User:Moremajorthanmajor/3L 2s (minor sixth-equivalent)

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3L 2s<minor sixth> (sometimes called diatonic), is a minor sixth-repeating MOS scale. The notation "<minor sixth>" means the period of the MOS is a minor sixth, disambiguating it from octave-repeating 3L 2s. The name of the period interval is called the sextave (by analogy to the tritave).

The generator range is 240 to 342.9 cents, placing it on the diatonic minor third, usually representing a minor third of some type (like 6/5). The bright (chroma-positive) generator is, however, its minor sixth complement (480 to 514.3 cents).

Because this diatonic is a minor sixth-repeating scale, each tone has an 8/5 minor sixth above it. The scale has one major chord, one minor chord and three diminished chords. This diatonic also has two diminished 7th chords, making it a warped melodic minor scale.

Basic diatonic is in 8ed8/5, which is a very good minor sixth-based equal tuning similar to 12edo.

Notation

There are 2 main ways to notate the diatonic scale. One method uses a simple sextave (minor sixth) repeating notation consisting of 5 naturals (La, Si, Do, Re, Mi). Given that 1-7/6-3/2 is minor sixth-equivalent to a tone cluster of 1-16/15-7/6, it may be more convenient to notate these diatonic scales as repeating at the double sextave (diminished eleventh~tenth), however it does make navigating the genchain harder. This way, 3/2 is its own pitch class, distinct from 16\15. Notating this way produces a tenth which is the Dorian mode of Annapolis[6L 4s] or Oriole[6L 4s]. Since there are exactly 10 naturals in double sextave notation, Greek numerals 1-10 may be used.

Normalized
Notation Supersoft Soft Semisoft Basic Semihard Hard Superhard
Diatonic Oriole, Annapolis 18eds 13eds 21eds 8eds 19eds 11eds 14eds
La# Α# 1\18

46.154

1\13

63.158

2\21

77.419

1\8

100

3\19

124.138

2\11

141.1765

3\14

163.63

Sib Βb 3\18

138.4615

2\13

126.316

3\21

116.129

2\19

82.759

1\11

70.588

1\14

54.54

Si Β 4\18

184.615

3\13

189.474

5\21

193.548

2\8

200

5\19

206.897

3\11

211.764

4\14

218.18

Si# Β# 5\18

230.769

4\13

252.632

7\21

270.968

3\8

300

8\19

331.0345

5\11

352.941

7\14

381.81

Dob Γb 6\18

276.923

6\21

232.258

2\8

200

4\19

165.517

2\11

141.1765

2\14

109.09

Do Γ 7\18

323.076

5\13

315.7895

8\21

309.677

3\8

300

7\19

289.655

4\11

282.353

5\14

272.72

Do# Γ# 8\18

369.231

6\13

378.947

10\21

387.097

4\8

400

10\19

413.793

6\11

423.529

8\14

436.36

Reb Δb 10\18

461.5385

7\13

442.105

11\21

425.8065

9\19

372.413

5\11

352.941

6\14

327.27

Re Δ 11\18

507.692

8\13

505.263

13\21

503.226

5\8

500

12\19

496.551

7\11

494.118

9\14

490.90

Re# Δ# 12\18

553.846

9\13

568.421

15\21

580.645

6\8

600

15\19

620.689

9\11

635.294

12\14

654.54

Mib Εb 14\18

646.154

10\13

631.579

16\21

619.355

14\19

579.310

8\11

564.706

10\14

545.45

Mi Ε 15\18

692.308

11\13

694.737

18\21

696.774

7\8

700

17\19

703.448

10\11

705.88235

13\14

709.09

Mi# Ε# 16\18

738.4615

12\13

757.895

20\21

774.194

8\8

800

20\19

827.586

12\11

847.059

16\14

872.72

Lab Ϛb/Ϝb 17\18

784.615

19\21

735.484

7\8

700

16\19

662.069

9\11

635.294

11\14

600

La Ϛ/Ϝ 18\18

830.769

13\13

821.053

21\21

812.903

8\8

800

19\19

786.207

11\11

776.471

14\14

763.63

La# Ϛ#/Ϝ# 19\18

876.923

14\13

884.2105

23\21

890.323

9\8

900

22\19

910.345

13\11

917.647

17\14

927.27

Sib Ζb 21\18

969.231

15\13

947.368

24\21

929.032

21\19

868.9655

12\11

847.059

15\14

818.18

Si Ζ 22\18

1015.385

16\13

1010.526

26\21

1006.452

10\8

1000

24\19

993.1035

14\11

988.235

18\14

981.81

Si# Ζ# 23\18

1061.5385

17\13

1071.684

28\21

1083.871

11\8

1100

27\19

1117.241

16\11

1129.412

21\14

1145.45

Dob Ηb 24\18

1107.692

27\21

1045.161

10\8

1000

23\19

951.724

13\11

917.647

16\14

872.72

Do Η 25\18

1153.846

18\13

1136.842

29\21

1122.581

11\8

1100

26\19

1075.862

15\11

1052.8235

19\14

1036.36

Do# Η# 26\18

1200

19\13

1200

31\21

1200

12\8

1200

29\19

1200

17\11

1200

22\14

1200

Reb Θb 28\18

1292.308

20\13

1263.158

32\21

1238.710

28\19

1158.621

16\11

1129.412

20\14

1090.90

Re Θ 29\18

1338.4615

21\13

1326.316

34\21

1316.129

13\8

1300

31\19

1282.759

18\11

1270.588

23\14

1254.54

Re# Θ# 30\18

1384.615

22\13

1389.474

36\21

1393.548

14\8

1400

34\19

1406.897

20\11

1411.765

26\14

1418.18

Mib Ιb 32\18

1476.923

23\13

1452.632

37\21

1432.258

33\19

1365.517

19\11

1341.1765

24\14

1309.09

Mi Ι 33\18

1523.077

24\13

1515.7895

39\21

1509.677

15\8

1500

36\19

1489.655

21\11

1482.352

27\14

1472.72

Mi# Ι# 34\18

1569.231

25\13

1578.947

41\21

1587.097

16\8

1600

39\19

1613.793

23\11

1623.529

30\14

1636.36

Lab Αb 35\18

1615.385

40\21

1548.387

15\8

1500

35\19

1448.286

20\11

1411.765

25\14

1363.63

La Α 36\18

1661.5385

26\13

1642.105

42\21

1625.8065

16\8

1600

38\19

1572.414

22\11

1552.941

28\14

1527.27


Intervals

Generators Sextave notation Interval category name Generators Notation of sixth inverse Interval category name
The 5-note MOS has the following intervals (from some root):
0 La sextave (minor sixth) 0 La perfect unison
1 Re perfect fourth -1 Do minor third
2 Si major second -2 Mib diminished fifth
3 Mi perfect fifth -3 Sib minor second
4 Do# major third -4 Reb diminished fourth
The chromatic 8-note MOS also has the following intervals (from some root):
5 La# augmented unison (chroma) -5 Lab diminished sextave
6 Re# augmented fourth -6 Dob diminished third
7 Si# augmented second -7 Mibb doubly diminished fifth

Genchain

The generator chain for this scale is as follows:

Sibb Mibb Dob Lab Reb Sib Mib Do La Re Si Mi Do# La# Re# Si# Mi#
d2 dd5 d3 d6 d4 m2 d5 m3 P1 P4 M2 P5 M3 A1 A4 A2 A5

Modes

The mode names are based on the modes of the diatonic scale , in order of size:

Mode Scale UDP Interval type
name pattern notation 2nd 3rd 4th 5th
Hindu LLsLs 4|0 M M P P
Minor LsLLs 3|1 M m P P
Half diminished LsLsL 2|2 M m P d
Diminished sLLsL 1|3 m m P d
Altered sLsLL 0|4 m m d d

Temperaments

The most basic rank-2 temperament interpretation of this diatonic is Aeolianic, which has septimal 6:7:9 or pental 10:12:15 chords spelled root-(p-1g)-(3g) (p = the minor sixth, g = the approximate 4/3). The name "Aeolianic" comes from the Aeolian minor mode having the minor sixth as its characteristic interval.

Aeolianic-Meantone

Subgroup: 8/5.4/3.3/2

Comma list: 81/80

POL2 generator: ~6/5 = 308.3057

Mapping: [1 1 2], 0 -1 -3]]

Optimal ET sequence: 5ed8/5, 8ed8/5, 13ed8/5

Aeolianic-Superpyth

Subgroup: 14/9.4/3.3/2

Comma list: 64/63

POL2 generator: ~7/6 = 276.0795

Mapping: [1 1 2], 0 -1 -3]]

Optimal ET sequence: 3ed14/9, 11ed14/9, 14ed14/9

Scale tree

The spectrum looks like this:

Generator

(bright)

Normalised L s L/s Comments
3\5 514.286 1 1 1.000 Equalised
17\28 510 6 5 1.200
14\23 509.09 5 4 1.250
25\41 508.475 9 7 1.286
36\59 508.235 13 10 1.300
11\18 507.692 4 3 1.333
30\49 507.062 11 8 1.375
19\31 506.6 7 5 1.400
27\44 506.25 10 7 1.429
35\57 506.024 13 9 1.444
43\70 505.882 16 11 1.4545
51\83 505.785 19 13 1.4615
8\13 505.263 3 2 1.500 Aeolianic-Meantone starts here
45\73 504.673 17 11 1.5455
37\60 504.54 14 9 1.556
29\47 504.348 11 7 1.571
21\34 504 8 5 1.600
47\76 503.571 18 11 1.636
13\21 503.226 5 3 1.667
49\79 502.564 19 11 1.727
18\29 502.326 7 4 1.750
23\37 501.81 9 5 1.800
28\45 501.492 11 6 1.833
33\53 501.265 13 7 1.857
38\61 501.09 15 8 1.875
43\69 500.971 17 9 1.889
5\8 500 2 1 2.000 Aeolianic-Meantone ends, Aeolianic-Pythagorean begins
42\67 499.01 17 8 2.125
37\59 498.876 15 7 2.143
32\51 498.701 13 6 2.167
27\43 498.461 11 5 2.200
22\35 498.113 9 4 2.250
17\27 497.561 7 3 2.333
41\65 496.96 17 7 2.429
12\19 496.552 5 2 2.500
19\30 495.652 8 3 2.667
26\41 495.238 11 4 2.750
33\52 495 14 5 2.800
40\63 494.536 17 6 2.833
47\74 494.737 20 7 2.857
54\85 [[1]] 23 8 2.875
61\96 494.594 26 9 2.889
7\11 494.118 3 1 3.000 Aeolianic-Pythagorean ends, Aeolianic-Superpyth begins
65\102 493.671 28 9 3.111
58\91 493.617 25 8 3.125
51\80 493.548 22 7 3.143
44\69 493.458 19 6 3.167
37\58 493.3 16 5 3.200
30\47 493.151 13 4 3.250
23\36 492.857 10 3 3.333
16\25 492.308 7 2 3.500
25\39 491.803 11 3 3.667
34\53 491.566 15 4 3.750
43\67 491.429 19 5 3.800
52\81 491.339 23 6 3.833
61\95 491.275 27 7 3.857
9\14 490.90 4 1 4.000
47\73 490.435 21 5 4.200
38\59 490.323 17 4 4.250
29\45 490.141 13 3 4.333
20\31 489.795 9 2 4.500
31\48 489.474 14 3 4.667
42\65 489.32 19 4 4.750
11\17 488.8 5 1 5.000 Aeolianic-Superpyth ends
35\54 488.372 16 3 5.333
24\37 488.136 11 2 5.500
37\57 487.912 17 3 5.667
13\20 487.5 6 1 6.000
2\3 480 1 0 → inf Paucitonic

See also

3L 2s (14/9-equivalent) - idealized Archytas tuning

3L 2s (8/5-equivalent) - idealized Meantone tuning