159edo/Interval names and harmonies: Difference between revisions
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::* It has the potential to move back down to a Serviant harmony through a Parachromatic quatertone-type motion | ::* It has the potential to move back down to a Serviant harmony through a Parachromatic quatertone-type motion | ||
::* It has the potential to move up towards an Interregnant harmony through a Paradiatonic semitone-type motion, with this move granting additional follow-up options | ::* It has the potential to move up towards an Interregnant harmony through a Paradiatonic semitone-type motion, with this move granting additional follow-up options | ||
* Is the closest approximation of 24edo's Paramajor Fourth found in this system, and thus... | * Is reachable through stacking eight of this system's approximation of the Septendecimal Whole Tone and octave-reducing. | ||
* Is the closest approximation of 24edo's own Paramajor Fourth found in this system, and thus... | |||
:* Follows similar interval arithmetic logic in relation to Pythagorean intervals, albeit with caveats, since the rastma is not tempered out | :* Follows similar interval arithmetic logic in relation to Pythagorean intervals, albeit with caveats, since the rastma is not tempered out | ||
:* Is capable of being used in certain similar melodic and harmonic gestures, albeit with caveats, since such moves on their own don't work the exact same way in this system | :* Is capable of being used in certain similar melodic and harmonic gestures, albeit with caveats, since such moves on their own don't work the exact same way in this system | ||