161/128: Difference between revisions

VisualWikitext

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 {{Infobox Interval
-| Ratio = 161/128
+| Name = arithmetic mean major third, octave-reduced 161th harmonic
-| Monzo = -7 0 0 1 0 0 0 0 1
-| Cents = 397.100253738
-| Name = 161th harmonic octave-reduced ; just/pythagorean major third meantone
 | Color name = 23oz4
 }}
-In Just Intonation, 161/128 is the frequency ratio between the 161th and the 128th harmonic.
+In [[just intonation]], '''161/128''', the '''arithmetic mean major third''' is the frequency ratio between the 161th and the 128th harmonic. It is the [[arithmetic mean]] between the [[5/4|just major third]] and the [[81/64|Pythagorean major third]]: (5/4 + 81/64)/2 = 161/128.
-It is the mean between the [[5/4|just major third]] and the [[81/64|Pythagorean major third]] : (5/4 + 81/64)/2 = 161/128.
+It can also be calculated from the [[81/80|syntonic comma]]: ((81/80 - 1)/2 + 1)⋅(5/4) = 161/128.
-It can also be calculated from the [[81/80|syntonic comma]] : ((81/80 - 1)/2 + 1)⋅(5/4) = 161/128.
+[[Category:Third]]
+[[Category:Major third]]
-Its factorization into primes is 2<sup>-7</sup>⋅7⋅23 ; its FJS name is M3<sup>7,23</sup>.