12/7: Difference between revisions
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m Correction |
Now that 42/25 is given a more appropriate name, the "septimal major sixth" name can be used for this |
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| Monzo = -2 -1 0 1 | | Monzo = -2 -1 0 1 | ||
| Cents = 933.12909 | | Cents = 933.12909 | ||
| Name = septimal | | Name = supermajor sixth, <br>septimal major sixth | ||
| Color name = r6, ru 6th | | Color name = r6, ru 6th | ||
| Sound = | | FJS name = M6<sub>7</sub> | ||
| Sound = jid_12_7_pluck_adu_dr220.mp3 | |||
}} | }} | ||
In [[7-limit]] [[Just Intonation]], '''12/7''' is the '''septimal | In [[7-limit]] [[Just Intonation]], '''12/7''' is the '''supermajor sixth''' or '''septimal major sixth''' of about 933.1¢. It represents the interval between the 12th and 7th harmonics and appears in chords such as 4:5:7:9:12. It differs from the 5-limit major sixth of [[5/3]] by [[36/35]] -- the septimal quartertone -- a [[superparticular]] interval of about 48.8¢. It differs from the Pythagorean major sixth of [[27/16]] by [[64/63]] -- Archytas' comma -- about 27.3¢. And finally, it differs from the harmonic seventh -- [[7/4]], about 968.8¢ -- by [[49/48]] -- the large septimal diesis or slendro diesis -- about 35.7¢. 12/7 is the inversion of the septimal subminor third of [[7/6]]. | ||
== See also == | == See also == | ||
* [[7/6]] -- its [[octave complement]] | * [[7/6]] -- its [[octave complement]] | ||
* [[Gallery of Just Intervals]] | * [[Gallery of Just Intervals]] | ||
* [[Wikipedia:Septimal major sixth|Septimal major sixth - Wikipedia]] | |||
* [[File:Ji-12-7-csound-foscil-220hz.mp3]] an alternative sound sample | |||
[[Category:7-limit]] | [[Category:7-limit]] | ||
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[[Category:Sixth]] | [[Category:Sixth]] | ||
[[Category:Major sixth]] | [[Category:Major sixth]] | ||
[[Category:Supermajor sixth]] | |||
[[Category:Just interval]] | [[Category:Just interval]] | ||
Revision as of 07:25, 1 September 2020
| Interval information |
septimal major sixth
[sound info]
In 7-limit Just Intonation, 12/7 is the supermajor sixth or septimal major sixth of about 933.1¢. It represents the interval between the 12th and 7th harmonics and appears in chords such as 4:5:7:9:12. It differs from the 5-limit major sixth of 5/3 by 36/35 -- the septimal quartertone -- a superparticular interval of about 48.8¢. It differs from the Pythagorean major sixth of 27/16 by 64/63 -- Archytas' comma -- about 27.3¢. And finally, it differs from the harmonic seventh -- 7/4, about 968.8¢ -- by 49/48 -- the large septimal diesis or slendro diesis -- about 35.7¢. 12/7 is the inversion of the septimal subminor third of 7/6.
See also
- 7/6 -- its octave complement
- Gallery of Just Intervals
- Septimal major sixth - Wikipedia
- an alternative sound sample