Diminished seventh chord: Difference between revisions
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{{Wikipedia}} | {{Wikipedia}} | ||
A '''diminished seventh chord''' is a [[tetrad]] comprising a root, [[minor]] third, [[interval quality|diminished]] fifth, and diminished seventh, conventionally formed by stacking three minor thirds. | |||
== In temperaments == | == In temperaments == | ||
If [[648/625]] is [[tempering out|tempered out]], as in the [[dimipent]] temperament (loosely named for this chord), a ~[[36/25]] diminished fifth is equated with its [[complement]] (~[[25/18]]), | If [[648/625]] is [[tempering out|tempered out]], as in the [[dimipent]] temperament (loosely named for this chord), a stack of three [[~]][[6/5]] minor thirds is tempered to leave another ~6/5 to close the octave. The ~[[36/25]] diminished fifth is equated with its [[complement]] (~[[25/18]]), and the ~[[216/125]] diminished seventh is equated with a ~[[5/3]] major sixth, forming a [[25-odd-limit]] [[essentially tempered chord]]: | ||
* (Dimipent) 1 – 6/5 – 25/18 – 5/3 | * (Dimipent) 1 – 6/5 – 25/18 – 5/3 | ||
If [[36/35]] is also tempered out, giving [[Diminished (temperament)|diminished temperament]] (also named for this chord), the ~ | If [[36/35]] is also tempered out, giving [[Diminished (temperament)|diminished temperament]] (also named for this chord), the ~36/25 diminished fifth is equated with ~[[7/5]], and the stack of ~6/5 thirds becomes a [[7-odd-limit]] [[essentially tempered chord]]: | ||
* (Diminished) 1 – 6/5 – 7/5 – 5/3 | * (Diminished) 1 – 6/5 – 7/5 – 5/3 | ||
(Note that the interval of ~[[25/18]] between ~6/5 and ~5/3 tempers to ~[[10 | (Note that the interval of ~[[25/18]] between ~6/5 and ~5/3 tempers to ~[[10/7]].) | ||
In 5-limit [[meantone]], which tempers out [[81/80]], a stack of three minor thirds tempers to ~[[128/75]], leaving a ~[[75/64]] augmented second to close the octave. The resulting chord has an [[intervallic odd limit]] of 75: | In 5-limit [[meantone]], which tempers out [[81/80]], a stack of three ~6/5 minor thirds tempers to ~[[128/75]], leaving a ~[[75/64]] augmented second to close the octave. The resulting chord has an [[intervallic odd limit]] of 75: | ||
* (Meantone) 1 – 6/5 – 36/25 – 128/75 | * (Meantone) 1 – 6/5 – 36/25 – 128/75 | ||
However, if [[126/125]] is tempered out instead or in addition, as in [[starling]] and [[septimal meantone]], the chord becomes a [[7-odd-limit]] [[essentially tempered chord]]: | |||
However, if [[126/125]] is tempered out instead or in addition, as in [[starling]] and [[septimal meantone]], the chord becomes | |||
* (Starling) 1 – 6/5 – 10/7 – 12/7 | * (Starling) 1 – 6/5 – 10/7 – 12/7 | ||
Since [[12edo]] is a good tuning of dimipent and supports both diminished temperament and septimal meantone, and the historically prevalent [[quarter-comma meantone]] is a good tuning of septimal meantone (although it was historically usually analyzed as a 5-limit temperament), any of the above interpretations may be relevant for diminished chords found in common-practice and contemporary music. | Since [[12edo]] is a good tuning of dimipent and supports both diminished temperament and septimal meantone, and the historically prevalent [[quarter-comma meantone]] is a good tuning of septimal meantone (although it was historically usually analyzed as a 5-limit temperament), any of the above interpretations may be relevant for diminished chords found in common-practice and contemporary music. | ||
== In equal temperaments == | |||
4edo (and multiples thereof): 0-300-600-900 cents | |||
13edo: 0-277-554-923 cents, 1/1-7/6-11/8-12/7 | |||
15edo: 0-320-640-880 cents, 1/1-6/5-16/11-5/3 | |||
17edo: 0-282-565-918 cents, 1/1-33/28-11/8-56/33 | |||
== In just intonation == | == In just intonation == | ||
In the [[7-limit]]: | In the [[7-limit]]: | ||
* [[15:18:21:25]] is a [[preimage]] of the chord | * [[15:18:21:25]] is a [[preimage]] of the essentially-tempered chord of diminished temperament, found in [[Euler-Fokker genus|genus]] 3<sup>2</sup>{{dot}}5<sup>2</sup>{{dot}}7. | ||
* [[35:42:50:60]] is a preimage of the chord | * [[35:42:50:60]] is a preimage of the essentially-tempered chord of starling temperament, also found in genus 3{{dot}}5<sup>2</sup>{{dot}}7. | ||
* [[25:30:35:42]] is the result of using step pattern 6/5, 7/6, 6/5. | |||
* [[30:35:42:49]] is the result of using step pattern 7/6, 6/5, 7/6. | |||
In the [[5-limit]]: | In the [[5-limit]]: | ||
* [[125:150:180:216]] is the 125-odd chord produced by stacking three [[6/5]] minor thirds | * [[125:150:180:216]] is the 125-odd chord produced by stacking three [[6/5]] minor thirds, leaving a [[125/108]] augmented second to close the octave. Its [[rotation|rotations]] represent chords that would be enharmonically equivalent to itself in dimipent temperament, substituting the augmented second for one of the minor thirds. | ||
* [[225:270:320:384]] is | |||
* [[ | * In the [[duodene]], there are three unique diminished seventh chords, each combining one [[32/27]] and two 6/5 minor thirds and leaving a [[75/64]] augmented second to close the octave. In just intonation the sequence of the intervals uniquely identifies the root and [[rotation]] of the chord, whereas they would all be [[tempered together]] in meantone. | ||
** [[75:90:108:128]] (6/5, 6/5, 32/27) is an [[otonal]] chord found on iii<sup>o7</sup> ({{Frac|5|4}}). | |||
** [[225:270:320:384]] (6/5, 32/27, 6/5) is an [[ambitonal]] chord found on vii<sup>o7</sup> ({{Frac|15|8}}), and is closely related to the [[36:45:54:64]] dominant seventh chord, stacking on an additional minor third (to make a “dominant ninth”) and dropping the root. | |||
** [[675:800:960:1152]] (32/27, 6/5, 6/5) is a [[utonal]] chord found on ♯iv<sup>o7</sup> ({{Frac|45|32}}). | |||
In higher limits: | In higher limits: | ||
Latest revision as of 13:09, 20 April 2025
A diminished seventh chord is a tetrad comprising a root, minor third, diminished fifth, and diminished seventh, conventionally formed by stacking three minor thirds.
In temperaments
If 648/625 is tempered out, as in the dimipent temperament (loosely named for this chord), a stack of three ~6/5 minor thirds is tempered to leave another ~6/5 to close the octave. The ~36/25 diminished fifth is equated with its complement (~25/18), and the ~216/125 diminished seventh is equated with a ~5/3 major sixth, forming a 25-odd-limit essentially tempered chord:
- (Dimipent) 1 – 6/5 – 25/18 – 5/3
If 36/35 is also tempered out, giving diminished temperament (also named for this chord), the ~36/25 diminished fifth is equated with ~7/5, and the stack of ~6/5 thirds becomes a 7-odd-limit essentially tempered chord:
- (Diminished) 1 – 6/5 – 7/5 – 5/3
(Note that the interval of ~25/18 between ~6/5 and ~5/3 tempers to ~10/7.)
In 5-limit meantone, which tempers out 81/80, a stack of three ~6/5 minor thirds tempers to ~128/75, leaving a ~75/64 augmented second to close the octave. The resulting chord has an intervallic odd limit of 75:
- (Meantone) 1 – 6/5 – 36/25 – 128/75
However, if 126/125 is tempered out instead or in addition, as in starling and septimal meantone, the chord becomes a 7-odd-limit essentially tempered chord:
- (Starling) 1 – 6/5 – 10/7 – 12/7
Since 12edo is a good tuning of dimipent and supports both diminished temperament and septimal meantone, and the historically prevalent quarter-comma meantone is a good tuning of septimal meantone (although it was historically usually analyzed as a 5-limit temperament), any of the above interpretations may be relevant for diminished chords found in common-practice and contemporary music.
In equal temperaments
4edo (and multiples thereof): 0-300-600-900 cents
13edo: 0-277-554-923 cents, 1/1-7/6-11/8-12/7
15edo: 0-320-640-880 cents, 1/1-6/5-16/11-5/3
17edo: 0-282-565-918 cents, 1/1-33/28-11/8-56/33
In just intonation
In the 7-limit:
- 15:18:21:25 is a preimage of the essentially-tempered chord of diminished temperament, found in genus 32 ⋅ 52 ⋅ 7.
- 35:42:50:60 is a preimage of the essentially-tempered chord of starling temperament, also found in genus 3 ⋅ 52 ⋅ 7.
- 25:30:35:42 is the result of using step pattern 6/5, 7/6, 6/5.
- 30:35:42:49 is the result of using step pattern 7/6, 6/5, 7/6.
In the 5-limit:
- 125:150:180:216 is the 125-odd chord produced by stacking three 6/5 minor thirds, leaving a 125/108 augmented second to close the octave. Its rotations represent chords that would be enharmonically equivalent to itself in dimipent temperament, substituting the augmented second for one of the minor thirds.
- In the duodene, there are three unique diminished seventh chords, each combining one 32/27 and two 6/5 minor thirds and leaving a 75/64 augmented second to close the octave. In just intonation the sequence of the intervals uniquely identifies the root and rotation of the chord, whereas they would all be tempered together in meantone.
- 75:90:108:128 (6/5, 6/5, 32/27) is an otonal chord found on iiio7 (5⁄4).
- 225:270:320:384 (6/5, 32/27, 6/5) is an ambitonal chord found on viio7 (15⁄8), and is closely related to the 36:45:54:64 dominant seventh chord, stacking on an additional minor third (to make a “dominant ninth”) and dropping the root.
- 675:800:960:1152 (32/27, 6/5, 6/5) is a utonal chord found on ♯ivo7 (45⁄32).
In higher limits:
- 10:12:14:17 is a 17-limit interpretation of the chord associated with François-Joseph Fétis.