Alpharabian comma: Difference between revisions
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The '''Alpharabian comma''' ( | {{Infobox Interval | ||
| Ratio = 131769/131072 | |||
| Name = Alpharabian comma | |||
| Color name = L1o<sup>4</sup>-2, Laquadlo comma | |||
| Comma = yes | |||
}} | |||
The '''Alpharabian comma''' ({{monzo|legend=1| -17 2 0 0 4 }}, [[ratio]]: 131769/131072) is a [[small comma|small]] [[11-limit]] (also 2.3.11 [[subgroup]]) [[comma]] measuring about 9.2{{cent}}. It is the amount by which a stack of four [[33/32]] quartertones exceeds a [[9/8]] whole tone, and the amount by which a stack of two [[128/121]] diatonic semitones falls short of a 9/8 whole tone. | |||
The term ''Alpharabian'' comes from Alpharabius – another name for Al-Farabi – and was chosen due to the fact that 33/32, also known as the the Al-Farabi quartertone, is the primary parachroma of the 11-limit, a fact which lends itself to the idea of just 2.3.11 tuning being called ''[[Alpharabian tuning]]'' in the same way that just 3-limit tuning is called ''[[Pythagorean tuning]]''. Of note is that the Alpharabian comma and the [[Pythagorean comma]] are similar in that both commas represent the difference between two of their respective ''p''-limit's primary diatonic semitones and a 9/8 whole tone. | |||
== Temperaments == | |||
Tempering out the Alpharabian comma in the 11-limit results in the rank-4 '''alphaxenic''' temperament (→ [[Catalog of rank-4 temperaments #Alphaxenic (131769/131072)]]), or in the 2.3.11 subgroup, the rank-2 '''alphaxenean''' temperament (→ [[No-fives subgroup temperaments #Alphaxenean]]). | |||
== See also == | |||
* [[Alphaxenic rank-3 clan]] | |||
[[Category:Alpharabian]] | |||
[[Category:Alphaxenic]] | |||
[[Category:Commas named for their regular temperament properties]] | |||
[[Category:Commas named after polymaths]] | |||
Latest revision as of 11:35, 15 May 2026
| Interval information |
reduced harmonic
The Alpharabian comma (monzo: [-17 2 0 0 4⟩, ratio: 131769/131072) is a small 11-limit (also 2.3.11 subgroup) comma measuring about 9.2 ¢. It is the amount by which a stack of four 33/32 quartertones exceeds a 9/8 whole tone, and the amount by which a stack of two 128/121 diatonic semitones falls short of a 9/8 whole tone.
The term Alpharabian comes from Alpharabius – another name for Al-Farabi – and was chosen due to the fact that 33/32, also known as the the Al-Farabi quartertone, is the primary parachroma of the 11-limit, a fact which lends itself to the idea of just 2.3.11 tuning being called Alpharabian tuning in the same way that just 3-limit tuning is called Pythagorean tuning. Of note is that the Alpharabian comma and the Pythagorean comma are similar in that both commas represent the difference between two of their respective p-limit's primary diatonic semitones and a 9/8 whole tone.
Temperaments
Tempering out the Alpharabian comma in the 11-limit results in the rank-4 alphaxenic temperament (→ Catalog of rank-4 temperaments #Alphaxenic (131769/131072)), or in the 2.3.11 subgroup, the rank-2 alphaxenean temperament (→ No-fives subgroup temperaments #Alphaxenean).