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31edo as a whole contains a diverse palette of interval qualities and structures ranging from the very familiar to the quite exotic, and remarkably, almost all of these still have a reasonably simple harmonic interpretation. As a meantone system, 31edo's diatonic scale includes the basic qualities of the [[5-limit]], such as the [[perfect fourth]] and [[perfect fifth|fifth]], and the classical minor and major thirds ([[6/5]] and [[5/4]]). But 31edo also includes subminor and supermajor intervals, identifiable with [[septal]] ratios such as [[7/6]] and [[9/7]], and [[neutral]] intervals, identifiable with [[11-limit]] ratios such as [[11/9]]. | 31edo as a whole contains a diverse palette of interval qualities and structures ranging from the very familiar to the quite exotic, and remarkably, almost all of these still have a reasonably simple harmonic interpretation. As a meantone system, 31edo's diatonic scale includes the basic qualities of the [[5-limit]], such as the [[perfect fourth]] and [[perfect fifth|fifth]], and the classical minor and major thirds ([[6/5]] and [[5/4]]). But 31edo also includes subminor and supermajor intervals, identifiable with [[septal]] ratios such as [[7/6]] and [[9/7]], and [[neutral]] intervals, identifiable with [[11-limit]] ratios such as [[11/9]]. | ||
In terms of structures, or ways of organizing harmony, it should first be noted that 31edo's perfect fifth, of 18 steps, is quite divisible. | In terms of structures, or ways of organizing harmony, it should first be noted that 31edo's perfect fifth, of 18 steps, is quite divisible. The fifth can be split in two, giving us a neutral-third temperament, known in this case as [[Mohajira]], which emphasizes heptatonic structure, the 11th harmonic, and 2.3.5.11. Splitting the fifth in three gives us [[Slendric]], formed by stacking [[8/7]], and emphasizing pentatonic structure and 2.3.7. Combining these gives us [[Miracle]], while splitting Slendric into three again gives us [[Valentine]]. In 31edo, each of these provides xenharmonic ways of accessing the 11-limit with more simplicity than Meantone. Yet another way to encompass the 11-limit is given by [[Orwell]], generated by 31edo's subminor third; and of course, as a prime EDO, 31edo contains several more structures unique to itself. | ||
== Theory == | == Theory == | ||
Revision as of 10:24, 28 March 2026
31edo, or 31 equal divisions of the octave, is an equal tuning with a step size of approximately 39 cents. It is most commonly known as a tuning of Meantone, and for its accurate approximation of the 2.5.7 subgroup.
31edo as a whole contains a diverse palette of interval qualities and structures ranging from the very familiar to the quite exotic, and remarkably, almost all of these still have a reasonably simple harmonic interpretation. As a meantone system, 31edo's diatonic scale includes the basic qualities of the 5-limit, such as the perfect fourth and fifth, and the classical minor and major thirds (6/5 and 5/4). But 31edo also includes subminor and supermajor intervals, identifiable with septal ratios such as 7/6 and 9/7, and neutral intervals, identifiable with 11-limit ratios such as 11/9.
In terms of structures, or ways of organizing harmony, it should first be noted that 31edo's perfect fifth, of 18 steps, is quite divisible. The fifth can be split in two, giving us a neutral-third temperament, known in this case as Mohajira, which emphasizes heptatonic structure, the 11th harmonic, and 2.3.5.11. Splitting the fifth in three gives us Slendric, formed by stacking 8/7, and emphasizing pentatonic structure and 2.3.7. Combining these gives us Miracle, while splitting Slendric into three again gives us Valentine. In 31edo, each of these provides xenharmonic ways of accessing the 11-limit with more simplicity than Meantone. Yet another way to encompass the 11-limit is given by Orwell, generated by 31edo's subminor third; and of course, as a prime EDO, 31edo contains several more structures unique to itself.
Theory
Edostep interpretations
31edo's edostep has the following interpretations in the 11-limit:
- 49/48 (the difference between 7/6 and 8/7)
- 50/49 (the difference between 7/5 and 10/7)
- 64/63 (the difference between 8/7 and 9/8)
- 36/35 (the difference between 7/6 and 6/5)
- 54/55 (the difference between 6/5 and 11/9)
- 45/44 (the difference between 5/4 and 11/9)
- 128/125 (the difference between 5/4 and 32/25)
JI approximation
31edo is best understood as a 2.3.5.7.11.23 system, although it has a sharp but functional prime 13. The flatness of harmonics 9 and 11 mostly cancel out, producing a close-to-pure ~11/9 neutral interval. It has a rather functional diatonic scale, with the whole tone split into 2 and 3, with 2 steps making a chromatic semitone (or "chromatone") and 3 steps making a diatonic semitone (or "diatone").
| Harmonic | 2 | 3 | 5 | 7 | 11 | 13 | 17 | 19 | 23 | 29 | 31 | |
|---|---|---|---|---|---|---|---|---|---|---|---|---|
| Error | Absolute (¢) | 0.0 | -5.2 | +0.8 | -1.1 | -9.4 | +11.1 | +11.2 | +12.2 | -8.9 | +15.6 | +16.3 |
| Relative (%) | 0.0 | -13.4 | +2.0 | -2.8 | -24.2 | +28.6 | +28.9 | +31.4 | -23.0 | +40.3 | +42.0 | |
| Steps
(reduced) |
31
(0) |
49
(18) |
72
(10) |
87
(25) |
107
(14) |
115
(22) |
127
(3) |
132
(8) |
140
(16) |
151
(27) |
154
(30) | |
| Quality | Subminor | Pentaminor | Neutral | Pentamajor | Supermajor |
|---|---|---|---|---|---|
| Cents | 271 | 310 | 348 | 387 | 426 |
| Just interpretation | 7/6 | 6/5 | 11/9 | 5/4 | 9/7 |
| Steps | 7 | 8 | 9 | 10 | 11 |
Diatonic thirds are bolded.
Chords
Along with its diatonic major and minor chords which approximate 5-limit harmony, 31edo also has a narrow but functional supermajor triad, and a well-tuned subminor triad. It also supports arto and tendo chords, with its slendric chords of [0 6 18] and [0 12 18], and has a neutral triad [0 9 18] which represents both artoneutral and tendoneutral triads in the 11- and 13-limit.
Regular temperaments
Besides Meantone (for which it provides an excellent tuning and which is shared with 19edo), 31edo also supports variations of Rastmic temperament (like 24edo), Slendric (like 36edo), Miracle (like 41edo), and Orwell (like 22edo).
Scales
31edo does not temper out 64/63, meaning that it can be used to tune Diasem while representing some simpler 5-limit intervals. 31edo's step is called a diesis, and can function as an aberrisma. Due to being a prime number, 31edo has a large number of full-period MOS scales that exist in the edo. Orwell[9] (gramitonic) is one example, so is Mohajira[7] (mosh).
31edo also has a usable 12-note chromatic scale, approximating golden Meantone/monocot.
MOS scales
A key aspect of 31edo noted by several sources is the diversity of MOS scales represented. The 15 edo-distinct regular temperaments of 31edo are divided into three loops that are traversed by halving or doubling their generators.
| Loop 1 | |||||
|---|---|---|---|---|---|
| Temperament | Didacus | Wurschmidt | Squares | Mohajira | Meantone |
| Complexity | 15 | 8 | 4 | 2 | 1 |
| Scale (albitonic) | 5-5-5-5-5-6 | 8-1-1-8-1-1-8-1-1-1 | 2-2-7-2-2-7-2-7 | 5-4-5-4-5-4-4 | 5-5-3-5-5-5-3 |
| Generator | 5, 26 | 10, 21 | 20, 11 | 22, 9 | 18, 13 |
| Loop 2 | |||||
| Temperament | Miracle | Slendric | A-Team | Orwell | Casablanca |
| Complexity | 6 | 3 | 14 | 7 | 12 |
| Scale (albitonic) | 3-3-3-3-3-3-3-3-3-4 | 6-6-6-6-7 | 2-5-2-5-5-2-5-5 | 4-3-4-3-4-3-4-3-3 | 3-3-3-3-5-3-3-3-5 |
| Generator | 3, 28 | 6, 25 | 12, 19 | 24, 7 | 17, 14 |
| Loop 3 | |||||
| Temperament | Slender | Valentine | Nusecond | Myna | Tritonic |
| Complexity | 13 | 9 | 11 | 10 | 5 |
| Scale (albitonic) | - (11-note scale has >10 steps interval) | - (11-note scale has >10 steps interval) | 4-4-4-4-4-4-4-3 | 1-1-6-1-1-6-1-1-6-1-6 | - (11-note scale has >10 steps interval) |
| Generator | 1, 30 | 2, 29 | 4, 27 | 8, 23 | 15, 16 |
Notation
31edo, as one of the more popular edos, has a somewhat agreed-upon notation system. This notation is simply neutral diatonic notation applied to the edo, where a half-# or half-b represents an alteration by one diesis. In this manner, all notes can be spelled in a way that does not require multiple sharps or flats.
| Step | Cents | ADIN | Neutral diatonic | Notation | Just intervals represented |
|---|---|---|---|---|---|
| 0 | 0.00 | unison | unison | A | 1/1 |
| 1 | 38.71 | superunison | semiaugmented unison | At | 49/48, 50/49, 128/125 |
| 2 | 77.42 | subminor second | semidiminished second | A# | 25/24 |
| 3 | 116.13 | nearminor second | minor second | Bb | 16/15 |
| 4 | 154.84 | neutral second | neutral second | Bd | 11/10, 12/11 |
| 5 | 193.55 | nearmajor second | major second | B | 10/9, 9/8 |
| 6 | 232.26 | supermajor second | semiaugmented second | Bt | 8/7 |
| 7 | 270.97 | subminor third | semidiminished third | Cd | 7/6 |
| 8 | 309.68 | nearminor third | minor third | C | 6/5 |
| 9 | 348.39 | neutral third | neutral third | Ct | 11/9, 16/13 |
| 10 | 387.10 | nearmajor third | major third | C# | 5/4 |
| 11 | 425.81 | supermajor third | semiaugmented third | Db | 9/7 |
| 12 | 464.52 | subfourth | semidiminished fourth | Dd | 21/16, 13/10 |
| 13 | 503.23 | perfect fourth | perfect fourth | D | 4/3 |
| 14 | 541.94 | neutral fourth | semiaugmented fourth | Dt | 11/8, 15/11 |
| 15 | 580.65 | nearaugmented fourth | augmented fourth | D# | 7/5 |
| 16 | 619.35 | neardiminished fifth | diminished fifth | Eb | 10/7 |
| 17 | 658.06 | neutral fifth | semidiminished fifth | Ed | 16/11, 22/15 |
| 18 | 696.77 | perfect fifth | perfect fifth | E | 3/2 |
| 19 | 735.48 | superfifth | semiaugmented fifth | Et | 32/21, 20/13 |
| 20 | 774.19 | subminor sixth | semidiminished sixth | Fd | 14/9 |
| 21 | 812.90 | nearminor sixth | minor sixth | F | 8/5 |
| 22 | 851.61 | neutral sixth | neutral sixth | Ft | 13/8, 18/11 |
| 23 | 890.32 | nearmajor sixth | major sixth | F# | 5/3 |
| 24 | 929.03 | supermajor sixth | semiaugmented sixth | Gb | 12/7 |
| 25 | 967.74 | subminor seventh | semidiminished seventh | Gd | 7/4 |
| 26 | 1006.45 | nearminor seventh | minor seventh | G | 9/5, 16/9 |
| 27 | 1045.16 | neutral seventh | neutral seventh | Gt | 11/6, 20/11 |
| 28 | 1083.87 | nearmajor seventh | major seventh | G# | 15/8 |
| 29 | 1122.58 | supermajor seventh | semiaugmented seventh | Ab | 48/25 |
| 30 | 1161.29 | suboctave | semidiminished octave | Ad | 49/25, 125/64, 96/49 |
| 31 | 1200.00 | octave | octave | A | 2/1 |
Multiples
217edo
217edo is a theoretically strong system which keeps 31edo's tuning of 2.5.7.(13:17:19). 217edo is strong in the 19-limit and the smallest edo distinctly consistent in the 19-odd-limit.
| Harmonic | 2 | 3 | 5 | 7 | 11 | 13 | 17 | 19 | 23 | 29 | 31 | 37 | |
|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
| Error | Absolute (¢) | 0.0 | +0.3 | +0.8 | -1.1 | +1.7 | +0.0 | +0.1 | +1.1 | +2.1 | -1.0 | -0.3 | -2.5 |
| Relative (%) | 0.0 | +6.3 | +14.2 | -19.6 | +30.3 | +0.5 | +2.1 | +20.0 | +38.7 | -18.2 | -6.1 | -45.1 | |
| Steps
(reduced) |
217
(0) |
344
(127) |
504
(70) |
609
(175) |
751
(100) |
803
(152) |
887
(19) |
922
(54) |
982
(114) |
1054
(186) |
1075
(207) |
1130
(45) | |
| View • Talk • EditEqual temperaments | |
|---|---|
| EDOs | |
| Macrotonal | 5 • 7 • 8 • 9 • 10 • 11 |
| 12-23 | 12 • 13 • 14 • 15 • 16 • 17 • 18 • 19 • 20 • 21 • 22 • 23 |
| 24-35 | 24 • 25 • 26 • 27 • 29 • 31 • 32 • 34 • 35 |
| 36-47 | 36 • 37 • 39 • 40 • 41 • 43 • 44 • 45 • 46 • 47 |
| 48-59 | 48 • 50 • 51 • 53 • 54 • 56 • 57 • 58 |
| 60-71 | 60 • 63 • 64 • 65 • 67 • 70 |
| 72-83 | 72 • 77 • 80 • 81 |
| 84-95 | 84 • 87 • 89 • 90 • 93 • 94 |
| Large EDOs | 99 • 104 • 111 • 118 • 130 • 140 • 152 • 159 • 171 • 217 • 224 • 239 • 270 • 306 • 311 • 612 • 665 |
| Nonoctave equal temperaments | |
| Tritave | 4 • 9 • 13 • 17 • 26 • 39 |
| Fifth | 8 • 9 • 11 • 20 |
| Other | |
