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58edo: Difference between revisions

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The '''58 equal temperament''', often abbreviated 58-tET, 58-EDO, or 58-ET, is the scale derived by dividing the [[octave]] into 58 equally-sized steps. Each step represents a frequency ratio of 20.69 cents.
{{Infobox ET}}
{{Wikipedia|58 equal temperament}}
{{ED intro}}


== Theory ==
== Theory ==
58edo is a strong system in the [[11-limit|11-]], [[13-limit|13-]] and [[17-limit]]. It is the smallest [[edo]] which is [[consistent]] through the [[17-odd-limit]], and is also the smallest distinctly consistent in the [[11-odd-limit]] (the first equal temperament to map the entire 11-odd-limit [[tonality diamond]] to distinct scale steps), and hence the first which can define a tempered version of the famous 43-note [[Harry Partch related scales|Genesis scale]] of [[Harry Partch]].


58edo tempers out 2048/2025, 126/125, 1728/1715, 144/143, 176/175, 896/891, 243/242, 5120/5103, 351/350, 364/363, 441/440, and 540/539, and is a strong system in the [[11-limit|11]]-, [[13-limit|13]]- and [[17-limit]]. It is the smallest [[edo]] which is [[consistent]] through the [[17-odd-limit]], and is also the smallest uniquely consistent in the [[11-odd-limit]] (the first equal temperament to map the entire 11-limit [[tonality diamond]] to distinct scale steps), and hence the first et which can define a version of the famous 43-note [[Harry Partch related scales|Genesis scale]] of [[Harry Partch]]. It supports [[hemififths]], [[myna]], [[diaschismic]], [[harry]], [[mystery]], [[buzzard]] and [[thuja]] [[Regular temperament|temperament]]s, and supplies the [[optimal patent val]] for 7-, 11- and 13-limit diaschismic, 11- and 13-limit hemififths, 11- and 13-limit thuja, and 13-limit myna. It also supplies the optimal patent val for the 13-limit rank-3 temperaments [[thrush]], [[bluebird]], [[aplonis]] and [[jofur]].
While the [[17/1|17th harmonic]] is a cent and a half flat, the harmonics below it are all a little sharp, giving it the sound of a sharp system. Since {{nowrap|58 {{=}} 2 × 29}}, 58edo shares the same excellent perfect fifth with [[29edo]]. It is the last edo to have exactly one [[5L 2s|diatonic]] perfect fifth and no [[5edo]] or [[7edo]] fifths.  


While the 17th harmonic is a cent and a half flat, the harmonics below it are all a little sharp, giving it the sound of a sharp system. 58 = 2 × 29, and 58 shares the same excellent fifth with [[29edo]].
The [[19/1|19th]] and [[23/1|23rd]] harmonics are very flat, so it makes sense to use their second-best approximations in the 58hi val. This val is, in fact, one of the first to be [[diamond monotone]] in the 23-odd-limit, past the idiosyncratic 53e val. However, its accuracy is questionable, with primes 19 and 23 being about 13 cents sharp, so one may want to use a larger system like [[62edo]] for the 23-limit instead, which has the added benefit of being meantone.  


{{Primes in edo|58}}
=== Prime harmonics ===
{{Harmonics in equal|58}}
 
=== As a tuning of other temperaments ===
As an equal temperament, 58et [[tempering out|tempers out]] [[2048/2025]] in the [[5-limit]]; [[126/125]], [[1728/1715]], and [[5120/5103]] in the [[7-limit]]; [[176/175]], [[243/242]], [[441/440]], [[540/539]], and [[896/891]] in the 11-limit; [[144/143]], [[351/350]], [[364/363]] in the 13-limit. It [[support]]s [[hemififths]], [[myna]], [[diaschismic]], [[harry]], [[mystery]], [[buzzard]], [[thuja]] [[regular temperament|temperament]]s plus a number of [[gravity family]] [[extension]]s, and supplies the [[optimal patent val]] for the 7-, 11- and 13-limit diaschismic, 11- and 13-limit hemififths, 11- and 13-limit thuja, and 13-limit myna. It also supplies the optimal patent val for the 13-limit rank-3 temperaments [[thrush]], [[bluebird]], [[aplonis]] and [[jofur]].
 
Of all edos which map the syntonic comma ([[81/80]]) to 1 step by patent val, 58edo is the one with the step size closest to 81/80, with one step of 58edo being less than 1{{cent}} narrower than the just interval.
 
=== Subsets and supersets ===
58edo contains [[2edo]] and [[29edo]] as subsets.


== Intervals ==
== Intervals ==
{| class="wikitable center-all right-2 left-3"
{| class="wikitable center-all right-2 left-3 left-4""
|-
|-
! #
! #
! Cents
! Cents
! Approximate Ratios
! Approximate ratios*
! [[Ups and downs notation]]
|-
|-
| 0
| 0
| 0.00
| 0.0
| [[1/1]]
| [[1/1]]
| {{UDnote|step=0}}
|-
|-
| 1
| 1
| 20.69
| 20.7
| [[56/55]], [[64/63]], [[81/80]], [[128/125]]
| [[56/55]], [[64/63]], [[81/80]], [[91/90]], [[105/104]]
| {{UDnote|step=1}}
|-
|-
| 2
| 2
| 41.38
| 41.4
| [[36/35]], [[49/48]], [[50/49]], [[55/54]]
| [[36/35]], [[40/39]], [[45/44]], [[49/48]], [[50/49]], [[55/54]]
| {{UDnote|step=2}}
|-
|-
| 3
| 3
| 62.07
| 62.1
| [[26/25]], [[27/26]], [[28/27]], [[33/32]]
| [[26/25]], [[27/26]], [[28/27]], [[33/32]]
| {{UDnote|step=3}}
|-
|-
| 4
| 4
| 82.76
| 82.8
| [[25/24]], [[21/20]], [[22/21]]
| [[21/20]], [[22/21]], ''[[25/24]]''
| {{UDnote|step=4}}
|-
|-
| 5
| 5
| 103.45
| 103.4
| [[16/15]], [[17/16]], [[18/17]]
| [[16/15]], [[17/16]], [[18/17]]
| {{UDnote|step=5}}
|-
|-
| 6
| 6
| 124.14
| 124.1
| [[14/13]], [[15/14]], [[27/25]]
| [[14/13]], [[15/14]]
| {{UDnote|step=6}}
|-
|-
| 7
| 7
| 144.83
| 144.8
| [[12/11]], [[13/12]]
| [[12/11]], [[13/12]]
| {{UDnote|step=7}}
|-
|-
| 8
| 8
| 165.52
| 165.5
| [[11/10]]
| [[11/10]]
| {{UDnote|step=8}}
|-
|-
| 9
| 9
| 186.21
| 186.2
| [[10/9]]
| [[10/9]]
| {{UDnote|step=9}}
|-
|-
| 10
| 10
| 206.90
| 206.9
| [[9/8]], [[17/15]]
| [[9/8]], [[17/15]]
| {{UDnote|step=10}}
|-
|-
| 11
| 11
| 227.59
| 227.6
| [[8/7]]
| [[8/7]]
| {{UDnote|step=11}}
|-
|-
| 12
| 12
| 248.28
| 248.3
| [[15/13]]
| [[15/13]]
| {{UDnote|step=12}}
|-
|-
| 13
| 13
| 268.97
| 269.0
| [[7/6]]
| [[7/6]]
| {{UDnote|step=13}}
|-
|-
| 14
| 14
| 289.66
| 289.7
| [[13/11]], [[20/17]]
| [[13/11]], [[20/17]]
| {{UDnote|step=14}}
|-
|-
| 15
| 15
| 310.34
| 310.3
| [[6/5]]
| [[6/5]]
| {{UDnote|step=15}}
|-
|-
| 16
| 16
| 331.03
| 331.0
| [[17/14]]
| [[17/14]], [[40/33]]
| {{UDnote|step=16}}
|-
|-
| 17
| 17
| 351.72
| 351.7
| [[11/9]], [[16/13]]
| [[11/9]], [[16/13]]
| {{UDnote|step=17}}
|-
|-
| 18
| 18
| 372.41
| 372.4
| [[21/17]]
| [[21/17]], [[26/21]]
| {{UDnote|step=18}}
|-
|-
| 19
| 19
| 393.10
| 393.1
| [[5/4]]
| [[5/4]]
| {{UDnote|step=19}}
|-
|-
| 20
| 20
| 413.79
| 413.8
| [[14/11]]
| [[14/11]]
| {{UDnote|step=20}}
|-
|-
| 21
| 21
| 434.48
| 434.5
| [[9/7]]
| [[9/7]]
| {{UDnote|step=21}}
|-
|-
| 22
| 22
| 455.17
| 455.2
| [[13/10]], [[17/13]], [[22/17]]
| [[13/10]], [[17/13]], [[22/17]]
| {{UDnote|step=22}}
|-
|-
| 23
| 23
| 475.86
| 475.9
| [[21/16]]
| [[21/16]]
| {{UDnote|step=23}}
|-
|-
| 24
| 24
| 496.55
| 496.6
| [[4/3]]
| [[4/3]]
| {{UDnote|step=24}}
|-
|-
| 25
| 25
| 517.24
| 517.2
| [[27/20]]
| [[27/20]]
| {{UDnote|step=25}}
|-
|-
| 26
| 26
| 537.93
| 537.9
| [[15/11]]
| [[15/11]]
| {{UDnote|step=26}}
|-
|-
| 27
| 27
| 558.62
| 558.6
| [[11/8]], [[18/13]]
| [[11/8]], [[18/13]]
| {{UDnote|step=27}}
|-
|-
| 28
| 28
| 579.31
| 579.3
| [[7/5]]
| [[7/5]]
| {{UDnote|step=28}}
|-
|-
| 29
| 29
| 600.00
| 600.0
| [[17/12]], [[24/17]]
| [[17/12]], [[24/17]]
| {{UDnote|step=29}}
|-
|-
| 30
| 30
| 620.69
| 620.7
| [[10/7]]
| [[10/7]]
| {{UDnote|step=30}}
|-
|-
| 31
| 31
| 641.38
| 641.4
| [[13/9]], [[16/11]]
| [[13/9]], [[16/11]]
| {{UDnote|step=31}}
|-
|-
| 32
| 32
| 662.07
| 662.1
| [[22/15]]
| [[22/15]]
| {{UDnote|step=32}}
|-
|-
| 33
| 33
| 682.76
| 682.8
| [[40/27]]
| [[40/27]]
| {{UDnote|step=33}}
|-
|-
| 34
| 34
| 703.45
| 703.4
| [[3/2]]
| [[3/2]]
| {{UDnote|step=34}}
|-
|-
| 35
| 35
| 724.14
| 724.1
| [[32/21]]
| [[32/21]]
| {{UDnote|step=35}}
|-
|-
| 36
| 36
| 744.83
| 744.8
| [[20/13]], [[26/17]], [[17/11]]
| [[17/11]], [[20/13]], [[26/17]]
| {{UDnote|step=36}}
|-
|-
| 37
| 37
| 765.52
| 765.5
| [[14/9]]
| [[14/9]]
| {{UDnote|step=37}}
|-
|-
| 38
| 38
| 786.21
| 786.2
| [[11/7]]
| [[11/7]]
| {{UDnote|step=38}}
|-
|-
| 39
| 39
| 806.90
| 806.9
| [[8/5]]
| [[8/5]]
| {{UDnote|step=39}}
|-
|-
| 40
| 40
| 827.59
| 827.6
| [[34/21]]
| [[21/13]], [[34/21]]
| {{UDnote|step=40}}
|-
|-
| 41
| 41
| 848.28
| 848.3
| [[13/8]], [[18/11]]
| [[13/8]], [[18/11]]
| {{UDnote|step=41}}
|-
|-
| 42
| 42
| 868.97
| 869.0
| [[28/17]]
| [[28/17]], [[33/20]]
| {{UDnote|step=42}}
|-
|-
| 43
| 43
| 889.66
| 889.7
| [[5/3]]
| [[5/3]]
| {{UDnote|step=43}}
|-
|-
| 44
| 44
| 910.34
| 910.3
| [[22/13]], [[17/10]]
| [[17/10]], [[22/13]]
| {{UDnote|step=44}}
|-
|-
| 45
| 45
| 931.03
| 931.0
| [[12/7]]
| [[12/7]]
| {{UDnote|step=45}}
|-
|-
| 46
| 46
| 951.72
| 951.7
| [[26/15]]
| [[26/15]]
| {{UDnote|step=46}}
|-
|-
| 47
| 47
| 972.41
| 972.4
| [[7/4]]
| [[7/4]]
| {{UDnote|step=47}}
|-
|-
| 48
| 48
| 993.10
| 993.1
| [[16/9]], [[30/17]]
| [[16/9]], [[30/17]]
| {{UDnote|step=48}}
|-
|-
| 49
| 49
| 1013.79
| 1013.8
| [[9/5]]
| [[9/5]]
| {{UDnote|step=49}}
|-
|-
| 50
| 50
| 1034.48
| 1034.5
| [[20/11]]
| [[20/11]]
| {{UDnote|step=50}}
|-
|-
| 51
| 51
| 1055.17
| 1055.2
| [[11/6]], [[24/13]]
| [[11/6]], [[24/13]]
| {{UDnote|step=51}}
|-
|-
| 52
| 52
| 1075.86
| 1075.9
| [[13/7]], [[28/15]]
| [[13/7]], [[28/15]]
| {{UDnote|step=52}}
|-
|-
| 53
| 53
| 1096.55
| 1096.6
| [[15/8]], [[32/17]], [[17/9]]
| [[15/8]], [[17/9]], [[32/17]]
| {{UDnote|step=53}}
|-
|-
| 54
| 54
| 1117.24
| 1117.2
| [[48/25]], [[40/21]], [[21/11]]
| [[21/11]], [[40/21]], ''[[48/25]]''
| {{UDnote|step=54}}
|-
|-
| 55
| 55
| 1137.93
| 1137.9
| [[25/13]], [[52/27]], [[27/14]], [[64/33]]
| [[25/13]], [[27/14]], [[52/27]], [[64/33]]
| {{UDnote|step=55}}
|-
|-
| 56
| 56
| 1158.62
| 1158.6
| [[35/18]], [[96/49]], [[49/25]], [[108/55]]
| [[35/18]], [[39/20]], [[49/25]], [[88/45]], [[96/49]], [[108/55]]
| {{UDnote|step=56}}
|-
|-
| 57
| 57
| 1179.31
| 1179.3
| [[55/28]], [[63/32]], [[160/81]], [[125/64]]
| [[55/28]], [[63/32]], [[160/81]], [[180/91]], [[208/105]]
| {{UDnote|step=57}}
|-
|-
| 58
| 58
| 1200.00
| 1200.0
| [[2/1]]
| [[2/1]]
| {{UDnote|step=58}}
|}
|}
<nowiki/>* As a 17-limit temperament, inconsistently mapped intervals in ''italic''
== Notation ==
=== Stein–Zimmermann–Gould notation ===
[[Stein–Zimmermann–Gould notation]] for 58edo uses sharps and flats combined with quartertone accidentals and arrows:
{{Sharpness-sharp6-szg}}
If double arrows are not desirable, then arrows can be attached to quartertone accidentals:
{{Sharpness-sharp6-qt-szg}}
=== Kite's ups and downs notation ===
58edo can also be notated with [[Kite's ups and downs notation|Kite's ups and downs]], spoken as up, dup, trup, dudsharp, downsharp, sharp, upsharp etc. and down, dud, trud, dupflat etc.
{{Ups and downs sharpness}}
Half-sharps and half-flats can be used to avoid triple arrows:
{{Ups and downs sharpness|58|true}}
=== Ivan Wyschnegradsky's notation ===
Since a sharp raises by six steps, Wyschnegradsky accidentals borrowed from [[72edo]] can also be used:
{{Sharpness-sharp6-iw}}
=== Sagittal notation ===
==== Evo flavor ====
{{Sagittal chart|Evo}}
==== Evo-SZ flavor ====
{{Sagittal chart|Evo-SZ}}
==== Revo flavor ====
{{Sagittal chart}}
=== Hemipyth notation ===
{| class="wikitable center-all right-2 center-3 mw-collapsible mw-collapsed"
|+ style="font-size: 105%; white-space: nowrap;" | Hemipyth notation for 58edo (SW3-style)
|-
! #
! Cents
! Note names<br>on D
|-
| 0
| 0.0
| D
|-
| 2
| 41.4
| α𝄳
|-
| 5
| 103.4
| α
|-
| 7
| 144.8
| E𝄳
|-
| 10
| 206.9
| E
|-
| 12
| 248.3
| β𝄳
|-
| 14
| 289.7
| F
|-
| 15
| 310.3
| β
|-
| 17
| 351.7
| F‡
|-
| 19
| 393.1
| γ
|-
| 22
| 455.2
| γ‡
|-
| 24
| 496.6
| G
|-
| 27
| 558.6
| G‡
|-
| 29
| 600.0
| δ
|-
| 31
| 641.4
| A𝄳
|-
| 34
| 703.4
| A
|-
| 36
| 744.8
| ε𝄳
|-
| 39
| 806.9
| ε
|-
| 41
| 848.3
| B𝄳
|-
| 43
| 889.7
| ζ
|-
| 44
| 910.3
| B
|-
| 46
| 951.7
| ζ‡
|-
| 48
| 993.1
| C
|-
| 51
| 1055.2
| C‡
|-
| 53
| 1096.6
| η
|-
| 56
| 1158.6
| η‡
|-
| 58
| 1200.0
| D
|}
== Approximation to JI ==
=== Interval mappings ===
{{15-odd-limit|58}}


== Regular temperament properties ==
== Regular temperament properties ==
{| class="wikitable center-4 center-5 center-6"
{| class="wikitable center-4 center-5 center-6"
! rowspan="2" | Subgroup
|-
! rowspan="2" | [[Subgroup]]
! rowspan="2" | [[Comma list]]
! rowspan="2" | [[Comma list]]
! rowspan="2" | [[Mapping]]
! rowspan="2" | [[Mapping]]
Line 265: Line 489:
|-
|-
| 2.3.5
| 2.3.5
| 2048/2025, 1594323/1562500
| 2048/2025, [[1594323/1562500]]
| [{{val| 58 92 135 }}]
| {{Mapping| 58 92 135 }}
| -1.29
| −1.29
| 1.22
| 1.22
| 5.89
| 5.89
Line 273: Line 497:
| 2.3.5.7
| 2.3.5.7
| 126/125, 1728/1715, 2048/2025
| 126/125, 1728/1715, 2048/2025
| [{{val| 58 92 135 163 }}]
| {{Mapping| 58 92 135 163 }}
| -1.29
| −1.29
| 1.05
| 1.05
| 5.10
| 5.10
Line 280: Line 504:
| 2.3.5.7.11
| 2.3.5.7.11
| 126/125, 176/175, 243/242, 896/891
| 126/125, 176/175, 243/242, 896/891
| [{{val| 58 92 135 163 201 }}]
| {{Mapping| 58 92 135 163 201 }}
| -1.45
| −1.45
| 1.00
| 1.00
| 4.83
| 4.83
Line 287: Line 511:
| 2.3.5.7.11.13
| 2.3.5.7.11.13
| 126/125, 144/143, 176/175, 196/195, 364/363
| 126/125, 144/143, 176/175, 196/195, 364/363
| [{{val| 58 92 135 163 201 215 }}]
| {{Mapping| 58 92 135 163 201 215 }}
| -1.56
| −1.56
| 0.94
| 0.94
| 4.56
| 4.56
Line 294: Line 518:
| 2.3.5.7.11.13.17
| 2.3.5.7.11.13.17
| 126/125, 136/135, 144/143, 176/175, 196/195, 364/363
| 126/125, 136/135, 144/143, 176/175, 196/195, 364/363
| [{{val| 58 92 135 163 201 215 237 }}]
| {{Mapping| 58 92 135 163 201 215 237 }}
| -1.28
| −1.28
| 1.10
| 1.10
| 5.33
| 5.33
|}
|}
 
* 58et has a lower relative error than any previous equal temperaments in the 13-limit, and the next equal temperament that does better in this subgroup is [[72edo|72]].  
58et is lower in relative error than any previous equal temperaments in the 13-limit, and the next ET that does better in this subgroup is 72.  


=== Rank-2 temperaments ===
=== Rank-2 temperaments ===
 
{| class="wikitable center-all left-5"
{| class="wikitable center-1 center-2"
|+ style="font-size: 105%;" | Table of rank-2 temperaments by generator
|-
|-
! Period
! Periods<br>per 8ve
! Generator
! Generator*
! Name
! Cents*
! Associated<br>ratio*
! Temperament
|-
|-
| 1\1
| 1
| 1\58
|
|-
|
| 3\58
| 3\58
|  
| 62.1
| 28/27
| [[Unicorn]] / alicorn / qilin
|-
|-
|  
| 1
| 5\58
|
|-
|
| 7\58
|
|-
|
| 9\58
|
|-
|
| 11\58
| 11\58
| Gorgik
| 227.6
| 8/7
| [[Gorgik]]
|-
|-
|  
| 1
| 13\58
| 13\58
|  
| 269.0
| 7/6
| [[Infraorwell]]
|-
|-
|  
| 1
| 15\58
| 15\58
| Myna
| 310.3
| 6/5
| [[Myna]]
|-
|-
|  
| 1
| 17\58
| 17\58
| Hemififths
| 351.7
| 49/40
| [[Hemififths]]
|-
|-
|  
| 1
| 19\58
| 19\58
|  
| 393.1
| 64/51
| [[Emmthird]]
|-
|-
|  
| 1
| 21\58
|
|-
|
| 23\58
| 23\58
| Buzzard
| 475.9
| 21/16
| [[Buzzard]] / [[subfourth]]
|-
|-
|  
| 1
| 25\58
| 25\58
|  
| 517.2
| 27/20
| [[Gravity]] / [[abergravity]] / [[gravid]]
|-
|-
|  
| 1
| 27\58
| 27\58
| Thuja
| 558.6
| 11/8
| [[Thuja]]
|-
|-
| 1\2
| 2
| 1\58
|
|-
|
| 2\58
|
|-
|
| 3\58
| 3\58
|  
| 62.1
| 28/27
| [[Monocerus]]
|-
|-
|  
| 2
| 4\58
| 1\58
| Harry
| 20.7
| 81/80
| [[Bicommatic]]
|-
|-
|  
| 2
| 5\58
| Srutal/Diaschismic
|-
|
| 6\58
|
|-
|
| 7\58
|
|-
|
| 8\58
| Echidna, Supers
|-
|
| 9\58
| 9\58
| Secant
| 186.2
| 10/9
| [[Secant]]
|-
|-
|  
| 2
| 10\58
| 17\58<br>(12\58)
|  
| 351.7<br>(248.3)
| 11/9<br>(15/13)
| [[Sruti]]
|-
|-
|  
| 2
| 11\58
| 21\58<br>(8\58)
|  
| 434.5<br>(165.5)
| 9/7<br>(11/10)
| [[Echidna]]
|-
|-
|  
| 2
| 12\58
| 24\58<br>(5\58)
| Sruti
| 496.6<br>(103.4)
| 4/3<br>(17/16)
| [[Diaschismic]]
|-
|-
|  
| 2
| 13\58
| 25\58<br>(4\58)
|  
| 517.2<br>(82.8)
| 27/20<br>(21/20)
| [[Harry]]
|-
|-
|  
| 29
| 14\58
| 19\58<br>(1\58)
|  
| 393.1<br>(20.7)
|-
| 5/4<br>(91/90)
| 1\29
| [[Mystery]]
| 1\58
| Mystery
|}
|}
<nowiki/>* [[Normal forms #Equave-reduced-generator form|Octave-reduced form]], reduced to the first half-octave, and [[normal forms #Minimal-generator form|minimal form]] in parentheses if distinct
58et can also be detempered to [[semihemi]] ({{nowrap| 58 & 140 }}), [[supers]] ({{nowrap| 58 & 152 }}), [[condor]] ({{nowrap| 58 & 159 }}), and [[eagle]] ({{nowrap| 58 & 212 }}).
== Octave stretch or compression ==
58edo's approximations of harmonics 3, 5, 7, 11, and 13 can all be improved if slightly [[stretched and compressed tuning|compressing the octave]] is acceptable, using tunings such as [[92edt]], [[150ed6]] or [[zpi|289zpi]].


== Scales ==
== Scales ==
* [[Compdye]]
* [[Maeve Gutierrez#Gutierrez-Lambeth quasi-subharmonic pentatonic|Gutierrez-Lambeth quasi-subharmonic pentatonic]]
* [[Hemif7]]
* [[Hemif10]]
* [[Hemif17]]
== Instruments ==
* [[Lumatone mapping for 58edo]]
* [[Skip fretting system 58 2 15|15\58 × 2\58 isomorphic instrument layout]]
* [[Skip fretting system 58 4 15|15\58 × 4\58 isomorphic instrument layout]]
* [[Skip fretting system 58 2 17|17\58 × 2\58 isomorphic instrument layout]]
== Music ==
; [[Jeff Brown]]
* [https://www.youtube.com/watch?v=0373hBH87LY ''Fruitbats in Formation''] (2023)
; [[Bryan Deister]]
* [https://www.youtube.com/shorts/4J4MNno-4PA ''58edo improv''] (2025)
* [https://www.youtube.com/shorts/7gkRyld5OU8 ''Waltz in 58edo''] (2025)
* [https://www.youtube.com/shorts/H5XG4lrvrP8 ''58edo groove''] (2025)
; [[Francium]]
* [https://www.youtube.com/watch?v=XXMjoUxVfLs ''We Wish You A Larry Christmas''] (2024) – in larry, 58edo tuning
; [[Cam Taylor]]
* [https://www.youtube.com/watch?v=Keclakcqie8 ''58EDO, Mystery temperament and 2 rings of Pythagorean on the Lumatone''] (2021)


* [[hemif7]]
; [[Xotla]]
* [[hemif10]]
* [https://www.youtube.com/watch?v=yTkPhjTEQMw "Wormhole Shmurmhole"], from [https://www.youtube.com/playlist?list=PL4HmfPDldHXueRjmTV-iJN3fsLn_O9jvT ''Just Another Microtonal Music Album''] (2025–2026) – in part, the rest being in 31edo
* [[hemif17]]


[[Category:58edo| ]] <!-- main article -->
[[Category:Buzzard]]
[[Category:buzzard]]
[[Category:Diaschismic]]
[[Category:diaschismic]]
[[Category:Harry]]
[[Category:Equal divisions of the octave]]
[[Category:Hemififths]]
[[Category:genesis]]
[[Category:Myna]]
[[Category:harry]]
[[Category:Mystery]]
[[Category:hemififths]]
[[Category:Harry Partch]]
[[Category:myna]]
[[Category:Listen]]
[[Category:mystery]]
[[Category:partch]]
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