128/121: Difference between revisions
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correction: had the numbers backwards in one instance |
Added an addition name and rewrote opening sentence to match |
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| Monzo = 7 0 0 0 -2 | | Monzo = 7 0 0 0 -2 | ||
| Cents = 97.36412 | | Cents = 97.36412 | ||
| Name = Alpharabian diatonic semitone, <br> octave-reduced 121st subharmonic | | Name = Alpharabian limma, <br> Alpharabian diatonic semitone, <br> octave-reduced 121st subharmonic | ||
| Color name = | | Color name = | ||
| FJS name = M2<sub>121</sub> | | FJS name = M2<sub>121</sub> | ||
| Sound = Ji-128-121-csound-foscil-220hz.mp3 | | Sound = Ji-128-121-csound-foscil-220hz.mp3 | ||
}} | }} | ||
'''128/121''', the '''Alpharabian diatonic semitone''', or '''octave-reduced 121st subharmonic''', is an [[11-limit]] semitone with a value of roughly 97.4 cents. As the name "Alpharabian diatonic semitone" suggests, it acts as the diatonic counterpart to the [[1089/1024]], with the two intervals adding up to a [[9/8]] whole tone. Furthermore its status as a diatonic semitone can be verified by the fact that just as a diatonic semitone and a chromatic semitone add up to make a whole tone, a similar pairing of quartertones- namely [[4096/3993]] and [[33/32]]- add up to 128/121. | '''128/121''', the '''Alpharabian limma''', or '''Alpharabian diatonic semitone''', or '''octave-reduced 121st subharmonic''', is an [[11-limit]] semitone with a value of roughly 97.4 cents. As the name "Alpharabian diatonic semitone" suggests, it acts as the diatonic counterpart to the [[1089/1024]], with the two intervals adding up to a [[9/8]] whole tone. Furthermore its status as a diatonic semitone can be verified by the fact that just as a diatonic semitone and a chromatic semitone add up to make a whole tone, a similar pairing of quartertones- namely [[4096/3993]] and [[33/32]]- add up to 128/121. | ||
== See also == | == See also == | ||
Revision as of 19:00, 17 December 2020
| Interval information |
Alpharabian diatonic semitone,
octave-reduced 121st subharmonic
reduced subharmonic
[sound info]
128/121, the Alpharabian limma, or Alpharabian diatonic semitone, or octave-reduced 121st subharmonic, is an 11-limit semitone with a value of roughly 97.4 cents. As the name "Alpharabian diatonic semitone" suggests, it acts as the diatonic counterpart to the 1089/1024, with the two intervals adding up to a 9/8 whole tone. Furthermore its status as a diatonic semitone can be verified by the fact that just as a diatonic semitone and a chromatic semitone add up to make a whole tone, a similar pairing of quartertones- namely 4096/3993 and 33/32- add up to 128/121.
See also
- 121/64 – its octave complement