11/10: Difference between revisions

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{{Wikipedia|Neutral interval#Second}}
'''11/10''', the '''large undecimal neutral second''' or '''undecimal submajor second''', is the simplest submajor second. It is 15 cents sharp of [[12/11]] and 17 cents flat of [[10/9]]. When tuned [[just]] or near-just, it not only has the very exotic melodic role of being almost exactly a third of [[4/3]], leading to [[4000/3993]] being [[Fudging|fudged]], but is also very close in size to a stack consisting of an [[apotome]] and [[33/32]], leading to the [[schisma]] being fudged. Keeping 11/10 distinct from 12/11 ensures that 11/10 bridges [[quartertone]]-based chords with more typical [[5-limit]] and [[Pythagorean tuning|Pythagorean]] chords as a step between notes. 
'''11/10''', the '''large undecimal neutral second''' or '''undecimal submajor second''', is an interval favored by Ptolemy. Coincidentally, the interval between the most common tuning frequency (A440) and the second most common AC electrical frequency (50 Hz) is exactly 44/5, or three octaves above an 11/10.
 
11/10 is the [[octave-reduced]] form of [[11/5]], one of the three most [[concordant]] 11-limit intervals within the entire [[4/1|first two octaves]] along with [[11/4]] and [[11/3]].
 
== Approximation ==
11/10 is approximated extremely precisely by [[80edo]] and its multiples, with a chain of 80 11/10's failing to close at the octave by a mere third of a [[cent]], close enough that you could theoretically tune an instrument to 80edo by ear using it if you had the patience. 11/10 is also approximated within 2 cents by [[22edo]], and is 4c sharp of an octave-reduced stack of 9 generators in [[BPS]].
{{Interval edo approximation|11/10}}
== Temperaments ==
Using 11/10 as a generator tempering out 4000/3993 (as previously mentioned) leads to scales that look like [[porcupine]] but whose harmonies can more accurately be explained. A half-octave period is exceptionally natural when 11/10 is a generator, because by virtue of making the (extremely accurate) approximation of the half-octave by [[99/70]], [[9/7]] is found as the period-complement of the generator. Taking this approach, this gives us temperaments in the [[stearnsmic clan]] such as [[pogo]], [[supers]], or [[echidna]], all of which detemper [[100/99]] ~ [[121/120]] and accurately find [[11-limit]] and (no-13's) [[17-limit]] harmonies. Of these, echidna's mapping of the no-13's 17-limit is the simplest, though all three have the same mapping of the 2.3.7.11/10.17 subgroup so that they only differ on the mapping of 5 and 11. The complexity of 5 and 11 in pogo are used to increase accuracy, being a weak schismic extension. That leaves supers as the odd one out; if you are using an edo tuning for it, 58edo supports echidna while 94edo supports pogo, so it seems to exist as a portable alternate way of finding primes 5 and 11 across systems, unless you use the 152edo tuning, which requires using the second-best mapping of 13 (the 152f [[val]]).
 
Using sqrt(11/10) (22/21[[~]]21/20) as a generator leads to the low-complexity [[Nautilus]] with one period to the octave, and if you use two periods to the octave with this generator you get the high-accuracy temperament [[Harry]]; using cbrt(11/10) as a generator leads to [[Escapade]] with one period to the octave.


== See also ==
== See also ==
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[[Category:Neutral second]]
[[Category:Neutral second]]
[[Category:Submajor second]]
[[Category:Submajor second]]
[[Category:Over-5]]
[[Category:Over-5 intervals]]
{{todo|expand|improve synopsis}}
[[Category:Equable heptatonic]]

Latest revision as of 13:07, 3 November 2025

Interval information
Ratio 11/10
Factorization 2-1 × 5-1 × 11
Monzo [-1 0 -1 0 1
Size in cents 165.0042¢
Names large undecimal neutral second,
undecimal submajor second
Color name 1og2, logu 2nd
FJS name [math]\displaystyle{ \text{m2}^{11}_{5} }[/math]
Special properties superparticular,
reduced
Tenney norm (log2 nd) 6.78136
Weil norm (log2 max(n, d)) 6.91886
Wilson norm (sopfr(nd)) 18

[sound info]
Open this interval in xen-calc

11/10, the large undecimal neutral second or undecimal submajor second, is the simplest submajor second. It is 15 cents sharp of 12/11 and 17 cents flat of 10/9. When tuned just or near-just, it not only has the very exotic melodic role of being almost exactly a third of 4/3, leading to 4000/3993 being fudged, but is also very close in size to a stack consisting of an apotome and 33/32, leading to the schisma being fudged. Keeping 11/10 distinct from 12/11 ensures that 11/10 bridges quartertone-based chords with more typical 5-limit and Pythagorean chords as a step between notes.

11/10 is the octave-reduced form of 11/5, one of the three most concordant 11-limit intervals within the entire first two octaves along with 11/4 and 11/3.

Approximation

11/10 is approximated extremely precisely by 80edo and its multiples, with a chain of 80 11/10's failing to close at the octave by a mere third of a cent, close enough that you could theoretically tune an instrument to 80edo by ear using it if you had the patience. 11/10 is also approximated within 2 cents by 22edo, and is 4c sharp of an octave-reduced stack of 9 generators in BPS.

Edo approximations for 11/10 (165.00 ¢)
≤ 80edo, relative error ≤ 10%
Edo Step size Cents (¢) Absolute error (¢) Relative error (%)
7 1\7 171.43 +6.42 +3.75
14 2\14 171.43 +6.42 +7.50
15 2\15 160.00 -5.00 -6.26
22 3\22 163.64 -1.37 -2.51
29 4\29 165.52 +0.51 +1.24
36 5\36 166.67 +1.66 +4.99
37 5\37 162.16 -2.84 -8.76
43 6\43 167.44 +2.44 +8.73
44 6\44 163.64 -1.37 -5.02
51 7\51 164.71 -0.30 -1.27
58 8\58 165.52 +0.51 +2.48
65 9\65 166.15 +1.15 +6.23
66 9\66 163.64 -1.37 -7.52
72 10\72 166.67 +1.66 +9.97
73 10\73 164.38 -0.62 -3.78
80 11\80 165.00 -0.00 -0.03

Temperaments

Using 11/10 as a generator tempering out 4000/3993 (as previously mentioned) leads to scales that look like porcupine but whose harmonies can more accurately be explained. A half-octave period is exceptionally natural when 11/10 is a generator, because by virtue of making the (extremely accurate) approximation of the half-octave by 99/70, 9/7 is found as the period-complement of the generator. Taking this approach, this gives us temperaments in the stearnsmic clan such as pogo, supers, or echidna, all of which detemper 100/99 ~ 121/120 and accurately find 11-limit and (no-13's) 17-limit harmonies. Of these, echidna's mapping of the no-13's 17-limit is the simplest, though all three have the same mapping of the 2.3.7.11/10.17 subgroup so that they only differ on the mapping of 5 and 11. The complexity of 5 and 11 in pogo are used to increase accuracy, being a weak schismic extension. That leaves supers as the odd one out; if you are using an edo tuning for it, 58edo supports echidna while 94edo supports pogo, so it seems to exist as a portable alternate way of finding primes 5 and 11 across systems, unless you use the 152edo tuning, which requires using the second-best mapping of 13 (the 152f val).

Using sqrt(11/10) (22/21~21/20) as a generator leads to the low-complexity Nautilus with one period to the octave, and if you use two periods to the octave with this generator you get the high-accuracy temperament Harry; using cbrt(11/10) as a generator leads to Escapade with one period to the octave.

See also

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