 221 †† |
| | |
| 311 †† | | 311 †† |
| | |
| 2111 †† | | 2111 †† |
| | |
| 11111 ∆ | | 11111 ∆ |
|
| |
|
| ===6-EDO Scales=== | | ===6-EDO Scales=== |
|
| |
|
| 51 †† | | 51 †† |
| | |
| 312 | | 312 |
| | |
| 321 | | 321 |
| | |
| 411 †† | | 411 †† |
| | |
| 2121 ◊◊ | | 2121 ◊◊ |
| | |
| 2211 | | 2211 |
| | |
| 3111 †† | | 3111 †† |
| | |
| 21111 †† | | 21111 †† |
| | |
| 111111 ∆ | | 111111 ∆ |
|
| |
|
| ===7-EDO Scales=== | | ===7-EDO Scales=== |
|
| |
|
| 43 †† | | 43 †† |
| | |
| 52 †† | | 52 †† |
| | |
| 61 †† | | 61 †† |
| | |
| 322 †† | | 322 †† |
| | |
| 331 †† | | 331 †† |
| | |
| 412 | | 412 |
| | |
| 421 | | 421 |
| | |
| 511 †† | | 511 †† |
| | |
| 2221 †† | | 2221 †† |
| | |
| 3112 | | 3112 |
| | |
| 3121 | | 3121 |
| | |
| 3211 | | 3211 |
| | |
| 4111 †† | | 4111 †† |
| | |
| 21211 †† | | 21211 †† |
| | |
| 22111 | | 22111 |
| | |
| 31111 †† | | 31111 †† |
| | |
| 211111 †† | | 211111 †† |
| | |
| 1111111 ∆ | | 1111111 ∆ |
|
| |
|
| ===8-EDO Scales=== | | ===8-EDO Scales=== |
|
| |
|
| 53 †† | | 53 †† |
| | |
| 71 †† | | 71 †† |
| | |
| 332 †† | | 332 †† |
| | |
| 413 | | 413 |
| | |
| 431 | | 431 |
| | |
| 512 | | 512 |
| | |
| 521 | | 521 |
| | |
| 611 †† | | 611 †† |
| | |
| 3122 | | 3122 |
| | |
| 3131 ◊◊ | | 3131 ◊◊ |
| | |
| 3212 | | 3212 |
| | |
| 3221 | | 3221 |
| | |
| 3311 | | 3311 |
| | |
| 4112 | | 4112 |
| | |
| 4121 | | 4121 |
| | |
| 4211 | | 4211 |
| | |
| 5111 †† | | 5111 †† |
| | |
| 22121 †† | | 22121 †† |
| | |
| 22211 | | 22211 |
| | |
| 31112 | | 31112 |
| | |
| 31121 | | 31121 |
| | |
| 31211 | | 31211 |
| | |
| 32111 | | 32111 |
| | |
| 41111 †† | | 41111 †† |
| | |
| 211211 ◊◊ | | 211211 ◊◊ |
| | |
| 212111 | | 212111 |
| | |
| 221111 | | 221111 |
| | |
| 311111 †† | | 311111 †† |
| | |
| 2111111 †† | | 2111111 †† |
| | |
| 11111111 ∆ | | 11111111 ∆ |
|
| |
|
| ===9-EDO Scales=== | | ===9-EDO Scales=== |
|
| |
|
| 54 †† | | 54 †† |
| | |
| 72 †† | | 72 †† |
| | |
| 81 †† | | 81 †† |
| | |
| 423 | | 423 |
| | |
| 432 | | 432 |
| | |
| 441 †† | | 441 †† |
| | |
| 513 | | 513 |
| | |
| 522 †† | | 522 †† |
| | |
| 531 | | 531 |
| | |
| 612 | | 612 |
| | |
| 621 | | 621 |
| | |
| 711 †† | | 711 †† |
| | |
| 3222 †† | | 3222 †† |
| | |
| 3231 | | 3231 |
| | |
| 3312 | | 3312 |
| | |
| 3321 | | 3321 |
| | |
| 4113 | | 4113 |
| | |
| 4122 | | 4122 |
| | |
| 4131 | | 4131 |
| | |
| 4212 | | 4212 |
| | |
| 4221 | | 4221 |
| | |
| 4311 | | 4311 |
| | |
| 5112 | | 5112 |
| | |
| 5121 | | 5121 |
| | |
| 5211 | | 5211 |
| | |
| 6111 †† | | 6111 †† |
| | |
| 22221 †† | | 22221 †† |
| | |
| 31122 | | 31122 |
| | |
| 31212 | | 31212 |
| | |
| 31221 | | 31221 |
| | |
| 31311 †† | | 31311 †† |
| | |
| 32112 | | 32112 |
| | |
| 32121 | | 32121 |
| | |
| 32211 | | 32211 |
| | |
| 33111 | | 33111 |
| | |
| 41112 | | 41112 |
| | |
| 41121 | | 41121 |
| | |
| 41211 | | 41211 |
| | |
| 42111 | | 42111 |
| | |
| 51111 †† | | 51111 †† |
| | |
| 212121 ◊◊ | | 212121 ◊◊ |
| | |
| 221121 | | 221121 |
| | |
| 221211 | | 221211 |
| | |
| 222111 | | 222111 |
| | |
| 311112 | | 311112 |
| | |
| 311121 | | 311121 |
| | |
| 311211 | | 311211 |
| | |
| 312111 | | 312111 |
| | |
| 321111 | | 321111 |
| | |
| 411111 †† | | 411111 †† |
| | |
| 2112111 †† | | 2112111 †† |
| | |
| 2121111 | | 2121111 |
| | |
| 2211111 | | 2211111 |
| | |
| 3111111 †† | | 3111111 †† |
| | |
| 21111111 †† | | 21111111 †† |
| | |
| 111111111 ∆ | | 111111111 ∆ |
|
| |
|
| ===10-EDO Scales=== | | ===10-EDO Scales=== |
|
| |
|
| 73 †† | | 73 †† |
| | |
| 91 †† | | 91 †† |
| | |
| 433 †† | | 433 †† |
| | |
| 514 | | 514 |
| | |
| 523 | | 523 |
| | |
| 532 | | 532 |
| | |
| 541 | | 541 |
| | |
| 613 | | 613 |
| | |
| 631 | | 631 |
| | |
| 712 | | 712 |
| | |
| 721 | | 721 |
| | |
| 811 †† | | 811 †† |
| | |
| 3232 ◊◊ | | 3232 ◊◊ |
| | |
| 3322 | | 3322 |
| | |
| 3331 †† | | 3331 †† |
| | |
| 4123 | | 4123 |
| | |
| 4132 | | 4132 |
| | |
| 4141 ◊◊ | | 4141 ◊◊ |
| | |
| 4213 | | 4213 |
| | |
| 4231 | | 4231 |
| | |
| 4312 | | 4312 |
| | |
| 4321 | | 4321 |
| | |
| 4411 | | 4411 |
| | |
| 5113 | | 5113 |
| | |
| 5122 | | 5122 |
| | |
| 5131 | | 5131 |
| | |
| 5212 | | 5212 |
| | |
| 5221 | | 5221 |
| | |
| 5311 | | 5311 |
| | |
| 6112 | | 6112 |
| | |
| 6121 | | 6121 |
| | |
| 6211 | | 6211 |
| | |
| 7111 †† | | 7111 †† |
| | |
| 31222 | | 31222 |
| | |
| 31312 | | 31312 |
| | |
| 32122 | | 32122 |
| | |
| 32131 | | 32131 |
| | |
| 32212 | | 32212 |
| | |
| 32221 | | 32221 |
| | |
| 32311 | | 32311 |
| | |
| 33112 | | 33112 |
| | |
| 33121 | | 33121 |
| | |
| 33211 | | 33211 |
| | |
| 41113 | | 41113 |
| | |
| 41122 | | 41122 |
| | |
| 41131 | | 41131 |
| | |
| 41212 | | 41212 |
| | |
| 41221 | | 41221 |
| | |
| 41311 | | 41311 |
| | |
| 42112 | | 42112 |
| | |
| 42121 | | 42121 |
| | |
| 42211 | | 42211 |
| | |
| 43111 | | 43111 |
| | |
| 51112 | | 51112 |
| | |
| 51121 | | 51121 |
| | |
| 51211 | | 51211 |
| | |
| 52111 | | 52111 |
| | |
| 61111 †† | | 61111 †† |
| | |
| 221221 ◊◊ | | 221221 ◊◊ |
| | |
| 222121 | | 222121 |
| | |
| 222211 | | 222211 |
| | |
| 311122 | | 311122 |
| | |
| 311212 | | 311212 |
| | |
| 311221 | | 311221 |
| | |
| 311311 ◊◊ | | 311311 ◊◊ |
| | |
| 312112 | | 312112 |
| | |
| 312121 | | 312121 |
| | |
| 312211 | | 312211 |
| | |
| 313111 | | 313111 |
| | |
| 321112 | | 321112 |
| | |
| 321121 | | 321121 |
| | |
| 321211 | | 321211 |
| | |
| 322111 | | 322111 |
| | |
| 331111 | | 331111 |
| | |
| 411112 | | 411112 |
| | |
| 411121 | | 411121 |
| | |
| 411211 | | 411211 |
| | |
| 412111 | | 412111 |
| | |
| 421111 | | 421111 |
| | |
| 511111 †† | | 511111 †† |
| | |
| 2121211 †† | | 2121211 †† |
| | |
| 2211121 | | 2211121 |
| | |
| 2211211 | | 2211211 |
| | |
| 2212111 | | 2212111 |
| | |
| 2221111 | | 2221111 |
| | |
| 3111112 | | 3111112 |
| | |
| 3111121 | | 3111121 |
| | |
| 3111211 | | 3111211 |
| | |
| 3112111 | | 3112111 |
| | |
| 3121111 | | 3121111 |
| | |
| 3211111 | | 3211111 |
| | |
| 4111111 †† | | 4111111 †† |
| | |
| 21112111 ◊◊ | | 21112111 ◊◊ |
| | |
| 21121111 | | 21121111 |
| | |
| 21211111 | | 21211111 |
| | |
| 22111111 | | 22111111 |
| | |
| 31111111 †† | | 31111111 †† |
| | |
| 211111111 †† | | 211111111 †† |
| 1111111111 ∆</pre></div>
| |
| <h4>Original HTML content:</h4>
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| <div style="width:100%; max-height:400pt; overflow:auto; background-color:#f8f9fa; border: 1px solid #eaecf0; padding:0em"><pre style="margin:0px;border:none;background:none;word-wrap:break-word;width:200%;white-space: pre-wrap ! important" class="old-revision-html"><html><head><title>Distinct EDO Scales</title></head><body>Each <a class="wiki_link" href="/Equal%20division%20of%20the%20octave">EDO</a> has a finite number of distinct scales, assuming that the scales are equivalent up to cyclical permutation and that they are also irreducible. By irreducible is meant a scale that is not supported by a smaller EDO (e.g. 4424442, the diatonic scale in 24-EDO, is reducible because it is also contained in 12-EDO).<br />
| |
| <br />
| |
| Below is a table which counts every possible scale for a given EDO (columns) and number of steps/notes (rows). Note that the total number of scales for each EDO is given by OEIS entries <a class="wiki_link_ext" href="http://oeis.org/A059966" rel="nofollow">A059966</a> and <a class="wiki_link_ext" href="http://oeis.org/A001037" rel="nofollow">A001037</a>.<br />
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| <br />
| |
| <br />
| |
| <!-- ws:start:WikiTextHeadingRule:2:&lt;h2&gt; --><h2 id="toc0"><a name="x-Breakdown of Scales by EDO and Number of Notes"></a><!-- ws:end:WikiTextHeadingRule:2 -->Breakdown of Scales by EDO and Number of Notes</h2>
| |
| <br />
| |
|
| |
|
| |
| <table class="wiki_table">
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>EDO<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>1<br />
| |
| </td>
| |
| <td>2<br />
| |
| </td>
| |
| <td>3<br />
| |
| </td>
| |
| <td>4<br />
| |
| </td>
| |
| <td>5<br />
| |
| </td>
| |
| <td>6<br />
| |
| </td>
| |
| <td>7<br />
| |
| </td>
| |
| <td>8<br />
| |
| </td>
| |
| <td>9<br />
| |
| </td>
| |
| <td>10<br />
| |
| </td>
| |
| <td>11<br />
| |
| </td>
| |
| <td>12<br />
| |
| </td>
| |
| <td>13<br />
| |
| </td>
| |
| <td>14<br />
| |
| </td>
| |
| <td>15<br />
| |
| </td>
| |
| <td>16<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td>1<br />
| |
| </td>
| |
| <td>1<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td>2<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>1<br />
| |
| </td>
| |
| <td>1<br />
| |
| </td>
| |
| <td>1<br />
| |
| </td>
| |
| <td>2<br />
| |
| </td>
| |
| <td>1<br />
| |
| </td>
| |
| <td>3<br />
| |
| </td>
| |
| <td>2<br />
| |
| </td>
| |
| <td>3<br />
| |
| </td>
| |
| <td>2<br />
| |
| </td>
| |
| <td>5<br />
| |
| </td>
| |
| <td>2<br />
| |
| </td>
| |
| <td>6<br />
| |
| </td>
| |
| <td>3<br />
| |
| </td>
| |
| <td>4<br />
| |
| </td>
| |
| <td>4<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td>3<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>1<br />
| |
| </td>
| |
| <td>1<br />
| |
| </td>
| |
| <td>2<br />
| |
| </td>
| |
| <td>3<br />
| |
| </td>
| |
| <td>5<br />
| |
| </td>
| |
| <td>6<br />
| |
| </td>
| |
| <td>9<br />
| |
| </td>
| |
| <td>10<br />
| |
| </td>
| |
| <td>15<br />
| |
| </td>
| |
| <td>14<br />
| |
| </td>
| |
| <td>22<br />
| |
| </td>
| |
| <td>21<br />
| |
| </td>
| |
| <td>28<br />
| |
| </td>
| |
| <td>28<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td>4<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>1<br />
| |
| </td>
| |
| <td>1<br />
| |
| </td>
| |
| <td>3<br />
| |
| </td>
| |
| <td>5<br />
| |
| </td>
| |
| <td>9<br />
| |
| </td>
| |
| <td>14<br />
| |
| </td>
| |
| <td>21<br />
| |
| </td>
| |
| <td>30<br />
| |
| </td>
| |
| <td>39<br />
| |
| </td>
| |
| <td>55<br />
| |
| </td>
| |
| <td>68<br />
| |
| </td>
| |
| <td>90<br />
| |
| </td>
| |
| <td>106<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td>5<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>1<br />
| |
| </td>
| |
| <td>1<br />
| |
| </td>
| |
| <td>3<br />
| |
| </td>
| |
| <td>7<br />
| |
| </td>
| |
| <td>14<br />
| |
| </td>
| |
| <td>25<br />
| |
| </td>
| |
| <td>42<br />
| |
| </td>
| |
| <td>65<br />
| |
| </td>
| |
| <td>99<br />
| |
| </td>
| |
| <td>140<br />
| |
| </td>
| |
| <td>200<br />
| |
| </td>
| |
| <td>266<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td>6<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>1<br />
| |
| </td>
| |
| <td>1<br />
| |
| </td>
| |
| <td>4<br />
| |
| </td>
| |
| <td>10<br />
| |
| </td>
| |
| <td>22<br />
| |
| </td>
| |
| <td>42<br />
| |
| </td>
| |
| <td>79<br />
| |
| </td>
| |
| <td>132<br />
| |
| </td>
| |
| <td>216<br />
| |
| </td>
| |
| <td>335<br />
| |
| </td>
| |
| <td>500<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td>7<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>1<br />
| |
| </td>
| |
| <td>1<br />
| |
| </td>
| |
| <td>4<br />
| |
| </td>
| |
| <td>12<br />
| |
| </td>
| |
| <td>30<br />
| |
| </td>
| |
| <td>66<br />
| |
| </td>
| |
| <td>132<br />
| |
| </td>
| |
| <td>245<br />
| |
| </td>
| |
| <td>429<br />
| |
| </td>
| |
| <td>714<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td>N<br />
| |
| </td>
| |
| <td>8<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>1<br />
| |
| </td>
| |
| <td>1<br />
| |
| </td>
| |
| <td>5<br />
| |
| </td>
| |
| <td>15<br />
| |
| </td>
| |
| <td>43<br />
| |
| </td>
| |
| <td>99<br />
| |
| </td>
| |
| <td>217<br />
| |
| </td>
| |
| <td>429<br />
| |
| </td>
| |
| <td>809<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td>9<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>1<br />
| |
| </td>
| |
| <td>1<br />
| |
| </td>
| |
| <td>5<br />
| |
| </td>
| |
| <td>19<br />
| |
| </td>
| |
| <td>55<br />
| |
| </td>
| |
| <td>143<br />
| |
| </td>
| |
| <td>335<br />
| |
| </td>
| |
| <td>715<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td>10<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>1<br />
| |
| </td>
| |
| <td>1<br />
| |
| </td>
| |
| <td>6<br />
| |
| </td>
| |
| <td>22<br />
| |
| </td>
| |
| <td>73<br />
| |
| </td>
| |
| <td>201<br />
| |
| </td>
| |
| <td>504<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td>11<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>1<br />
| |
| </td>
| |
| <td>1<br />
| |
| </td>
| |
| <td>6<br />
| |
| </td>
| |
| <td>26<br />
| |
| </td>
| |
| <td>91<br />
| |
| </td>
| |
| <td>273<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td>12<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>1<br />
| |
| </td>
| |
| <td>1<br />
| |
| </td>
| |
| <td>7<br />
| |
| </td>
| |
| <td>31<br />
| |
| </td>
| |
| <td>116<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td>13<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>1<br />
| |
| </td>
| |
| <td>1<br />
| |
| </td>
| |
| <td>7<br />
| |
| </td>
| |
| <td>35<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td>14<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>1<br />
| |
| </td>
| |
| <td>1<br />
| |
| </td>
| |
| <td>8<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td>15<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>1<br />
| |
| </td>
| |
| <td>1<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td>16<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>1<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td>Total<br />
| |
| </td>
| |
| <td>1<br />
| |
| </td>
| |
| <td>1<br />
| |
| </td>
| |
| <td>2<br />
| |
| </td>
| |
| <td>3<br />
| |
| </td>
| |
| <td>6<br />
| |
| </td>
| |
| <td>9<br />
| |
| </td>
| |
| <td>18<br />
| |
| </td>
| |
| <td>30<br />
| |
| </td>
| |
| <td>56<br />
| |
| </td>
| |
| <td>99<br />
| |
| </td>
| |
| <td>186<br />
| |
| </td>
| |
| <td>335<br />
| |
| </td>
| |
| <td>630<br />
| |
| </td>
| |
| <td>1161<br />
| |
| </td>
| |
| <td>2182<br />
| |
| </td>
| |
| <td>4080<br />
| |
| </td>
| |
| </tr>
| |
| </table>
| |
|
| |
| <br />
| |
| (if someone could format this table a little better, it would be greatly appreciated)<br />
| |
| <br />
| |
| <br />
| |
| <!-- ws:start:WikiTextHeadingRule:4:&lt;h2&gt; --><h2 id="toc1"><a name="x-Breakdown of Scales by EDO Only"></a><!-- ws:end:WikiTextHeadingRule:4 -->Breakdown of Scales by EDO Only</h2>
| |
| <br />
| |
|
| |
|
| |
|
| <table class="wiki_table">
| | 1111111111 ∆ |
| <tr>
| |
| <td>n-EDO<br />
| |
| </td>
| |
| <td>Number of Scales<br />
| |
| in n-EDO<br />
| |
| </td>
| |
| <td>Number of Scales<br />
| |
| <em>up to</em> n-EDO<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td>n<br />
| |
| </td>
| |
| <td>f(n)<br />
| |
| </td>
| |
| <td>g(n)<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td>1<br />
| |
| </td>
| |
| <td>1<br />
| |
| </td>
| |
| <td>1<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td>2<br />
| |
| </td>
| |
| <td>1<br />
| |
| </td>
| |
| <td>2<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td>3<br />
| |
| </td>
| |
| <td>2<br />
| |
| </td>
| |
| <td>4<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td>4<br />
| |
| </td>
| |
| <td>3<br />
| |
| </td>
| |
| <td>7<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td>5<br />
| |
| </td>
| |
| <td>6<br />
| |
| </td>
| |
| <td>13<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td>6<br />
| |
| </td>
| |
| <td>9<br />
| |
| </td>
| |
| <td>22<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td>7<br />
| |
| </td>
| |
| <td>18<br />
| |
| </td>
| |
| <td>40<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td>8<br />
| |
| </td>
| |
| <td>30<br />
| |
| </td>
| |
| <td>70<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td>9<br />
| |
| </td>
| |
| <td>56<br />
| |
| </td>
| |
| <td>126<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td>10<br />
| |
| </td>
| |
| <td>99<br />
| |
| </td>
| |
| <td>225<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td>11<br />
| |
| </td>
| |
| <td>186<br />
| |
| </td>
| |
| <td>411<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td>12<br />
| |
| </td>
| |
| <td>335<br />
| |
| </td>
| |
| <td>746<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td>13<br />
| |
| </td>
| |
| <td>630<br />
| |
| </td>
| |
| <td>1376<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td>14<br />
| |
| </td>
| |
| <td>1161<br />
| |
| </td>
| |
| <td>2537<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td>15<br />
| |
| </td>
| |
| <td>2182<br />
| |
| </td>
| |
| <td>4719<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td>16<br />
| |
| </td>
| |
| <td>4080<br />
| |
| </td>
| |
| <td>8799<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td>17<br />
| |
| </td>
| |
| <td>7710<br />
| |
| </td>
| |
| <td>16509<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td>18<br />
| |
| </td>
| |
| <td>14532<br />
| |
| </td>
| |
| <td>31041<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td>19<br />
| |
| </td>
| |
| <td>27594<br />
| |
| </td>
| |
| <td>58635<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td>20<br />
| |
| </td>
| |
| <td>52377<br />
| |
| </td>
| |
| <td>111012<br />
| |
| </td>
| |
| </tr>
| |
| </table>
| |
|
| |
|
| <br />
| | {{Navbox scale gallery}} |
| <!-- ws:start:WikiTextMathRule:0:
| | [[Category:EDO theory pages]] |
| [[math]]&lt;br/&gt;
| | [[Category:Lists of scales]] |
| f(n) = \displaystyle \sum \limits_{d \mid n} \mu(n/d) (2^{n} - 1)&lt;br/&gt;[[math]]
| |
| --><script type="math/tex">f(n) = \displaystyle \sum \limits_{d \mid n} \mu(n/d) (2^{n} - 1)</script><!-- ws:end:WikiTextMathRule:0 --><br />
| |
| <br />
| |
| <!-- ws:start:WikiTextMathRule:1:
| |
| [[math]]&lt;br/&gt; | |
| g(n) = \displaystyle \sum \limits_{m=1}^{n} \displaystyle \sum \limits_{d \mid m} \mu(m/d) (2^{m} - 1)&lt;br/&gt;[[math]]
| |
| --><script type="math/tex">g(n) = \displaystyle \sum \limits_{m=1}^{n} \displaystyle \sum \limits_{d \mid m} \mu(m/d) (2^{m} - 1)</script><!-- ws:end:WikiTextMathRule:1 --><br />
| |
| <br />
| |
| <br />
| |
| <!-- ws:start:WikiTextHeadingRule:6:&lt;h2&gt; --><h2 id="toc2"><a name="x-List of Scales up to 10-EDO:"></a><!-- ws:end:WikiTextHeadingRule:6 -->List of Scales up to 10-EDO:</h2>
| |
| <br />
| |
| <span style="line-height: 1.5;"> ∆ EDO (Variety = 1)</span><br />
| |
| <span style="line-height: 1.5;"> ◊◊ Multi-MOS (Max Variety = 2)</span><br />
| |
| †† Strict MOS (Variety = 2)<br />
| |
| <br />
| |
| <!-- ws:start:WikiTextHeadingRule:8:&lt;h3&gt; --><h3 id="toc3"><a name="x-List of Scales up to 10-EDO:-1-EDO Scales"></a><!-- ws:end:WikiTextHeadingRule:8 -->1-EDO Scales</h3>
| |
| <br />
| |
| 1 ∆<br />
| |
| <br />
| |
| <!-- ws:start:WikiTextHeadingRule:10:&lt;h3&gt; --><h3 id="toc4"><a name="x-List of Scales up to 10-EDO:-2-EDO Scales"></a><!-- ws:end:WikiTextHeadingRule:10 -->2-EDO Scales</h3>
| |
| <br />
| |
| 11 ∆<br />
| |
| <br />
| |
| <!-- ws:start:WikiTextHeadingRule:12:&lt;h3&gt; --><h3 id="toc5"><a name="x-List of Scales up to 10-EDO:-3-EDO Scales"></a><!-- ws:end:WikiTextHeadingRule:12 -->3-EDO Scales</h3>
| |
| <br />
| |
| 21 ††<br />
| |
| 111 ∆<br />
| |
| <br />
| |
| <!-- ws:start:WikiTextHeadingRule:14:&lt;h3&gt; --><h3 id="toc6"><a name="x-List of Scales up to 10-EDO:-4-EDO Scales"></a><!-- ws:end:WikiTextHeadingRule:14 -->4-EDO Scales</h3>
| |
| <br />
| |
| 31 ††<br />
| |
| 211 ††<br />
| |
| 1111 ∆<br />
| |
| <br />
| |
| <!-- ws:start:WikiTextHeadingRule:16:&lt;h3&gt; --><h3 id="toc7"><a name="x-List of Scales up to 10-EDO:-5-EDO Scales"></a><!-- ws:end:WikiTextHeadingRule:16 -->5-EDO Scales</h3>
| |
| <br />
| |
| 32 ††<br />
| |
| 41 ††<br />
| |
| 221 ††<br />
| |
| 311 ††<br />
| |
| 2111 ††<br />
| |
| 11111 ∆<br />
| |
| <br />
| |
| <!-- ws:start:WikiTextHeadingRule:18:&lt;h3&gt; --><h3 id="toc8"><a name="x-List of Scales up to 10-EDO:-6-EDO Scales"></a><!-- ws:end:WikiTextHeadingRule:18 -->6-EDO Scales</h3>
| |
| <br />
| |
| 51 ††<br />
| |
| 312<br />
| |
| 321<br />
| |
| 411 ††<br />
| |
| 2121 ◊◊<br />
| |
| 2211<br />
| |
| 3111 ††<br />
| |
| 21111 ††<br />
| |
| 111111 ∆<br />
| |
| <br />
| |
| <!-- ws:start:WikiTextHeadingRule:20:&lt;h3&gt; --><h3 id="toc9"><a name="x-List of Scales up to 10-EDO:-7-EDO Scales"></a><!-- ws:end:WikiTextHeadingRule:20 -->7-EDO Scales</h3>
| |
| <br />
| |
| 43 ††<br />
| |
| 52 ††<br />
| |
| 61 ††<br />
| |
| 322 ††<br />
| |
| 331 ††<br />
| |
| 412<br />
| |
| 421<br />
| |
| 511 ††<br />
| |
| 2221 ††<br />
| |
| 3112<br />
| |
| 3121<br />
| |
| 3211<br />
| |
| 4111 ††<br />
| |
| 21211 ††<br />
| |
| 22111<br />
| |
| 31111 ††<br />
| |
| 211111 ††<br />
| |
| 1111111 ∆<br />
| |
| <br />
| |
| <!-- ws:start:WikiTextHeadingRule:22:&lt;h3&gt; --><h3 id="toc10"><a name="x-List of Scales up to 10-EDO:-8-EDO Scales"></a><!-- ws:end:WikiTextHeadingRule:22 -->8-EDO Scales</h3>
| |
| <br />
| |
| 53 ††<br />
| |
| 71 ††<br />
| |
| 332 ††<br />
| |
| 413<br />
| |
| 431<br />
| |
| 512<br />
| |
| 521<br />
| |
| 611 ††<br />
| |
| 3122<br />
| |
| 3131 ◊◊<br />
| |
| 3212<br />
| |
| 3221<br />
| |
| 3311<br />
| |
| 4112<br />
| |
| 4121<br />
| |
| 4211<br />
| |
| 5111 ††<br />
| |
| 22121 ††<br />
| |
| 22211<br />
| |
| 31112<br />
| |
| 31121<br />
| |
| 31211<br />
| |
| 32111<br />
| |
| 41111 ††<br />
| |
| 211211 ◊◊<br />
| |
| 212111<br />
| |
| 221111<br />
| |
| 311111 ††<br />
| |
| 2111111 ††<br />
| |
| 11111111 ∆<br />
| |
| <br />
| |
| <!-- ws:start:WikiTextHeadingRule:24:&lt;h3&gt; --><h3 id="toc11"><a name="x-List of Scales up to 10-EDO:-9-EDO Scales"></a><!-- ws:end:WikiTextHeadingRule:24 -->9-EDO Scales</h3>
| |
| <br />
| |
| 54 ††<br />
| |
| 72 ††<br />
| |
| 81 ††<br />
| |
| 423<br />
| |
| 432<br />
| |
| 441 ††<br />
| |
| 513<br />
| |
| 522 ††<br />
| |
| 531<br />
| |
| 612<br />
| |
| 621<br />
| |
| 711 ††<br />
| |
| 3222 ††<br />
| |
| 3231<br />
| |
| 3312<br />
| |
| 3321<br />
| |
| 4113<br />
| |
| 4122<br />
| |
| 4131<br />
| |
| 4212<br />
| |
| 4221<br />
| |
| 4311<br />
| |
| 5112<br />
| |
| 5121<br />
| |
| 5211<br />
| |
| 6111 ††<br />
| |
| 22221 ††<br />
| |
| 31122<br />
| |
| 31212<br />
| |
| 31221<br />
| |
| 31311 ††<br />
| |
| 32112<br />
| |
| 32121<br />
| |
| 32211<br />
| |
| 33111<br />
| |
| 41112<br />
| |
| 41121<br />
| |
| 41211<br />
| |
| 42111<br />
| |
| 51111 ††<br />
| |
| 212121 ◊◊<br />
| |
| 221121<br />
| |
| 221211<br />
| |
| 222111<br />
| |
| 311112<br />
| |
| 311121<br />
| |
| 311211<br />
| |
| 312111<br />
| |
| 321111<br />
| |
| 411111 ††<br />
| |
| 2112111 ††<br />
| |
| 2121111<br />
| |
| 2211111<br />
| |
| 3111111 ††<br />
| |
| 21111111 ††<br />
| |
| 111111111 ∆<br />
| |
| <br />
| |
| <!-- ws:start:WikiTextHeadingRule:26:&lt;h3&gt; --><h3 id="toc12"><a name="x-List of Scales up to 10-EDO:-10-EDO Scales"></a><!-- ws:end:WikiTextHeadingRule:26 -->10-EDO Scales</h3>
| |
| <br />
| |
| 73 ††<br />
| |
| 91 ††<br />
| |
| 433 ††<br />
| |
| 514<br />
| |
| 523<br />
| |
| 532<br />
| |
| 541<br />
| |
| 613<br />
| |
| 631<br />
| |
| 712<br />
| |
| 721<br />
| |
| 811 ††<br />
| |
| 3232 ◊◊<br />
| |
| 3322<br />
| |
| 3331 ††<br />
| |
| 4123<br />
| |
| 4132<br />
| |
| 4141 ◊◊<br />
| |
| 4213<br />
| |
| 4231<br />
| |
| 4312<br />
| |
| 4321<br />
| |
| 4411<br />
| |
| 5113<br />
| |
| 5122<br />
| |
| 5131<br />
| |
| 5212<br />
| |
| 5221<br />
| |
| 5311<br />
| |
| 6112<br />
| |
| 6121<br />
| |
| 6211<br />
| |
| 7111 ††<br />
| |
| 31222<br />
| |
| 31312<br />
| |
| 32122<br />
| |
| 32131<br />
| |
| 32212<br />
| |
| 32221<br />
| |
| 32311<br />
| |
| 33112<br />
| |
| 33121<br />
| |
| 33211<br />
| |
| 41113<br />
| |
| 41122<br />
| |
| 41131<br />
| |
| 41212<br />
| |
| 41221<br />
| |
| 41311<br />
| |
| 42112<br />
| |
| 42121<br />
| |
| 42211<br />
| |
| 43111<br />
| |
| 51112<br />
| |
| 51121<br />
| |
| 51211<br />
| |
| 52111<br />
| |
| 61111 ††<br />
| |
| 221221 ◊◊<br />
| |
| 222121<br />
| |
| 222211<br />
| |
| 311122<br />
| |
| 311212<br />
| |
| 311221<br />
| |
| 311311 ◊◊<br />
| |
| 312112<br />
| |
| 312121<br />
| |
| 312211<br />
| |
| 313111<br />
| |
| 321112<br />
| |
| 321121<br />
| |
| 321211<br />
| |
| 322111<br />
| |
| 331111<br />
| |
| 411112<br />
| |
| 411121<br />
| |
| 411211<br />
| |
| 412111<br />
| |
| 421111<br />
| |
| 511111 ††<br />
| |
| 2121211 ††<br />
| |
| 2211121<br />
| |
| 2211211<br />
| |
| 2212111<br />
| |
| 2221111<br />
| |
| 3111112<br />
| |
| 3111121<br />
| |
| 3111211<br />
| |
| 3112111<br />
| |
| 3121111<br />
| |
| 3211111<br />
| |
| 4111111 ††<br />
| |
| 21112111 ◊◊<br />
| |
| 21121111<br />
| |
| 21211111<br />
| |
| 22111111<br />
| |
| 31111111 ††<br />
| |
| 211111111 ††<br />
| |
| 1111111111 ∆</body></html></pre></div>
| |