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21st century: Stephen Weigel's ''Ĥ̶̩̠̐Ä̶̝͙́̓Ȑ̸̢͒K̷̥̩͌͑!̵̙͆̄ THE BIBLICALLY ACCURATE ANGELS SING!'' (2025): Add live performance in Munich, Germany (2026)
 
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=== Odd harmonics ===
=== Odd harmonics ===
While not an accurate tuning on the full [[7-limit]], 42edo does an excellent job on the 2.9.15.7.33.39 [[k*N subgroups|2*42 subgroup]], having the same tuning on it as does [[84edo]]. On this subgroup 42 has the same [[comma]]s as 84.
While not an accurate tuning on the full [[7-limit]], 42edo does an excellent job on the 2.9.15.7.33.39 [[k*N subgroups|2*42 subgroup]], having the same tuning on it as does [[84edo]]. On this subgroup 42 has the same [[comma]]s as 84.
{{Harmonics in equal|42}}
{{Harmonics in equal|42}}
== JI approximation ==
{{Q-odd-limit intervals}}
=== Zeta peak index ===
{{ZPI
| zpi = 190
| steps = 41.9988672418690
| step size = 28.5721991759747
| tempered height = 2.689436
| pure height = 2.688894
| integral = 0.303886
| gap = 9.541545
| octave = 1200.03236539094
| consistent = 8
| distinct = 8
}}
== Regular temperament properties ==
{| class="wikitable center-4 center-5 center-6"
|-
! rowspan="2" | [[Subgroup]]
! rowspan="2" | [[Comma list]]
! rowspan="2" | [[Mapping]]
! rowspan="2" | Optimal<br>8ve stretch (¢)
! colspan="2" | Tuning error
|-
! [[TE error|Absolute]] (¢)
! [[TE simple badness|Relative]] (%)
|-
| 2.3
| {{monzo| 67 -42 }}
| {{mapping| 42 67 }}
| −3.89
| 3.88
| 13.57
|-
| 2.3.5
| 128/125, 5000000/4782969
| {{mapping| 42 67 98 }}
| −4.55
| 3.30
| 11.55
|-
| 2.3.5.7
| 64/63, 126/125, 6860/6561
| {{mapping| 22 35 51 62 }}
| −3.65
| 3.26
| 11.42
|}
=== Octave stretch ===
42edo’s inaccurate 3rd and 5th harmonics can be greatly improved through [[stretched and compressed tuning|stretching or compressing]] octaves. Both approaches work about equally well but in opposite directions, giving two quite different flavors of tuning to play with.
The following table compares three stretched tunings of 42edo:
{| class="wikitable"
|-
! Tuning
! [[42ed257/128]]
! [[1ed28.7c|APS720jot]]
! [[zpi|189zpi]]
! [[42edo]]
|-
! Steps / octave
| ~41.77
| ~41.81
| ~41.83
| 42.00
|-
! Approximation<br>of harmonics
| great: 5<br>good: 2, 3, 7 <br>okay: <br>bad: 11, 13
| great: 5<br>good: 2, 3 <br>okay: 7, 11, 13 <br>bad:
| great: 5<br>good: 2, 13 <br>okay: 3, 11 <br>bad: 7
| great: 2, 7<br>good: <br>okay: 11 <br>bad: 3, 5, 13
|-
| colspan="5" | <span style="font-size: 0.75em;"><div style="text-align: center;">''“great” = 0-13% relative error • “good” = 13-27% • “okay” = 27-40% • “bad” = 40-50%''</div></span>
|}
The following table compares three compressed tunings of 42edo:
{| class="wikitable"
|-
! Tuning
! [[42edo]]
! [[1ed28.5c|APS715jot]]
! [[191zpi]]
! [[ed255/128#42ed255/128|42ed255/128]]
|-
! Steps / octave
| 42.00
| ~42.10
| ~42.19
| ~42.24
|-
! Approximation <br>of harmonics
| great: 2, 7 <br>good: <br>okay: 11 <br>bad: 3, 5, 13
| great: 2 <br>good: 5, 7, 13 <br>okay: 3, 11 <br>bad:
| great: 5, 11, 13 <br>good: 2, 3 <br>okay: <br>bad: 7
| great: 3, 5, 11 <br>good: 2 <br>okay: 13 <br>bad: 7
|-
| colspan="5" | <span style="font-size: 0.75em;"><div style="text-align: center;">''“great” = 0-13% relative error • “good” = 13-27% • “okay” = 27-40% • “bad” = 40-50%''</div></span>
|}
For a more detailed comparison see [[Table of stretched 42edo tunings]].


=== Subsets and supersets ===
=== Subsets and supersets ===
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! #
! #
! Cents
! Cents
! colspan="3" |[[Ups and Downs Notation]]
! colspan="3" | [[Ups and downs notation]]
|-
|-
| 0
| 0
| 0.000
| 0.0
| P1
| P1
| perfect unison
| perfect unison
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|-
|-
| 1
| 1
| 28.571
| 28.6
| ^1, m2
| ^1, m2
| up unison, minor 2nd
| up unison, minor 2nd
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|-
|-
| 2
| 2
| 57.143
| 57.1
| ^^1, ^m2
| ^^1, ^m2
| dup 1sn, upminor 2nd
| dup 1sn, upminor 2nd
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|-
|-
| 3
| 3
| 85.714
| 85.7
| ^^m2
| ^^m2
| dupminor 2nd
| dupminor 2nd
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|-
|-
| 4
| 4
| 114.286
| 114.3
| ^<sup>3</sup>m
| ^<sup>3</sup>m
| trupminor 2nd
| trupminor 2nd
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|-
|-
| 5
| 5
| 143.857
| 143.9
| v<sup>3</sup>M
| v<sup>3</sup>M
| trudmajor 2nd
| trudmajor 2nd
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|-
|-
| 6
| 6
| 171.429
| 171.4
| vvM2
| vvM2
| dudmajor 2nd
| dudmajor 2nd
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|-
|-
| 7
| 7
| 200.000
| 200.0
| vM2
| vM2
| downmajor 2nd
| downmajor 2nd
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|-
|-
| 8
| 8
| 228.571
| 228.6
| M2
| M2
| major 2nd
| major 2nd
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|-
|-
| 9
| 9
| 257.143
| 257.1
| m3
| m3
| minor 3rd
| minor 3rd
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|-
|-
| 10
| 10
| 285.714
| 285.7
| ^m3
| ^m3
| upminor 3rd
| upminor 3rd
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|-
|-
| 11
| 11
| 314.286
| 314.3
| ^^m3
| ^^m3
| dupminor 3rd
| dupminor 3rd
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|-
|-
| 12
| 12
| 342.857
| 342.9
| ^<sup>3</sup>m3
| ^<sup>3</sup>m3
| trupminor 3rd
| trupminor 3rd
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|-
|-
| 13
| 13
| 371.429
| 371.4
| v<sup>3</sup>M3
| v<sup>3</sup>M3
| trudmajor 3rd
| trudmajor 3rd
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|-
|-
| 14
| 14
| 400.000
| 400.0
| vvM3
| vvM3
| dudmajor 3rd
| dudmajor 3rd
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|-
|-
| 15
| 15
| 428.571
| 428.6
| vM3
| vM3
| downmajor 3rd
| downmajor 3rd
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|-
|-
| 16
| 16
| 457.143
| 457.1
| M3, v4
| M3, v4
| major 3rd, down 4th
| major 3rd, down 4th
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|-
|-
| 17
| 17
| 485.714
| 485.7
| P4
| P4
| perfect 4th
| perfect 4th
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|-
|-
| 18
| 18
| 514.286
| 514.3
| ^4
| ^4
| up 4th
| up 4th
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|-
|-
| 19
| 19
| 543.857
| 543.9
| ^^4
| ^^4
| dup 4th
| dup 4th
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|-
|-
| 20
| 20
| 571.429
| 571.4
| ^<sup>3</sup>4, ^^d5
| ^<sup>3</sup>4, ^^d5
| trup 4th, dupdim 5th
| trup 4th, dupdim 5th
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|-
|-
| 21
| 21
| 600.000
| 600.0
| v<sup>3</sup>A4, ^<sup>3</sup>d5
| v<sup>3</sup>A4, ^<sup>3</sup>d5
| trudaug 4th, trupdim 5th
| trudaug 4th, trupdim 5th
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|-
|-
| 22
| 22
| 628.571
| 628.6
| vvA4, v<sup>3</sup>5
| vvA4, v<sup>3</sup>5
| dudaug 4th, trud 5th
| dudaug 4th, trud 5th
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|-
|-
| 23
| 23
| 657.143
| 657.1
| vv5
| vv5
| dud 5th
| dud 5th
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|-
|-
| 24
| 24
| 685.714
| 685.7
| v5
| v5
| down 5th
| down 5th
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|-
|-
| 25
| 25
| 714.286
| 714.3
| P5
| P5
| perfect 5th
| perfect 5th
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|-
|-
| 26
| 26
| 742.857
| 742.9
| ^5, m6
| ^5, m6
| up 5th, minor 6th
| up 5th, minor 6th
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|-
|-
| 27
| 27
| 771.429
| 771.4
| ^m6
| ^m6
| upminor 6th
| upminor 6th
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|-
|-
| 28
| 28
| 800.000
| 800.0
| ^^m6
| ^^m6
| dupminor 6th
| dupminor 6th
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|-
|-
| 29
| 29
| 828.571
| 828.6
| ^<sup>3</sup>m6
| ^<sup>3</sup>m6
| trupminor 6th
| trupminor 6th
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|-
|-
| 30
| 30
| 857.143
| 857.1
| v<sup>3</sup>M6
| v<sup>3</sup>M6
| trudmajor 6th
| trudmajor 6th
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|-
|-
| 31
| 31
| 885.714
| 885.7
| vvM6
| vvM6
| dudmajor 6th
| dudmajor 6th
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|-
|-
| 32
| 32
| 914.286
| 914.3
| vM6
| vM6
| downmajor 6th
| downmajor 6th
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|-
|-
| 33
| 33
| 942.857
| 942.9
| M6
| M6
| major 6th
| major 6th
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|-
|-
| 34
| 34
| 971.429
| 971.4
| m7
| m7
| minor 7th
| minor 7th
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|-
|-
| 35
| 35
| 1000.000
| 1000.0
| ^m7
| ^m7
| upminor 7th
| upminor 7th
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|-
|-
| 36
| 36
| 1028.571
| 1028.6
| ^^m7
| ^^m7
| dupminor 7th
| dupminor 7th
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|-
|-
| 37
| 37
| 1057.143
| 1057.1
| ^<sup>3</sup>m7
| ^<sup>3</sup>m7
| trupminor 7th
| trupminor 7th
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|-
|-
| 38
| 38
| 1085.714
| 1085.7
| v<sup>3</sup>M7
| v<sup>3</sup>M7
| trudmajor 7th
| trudmajor 7th
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|-
|-
| 39
| 39
| 1114.286
| 1114.3
| vvM7
| vvM7
| dudmajor 7th
| dudmajor 7th
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|-
|-
| 40
| 40
| 1142.857
| 1142.9
| vM7
| vM7
| downmajor 7th
| downmajor 7th
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|-
|-
| 41
| 41
| 1171.429
| 1171.4
| M7, v8
| M7, v8
| major 7th, down 8ve
| major 7th, down 8ve
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|-
|-
| 42
| 42
| 1200.000
| 1200.0
| P8
| P8
| perfect 8ve
| perfect 8ve
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|}
|}


Chords can be named using ups and downs as C upminor, D downmajor seven, etc. See [[Ups and Downs Notation #Chords and Chord Progressions]].
Chords can be named using ups and downs as C upminor, D downmajor seven, etc. See [[Ups and downs notation #Chords and chord progressions]].


== Notation ==
== Notation ==
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Assuming the natural notes form a [[chain of fifths]], the major 2nd is 8 edosteps and the minor 2nd is only one. The naturals create a [[5edo]]-like scale, with two of the notes inflected by a [[comma]]-sized edostep:
Assuming the natural notes form a [[chain of fifths]], the major 2nd is 8 edosteps and the minor 2nd is only one. The naturals create a [[5edo]]-like scale, with two of the notes inflected by a [[comma]]-sized edostep:


D * * * * * * * * E F * * * * * * * * G * * * * * * * * A * * * * * * * * B C * * * * * * * * D
D * * * * * * * E F * * * * * * * G * * * * * * * A * * * * * * * B C * * * * * * * D
 
D♯ is next to E. The notation requires ups and downs with three arrows, and if chords are to be spelled correctly four or more arrows may be required in certain cases. For example, a {{dash|1/1, 5/4, 3/2, 9/5|med}} chord with a root on the edostep midway between G and A would be written either as {{dash|v<sup>3</sup>G♯–v<sup>5</sup>B♯, v<sup>3</sup>D♯, vF♯|med}} or as {{dash|^<sup>3</sup>A♭, ^C, ^<sup>3</sup>E♭, ^<sup>5</sup>G♭}}. This is a dud dup-seven chord, written either as v<sup>3</sup>G♯vv,^^7 or as ^<sup>3</sup>A♭vv,^^7.


D♯ is next to E. The notation requires ups and downs with three arrows, and if chords are to be spelled correctly four or more arrows may be required in certain cases. For example, a {{dash|1/1, 5/4, 3/2, 9/5|med}} chord with a root on the key or fret midway between G and A would be written either as {{dash|v<sup>3</sup>G♯–v<sup>5</sup>B♯, v<sup>3</sup>D♯, vF♯|med}} or as {{dash|^<sup>3</sup>A♭, ^C, ^<sup>3</sup>E♭, ^<sup>5</sup>G♭}}. This is a dud dup-seven chord, written either as v<sup>3</sup>G♯vv,^^7 or as ^<sup>3</sup>A♭vv,^^7.
In this table, dup is equivalent to quidsharp, trup is equivalent to quudsharp, trudsharp is equivalent to quup, dudsharp is equivalent to quip, etc.
{{Ups and downs sharpness}}


Alternatively, sharps and flats with arrows borrowed from [[Helmholtz–Ellis notation]] can be used:
Alternatively, sharps and flats with arrows borrowed from [[Helmholtz–Ellis notation]] can be used:
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=== Sagittal notation ===
=== Sagittal notation ===
==== Best fifth notation ====
==== Best fifth notation ====
This notation uses the same sagittal sequence as [[35edo#Second-best fifth notation|35b]].
This notation uses the same sagittal sequence as [[35edo #Second-best fifth notation|35b]].


===== Evo flavor =====
===== Evo flavor =====
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==== Second-best fifth notation ====
==== Second-best fifth notation ====
This notation uses the same sagittal sequence as [[47edo#Sagittal notation|47-EDO]], and is a superset of the notations for EDOs [[21edo#Sagittal notation|21]], [[14edo#Sagittal notation|14]], and [[7edo#Sagittal notation|7]].
This notation uses the same sagittal sequence as [[47edo#Sagittal notation|47edo]], and is a superset of the notations for edos [[21edo #Sagittal notation|21]], [[14edo #Sagittal notation|14]], and [[7edo #Sagittal notation|7]].


<imagemap>
<imagemap>
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default [[File:42b_Sagittal.svg]]
default [[File:42b_Sagittal.svg]]
</imagemap>
</imagemap>
== Approximation to JI ==
{{Q-odd-limit intervals}}
== Regular temperament properties ==
{| class="wikitable center-4 center-5 center-6"
|-
! rowspan="2" | [[Subgroup]]
! rowspan="2" | [[Comma list]]
! rowspan="2" | [[Mapping]]
! rowspan="2" | Optimal<br>8ve stretch (¢)
! colspan="2" | Tuning error
|-
! [[TE error|Absolute]] (¢)
! [[TE simple badness|Relative]] (%)
|-
| 2.3
| {{Monzo| 67 -42 }}
| {{Mapping| 42 67 }}
| −3.89
| 3.88
| 13.57
|-
| 2.3.5
| 128/125, 5000000/4782969
| {{Mapping| 42 67 98 }}
| −4.55
| 3.30
| 11.55
|-
| 2.3.5.7
| 64/63, 126/125, 6860/6561
| {{Mapping| 42 67 98 118 }}
| −3.65
| 3.26
| 11.42
|}
== Octave stretch or compression ==
42edo’s inaccurate 3rd and 5th harmonics can be improved through [[stretched and compressed tuning|stretching or compressing]] octaves. Both approaches work about equally well but in opposite directions, giving two quite different flavors of tuning to play with.
* Good stretched options: [[ed6|108ed6]], [[ed5|97ed5]], [[zpi|189zpi]], [[ed12|150ed12]]
* Good compressed options: [[ed7|118ed7]], [[ed12|151ed12]], [[ed6|109ed6]], [[zpi|191zpi]]


== Scales ==
== Scales ==
; [[MOS scale]]s
{{main|List of MOS scales in 42edo}}
{{main|List of MOS scales in 42edo}}
; [[MOS scale]]s
* Eugene/Tritikleismic[9]: '''3 8 3 3 8 3 3 8 3'''
* Eugene/Tritikleismic[9]: '''3 8 3 3 8 3 3 8 3'''
* Eugene/Tritikleismic[15]: '''3 3 2 3 3 3 3 2 3 3 3 3 2 3 3'''
* Eugene/Tritikleismic[15]: '''3 3 2 3 3 3 3 2 3 3 3 3 2 3 3'''
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* Seville/Sevond[14] 2nd mode: '''5 1 5 1 5 1 5 1 5 1 5 1 5 1'''
* Seville/Sevond[14] 2nd mode: '''5 1 5 1 5 1 5 1 5 1 5 1 5 1'''
* Seville/Sevond[21]: '''1 4 1 1 4 1 1 4 1 1 4 1 1 4 1 1 4 1 1 4'''
* Seville/Sevond[21]: '''1 4 1 1 4 1 1 4 1 1 4 1 1 4 1 1 4 1 1 4'''


; Subsets of MOS scales  
; Subsets of MOS scales  
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** Undecimal lydian-aeolian pentatonic: '''8 14 3 11 6'''
** Undecimal lydian-aeolian pentatonic: '''8 14 3 11 6'''
** Yokai pentatonic: '''3 14 8 3 14'''
** Yokai pentatonic: '''3 14 8 3 14'''
; Approximations of [[gamelan]] scales:
* 5-tone pelog: 4 5 15 3 15
* 7-tone pelog: 4 5 9 6 3 10 5
* 5-tone slendro: 8 9 8 9 8
; Other scales
* 12-tone 6&7edo scale: 6 1 5 2 4 3 3 4 2 5 1 6


== Instruments ==
== Instruments ==
; Fretted instruments
=== Lumatone ===
; [[Skip fretting system 42 3 11]]
; Lumatone
{{main|Lumatone mapping for 42edo}}
{{main|Lumatone mapping for 42edo}}
=== Skip fretting ===
'''[[Skip fretting]] system 42 3 11''': One way to play [[42edo]] on a [[14edo]] guitar is to tune the strings 11\42, or approximately a [[just]] 6/5, apart. All examples on this page are for 7-string guitar.
; Prime intervals
1/1: string 2 open
2/1: string 5 fret 3
3/2: string 4 fret 1 and string 7 fret 4
5/4: string 3 fret 1
7/4: string 1 fret 1 and string 4 fret 4
11/8: string 7 fret 2
13/8: string 3 fret 6
17/16: string 1 fret 5
19/16: string 1 fret 7
23/16: string 4 open and string 7 fret 3
29/16: string 5 fret 1
31/16: string 1 fret 3 and string 4 fret 6
; Chords
Minor 7th: 100123X


== Music ==
== Music ==
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=== 21st century ===
=== 21st century ===
; [[Bryan Deister]]
; [[Bryan Deister]]
* [https://www.youtube.com/watch?v=PJw8gZyNPjg ''improv 42edo''] (2023)
* [https://www.youtube.com/watch?v=ljaSpsQP2qc ''Improvisation in 42edo''] (2023), transcribed by [[Stephen Weigel]] (2024)
* [https://www.youtube.com/watch?v=ljaSpsQP2qc ''Improvisation in 42edo''] (2023), transcribed by [[Stephen Weigel]] (2024)
* [https://www.youtube.com/watch?v=cL6CY3U9mHM ''42edo groove''] (2025)
* ''A Hunger Awakes - 42edo'' (2026)
** [https://www.youtube.com/shorts/B90JT_SxSSE <nowiki>[short]</nowiki>] (Lumatone view)
** [https://www.youtube.com/watch?v=VwHqWffglj4 <nowiki>[full version]</nowiki>] (music video with stop-motion by [[Jelly Eyes]])
* ''Waltz in 42edo'' (2026)
** [https://www.youtube.com/shorts/D_YgzRJFg8I <nowiki>[short]</nowiki>] (Lumatone view)
** [https://www.youtube.com/watch?v=QyglWQ_0bIk <nowiki>[full version]</nowiki>]


; [[James Kukula]]
; [[James Kukula]]
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* [https://www.youtube.com/watch?v=ORy7nv6SnN8 ''Glory of Them''] (2024)
* [https://www.youtube.com/watch?v=ORy7nv6SnN8 ''Glory of Them''] (2024)


[[Category:Augene]]
; [[Stephen Weigel]]
[[Category:Todo:add rank 2 temperaments table]]
* [https://www.youtube.com/watch?v=tLmaQK10aYM ''Ĥ̶̩̠̐Ä̶̝͙́̓Ȑ̸̢͒K̷̥̩͌͑!̵̙͆̄ THE BIBLICALLY ACCURATE ANGELS SING!''] (2025; mostly in 42edo, but also some in 40edo)
** [https://www.youtube.com/watch?v=NE77rwCsGHw live performance of the above in Munich, Germany] (2026)
 
[[Category:Augmented]]
{{Todo|review|add rank 2 temperaments table}}
Retrieved from "https://en.xen.wiki/w/42edo"