Semitone (interval region): Difference between revisions
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{{ | {{Infobox interval region|Name=Semitone, minor second, augmented unison|Cents lower=75|Cents lower wide=60|Cents upper=125|Cents upper wide=140|JI intervals=16/15, 25/24|MOSes=1L 8s, 9L 1s, 1L 9s|Complement=[[Major seventh]]|Lower region=[[Comma and diesis]]|Higher region=[[Neutral second]]}}{{Wikipedia|Semitone}} | ||
A '''semitone''', as a concrete [[interval region]], is typically near 100{{cent}} in size, distinct from [[commas and dieses]] (less than 60{{c}}), and from [[neutral second]]s (about 150{{c}}). A rough tuning range for the semitone is about 60{{c}} to 125{{c}} according to [[Margo Schulter]]'s theory of interval regions. | |||
A '''semitone''' | |||
Functionally, a semitone is an interval that makes up part of a [[tone]], often as one step of a 12-tone chromatic scale, which is a possible criterion for the classification of an interval as a semitone in [[just intonation]]. | |||
Semitones | Semitones come in two functional categories based on their number of steps in the [[5L 2s|diatonic]] scale: | ||
* [[ | *[[Diatonic semitone]]s, minor seconds (m2), or limmas, | ||
* [[ | *[[Chromatic semitone]]s, augmented unisons (A1), or chromas. | ||
The intervals covered in this article range from 50{{c}} to 140{{c}}. | |||
== In just intonation == | == In just intonation == | ||
=== By prime limit === | === By prime limit === | ||
In the low prime limits, up to the 5-limit, in which the West has developed a formal system of diatonic harmony, the distinction between diatonic and chromatic semitones is the clearest, so a pair of 2 semitones will be provided for each. However, higher than the 5-limit, function as diatonic vs. chromatic tends to become less clear, and larger intervals can be seen as belonging to neither category. | In the low prime limits, up to the 5-limit, in which the West has developed a formal system of diatonic harmony, the distinction between diatonic and chromatic semitones is the clearest, so a pair of 2 semitones will be provided for each. However, higher than the 5-limit, function as diatonic vs. chromatic tends to become less clear, and larger intervals can be seen as belonging to neither category. | ||
* In the 3-limit: | * In the 3-limit: | ||
** The ''' | ** The ''limma'', or ''Pythagorean diatonic semitone'', is a ratio of [[256/243]], and is about 90{{c}}. | ||
** The ''' | ** The ''apotome'', or ''Pythagorean chromatic semitone'', is a ratio of [[2187/2048]], and is about 114{{c}}. | ||
* In the 5-limit: | * In the 5-limit: | ||
** The | ** The ''classical diatonic semitone'' is a ratio of [[16/15]], and is about 112{{c}}. | ||
** The | ** The ''classical chromatic semitone'' is a ratio of [[25/24]], and is about 71{{c}}. | ||
*** There is also a | *** There is also a ''ptolemaic chromatic semitone'', which is a ratio of [[135/128]], and is about 92{{c}}. | ||
* In higher limits: | * In higher limits: | ||
** The 7-limit | ** The 7-limit ''third-tone'' is a ratio of [[28/27]], and is about 63{{c}}. | ||
** The 7-limit | ** The 7-limit ''minor semitone'' is a ratio of [[21/20]], and is about 84{{c}}. | ||
** The 7-limit | ** The 7-limit ''major semitone'' is a ratio of [[15/14]], and is about 119{{c}}. | ||
** The 11-limit | ** The 11-limit ''minor semitone'' is a ratio of [[22/21]], and is about 81{{c}}. | ||
** The 13-limit | ** The 13-limit ''sinaic'' is a ratio of [[14/13]], and is about 128{{c}}. | ||
** The 13-limit | ** The 13-limit ''greater 2/3-tone'' is a ratio of [[13/12]], and is about 139{{c}}. | ||
** The 17-limit | ** The 17-limit ''large semitone'' is a ratio of [[17/16]], and is about 104{{c}}. | ||
** The 17-limit | ** The 17-limit ''small semitone'' is a ratio of [[18/17]], and is about 99{{c}}. | ||
=== By delta === | === By delta === | ||
This table lists just semitones by [[Delta-N|delta]] | This table lists just semitones by [[Delta-N|delta]]; simple semitone ratios tend to be [[Superparticular ratio|superparticular]]. | ||
{| class="wikitable" | {| class="wikitable" | ||
|- | |- | ||
! Delta 1 (Superparticular) | |||
! Cents | |||
|- | |- | ||
|[[ | | [[13/12]] | ||
| | | 139{{c}} | ||
|- | |- | ||
|[[ | | [[14/13]] | ||
| | | 128{{c}} | ||
|- | |- | ||
|[[ | | [[15/14]] | ||
| | | 119{{c}} | ||
|- | |- | ||
|[[ | | [[16/15]] | ||
| | | 112{{c}} | ||
|- | |- | ||
|[[ | | [[17/16]] | ||
| | | 104{{c}} | ||
|- | |- | ||
|[[ | | [[18/17]] | ||
| | | 99{{c}} | ||
|- | |- | ||
|[[ | | [[19/18]] | ||
| | | 94{{c}} | ||
|- | |- | ||
|[[ | | [[20/19]] | ||
| | | 89{{c}} | ||
|- | |- | ||
|[[ | | [[21/20]] | ||
| | | 85{{c}} | ||
|- | |- | ||
|[[ | | [[22/21]] | ||
| | | 81{{c}} | ||
|- | |- | ||
|[[ | | [[23/22]] | ||
| | | 77{{c}} | ||
|- | |- | ||
|[[ | | [[24/23]] | ||
| | | 74{{c}} | ||
|- | |- | ||
|[[ | | [[25/24]] | ||
| | | 71{{c}} | ||
|- | |- | ||
|[[ | | [[26/25]] | ||
| | | 68{{c}} | ||
|- | |- | ||
|[[ | | [[27/26]] | ||
| | | 65{{c}} | ||
|- | |- | ||
|[[ | | [[28/27]] | ||
| | | 63{{c}} | ||
|- | |- | ||
|[[ | | [[29/28]] | ||
| | | 61{{c}} | ||
|- | |- | ||
|[[ | | [[30/29]] | ||
| | | 59{{c}} | ||
|- | |- | ||
|[[ | | [[31/30]] | ||
| | | 57{{c}} | ||
|- | |- | ||
|[[ | | [[32/31]] | ||
| | | 55{{c}} | ||
|- | |- | ||
|[[ | | [[33/32]] | ||
| | | 53{{c}} | ||
|- | |- | ||
|[[35/34]] | | [[34/33]] | ||
| | | 52{{c}} | ||
|- | |||
| [[35/34]] | |||
| 50{{c}} | |||
|} | |} | ||
== In EDOs == | == In EDOs == | ||
The following table lists the best tuning of 16/15, 25/24, and other semitones if present, in various significant [[ | The following table lists the best tuning of 16/15, 25/24, and other semitones if present, in various significant [[edo|EDO]]s. | ||
{| class="wikitable" | {| class="wikitable" | ||
|- | |- | ||
! EDO | |||
! 16/15 | |||
! 25/24 | |||
! Other semitones | |||
|- | |- | ||
| | | 12 | ||
| colspan="2" | | | colspan="2" | 100{{c}} | ||
| | | | ||
|- | |- | ||
| | | 15 | ||
| colspan="2" | | | colspan="2" | 80{{c}} | ||
| | | | ||
|- | |- | ||
| | | 16 | ||
| | | colspan="2" | 75{{c}} | ||
| | | | ||
| | |||
|- | |- | ||
| | | 17 | ||
| | | 141{{c}} | ||
| | | 71{{c}} | ||
| | | | ||
|- | |- | ||
| | | 19 | ||
| | | 126{{c}} | ||
| | | 63{{c}} | ||
| | | | ||
|- | |- | ||
| | | 22 | ||
| | | 109{{c}} | ||
| | | 55{{c}} | ||
| | | | ||
|- | |- | ||
| | | 24 | ||
| | | 100{{c}} | ||
| | | 50{{c}} | ||
| | | | ||
|- | |- | ||
| | | 25 | ||
| | | 96{{c}} | ||
| | | * | ||
| | |||
|- | |- | ||
| | | 26 | ||
| | | colspan="2" | 92{{c}} | ||
| | | | ||
| | |||
|- | |- | ||
| | | 27 | ||
| | | 133{{c}} | ||
| | | 89{{c}} | ||
| | | | ||
|- | |- | ||
| | | 29 | ||
| | | 124{{c}} | ||
| | | 83{{c}} | ||
| | | | ||
|- | |- | ||
| | | 31 | ||
| | | 116{{c}} | ||
| | | 77{{c}} | ||
| | | | ||
|- | |- | ||
| | | 34 | ||
| | | 106{{c}} | ||
| | | 71{{c}} | ||
| | | | ||
|- | |- | ||
|53 | | 41 | ||
| | | 117{{c}} | ||
| | | 59{{c}} | ||
| | | {{nowrap|88{{c}} ≈ 256/243}} | ||
|- | |||
| 53 | |||
| 113{{c}} | |||
| 68{{c}} | |||
| {{nowrap|91{{c}} ≈ 256/243}} | |||
|} | |} | ||
== In regular temperaments == | == In regular temperaments == | ||
Two important, simple semitone ratios are 16/15 and 25/24. The following notable temperaments are generated by them: | Two important, simple semitone ratios are 16/15 and 25/24. The following notable temperaments are generated by them: | ||
=== Temperaments that use 25/24 as a generator === | === Temperaments that use 25/24 as a generator === | ||
* [[Valentine]], which divides [[3/2]] into nine small semitones, five of which make [[5/4]]. See also the related [[Carlos Alpha]]. | |||
* Vishnu, which stacks seven 25/24s to make a just [[perfect fourth]] of [[4/3]] | * [[Vishnu]], which stacks seven 25/24s to make a just [[perfect fourth]] of [[4/3]]. | ||
* Chlorine, | * [[Chlorine]], based on [[17edo]], stacking seventeen 25/24s to make an octave. | ||
=== Temperaments that use 16/15 as a generator === | === Temperaments that use 16/15 as a generator === | ||
* [[Miracle]], which splits [[3/2]] into six semitones, each representing both [[15/14]] and [[16/15]]. | |||
* [[Negri]], which splits [[4/3]] into four semitones, such that three of them represent [[5/4]]. | |||
* [[Diaschismic]], which is usually described as having a fifth as its second generator, but can alternatively be generated by a half-octave and a semitone. | |||
[[Compton]] has one step of [[12edo]] as its first generator, representing [[256/243]]. | |||
When 25/24 is tempered out, it leads to [[dicot]] temperament. | When 25/24 is tempered out, it leads to [[dicot]] temperament. | ||
When 16/15 is tempered out, it leads to [[father]] temperament. | When 16/15 is tempered out, it leads to [[father]] temperament. | ||
== In moment-of-symmetry scales == | |||
Intervals between 100 and 133{{c}} generate the following [[MOS]] scales: | |||
These tables start from the last monolarge [[MOS]] generated by the interval range. | |||
MOSes with more than 12 notes are not included. | |||
{| class="wikitable" | |||
|- | |||
! Range | |||
! colspan="2" | MOS | |||
|- | |||
| 100–109{{c}} | |||
| [[1L 10s]] | |||
| [[11L 1s]] | |||
|- | |||
| 109–120{{c}} | |||
| [[1L 9s]] | |||
| [[10L 1s]] | |||
|- | |||
| 120–133{{c}} | |||
| [[1L 8s]] | |||
| [[9L 1s]] | |||
|} | |||
== See also == | |||
* [[Semitone]] (disambiguation page) | |||
{{Navbox intervals}} | {{Navbox intervals}} | ||
[[Category:12edo]] | [[Category:12edo]] | ||