16/15: Difference between revisions

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Some [[11th-octave temperaments]] treat ~16/15 as the period, including [[hendecatonic]].
Some [[11th-octave temperaments]] treat ~16/15 as the period, including [[hendecatonic]].
 
{| class="wikitable"
|+ EDO Approximations for 16/15
|-
! EDO !! Step size !! Absolute Error ([[Cent|¢]]) !! [[Relative_interval_error|Relative Error]] ([[Relative_cent|%]])
|-
| [[10edo|10]] || 1\10 || +8.27 || +6.89
|-
| [[11edo|11]] || 1\11 || -2.64 || -2.42
|-
| [[21edo|21]] || 2\21 || +2.55 || +4.47
|-
| [[22edo|22]] || 2\22 || -2.64 || -4.84
|-
| [[32edo|32]] || 3\32 || +0.77 || +2.05
|-
| [[33edo|33]] || 3\33 || -2.64 || -7.26
|-
| [[42edo|42]] || 4\42 || +2.55 || +8.94
|-
| [[43edo|43]] || 4\43 || -0.10 || -0.37
|-
| [[53edo|53]] || 5\53 || +1.48 || +6.52
|-
| [[54edo|54]] || 5\54 || -0.62 || -2.79
|}
== See also ==
== See also ==
* [[15/8]] – its [[octave complement]]
* [[15/8]] – its [[octave complement]]

Revision as of 04:04, 3 November 2025

Interval information
Ratio 16/15
Factorization 24 × 3-1 × 5-1
Monzo [4 -1 -1
Size in cents 111.7313¢
Names just diatonic semitone,
classic(al) diatonic semitone,
ptolemaic diatonic semitone
Color name g2, gu 2nd
FJS name [math]\displaystyle{ \text{m2}_{5} }[/math]
Special properties square superparticular,
reduced,
reduced subharmonic
Tenney norm (log2 nd) 7.90689
Weil norm (log2 max(n, d)) 8
Wilson norm (sopfr(nd)) 16
Comma size large
S-expressions S4,
S6⋅S7⋅S8

[sound info]
Open this interval in xen-calc
English Wikipedia has an article on:

The 5-limit superparticular interval 16/15 is the just diatonic semitone, classic(al) diatonic semitone or ptolemaic diatonic semitone[1].

It is the difference between:

  • the major second 9/8 and the minor third 6/5;
  • the major third 5/4 and the fourth 4/3;
  • the perfect fifth 3/2 and the minor sixth 8/5;
  • the major sixth 5/3 and the minor seventh 16/9;
  • the major seventh 15/8 and the perfect octave 2/1.

Approximation

16/15 is very accurately approximated by 43edo (4\43).

Temperaments

When this ratio is taken as a comma to be tempered out, it produces father temperament, and lends itself the name father comma. In this exotemperament, 4/3 and 5/4 are equated, and major thirds and fifths become octave complements of each other. It is a Mersenne comma.

The following linear temperaments are generated by a ~16/15:

In addition, this fractional-octave temperaments are generated by a ~16/15:

Some 11th-octave temperaments treat ~16/15 as the period, including hendecatonic.

EDO Approximations for 16/15
EDO Step size Absolute Error (¢) Relative Error (%)
10 1\10 +8.27 +6.89
11 1\11 -2.64 -2.42
21 2\21 +2.55 +4.47
22 2\22 -2.64 -4.84
32 3\32 +0.77 +2.05
33 3\33 -2.64 -7.26
42 4\42 +2.55 +8.94
43 4\43 -0.10 -0.37
53 5\53 +1.48 +6.52
54 5\54 -0.62 -2.79

See also

Notes

  1. For reference, see 5-limit.
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