22edo/Unque's compositional approach: Difference between revisions

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'''NOTE: This page is currently under construction, and will be subject to major expansion in the near future. ~~Coma~~ back soon!'''

'''NOTE: This page is currently under construction, and will be subject to major expansion in the near future. Come back soon!'''

[[22edo|22 Equal Divisions of the Octave]] is arguably the smallest EDO to support the full 11-limit; it is also the intersection of many popular temperaments such as [[Superpyth]], [[Porcupine]], [[Orwell]], and [[Magic]]. Additionally, fans of 15edo will likely be drawn to 22edo due to the latter being quite useful as an extension of the former that represents many low-complexity intervals with higher accuracy. On this page, I will present my personal experience with 22edo, and hopefully provide a potential framework that others may use to begin their own journeys through the colorful world of 22 Equal Divisions of the Octave.

Revision as of 18:16, 19 December 2024 view source Unque (talk \| contribs) 217 edits No edit summary Tag: Visual edit ← Older edit		Revision as of 18:16, 19 December 2024 view source Unque (talk \| contribs) 217 edits mNo edit summary Tag: Visual edit Newer edit →
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	'''NOTE: This page is currently under construction, and will be subject to major expansion in the near future. ~~Coma~~ back soon!'''		'''NOTE: This page is currently under construction, and will be subject to major expansion in the near future. Come back soon!'''

	[[22edo\|22 Equal Divisions of the Octave]] is arguably the smallest EDO to support the full 11-limit; it is also the intersection of many popular temperaments such as [[Superpyth]], [[Porcupine]], [[Orwell]], and [[Magic]]. Additionally, fans of 15edo will likely be drawn to 22edo due to the latter being quite useful as an extension of the former that represents many low-complexity intervals with higher accuracy. On this page, I will present my personal experience with 22edo, and hopefully provide a potential framework that others may use to begin their own journeys through the colorful world of 22 Equal Divisions of the Octave.		[[22edo\|22 Equal Divisions of the Octave]] is arguably the smallest EDO to support the full 11-limit; it is also the intersection of many popular temperaments such as [[Superpyth]], [[Porcupine]], [[Orwell]], and [[Magic]]. Additionally, fans of 15edo will likely be drawn to 22edo due to the latter being quite useful as an extension of the former that represents many low-complexity intervals with higher accuracy. On this page, I will present my personal experience with 22edo, and hopefully provide a potential framework that others may use to begin their own journeys through the colorful world of 22 Equal Divisions of the Octave.