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| {{Idiosyncratic terms}} | | {{Idiosyncratic terms}} |
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| This is a user page, not one of the main wiki pages. | | This is a user page, '''not a real wiki page'''. |
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| This page is only opinion, not fact. | | '''This page is only opinion, not fact.''' |
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| This user page details how I personally assign each [[EDO]] to a [[subgroup]] of [[just intonation]].
| | Interpreting 12edo as a 2.3.5.17.19 system: |
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| == Types of subgroups ==
| | == Intervals == |
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| ; Prime
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| * lim = [[Prime limit]]
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| * no-n = [[Subgroup|No-n subgroup]]
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| * dual = [[Dual-n|Dual-n subgroup]]
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| * cen = Directional subgroup
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| ** ''Example: -40cen+1 includes all primes where -40¢<absolute error<+1¢''
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| ** ''Example: -1cen+35 includes all primes where -1¢<absolute error<+35¢''
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| ** ''Example: -25cen+10 includes all primes where -25¢<relative error<+10¢''
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| ** Note that lim, no-n and most dual subgroups obey -15cen+15 or stricter
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| ; Composite
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| * comp = Other [[Subgroup|composite subgroup]]
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| ;Fractional
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| * nth-b = [[Half-prime subgroup|Nth-basis subgroup]]
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| * frac = Other [[Subgroup|fractional subgroup]]
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| <small>(''Technically any fractional subgroup can be said to be nth-basis, so an arbitrary cutoff must be drawn somewhere. This page considers 200th-basis or higher to not be nth-basis, while 199th or lower is accepted.'')</small>
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| == Procedure for choosing a subgroup ==
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| Remember: All of these rules are made to be broken. Bend the rules to fit the EDO. Don't bend the EDO to fit the rules.
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| === Aims ===
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| The aim of these procedures is to make visibly available all of the simple [[consonant]] intervals an EDO has to offer, without falsely including too many ones it doesn’t have, and without allowing less-important intervals to create unnecessary clutter.
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| The aim is also to make subgroups of similar-sized EDOs look fairly similar so that it’s easy to cross-compare between them at a glance.
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| === Why different sized EDOs have different procedures ===
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| As EDOs get bigger and their step size gets smaller, their step size gets closer and closer to the [[just-noticeable difference]].
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| This means that if a smaller EDO has high [[relative error]] on a [[prime]], it will sound like the prime is not there at all (no-no), but if a larger EDO has high relative error on a prime, especially a small prime, it will sound like there are two versions of the prime (dual).
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| Different approaches are needed for different EDO sizes to reflect this.
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| Also, as EDOs get bigger, more notes per [[octave]] need to be labelled with a [[JI]] approximation, so more [[basis element]]s are needed to produce those labels. Whereas, as EDOs get smaller, too many basis elements just make it needlessly complicated to navigate them, and fewer basis elements are better. So this is another reason for differing approaches at different EDO sizes.
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| === EDOs with 1 to 27 tones/octave ===
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| # The subgroup should have:
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| ## 3 basis elements if the EDO has 1-6 tones
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| ## 5 basis elements if the EDO has 7-12 tones
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| ## or 6 basis elements if the EDO has 13-27 tones
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| # Add prime 2 to the subgroup
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| # Do whichever of the following things results in the most simple consonances being available and the least out of tune consonances being listed (use your own discretion to decide):
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| ## Add the next 4-5 prime harmonics to be approximated within 15 cents
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| ## Add the next 4-5 prime harmonics with absolute error between -a¢ and +b¢ where (a+b) is no bigger than 50. Make a and b anything you like that fits the rule, try to make them as small as possible while still including most important intervals
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| ## Add the 4-5 smallest odd harmonics and/or [[taxicab distance|taxicab-2]] intervals to be approximated within 15 cents, avoiding any that include an already-added basis element as a factor
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| === EDOs with 28 to 52 tones/octave ===
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| # The subgroup should have 7 basis elements
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| # Primes 2, 3, 5, 7 and 11 must be added to the subgroup
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| # If any primes 3, 5, 7 or 11 have more than 40% relative error, then they should be made a dual prime
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| # If there are more than 2 dual-primes, then only the 2 lowest dual-primes should be kept dual, and the rest made single again
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| # If there are still spots left open, then they should be filled by every prime 13 and up which the EDO approximates with less than 35% relative error, preferencing the lowest primes first, until all spots are filled
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| === EDOs with 53 to 71 tones/octave ===
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| # The subgroup should have 8 basis elements
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| # Primes 2, 3, 5, 7 and 11 must be added to the subgroup
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| # If any primes 3, 5, 7 or 11 have more than 40% relative error, then they should be made a dual prime
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| # If there are more than 3 dual-primes, then only the 3 lowest dual-primes should be kept dual, and the rest made single again
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| # If there are still spots left open, then they should be filled by every prime 13 and up which the EDO approximates with less than 35% relative error, preferencing the lowest primes first, until all spots are filled
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| === EDOs with 72 to 98 tones/octave ===
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| # The subgroup should have 9 basis elements
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| # Primes 2, 3, 5, 7, 11 and 13 must be added to the subgroup
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| # If any primes 3, 5, 7, 11 or 13 have more than 40% relative error, then they should be made a dual prime
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| # If there are more than 4 dual-primes, then only the 4 lowest dual-primes should be kept dual, and the rest made single again
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| # If there are still spots left open, then they should be filled by every prime 17 and up which the EDO approximates with less than 35% relative error, preferencing the lowest primes first, until all spots are filled
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| === EDOs with 99 or more tones/octave ===
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| # The subgroup should have 11 basis elements
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| # Add primes 2, 3, 5, 7, 11, 13, 17, 19 and 23 to the subgroup
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| # Add the next two smallest primes with <35% relative error after 23 to the subgroup
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| # If any primes 23 or lower have >40% relative error, then they should be made a dual prime
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| # If there are now more than 11 basis elements, then the primes should be removed one by one starting with the highest and getting lower until there are 11 basis elements left
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| # If a dual-prime is the last one to be removed, and this causes there to be only 10 basis elements left, then add back the smallest non-dual prime that was removed (''if no non-dual primes were removed, add the next smallest prime with <35% relative error that's not already in the subgroup'')
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| == List of subgroups by EDO ==
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| Size categories taken from my [[human EDO size categorization]] (HUECAT).
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| For the purposes of this list, if prime N is mapped to A steps in an EDO, then “<N“ means N but mapped to A-1 steps, and “N>” means N but mapped to A+1 steps.
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| === Picnic EDOs (1-4) ===
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| ; 3 basis elements
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| * [[1edo]]: 2 • 127 • 129 (''comp'')
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| * [[2edo]]: 2 • <small><sup>7</sup>/<sub>5</sub></small> • <small><sup>17</sup>/<sub>3</sub></small> (''nth-b; 15th'')
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| * [[3edo]]: 2 • 5 • <small><sup>19</sup>/<sub>3</sub></small> (''nth-b; 3rd'')
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| * [[4edo]]: 2 • <small><sup>5</sup>/<sub>3</sub></small> • 19 (''nth-b; 15th'')
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| === Birthday EDOs (5-19) ===
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| ; 3 basis elements
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| * [[5edo]]: 2 • 3 • 7 (''no-n'')
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| * [[6edo]]: 2 • 9 • 5 (''comp'')
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| ; 5 basis elements
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| * [[7edo]]: 2 • 3 • 5 • 11 • 29 (''-44cen+1'')
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| * [[8edo]]: 2 • <small><sup>5</sup>/<sub>3</sub></small> • <small><sup>11</sup>/<sub>3</sub></small> • <small><sup>13</sup>/<sub>5</sub></small> • 19 (''nth-b; 15th'')
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| * [[9edo]]: 2 • 5 • <small><sup>7</sup>/<sub>3</sub></small> • 11 • <small><sup>13</sup>/<sub>7</sub></small> (''nth-b; 21st'')
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| * [[10edo]]: 2 • 3 • 7 • 13 • 17 (''no-n'')
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| * [[11edo]]: 2 • 9 • 15 • 7 • 11 (''comp'')
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| * [[12edo]]: 2 • 3 • 5 • 17 • 19 (''no-n'')
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| ; 6 basis elements
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| * [[13edo]]: 2 • 9 • 5 • 21 • 11 • 13 (''comp'')
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| * [[14edo]]: 2 • 3 • <5 • 7 • 11 • 17 (''-44cen+1'')
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| * [[15edo]]: 2 • 3 • 5 • 7 • 11 • 23 (''no-n'')
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| * [[16edo]]: 2 • 3 • 5 • 7 • 11 • 13 (''-28cen+7'')
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| * [[17edo]]: 2 • 3 • 5> • 7 • 11 • 13 (''-1cen+38'')
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| * [[18edo]]: 2 • 3 • 5 • 7 • 13 • 17 (''-1cen+32'')
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| * [[19edo]]: 2 • 3 • 5 • 7 • 11 • 13 (''lim'')
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| === Carousel EDOs (20-34) ===
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| ; 6 basis elements
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| * [[20edo]]: 2 • 3 • 5> • 7 • 11 • 13 (''-12cen+34'')
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| * [[21edo]]: 2 • 3 • 5 • 7 • 17 • 19 (''no-n'')
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| * [[22edo]]: 2 • 3 • 5 • 7 • 11 • 17 (''no-n'')
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| * [[23edo]]: 2 • 9 • 15 • 21 • 33 • 13 (''comp'')
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| * [[24edo]]: 2 • 3 • 5 • 7 • 11 • 13 (''lim'')
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| * [[25edo]]: 2 • 3 • 5 • 7 • 17 • 19 (''no-n'')
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| * [[26edo]]: 2 • 3 • 5 • 7 • 11 • 13 (''lim'')
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| * [[27edo]]: 2 • 3 • 5 • 7 • 11 • 13 (''lim'')
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| ; 7 basis elements
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| * [[28edo]]: 2 • 3 • 5 • 7 • 11 • 13 • 19 (''no-n'')
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| * [[29edo]]: 2 • 3 • 5 • 7 • 11 • 13 • 19 (''no-n'')
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| * [[30edo]]: 2 • ''3+'' • ''3-'' • 5 • 7 • 11 • 13 (''dual'')
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| * [[31edo]]: 2 • 3 • 5 • 7 • 11 • 13 • 17 (''lim'')
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| * [[32edo]]: 2 • 3 • 5 • 7 • 11 • 17 • 19 (''no-n'')
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| * [[33edo]]: 2 • 3 • 5 • 7 • 11 • 13 • 17 (''lim'')
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| * [[34edo]]: 2 • 3 • 5 • ''7+'' • ''7-'' • 11 • 13 (''dual'')
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| === Schoolbus EDOs (35-54) ===
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| ; 7 basis elements
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| * [[35edo]]: 2 • ''3+'' • ''3-'' • 5 • 7 • 11 • 17 (''dual'')
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| * [[36edo]]: 2 • 3 • ''5+'' • ''5-'' • 7 • ''11+'' • ''11-'' (''dual'')
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| * [[37edo]]: 2 • 3 • 5 • 7 • 11 • 13 • 17 (''lim'')
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| * [[38edo]]: 2 • 3 • 5 • 7 • ''11+'' • ''11-'' • 13 (''dual'')
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| * [[39edo]]: 2 • 3 • ''5+'' • ''5-'' • ''7+'' • ''7-'' • 11 (''dual'')
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| * [[40edo]]: 2 • ''3+'' • ''3-'' • 5 • 7 • 11 • 13 (''dual'')
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| * [[41edo]]: 2 • 3 • 5 • 7 • 11 • 13 • 17 (''lim'')
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| * [[42edo]]: 2 • ''3+'' • ''3-'' • ''5+'' • ''5-'' • 7 • 11 (''dual'')
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| * [[43edo]]: 2 • 3 • 5 • 7 • 11 • 13 • 17 (''lim'')
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| * [[44edo]]: 2 • 3 • 5 • ''7+'' • ''7-'' • 11 • 13 (''dual'')
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| * [[45edo]]: 2 • 3 • ''5+'' • ''5-'' • 7 • 11 • 17 (''dual'')
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| * [[46edo]]: 2 • 3 • 5 • 7 • 11 • 13 • 17 (''lim'')
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| * [[47edo]]: 2 • ''3+'' • ''3-'' • 5 • 7 • ''11+'' • ''11-'' (''dual'')
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| * [[48edo]]: 2 • 3 • ''5+'' • ''5-'' • 7 • 11 • 13 (''dual'')
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| * [[49edo]]: 2 • 3 • 5 • ''7+'' • ''7-'' • ''11+'' • ''11-'' (''dual'')
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| * [[50edo]]: 2 • 3 • 5 • 7 • 11 • 13 • 17 (''lim'')
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| * [[51edo]]: 2 • 3 • ''5+'' • ''5-'' • 7 • ''11+'' • ''11-'' (''dual'')
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| * [[52edo]]: 2 • ''3+'' • ''3-'' • 5 • 7 • 11 • 19 (''dual'')
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| ; 8 basis elements
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| * [[53edo]]: 2 • 3 • 5 • 7 • 11 • 13 • 17 • 19 (''lim'')
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| * [[54edo]]: 2 • ''3+'' • ''3-'' • ''5+'' • ''5-'' • ''7+'' • ''7-'' • 11 (''dual'')
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| === Double-decker EDOs (55-74) ===
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| ; 8 basis elements
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| * [[55edo]]: 2 • 3 • 5 • ''7+'' • ''7-'' • 11 • 17 • 23 (''dual'')
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| * [[56edo]]: 2 • 3 • 5 • 7 • 11 • 13 • 17 • 19 (''lim'')
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| * [[57edo]]: 2 • 3 • 5 • 7 • 11 • 13 • 17 • 19 (''lim'')
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| * [[58edo]]: 2 • 3 • 5 • 7 • 11 • 13 • 17 • 19 (''lim'')
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| * [[59edo]]: 2 • ''3+'' • ''3-'' • 5 • 7 • 11 • 13 • 17 (''dual'')
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| * [[60edo]]: 2 • 3 • 5 • ''7+'' • ''7-'' • ''11+'' • ''11-'' • 13 (''dual'')
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| * [[61edo]]: 2 • 3 • 5 • 7 • 11 • 13 • 17 • 19 (''lim'')
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| * [[62edo]]: 2 • 3 • 5 • 7 • ''11+'' • ''11-'' • 29 • 31 (''dual'')
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| * [[63edo]]: 2 • 3 • 5 • 7 • 11 • 13 • 23 • 29 (''no-n'')
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| * [[64edo]]: 2 • ''3+'' • ''3-'' • ''5+'' • ''5-'' • 7 • ''11+'' • ''11-'' (''dual'')
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| * [[65edo]]: 2 • 3 • 5 • ''7+'' • ''7-'' • 11 • 19 • 23 (''dual'')
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| * [[66edo]]: 2 • ''3+'' • ''3-'' • 5 • 7 • 11 • 13 • 17 (''dual'')
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| * [[67edo]]: 2 • 3 • ''5+'' • ''5-'' • 7 • 11 • 13 • 17 (''dual'')
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| * [[68edo]]: 2 • 3 • 5 • 7 • 11 • 13 • 17 • 19 (''lim'')
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| * [[69edo]]: 2 • 3 • 5 • 7 • 11 • 13 • 17 • 19 (''lim'')
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| * [[70edo]]: 2 • 3 • ''5+'' • ''5-'' • ''7+'' • ''7-'' • 11 • 13 (''dual'')
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| * [[71edo]]: 2 • ''3+'' • ''3-'' • 5 • 7 • 11 • 13 • 17 (''dual'')
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| ; 9 basis elements
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| * [[72edo]]: 2 • 3 • 5 • 7 • 11 • ''13+'' • ''13-'' • 17 • 19 (''dual'')
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| * [[73edo]]: 2 • 3 • ''5+'' • ''5-'' • 7 • ''11+'' • ''11-'' • 13 • 19 (''dual'')
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| * [[74edo]]: 2 • 3 • 5 • 7 • 11 • 13 • 19 • 23 • 31 (''no-n'')
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| == Notation of dual-3 EDOs ==
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| Most EDO notation systems, including the near-universal [[ups and downs notation]], are built upon [[chain-of-fifths notation]]. How then should an EDO be notated if it’s dual-fifth, i.e. it has two mappings of 3: 3+ and 3-?
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| The most straightforward solution is to just choose whichever 3 is closer to just 3/1, and pretend that’s the "real 3" for notation purposes. Treat the other 3 as just another prime, like 5 or 7. In most cases, I advise to do that.
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| If you happen to be mainly using an EDO as a tuning for one specific non-dual [[regular temperament]] like meantone, mavila, etc., then pretend that temperament’s mapping of 3 is the ‘real’ one for the purpose of notation, and pretend the other 3 is just like any other larger prime.
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| Of course, this results in multiple notation systems for the same EDO, since different people use different temperaments or none at all, but that’s already the case. All of those notation systems already exist, I’m not adding any new ones, I’m just saying that the ones we already have all have a valid place and it’s okay to use one some day and another some other day on a project-by-project basis.
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| As long as you name and briefly explain your notation system at the start of your score, use whatever system you want. Use whichever one works in practice for you and the musicians collaborating with you. Invent one, if the existing ones don’t work. It’s fine. Not everything has to be standardized and homogenized.
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| Because I’m personally a fan of mixing and matching multiple temperaments, and other things that aren’t temperaments like approximated [[JI]] scales, [[MOS scale]]s, [[MODMOS]] & [[inflected MOS]] scales and even randomly generated scales, I usually like to go with the first option: ups and downs notation, in particular using whichever 3 is closest to just for its chain of fifths, and the other 3 being treated as just another available prime like 5, 7 or 11.
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| == Interpreting 12edo as a 2.3.5.17.19 system==
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| === Intervals ===
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| === Chords ===
| | == Chords == |
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| ==== Common chords ====
| | === Common chords === |
| My interpretation of what the just harmonies are, hiding behind common practice chords. | | My interpretation of what the just harmonies are, hiding behind common practice chords. |
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| ==== Parent chords ====
| | === Parent chords === |
| My list of in my opinion the most harmonious 'parent chords' in 12edo, which you can use as palettes to build novel and pretty smaller chords. Choose one of these chords, take any subset of 2 or more notes from it, and you will make another, also harmonious chord. | | My list of in my opinion the most harmonious 'parent chords' in 12edo, which you can use as palettes to build novel and pretty smaller chords. Choose one of these chords, take any subset of 2 or more notes from it, and you will make another, also harmonious chord. |
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| Note names: C, D, E, F, F#/Gb, G, G#/Ab, A | | Note names: C, D, E, F, F#/Gb, G, G#/Ab, A |
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| [[Category:Impression]]
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This article or section contains multiple idiosyncratic terms. Such terms are used by only a few people and are not regularly used within the community.
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This is a user page, not a real wiki page.
This page is only opinion, not fact.
Interpreting 12edo as a 2.3.5.17.19 system:
Intervals
- 0c (0 cents)
Behaves like: 1:1.
- 100c
Depending on context, behaves like: 20:19, 19:18, 18:17, 17:16 or 16:15.
- 200c
Depending on context, behaves like: 10:9, 19:17, 9:8 or 17:15.
- 300c
Depending on context, behaves like: 20:17, 32:27, 19:16 or 6:5.
- 400c
Depending on context, behaves like: 5:4, 34:27, 24:19 or 19:15.
- 500c
Depending on context, behaves like: 4:3 or 27:20.
- 600c
Depending on context, behaves like: 24:17, 17:12 or 27:19.
- 700c
Behaves like: 3:2.
- 800c
Depending on context, behaves like: 30:19, 19:12, 27:17 or 8:5.
- 900c
Depending on context, behaves like: 5:3, 32:19, 27:16 or 17:10.
- 1000c
Depending on context, behaves like: 30:17, 16:9 or 9:5.
- 1100c
Depending on context, behaves like: 15:8, 32:17, 17:9, 36:19 or 19:10.
- 1200c
Behaves like: 2:1.
Chords
Common chords
My interpretation of what the just harmonies are, hiding behind common practice chords.
Note names and common practice titles assume C is the tonic but of course you can transpose to any other key.
Harmonies from inversions of the chord are in italics.
- Major chord
Just harmonies approximated:
Note numbers: 0, 4, 7
Note names: C, E, G
Common practice title: C
- Minor chord
Just harmonies:
- 10:12:15
- 16:19:24
- 12:16:19
Note numbers: 0, 3, 7
Note names: C, Eb, G
Common practice title: Cm
- Diminished chord
Just harmonies:
- 17:20:24
- 10:12:17
- 12:17:20
Note numbers: 0, 3, 6
Note names: C, Eb, Gb
Common practice title: Cdim
- Major seventh chord
Just harmonies:
- 8:10:12:15
- 20:25:30:38
- 15:19:20:25
Note numbers: 0, 4, 7, 11
Note names: C, E, G, B
Common practice title: Cmaj7
- Minor seventh chord
Just harmonies:
Note numbers: 0, 3, 7, 10
Note names: C, Eb, G, Bb
Common practice title: Cmin7
- Dominant seventh chord
Just harmonies:
Note numbers: 0, 4, 7, 10
Note names: C, E, G, Bb
Common practice title: C7
- Sus2 chord
Just harmonies:
Note numbers: 0, 2, 7
Note names: C, D, G
Common practice title: Csus2
- Sus4 chord
Just harmonies:
Note numbers: 0, 5, 7
Note names: C, F, G
Common practice title: Csus4
- Augmented chord
Just harmonies:
- 12:15:19
- 15:18:20
- 9:10:15
Note numbers: 0, 4, 8
Note names: C, E, G#
Common practice title: Caug
- Dominant seventh chord
Just harmonies:
Note numbers: 0, 4, 7, 10
Note names: C, E, G, Bb
Common practice title: C7
- Major ninth chord
Just harmonies:
- 8:10:12:15:18
- 8:9:10:12:15
Note numbers: 0, 4, 7, 11, 14
Note names: C, E, G, B, D
Common practice title: Cmaj9
- Minor ninth chord
Just harmonies:
Note numbers: 0, 3, 7, 10, 14
Note names: C, Eb, G, Bb, D
Common practice title: Cmin9
- Dominant ninth chord
Just harmonies:
Note numbers: 0, 4, 7, 10, 14
Note names: C, E, G, Bb, D
Common practice title: C9
- Major eleventh chord
Just harmonies:
- 24:30:36:45:54:64
- 24:28:30:32:36:45
Note numbers: 0, 4, 7, 11, 14, 17
Note names: C, E, G, B, D, F
Common practice title: Cmaj11
- Minor eleventh chord
Just harmonies:
- 40:48:60:72:85:108
- 40:48:54:60:72:85
Note numbers: 0, 3, 7, 10, 14, 17
Note names: C, Eb, G, Bb, D, F
Common practice title: Cmin11
- Dominant eleventh chord
Just harmonies:
- 40:50:60:72:85:108
- 40:50:54:60:72:85
Note numbers: 0, 4, 7, 10, 14, 17
Note names: C, E, G, Bb, D, F
Common practice title: C11
Parent chords
My list of in my opinion the most harmonious 'parent chords' in 12edo, which you can use as palettes to build novel and pretty smaller chords. Choose one of these chords, take any subset of 2 or more notes from it, and you will make another, also harmonious chord.
These chords work particularly well if you drop the root note down an octave, better mimicking the shape of the harmonic series. (For example you can play "chord 0-12-15-19-20-21-22-23" instead of "chord 0-3-7-8-9-10-11").
Note names and common practice titles assume C is the tonic but of course you can transpose to any other key.
- The over-9 parent chord of 12edo
Approximated just harmony: 9:10:12:16:17
Note numbers: 0, 2, 5, 10, 11
(With octave): 0, 12, 15, 17, 22, 23
Note names: C, D, F, A#/Bb, B
Common practice title: Dm7#5/C add(b6)
- The over-10 parent chord of 12edo
Just harmony: 10:12:15:16:17:18:19
Note numbers: 0, 3, 7, 8, 9, 10, 11
(With octave): 0, 12, 15, 19, 20, 21, 22, 23
Note names: C, D#/Eb, G, G#/Ab, A, A#/Bb, B
- The over-12 parent chord of 12edo
Just harmony: 12:15:16:17:18:19:20
Note numbers: 0, 4, 5, 6, 7, 8, 9
(With octave): 0, 12, 16, 17, 18, 19, 20, 21
Note names: C, E, F, F#/Gb, G, G#/Ab, A
- The over-15 parent chord of 12edo
Just harmony: 15:16:17:18:19:20:24:27
Note numbers: 1, 2, 3, 4, 5, 8, 10
(With octave): 0, 12, 13, 14, 15, 16, 17, 20, 22
Note names: C, C#/Db, D, D#/Eb, E, F, G#/Ab, A#/Bb
- The over-16 parent chord of 12edo
Just harmony: 16:17:18:19:20:24:30
Note numbers: 0, 1, 2, 3, 4, 7, 11
(With octave): 0, 12, 13, 14, 15, 16, 19, 23
Note names: C, C#/Db, D, D#/Eb, E, G, B
Common practice title: Cmaj9 add(m3,m9)
- The over-17 parent chord of 12edo
Just harmony: 17:18:19:20:24:27:30:32
Note numbers: 0, 1, 2, 3, 6, 8, 10, 11
(With octave): 0, 12, 13, 14, 15, 18, 20, 22, 23
Note names: C, C#/Db, D, D#/Eb, F#/Gb, G#/Ab, A#/Bb, B
- The over-18 parent chord of 12edo
Just harmony: 18:19:20:24:27:30:32:34
Note numbers: 0, 1, 2, 5, 7, 9, 10, 11
(With octave): 0, 12, 13, 14, 17, 19, 21, 22, 23
Note names: C, C#/Db, D, F, G, A, A#/Bb, B
- The over-19 parent chord of 12edo
Just harmony: 19:20:24:27:30:32:36
Note numbers: 0, 1, 4, 6, 8, 9, 11
(With octave): 0, 12, 13, 16, 18, 20, 21, 23
Note names: C, C#/Db, E, F#/Gb, G#/Ab, A, B
- The over-20 parent chord of 12edo
Just harmony: 20:24:25:27:30:32:34:36:38
Note numbers: 0, 3, 4, 5, 7, 8, 9, 10, 11
(With octave): 0, 12, 15, 16, 17, 18, 19, 20, 21, 22, 23
Note names: C, D#/Eb, E, F, G, G#/Ab, A, A#/Bb, B
- The over-24 parent chord of 12edo
Just harmony: 24:27:30:32:34:36:38:40
Note numbers: 0, 2, 4, 5, 6, 7, 8, 9
(With octave): 0, 12, 14, 16, 17, 18, 19, 20, 21
Note names: C, D, E, F, F#/Gb, G, G#/Ab, A
