12edo: Difference between revisions

{{Interwiki

{{Infobox ET}}

{{Wikipedia|12 equal temperament}}

{{ED intro}} It is the predominating tuning system in the world today.

12edo 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, tempering out [[81/80]], equating four [[3/2|perfect fifths]] with the [[5/1|5th harmonic]].

 

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 intonation]]. 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.

 

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}}

 

12edo 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]].

 

Stacking the fifth twelve times returns the pitch to the starting point, so that the Pythagorean comma, [[Pythagorean comma|3¹²/2¹⁹]], is tempered out. Three major thirds equal an octave, so the lesser diesis, [[128/125]], is tempered out. Four minor thirds also equal an octave, so the greater diesis, [[648/625]], is tempered out. These features have been widely utilized in contemporary music. The [[duodene]] is an unequal 12-note scale in 5-limit just intonation which observes these commas, and can be considered a [[detempering|detemper]] of 12edo. Other [[comma]]s 12et [[tempering out|tempers out]] include the diaschisma, [[2048/2025]], and the schisma, [[32805/32768]], and in the 7-limit, the septimal quartertone, [[36/35]], and the jubilisma, [[50/49]]. Each affects the structure of 12et in specific ways, and tuning systems which share the comma in question will be similar to 12et in precisely those ways.

12edo also offers very good approximations to intervals in the 2.3.17.19 subgroup. This indicates one way to use 12edo that deviates from common-practice harmony; for instance the cluster chord 8:17:36:76 is well represented, as well as the [[16:19:24]] otonal minor triad.

{{Harmonics in equal|12|prec=2}}

12edo contains [[2edo]], [[3edo]], [[4edo]], and [[6edo]] as subsets. It is the 5th [[highly composite edo]], 12 being both a superabundant and a highly composite number. 12edo is also the only known edo aside from 2edo that is both [[the Riemann zeta function and tuning|strict zeta]] and highly composite.  

[[24edo]], which doubles it, improves significantly on approximations to 11 and 13, with 13 tuned sharp. [[36edo]], which triples it, improves on harmonics 7 and 13, but has the 13 tuned flat instead of sharp. [[72edo]] is a notable zeta-record edo, and [[60edo|60-]], [[84edo|84-]], and [[96edo]] all see utilities. Notable [[rank-2 temperament]]s that augment 12edo with extra [[generator]]s include [[compton]] and [[catler]].

{| class="wikitable center-all"

|+ style="font-size: 105%;" | Intervals of 12edo

! [[Degree]]

! [[Cent]]s

! [[Interval region]]

! style="width: 165px;" | Approximated 5-limit<br>JI intervals (error in [[¢]])

! 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>

| Unison (prime)

| [[1/1]] (just)

| [[File:piano_0_1edo.mp3]]

|

| Minor second

| [[256/243]] (+9.775)<br>[[16/15]] (−11.731)<br>[[25/24]] (+29.328)

| [[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)

| Major second

| [[9/8]] (−3.910)<br>[[10/9]] (+17.596)

| [[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)

| Minor third

| [[32/27]] (+5.865)<br>[[6/5]] (−15.641)<br>[[75/64]] (+25.418)

| [[File:piano_1_4edo.mp3]]

| [[7/6]] (+33.129), [[25/21]] (−1.847)<br>[[19/16]] (+2.487)

| Major third

| [[81/64]] (−7.820)<br>[[5/4]] (+13.686)<br> [[32/25]] (-27.373)

| [[File:piano_1_3edo.mp3]]

| [[63/50]] (−0.108), [[9/7]] (−35.084)<br>[[34/27]] (+0.910), [[24/19]] (−4.442)

| Fourth

| [[4/3]] (+1.955)<br> [[27/20]] (-19.551)

| [[File:piano_5_12edo.mp3]]

| [[21/16]] (-29.219)

| [[Tritone]]

| [[25/18]] (+31.283)<br>[[36/25]] (-31.283)<br>[[45/32]] (+9.776)<br>[[64/45]] (−9.776)

| [[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)

| Fifth

| [[3/2]] (−1.955)<br>[[40/27]] (+19.551)

| [[File:piano_7_12edo.mp3]]

| [[32/21]] (+29.219)

| Minor sixth

| [[128/81]] (+7.820)<br>[[8/5]] (−13.686)<br>[[25/16]] (+27.373)

| [[File:piano_2_3edo.mp3]]

| [[14/9]] (+35.084), [[100/63]] (+0.108)<br>[[19/12]] (+4.442), [[27/17]] (−0.910)

| Major sixth

| [[27/16]] (−5.865)<br>[[5/3]] (+15.641)<br>[[128/75]] (-25.418)

| [[File:piano_3_4edo.mp3]]

| [[12/7]] (−33.129), [[42/25]] (+1.847)<br>[[32/19]] (−2.487)

| Minor seventh

| [[16/9]] (+3.910)<br>[[9/5]] (−17.596)

| [[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)

| Major seventh

| [[243/128]] (-9.775)<br>[[15/8]] (+11.731)<br>[[48/25]] (−29.328)

| [[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)

| Octave

| [[2/1]] (just)

| [[File:piano_1_1edo.mp3]]

|

<references group="note" />

 

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}}

Any 12edo note or interval can be [[Enharmonic unison|respelled enharmonically]] by adding a [[pythagorean comma]] to it or subtracting one from it.

! rowspan="2" | [[Degree]]

! rowspan="2" | [[Cent]]s

! colspan="2" | [[Chain-of-fifths notation|Standard notation]]

! Diatonic ([[5L&nbsp;2s]]) interval names

| 0

| 0

| 1

| 100

| 2

| 200

| 3

| Augmented second (A2)<br>'''Minor third (m3)'''

| E#<br>'''F'''

| 4

| 400

| 5

| 500

| 7

| 700

| 8

| 800

| 9

| 900

| 10

| Augmented sixth (A6)<br>'''Minor seventh (m7)'''

| B#<br>'''C'''

| 11

| 1100

| 12

 

* [[Ups and downs notation]] is identical to standard notation;

 

This notation uses the same sagittal sequence as EDOs [[5edo#Sagittal notation|5]], [[19edo#Sagittal notation|19]], and [[26edo#Sagittal notation|26]], is a subset of the notations for EDOs [[24edo#Sagittal notation|24]], [[36edo#Sagittal notation|36]], [[48edo#Sagittal notation|48]], [[60edo#Sagittal notation|60]], [[72edo#Sagittal notation|72]], and [[84edo#Sagittal notation|84]], and is a superset of the notation for [[6edo#Sagittal notation|6-EDO]].

 

{{Sagittal chart|Evo}}

 

Because it includes no Sagittal symbols, this Evo Sagittal notation is also a conventional notation.

 

 

! [[Degree]]

! Standard [[solfege]]<br>(movable do)

| 0

| 0

| 1

| 100

| 2

| 200

| 3

| 300

| 4

| 400

| 5

| 500

| 6

| 600

| 7

| 700

| 8

| 800

| 9

| 900

| La

| La (M6)<br>Tho (d7)

| 10

| 1000

| Li (A6)<br>Te (m7)

| Lu (A6)<br>Tha (m7)

| 11

| 1100

| Ti

| Ta (M7)<br>Do (d8)

| 12

| 1200

| Do

| Da

== Approximation to JI ==

[[File:12ed2-5Limit.svg|250px|thumb|right|alt=alt : Your browser has no SVG support.|Selected 5-limit intervals approximated in 12edo]]

 

{{Q-odd-limit intervals|12}}

{{Q-odd-limit intervals|12.1|apx=val|header=none|tag=none|title=15-odd-limit intervals by 12f val mapping}}

{| class="wikitable center-4 center-5 center-6"

! rowspan="2" | [[Subgroup]]

! rowspan="2" | Optimal<br>8ve stretch (¢)

! [[TE error|Absolute]] (¢)

! [[TE simple badness|Relative]] (%)

| 2.3

| {{Monzo| -19 12 }}

| 0.62

| 2.3.5

| {{Mapping| 12 19 28 }}

| 3.11

| 2.3.5.7

| 36/35, 50/49, 64/63

| {{Mapping| 12 19 28 34 }}

| 4.94

| 2.3.5.7.17

| 36/35, 50/49, 51/49, 64/63

| {{Mapping| 12 19 28 34 49 }}

| 4.87

| 4.53

| {{Mapping| 12 19 28 49 }}

| 2.95

| 2.3.5.17.19

| 51/50, 76/75, 81/80, 128/125

| {{Mapping| 12 19 28 49 51 }}

| 2.64

=== Uniform maps ===

{{Uniform map|edo=12}}

=== Commas ===

12edo [[tempering out|tempers out]] the following [[comma]]s. This assumes the [[val]] {{val| 12 19 28 34 42 44 49 51}}.

! [[Ratio]]<ref group="note">{{rd}}</ref>

! Name

| <abbr title="531441/524288">(12 digits)</abbr>

| Lalawama / Poma

| Quadguma

| Diminished comma, greater diesis

| [[Passion comma]]

| Triguma

| Augmented comma, lesser diesis

| Guma

| Syntonic comma, Didymus' comma, meantone comma

| Saguguma

| <abbr title="67108864/66430125">(16 digits)</abbr>

| Sasa-triguma

| Layoma

| Sepbisa-quadtriguma

| [[Kirnberger's atom]]

| Ruguma

| Mint comma, septimal quarter tone

| Biruyoma

| Jubilisma

| Ruma

| Septimal comma

| Triru-aquinyoma

| Gariboh comma

| Zotriguma

| Starling comma

| Rurutriyoma

| Octagar comma

| Labizoguguma

| Ruyoyoma

| Marvel comma

| Zozoquinguma

| Hemimean comma

| Saruyoma

| Hemifamity comma

| Sasaruma

| Latriru-asepyoma

| [[Metric comma]]

| Trizoguguma

| Loruruma

| Luyoyoma

| Loruguguma

| Saluzoma

| Pentacircle comma

| Luzozoguma

| Biloruguma

| Kalisma

| Thozoguma

| Superleap comma, biome comma

 

<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

 

 

 

 

 

 

 

 

 

 

* [http://tonalsoft.com/enc/number/12edo.aspx 12-tone equal-temperament] on [[Tonalsoft Encyclopedia]]

[[Category:3-limit record edos|##]] <!-- 2-digit number -->

[[Category:Historical]]