37/36: Difference between revisions
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+significance in FJS |
+short explanation on its look in HEJI and hopefully this helps to understand the current name |
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'''37/36''', or the '''37-limit Wyschnegradsky ~quartertone''', is a 2.3.37 subgroup comma. It is the amount by which the octave-reduced 37th harmonic [[37/32]] exceeds the Pythagorean (major) whole tone of [[9/8]]. | '''37/36''', or the '''37-limit Wyschnegradsky ~quartertone''', is a 2.3.37 subgroup comma. It is the amount by which the octave-reduced 37th harmonic [[37/32]] exceeds the Pythagorean (major) whole tone of [[9/8]]. | ||
This interval is significant in the [[Functional Just System]] and [[Helmholtz-Ellis notation]] as the formal comma to translate a Pythagorean interval to a nearby tricesimoseptimal (37-limit) interval. In Helmholtz-Ellis notation, the symbol for the downward version of this interval is virtually identical to the demiflat in [[Ivan Wyschnegradsky]]'s [[72edo]] notation. | |||
[[Category:Commas named after composers]] | [[Category:Commas named after composers]] | ||
[[Category:Commas named after their interval size]] | [[Category:Commas named after their interval size]] | ||
Revision as of 18:01, 28 November 2024
| Interval information |
reduced
37/36, or the 37-limit Wyschnegradsky ~quartertone, is a 2.3.37 subgroup comma. It is the amount by which the octave-reduced 37th harmonic 37/32 exceeds the Pythagorean (major) whole tone of 9/8.
This interval is significant in the Functional Just System and Helmholtz-Ellis notation as the formal comma to translate a Pythagorean interval to a nearby tricesimoseptimal (37-limit) interval. In Helmholtz-Ellis notation, the symbol for the downward version of this interval is virtually identical to the demiflat in Ivan Wyschnegradsky's 72edo notation.