Alpharabian tuning: Difference between revisions
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:* Diminution of a Pythagorean Major interval by 33/32 results in a Tendoneutral interval | :* Diminution of a Pythagorean Major interval by 33/32 results in a Tendoneutral interval | ||
* Modification by 33/32 generally results in a Class I Alpharabian interval | * Modification by 33/32 generally results in a Class I Alpharabian interval | ||
* Generally, intervals that result from the modification of a Pythagorean interval by a single instance of 243/242 retain the same functionality as their Pythagorean counterparts, much like with the syntonic comma, however, there are a few | * Generally, intervals that result from the modification of a Pythagorean interval by a single instance of 243/242 retain the same functionality as their Pythagorean counterparts, much like with the syntonic comma, however, there are a few special cases... | ||
:* Augmentation of a Perfect Fourth or Perfect Fifth by a single instance of 243/242 results in an Alpharabian wide interval | :* Augmentation of a Perfect Fourth or Perfect Fifth by a single instance of 243/242 results in an Alpharabian wide interval | ||
:* Diminution of a Perfect Fourth or Perfect Fifth by a single instance of 243/242 results in an Alpharabian narrow interval | :* Diminution of a Perfect Fourth or Perfect Fifth by a single instance of 243/242 results in an Alpharabian narrow interval | ||