Semitone (interval region): Difference between revisions
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Semitones tend to fall into one of two functional categories, based on the system being used: | Semitones tend to fall into one of two functional categories, based on the system being used: | ||
* [[diatonic | * [[diatonic semitone]]s, minor seconds (m2) or limmas, | ||
* [[chromatic | * [[chromatic semitone]]s, augmented unisons (A1) or chromas. | ||
This page covers both categories of intervals, as the distinction between them is largely a matter of the [[diatonic]] MOS, and is also not the subject of this article. | This page covers both categories of intervals, as the distinction between them is largely a matter of the [[diatonic]] MOS, and is also not the subject of this article. | ||
Revision as of 05:26, 26 February 2025
- This page is about the interval region. For the interval size unit of exactly 100 cents, see Interval size measure#Gross.
A semitone is an interval that is near 100 cents in size, distinct from commas and dieses (less than 60 cents), and from major seconds (about 200 cents). A rough tuning range for the semitone is about 50 cents to 140 cents, though this is extremely wide; some might prefer to restrict it to around 70 cents to 130 cents.
Semitones tend to fall into one of two functional categories, based on the system being used:
- diatonic semitones, minor seconds (m2) or limmas,
- chromatic semitones, augmented unisons (A1) or chromas.
This page covers both categories of intervals, as the distinction between them is largely a matter of the diatonic MOS, and is also not the subject of this article.
In just intonation
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 3-limit:
- The limma, or Pythagorean diatonic semitone, is a ratio of 256/243, and is about 90 cents.
- The apotome, or Pythagorean chromatic semitone, is a ratio of 2187/2048, and is about 114 cents.
- In the 5-limit:
- The classical diatonic semitone is a ratio of 16/15, and is about 112 cents.
- The classical chromatic semitone is a ratio of 25/24, and is about 71 cents.
- There is also a ptolemaic chromatic semitone, which is a ratio of 135/128, and is about 92 cents.
- In higher limits:
- The 7-limit third-tone is a ratio of 28/27, and is about 63 cents.
- The 7-limit minor semitone is a ratio of 21/20, and is about 84 cents.
- The 7-limit major semitone is a ratio of 15/14, and is about 119 cents.
- The 11-limit minor semitone is a ratio of 22/21, and is about 81 cents.
- The 13-limit sinaic is a ratio of 14/13, and is about 128 cents.
- The 13-limit greater 2/3 tone is a ratio of 13/12, and is about 139 cents.
- The 17-limit large semitone is a ratio of 17/16, and is about 104 cents.
- The 17-limit small semitone is a ratio of 18/17, and is about 99 cents.
By delta
This table lists just semitones by delta:
| Delta 1 (Superparticular) | Cents |
|---|---|
| 13/12 | 139c |
| 14/13 | 128c |
| 15/14 | 119c |
| 16/15 | 112c |
| 17/16 | 104c |
| 18/17 | 99c |
| 19/18 | 94c |
| 20/19 | 89c |
| 21/20 | 85c |
| 22/21 | 81c |
| 23/22 | 77c |
| 24/23 | 74c |
| 25/24 | 71c |
| 26/25 | 68c |
| 27/26 | 65c |
| 28/27 | 63c |
| 29/28 | 61c |
| 30/29 | 59c |
| 31/30 | 57c |
| 32/31 | 55c |
| 33/32 | 53c |
| 34/33 | 52c |
| 35/34 | 50c |
In EDOs
The following table lists the best tuning of 16/15, 25/24, and other semitones if present, in various significant EDOs.
| EDO | 16/15 | 25/24 | Other semitones |
|---|---|---|---|
| 12 | 100c | ||
| 15 | 80c | ||
| 16 | 75c | ||
| 17 | 141c | 71c | |
| 19 | 126c | 63c | |
| 22 | 109c | 55c | |
| 24 | 100c | 50c | |
| 25 | 96c | * | |
| 26 | 92c | ||
| 27 | 133c | 89c | |
| 29 | 124c | 83c | |
| 31 | 116c | 77c | |
| 34 | 106c | 71c | |
| 41 | 117c | 59c | 88c ≈ 256/243 |
| 53 | 113c | 68c | 91c ≈ 256/243 |
In regular temperaments
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
- Vishnu, which stacks seven 25/24s to make a just perfect fourth of 4/3
- Chlorine, equivalent to 17edo, stacking seventeen 25/24s to make an octave
Temperaments that use 16/15 as a generator
- TBD
When 25/24 is tempered out, it leads to dicot temperament.
When 16/15 is tempered out, it leads to father temperament.
| View • Talk • EditInterval classification | |
|---|---|
| Interval regions | |
| Unison and octave | Unison • Comma and diesis • Octave |
| Seconds | Minor second • Neutral second • Major second |
| Thirds | Minor third • Neutral third • Major third |
| Fourths and fifths | Perfect fourth • Superfourth • Tritone • Subfifth • Perfect fifth |
| Sixths | Minor sixth • Neutral sixth • Major sixth |
| Sevenths | Minor seventh • Neutral seventh • Major seventh |
| Interseptimal intervals | Interseptimal 2nd-3rd • Interseptimal 3rd-4th • Interseptimal 5th-6th • Interseptimal 6th-7th |
| Interval qualities | |
| Diatonic qualities | Diminished • Minor • Perfect • Major • Augmented |
| Tuning ranges | Neutral (interval quality) • Submajor and supraminor • Pental major and minor • Novamajor and novaminor • Neogothic major and minor • Supermajor and subminor • Ultramajor and inframinor |