78edo

Prime factorization

2 × 3 × 13

Step size

15.3846¢

Fifth

46\78 (707.692¢) (→23\39)

Semitones (A1:m2)

10:4 (153.8¢ : 61.54¢)

Dual sharp fifth

46\78 (707.692¢) (→23\39)

Dual flat fifth

45\78 (692.308¢) (→15\26)

Dual major 2nd

13\78 (200¢) (→1\6)

Consistency limit

7

Distinct consistency limit

7

78 equal divisions of the octave (abbreviated 78edo or 78ed2), also called 78-tone equal temperament (78tet) or 78 equal temperament (78et) when viewed under a regular temperament perspective, is the tuning system that divides the octave into 78 equal parts of about 15.4 ¢ each. Each step represents a frequency ratio of 2^1/78, or the 78th root of 2.

Theory

Approximation of odd harmonics in 78edo
Harmonic		3	5	7	9	11	13	15	17	19	21	23
Error	absolute (¢)	+5.74	-1.70	+0.40	-3.91	+2.53	+5.63	+4.04	+2.74	-5.21	+6.14	+2.49
Error	relative (%)	+37	-11	+3	-25	+16	+37	+26	+18	-34	+40	+16
Steps (reduced)		124 (46)	181 (25)	219 (63)	247 (13)	270 (36)	289 (55)	305 (71)	319 (7)	331 (19)	343 (31)	353 (41)

This tuning tempers out 2048/2025 in the 5-limit; 875/864 and 2401/2400 in the 7-limit; and 100/99, 385/384 and 1375/1372 in the 11-limit. It provides the optimal patent val for 11-limit keen temperament.

Much like 100bddd, the 78dd val can be used to construct an alternative to 22edo for pajara. The large and small step sizes in this case have ratio 4:3. The width of the tempered perfect fifth is 707.7 ¢. The major third is 384.6 ¢; less than two cents flat of just. The harmonic seventh is 984.6 ¢, or about 15.8 ¢ sharp; hence this tuning prioritizes the 3- and 5-limits over the 7-limit, while still ensuring that no basic 7-limit intervals other than the tritones are more than 16 ¢ off. The 22-note 2MOS generated in this way could be used to build straight-fretted guitars that would be tuned in tritones. The appeal of this scale is that it is less xenharmonic than 22edo is, for listeners accustomed to 12edo. In particular, the 163.6 ¢ "flat minor whole tone" of 22edo is now 169.2 ¢, making it more clearly a whole tone (albeit noticeably flat), rather than a neutral second.

Intervals

Steps	Cents	Ups and downs notation (dual flat fifth 45\78)	Ups and downs notation (dual sharp fifth 46\78)	Approximate ratios
0	0	D	D	1/1
1	15.3846	^D, vvE♭♭♭	^D, v³E♭
2	30.7692	^^D, vE♭♭♭	^^D, vvE♭	49/48, 50/49, 56/55, 65/64, 66/65
3	46.1538	D♯, E♭♭♭	^³D, vE♭	77/75
4	61.5385	^D♯, vvE♭♭	^⁴D, E♭	80/77
5	76.9231	^^D♯, vE♭♭	^⁵D, v⁹E	22/21
6	92.3077	D𝄪, E♭♭	^⁶D, v⁸E	55/52
7	107.692	^D𝄪, vvE♭	^⁷D, v⁷E	16/15, 52/49
8	123.077	^^D𝄪, vE♭	^⁸D, v⁶E	14/13, 15/14
9	138.462	D♯𝄪, E♭	^⁹D, v⁵E	13/12
10	153.846	^D♯𝄪, vvE	D♯, v⁴E	12/11, 35/32
11	169.231	^^D♯𝄪, vE	^D♯, v³E	11/10
12	184.615	E	^^D♯, vvE	49/44
13	200	^E, vvF♭♭	^³D♯, vE	28/25, 55/49
14	215.385	^^E, vF♭♭	E	25/22
15	230.769	E♯, F♭♭	^E, v³F	8/7, 55/48
16	246.154	^E♯, vvF♭	^^E, vvF	15/13, 52/45
17	261.538	^^E♯, vF♭	^³E, vF	7/6, 64/55, 65/56
18	276.923	E𝄪, F♭	F	75/64
19	292.308	^E𝄪, vvF	^F, v³G♭	13/11, 77/65
20	307.692	^^E𝄪, vF	^^F, vvG♭
21	323.077	F	^³F, vG♭	77/64
22	338.462	^F, vvG♭♭♭	^⁴F, G♭
23	353.846	^^F, vG♭♭♭	^⁵F, v⁹G	16/13, 49/40, 60/49
24	369.231	F♯, G♭♭♭	^⁶F, v⁸G	26/21
25	384.615	^F♯, vvG♭♭	^⁷F, v⁷G	5/4
26	400	^^F♯, vG♭♭	^⁸F, v⁶G	44/35
27	415.385	F𝄪, G♭♭	^⁹F, v⁵G	14/11, 33/26
28	430.769	^F𝄪, vvG♭	F♯, v⁴G	32/25, 77/60
29	446.154	^^F𝄪, vG♭	^F♯, v³G
30	461.538	F♯𝄪, G♭	^^F♯, vvG	55/42, 64/49
31	476.923	^F♯𝄪, vvG	^³F♯, vG	21/16
32	492.308	^^F♯𝄪, vG	G	4/3, 65/49
33	507.692	G	^G, v³A♭	75/56
34	523.077	^G, vvA♭♭♭	^^G, vvA♭	65/48
35	538.462	^^G, vA♭♭♭	^³G, vA♭	15/11
36	553.846	G♯, A♭♭♭	^⁴G, A♭	11/8
37	569.231	^G♯, vvA♭♭	^⁵G, v⁹A	18/13
38	584.615	^^G♯, vA♭♭	^⁶G, v⁸A	7/5
39	600	G𝄪, A♭♭	^⁷G, v⁷A
40	615.385	^G𝄪, vvA♭	^⁸G, v⁶A	10/7
41	630.769	^^G𝄪, vA♭	^⁹G, v⁵A	13/9, 75/52
42	646.154	G♯𝄪, A♭	G♯, v⁴A	16/11
43	661.538	^G♯𝄪, vvA	^G♯, v³A	22/15
44	676.923	^^G♯𝄪, vA	^^G♯, vvA	65/44, 77/52
45	692.308	A	^³G♯, vA
46	707.692	^A, vvB♭♭♭	A	3/2
47	723.077	^^A, vB♭♭♭	^A, v³B♭	32/21
48	738.462	A♯, B♭♭♭	^^A, vvB♭	49/32, 75/49
49	753.846	^A♯, vvB♭♭	^³A, vB♭	65/42
50	769.231	^^A♯, vB♭♭	^⁴A, B♭	25/16
51	784.615	A𝄪, B♭♭	^⁵A, v⁹B	11/7, 52/33
52	800	^A𝄪, vvB♭	^⁶A, v⁸B	35/22
53	815.385	^^A𝄪, vB♭	^⁷A, v⁷B	8/5, 77/48
54	830.769	A♯𝄪, B♭	^⁸A, v⁶B	21/13
55	846.154	^A♯𝄪, vvB	^⁹A, v⁵B	13/8, 49/30, 80/49
56	861.538	^^A♯𝄪, vB	A♯, v⁴B
57	876.923	B	^A♯, v³B
58	892.308	^B, vvC♭♭	^^A♯, vvB
59	907.692	^^B, vC♭♭	^³A♯, vB	22/13
60	923.077	B♯, C♭♭	B	75/44
61	938.462	^B♯, vvC♭	^B, v³C	12/7, 55/32
62	953.846	^^B♯, vC♭	^^B, vvC	26/15, 45/26
63	969.231	B𝄪, C♭	^³B, vC	7/4
64	984.615	^B𝄪, vvC	C	44/25
65	1000	^^B𝄪, vC	^C, v³D♭	25/14
66	1015.38	C	^^C, vvD♭
67	1030.77	^C, vvD♭♭♭	^³C, vD♭	20/11
68	1046.15	^^C, vD♭♭♭	^⁴C, D♭	11/6, 64/35
69	1061.54	C♯, D♭♭♭	^⁵C, v⁹D	24/13
70	1076.92	^C♯, vvD♭♭	^⁶C, v⁸D	13/7, 28/15
71	1092.31	^^C♯, vD♭♭	^⁷C, v⁷D	15/8, 49/26
72	1107.69	C𝄪, D♭♭	^⁸C, v⁶D
73	1123.08	^C𝄪, vvD♭	^⁹C, v⁵D	21/11
74	1138.46	^^C𝄪, vD♭	C♯, v⁴D	77/40
75	1153.85	C♯𝄪, D♭	^C♯, v³D
76	1169.23	^C♯𝄪, vvD	^^C♯, vvD	49/25, 55/28, 65/33
77	1184.62	^^C♯𝄪, vD	^³C♯, vD
78	1200	D	D	2/1

78edo

Theory

Intervals

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