95ed5

Division of the 5th harmonic into 95 equal parts (95ed5) is related to 41 edo, but with the 5/1 rather than the 2/1 being just. The octave is about 2.5143 cents stretched and the step size about 29.3296 cents. This tuning has a generally sharp tendency for harmonics up to 12. Unlike 41edo, it is only consistent up to the 12-integer-limit, with discrepancy for the 13th harmonic.

degree	cents value	corresponding JI intervals	comments
0	0.0000	exact 1/1
1	29.3296
2	58.6592
3	87.9889
4	117.3185
5	146.6481
6	175.9777
7	205.3073
8	234.6369
9	263.9666
10	293.2962
11	322.6258
12	351.9554
13	381.2850		pseudo-5/4
14	410.6147
15	439.9443
16	469.2739
17	498.6035
18	527.9331
19	557.2627
20	586.5924
21	615.9220
22	645.2516
23	674.5812
24	703.9108		pseudo-3/2
25	733.2405
26	762.5701
27	791.8997
28	821.2293
29	850.5589
30	879.8885		pseudo-5/3
31	909.2182
32	938.5478
33	967.8774
34	997.2070
35	1026.5366
36	1055.8662
37	1085.1959
38	1114.5255
39	1143.8551
40	1173.1847
41	1202.5143		pseudo-octave
42	1231.8440
43	1261.1736
44	1290.5032
45	1319.8328
46	1349.1624
47	1378.4920
48	1407.8217
49	1437.1513
50	1466.4809
51	1495.8105
52	1525.1401
53	1554.4698
54	1583.7994		pseudo-5/2
55	1613.1290
56	1642.4586
57	1671.7882
58	1701.1178
59	1730.4475
60	1759.7771
61	1789.1067
62	1818.4363
63	1847.7659
64	1877.0956
65	1906.4252		pseudo-3/1
66	1935.7548
67	1965.0844
68	1994.4140
69	2023.7436
70	2053.0733
71	2082.4029		pseudo-10/3
72	2111.7325
73	2141.0621
74	2170.3917
75	2199.7214
76	2229.0510
77	2258.3806
78	2287.7102
79	2317.0398
80	2346.3694
81	2375.6991
82	2405.0287		pseudo-4/1
83	2434.3583
84	2463.6879
85	2493.0175
86	2522.3472
87	2551.6768
88	2581.0064
89	2610.3360
90	2639.6656
91	2668.9952
92	2698.3249
93	2727.6545
94	2756.9841
95	2786.3137	exact 5/1	just major third plus two octaves