44/27: Difference between revisions
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important things done (name and introduction), todo box now hidden, but still auto-categorizing |
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| Monzo = 2 -3 0 0 1 | | Monzo = 2 -3 0 0 1 | ||
| Cents = 845.45294 | | Cents = 845.45294 | ||
| Name = rastmic neutral sixth, <br> | | Name = rastmic neutral sixth, <br> Alpharabian artoneutral sixth | ||
| Color name = | | Color name = | ||
| FJS name = m6<sup>11</sup> | | FJS name = m6<sup>11</sup> | ||
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'''44/27''', conventionally called the '''rastmic neutral sixth''', is [[243/242]] (7.1 cents) flat of [[18/11]]. As this is the smaller of two [[11-limit]] neutral sixths obtained by modifying Pythagorean intervals by [[33/32]], it is dubbed the ''' | '''44/27''', conventionally called the '''rastmic neutral sixth''', is [[243/242]] (7.1 cents) flat of [[18/11]]. As this is the smaller of two [[11-limit]] neutral sixths obtained by modifying Pythagorean intervals by [[33/32]], it is dubbed the '''Alpharabian artoneutral sixth''' in [[Alpharabian tuning]]. | ||
== See also == | == See also == | ||
Revision as of 23:38, 29 January 2022
| Interval information |
Alpharabian artoneutral sixth
44/27, conventionally called the rastmic neutral sixth, is 243/242 (7.1 cents) flat of 18/11. As this is the smaller of two 11-limit neutral sixths obtained by modifying Pythagorean intervals by 33/32, it is dubbed the Alpharabian artoneutral sixth in Alpharabian tuning.
See also
- 27/22 – its octave complement