57edo: Difference between revisions

← 56edo 57edo 58edo →
Prime factorization	3 × 19
Step size	21.0526 ¢
Fifth	33\57 (694.737 ¢) (→ 11\19)
Semitones (A1:m2)	3:6 (63.16 ¢ : 126.3 ¢)
Dual sharp fifth	34\57 (715.789 ¢)
Dual flat fifth	33\57 (694.737 ¢) (→ 11\19)
Dual major 2nd	10\57 (210.526 ¢)
Consistency limit	7
Distinct consistency limit	7

← Older edit

VisualWikitext

Latest revision as of 13:49, 12 May 2026

57 equal divisions of the octave (abbreviated 57edo or 57ed2), also called 57-tone equal temperament (57tet) or 57 equal temperament (57et) when viewed under a regular temperament perspective, is the tuning system that divides the octave into 57 equal parts of about 21.1 ¢ each. Each step represents a frequency ratio of 2^1/57, or the 57th root of 2.

Theory

57edo is an excellent tuning for the 2.5/3.7.11.13.17.19 just intonation subgroup. One way to describe 57edo is that it has a 5-limit part consisting of three rings of 19edo, plus a no-threes no-fives part which is much more accurate.

Using the full prime-limit patent val, the equal temperament tempers out 81/80, 1029/1024, and 3125/3072 in the 7-limit; and 99/98, 385/384, 441/440, and 625/616 in the 11-limit. A good generator to exploit the 2.5/3.7.11.13.17.19 aspect of 57 is the approximate 11/8, which is 26\57. This gives the 19-limit 46 & 57 temperament heinz. It can also be used to tune mothra as well as trismegistus.

Odd harmonics

Approximation of odd harmonics in 57edo
Harmonic		3	5	7	9	11	13	15	17	19	21	23
Error	Absolute (¢)	-7.22	-7.37	-0.40	+6.62	-3.95	+1.58	+6.47	+0.31	-2.78	-7.62	+3.30
Error	Relative (%)	-34.3	-35.0	-1.9	+31.4	-18.8	+7.5	+30.7	+1.5	-13.2	-36.2	+15.7
Steps (reduced)		90 (33)	132 (18)	160 (46)	181 (10)	197 (26)	211 (40)	223 (52)	233 (5)	242 (14)	250 (22)	258 (30)

Approximation of odd harmonics in 57edo (continued)
Harmonic		25	27	29	31	33	35	37	39	41	43	45
Error	Absolute (¢)	+6.32	-0.60	+2.00	-8.19	+9.88	-7.77	+1.29	-5.64	-8.01	-6.25	-0.75
Error	Relative (%)	+30.0	-2.9	+9.5	-38.9	+47.0	-36.9	+6.1	-26.8	-38.0	-29.7	-3.6
Steps (reduced)		265 (37)	271 (43)	277 (49)	282 (54)	288 (3)	292 (7)	297 (12)	301 (16)	305 (20)	309 (24)	313 (28)

Subsets and supersets

57edo contains 3edo and 19edo as subsets. Tripling 57edo yields 171edo, which corrects the 3rd and 5th harmonics.

Intervals

#	Cents	Approximate ratios*	Ups and downs notation (Flat fifth 11\19)	Ups and downs notation (Sharp fifth 34\57)
0	0.00	1/1	D	D
1	21.05		^D, ^E♭♭♭	^D, E♭
2	42.11		vD♯, vE♭♭	^^D, ^E♭
3	63.16	29/28	D♯, E♭♭	^³D, ^^E♭
4	84.21	20/19, 21/20, 22/21	^D♯, ^E♭♭	^⁴D, ^³E♭
5	105.26	17/16, 33/31	vD𝄪, vE♭	^⁵D, ^⁴E♭
6	126.32	14/13, 16/15	D𝄪, E♭	v⁴D♯, v⁵E
7	147.37	12/11	^D𝄪, ^E♭	v³D♯, v⁴E
8	168.42	11/10, 32/29	vD♯𝄪, vE	vvD♯, v³E
9	189.47	19/17, 29/26, 10/9, 9/8	E	vD♯, vvE
10	210.53	26/23	^E, ^F♭♭	D♯, vE
11	231.58	8/7	vE♯, vF♭	E
12	252.63	22/19	E♯, F♭	F
13	273.68	7/6, 34/29	^E♯, ^F♭	^F, G♭
14	294.74	19/16	vE𝄪, vF	^^F, ^G♭
15	315.79	6/5	F	^³F, ^^G♭
16	336.84	17/14, 28/23	^F, ^G♭♭♭	^⁴F, ^³G♭
17	357.89	16/13	vF♯, vG♭♭	^⁵F, ^⁴G♭
18	378.95	5/4	F♯, G♭♭	v⁴F♯, v⁵G
19	400.00	24/19, 29/23	^F♯, ^G♭♭	v³F♯, v⁴G
20	421.05	14/11, 9/7	vF𝄪, vG♭	vvF♯, v³G
21	442.11	22/17, 31/24	F𝄪, G♭	vF♯, vvG
22	463.16	17/13, 21/16, 38/29	^F𝄪, ^G♭	F♯, vG
23	484.21	33/25	vF♯𝄪, vG	G
24	505.26	4/3	G	^G, A♭
25	526.32	19/14, 42/31, 23/17	^G, ^A♭♭♭	^^G, ^A♭
26	547.37	11/8, 26/19	vG♯, vA♭♭	^³G, ^^A♭
27	568.42	25/18, 32/23	G♯, A♭♭	^⁴G, ^³A♭
28	589.47	31/22	^G♯, ^A♭♭	^⁵G, ^⁴A♭
29	610.53	44/31	vG𝄪, vA♭	v⁴G♯, v⁵A
30	631.58	23/16	G𝄪, A♭	v³G♯, v⁴A
31	652.63	16/11, 19/13	^G𝄪, ^A♭	vvG♯, v³A
32	673.68	28/19, 31/21, 34/23	vG♯𝄪, vA	vG♯, vvA
33	694.74	3/2	A	G♯, vA
34	715.79	50/33	^A, ^B♭♭♭	A
35	736.84	26/17, 32/21, 29/19	vA♯, vB♭♭	^A, B♭
36	757.89	17/11, 31/20	A♯, B♭♭	^^A, ^B♭
37	778.95	11/7, 14/9	^A♯, ^B♭♭	^³A, ^^B♭
38	800.00	19/12	vA𝄪, vB♭	^⁴A, ^³B♭
39	821.05	8/5	A𝄪, B♭	^⁵A, ^⁴B♭
40	842.11	13/8	^A𝄪, ^B♭	v⁴A♯, v⁵B
41	863.16	23/14, 28/17, 33/20	vA♯𝄪, vB	v³A♯, v⁴B
42	884.21	5/3	B	vvA♯, v³B
43	905.26	32/19	^B, ^C♭♭	vA♯, vvB
44	926.32	12/7, 29/17	vB♯, vC♭	A♯, vB
45	947.37	19/11	B♯, C♭	B
46	968.42	7/4	^B♯, ^C♭	C
47	989.47	23/13	vB𝄪, vC	^C, D♭
48	1010.53	34/19, 52/29, 9/5, 16/9	C	^^C, ^D♭
49	1031.58	20/11, 29/16	^C, ^D♭♭♭	^³C, ^^D♭
50	1052.63	11/6	vC♯, vD♭♭	^⁴C, ^³D♭
51	1073.68	13/7, 15/8	C♯, D♭♭	^⁵C, ^⁴D♭
52	1094.74	32/17	^C♯, ^D♭♭	v⁴C♯, v⁵D
53	1115.79	19/10, 21/11	vC𝄪, vD♭	v³C♯, v⁴D
54	1136.84	56/29	C𝄪, D♭	vvC♯, v³D
55	1157.89		^C𝄪, ^D♭	vC♯, vvD
56	1178.95		vC♯𝄪, vD	C♯, vD
57	1200.00	2/1	D	D

* As a 2.3.5.7.11.13.17.19.23.29.31-subgroup temperament, in italics if inconsistent

Notation

Stein–Zimmermann–Gould notation

57edo can be notated using Stein–Zimmermann–Gould notation:

Step offset	0	1	2	3	4	5	6	7
Sharp symbol								
Flat symbol								

Here, a sharp raises by three steps, and a flat lowers by three steps, so arrows can be used to fill in the gap. If the arrows are taken to have their own layer of enharmonic spellings, some notes may be best spelled with double arrows.

Kite's ups and downs notation

Spoken as up, downsharp, sharp, upsharp, etc. Note that downsharp can be respelled as dup (double-up), and upflat as dud.

Step offset	0	1	2	3	4	5	6	7
Sharp symbol
Flat symbol

Sagittal notation

This notation uses the same sagittal sequence as edos 50, 64, and 71b, and is a superset of the notation for 19edo.

Evo flavor

Revo flavor

In the diagrams above, a sagittal symbol followed by an equals sign (=) means that the following comma is the symbol's primary comma (the comma it exactly represents in JI), while an approximately equals sign (≈) means it is a secondary comma (a comma it approximately represents in JI). In both cases the symbol exactly represents the tempered version of the comma in this edo.

Scales

2 1 2 1 2 1 2 1 2 1 1 2 1 2 1 2 1 2 1 2 1 1 2 1 2 1 2 1 2 1 2 1 1 - 3mos of type 18L 21s (augene)

Instruments

Since 57edo contains 19edo as a non-trivial subset, it would be possible to use three 19edo instruments tuned 1\57 apart from each other to play the full gamut of 57edo.

A Lumatone mapping for 57edo is available.

Music

Bryan Deister

57edo improv (2025)
Prelude in 57edo (2025) (switches Lumatone mapping between sections)
- Part 1 (short clip)
- Part 2 (short clip)
- Whole composition (but no view of Lumatone)
57edo groove (2025)

57edo: Difference between revisions

Latest revision as of 13:49, 12 May 2026

Contents

Theory

Odd harmonics

Subsets and supersets

Intervals

Notation

Stein–Zimmermann–Gould notation

Kite's ups and downs notation

Sagittal notation

Evo flavor

Revo flavor

Scales

Instruments

Music

Navigation menu

@@ Line 3: / Line 3: @@
 == Theory ==
-edo is an excellent tuning for the 2.5/3.7.11.13.17.19 [[just intonation subgroup]]. One way to describe 57edo is that it has a [[5-limit]] part consisting of three [[ring number|ring]]s of 19edo, plus a no-threes no-fives part which is much more accurate.
+edo is an excellent tuning for the 2.5/3.7.11.13.17.19 [[just intonation subgroup]]. One way to describe 57edo is that it has a [[5-limit]] part consisting of three [[ring number|ring]]s of [[19edo]], plus a no-threes no-fives part which is much more accurate.
 Using the full prime-limit [[patent val]], the equal temperament tempers out [[81/80]], [[1029/1024]], and [[3125/3072]] in the 7-limit; and [[99/98]], [[385/384]], [[441/440]], and [[625/616]] in the [[11-limit]]. A good generator to exploit the 2.5/3.7.11.13.17.19 aspect of 57 is the approximate [[11/8]], which is 26\57. This gives the [[19-limit]] 46 &amp; 57 temperament [[heinz]]. It can also be used to tune [[mothra]] as well as [[trismegistus]].
@@ Line 9: / Line 9: @@
 === Odd harmonics ===
 {{Harmonics in equal|57}}
+{{Harmonics in equal|57|intervals=odd|columns=11|prec=2|start=12|collapsed=true|title=Approximation of odd harmonics in 57edo (continued)}}
 === Subsets and supersets ===
-edo contains [[3edo]] and [[19edo]] as subsets.
+edo contains [[3edo]] and [[19edo]] as subsets. Tripling 57edo yields [[171edo]], which corrects the 3rd and 5th harmonics.
 == Intervals ==
-{| class="wikitable center-1 right-2 center-3 center-4"
+{| class="wikitable center-1 right-2 center-4 center-5"
 |-
 ! #
 ! [[Cent]]s
-! [[Ups and downs notation|Ups and Downs Notation]]<br>(Flat Fifth 11\19)
+! Approximate ratios*
-! [[Ups and downs notation|Ups and Downs Notation]]<br>(Sharp Fifth 34\57)
+! [[Kite's ups and downs notation|Ups and downs notation]]<br>(Flat fifth 11\19)
+! [[Kite's ups and downs notation|Ups and downs notation]]<br>(Sharp fifth 34\57)
 |-
 | 0
 | 0.00
+|[[1/1]]
 | {{UDnote|step=0}}
 | {{UDnote|fifth=34|step=0}}
@@ Line 28: / Line 31: @@
 | 1
 | 21.05
+|
 | {{UDnote|step=1}}
 | {{UDnote|fifth=34|step=1}}
@@ Line 33: / Line 37: @@
 | 2
 | 42.11
+|
 | {{UDnote|step=2}}
 | {{UDnote|fifth=34|step=2}}
@@ Line 38: / Line 43: @@
 | 3
 | 63.16
+|[[29/28]]
 | {{UDnote|step=3}}
 | {{UDnote|fifth=34|step=3}}
@@ Line 43: / Line 49: @@
 | 4
 | 84.21
+|[[20/19]], [[21/20]], [[22/21]]
 | {{UDnote|step=4}}
 | {{UDnote|fifth=34|step=4}}
@@ Line 48: / Line 55: @@
 | 5
 | 105.26
+|[[17/16]], [[33/31]]
 | {{UDnote|step=5}}
 | {{UDnote|fifth=34|step=5}}
@@ Line 53: / Line 61: @@
 | 6
 | 126.32
+|[[14/13]], ''[[16/15]]''
 | {{UDnote|step=6}}
 | {{UDnote|fifth=34|step=6}}
@@ Line 58: / Line 67: @@
 | 7
 | 147.37
+|[[12/11]]
 | {{UDnote|step=7}}
 | {{UDnote|fifth=34|step=7}}
@@ Line 63: / Line 73: @@
 | 8
 | 168.42
+|[[11/10]], [[32/29]]
 | {{UDnote|step=8}}
 | {{UDnote|fifth=34|step=8}}
@@ Line 68: / Line 79: @@
 | 9
 | 189.47
+|[[19/17]], [[29/26]],<br>[[10/9]], ''[[9/8]]''
 | {{UDnote|step=9}}
 | {{UDnote|fifth=34|step=9}}
@@ Line 73: / Line 85: @@
 | 10
 | 210.53
+|[[26/23]]
 | {{UDnote|step=10}}
 | {{UDnote|fifth=34|step=10}}
@@ Line 78: / Line 91: @@
 | 11
 | 231.58
+|[[8/7]]
 | {{UDnote|step=11}}
 | {{UDnote|fifth=34|step=11}}
@@ Line 83: / Line 97: @@
 | 12
 | 252.63
+|[[22/19]]
 | {{UDnote|step=12}}
 | {{UDnote|fifth=34|step=12}}
@@ Line 88: / Line 103: @@
 | 13
 | 273.68
+|[[7/6]], [[34/29]]
 | {{UDnote|step=13}}
 | {{UDnote|fifth=34|step=13}}
@@ Line 93: / Line 109: @@
 | 14
 | 294.74
+|[[19/16]]
 | {{UDnote|step=14}}
 | {{UDnote|fifth=34|step=14}}
@@ Line 98: / Line 115: @@
 | 15
 | 315.79
+|[[6/5]]
 | {{UDnote|step=15}}
 | {{UDnote|fifth=34|step=15}}
@@ Line 103: / Line 121: @@
 | 16
 | 336.84
+|[[17/14]], [[28/23]]
 | {{UDnote|step=16}}
 | {{UDnote|fifth=34|step=16}}
@@ Line 108: / Line 127: @@
 | 17
 | 357.89
+|[[16/13]]
 | {{UDnote|step=17}}
 | {{UDnote|fifth=34|step=17}}
@@ Line 113: / Line 133: @@
 | 18
 | 378.95
+|[[5/4]]
 | {{UDnote|step=18}}
 | {{UDnote|fifth=34|step=18}}
@@ Line 118: / Line 139: @@
 | 19
 | 400.00
+|[[24/19]], [[29/23]]
 | {{UDnote|step=19}}
 | {{UDnote|fifth=34|step=19}}
@@ Line 123: / Line 145: @@
 | 20
 | 421.05
+|[[14/11]], ''[[9/7]]''
 | {{UDnote|step=20}}
 | {{UDnote|fifth=34|step=20}}
@@ Line 128: / Line 151: @@
 | 21
 | 442.11
+|[[22/17]], [[31/24]]
 | {{UDnote|step=21}}
 | {{UDnote|fifth=34|step=21}}
@@ Line 133: / Line 157: @@
 | 22
 | 463.16
+|[[17/13]], [[21/16]], [[38/29]]
 | {{UDnote|step=22}}
 | {{UDnote|fifth=34|step=22}}
@@ Line 138: / Line 163: @@
 | 23
 | 484.21
+|[[33/25]]
 | {{UDnote|step=23}}
 | {{UDnote|fifth=34|step=23}}
@@ Line 143: / Line 169: @@
 | 24
 | 505.26
+|[[4/3]]
 | {{UDnote|step=24}}
 | {{UDnote|fifth=34|step=24}}
@@ Line 148: / Line 175: @@
 | 25
 | 526.32
+|[[19/14]], [[42/31]], [[23/17]]
 | {{UDnote|step=25}}
 | {{UDnote|fifth=34|step=25}}
@@ Line 153: / Line 181: @@
 | 26
 | 547.37
+|[[11/8]], [[26/19]]
 | {{UDnote|step=26}}
 | {{UDnote|fifth=34|step=26}}
@@ Line 158: / Line 187: @@
 | 27
 | 568.42
+|[[25/18]], [[32/23]]
 | {{UDnote|step=27}}
 | {{UDnote|fifth=34|step=27}}
@@ Line 163: / Line 193: @@
 | 28
 | 589.47
+|[[31/22]]
 | {{UDnote|step=28}}
 | {{UDnote|fifth=34|step=28}}
@@ Line 168: / Line 199: @@
 | 29
 | 610.53
+|[[44/31]]
 | {{UDnote|step=29}}
 | {{UDnote|fifth=34|step=29}}
@@ Line 173: / Line 205: @@
 | 30
 | 631.58
+|[[23/16]]
 | {{UDnote|step=30}}
 | {{UDnote|fifth=34|step=30}}
@@ Line 178: / Line 211: @@
 | 31
 | 652.63
+|[[16/11]], [[19/13]]
 | {{UDnote|step=31}}
 | {{UDnote|fifth=34|step=31}}
@@ Line 183: / Line 217: @@
 | 32
 | 673.68
+|[[28/19]], [[31/21]], [[34/23]]
 | {{UDnote|step=32}}
 | {{UDnote|fifth=34|step=32}}
@@ Line 188: / Line 223: @@
 | 33
 | 694.74
+|[[3/2]]
 | {{UDnote|step=33}}
 | {{UDnote|fifth=34|step=33}}
@@ Line 193: / Line 229: @@
 | 34
 | 715.79
+|[[50/33]]
 | {{UDnote|step=34}}
 | {{UDnote|fifth=34|step=34}}
@@ Line 198: / Line 235: @@
 | 35
 | 736.84
+|[[26/17]], [[32/21]], [[29/19]]
 | {{UDnote|step=35}}
 | {{UDnote|fifth=34|step=35}}
@@ Line 203: / Line 241: @@
 | 36
 | 757.89
+|[[17/11]], [[31/20]]
 | {{UDnote|step=36}}
 | {{UDnote|fifth=34|step=36}}
@@ Line 208: / Line 247: @@
 | 37
 | 778.95
+|[[11/7]], ''[[14/9]]''
 | {{UDnote|step=37}}
 | {{UDnote|fifth=34|step=37}}
@@ Line 213: / Line 253: @@
 | 38
 | 800.00
+|[[19/12]]
 | {{UDnote|step=38}}
 | {{UDnote|fifth=34|step=38}}
@@ Line 218: / Line 259: @@
 | 39
 | 821.05
+|[[8/5]]
 | {{UDnote|step=39}}
 | {{UDnote|fifth=34|step=39}}
@@ Line 223: / Line 265: @@
 | 40
 | 842.11
+|[[13/8]]
 | {{UDnote|step=40}}
 | {{UDnote|fifth=34|step=40}}
@@ Line 228: / Line 271: @@
 | 41
 | 863.16
+|[[23/14]], [[28/17]], [[33/20]]
 | {{UDnote|step=41}}
 | {{UDnote|fifth=34|step=41}}
@@ Line 233: / Line 277: @@
 | 42
 | 884.21
+|[[5/3]]
 | {{UDnote|step=42}}
 | {{UDnote|fifth=34|step=42}}
@@ Line 238: / Line 283: @@
 | 43
 | 905.26
+|[[32/19]]
 | {{UDnote|step=43}}
 | {{UDnote|fifth=34|step=43}}
@@ Line 243: / Line 289: @@
 | 44
 | 926.32
+|[[12/7]], [[29/17]]
 | {{UDnote|step=44}}
 | {{UDnote|fifth=34|step=44}}
@@ Line 248: / Line 295: @@
 | 45
 | 947.37
+|[[19/11]]
 | {{UDnote|step=45}}
 | {{UDnote|fifth=34|step=45}}
@@ Line 253: / Line 301: @@
 | 46
 | 968.42
+|[[7/4]]
 | {{UDnote|step=46}}
 | {{UDnote|fifth=34|step=46}}
@@ Line 258: / Line 307: @@
 | 47
 | 989.47
+|[[23/13]]
 | {{UDnote|step=47}}
 | {{UDnote|fifth=34|step=47}}
@@ Line 263: / Line 313: @@
 | 48
 | 1010.53
+|[[34/19]], [[52/29]],<br>[[9/5]], ''[[16/9]]''
 | {{UDnote|step=48}}
 | {{UDnote|fifth=34|step=48}}
@@ Line 268: / Line 319: @@
 | 49
 | 1031.58
+|[[20/11]], [[29/16]]
 | {{UDnote|step=49}}
 | {{UDnote|fifth=34|step=49}}
@@ Line 273: / Line 325: @@
 | 50
 | 1052.63
+|[[11/6]]
 | {{UDnote|step=50}}
 | {{UDnote|fifth=34|step=50}}
@@ Line 278: / Line 331: @@
 | 51
 | 1073.68
+|[[13/7]], ''[[15/8]]''
 | {{UDnote|step=51}}
 | {{UDnote|fifth=34|step=51}}
@@ Line 283: / Line 337: @@
 | 52
 | 1094.74
+|[[32/17]]
 | {{UDnote|step=52}}
 | {{UDnote|fifth=34|step=52}}
@@ Line 288: / Line 343: @@
 | 53
 | 1115.79
+|[[19/10]], [[21/11]]
 | {{UDnote|step=53}}
 | {{UDnote|fifth=34|step=53}}
@@ Line 293: / Line 349: @@
 | 54
 | 1136.84
+|[[56/29]]
 | {{UDnote|step=54}}
 | {{UDnote|fifth=34|step=54}}
@@ Line 298: / Line 355: @@
 | 55
 | 1157.89
+|
 | {{UDnote|step=55}}
 | {{UDnote|fifth=34|step=55}}
@@ Line 303: / Line 361: @@
 | 56
 | 1178.95
+|
 | {{UDnote|step=56}}
 | {{UDnote|fifth=34|step=56}}
@@ Line 308: / Line 367: @@
 | 57
 | 1200.00
+|[[2/1]]
 | {{UDnote|step=57}}
 | {{UDnote|fifth=34|step=57}}
 |}
+<nowiki>*</nowiki> As a 2.3.5.7.11.13.17.19.23.29.31-subgroup temperament, in ''italics'' if inconsistent
 == Notation ==
-=== Ups and downs notation ===
+=== Stein–Zimmermann–Gould notation ===
-Spoken as up, downsharp, sharp, upsharp, etc. Note that downsharp can be respelled as dup (double-up), and upflat as dud.
+edo can be notated using [[Stein–Zimmermann–Gould notation]]:
-{{sharpness-sharp3a}}
+{{Sharpness-sharp3-szg}}
-Using [[Helmholtz–Ellis]] accidentals, 57edo can also be notated using [[Alternative symbols for ups and downs notation#Sharp-3|alternative ups and downs]]:
-{{Sharpness-sharp3}}
 Here, a sharp raises by three steps, and a flat lowers by three steps, so arrows can be used to fill in the gap. If the arrows are taken to have their own layer of enharmonic spellings, some notes may be best spelled with double arrows.
+=== Kite's ups and downs notation ===
+Spoken as up, downsharp, sharp, upsharp, etc. Note that downsharp can be respelled as dup (double-up), and upflat as dud.
+{{Ups and downs sharpness}}
 === Sagittal notation ===
-This notation uses the same sagittal sequence as EDOs [[50edo#Sagittal notation|50]], [[64edo#Sagittal notation|64]], and [[71edo#Sagittal notation|71b]], and is a superset of the notation for [[19edo#Sagittal notation|19-EDO]].
+This notation uses the same sagittal sequence as edos [[50edo #Sagittal notation|50]], [[64edo #Sagittal notation|64]], and [[71edo #Sagittal notation|71b]], and is a superset of the notation for [[19edo #Sagittal notation|19edo]].
 ==== Evo flavor ====
@@ Line 344: / Line 407: @@
 </imagemap>
-In the diagrams above, a sagittal symbol followed by an equals sign (=) means that the following comma is the symbol's [[Sagittal notation#Primary comma|primary comma]] (the comma it ''exactly'' represents in JI), while an approximately equals sign (≈) means it is a secondary comma (a comma it ''approximately'' represents in JI). In both cases the symbol exactly represents the tempered version of the comma in this EDO.
+In the diagrams above, a sagittal symbol followed by an equals sign (=) means that the following comma is the symbol's [[Sagittal notation#Primary comma|primary comma]] (the comma it ''exactly'' represents in JI), while an approximately equals sign (≈) means it is a secondary comma (a comma it ''approximately'' represents in JI). In both cases the symbol exactly represents the tempered version of the comma in this edo.
 == Scales ==
@@ Line 351: / Line 414: @@
 [[Category:Heinz]]
 [[Category:Mothra]]
-{{todo|add rank 2 temperaments table|add lumatone mapping}}
+{{todo|add rank 2 temperaments table}}
+== Instruments ==
+Since 57edo contains [[19edo]] as a non-trivial subset, it would be possible to use three 19edo instruments tuned 1\57 apart from each other to play the full gamut of 57edo.
+A [[Lumatone mapping for 57edo]] is available.
+== Music ==
+; [[Bryan Deister]]
+* [https://www.youtube.com/watch?v=4NZvSgS3ryY ''57edo improv''] (2025)
+* ''Prelude in 57edo'' (2025) (switches Lumatone mapping between sections)
+** [https://www.youtube.com/shorts/FylRB5MGBz4 ''Part 1 (short clip)'']
+** [https://www.youtube.com/shorts/yVv0s8t--pg ''Part 2 (short clip)'']
+** [https://www.youtube.com/watch?v=RH2QkHqVb2c ''Whole composition''] (but no view of Lumatone)
+* [https://www.youtube.com/shorts/MTMRlRxRbjQ ''57edo groove''] (2025)

57edo: Difference between revisions

Latest revision as of 13:49, 12 May 2026

Theory

Odd harmonics

Subsets and supersets

Intervals

Notation

Stein–Zimmermann–Gould notation

Kite's ups and downs notation

Sagittal notation

Evo flavor

Revo flavor

Scales

Instruments

Music

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