13-odd-limit: Difference between revisions

Latest revision as of 13:42, 8 October 2025

Odd limit

← 11-odd-limit 13-odd-limit 15-odd-limit →

The 13-odd-limit is the set of all rational intervals which can be written as 2^k(a/b) where a, b ≤ 13 and k is an integer. To the 11-odd-limit, it adds 6 pairs of octave-reduced intervals involving 13.

Below is a list of all octave-reduced intervals in the 13-odd-limit.

Ratio	Size (¢)	Color name		Name(s)
14/13	128.298	3uz2	thuzo 2nd	tridecimal large semitone
13/12	138.573	3o2	tho 2nd	tridecimal supraminor second / tridecimal subneutral second
13/11	289.210	3o1u3	tholu 3rd	tridecimal minor third
16/13	359.472	3u3	thu 3rd	tridecimal supra-neutral third
13/10	454.214	3og4	thogu 4th	tridecimal subfourth / tridecimal third-fourth
18/13	563.382	3u4	thu 4th	tridecimal superfourth
13/9	636.618	3o5	tho 5th	tridecimal subfifth
20/13	745.786	3uy5	thuyo 5th	tridecimal superfifth / tridecimal fifth-sixth
13/8	840.528	3o6	tho 6th	tridecimal subneutral sixth
22/13	910.790	3u1o6	thulo 6th	tridecimal major sixth
24/13	1061.427	3u7	thu 7th	tridecimal supra-neutral seventh
13/7	1071.702	3or7	thoru 7th	tridecimal submajor seventh

The smallest equal division of the octave which is consistent in the 13-odd-limit is 26edo.

The smallest one which is distinctly consistent in the same is 87edo.

@@ Line 104: / Line 104: @@
 The smallest [[equal division of the octave]] which is [[consistent]] in the 13-odd-limit is [[26edo]].
-The smallest one that comes closest to being distinctly consistent in the same is [[53edo]] (misses [[11/7]], [[14/11]]); the one which is truly consistent is [[87edo]].
+<span data-darkreader-inline-color="">The smallest one which is distinctly consistent in the same is</span> [[87edo]].
 == See also ==

13-odd-limit: Difference between revisions

Latest revision as of 13:42, 8 October 2025

See also

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