39/32: Difference between revisions
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'''39/32''', the '''lesser tridecimal neutral third''', is the otonal combination of primes 13 and 3 octave-reduced. It is the fifth complement of [[16/13]], which measures about 359.5¢. | '''39/32''', the '''lesser tridecimal neutral third''', is the otonal combination of primes 13 and 3 octave-reduced. It is the fifth complement of [[16/13]], which measures about 359.5¢. | ||
39/32 differs from the Pythagorean minor third [[32/27]] by [[1053/1024]], about 48¢, from the classic minor third [[6/5]] by [[65/64]], about 27¢, from the rastmic neutral third [[27/22]] by [[144/143]], about 12¢, and from the undecimal neutral third [[11/9]] by [[352/351]], about 4.9¢. | |||
39/32 is a fraction of a cent away from the neutral third found in the 7''n'' family of edos. | 39/32 is a fraction of a cent away from the neutral third found in the 7''n'' family of edos. | ||
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== See also == | == See also == | ||
* [[64/39]] | * [[64/39]] – its [[octave complement]] | ||
* [[16/13]] | * [[16/13]] – its [[fifth complement]] | ||
* [[Gallery of just intervals]] | * [[Gallery of just intervals]] | ||
Revision as of 10:13, 20 September 2020
| Interval information |
octave-reduced 39th harmonic
reduced harmonic
[sound info]
39/32, the lesser tridecimal neutral third, is the otonal combination of primes 13 and 3 octave-reduced. It is the fifth complement of 16/13, which measures about 359.5¢.
39/32 differs from the Pythagorean minor third 32/27 by 1053/1024, about 48¢, from the classic minor third 6/5 by 65/64, about 27¢, from the rastmic neutral third 27/22 by 144/143, about 12¢, and from the undecimal neutral third 11/9 by 352/351, about 4.9¢.
39/32 is a fraction of a cent away from the neutral third found in the 7n family of edos.