28/27: Difference between revisions
m On edo approximation |
m Re-add category:chroma |
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| Monzo = 2 -3 0 1 | | Monzo = 2 -3 0 1 | ||
| Cents = 62.9609 | | Cents = 62.9609 | ||
| Name = small septimal chroma, septimal third-tone, <br>subminor second, septimal minor second | | Name = small septimal chroma, <br>septimal third-tone, <br>subminor second, <br>septimal minor second | ||
| Color name = z2, zo 2nd | | Color name = z2, zo 2nd | ||
| FJS name = m2<sup>7</sup> | | FJS name = m2<sup>7</sup> | ||
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* [[Gallery of Just Intervals]] | * [[Gallery of Just Intervals]] | ||
* [[Trienstonic clan]], where it is tempered out | * [[Trienstonic clan]], where it is tempered out | ||
* [[Wikipedia:Septimal third tone | * [[Wikipedia: Septimal third tone]] | ||
[[Category:7-limit]] | [[Category:7-limit]] | ||
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[[Category:Semitone]] | [[Category:Semitone]] | ||
[[Category:Third tone]] | [[Category:Third tone]] | ||
[[Category:Chroma]] | |||
Revision as of 16:20, 15 October 2020
| Interval information |
septimal third-tone,
subminor second,
septimal minor second
reduced
[sound info]
The superparticular interval 28/27 (also small septimal chroma or septimal third-tone) has the seventh triangular number as a numerator and is the difference between 15/14 and 10/9, 9/8 and 7/6, 9/7 and 4/3, 3/2 and 14/9, 12/7 and 16/9, and 9/5 and 28/15.
Although called a chroma for its proximity (and conflation in systems like septimal meantone) with the classic chroma 25/24, 28/27 is a diatonic semitone in both Helmholtz-Ellis notation and Functional Just System because it is 64/63 smaller than the Pythagorean minor second 256/243. Hence, it may be described as the septimal minor second or subminor second if treated as an interval in its own right. This is analogous to the septimal major second 8/7, which has the same relationship with 9/8, and such classification suggests the function of a strong leading tone added to the traditional harmony.
It is very accurately approximated by 19edo (1\19).
See also
- 27/14 – its octave complement
- List of superparticular intervals
- Gallery of Just Intervals
- Trienstonic clan, where it is tempered out
- Wikipedia: Septimal third tone