4096/3993: Difference between revisions
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| Monzo = 12 -1 0 0 -3 | | Monzo = 12 -1 0 0 -3 | ||
| Cents = 44.09117 | | Cents = 44.09117 | ||
| Name = Alpharabian inframinor second | | Name = Alpharabian inframinor second, <br> Alpharabian paralimma | ||
| Color name = Satrilu 2nd | | Color name = Satrilu 2nd | ||
| FJS name = M2<sub>11,11,11</sub> | | FJS name = M2<sub>11,11,11</sub> | ||
Revision as of 17:19, 30 June 2021
| Interval information |
Alpharabian paralimma
reduced subharmonic
4096/3993, the Alpharabian inframinor second, is notable for being one of only two 11-limit quartertone intervals needed in order to add up to a familiar 9/8 whole tone. Specifically, it is the quartertone that forms the difference between the whole tone and a stack of three 33/32 quartertones, and can thus be regarded as a sort of subminor second. Remarkably, it is currently the simplest interval in terms of odd-limit that is known to result from stacking three identical quartertones with rational intervals and subtracting said stack from a 9/8 whole tone. Furthermore, although 38/37, 35/34, 32/31 and 28/27 are all simpler intervals that can be called "quarter tones" and can safely be regarded as some kind of second, subtracting any one of these intervals from 9/8 yields an interval that has a ratio lacking a cubed number in the numerator and or the denominator, and such an interval cannot be split into three equal quartertones with rational intervals.