120edo: Difference between revisions

← 119edo 120edo 121edo →
Prime factorization	23 × 3 × 5 (highly composite)
Step size	10 ¢
Fifth	70\120 (700 ¢) (→ 7\12)
Semitones (A1:m2)	10:10 (100 ¢ : 100 ¢)
Consistency limit	3
Distinct consistency limit	3

← Older edit Newer edit →

VisualWikitext

Revision as of 03:04, 5 July 2023

Template:EDO intro

Theory

120edo is the 10th highly composite EDO and the 5th factorial EDO (120 = 1*2*3*4*5 = 5!).

120edo is an excellent tuning in the 2.3.7.11.13.23.29 subgroup. In the no-5s 11-limit, it tempers out 243/242.

120edo shares the perfect fifth with 12edo, tempering out the Pythagorean comma. The sharp fifth of 710 cents also has regular temperament interpretations. It is used in the 120b val for tuning the 5-limit superpyth temperament where it represents 3/2, and in the 120g val as a tuning for the 19-limit surmarvelpyth temperament where it represents 675/448, which is marvel comma sharp of 3/2. In the patent val 120edo is also a tuning for the 7-limit decoid temperament.

Prime harmonics

Approximation of prime harmonics in 120edo
Harmonic		2	3	5	7	11	13	17	19	23	29	31
Error	Absolute (¢)	+0.00	-1.96	+3.69	+1.17	-1.32	-0.53	-4.96	+2.49	+1.73	+0.42	+4.96
Error	Relative (%)	+0.0	-19.6	+36.9	+11.7	-13.2	-5.3	-49.6	+24.9	+17.3	+4.2	+49.6
Steps (reduced)		120 (0)	190 (70)	279 (39)	337 (97)	415 (55)	444 (84)	490 (10)	510 (30)	543 (63)	583 (103)	595 (115)

Miscellaneous properties

Being the simplest division of the octave by the Germanic long hundred, it has a unit step which is the fine relative cent of 1edo.

120edo also has a concoctic generator that resembles the leap day excess of earth, 29\120 corresponding to 5 hours and 48 minutes.

Interval list

Steps	Cents	Approximate ratios	Ups and downs notation
0	0	1/1	D
1	10		^D, ^E♭♭
2	20		^^D, ^^E♭♭
3	30		^³D, ^³E♭♭
4	40	42/41, 43/42, 44/43, 45/44, 46/45	^⁴D, ^⁴E♭♭
5	50	34/33	^⁵D, v⁵E♭
6	60	29/28, 30/29	v⁴D♯, v⁴E♭
7	70		v³D♯, v³E♭
8	80	22/21, 45/43	vvD♯, vvE♭
9	90	20/19, 39/37	vD♯, vE♭
10	100	18/17	D♯, E♭
11	110	16/15, 49/46	^D♯, ^E♭
12	120	15/14	^^D♯, ^^E♭
13	130	14/13, 41/38	^³D♯, ^³E♭
14	140	13/12	^⁴D♯, ^⁴E♭
15	150	12/11	^⁵D♯, v⁵E
16	160	45/41	v⁴D𝄪, v⁴E
17	170	32/29, 43/39	v³D𝄪, v³E
18	180		vvD𝄪, vvE
19	190	29/26, 48/43	vD𝄪, vE
20	200	37/33, 46/41	E
21	210	35/31, 44/39	^E, ^F♭
22	220	42/37	^^E, ^^F♭
23	230	8/7	^³E, ^³F♭
24	240	23/20	^⁴E, ^⁴F♭
25	250	37/32	^⁵E, v⁵F
26	260	43/37	v⁴E♯, v⁴F
27	270		v³E♯, v³F
28	280	47/40	vvE♯, vvF
29	290	13/11	vE♯, vF
30	300	44/37	F
31	310	49/41	^F, ^G♭♭
32	320		^^F, ^^G♭♭
33	330	23/19	^³F, ^³G♭♭
34	340	28/23, 45/37	^⁴F, ^⁴G♭♭
35	350	49/40	^⁵F, v⁵G♭
36	360	16/13	v⁴F♯, v⁴G♭
37	370	26/21	v³F♯, v³G♭
38	380		vvF♯, vvG♭
39	390		vF♯, vG♭
40	400	29/23, 34/27	F♯, G♭
41	410	19/15	^F♯, ^G♭
42	420	37/29	^^F♯, ^^G♭
43	430	41/32	^³F♯, ^³G♭
44	440	40/31, 49/38	^⁴F♯, ^⁴G♭
45	450	48/37	^⁵F♯, v⁵G
46	460	30/23, 43/33	v⁴F𝄪, v⁴G
47	470	21/16	v³F𝄪, v³G
48	480	29/22	vvF𝄪, vvG
49	490		vF𝄪, vG
50	500	4/3	G
51	510	43/32, 47/35	^G, ^A♭♭
52	520		^^G, ^^A♭♭
53	530	19/14	^³G, ^³A♭♭
54	540	41/30	^⁴G, ^⁴A♭♭
55	550	11/8	^⁵G, v⁵A♭
56	560	29/21	v⁴G♯, v⁴A♭
57	570	32/23	v³G♯, v³A♭
58	580		vvG♯, vvA♭
59	590	45/32	vG♯, vA♭
60	600	41/29	G♯, A♭
61	610	37/26	^G♯, ^A♭
62	620		^^G♯, ^^A♭
63	630	23/16	^³G♯, ^³A♭
64	640	42/29	^⁴G♯, ^⁴A♭
65	650	16/11	^⁵G♯, v⁵A
66	660	41/28	v⁴G𝄪, v⁴A
67	670	28/19	v³G𝄪, v³A
68	680	43/29	vvG𝄪, vvA
69	690		vG𝄪, vA
70	700	3/2	A
71	710		^A, ^B♭♭
72	720	44/29, 47/31	^^A, ^^B♭♭
73	730	32/21	^³A, ^³B♭♭
74	740	23/15	^⁴A, ^⁴B♭♭
75	750	37/24	^⁵A, v⁵B♭
76	760	31/20, 45/29	v⁴A♯, v⁴B♭
77	770		v³A♯, v³B♭
78	780		vvA♯, vvB♭
79	790	30/19, 41/26	vA♯, vB♭
80	800	27/17, 46/29	A♯, B♭
81	810		^A♯, ^B♭
82	820	45/28	^^A♯, ^^B♭
83	830	21/13	^³A♯, ^³B♭
84	840	13/8	^⁴A♯, ^⁴B♭
85	850	49/30	^⁵A♯, v⁵B
86	860	23/14	v⁴A𝄪, v⁴B
87	870	38/23, 43/26	v³A𝄪, v³B
88	880		vvA𝄪, vvB
89	890		vA𝄪, vB
90	900	37/22	B
91	910	22/13, 49/29	^B, ^C♭
92	920		^^B, ^^C♭
93	930		^³B, ^³C♭
94	940		^⁴B, ^⁴C♭
95	950	45/26	^⁵B, v⁵C
96	960	40/23	v⁴B♯, v⁴C
97	970	7/4	v³B♯, v³C
98	980	37/21	vvB♯, vvC
99	990	39/22	vB♯, vC
100	1000	41/23	C
101	1010	43/24	^C, ^D♭♭
102	1020		^^C, ^^D♭♭
103	1030	29/16	^³C, ^³D♭♭
104	1040		^⁴C, ^⁴D♭♭
105	1050	11/6	^⁵C, v⁵D♭
106	1060	24/13	v⁴C♯, v⁴D♭
107	1070	13/7	v³C♯, v³D♭
108	1080	28/15	vvC♯, vvD♭
109	1090	15/8	vC♯, vD♭
110	1100	17/9	C♯, D♭
111	1110	19/10	^C♯, ^D♭
112	1120	21/11	^^C♯, ^^D♭
113	1130		^³C♯, ^³D♭
114	1140	29/15	^⁴C♯, ^⁴D♭
115	1150	33/17	^⁵C♯, v⁵D
116	1160	41/21, 43/22, 45/23	v⁴C𝄪, v⁴D
117	1170		v³C𝄪, v³D
118	1180		vvC𝄪, vvD
119	1190		vC𝄪, vD
120	1200	2/1	D

120edo: Difference between revisions

Revision as of 03:04, 5 July 2023

Contents

Theory

Prime harmonics

Miscellaneous properties

Interval list

Navigation menu

@@ Line 18: / Line 18: @@
 == Interval list ==
-{|class="wikitable"
+{{Interval table}}
-|-
-!#
-!Cents
-![[Ups and downs notation]] (fifth 7\12)
-![[Ups and downs notation]] (fifth 71\120)
-|-
-|0
-|0
-|{{UDnote|step=0}}
-|{{UDnote|fifth=71|step=0}}
-|-
-|1
-|10
-|{{UDnote|step=1}}
-|{{UDnote|fifth=71|step=1}}
-|-
-|2
-|20
-|{{UDnote|step=2}}
-|{{UDnote|fifth=71|step=2}}
-|-
-|3
-|30
-|{{UDnote|step=3}}
-|{{UDnote|fifth=71|step=3}}
-|-
-|4
-|40
-|{{UDnote|step=4}}
-|{{UDnote|fifth=71|step=4}}
-|-
-|5
-|50
-|{{UDnote|step=5}}
-|{{UDnote|fifth=71|step=5}}
-|-
-|6
-|60
-|{{UDnote|step=6}}
-|{{UDnote|fifth=71|step=6}}
-|-
-|7
-|70
-|{{UDnote|step=7}}
-|{{UDnote|fifth=71|step=7}}
-|-
-|8
-|80
-|{{UDnote|step=8}}
-|{{UDnote|fifth=71|step=8}}
-|-
-|9
-|90
-|{{UDnote|step=9}}
-|{{UDnote|fifth=71|step=9}}
-|-
-|10
-|100
-|{{UDnote|step=10}}
-|{{UDnote|fifth=71|step=10}}
-|-
-|11
-|110
-|{{UDnote|step=11}}
-|{{UDnote|fifth=71|step=11}}
-|-
-|12
-|120
-|{{UDnote|step=12}}
-|{{UDnote|fifth=71|step=12}}
-|-
-|13
-|130
-|{{UDnote|step=13}}
-|{{UDnote|fifth=71|step=13}}
-|-
-|14
-|140
-|{{UDnote|step=14}}
-|{{UDnote|fifth=71|step=14}}
-|-
-|15
-|150
-|{{UDnote|step=15}}
-|{{UDnote|fifth=71|step=15}}
-|-
-|16
-|160
-|{{UDnote|step=16}}
-|{{UDnote|fifth=71|step=16}}
-|-
-|17
-|170
-|{{UDnote|step=17}}
-|{{UDnote|fifth=71|step=17}}
-|-
-|18
-|180
-|{{UDnote|step=18}}
-|{{UDnote|fifth=71|step=18}}
-|-
-|19
-|190
-|{{UDnote|step=19}}
-|{{UDnote|fifth=71|step=19}}
-|-
-|20
-|200
-|{{UDnote|step=20}}
-|{{UDnote|fifth=71|step=20}}
-|-
-|21
-|210
-|{{UDnote|step=21}}
-|{{UDnote|fifth=71|step=21}}
-|-
-|22
-|220
-|{{UDnote|step=22}}
-|{{UDnote|fifth=71|step=22}}
-|-
-|23
-|230
-|{{UDnote|step=23}}
-|{{UDnote|fifth=71|step=23}}
-|-
-|24
-|240
-|{{UDnote|step=24}}
-|{{UDnote|fifth=71|step=24}}
-|-
-|25
-|250
-|{{UDnote|step=25}}
-|{{UDnote|fifth=71|step=25}}
-|-
-|26
-|260
-|{{UDnote|step=26}}
-|{{UDnote|fifth=71|step=26}}
-|-
-|27
-|270
-|{{UDnote|step=27}}
-|{{UDnote|fifth=71|step=27}}
-|-
-|28
-|280
-|{{UDnote|step=28}}
-|{{UDnote|fifth=71|step=28}}
-|-
-|29
-|290
-|{{UDnote|step=29}}
-|{{UDnote|fifth=71|step=29}}
-|-
-|30
-|300
-|{{UDnote|step=30}}
-|{{UDnote|fifth=71|step=30}}
-|-
-|31
-|310
-|{{UDnote|step=31}}
-|{{UDnote|fifth=71|step=31}}
-|-
-|32
-|320
-|{{UDnote|step=32}}
-|{{UDnote|fifth=71|step=32}}
-|-
-|33
-|330
-|{{UDnote|step=33}}
-|{{UDnote|fifth=71|step=33}}
-|-
-|34
-|340
-|{{UDnote|step=34}}
-|{{UDnote|fifth=71|step=34}}
-|-
-|35
-|350
-|{{UDnote|step=35}}
-|{{UDnote|fifth=71|step=35}}
-|-
-|36
-|360
-|{{UDnote|step=36}}
-|{{UDnote|fifth=71|step=36}}
-|-
-|37
-|370
-|{{UDnote|step=37}}
-|{{UDnote|fifth=71|step=37}}
-|-
-|38
-|380
-|{{UDnote|step=38}}
-|{{UDnote|fifth=71|step=38}}
-|-
-|39
-|390
-|{{UDnote|step=39}}
-|{{UDnote|fifth=71|step=39}}
-|-
-|40
-|400
-|{{UDnote|step=40}}
-|{{UDnote|fifth=71|step=40}}
-|-
-|41
-|410
-|{{UDnote|step=41}}
-|{{UDnote|fifth=71|step=41}}
-|-
-|42
-|420
-|{{UDnote|step=42}}
-|{{UDnote|fifth=71|step=42}}
-|-
-|43
-|430
-|{{UDnote|step=43}}
-|{{UDnote|fifth=71|step=43}}
-|-
-|44
-|440
-|{{UDnote|step=44}}
-|{{UDnote|fifth=71|step=44}}
-|-
-|45
-|450
-|{{UDnote|step=45}}
-|{{UDnote|fifth=71|step=45}}
-|-
-|46
-|460
-|{{UDnote|step=46}}
-|{{UDnote|fifth=71|step=46}}
-|-
-|47
-|470
-|{{UDnote|step=47}}
-|{{UDnote|fifth=71|step=47}}
-|-
-|48
-|480
-|{{UDnote|step=48}}
-|{{UDnote|fifth=71|step=48}}
-|-
-|49
-|490
-|{{UDnote|step=49}}
-|{{UDnote|fifth=71|step=49}}
-|-
-|50
-|500
-|{{UDnote|step=50}}
-|{{UDnote|fifth=71|step=50}}
-|-
-|51
-|510
-|{{UDnote|step=51}}
-|{{UDnote|fifth=71|step=51}}
-|-
-|52
-|520
-|{{UDnote|step=52}}
-|{{UDnote|fifth=71|step=52}}
-|-
-|53
-|530
-|{{UDnote|step=53}}
-|{{UDnote|fifth=71|step=53}}
-|-
-|54
-|540
-|{{UDnote|step=54}}
-|{{UDnote|fifth=71|step=54}}
-|-
-|55
-|550
-|{{UDnote|step=55}}
-|{{UDnote|fifth=71|step=55}}
-|-
-|56
-|560
-|{{UDnote|step=56}}
-|{{UDnote|fifth=71|step=56}}
-|-
-|57
-|570
-|{{UDnote|step=57}}
-|{{UDnote|fifth=71|step=57}}
-|-
-|58
-|580
-|{{UDnote|step=58}}
-|{{UDnote|fifth=71|step=58}}
-|-
-|59
-|590
-|{{UDnote|step=59}}
-|{{UDnote|fifth=71|step=59}}
-|-
-|60
-|600
-|{{UDnote|step=60}}
-|{{UDnote|fifth=71|step=60}}
-|-
-|61
-|610
-|{{UDnote|step=61}}
-|{{UDnote|fifth=71|step=61}}
-|-
-|62
-|620
-|{{UDnote|step=62}}
-|{{UDnote|fifth=71|step=62}}
-|-
-|63
-|630
-|{{UDnote|step=63}}
-|{{UDnote|fifth=71|step=63}}
-|-
-|64
-|640
-|{{UDnote|step=64}}
-|{{UDnote|fifth=71|step=64}}
-|-
-|65
-|650
-|{{UDnote|step=65}}
-|{{UDnote|fifth=71|step=65}}
-|-
-|66
-|660
-|{{UDnote|step=66}}
-|{{UDnote|fifth=71|step=66}}
-|-
-|67
-|670
-|{{UDnote|step=67}}
-|{{UDnote|fifth=71|step=67}}
-|-
-|68
-|680
-|{{UDnote|step=68}}
-|{{UDnote|fifth=71|step=68}}
-|-
-|69
-|690
-|{{UDnote|step=69}}
-|{{UDnote|fifth=71|step=69}}
-|-
-|70
-|700
-|{{UDnote|step=70}}
-|{{UDnote|fifth=71|step=70}}
-|-
-|71
-|710
-|{{UDnote|step=71}}
-|{{UDnote|fifth=71|step=71}}
-|-
-|72
-|720
-|{{UDnote|step=72}}
-|{{UDnote|fifth=71|step=72}}
-|-
-|73
-|730
-|{{UDnote|step=73}}
-|{{UDnote|fifth=71|step=73}}
-|-
-|74
-|740
-|{{UDnote|step=74}}
-|{{UDnote|fifth=71|step=74}}
-|-
-|75
-|750
-|{{UDnote|step=75}}
-|{{UDnote|fifth=71|step=75}}
-|-
-|76
-|760
-|{{UDnote|step=76}}
-|{{UDnote|fifth=71|step=76}}
-|-
-|77
-|770
-|{{UDnote|step=77}}
-|{{UDnote|fifth=71|step=77}}
-|-
-|78
-|780
-|{{UDnote|step=78}}
-|{{UDnote|fifth=71|step=78}}
-|-
-|79
-|790
-|{{UDnote|step=79}}
-|{{UDnote|fifth=71|step=79}}
-|-
-|80
-|800
-|{{UDnote|step=80}}
-|{{UDnote|fifth=71|step=80}}
-|-
-|81
-|810
-|{{UDnote|step=81}}
-|{{UDnote|fifth=71|step=81}}
-|-
-|82
-|820
-|{{UDnote|step=82}}
-|{{UDnote|fifth=71|step=82}}
-|-
-|83
-|830
-|{{UDnote|step=83}}
-|{{UDnote|fifth=71|step=83}}
-|-
-|84
-|840
-|{{UDnote|step=84}}
-|{{UDnote|fifth=71|step=84}}
-|-
-|85
-|850
-|{{UDnote|step=85}}
-|{{UDnote|fifth=71|step=85}}
-|-
-|86
-|860
-|{{UDnote|step=86}}
-|{{UDnote|fifth=71|step=86}}
-|-
-|87
-|870
-|{{UDnote|step=87}}
-|{{UDnote|fifth=71|step=87}}
-|-
-|88
-|880
-|{{UDnote|step=88}}
-|{{UDnote|fifth=71|step=88}}
-|-
-|89
-|890
-|{{UDnote|step=89}}
-|{{UDnote|fifth=71|step=89}}
-|-
-|90
-|900
-|{{UDnote|step=90}}
-|{{UDnote|fifth=71|step=90}}
-|-
-|91
-|910
-|{{UDnote|step=91}}
-|{{UDnote|fifth=71|step=91}}
-|-
-|92
-|920
-|{{UDnote|step=92}}
-|{{UDnote|fifth=71|step=92}}
-|-
-|93
-|930
-|{{UDnote|step=93}}
-|{{UDnote|fifth=71|step=93}}
-|-
-|94
-|940
-|{{UDnote|step=94}}
-|{{UDnote|fifth=71|step=94}}
-|-
-|95
-|950
-|{{UDnote|step=95}}
-|{{UDnote|fifth=71|step=95}}
-|-
-|96
-|960
-|{{UDnote|step=96}}
-|{{UDnote|fifth=71|step=96}}
-|-
-|97
-|970
-|{{UDnote|step=97}}
-|{{UDnote|fifth=71|step=97}}
-|-
-|98
-|980
-|{{UDnote|step=98}}
-|{{UDnote|fifth=71|step=98}}
-|-
-|99
-|990
-|{{UDnote|step=99}}
-|{{UDnote|fifth=71|step=99}}
-|-
-|100
-|1000
-|{{UDnote|step=100}}
-|{{UDnote|fifth=71|step=100}}
-|-
-|101
-|1010
-|{{UDnote|step=101}}
-|{{UDnote|fifth=71|step=101}}
-|-
-|102
-|1020
-|{{UDnote|step=102}}
-|{{UDnote|fifth=71|step=102}}
-|-
-|103
-|1030
-|{{UDnote|step=103}}
-|{{UDnote|fifth=71|step=103}}
-|-
-|104
-|1040
-|{{UDnote|step=104}}
-|{{UDnote|fifth=71|step=104}}
-|-
-|105
-|1050
-|{{UDnote|step=105}}
-|{{UDnote|fifth=71|step=105}}
-|-
-|106
-|1060
-|{{UDnote|step=106}}
-|{{UDnote|fifth=71|step=106}}
-|-
-|107
-|1070
-|{{UDnote|step=107}}
-|{{UDnote|fifth=71|step=107}}
-|-
-|108
-|1080
-|{{UDnote|step=108}}
-|{{UDnote|fifth=71|step=108}}
-|-
-|109
-|1090
-|{{UDnote|step=109}}
-|{{UDnote|fifth=71|step=109}}
-|-
-|110
-|1100
-|{{UDnote|step=110}}
-|{{UDnote|fifth=71|step=110}}
-|-
-|111
-|1110
-|{{UDnote|step=111}}
-|{{UDnote|fifth=71|step=111}}
-|-
-|112
-|1120
-|{{UDnote|step=112}}
-|{{UDnote|fifth=71|step=112}}
-|-
-|113
-|1130
-|{{UDnote|step=113}}
-|{{UDnote|fifth=71|step=113}}
-|-
-|114
-|1140
-|{{UDnote|step=114}}
-|{{UDnote|fifth=71|step=114}}
-|-
-|115
-|1150
-|{{UDnote|step=115}}
-|{{UDnote|fifth=71|step=115}}
-|-
-|116
-|1160
-|{{UDnote|step=116}}
-|{{UDnote|fifth=71|step=116}}
-|-
-|117
-|1170
-|{{UDnote|step=117}}
-|{{UDnote|fifth=71|step=117}}
-|-
-|118
-|1180
-|{{UDnote|step=118}}
-|{{UDnote|fifth=71|step=118}}
-|-
-|119
-|1190
-|{{UDnote|step=119}}
-|{{UDnote|fifth=71|step=119}}
-|-
-|120
-|1200
-|{{UDnote|step=120}}
-|{{UDnote|fifth=71|step=120}}
-|}
 [[Category:Equal divisions of the octave|###]] <!-- 3-digit number -->
 [[Category:Highly composite]]

120edo: Difference between revisions

Revision as of 03:04, 5 July 2023

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