3L 2s (3/2-equivalent)
3L 2s<3/2> (sometimes called uranian), is a fifth-repeating MOS scale. The notation "<3/2>" means the period of the MOS is 3/2, disambiguating it from octave-repeating 3L 2s. The name of the period interval is called the sesquitave (by analogy to the tritave). It is a warped diatonic scale because it has one extra small step compared to diatonic (3L 1s (fifth-equivalent)): for example, the Ionian diatonic fifth LLsL can be distorted to the Oberonan mode LsLLs.
| ↖ 2L 1s⟨3/2⟩ | ↑ 3L 1s⟨3/2⟩ | 4L 1s⟨3/2⟩ ↗ |
| ← 2L 2s⟨3/2⟩ | 3L 2s (3/2-equivalent) | 4L 2s⟨3/2⟩ → |
| ↙ 2L 3s⟨3/2⟩ | ↓ 3L 3s⟨3/2⟩ | 4L 3s⟨3/2⟩ ↘ |
sLsLL
The generator range is 234 to 280.8 cents, placing it in between the diatonic major second and the diatonic minor third, usually representing a subminor third of some type (like 7/6). The bright (chroma-positive) generator is, however, its fifth complement (468 to 421.2 cents).
Because uranian is a fifth-repeating scale, each tone has a 3/2 perfect fifth above it. The scale has three major chords and two minor chords, all voiced so that the third of the triad is an octave higher, a tenth. Uranian also has two harmonic 7th chords.
Basic uranian is in 8edf, which is a very good fifth-based equal tuning similar to 88cET.
Notation
There are 2 main ways to notate the uranian scale. One method uses a simple sesquitave (fifth) repeating notation consisting of 5 naturals (A-E). Given that 1-7/4-5/2 is fifth-equivalent to a tone cluster of 1-10/9-7/6, it may be more convenient to notate uranian scales as repeating at the double sesquitave (major ninth), however it does make navigating the genchain harder. This way, 7/4 is its own pitch class, distinct from 7/6. Notating this way produces a major ninth which is the Aeolian mode of Annapolis[6L 4s]. Since there are exactly 10 naturals in double sesquitave notation, Greek numerals 1-10 may be used.
| Notation | Supersoft | Soft | Semisoft | Basic | Semihard | Hard | Superhard | |
|---|---|---|---|---|---|---|---|---|
| Uranian | Annapolis | 18edf | 13edf | 21edf | 8edf | 19edf | 11edf | 14edf |
| A# | Α# | 1\18
38.9975 |
1\13
53.9965 |
2\21
66.8529 |
1\8
87.7444 |
3\19
110.835 |
2\11
[[1]] |
3\14
[[2]] |
| Bb | Βb | 3\18
[[3]] |
2\13
[[4]] |
3\21
[[5]] |
2\19
73.89 |
1\11
63.814 |
1\14
50.1396 | |
| B | Β | 4\18
155.99 |
3\13
[[6]] |
5\21
[[7]] |
2\8
175.48875 |
5\19
184.725 |
3\11
[[8]] |
4\14
[[9]] |
| B# | Β# | 5\18
[[10]] |
4\13
[[11]] |
7\21
233.985 |
3\8
[[12]] |
8\19
295.56 |
5\11
319.07045 |
7\14
[[13]] |
| Cb | Γb | 6\18
233.985 |
6\21
[[14]] |
2\8
175.48875 |
4\19
147.78 |
2\11
[[15]] |
2\14
[[16]] | |
| C | Γ | 7\18
[[17]] |
5\13
[[18]] |
8\21
[[19]] |
3\8
[[20]] |
7\19
258.615 |
4\11
[[21]] |
5\14
[[22]] |
| C# | Γ# | 8\18
311.98 |
6\13
[[23]] |
10\21
[[24]] |
4\8
[[25]] |
9\19
332.505 |
6\11
382.88455 |
8\14
[[26]] |
| Db | Δb | 10\18
389.975 |
7\13
[[27]] |
11\21
[[28]] |
10\19
369.45 |
5\11
319.07045 |
6\14
[[29]] | |
| D | Δ | 11\18
[[30]] |
8\13
[[31]] |
13\21
[[32]] |
5\8
[[33]] |
12\19
470.285 |
7\11
[[34]] |
9\14
[[35]] |
| D# | Δ# | 12\18
467.97 |
9\13
[[36]] |
15\21
[[37]] |
6\8
526.46625 |
15\19
554.175 |
9\11
[[38]] |
12\14
[[39]] |
| Eb | Εb | 14\18
545.965 |
10\13
[[40]] |
16\21
[[41]] |
14\19
516.23 |
8\11
[[42]] |
10\14
[[43]] | |
| E | Ε | 15\18
[[44]] |
11\13
[[45]] |
18\21
[[46]] |
7\8
[[47]] |
17\19
628.065 |
10\11
[[48]] |
13\14
[[49]] |
| E# | Ε# | 16\18
622.96 |
12\13
[[50]] |
20\21
[[51]] |
8\8
701.955 |
20\19
738.9 |
12\11
765.769 |
16\14
[[52]] |
| Ab | Ϛb/Ϝb | 17\18
[[53]] |
19\21
[[54]] |
7\8
[[55]] |
16\19
591.12 |
9\11
[[56]] |
11\14
551.636 | |
| A | Ϛ/Ϝ | 701.955 | ||||||
| A# | Ϛ#/Ϝ# | 19\18
[[57]] |
14\13
[[58]] |
23\21
[[59]] |
9\8
[[60]] |
22\19
812.79 |
13\11
[[61]] |
17\14
[[62]] |
| Bb | Ζb | 21\18
[[63]] |
15\13
[[64]] |
24\21
[[65]] |
21\19
775.845 |
12\11
765.769 |
15\14
[[66]] | |
| B | Ζ | 22\18
857.945 |
16\13
[[67]] |
26\21
[[68]] |
10\8
877.44375 |
24\19
886.68 |
14\11
[[69]] |
18\14
[[70]] |
| B# | Ζ# | 23\18
[[71]] |
17\13
[[72]] |
28\21
[[73]] |
11\8
[[74]] |
27\19
997.515 |
16\11
1021.02545 |
21\14
1052.9235 |
| Cb | Ηb | 24\18
935.94 |
27\21
[[75]] |
10\8
877.44375 |
23\19
849.753 |
13\11
[[76]] |
16\14
[[77]] | |
| C | Η | 25\18
[[78]] |
18\13
[[79]] |
29\21
[[80]] |
11\8
[[81]] |
26\19
960.57 |
15\11
[[82]] |
19\14
[[83]] |
| C# | Η# | 26\18
1012.935 |
19\13
1025.9342 |
31\21
1036.2193 |
12\8
1052.9235 |
29\19
1071.405 |
17\11
1084.83955 |
22\14
1103.0721 |
| Db | Θb | 28\18
1091.93 |
20\13
1079.9308 |
32\21
1069.9157 |
28\19
1034.46 |
16\11
1021.02545 |
20\14
1002.7929 | |
| D | Θ | 29\18
1130.9275 |
21\13
1133.9273 |
34\21
1136.4986 |
13\8
1140.7769 |
31\19
1145.295 |
18\11
1148.6536 |
23\14
1153.2118 |
| D# | Θ# | 30\18
1169.925 |
22\13
1187.9238 |
36\21
1203.3514 |
14\8
1228.42125 |
34\19
1256.13 |
20\11
1276.2818 |
26\14
1303.6307 |
| Eb | Ιb | 32\18
1247.92 |
23\13
1241.9203 |
37\21
1236.7779 |
33\19
1218.285 |
19\11
1212.5678 |
24\14
1203.3514 | |
| E | Ι | 33\18
1286.9175 |
24\13
1295.9169 |
39\21
1303.6307 |
15\8
1316.1656 |
36\19
1330.02 |
21\11
1340.0959 |
27\14
1353.8704 |
| E# | Ι# | 34\18
1323.915 |
25\13
1348.9135 |
41\21
1370.4836 |
16\8
1403.91 |
39\19
1440.855 |
23\11
1468.724 |
30\14
1504.1892 |
| Ab | Αb | 35\18
1364.9125 |
40\21
1337.0571 |
15\8
1316.1656 |
35\19
1293.075 |
20\11
1276.2818 |
25\14
1253.591 | |
| A | Α | 1403.91 | ||||||
Intervals
| Generators | Sesquitave notation | Interval category name | Generators | Notation of 3/2 inverse | Interval category name |
|---|---|---|---|---|---|
| The 5-note MOS has the following intervals (from some root): | |||||
| 0 | A | perfect unison | 0 | A | sesquitave (just fifth) |
| 1 | C | perfect mosthird (min third) | -1 | D | perfect mosfourth (maj third) |
| 2 | Eb | minor mosfifth | -2 | B | major mossecond |
| 3 | Bb | minor mossecond | -3 | E | major mosfifth |
| 4 | Db | diminished mosfourth | -4 | C# | augmented mosthird |
| The chromatic 8-note MOS also has the following intervals (from some root): | |||||
| 5 | Ab | diminished sesquitave | -5 | A# | augmented unison (chroma) |
| 6 | Cb | diminished mosthird | -6 | D# | augmented mosfourth |
| 7 | Ebb | diminished mosfifth | -7 | B# | augmented mossecond |
Genchain
The generator chain for this scale is as follows:
| Bbb | Ebb | Cb | Ab | Db | Bb | Eb | C | A | D | B | E | C# | A# | D# | B# | E# |
| d2 | d5 | d3 | d6 | d4 | m2 | m5 | P3 | P1 | P4 | M2 | M5 | A3 | A1 | A4 | A2 | A5 |
Modes
The mode names are based on the major satellites of Uranus, in order of size:
| Mode | Scale | UDP | Interval type (mos-) | |||
|---|---|---|---|---|---|---|
| name | pattern | notation | 2nd | 3rd | 4th | 5th |
| Titanian | LLsLs | 4|0 | M | A | P | M |
| Oberonan | LsLLs | 3|1 | M | P | P | M |
| Umbrielan | LsLsL | 2|2 | M | P | P | m |
| Arielan | sLLsL | 1|3 | m | P | P | m |
| Mirandan | sLsLL | 0|4 | m | P | d | m |
Temperaments
The most basic rank-2 temperament interpretation of uranian is semiwolf, which has 4:7:10 chords spelled root-(p+1g)-(3p-2g) (p = 3/2, g = the approximate 7/6). The name "semiwolf" comes from two 7/6 generators approximating a 27/20 wolf fourth. This is further extended to the 11-limit in two interpretations: semilupine where 2 major mos2nds (LL) equal 11/9, and hemilycan where 1 major and 2 minor mos2nds (sLs) equal 11/9. Basic 8edf fits both extensions.
Semiwolf
Subgroup: 3/2.7/4.5/2
Mapping: [⟨1 1 3], ⟨0 1 -2]]
Semilupine
Subgroup: 3/2.7/4.5/2.11/4
Mapping: [⟨1 1 3 4], ⟨0 1 -2 -4]]
Hemilycan
Subgroup: 3/2.7/4.5/2.11/4
Mapping: [⟨1 1 3 1], ⟨0 1 -2 4]]
Scale tree
The spectrum looks like this:
| Generator
(bright) |
Cents | L | s | L/s | Comments | ||||||
|---|---|---|---|---|---|---|---|---|---|---|---|
| Chroma-positive | Chroma-negative | ||||||||||
| 3\5 | 421.173 | 280.782 | 1 | 1 | 1.000 | Equalised | |||||
| 11\18 | 428.973 | 272.983 | 4 | 3 | 1.333 | ||||||
| 30\49 | 429.768 | 272.187 | 11 | 8 | 1.375 | ||||||
| 19\31 | [[87]] | [[88]] | 7 | 5 | 1.400 | ||||||
| 8\13 | 431.972 | 269.983 | 3 | 2 | 1.500 | Semiwolf and Semilupine start here | |||||
| 37\60 | 432.872 | 269.083 | 14 | 9 | 1.556 | ||||||
| 29\47 | 433.121 | 268.834 | 11 | 7 | 1.571 | ||||||
| 21\34 | 433.56 | 268.395 | 8 | 5 | 1.600 | ||||||
| 34\55 | 433.935 | 268.02 | 13 | 8 | 1.625 | ||||||
| 13\21 | 435.084 | 266.871 | 5 | 3 | 1.667 | ||||||
| 18\29 | 435.696 | 266.259 | 7 | 4 | 1.750 | ||||||
| 23\37 | 436.35 | 265.605 | 9 | 5 | 1.800 | ||||||
| 28\45 | 436.772 | 265.183 | 11 | 6 | 1.833 | ||||||
| 33\53 | 437.066 | 264.889 | 13 | 7 | 1.857 | ||||||
| 5\8 | 438.722 | 263.233 | 2 | 1 | 2.000 | Semilupine ends, Hemilycan begins | |||||
| 47\75 | 439.892 | 262.063 | 19 | 9 | 2.111 | ||||||
| 42\67 | 440.031 | 261.924 | 17 | 8 | 2.125 | ||||||
| 37\59 | 440.209 | 261.746 | 15 | 7 | 2.143 | ||||||
| 32\51 | 440.442 | 261.513 | 13 | 6 | 2.167 | ||||||
| 27\43 | 440.762 | 261.193 | 11 | 5 | 2.200 | ||||||
| 22\35 | 441.229 | 260.726 | 9 | 4 | 2.250 | ||||||
| 17\27 | 441.972 | 259.973 | 7 | 3 | 2.333 | ||||||
| 29\46 | 442.537 | 259.418 | 12 | 5 | 2.400 | ||||||
| 12\19 | 443.34 | 258.615 | 5 | 2 | 2.500 | ||||||
| 19\30 | [[89]] | [[90]] | 8 | 3 | 2.667 | ||||||
| 26\41 | 445.142 | 256.813 | 11 | 4 | 2.750 | ||||||
| 7\11 | 446.699 | 255.256 | 3 | 1 | 3.000 | Semiwolf and Hemilycan end here | |||||
| 37\58 | 447.799 | 254.156 | 16 | 5 | 3.200 | ||||||
| 30\47 | 448,056 | 253.899 | 13 | 4 | 3.250 | ||||||
| 23\36 | 448.471 | 253.484 | 10 | 3 | 3.333 | ||||||
| 16\25 | 449.251 | 252.704 | 7 | 2 | 3.500 | ||||||
| 25\39 | 449.971 | 251.984 | 11 | 3 | 3.667 | ||||||
| 34\53 | 450.311 | 251.644 | 15 | 4 | 3.750 | ||||||
| 9\14 | 451.257 | 250.698 | 4 | 1 | 4.000 | Near 24edo | |||||
| 2\3 | 467.97 | 233.985 | 1 | 0 | → inf | Paucitonic | |||||