27/16: Difference between revisions
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The '''Pythagorean major sixth''', '''27/16''', may be reached by stacking three perfect fifths ([[3/2]]) and reducing by one [[octave]]. Compared to the more typical [[5/3]] which is narrower by [[81/80]], this interval is more [[dissonant]], with a [[harmonic entropy]] level roughly on par with that of [[6/5]]. | The '''Pythagorean major sixth''', '''27/16''', may be reached by stacking three perfect fifths ([[3/2]]) and reducing by one [[octave]]. Compared to the more typical [[5/3]] which is narrower by [[81/80]], this interval is more [[dissonant]], with a [[harmonic entropy]] level roughly on par with that of [[6/5]]. | ||
== Approximation == | |||
{{Interval_Edo_Approximation | 27/16}} | |||
== See also == | == See also == | ||