27/16: Difference between revisions
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{{Infobox Interval | {{Infobox Interval | ||
| Ratio = 27/16 | | Ratio = 27/16 | ||
| Monzo = -4 3 | | Monzo = -4 3 | ||
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[[Category:3-limit]] | [[Category:3-limit]] | ||
[[Category:Sixth]] | [[Category:Sixth]] | ||
[[Category:Major sixth]] | [[Category:Major sixth]] | ||
[[Category: | [[Category:Octave-reduced harmonics]] | ||
{{todo| expand }} | {{todo| expand }} | ||
Revision as of 20:49, 15 December 2021
| Interval information |
reduced harmonic
[sound info]
The Pythagorean major sixth, 27/16, may be reached by stacking three perfect fifths (3/2) and reducing by one octave. Compared to the more typical 5/3- with which it is conflated in meantone- this interval is more dissonant, with a harmonic entropy level roughly on par with that of 6/5. While many musicians prefer to use 5/3 as the major sixth interval above the Tonic in a diatonic context even in non-meantone settings, Aura is known to prefer this interval in those same contexts, though he still uses 5/3 as major sixth interval between certain non-tonic notes.