dwarf19marv

Marvelous dwarf: 1/4 kleismic dwarf(<19 30 44|) = inverse wilson1

Open in Scale Workshop Scala analysis Download scl

Properties

Notes19
Period1200.0 ¢
JustNo
Source Mailing lists
Referencehttps://yahootuninggroupsultimatebackup.github.io/tuning/topicId_59269.html#59269
Thread3 scales
Tone (¢) Step (¢)
69 69
116 47
200 84
269 69
316 47
384 69
431 47
500 69
584 84
631 47
700 69
769 69
816 47
884 69
931 47
1016 84
1084 69
1131 47
1200 69

Similar scales

FileNotesRotationMax diff (¢)
xen07-chalmers-fokker 19 0 5.8
xen07-chalmers-19-50-equal 19 14 8.4
xen07-chalmers-kornerup 19 14 8.5
xen07-chalmers-rvf-1 19 14 9.3
xen07-chalmers-two-seventh-comma 19 14 9.5
xen18-erlich-meantone-19 19 0 9.9
xen07-chalmers-meantone 19 14 10.7
meanquar_19 19 14 10.8
xen07-chalmers-19-31-equal 19 14 11.9
xen18-erlich-magic-19 19 7 12.6

Parent scales

FileNotesMax diff (¢)
kleismic34trans 34 5.8
mag22 22 12.7
xen18-erlich-helmholtz-41 41 5.1
cbrat31 31 9.8
meandia 21 15.7
xen18-erlich-meantone-31 31 9.9
tenn41b 41 5.8
xen18-erlich-wurschmidt-34 34 8.8
vala 31 10.6
circle31 31 10.8

Child scales

FileNotesMax diff (¢)
nptmarv 12 0.7
qm2 7 1.1
duo 12 1.1
marveldene 12 1.6
semafip 9 1.7
fivecrys1 7 1.9
xen15-chalmers-triadic-diamond-5-4 7 1.9
xen15-chalmers-triadic-reversed-diamond-8192-6561 7 1.9
xen18-ayers-table-41-42 7 1.9
semimaj1 8 1.9
Mailing list post 
From: Gene Ward Smith (2005-07-06)
Subject: Some 19 note scales

Here are a few 19 note scales in line with the discussion of these;
however, I do not present them in terms of an equal temperament.

Here's the marvel-tempered 19 note 5-limit dwarf scale ("marvelous
dwarf".) It's related to one of Erv Wilson's scales.

tetrads

5 major
5 minor
6 supermajor
5 subminor

triads

12 major
11 minor
8 supermajor
8 subminor

! dwarf19marv.scl
Marvelous dwarf: 1/4 kleismic dwarf(<19 30 44|) = inverse wilson1
19
!
68.744546
115.587047
200.054240
268.798786
315.641287
384.385833
431.228334
499.972880
584.440073
631.282574
700.027120
768.771666
815.614167
884.358713
931.201214
1015.668407
1084.412953
1131.255454
1200.000000
! ten tetrads/pentads
! representible as [[0, 1, 2], [0, 0, 2], [0, -1, -2], [0, 0, 1], [-1,
1, 2], 
! [-1, 0, -1],[-1, 0, 0], [-1, 0, 1], [-1, 1, 1], [0, -1, -1]]



Here is the "marvel byzantine" scale we've been discussing. I think
this is another of those marvel-tempered Fokker block scales.

tetrads

5 major
5 minor
4 supermajor
4 subminor

triads

9 major
9 minor
6 supermajor
6 subminor

! marvbiz.scl
1/4 kleismic tempered marvel "byzantine" scale
19
!
84.467193
115.587047
200.054240
268.798786
315.641287
384.385833
431.228334
499.972880
584.440073
615.559927
700.027120
768.771666
815.614167
884.358713
931.201214
999.945760
1084.412953
1115.532807
1200.000000

Here's a detempered sensi (semisixths) MOS, detempered to 245/243
planar. This makes for an enormous improvement in the tuning, so that
it falls into the range of acceptibility for Joe's purposes.

tetrads

4 major
4 minor
8 supermajor
8 subminor

triads

8 major
8 minor
11 supermajor
11 subminor

! boop19.scl
19 note detempered sensi MOS boop (245/243) scale, rms tuning
19
!
54.196169
122.781755
176.977924
263.949327
318.145497
386.731082
440.927252
495.123421
582.094824
617.905176
704.876579
759.072748
813.268918
881.854503
936.050673
1023.022076
1077.218245
1145.803831
1200.000000
Full thread (1 messages) 
From: Gene Ward Smith (2005-07-06)
Subject: Some 19 note scales

Here are a few 19 note scales in line with the discussion of these;
however, I do not present them in terms of an equal temperament.

Here's the marvel-tempered 19 note 5-limit dwarf scale ("marvelous
dwarf".) It's related to one of Erv Wilson's scales.

tetrads

5 major
5 minor
6 supermajor
5 subminor

triads

12 major
11 minor
8 supermajor
8 subminor

! dwarf19marv.scl
Marvelous dwarf: 1/4 kleismic dwarf(<19 30 44|) = inverse wilson1
19
!
68.744546
115.587047
200.054240
268.798786
315.641287
384.385833
431.228334
499.972880
584.440073
631.282574
700.027120
768.771666
815.614167
884.358713
931.201214
1015.668407
1084.412953
1131.255454
1200.000000
! ten tetrads/pentads
! representible as [[0, 1, 2], [0, 0, 2], [0, -1, -2], [0, 0, 1], [-1,
1, 2], 
! [-1, 0, -1],[-1, 0, 0], [-1, 0, 1], [-1, 1, 1], [0, -1, -1]]



Here is the "marvel byzantine" scale we've been discussing. I think
this is another of those marvel-tempered Fokker block scales.

tetrads

5 major
5 minor
4 supermajor
4 subminor

triads

9 major
9 minor
6 supermajor
6 subminor

! marvbiz.scl
1/4 kleismic tempered marvel "byzantine" scale
19
!
84.467193
115.587047
200.054240
268.798786
315.641287
384.385833
431.228334
499.972880
584.440073
615.559927
700.027120
768.771666
815.614167
884.358713
931.201214
999.945760
1084.412953
1115.532807
1200.000000

Here's a detempered sensi (semisixths) MOS, detempered to 245/243
planar. This makes for an enormous improvement in the tuning, so that
it falls into the range of acceptibility for Joe's purposes.

tetrads

4 major
4 minor
8 supermajor
8 subminor

triads

8 major
8 minor
11 supermajor
11 subminor

! boop19.scl
19 note detempered sensi MOS boop (245/243) scale, rms tuning
19
!
54.196169
122.781755
176.977924
263.949327
318.145497
386.731082
440.927252
495.123421
582.094824
617.905176
704.876579
759.072748
813.268918
881.854503
936.050673
1023.022076
1077.218245
1145.803831
1200.000000

Raw file

! dwarf19marv.scl
Marvelous dwarf: 1/4 kleismic dwarf(<19 30 44|) = inverse wilson1
19
!
68.744546
115.587047
200.054240
268.798786
315.641287
384.385833
431.228334
499.972880
584.440073
631.282574
700.027120
768.771666
815.614167
884.358713
931.201214
1015.668407
1084.412953
1131.255454
1200.000000
! ten tetrads/pentads
! representible as [[0, 1, 2], [0, 0, 2], [0, -1, -2], [0, 0, 1], [-1,
!
! https://yahootuninggroupsultimatebackup.github.io/tuning/topicId_59269.html#59269
!
! [info]
! source = Mailing lists
! file = tuning/messages/yahoo_tuning_messages_api_raw_55190-71650.json
! topic_id = 59269
! msg_id = 59269