User:BudjarnLambeth/Sandbox: Difference between revisions

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<pre>Table entry format:
== Scales ==
* Temperament name (clumsy note count, [[badness]] to 2 sig fig - copied from wiki temperament pages)
; 12-tone 7edo&5edo
This scale is designed to be mapped to the key of C on a conventional piano keyboard, with 7edo on the white keys, and 5edo on black:
* 5 2 3 4 1 5 1 4 3 2 5 0


; 24-tone blackwood&greenwood
You can have two pianos/keyboards, one 68.6 [[cents]] sharp of the other, both tuned to the 12-tone 7edo&5edo scale. The combined black keys across both keyboards will be [[blackwood]][10] and the white keys will be [[greenwood]][14].
* 3 2 0 2 1 2 2 1 1 1 3 1 1 1 2 2 1 2 0 2 3 0 2 0


(!) Indicates a temperament was manually moved to a different 'note count' category because the clumsy note count was too inaccurate.
; 20-tone blackwood&greenwood
Removing the duplicates from the previous scale (perhaps for use on other instruments beside keyboard) gives this 20-tone scale, which includes both blackwood[10] and greenwood[14] as subsets.
* 3 2 2 1 2 2 1 1 1 3 1 1 1 2 2 1 2 2 3 2


; Muggles[19]
Of all the regular temperaments available in 35edo, [[muggles]] approximates [[just intonation]] the most closely. Here is the muggles[19] [[MOS scale]]:
* 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 2 2


How to calculate 'clumsy note count':
; Ripple[23]
# Subtract the smallest number in the second row of the temperament's mapping, from the largest
This [[modmos]] of ripple[12] sounds sort of like the familiar [[12edo]]:
# Multiply the result by (1 + the number of periods per equave)
* 3 3 3 2 3 3 3 4 2 3 3 3
And it can be extended out to the ripple[23] [MOS scale]] which adds many [[7-limit]] intervals:
* 2 1 2 1 2 1 2 1 2 1 2 1 2 1 2 1 2 2 1 2 1 2 1


; [[MOS scale]]s
* [[Greenwood]][7]/[[whitewood]][7]: 5 5 5 5 5 5 5 (''a.k.a. [[7edo]]; an [[equiheptatonic]] scale'')
* [[Greenwood]][14]: 3 2 3 2 3 2 3 2 3 2 3 2 3 2
* [[Greenwood]][21]: 2 1 2 2 1 2 2 1 2 2 1 2 2 1 2 2 1 2 2 1 2
* [[Muggles]][5] (a.k.a. sub-diatonic): 9 4 9 9 4
* [[Muggles]][13]: 2 2 5 2 2 2 5 2 2 2 5 2 2
* [[Muggles]][16]: 2 2 3 2 2 2 2 2 3 2 2 2 2 3 2 2
* [[Muggles]][19]: 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 2 2
* [[Ripple]][12]: 3 3 3 3 3 3 3 3 2 3 3 3
* [[Ripple]][23]: 2 1 2 1 2 1 2 1 2 1 2 1 2 1 2 1 2 2 1 2 1 2 1
* [[Secund]][17]: 3 1 3 1 3 1 3 1 3 1 3 1 3 1 3 1 3
* [[Whitewood]][14]: 1 4 1 4 1 4 1 4 1 4 1 4 1 4
* [[Whitewood]][21]: 1 3 1 1 3 1 1 3 1 1 3 1 1 3 1 1 3 1 1 3 1
* [[Blackwood]][5]: 7 7 7 7 7 (''a.k.a. [[5edo]]; an [[equipentatonic]] scale; [[slendro]]-like; works with all three blackwood tunings'')
* [[Blackwood|5/4-blackwood]][10]: 4 3 4 3 4 3 4 3 4 3
* [[Blackwood|5/4-blackwood]][15]: 3 1 3 3 1 3 3 1 3 3 1 3 3 1 3
* [[Blackwood|5/4-blackwood]][25]: 1 2 1 2 1 1 2 1 2 1 1 2 1 2 1 1 2 1 2 1 1 2 1 2 1
* [[Blackwood|6/5-blackwood]][10]: 2 5 2 5 2 5 2 5 2 5
* [[Blackwood|6/5-blackwood]][15]: 2 3 2 2 3 2 2 3 2 2 3 2 2 3 2
* [[Blackwood|6/5-blackwood]][20]: 2 2 1 2 2 2 1 2 2 2 1 2 2 2 1 2 2 2 1 2
{| class="wikitable mw-collapsible mw-collapsed"
|+Secund[17] subsets
|''Contains [[Template:Idiosyncratic|idiosyncratic terms]].''


Disclaimer about 'clumsy note count':
*[[Antipental blues]]: 8 7 1 4 8 7
This should not be taken as the exact number of notes you should generate with a temperament. It is just a general ballpark figure, with an error of plus or minus 10 or so in either direction. The best 'exact' numbers of notes per equave for a temperament are given by the [[MOS scale]]s it generates.
* Antipental blues maj 6th: 8 7 1 4 7 1 7
* Antipental blues neutral 7th: 8 7 1 4 8 3 4
* Antipental blues maj 7th: 8 7 1 4 8 4 3
* Antipental blues harmonic: 8 7 1 4 3 9 3
* [[Pelog]]-like heptatonic: 3 5 7 5 3 8 4 (''Phrygian-like'')
* Pelog-like pentatonic: 3 5 12 3 12
* Secund chance ([[modmos]] of secund[8]): 4 7 4 1 4 4 7 4
* Secund-tempered rotated [[5afdo]]: 7 4 9 8 7
* Secund-tempered [[6afdo]]: 8 7 5 7 4 4
* Undecimal Mixolydian: 7 4 4 5 7 1 7
* Undecimal minor hexatonic: 7 1 7 5 8 7
* Undecimal quasi-equipentatonic: 7 8 5 8 7
* 12 from secund[17]: 7 1 3 4 1 4 3 4 1 3 1 3
|}


{| class="wikitable mw-collapsible mw-collapsed"
|+6/5-blackwood[20] subsets
|''Contains [[Template:Idiosyncratic|idiosyncratic terms]].''


''To-do: Re-sort the temperaments in each sell by [[damage]], instead of by badness.''
*Blackwood meta-Hirajoshi: 2 3 4 2 5 7 2 12
** ''Blackwood pseudo-Akebono neutral: 5 9 7 2 12''
** ''Blackwood pseudo-Akebono supermajor: 7 7 7 2 12''
** ''Blackwood pseudo-Hirajoshi: 2 12 7 2 12''
** ''Blackwood pseudo-[[pelog]]: 5 4 12 2 12''
* Blackwood meta-partial: 4 3 2 2 3 7 7 7
** ''Blackwood-tempered [[5afdo]]: 7 4 10 7 7''
** ''Mechanical (from [[16afdo]]): 9 2 10 7 7''
** ''Starship (from [[68ifdo]]'', see [[ifdo]]''): 4 7 3 7 7 7''
** ''Volcanic (from [[16afdo]]): 4 7 10 7 7''
* Meta-monsoon: 7 4 3 2 5 9 5
** ''Monsoon (from [[47zpi]]): 7 7 7 9 5''
** ''Monsoon otonal: 7 9 5 9 5''
** ''Monsoon major: 11 5 5 9 5''
* Blackwood neutral nonatonic: 4 7 3 2 5 4 5 2 3
* Blackwood undecimal harmonic: 4 8 4 5 4 5 5
* Dungeon (from [[30afdo]]): 11 3 7 2 12
* Moonbeam (from [[16afdo]]): 7 2 12 12 2
* Underpass (from [[10afdo]]): 9 12 5 4 5
* 12 from 6/5-blackwood[20]: 4 3 2 2 3 7 2 3 2 2 3 2
|}


{| class="wikitable mw-collapsible mw-collapsed"
|+Ripple[23] subsets
|''Contains [[Template:Idiosyncratic|idiosyncratic terms]].''


5LIM
* Clear pond (ripple[12] [[modmos]]): 3 3 3 2 3 3 3 4 2 3 3 3
 
** Lydian: 6 5 6 3 6 6 3
~10 NOTES/EQUAVE
** Major: 6 5 3 6 6 6 3
* [[Meantone]] (8, 0.0074)
** Mixolydian: 6 5 3 6 6 3 6
* [[Hanson]] (12, 0.013)
** Dorian: 6 3 5 6 6 3 6
* [[Augmented]] (4, 0.022)
** Minor: 6 3 5 6 4 5 6
* [[Porcupine]] (10, 0.031)
** Phrygian: 3 6 5 6 4 5 6
* [[Magic]] (10, 0.039)
** Locrian: 3 6 5 3 7 5 6
* [[Mavila]] (6, 0.040)
** Harmonic minor: 6 3 5 6 4 8 3
* [[Orson]] (14, 0.041)
** Melodic minor: 6 3 5 6 6 6 3
* [[Dimipent]] (5, 0.047)
** Major pentatonic: 6 8 6 6 9
* [[Blackwood]] (6, 0.064)
** Minor pentatonic: 9 5 6 9 6
* [[Negri]] (14, 0.087)
** Minor blues: 9 5 3 3 9 6
* [[Misty]] (12, 0.11)
** Minor blues heptatonic: 9 5 3 3 6 3 6
* [[Whitewood]] (8, 0.16)
** Akebono I: 6 3 11 6 9
 
* Hirajoshi: 6 3 11 3 12
~20 NOTES/EQUAVE
* Subminor hexatonic: 6 2 6 6 9 6
* [[Wuerschmidt]] (16, 0.041)
* Subminor pentatonic: 8 6 6 9 6
* [[Helmholtz]] (16, 0.0043)
* Subminor blues: 8 6 3 3 9 6
* [[Sensipent]] (18, 0.035)
* Subminor blues heptatonic: 8 6 3 3 6 3 6
* [[Diaschismic]] (16, 0.038)
|}
* [[Tetracot]] (18, 0.049)
* [[Compton]] (13, 0.094) (!)
* [[Valentine]] (18, 0.12)
* [[Superpyth]] (18, 0.14)
* [[Ripple]] (16, 0.14)
* [[Passion]] (18, 0.17)
 
~30 NOTES/EQUAVE
* [[Kwazy]] (26, 0.014)
* [[Luna]] (30, 0.021)
* [[Amity]] (26, 0.022)
* [[Vishnu]] (14, 0.031) (!)
* [[Ennealimmal]] (27, ??)
* [[Parakleismic]] (28, 0.043)
* [[Gravity]] (34, 0.093)
 
~40 NOTES/EQUAVE
 
~50 NOTES/EQUAVE
 
>60 NOTES/EQUAVE
* [[Minortone]] (70, 0.030)
 
 
 
 
7LIM
 
~10 NOTES/EQUAVE
* [[Pajara]] (6, 0.020)
* [[Dominant]] (4, 0.021)
* [[Diminished]] (5, 0.022)
* [[Augene]] (12, 0.025)
* [[Blacksmith]] (6, 0.026)
* [[August]] (8, 0.026)
* [[Negri]] (8, 0.026)
* [[Keemun]] (12, 0.027)
* [[Injera]] (12, 0.031)
* [[Opossum]] (18, 0.041) (!)
* [[Porcupine]] (12, 0.041)
* [[Doublewide]] (12, 0.043)
* [[Inflated]] (12, 0.055)
* [[Superpelog]] (12, 0.058)
* [[Lemba]] (9, 0.062)
* [[Shrutar]] (14, 0.19)
 
~20 NOTES/EQUAVE
* [[Meantone]] (20, 0.014)
* [[Magic]] (24, 0.019)
* [[Orwell]] (22, 0.021)
* [[Myna]] (20, 0.027)
* [[Godzilla]] (16, 0.027)
* [[Valentine]] (24, 0.031)
* [[Superpyth]] (18, 0.032)
* [[Mothra]] (24, 0.037)
* [[Diaschismic]] (18, 0.038)
* [[Flattone]] (18, 0.039)
* [[Hedgehog]] (15, 0.044)
* [[Beatles]] (18, 0.046)
* [[Liese]] (22, 0.047)
* [[Catler]] (13, 0.050) (!)
* [[Triforce]] (16, 0.055)
* [[Nautilus]] (20, 0.057)
* [[Schism]] (16, 0.057)
 
~30 NOTES/EQUAVE
* [[Ennealimmal]] (30, 0.0036)
* [[Miracle]] (26, 0.017)
* [[Hemiwuerschmidt]] (32, 0.020)
* [[Garibaldi]] (30, 0.022)
* [[Amity]] (34, 0.024)
* [[Sensi]] (26, 0.026)
* [[Harry]] (34, 0.034)
* [[Unidec]] (33, 0.038)


~40 NOTES/EQUAVE
; Other scales
* [[Catakleismic]] (44, 0.022)
* Amulet{{idiosyncratic}}, approximated from [[magic]] in [[25edo]]: 3 1 3 3 1 3 4 3 3 1 3 4 3
* [[Misty]] (40, 0.037)
* Fourfourths{{idio}} ([[modmos]] of 7/6-blackwood[20]): 3 1 1 2 1 1 1 4 1 1 1 4 1 1 1 4 1 1 1 4
 
* Near-just rotated [[5afdo]]: 6 5 9 8 7
~50 NOTES/EQUAVE
* Near-just [[6afdo]]: 8 7 5 6 5 4
* [[Tertiaseptal]] (54, 0.013)
* [[Hemififths]] (50, 0.022)
 
>60 NOTES/EQUAVE
* [[Enneadecal]] (60, 0.011)
* [[Ragismic_microtemperaments#Supermajor|Supermajor]] (150, 0.011)
* [[Seqsquiquartififths]] (72, 0.011)
* [[Pontiac]] (94, 0.014)
* [[Parakleismic]] (70, 0.027)
 
 
 
 
 
 
 
| [[ennealimmal]], [[amity]], [[harry]], [[hemififths]], [[parakleismic]], [[misty]], [[unidec]]
| [[Ragismic_microtemperaments#Supermajor|supermajor]], [[enneadecal]], [[sesquiquartififths]], [[pontiac]], [[tertiaseptal]], [[trinity]]
|-
! 11-limit <br>(2 . 3 . 5 . 7 . 11)
| [[superpelog]], [[blacksmith]], [[opossum]], [[pajaric]], [[august]]
| [[mohajira]], [[superpyth]], [[quasisupra]], [[pajara]], [[telepathy]], [[suprapyth]], [[porcupine]], [[negroni]], [[porky]], [[hedgehog]], [[fleetwood]], [[pajarous]], [[astrology]], [[vigintiduo]], [[augene]], [[sensis]], [[nautilus]], [[catnip]], [[undevigintone]], [[injera]], [[flattone]], [[godzilla]], [[darjeeling]], [[keemun]], [[progress]], [[dominant]], [[triforce]], [[negric]], [[meanenneadecal]], [[duodecim]]
| [[hemiwuerschmidt]], [[miracle]], [[cassandra]], [[diaschismic]], [[valentine]], [[shrutar]], [[orwell]], [[magic]], [[meanpop]], [[migration]], [[nusecond]], [[andromeda]], [[mothra]], [[squares]], [[meantone]]
| [[unidec]], [[harry]], [[sqrtphi]], [[tritikleismic]], [[hemiwuerschmidt]], [[ennealimnic]], [[hemithirds]], [[catakleismic]], [[wizard]]
| [[hemienneadecal]], [[hemiennealimmal]], [[ennealimmal]], [[vishnu]], [[quasiorwell]], [[trinity]]
|-
! 13-limit <br>(2 . 3 . 5 . 7 . 11 . 13)
|
| [[mohajira]], [[winston]], [[pajara]], [[undevigintone]], [[superpyth]], [[sensis]], [[negroni]], [[nautilus]], [[ogene]], [[ringo]], [[flattone]], [[injera]], [[augene]], [[darjeeling]], [[meanenneadecal]], [[porcupine]], [[hedgehog]], [[triforce]], [[godzilla]], [[negric]], [[negri]],[[Mavila_family#Armodue|armodue]], [[blacksmith]]
| [[cassandra]], [[diaschismic]], [[myna]], [[orwell]], [[shrutar]], [[miraculous]], [[sensus]], [[meanpop]], [[andromeda]], [[magic]], [[superkleismic]], [[mothra]], [[nusecond]], [[modus]], [[lupercalia]], [[meantone]]
| [[hemiwuerschmidt]], [[mirkat]], [[harry]], [[sqrtphi]], [[tritikleismic]], [[countercata]], [[hemiseven]], [[catakleismic]]
| [[semihemiennealimmal]], [[abigail]], [[ennealimmia]], [[decoid]], [[hemiennealimmal]], [[trinity]], [[enneadecal]], [[octoid]]
|-
! 17-limit <br>(2 . 3 . 5 . 7 . 11 . 13 . 17)
|
| [[mohajira]], [[injera]], [[meanenneadecal]], [[pajara]]
| [[diaschismic]], [[echidna]], [[shrutar]], [[sensus]], [[miraculous]], [[andromeda]], [[modus]]
| [[mirkat]], [[harry]], [[sqrtphi]], [[tritikleismic]], [[countercata]], [[hemiseven]]
| [[trinity]], [[hemiennealimmal]], [[ennealimmal]], [[octoid]]
|-
! 19-limit <br>(2 . 3 . 5 . 7 . 11 . 13 . 17 . 19)
|
| [[mohajira]], [[injera]], [[meanenneadecal]], [[marvolo]]
| [[shrutar]], [[andromeda]], [[modus]], [[hitchcock]]
| [[sqrtphi]], [[ketchup]]
| [[trinity]], [[hemiennealimmal]], [[ennealimmal]], [[octoid]]
|-
! Higher prime limits
|
| [[marvolo]]
| [[srutal]], [[shrutar]], [[hitchcock]]
| [[decistearn]], [[ketchup]]
| [[trinity]], [[satin]]
|-
! 2 . 3 . 5 . 7 . other n
|
| no-11 [[magic]], no-11 [[sensis]], no-11 [[meanpop]], [[negra]]
| no-11 [[catakleismic]], no-11 [[cassandra]], [[unicorn]]
| no-11 [[decoid]], no-11 [[hemischis]], no-11 [[tritikleismic]]
| no-11 [[ennealimmal]]
|-
! 2 . 3 . 5 . 11 <br>and its extensions
| [[mavila]]
| [[sensible]], [[mohaha]], [[porkypine]]
| [[tetracot]]
| [[larry]] (2.3.5.11 [[gravity]])
|
|-
! 2 . 3 . 5 . other n
| [[stützel]]
| [[nestoria]], [[cata]], [[sensipent]], [[srutal archagall]]
| [[wuerschmidt]] (2.3.5.23)
|
|
|-
! 2 . 3 . 7
| [[archy]], [[semaphore]]
| [[bleu]]
| [[slendric]]
| no-5 [[hemififths]]
|
|-
! 2 . 3 . 7 . 11 <br>and its extensions
| [[semaphore]]
| [[skwares]], [[bleu]], [[suhajira]], [[supra]]
| no-5 [[miracle]], [[hemififths]], [[slendric]], [[radon]]
|
|
|-
! 2 . 3 . 7 . other n
| no-5 [[negra]]
| [[baladic]]
| [[oceanfront]]
| [[hypnosis]]
|
|-
! 2 . 3 . 11 <br>and its extensions
| [[paralimmal]], [[huxley]], [[io]]
| 2.3.11 [[pythrabian]], [[neutral]] (2.3.11 [[rastmic]]), [[namo]]
| [[tribilo]] (2.3.11 [[nexus]])
|
| 2.3.11 [[frameshift]]
|-
!2 . 3 . other n
| [[barbados]], [[superflat]], [[hydrothermal]], [[dog]]
| [[threedic]], [[semitonic]]
| [[boethian]], [[pepperoni]]
| [[historical]]
|
|-
! 2 . 5 . 7 <br>and its extensions
| no-3 [[oodako]], no-3 [[pajara]]
| [[didacus]], [[llywelyn]]
| [[rainy]], [[mercy]], [[frostburn]], [[baldy]]
| [[Subgroup temperaments#Daemotertiaschis|daemotertiaschis]]
| [[ostara]]
|-
! 2 . 5 . other n
| [[movila]]
| [[wizz]], [[vengeance]], [[marveltri]], [[superquintal]], [[trader]]
| [[insect]], [[sulis]]
|
|
|-
! 2 . 7 <br>and its extensions
| [[ultrakleismic]], [[shipwreck]], [[mabon]], [[demon]], [[machine]]
| [[orgone]], [[counterultrakleismic]], [[machine|apparatus]]
| [[stacks]], [[machine|mechanism]]
|
|
|-
! 3 . 5 . 7 <br>and its extensions
| [[canopus]], [[BPS]], [[sirius]], [[arcturus]], [[vega]]
| [[mintra]] (3.5.7.11), [[dubhe]] (3.5.7.17)
| [[miaplacidus]], [[mintra]] (3.5.7.11.13)
| [[izar]], [[BPS|athena]]
|
|-
!3 . 5 . other n
| [[polaris]], [[aldebaran]]
| [[deneb]]
| [[No-twos subgroup temperaments#Fomalhaut|fomalhaut]]
| [[alnilam]]
|
|-
! 3 . 7 <br>and its extensions
| [[mintaka]] (3.7.11), [[keladic]]
| [[mintaka]] (3.7.11.13), [[minalzidar]]
| [[mebsuta]]
|
|
|-
! 4 . n <br>and its extensions
| [[tetrameantone]], [[quarchy]]
| [[tetrahanson]], [[meanquad]]
| [[Subgroup temperaments#Fourwar|fourwar]]
|
|
|-
! 5 . n <br>and its extensions
| [[juggernaut]]
| [[antipyth]]
|
|
|
|-
! Other subgroups
| [[halftone]], [[semiwolf]], [[auk]]
| [[greeley]]
|
|
|
|}
</pre>

Latest revision as of 07:16, 7 October 2025

Scales

12-tone 7edo&5edo

This scale is designed to be mapped to the key of C on a conventional piano keyboard, with 7edo on the white keys, and 5edo on black:

  • 5 2 3 4 1 5 1 4 3 2 5 0
24-tone blackwood&greenwood

You can have two pianos/keyboards, one 68.6 cents sharp of the other, both tuned to the 12-tone 7edo&5edo scale. The combined black keys across both keyboards will be blackwood[10] and the white keys will be greenwood[14].

  • 3 2 0 2 1 2 2 1 1 1 3 1 1 1 2 2 1 2 0 2 3 0 2 0
20-tone blackwood&greenwood

Removing the duplicates from the previous scale (perhaps for use on other instruments beside keyboard) gives this 20-tone scale, which includes both blackwood[10] and greenwood[14] as subsets.

  • 3 2 2 1 2 2 1 1 1 3 1 1 1 2 2 1 2 2 3 2
Muggles[19]

Of all the regular temperaments available in 35edo, muggles approximates just intonation the most closely. Here is the muggles[19] MOS scale:

  • 2 2 2 1 2 2 2 2 2 1 2 2 2 2 2 1 2 2 2
Ripple[23]

This modmos of ripple[12] sounds sort of like the familiar 12edo:

  • 3 3 3 2 3 3 3 4 2 3 3 3

And it can be extended out to the ripple[23] [MOS scale]] which adds many 7-limit intervals:

  • 2 1 2 1 2 1 2 1 2 1 2 1 2 1 2 1 2 2 1 2 1 2 1
MOS scales
Secund[17] subsets
Contains idiosyncratic terms.
  • Antipental blues: 8 7 1 4 8 7
  • Antipental blues maj 6th: 8 7 1 4 7 1 7
  • Antipental blues neutral 7th: 8 7 1 4 8 3 4
  • Antipental blues maj 7th: 8 7 1 4 8 4 3
  • Antipental blues harmonic: 8 7 1 4 3 9 3
  • Pelog-like heptatonic: 3 5 7 5 3 8 4 (Phrygian-like)
  • Pelog-like pentatonic: 3 5 12 3 12
  • Secund chance (modmos of secund[8]): 4 7 4 1 4 4 7 4
  • Secund-tempered rotated 5afdo: 7 4 9 8 7
  • Secund-tempered 6afdo: 8 7 5 7 4 4
  • Undecimal Mixolydian: 7 4 4 5 7 1 7
  • Undecimal minor hexatonic: 7 1 7 5 8 7
  • Undecimal quasi-equipentatonic: 7 8 5 8 7
  • 12 from secund[17]: 7 1 3 4 1 4 3 4 1 3 1 3
6/5-blackwood[20] subsets
Contains idiosyncratic terms.
  • Blackwood meta-Hirajoshi: 2 3 4 2 5 7 2 12
    • Blackwood pseudo-Akebono neutral: 5 9 7 2 12
    • Blackwood pseudo-Akebono supermajor: 7 7 7 2 12
    • Blackwood pseudo-Hirajoshi: 2 12 7 2 12
    • Blackwood pseudo-pelog: 5 4 12 2 12
  • Blackwood meta-partial: 4 3 2 2 3 7 7 7
    • Blackwood-tempered 5afdo: 7 4 10 7 7
    • Mechanical (from 16afdo): 9 2 10 7 7
    • Starship (from 68ifdo, see ifdo): 4 7 3 7 7 7
    • Volcanic (from 16afdo): 4 7 10 7 7
  • Meta-monsoon: 7 4 3 2 5 9 5
    • Monsoon (from 47zpi): 7 7 7 9 5
    • Monsoon otonal: 7 9 5 9 5
    • Monsoon major: 11 5 5 9 5
  • Blackwood neutral nonatonic: 4 7 3 2 5 4 5 2 3
  • Blackwood undecimal harmonic: 4 8 4 5 4 5 5
  • Dungeon (from 30afdo): 11 3 7 2 12
  • Moonbeam (from 16afdo): 7 2 12 12 2
  • Underpass (from 10afdo): 9 12 5 4 5
  • 12 from 6/5-blackwood[20]: 4 3 2 2 3 7 2 3 2 2 3 2
Ripple[23] subsets
Contains idiosyncratic terms.
  • Clear pond (ripple[12] modmos): 3 3 3 2 3 3 3 4 2 3 3 3
    • Lydian: 6 5 6 3 6 6 3
    • Major: 6 5 3 6 6 6 3
    • Mixolydian: 6 5 3 6 6 3 6
    • Dorian: 6 3 5 6 6 3 6
    • Minor: 6 3 5 6 4 5 6
    • Phrygian: 3 6 5 6 4 5 6
    • Locrian: 3 6 5 3 7 5 6
    • Harmonic minor: 6 3 5 6 4 8 3
    • Melodic minor: 6 3 5 6 6 6 3
    • Major pentatonic: 6 8 6 6 9
    • Minor pentatonic: 9 5 6 9 6
    • Minor blues: 9 5 3 3 9 6
    • Minor blues heptatonic: 9 5 3 3 6 3 6
    • Akebono I: 6 3 11 6 9
  • Hirajoshi: 6 3 11 3 12
  • Subminor hexatonic: 6 2 6 6 9 6
  • Subminor pentatonic: 8 6 6 9 6
  • Subminor blues: 8 6 3 3 9 6
  • Subminor blues heptatonic: 8 6 3 3 6 3 6
Other scales
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