61/32: Difference between revisions
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'''61/32''', the [[Octave reduction|octave-reduced]] 61st [[harmonic]]. It is sharp of the [[243/128|Pythagorean major seventh (243/128)]] by [[244/243]]. Being the octave complement of the harry minor semitone [[64/61]], it can also be used as a generator for [[harry]] and [[tritikleismic]]. | '''61/32''', the [[Octave reduction|octave-reduced]] 61st [[harmonic]]. It is sharp of the [[243/128|Pythagorean major seventh (243/128)]] by [[244/243]]. Being the octave complement of the harry minor semitone [[64/61]], it can also be used as a generator for [[harry]] and [[tritikleismic]]. | ||
In addition, the convergent chain of edos of representing it is {{EDOs| 14, 29, 101, 130, 231 }}. These are notable tuning systems in their own way, and they can be used to introduce 61-limit harmony into lower-limit music. | In addition, the convergent chain of edos of representing it is {{EDOs| 14, 29, 101, 130, 231 }}, with notable non-convergent edos representing it closely including {{Edos|72 and 159}}, as well as supersets of convergents including {{Edos|58, 87, and 202}}. These are notable tuning systems in their own way, and they can be used to introduce 61-limit harmony into lower-limit music. | ||
== See also == | == See also == | ||