121/64: Difference between revisions

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Changed name due to changes in Alpharabian-tuning-based terminology
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| Monzo = -6 0 0 2
| Monzo = -6 0 0 2
| Cents = 1102.63588
| Cents = 1102.63588
| Name = Alpharabian major seventh, <br> octave-reduced 121st harmonic
| Name = Axirabian major seventh, <br> octave-reduced 121st harmonic
| Color name =  
| Color name =  
| FJS name = m7<sup>121</sup>
| FJS name = m7<sup>121</sup>
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}}
}}


'''121/64''', the '''Alpharabian major seventh''', or '''octave-reduced 121st harmonic''', is an [[11-limit]] interval that results from stacking two [[11/8]] fourths.  While the [[FJS]] and other systems that treat [[33/32]] as a comma end up designating 121/64 as a "minor seventh", this interval actually functions as a kind of major seventh- a property that is particularly evident when you consider that its octave complement is a type of diatonic semitone.
'''121/64''', the '''Axirabian major seventh''', or '''octave-reduced 121st harmonic''', is an [[11-limit]] interval that results from stacking two [[11/8]] fourths.  While the [[FJS]] and other systems that treat [[33/32]] as a comma end up designating 121/64 as a "minor seventh", this interval actually functions as a kind of major seventh- a property that is particularly evident when you consider that its octave complement is a type of diatonic semitone.


== See also ==
== See also ==

Revision as of 01:29, 26 December 2021

Interval information
Ratio 121/64
Factorization 2-6 × 112
Monzo [-6 0 0 0 2
Size in cents 1102.636¢
Names Axirabian major seventh,
octave-reduced 121st harmonic
FJS name [math]\displaystyle{ \text{m7}^{121} }[/math]
Special properties reduced,
reduced harmonic
Tenney norm (log2 nd) 12.9189
Weil norm (log2 max(n, d)) 13.8377
Wilson norm (sopfr(nd)) 34
Open this interval in xen-calc

121/64, the Axirabian major seventh, or octave-reduced 121st harmonic, is an 11-limit interval that results from stacking two 11/8 fourths. While the FJS and other systems that treat 33/32 as a comma end up designating 121/64 as a "minor seventh", this interval actually functions as a kind of major seventh- a property that is particularly evident when you consider that its octave complement is a type of diatonic semitone.

See also

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