Xenharmonic Wiki

29edt

Revision as of 19:52, 5 October 2022 by Plumtree (talk | contribs) (Infobox ET added)

29EDT is the equal division of the third harmonic into 29 parts of 65.5847 cents each, corresponding to 18.2970 edo. It is related to the luminal temperament.

← 28edt 29edt 30edt →
Prime factorization 29 (prime)
Step size 65.5847 ¢ 
Octave 18\29edt (1180.52 ¢)
Consistency limit 3
Distinct consistency limit 3
steps cents hekts corresponding
JI intervals 		comments
0 1/1
1 65.5847 44.8276 27/26
2 131.1693 89.6552 14/13, 27/25, 55/51
3 196.7540 134.4828 9/8, 28/25 pseudo-10/9
4 262.3386 179.3103 7/6
5 327.9233 224.1379 pseudo-6/5
6 393.5079 268.9655 64/51 pseudo-5/4
7 459.0926 313.7931 13/10
8 524.6772 358.6206 65/48, 27/20
9 590.2619 403.4483 45/32
10 655.8466 448.2759 16/11
11 721.4312 493.1034 pseudo-3/2
12 787.0159 537.9310 63/40, 52/33 pseudo-8/5
13 852.6005 582.7586 18/11 flat pseudo-5/3
14 918.1852 627.5862 17/10 sharp pseudo-5/3
15 983.7698 672.4138 30/17 flat pseudo-9/5
16 1049.3545 717.2414 11/6 sharp pseudo-9/5
17 1114.9391 772.0690 99/52, 40/21 pseudo-15/8
18 1180.5238 806.8966 pseudooctave
19 1246.1084 851.7241 33/16
20 1311.6931 896.5517 32/15
21 1377.2778 941.3794 144/65, 20/9
22 1442.8624 986.2069 30/13 pseudo-7/3 (7/6 plus pseudooctave)
23 1508.4471 1031.0345 153/64 pseudo-12/5
24 1574.0317 1075.8621 pseudo-5/2
25 1639.6164 1120.6897 18/7
26 1705.2010 1165.5172 8/3, 75/28 pseudo-27/10
27 1770.7857 1210.3448 39/14, 25/9, 153/55
28 1836.3703 1255.1724 26/9
29 1901.9550 1300.0000 3/1 just perfect fifth plus an octave
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