23/12: Difference between revisions

From Xenharmonic Wiki
Jump to navigation Jump to search
VisualWikitext
Created page with "{{Infobox Interval | Icon = | Ratio = 23/12 | Monzo = -2 -1 0 0 0 0 0 0 1 | Cents = 1126.31935 | Name = vicesimotertial major seventh | Color name = | Sound = }} The <b>vice..."
 
m Text replacement - " {{Interval_Edo_Approximation | " to "{{Interval edo approximation|"
 
(10 intermediate revisions by 8 users not shown)
Line 1: Line 1:
{{Infobox Interval
{{Infobox Interval
| Icon =
| Name = large vicesimotertial major seventh
| Ratio = 23/12
| Color name = 23o8, twetho 8ve
| Monzo = -2 -1 0 0 0 0 0 0 1
| Sound = Ji-23-12-csound-foscil-220hz.mp3
| Cents = 1126.31935
| Name = vicesimotertial major seventh
| Color name =  
| Sound =  
}}
}}
The <b>vicesimotertial major seventh</b> is a [[23-limit]] interval that is reached by going a justly tuned perfect twelve ([[3/1]], the 3rd harmonic) down from the 13th harmonic ([[13/1]]) and lifting the resulting ratio up to fit inside the octave.
 
[[Category:Interval]]
The '''large vicesimotertial major seventh''' is a [[23-limit]] interval that is reached by going a justly tuned perfect twelve ([[3/1]], the 3rd harmonic) down from the 23rd harmonic ([[23/1]]) and lifting the resulting ratio up to fit inside the octave.
[[Category:todo:expand]]
== Approximation ==
[[Category:23-limit]]
{{Interval edo approximation|23/12}}
 
[[Category:Seventh]]
[[Category:Major seventh]]
 
{{todo|expand}}

Latest revision as of 13:16, 3 November 2025

Interval information
Ratio 23/12
Subgroup monzo 2.3.23 [-2 -1 1
Size in cents 1126.319¢
Name large vicesimotertial major seventh
Color name 23o8, twetho 8ve
FJS name [math]\displaystyle{ \text{M7}^{23} }[/math]
Special properties reduced
Tenney norm (log2 nd) 8.10852
Weil norm (log2 max(n, d)) 9.04712
Wilson norm (sopfr(nd)) 30

[sound info]
Open this interval in xen-calc

The large vicesimotertial major seventh is a 23-limit interval that is reached by going a justly tuned perfect twelve (3/1, the 3rd harmonic) down from the 23rd harmonic (23/1) and lifting the resulting ratio up to fit inside the octave.

Approximation

Edo approximations for 23/12 (1126.32 ¢)
≤ 80edo, relative error ≤ 10%
Edo Step size Cents (¢) Absolute error (¢) Relative error (%)
15 14\15 1120.00 -6.32 -7.90
16 15\16 1125.00 -1.32 -1.76
17 16\17 1129.41 +3.09 +4.38
31 29\31 1122.58 -3.74 -9.66
32 30\32 1125.00 -1.32 -3.52
33 31\33 1127.27 +0.95 +2.62
34 32\34 1129.41 +3.09 +8.76
48 45\48 1125.00 -1.32 -5.28
49 46\49 1126.53 +0.21 +0.86
50 47\50 1128.00 +1.68 +7.00
64 60\64 1125.00 -1.32 -7.04
65 61\65 1126.15 -0.17 -0.90
66 62\66 1127.27 +0.95 +5.24
80 75\80 1125.00 -1.32 -8.80
Retrieved from "https://en.xen.wiki/index.php?title=23/12&oldid=216108"