161/128: Difference between revisions

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 just major third and the Pythagorean major third: (5/4 + 81/64)/2 = 161/128.

It can also be calculated from the syntonic comma: ((81/80 - 1)/2 + 1)⋅(5/4) = 161/128.

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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>.

Latest revision as of 16:46, 2 March 2023