xen15-chalmers-triadic-diamond-32-25

Triadic diamond for M=32/25, D=3/2

Open in Scale Workshop Scala analysis Download scl

Properties

Notes	7
Period	1200.0 ¢
Just	5-limit
Construction	`triadic_diamond(Fraction(32, 25), Fraction(3, 2))`
Source	Xenharmonikon 15
Reference	John H. Chalmers, Jr., The Triadic Diamond, the Triadic Reversed Diamond, and their Constituent Tetrachords when D=3/2, Xenharmonikon 15 (1993), p.64
Author	John H. Chalmers, Jr.
Article	124 scales

Tone	Tone (¢)	Step	Step (¢)
75/64	275	75/64	275
32/25	427	2048/1875	153
4/3	498	25/24	71
3/2	702	9/8	204
25/16	773	25/24	71
128/75	925	2048/1875	153
2/1	1200	75/64	275

Similar scales

File	Notes	Max diff (¢)
xen15-chalmers-triadic-diamond-23-18	7	3.0
xen15-chalmers-triadic-diamond-7-6	7	7.7
xen15-chalmers-triadic-diamond-14-11	7	9.9
xen15-chalmers-triadic-diamond-13-11	7	14.6
xen15-chalmers-triadic-diamond-22-17	7	19.0
xen15-chalmers-triadic-diamond-81-64	7	19.6
xen15-chalmers-triadic-diamond-35-27	7	21.9
xen15-chalmers-triadic-diamond-19-16	7	22.9

Parent scales

File	Notes	Max diff (¢)
xen18-schulter-707-10	10	5.3
cw19_5	19	0.0
xen07-chalmers-fokker	19	0.0
xen07-chalmers-fokker-h	19	0.0
xen07-chalmers-wurschmidt-1	19	0.0
xen07-chalmers-wurschmidt-2	19	0.0
aaron_tuning_53040_53059	12	7.7
tripenta	15	5.2
scj22c	22	0.0
portsmouth	12	9.9

Child scales

File	Notes	Max diff (¢)
xen18-erlich-bug-05	5	22.6

Raw file

! xen15-chalmers-triadic-diamond-32-25.scl
!
Triadic diamond for M=32/25, D=3/2
 7
!
 75/64
 32/25
 4/3
 3/2
 25/16
 128/75
 2/1
!
! John H. Chalmers, Jr.
! The Triadic Diamond, the Triadic Reversed Diamond, and their Constituent Tetrachords when D=3/2
! Xenharmonikon 15 (1993), p.64
!
! [info]
! source = Xenharmonikon
! whole_number = 15
! article = triadic