13-limit: Difference between revisions

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The 13-prime-limit can be modeled in a 5-dimensional lattice, with the primes 3, 5, 7, 11, and 13 represented by each dimension. The prime 2 does not appear in the typical 13-limit lattice because [[octave equivalence]] is presumed. If octave equivalence is not presumed, a sixth dimension is needed.

~~Examples~~ of [[~~EDO~~]]s which represent 13-limit intervals ~~well include~~: {{EDOs|26, 37, 46, 50, 87, 130, 183, ~~207~~, ~~217~~, 224, 270, 494, ~~851~~, ~~1075~~, ~~1282~~, ~~1578~~, ~~2159~~, ~~2190~~, ~~2684~~, ~~3265~~, ~~3535~~, ~~4573~~, ~~5004~~, ~~5585~~, ~~6079~~, ~~8269~~, ~~8539~~, ~~13854~~, ~~14124~~, ~~16808~~, ~~20203~~, ~~22887~~, ~~28742~~, ~~32007~~, ~~37011~~, ~~50434~~, ~~50928~~, ~~51629~~, ~~54624~~, ~~56202~~, ~~59467~~, ~~64471~~, ~~65052~~, ~~... .~~ }}

A list of [[edo]]s which represent 13-limit intervals better: {{EDOs| 26, 27e, 29, 31, 41, 46, 53, 58, 72, 87, 103, 111, 121, 130, 183, 190, 198, 224, 270, 494 }} and so on. Another list of edos which tunes the 13-limit well relative to their size ([[TE relative error|relative error]] < 5.5%): {{EDOs| 31, 41, 46, 53, 58, 72, 87, 94, 103, 111, 121, 130, 140, 152f, 159, 183, 190, 198, 212, 217, 224, 270, 282, 296, 301, 311, 320, 328, 342f, 354, 364, 369f, 373, 383, 400, 414, 422, 431, 441, 460, 472, 494 }} and so on.

== Intervals ==

Here are all the 15-odd-limit intervals of 13:

~~Here are all the 15-odd-limit intervals of 13:~~

{| class="wikitable"

! Ratio

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 The 13-prime-limit can be modeled in a 5-dimensional lattice, with the primes 3, 5, 7, 11, and 13 represented by each dimension. The prime 2 does not appear in the typical 13-limit lattice because [[octave equivalence]] is presumed. If octave equivalence is not presumed, a sixth dimension is needed.
-Examples of [[EDO]]s which represent 13-limit intervals well include: {{EDOs|26, 37, 46, 50, 87, 130, 183, 207, 217, 224, 270, 494, 851, 1075, 1282, 1578, 2159, 2190, 2684, 3265, 3535, 4573, 5004, 5585, 6079, 8269, 8539, 13854, 14124, 16808, 20203, 22887, 28742, 32007, 37011, 50434, 50928, 51629, 54624, 56202, 59467, 64471, 65052, ... . }}
+A list of [[edo]]s which represent 13-limit intervals better: {{EDOs| 26, 27e, 29, 31, 41, 46, 53, 58, 72, 87, 103, 111, 121, 130, 183, 190, 198, 224, 270, 494 }} and so on. Another list of edos which tunes the 13-limit well relative to their size ([[TE relative error|relative error]] < 5.5%): {{EDOs| 31, 41, 46, 53, 58, 72, 87, 94, 103, 111, 121, 130, 140, 152f, 159, 183, 190, 198, 212, 217, 224, 270, 282, 296, 301, 311, 320, 328, 342f, 354, 364, 369f, 373, 383, 400, 414, 422, 431, 441, 460, 472, 494 }} and so on.
 == Intervals ==
+Here are all the 15-odd-limit intervals of 13:
-Here are all the 15-odd-limit intervals of 13:
 {| class="wikitable"
 ! Ratio