User:Moremajorthanmajor/2L 1s (perfect fourth-equivalent): Difference between revisions

'''2L 1s<fourth>''', is a fourth-repeating MOS scale. The notation "<fourth>" means the period of the MOS is a fourth, disambiguating it from octave-repeating [[2L 1s]].

In the fourth-repeating version of the diatonic scale, each tone has a 4/3 perfect fourth above it. The scale has one major chord and two minor chords.  

There are 4 main ways to notate this scale. One method uses a simple fourth repeating notation consisting of 3 naturals (eg. Do Re Mi, Sol La Si). Given that 1-5/4-3/2 is fourth-equivalent to a tone cluster of 1-9/8-5/4, it may be more convenient to notate diatonic scales as repeating at the double, triple, quadruple or quintuple fourth (minor seventh, tenth, thirteenth or sixteenth), however it does make navigating the [[Generator|genchain]] harder. This way, 3/2 is its own pitch class, distinct from 9/8. Notating this way produces a minor tenth which is the Dorian mode of Middletown[6L 3s], also known as the Mahur scale in Persian/Arabic music, a minor thirteenth which is the Aeolian mode of Bijou[8L 4s] or a minor sixteenth which is the Phrygian mode of Hyperionic. Since there are exactly 9 naturals in triple fourth notation, 12 in quadruple fourth and 15 in quintuple fourth notation, letters A-G plus J, Q or Q, S (GJABCQDEF or GABCQDSEF, flats written F molle) or dozenal or hex digits (0123456789XE0 or E1234567GABDE with flats written D molle or 123456789ABCDEF1 with flats written F molle) may be used.

|+Cents<ref name=":05">Fractions repeating more than 4 digits written as continued fractions</ref>

! colspan="5" |Notation

! colspan="2" |Diatonic

! rowspan="2" |Mahur

! rowspan="2" |Bijou

! rowspan="2" |Hyperionic

! rowspan="2" |~11ed4/3

! rowspan="2" |~8ed4/3

! rowspan="2" |~13ed4/3

! rowspan="2" |~5ed4/3

! rowspan="2" |~12ed4/3

! rowspan="2" |~7ed4\3

! rowspan="2" |~9ed4/3

!Fourth

!Seventh

|1\11

46; 6.5

|1\8

63; 6.{{Overline|3}}

|2\13

77; 2, 2.6

| rowspan="2" |1\5

100

|3\12

124; 7.25

|2\7

141; 5.{{Overline|6}}

|3\9

163.{{Overline|63}}

|3\11

138; 3.25

|2\8

126; 3.1{{Overline|6}}

|3\13

116; 7.75

|2\12

82; 1.3{{Overline|18}}

|1\7

70; 1.7

|1\9

54.{{Overline|54}}

|'''4\11'''

'''184; 1.625'''

|'''3\8'''

'''189; 2.{{Overline|1}}'''

|'''5\13'''

'''193; 1, 1, 4.{{Overline|6}}'''

|'''2\5'''

'''200'''

|'''5\12'''

'''206; 1, 8.{{Overline|6}}'''

|'''3\7'''

'''211; 1, 3.25'''

|'''4\9'''

'''218.{{Overline|18}}'''

|5\11

230; 1.3

|4\8

252; 1.58{{Overline|3}}

|7\13

270; 1.0{{Overline|3}}

| rowspan="2" |'''3\5'''

'''300'''

|8\12

331; 29

|5\7

352; 1.0625

|7\9

381.{{Overline|81}}

|'''7\11'''

'''323; 13'''

|'''5\8'''

'''315; 1.2{{Overline|6}}'''

|'''8\13'''

'''309; 1, 2.1'''

|'''7\12'''

'''289; 1, 1.9'''

|'''4\7'''

'''282; 2.8{{Overline|3}}'''

|'''5\9'''

'''272.{{Overline|72}}'''

|8\11

369; 4.{{Overline|3}}

|6\8

378; 1.0{{Overline|5}}

|10\13

387; 10.{{Overline|3}}

|4\5

400

|10\12

413; 1, 3.8{{Overline|3}}

|6\7

423; 1.{{Overline|8}}

|8\9

436.{{Overline|36}}

|9\11

415; 2.6

| rowspan="2" |7\8

442; 9.5

|12\13

464; 1.9375

|5\5

500

|13\12

537; 14.5

|8\7

564; 1.41{{Overline|6}}

|11\9

600

|10\11

461; 1, 1.1{{Overline|6}}

|11\13

425; 1.24

|4\5

400

|9\12

372; 2.41{{Overline|6}}

|5\7

352; 1.0625

|6\9

327.{{Overline|27}}

!'''11\11'''

'''507; 1.{{Overline|4}}'''

!'''8\8'''

'''505; 3.8'''

!'''13\13'''

'''503; 4, 2.{{Overline|3}}'''

!'''5\5'''

'''500'''

!'''12\12'''

'''496; 1.8125'''

!'''7\7'''

'''494; 8.5'''

!'''9\9'''

'''490.{{Overline|90}}'''

|12\11

553; 1.{{Overline|18}}

|9\8

568; 2.375

|15\13

580; 1.55

| rowspan="2" |6\5

600

|15\12

620; 1.45

|9\7

635; 3.4

|12\9

654.{{Overline|54}}

|14\11

646; 6.5

|10\8

631; 1.{{Overline|72}}

|16\13

619; 2.{{Overline|81}}

|14\12

579; 3.{{Overline|2}}

|8\7

564; 1.41{{Overline|6}}

|10\9

545.{{Overline|45}}

|'''15\11'''

'''692; 3.25'''

|'''11\8'''

'''694; 1, 2.8'''

|'''18\13'''

'''696; 1.291{{Overline|6}}'''

|'''7\5'''

'''700'''

|'''17\12'''

'''703; 2, 2.1{{Overline|6}}'''

|'''10\7'''

'''705; 1.1{{Overline|3}}'''

|'''13\9'''

'''709.{{Overline|09}}'''

|16\11

738; 2.1{{Overline|6}}

|12\8

757; 1, 8.5

|20\13

774; 5.1{{Overline|6}}

| rowspan="2" |'''8\5'''

'''800'''

|20\12

827; 1, 1.41{{Overline|6}}

|12\7

847; 17

|16\9

872.{{Overline|72}}

|'''18\11'''

'''830; 1.3'''

|'''13\8'''

'''821; 19'''

|'''21\13'''

'''812; 1, 9.{{Overline|3}}'''

|'''19\12'''

'''786; 4.8{{Overline|3}}'''

|'''11\7'''

'''776; 2.125'''

|'''14\9'''

'''763.{{Overline|63}}'''

|19\11

876; 1.08{{Overline|3}}

|14\8

884; 4.75

|23\13

890; 3.1

|9\5

900

|22\12

910; 2.9

|13\7

917; 1.{{Overline|54}}

|17\9

927.{{Overline|27}}

|20\11

923: 13

| rowspan="2" |15\8

947; 2, 1.4

|25\13

967; 1, 2.875

|10\5

1000

|25\12

1034; 2, 14

|15\7

1058; 1, 4.{{Overline|6}}

|20\9

1090.{{Overline|90}}

|21\11

969; 4.{{Overline|3}}

|24\13

929; 31

|9\5

900

|21\12

868; 1, 28

|11\7

776; 2.125

|15\9

818.{{Overline|18}}

!22\11

1015; 2.6

!16\8

1010; 1.9

!26\13

1006; 2, 4.{{Overline|6}}

!10\5

1000

!24\12

993; 9.{{Overline|6}}

!14\7

988; 4.25

!18\9

981.{{Overline|81}}

|23\11

1061; 1, 1.1{{Overline|6}}

|17\8

1073; 1, 2.1{{Overline|6}}

|28\13

1083; 1.{{Overline|148}}

| rowspan="2" |11\5

|27\12

1117; 4, 7

|16\7

1129; 2, 2.{{Overline|3}}

|24\9

1309.{{Overline|09}}