625/384: Difference between revisions
Created page with "{{Infobox Interval | Name = (smaller) pental neutral sixth, tetraptolemaic double-augmented fifth }} '''625/384''', the '''(smaller) pental neutral sixth''' or '''tetraptolema..." |
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| Name = (smaller) pental neutral sixth, tetraptolemaic double-augmented fifth | | Name = (smaller) pental neutral sixth, tetraptolemaic double-augmented fifth | ||
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'''625/384''', the '''(smaller) pental neutral sixth''' or '''tetraptolemaic double-augmented fifth''' is a [[5-limit]] [[interval]] of about 843.3 [[cent]]s. It is flat of the Pythagorean double-augmented fifth by four [[81/80|syntonic comma]]s. Equivalently, it is equal to an [[octave reduction|octave-reduced]] stack of four [[5/4|classical major thirds]] minus a [[3/2|fifth]], or equal to a [[5/3|classical major third]] minus a [[128/125|diesis]]. In the 11-limit it is 6912/6875 flat of [[18/11]], and [[5632/5625]] | '''625/384''', the '''(smaller) pental neutral sixth''' or '''tetraptolemaic double-augmented fifth''' is a [[5-limit]] [[interval]] of about 843.3 [[cent]]s. It is flat of the Pythagorean double-augmented fifth by four [[81/80|syntonic comma]]s. Equivalently, it is equal to an [[octave reduction|octave-reduced]] stack of four [[5/4|classical major thirds]] minus a [[3/2|fifth]], or equal to a [[5/3|classical major third]] minus a [[128/125|diesis]]. In the 11-limit it is 6912/6875 flat of [[18/11]], and [[5632/5625]] flat of [[44/27]]. In the 13-limit it is [[625/624]] sharp of [[13/8]]. | ||
== See also == | == See also == | ||