73edt

Division of the third harmonic into 73 equal parts (73edt) is related to 46 edo, but with the 3/1 rather than the 2/1 being just. The octave is about 1.5078 cents compressed and the step size is about 26.0542 cents. It is consistent to the 18-integer-limit. In comparison, 46edo is only consistent up to the 14-integer-limit.

degree	cents value	corresponding JI intervals	comments
0	0.0000	exact 1/1
1	26.0542	66/65
2	52.1084	34/33
3	78.1625	68/65
4	104.2167	17/16
5	130.2709	55/51
6	156.3251
7	182.3792	10/9
8	208.4334	44/39
9	234.4876
10	260.5418
11	286.5960
12	312.6501		pseudo-6/5
13	338.7043
14	364.7585	100/81
15	390.8127		pseudo-5/4
16	416.8668	14/11
17	442.9210	31/24
18	468.9752
19	495.0294
20	521.0836
21	547.1377
22	573.1919	39/28
23	599.2461	140/99
24	625.3003
25	651.3545
26	677.4086
27	703.4628		pseudo-3/2
28	729.5170	32/21
29	755.5712
30	781.6253
31	807.6795
32	833.7337
33	859.7879
34	885.8421		pseudo-5/3
35	911.8962
36	937.9504
37	964.0046
38	990.0588
39	1016.1129		pseudo-9/5
40	1042.1671	42/23
41	1068.2213
42	1094.2755
43	1120.3297
44	1146.3838	64/33
45	1172.4380	63/32
46	1198.4922		pseudo-octave
47	1224.5464
48	1250.6005	35/17
49	1276.6547	23/11
50	1302.7089
51	1328.7631	28/13
52	1354.8173
53	1380.8714
54	1406.9256
55	1432.9798
56	1459.0340
57	1485.0882
58	1511.1423		pseudo-12/5
59	1537.1965
60	1563.2507
61	1589.3049		pseudo-5/2
62	1615.3590
63	1641.4132
64	1667.4674
65	1693.5216
66	1719.5758	27/10
67	1745.6299
68	1771.6841
69	1797.7383	48/17
70	1823.7925
71	1849.8466	99/34
72	1875.9008	65/22
73	1901.9550	exact 3/1	just perfect fifth plus an octave

73edt

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