@@ Line 1: / Line 1: @@
-{{interwiki
+{{Interwiki
 | en = 12edo
 | de = 12-EDO
@@ Line 11: / Line 11: @@
 == Theory ==
-edo achieved its position as the standard Western tuning system through a combination of theoretical properties and practicality.
+edo achieved its position as the standard Western tuning system through a combination of theoretical properties and practicality. It is the smallest number of equal divisions of the octave ([[edo]]) which can seriously claim to represent [[5-limit]] harmony, and it represents a [[meantone]] temperament.
-It is the smallest number of equal divisions of the octave ([[edo]]) which can seriously claim to represent [[5-limit]] harmony, and because it represents a [[meantone]] temperament (specifically {{frac|1|12}} Pythagorean comma meantone, or approximately {{frac|1|11}} syntonic comma or full schisma meantone).
-It divides the octave into twelve equal parts, each of exactly 100 [[cent]]s each unless [[stretched and compressed tuning|octave stretching or compression]] is employed. It has a [[3/2|fifth]] which is quite accurate at 700 cents, two cents flat of just. It has a [[5/4|major third]] which is 13.7 cents sharp of just, which, while reasonable for its size, is unsatisfactory for some. The [[6/5|minor third]] is flat of just by even more, 15.6 cents.
+It divides the octave into twelve equal parts, each of exactly 100 [[cent]]s. It has a [[3/2|fifth]] which is quite accurate at 700 cents, two cents flat of just. It has a [[5/4|major third]] which is 13.7 cents sharp of just, which, while reasonable for its size, is unsatisfactory for some. The [[6/5|minor third]] is even less accurate, being 15.6 cents flat of just.
-Historically, 12edo became dominant primarily due to practical considerations for keyboard instruments and its ability to handle modulation across all keys with reasonable intonation.
+Before people used 12edo, people used a variety of [[historical temperaments]] such as [[quarter-comma meantone]], and later [[well temperament]]s. By the 20th century, 12edo became dominant primarily due to practical considerations for keyboard instruments and its ability to handle modulation across all keys with reasonable intonation. In actual performance, these deviations from just intonation are often reduced by the tuning adaptations of skilled performers. Modern music theory has increasingly treated 12edo as a system in its own right rather than as an approximation of just intonation or meantone, leading to theoretical approaches such as {{w|serialism}} and much of {{w|jazz harmony}} that derive from 12edo's structure as an equal division rather than its underlying temperament properties.{{cn}}
-In actual performance, these deviations from just intonation are often reduced by the tuning adaptations of skilled performers.
-Modern music theory has increasingly treated 12edo as a system in its own right rather than as an approximation of just intonation or meantone, leading to theoretical approaches such as {{w|serialism}} and much of {{w|jazz harmony}} that derive from 12edo's structure as an equal division rather than its underlying temperament properties.{{cn}}
-edo is the basic example of a [[:Category:12-tone scales|dodecatonic]] scale and can be considered the simplest [[well temperament]], where all twelve fifths are the same.
+edo is the basic example of a [[:Category:12-tone scales|dodecatonic]] scale and can be considered the simplest well temperament, where all twelve fifths are the same.
 The 7th harmonic ([[7/4]]) is represented by the diatonic [[minor seventh]], which is sharp by 31 cents, and as such 12edo tempers out [[64/63]]. The deviation explains why minor sevenths tend to stand out distinctly from the rest of the chord in a [[tetrad]]. Such tetrads are often used as [[dominant seventh chord]]s in [[diatonic functional harmony|functional harmony]], for which the 5-limit JI version would be [[36:45:54:64|1–5/4–3/2–16/9]], and while 12et officially [[support]]s septimal meantone for tempering out [[126/125]] and [[225/224]] via its [[patent val]] of {{val| 12 19 28 34}}, its approximations of [[7-limit]] intervals are not very accurate. It cannot be said to represent [[11/1|11]] or [[13/1|13]] at all, though it does a quite credible [[17/1|17]] and an even better [[19/1|19]]. Nevertheless, its relative tuning accuracy is quite high, and 12edo is the fourth [[zeta integral edo]].
@@ Line 40: / Line 37: @@
 |+ style="font-size: 105%;" | Intervals of 12edo
 |-
-! rowspan="2" | [[Degree]]
+! [[Degree]]
-! rowspan="2" | [[Cent]]s
+! [[Cent]]s
-! rowspan="2" | [[Interval region]]
+! [[Interval region]]
-! colspan="4" | Approximated [[JI]] intervals<ref group="note">{{sg|limit=2.3.5.7.17.19 subgroup}}</ref> ([[error]] in [[¢]])
+! style="width: 165px;" | Approximated 5-limit<br>JI intervals (error in [[¢]])
-! rowspan="2" | Audio
+! Audio
-|-
+! style="width: 330px;" | Higher limit interpretations<ref group="note">Intervals of the 2.3.5.7.17.19 subgroup, with a few additional interpretations</ref>
-! [[3-limit]]
-! [[5-limit]]
-! [[7-limit]]
-! Other
 |-
 | 0
@@ Line 55: / Line 48: @@
 | Unison (prime)
 | [[1/1]] (just)
-|
-|
-|
 | [[File:piano_0_1edo.mp3]]
+|
 |-
 | 1
 | 100
 | Minor second
-|
+| [[256/243]] (+9.775)<br>[[25/24]] (+29.328)<br>[[16/15]] (−11.731)
-| [[25/24]] (+29.328)<br>[[16/15]] (−11.731)
-| [[28/27]] (+37.039)<br>[[21/20]] (+15.533)<br>[[15/14]] (−19.443)
-| [[18/17]] (+1.045)<br>[[17/16]] (−4.955)
 | [[File:piano_1_12edo.mp3]]
+| [[28/27]] (+37.039), [[21/20]] (+15.533), [[15/14]] (−19.443)<br>[[17/16]] (−4.955), [[18/17]] (+1.045)<br>[[19/18]] (+6.397), [[20/19]] (+11.199)
 |-
 | 2
 | 200
 | Major second
-| [[9/8]] (−3.910)
+| [[9/8]] (−3.910)<br>[[10/9]] (+17.596)
-| [[10/9]] (+17.596)
-| [[28/25]] (+3.802)<br>[[8/7]] (−31.174)
-| [[19/17]] (+7.442)<br>[[55/49]] (+0.020)<br>[[64/57]] (−0.532)<br>[[17/15]] (−16.687)
 | [[File:piano_1_6edo.mp3]]
+| [[8/7]] (−31.174), [[28/25]] (+3.802)<br>[[17/15]] (−16.687), [[19/17]] (+7.442),<br>[[55/49]] (+0.020), [[64/57]] (−0.532)
 |-
 | 3
 | 300
 | Minor third
-| [[32/27]] (+5.865)
+| [[32/27]] (+5.865)<br>[[6/5]] (−15.641)<br>[[75/64]] (+25.418)
-| [[6/5]] (−15.641)
-| [[7/6]] (+33.129)<br>[[25/21]] (−1.847)
-| [[19/16]] (+2.487)<br>[[44/37]] (+0.026)
 | [[File:piano_1_4edo.mp3]]
+| [[7/6]] (+33.129), [[25/21]] (−1.847)<br>[[19/16]] (+2.487)
 |-
 | 4
 | 400
 | Major third
-| [[81/64]] (−7.820)
+| [[81/64]] (−7.820)<br>[[5/4]] (+13.686)<br> [[32/25]] (-27.373)
-| [[5/4]] (+13.686)
-| [[63/50]] (−0.108)<br>[[9/7]] (−35.084)
-| [[34/27]] (+0.910)<br>[[24/19]] (−4.442)
 | [[File:piano_1_3edo.mp3]]
+| [[63/50]] (−0.108), [[9/7]] (−35.084)<br>[[34/27]] (+0.910), [[24/19]] (−4.442)
 |-
 | 5
 | 500
 | Fourth
-| [[4/3]] (+1.955)
+| [[4/3]] (+1.955)<br> [[27/20]] (-19.551)
-|
-|
-|
 | [[File:piano_5_12edo.mp3]]
+| [[21/16]] (-29.219)
 |-
 | 6
 | 600
 | [[Tritone]]
-|
+| [[25/18]] (+31.283)<br>[[36/25]] (-31.283)<br>[[45/32]] (+9.776)<br>[[64/45]] (−9.776)
-| [[45/32]] (+9.776)<br>[[64/45]] (−9.776)
-| [[7/5]] (+17.488)<br>[[10/7]] (−17.488)
-| [[24/17]] (+3.000)<br>[[99/70]] (−0.088)<br>[[17/12]] (−3.000)
 | [[File:piano_1_2edo.mp3]]
+| [[7/5]] (+17.488), [[10/7]] (−17.488)<br>[[24/17]] (+3.000), [[17/12]] (−3.000)<br>[[99/70]] (−0.088), [[140/99]] (+0.088)
 |-
 | 7
 | 700
 | Fifth
-| [[3/2]] (−1.955)
+| [[3/2]] (−1.955)<br>[[40/27]] (+19.551)
-|
-|
-|
 | [[File:piano_7_12edo.mp3]]
+| [[32/21]] (+29.219)
 |-
 | 8
 | 800
 | Minor sixth
-| [[128/81]] (+7.820)
+| [[128/81]] (+7.820)<br>[[8/5]] (−13.686)<br>[[25/16]] (+27.373)
-| [[8/5]] (−13.686)
-| [[14/9]] (+35.084)<br>[[100/63]] (+0.108)
-| [[19/12]] (+4.442)<br>[[27/17]] (−0.910)
 | [[File:piano_2_3edo.mp3]]
+| [[14/9]] (+35.084), [[100/63]] (+0.108)<br>[[19/12]] (+4.442), [[27/17]] (−0.910)
 |-
 | 9
 | 900
 | Major sixth
-| [[27/16]] (−5.865)
+| [[27/16]] (−5.865)<br>[[5/3]] (+15.641)<br>[[128/75]] (-25.418)
-| [[5/3]] (+15.641)
-| [[42/25]] (+1.847)<br>[[12/7]] (−33.129)
-| [[37/22]] (−0.026)<br>[[32/19]] (−2.487)
 | [[File:piano_3_4edo.mp3]]
+| [[12/7]] (−33.129), [[42/25]] (+1.847)<br>[[32/19]] (−2.487)
 |-
 | 10
 | 1000
 | Minor seventh
-| [[16/9]] (+3.910)
+| [[16/9]] (+3.910)<br>[[9/5]] (−17.596)
-| [[9/5]] (−17.596)
-| [[7/4]] (+31.174)<br>[[25/14]] (−3.802)
-| [[30/17]] (+16.687)<br>[[57/32]] (+0.532)<br>[[98/55]] (−0.020)<br>[[34/19]] (−7.442)
 | [[File:piano_5_6edo.mp3]]
+| [[7/4]] (+31.174), [[25/14]] (−3.802)<br>[[30/17]] (+16.687), [[34/19]] (−7.442)<br>[[98/55]] (-0.020), [[57/32]] (+0.532)
 |-
 | 11
 | 1100
 | Major seventh
-|
+| [[243/128]] (-9.775)<br>[[15/8]] (+11.731)<br>[[48/25]] (−29.328)
-| [[15/8]] (+11.731)<br>[[48/25]] (−29.328)
-| [[28/15]] (+19.443)<br>[[40/21]] (−15.533)<br>[[27/14]] (−37.039)
-| [[32/17]] (+4.955)<br>[[17/9]] (−1.045)
 | [[File:piano_11_12edo.mp3]]
+| [[28/15]] (+19.443), [[40/21]] (−15.533), [[27/14]] (−37.039)<br>[[32/17]] (+4.955), [[17/9]] (−1.045)<br>[[36/19]] (-6.397), [[19/10]] (-11.199)
 |-
 | 12
@@ Line 163: / Line 132: @@
 | Octave
 | [[2/1]] (just)
-|
-|
-|
 | [[File:piano_1_1edo.mp3]]
+|
 |}
+<references group="note" />
 == Notation ==
-edo intervals and notes have standard names from classical music theory. This classical notation system, which was in use before 12edo with other tuning systems based on chains of fifths, is sometimes called the [[chain-of-fifths notation]] or extended Pythagorean notation.
+The intervals and notes of 12edo have standard names from classical music theory. This classical notation system, which was in use before 12edo with other tuning systems based on chains of fifths, is sometimes called the [[chain-of-fifths notation]] or extended Pythagorean notation.
 {{Sharpness-sharp1|12}}
-{{EDOs|1edo, 2edo, 3edo, 4edo and 6edo}} can all be written using 12edo [[subset notation]].
+The subsets {{EDOs|1edo, 2edo, 3edo, 4edo and 6edo}} can all be written using 12edo [[subset notation]].
-Any 12edo note or interval can be [[Enharmonic unison|respelled enharmonically]] by adding a diminished 2nd to it or subtracting one from it.
+Any 12edo note or interval can be [[Enharmonic unison|respelled enharmonically]] by adding a [[pythagorean comma]] to it or subtracting one from it.
 {| class="wikitable center-all"
@@ Line 364: / Line 332: @@
 |-
 | 2.3
-| {{monzo| -19 12 }}
+| {{Monzo| -19 12 }}
-| {{mapping| 12 19 }}
+| {{Mapping| 12 19 }}
 | +0.62
 | 0.62
@@ Line 372: / Line 340: @@
 | 2.3.5
 | 81/80, 128/125
-| {{mapping| 12 19 28 }}
+| {{Mapping| 12 19 28 }}
 | −1.56
 | 3.11
@@ Line 379: / Line 347: @@
 | 2.3.5.7
 | 36/35, 50/49, 64/63
-| {{mapping| 12 19 28 34 }}
+| {{Mapping| 12 19 28 34 }}
 | −3.95
 | 4.92
@@ Line 386: / Line 354: @@
 | 2.3.5.7.17
 | 36/35, 50/49, 51/49, 64/63
-| {{mapping| 12 19 28 34 49 }}
+| {{Mapping| 12 19 28 34 49 }}
 | −2.92
 | 4.86
@@ Line 393: / Line 361: @@
 | 2.3.5.7.17.19
 | 36/35, 50/49, 51/49, 57/56, 64/63
-| {{mapping| 12 19 28 34 49 51 }}
+| {{Mapping| 12 19 28 34 49 51 }}
 | −2.53
 | 4.52
@@ Line 400: / Line 368: @@
 | 2.3.5.17
 | 51/50, 81/80, 128/125
-| {{mapping| 12 19 28 49 }}
+| {{Mapping| 12 19 28 49 }}
 | −0.87
 | 2.95
@@ Line 407: / Line 375: @@
 | 2.3.5.17.19
 | 51/50, 76/75, 81/80, 128/125
-| {{mapping| 12 19 28 49 51 }}
+| {{Mapping| 12 19 28 49 51 }}
 | −0.81
 | 2.64
 | 2.64
 |}
-* 12et (using the 12f val, where 9 steps is used as the approximation of 13/8 instead of 8 steps) is lower in relative error than any previous equal temperaments in the 3-, 5-, 7-, 11-, 13-, and 19-limit. The next equal temperaments doing better in those subgroups are 41, 19, 19, 22, 19/19e, and 19egh, respectively. 12et is even more prominent in the 2.3.5.7.17.19 subgroup, and the next equal temperament that does this better is 72.
+* 12et is monotonic to the [[11-odd-limit]]. It is the first equal temperament to achieve this.
+* 12et has a lower relative error than any previous equal temperaments in the [[3-limit|3-]], [[5-limit|5-]], [[7-limit|7-]], and [[11-limit]]. The next equal temperaments doing better in those subgroups are [[41edo|41]], [[19edo|19]], 19, [[22edo|22]], respectively.
+* 12et is even more prominent in the 2.3.5.7.17.19 subgroup, and the next equal temperament that does this better is [[72edo|72]].
 === Uniform maps ===
@@ Line 418: / Line 388: @@
 === Commas ===
-edo [[tempering out|tempers out]] the following [[comma]]s. This assumes [[val]] {{val| 12 19 28 34 42 44 }}.
+edo [[tempering out|tempers out]] the following [[comma]]s. This assumes the [[val]] {{val| 12 19 28 34 42 44 49 51}}.
 {| class="commatable wikitable center-all left-3 right-4 left-6"
@@ Line 433: / Line 403: @@
 | {{monzo| -19 12 }}
 | 23.46
-| Lalawa
+| Lalawama / Poma
 | [[Pythagorean comma]]
 |-
@@ Line 440: / Line 410: @@
 | {{monzo| 3 4 -4 }}
 | 62.57
-| Quadgu
+| Quadguma
 | Diminished comma, greater diesis
 |-
@@ Line 447: / Line 417: @@
 | {{monzo| 18 -4 -5 }}
 | 60.61
-| Saquingu
+| Saquinguma
 | [[Passion comma]]
 |-
@@ Line 454: / Line 424: @@
 | {{monzo| 7 0 -3 }}
 | 41.06
-| Trigu
+| Triguma
 | Augmented comma, lesser diesis
 |-
@@ Line 461: / Line 431: @@
 | {{monzo| -4 4 -1 }}
 | 21.51
-| Gu
+| Guma
 | Syntonic comma, Didymus' comma, meantone comma
 |-
@@ Line 468: / Line 438: @@
 | {{monzo| 11 -4 -2 }}
 | 19.55
-| Sagugu
+| Saguguma
 | Diaschisma
 |-
@@ Line 475: / Line 445: @@
 | {{monzo| 26 -12 -3 }}
 | 17.60
-| Sasa-trigu
+| Sasa-triguma
 | [[Misty comma]]
 |-
@@ Line 482: / Line 452: @@
 | {{monzo| -15 8 1 }}
 | 1.95
-| Layo
+| Layoma
 | Schisma
 |-
@@ Line 489: / Line 459: @@
 | {{monzo| 161 -84 -12 }}
 | 0.02
-| Sepbisa-quadtrigu
+| Sepbisa-quadtriguma
 | [[Kirnberger's atom]]
 |-
@@ Line 496: / Line 466: @@
 | {{monzo| 8 0 -1 -2 }}
 | 76.03
-| Rurugu
+| Ruruguma
 | Bapbo comma
 |-
@@ Line 503: / Line 473: @@
 | {{monzo| -13 10 0 -1 }}
 | 50.72
-| Laru
+| Laruma
 | Harrison's comma
 |-
@@ Line 510: / Line 480: @@
 | {{monzo| 2 2 -1 -1 }}
 | 48.77
-| Rugu
+| Ruguma
 | Mint comma, septimal quarter tone
 |-
@@ Line 517: / Line 487: @@
 | {{monzo| 1 0 2 -2 }}
 | 34.98
-| Biruyo
+| Biruyoma
 | Jubilisma
 |-
@@ Line 524: / Line 494: @@
 | {{monzo| -9 6 1 -1 }}
 | 29.22
-| Laruyo
+| Laruyoma
 | Schismean comma
 |-
@@ Line 531: / Line 501: @@
 | {{monzo| 6 -2 0 -1 }}
 | 27.26
-| Ru
+| Ruma
 | Septimal comma
 |-
@@ Line 538: / Line 508: @@
 | {{monzo| 0 -2 5 -3 }}
 | 21.18
-| Triru-aquinyo
+| Triru-aquinyoma
 | Gariboh comma
 |-
@@ Line 545: / Line 515: @@
 | {{monzo| 1 2 -3 1 }}
 | 13.79
-| Zotrigu
+| Zotriguma
 | Starling comma
 |-
@@ Line 552: / Line 522: @@
 | {{monzo| 5 -4 3 -2 }}
 | 13.47
-| Rurutriyo
+| Rurutriyoma
 | Octagar comma
 |-
@@ Line 559: / Line 529: @@
 | {{monzo| -9 8 -4 2 }}
 | 8.04
-| Labizogugu
+| Labizoguguma
 | [[Varunisma]]
 |-
@@ Line 566: / Line 536: @@
 | {{monzo| -5 2 2 -1 }}
 | 7.71
-| Ruyoyo
+| Ruyoyoma
 | Marvel comma
 |-
@@ Line 573: / Line 543: @@
 | {{monzo| 6 0 -5 2 }}
 | 6.08
-| Zozoquingu
+| Zozoquinguma
 | Hemimean comma
 |-
@@ Line 580: / Line 550: @@
 | {{monzo| 10 -6 1 -1 }}
 | 5.76
-| Saruyo
+| Saruyoma
 | Hemifamity comma
 |-
@@ Line 587: / Line 557: @@
 | {{monzo| 25 -14 0 -1 }}
 | 3.80
-| Sasaru
+| Sasaruma
 | [[Garischisma]]
 |-
@@ Line 594: / Line 564: @@
 | {{monzo| -11 2 7 -3 }}
 | 1.63
-| Latriru-asepyo
+| Latriru-asepyoma
 | [[Metric comma]]
 |-
@@ Line 601: / Line 571: @@
 | {{monzo| -4 6 -6 3 }}
 | 0.33
-| Trizogugu
+| Trizoguguma
 | [[Landscape comma]]
 |-
@@ Line 608: / Line 578: @@
 | {{monzo| 7 0 0 0 -2 }}
 | 97.36
-| 1uu2
+| Lulubima
 | Axirabian limma
 |-
@@ Line 615: / Line 585: @@
 | {{monzo| -2 2 1 0 -1 }}
 | 38.91
-| Luyo
+| Luyoma
 | Undecimal fifth tone
 |-
@@ Line 622: / Line 592: @@
 | {{monzo| 3 0 -1 1 -1 }}
 | 31.19
-| Luzogu
+| Luzoguma
 | Undecimal tritonic comma
 |-
@@ Line 629: / Line 599: @@
 | {{monzo| -1 0 1 2 -2 }}
 | 21.33
-| Luluzozoyo
+| Luluzozoyoma
 | Frostma
 |-
@@ Line 636: / Line 606: @@
 | {{monzo| -1 2 0 -2 1 }}
 | 17.58
-| Loruru
+| Loruruma
 | Mothwellsma
 |-
@@ Line 643: / Line 613: @@
 | {{monzo| 2 -2 2 0 -1 }}
 | 17.40
-| Luyoyo
+| Luyoyoma
 | Ptolemisma
 |-
@@ Line 650: / Line 620: @@
 | {{monzo| 4 0 -2 -1 1 }}
 | 9.86
-| Lorugugu
+| Loruguguma
 | Valinorsma
 |-
@@ Line 657: / Line 627: @@
 | {{monzo| 7 -4 0 1 -1 }}
 | 9.69
-| Saluzo
+| Saluzoma
 | Pentacircle comma
 |-
@@ Line 664: / Line 634: @@
 | {{monzo| -3 2 -1 2 -1 }}
 | 3.93
-| Luzozogu
+| Luzozoguma
 | Werckisma
 |-
@@ Line 671: / Line 641: @@
 | {{monzo| -3 4 -2 -2 2 }}
 | 0.18
-| Bilorugu
+| Biloruguma
 | Kalisma
 |-
@@ Line 678: / Line 648: @@
 | {{monzo| -6 0 1 0 0 1 }}
 | 26.84
-| Thoyo
+| Thoyoma
 | Wilsorma
 |-
@@ Line 685: / Line 655: @@
 | {{monzo| -1 -2 -1 1 0 1 }}
 | 19.13
-| Thozogu
+| Thozoguma
 | Superleap comma, biome comma
 |-
@@ Line 692: / Line 662: @@
 | {{monzo| 4 2 0 0 -1 -1 }}
 | 12.06
-| Thulu
+| Thuluma
 | Grossma
 |-
@@ Line 699: / Line 669: @@
 | {{monzo| -3 0 -3 1 1 1 }}
 | 1.73
-| Tholozotrigu
+| Tholozotriguma
 | Fairytale comma, sinbadma
 |-
@@ Line 706: / Line 676: @@
 | {{monzo| 12 -2 -1 -1 0 -1 }}
 | 0.42
-| Sathurugu
+| Sathuruguma
-| Schismina
+| Minisma
 |-
 | 17
@@ Line 713: / Line 683: @@
 | {{monzo| -1 1 -2 0 0 0 1 }}
 | 34.28
-| Sogugu
+| Soguguma
 | Large septendecimal sixth tone
 |-
@@ Line 720: / Line 690: @@
 | {{monzo| 2 -1 0 0 0 1 -1 }}
 | 33.62
-| Sutho
+| Suthoma
 | Small septendecimal sixth tone
 |-
@@ Line 727: / Line 697: @@
 | {{monzo| 3 -3 -1 0 0 0 1 }}
 | 12.78
-| Sogu
+| Soguma
 | Diatisma, fiventeen comma
 |-
@@ Line 734: / Line 704: @@
 | {{monzo| 8 -1 -1 0 0 0 -1 }}
 | 6.78
-| Sugu
+| Suguma
 | Charisma, septendecimal kleisma
 |-
@@ Line 741: / Line 711: @@
 | {{monzo| -5 -2 0 0 0 0 2 }}
 | 6.00
-| Soso
+| Sosoma
 | Semitonisma
 |-
@@ Line 748: / Line 718: @@
 | {{monzo| -3 2 -2 0 0 -1 2 }}
 | 0.67
-| Sosothugugu
+| Sosothuguguma
 | Sextantonisma
 |-
@@ Line 755: / Line 725: @@
 | {{monzo| -1 1 0 0 0 1 0 -1 }}
 | 44.97
-| Nutho
+| Nuthoma
 | Undevicesimal two-ninth tone
 |-
@@ Line 762: / Line 732: @@
 | {{monzo| 5 1 -1 0 0 0 0 -1 }}
 | 18.13
-| Nugu
+| Nuguma
 | 19th-partial chroma
 |-
@@ Line 769: / Line 739: @@
 | {{monzo| -3 2 0 0 0 0 1 -1}}
 | 11.35
-| Nuso
+| Nusoma
 | Ganassisma
 |-
@@ Line 776: / Line 746: @@
 | {{monzo| -1 2 -1 0 0 0 -1 1 }}
 | 10.15
-| Nosugu
+| Nosuguma
 | Malcolmisma
 |-
@@ Line 783: / Line 753: @@
 | {{monzo| 2 4 0 0 0 0 -1 -1 }}
 | 5.35
-| Nusu
+| Nusuma
 | Photisma
 |-
@@ Line 790: / Line 760: @@
 | {{monzo| -3 -2 -1 0 0 0 0 2 }}
 | 4.80
-| Nonogu
+| Nonoguma
 | Go comma
+|-
+|19
+|[[513/512]]
+|{{Monzo|9 3 0 0 0 0 0 -1}}
+|3.37
+|Lanoma
+|Boethius' comma
 |}
+<references group="note" />
 === Rank-2 temperaments ===
-* [[List of 12et rank two temperaments by badness]]
-* [[List of 12et rank two temperaments by complexity]]
-* [[List of edo-distinct 12f rank two temperaments]]
-* [[Schismic–Pythagorean equivalence continuum]]
 {| class="wikitable center-1 center-2"
 |-
@@ Line 810: / Line 783: @@
 | 1\12
 | (P8, P4/5)
-| [[Ripple]] / [[passion]]
+| [[Ripple]], [[passion]]
 |-
 | 1
 | 5\12
 | (P8, P5)
-| [[Meantone]] / [[Dominant (temperament)|dominant]]
+| [[Meantone]] / [[dominant (temperament)|dominant]]
 |-
 | 2
 | 5\12 (1\12)
 | (P8/2, P5)
-| [[Srutal]] / [[pajara]] / [[injera]]
+| [[Pajara]], [[injera]]
 |-
 | 3
 | 5\12 (1\12)
 | (P8/3, P5)
-| [[Augmented (temperament)|Augmented]] / [[lithium]]
+| [[Augmented (temperament)|Augmented]] / [[august]]
 |-
 | 4
@@ Line 837: / Line 810: @@
 | [[Hexe]]
 |}
-<nowiki/>* [[Normal lists|Octave-reduced form]], reduced to the first half-octave, and [[Normal lists|minimal form]] in parentheses if distinct
+<nowiki>*</nowiki> [[Normal forms #Equave-reduced-generator form|Octave-reduced form]], reduced to the first half-octave, and [[normal forms #Minimal-generator form|minimal form]] in parentheses if distinct
+Rank-2 temperaments to which 12et can be [[detempering|detempered]] include [[compton]] (12 & 72), [[garibaldi]] (41 & 53), and [[diaschismic]] (46 & 58). For more comprehensive lists, see:
+* [[List of 12et rank two temperaments by badness]]
+* [[List of 12et rank two temperaments by complexity]]
+* [[List of edo-distinct 12f rank two temperaments]]
+* [[Schismic–commatic equivalence continuum]]
 == Octave stretch or compression ==
-Whether there is intonational improvement from [[stretched and compressed tuning|octave stretch and compression]] for 12edo varies by context. A slight compression such as what is given by [[40ed10]] and [[zpi|34zpi]] shows improved intonation of harmonics [[5/1|5]] and [[7/1|7]] at the cost of worse [[2/1|2]] and [[3/1|3]], while stretching the octave for a purer 3 and for a better match of the inharmonicity on string instruments, like those in [[7edf]], [[19edt]], or [[31ed6]], also makes sense.
+Whether there is intonational improvement from [[stretched and compressed tuning|octave stretch and compression]] for 12edo varies by context. A slight compression such as what is given by [[40ed10]] and [[zpi|34zpi]] shows improved intonation of harmonics [[5/1|5]] and [[7/1|7]] at the cost of worse [[2/1|2]] and [[3/1|3]]; while stretching the octave for a purer 3 and for a better match of the inharmonicity on string instruments, like those in [[7edf]], [[19edt]], or [[31ed6]], also makes sense.
 == Scales ==
@@ Line 873: / Line 852: @@
 == Music ==
 {{Catrel|12edo tracks}}
+The vast majority of music today is in 12edo or 12edo with slight modifications. As such, one can easily find 12edo music by going on any music streaming service.
 == See also ==
@@ Line 878: / Line 859: @@
 * [[:purdal:12-EDD]]{{dead link}}
 * [[Near12]] – a just intonation scale where every interval is within 12.5 cents of a 12edo step
-* [https://en.xen.wiki/w/Equal-step_tuning#Alpha-beta-gamma_family_of_equal_divisions Alpha-beta-gamma_family_of_equal_divisions]
-== Notes ==
-<references group="note" />
 == External links ==

12edo: Difference between revisions