22L 1s

← 21L 1s 22L 1s 23L 1s →

↙ 21L 2s ↓ 22L 2s 23L 2s ↘
	Scale structure
Step pattern	LLLLLLLLLLLLLLLLLLLLLLs; sLLLLLLLLLLLLLLLLLLLLLL
Equave	2/1 (1200.0 ¢)
Period	2/1 (1200.0 ¢)
	Generator size
Bright	1\23 to 1\22 (52.2 ¢ to 54.5 ¢)
Dark	21\22 to 22\23 (1145.5 ¢ to 1147.8 ¢)
	TAMNAMS information
Related to	1L 9s (antisinatonic)
With tunings	13:1 to 14:1
	Related MOS scales
Parent	1L 21s
Sister	1L 22s
Daughters	23L 22s, 22L 23s
Neutralized	21L 2s
2-Flought	45L 1s, 22L 24s
	Equal tunings
Equalized (L:s = 1:1)	1\23 (52.2 ¢)
Supersoft (L:s = 4:3)	4\91 (52.7 ¢)
Soft (L:s = 3:2)	3\68 (52.9 ¢)
Semisoft (L:s = 5:3)	5\113 (53.1 ¢)
Basic (L:s = 2:1)	2\45 (53.3 ¢)
Semihard (L:s = 5:2)	5\112 (53.6 ¢)
Hard (L:s = 3:1)	3\67 (53.7 ¢)
Superhard (L:s = 4:1)	4\89 (53.9 ¢)
Collapsed (L:s = 1:0)	1\22 (54.5 ¢)
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22L 1s is a 2/1-equivalent (octave-equivalent) moment of symmetry scale containing 22 large steps and 1 small step, repeating every octave. 22L 1s is related to 1L 9s, expanding it by 13 tones. Generators that produce this scale range from 52.2 ¢ to 54.5 ¢, or from 1145.5 ¢ to 1147.8 ¢. Scales of this form are always proper because there is only one small step. This scale is produced by stacking the interval of 33/32 (around 53 ¢).

The name quartismoid is proposed for this pattern since its harmonic entropy minimum corresponds to tempering out the quartisma—five 33/32s being equated with 7/6. In addition, both 22edo and 23edo, extreme ranges of the MOS temper out the quartisma, as well as a large portion of EDOs up to 100-200 which have this scale.

Tuning ranges

Mavila fifth and 91edo (Ultrasoft and supersoft)

Between 4\91 and 1\23, 13 steps amount to a pelog / mavila fifth, which corresponds to the ultrasoft step ratio range. In 91edo, the fifth produced by 13 steps of the quartismoid scale is the same as 4 steps of 7edo, and thus is the exact boundary between mavila and diatonic.

Diatonic fifth (hard of supersoft)

From 1\22 to 4\91, 13 steps amount to a diatonic fifth.

If the pure 33/32 is used as a generator, the resulting fifth is 692.54826 ¢, which puts it in the category around flattone.

700-cent, just, and superpyth fifths (step ratio 7:2 and harder)

In 156edo, the fifth becomes the 12edo 700 ¢ fifth. In 200edo, the fifth comes incredibly close to just, as the number 200 is a semiconvergent denominator to the approximation of log2(3/2).

When the step ratio is greater than 4.472, then 13 generators amount to a superpyth fifth and the tuning approaches 22edo.

Relation to other equal divisions

6 steps act as a pseudo-6/5, and when they actually act as 6/5 along with 5 steps being equal to 7/6, 385/384 is tempered out. If one were to instead tune in favour of 6/5 instead of 7/6, the resulting hardness would be around 1.233. 114edo and 137edo represent this the best.

Scale properties

This article uses TAMNAMS conventions for the names of this scale's intervals and scale degrees. The use of 1-indexed ordinal names is reserved for interval regions.

Intervals

Intervals of 22L 1s
Intervals			Steps subtended	Range in cents
Generic	Specific	Abbrev.	Steps subtended	Range in cents
0-mosstep	Perfect 0-mosstep	P0ms	0	0.0 ¢
1-mosstep	Diminished 1-mosstep	d1ms	s	0.0 ¢ to 52.2 ¢
1-mosstep	Perfect 1-mosstep	P1ms	L	52.2 ¢ to 54.5 ¢
2-mosstep	Minor 2-mosstep	m2ms	L + s	54.5 ¢ to 104.3 ¢
2-mosstep	Major 2-mosstep	M2ms	2L	104.3 ¢ to 109.1 ¢
3-mosstep	Minor 3-mosstep	m3ms	2L + s	109.1 ¢ to 156.5 ¢
3-mosstep	Major 3-mosstep	M3ms	3L	156.5 ¢ to 163.6 ¢
4-mosstep	Minor 4-mosstep	m4ms	3L + s	163.6 ¢ to 208.7 ¢
4-mosstep	Major 4-mosstep	M4ms	4L	208.7 ¢ to 218.2 ¢
5-mosstep	Minor 5-mosstep	m5ms	4L + s	218.2 ¢ to 260.9 ¢
5-mosstep	Major 5-mosstep	M5ms	5L	260.9 ¢ to 272.7 ¢
6-mosstep	Minor 6-mosstep	m6ms	5L + s	272.7 ¢ to 313.0 ¢
6-mosstep	Major 6-mosstep	M6ms	6L	313.0 ¢ to 327.3 ¢
7-mosstep	Minor 7-mosstep	m7ms	6L + s	327.3 ¢ to 365.2 ¢
7-mosstep	Major 7-mosstep	M7ms	7L	365.2 ¢ to 381.8 ¢
8-mosstep	Minor 8-mosstep	m8ms	7L + s	381.8 ¢ to 417.4 ¢
8-mosstep	Major 8-mosstep	M8ms	8L	417.4 ¢ to 436.4 ¢
9-mosstep	Minor 9-mosstep	m9ms	8L + s	436.4 ¢ to 469.6 ¢
9-mosstep	Major 9-mosstep	M9ms	9L	469.6 ¢ to 490.9 ¢
10-mosstep	Minor 10-mosstep	m10ms	9L + s	490.9 ¢ to 521.7 ¢
10-mosstep	Major 10-mosstep	M10ms	10L	521.7 ¢ to 545.5 ¢
11-mosstep	Minor 11-mosstep	m11ms	10L + s	545.5 ¢ to 573.9 ¢
11-mosstep	Major 11-mosstep	M11ms	11L	573.9 ¢ to 600.0 ¢
12-mosstep	Minor 12-mosstep	m12ms	11L + s	600.0 ¢ to 626.1 ¢
12-mosstep	Major 12-mosstep	M12ms	12L	626.1 ¢ to 654.5 ¢
13-mosstep	Minor 13-mosstep	m13ms	12L + s	654.5 ¢ to 678.3 ¢
13-mosstep	Major 13-mosstep	M13ms	13L	678.3 ¢ to 709.1 ¢
14-mosstep	Minor 14-mosstep	m14ms	13L + s	709.1 ¢ to 730.4 ¢
14-mosstep	Major 14-mosstep	M14ms	14L	730.4 ¢ to 763.6 ¢
15-mosstep	Minor 15-mosstep	m15ms	14L + s	763.6 ¢ to 782.6 ¢
15-mosstep	Major 15-mosstep	M15ms	15L	782.6 ¢ to 818.2 ¢
16-mosstep	Minor 16-mosstep	m16ms	15L + s	818.2 ¢ to 834.8 ¢
16-mosstep	Major 16-mosstep	M16ms	16L	834.8 ¢ to 872.7 ¢
17-mosstep	Minor 17-mosstep	m17ms	16L + s	872.7 ¢ to 887.0 ¢
17-mosstep	Major 17-mosstep	M17ms	17L	887.0 ¢ to 927.3 ¢
18-mosstep	Minor 18-mosstep	m18ms	17L + s	927.3 ¢ to 939.1 ¢
18-mosstep	Major 18-mosstep	M18ms	18L	939.1 ¢ to 981.8 ¢
19-mosstep	Minor 19-mosstep	m19ms	18L + s	981.8 ¢ to 991.3 ¢
19-mosstep	Major 19-mosstep	M19ms	19L	991.3 ¢ to 1036.4 ¢
20-mosstep	Minor 20-mosstep	m20ms	19L + s	1036.4 ¢ to 1043.5 ¢
20-mosstep	Major 20-mosstep	M20ms	20L	1043.5 ¢ to 1090.9 ¢
21-mosstep	Minor 21-mosstep	m21ms	20L + s	1090.9 ¢ to 1095.7 ¢
21-mosstep	Major 21-mosstep	M21ms	21L	1095.7 ¢ to 1145.5 ¢
22-mosstep	Perfect 22-mosstep	P22ms	21L + s	1145.5 ¢ to 1147.8 ¢
22-mosstep	Augmented 22-mosstep	A22ms	22L	1147.8 ¢ to 1200.0 ¢
23-mosstep	Perfect 23-mosstep	P23ms	22L + s	1200.0 ¢

Generator chain

Generator chain of 22L 1s
Bright gens	Scale degree	Abbrev.
44	Augmented 21-mosdegree	A21md
43	Augmented 20-mosdegree	A20md
42	Augmented 19-mosdegree	A19md
41	Augmented 18-mosdegree	A18md
40	Augmented 17-mosdegree	A17md
39	Augmented 16-mosdegree	A16md
38	Augmented 15-mosdegree	A15md
37	Augmented 14-mosdegree	A14md
36	Augmented 13-mosdegree	A13md
35	Augmented 12-mosdegree	A12md
34	Augmented 11-mosdegree	A11md
33	Augmented 10-mosdegree	A10md
32	Augmented 9-mosdegree	A9md
31	Augmented 8-mosdegree	A8md
30	Augmented 7-mosdegree	A7md
29	Augmented 6-mosdegree	A6md
28	Augmented 5-mosdegree	A5md
27	Augmented 4-mosdegree	A4md
26	Augmented 3-mosdegree	A3md
25	Augmented 2-mosdegree	A2md
24	Augmented 1-mosdegree	A1md
23	Augmented 0-mosdegree	A0md
22	Augmented 22-mosdegree	A22md
21	Major 21-mosdegree	M21md
20	Major 20-mosdegree	M20md
19	Major 19-mosdegree	M19md
18	Major 18-mosdegree	M18md
17	Major 17-mosdegree	M17md
16	Major 16-mosdegree	M16md
15	Major 15-mosdegree	M15md
14	Major 14-mosdegree	M14md
13	Major 13-mosdegree	M13md
12	Major 12-mosdegree	M12md
11	Major 11-mosdegree	M11md
10	Major 10-mosdegree	M10md
9	Major 9-mosdegree	M9md
8	Major 8-mosdegree	M8md
7	Major 7-mosdegree	M7md
6	Major 6-mosdegree	M6md
5	Major 5-mosdegree	M5md
4	Major 4-mosdegree	M4md
3	Major 3-mosdegree	M3md
2	Major 2-mosdegree	M2md
1	Perfect 1-mosdegree	P1md
0	Perfect 0-mosdegree Perfect 23-mosdegree	P0md P23md
−1	Perfect 22-mosdegree	P22md
−2	Minor 21-mosdegree	m21md
−3	Minor 20-mosdegree	m20md
−4	Minor 19-mosdegree	m19md
−5	Minor 18-mosdegree	m18md
−6	Minor 17-mosdegree	m17md
−7	Minor 16-mosdegree	m16md
−8	Minor 15-mosdegree	m15md
−9	Minor 14-mosdegree	m14md
−10	Minor 13-mosdegree	m13md
−11	Minor 12-mosdegree	m12md
−12	Minor 11-mosdegree	m11md
−13	Minor 10-mosdegree	m10md
−14	Minor 9-mosdegree	m9md
−15	Minor 8-mosdegree	m8md
−16	Minor 7-mosdegree	m7md
−17	Minor 6-mosdegree	m6md
−18	Minor 5-mosdegree	m5md
−19	Minor 4-mosdegree	m4md
−20	Minor 3-mosdegree	m3md
−21	Minor 2-mosdegree	m2md
−22	Diminished 1-mosdegree	d1md
−23	Diminished 23-mosdegree	d23md
−24	Diminished 22-mosdegree	d22md
−25	Diminished 21-mosdegree	d21md
−26	Diminished 20-mosdegree	d20md
−27	Diminished 19-mosdegree	d19md
−28	Diminished 18-mosdegree	d18md
−29	Diminished 17-mosdegree	d17md
−30	Diminished 16-mosdegree	d16md
−31	Diminished 15-mosdegree	d15md
−32	Diminished 14-mosdegree	d14md
−33	Diminished 13-mosdegree	d13md
−34	Diminished 12-mosdegree	d12md
−35	Diminished 11-mosdegree	d11md
−36	Diminished 10-mosdegree	d10md
−37	Diminished 9-mosdegree	d9md
−38	Diminished 8-mosdegree	d8md
−39	Diminished 7-mosdegree	d7md
−40	Diminished 6-mosdegree	d6md
−41	Diminished 5-mosdegree	d5md
−42	Diminished 4-mosdegree	d4md
−43	Diminished 3-mosdegree	d3md
−44	Diminished 2-mosdegree	d2md

Modes

Scale degrees of the modes of 22L 1s
UDP	Cyclic order	Step pattern	Scale degree (mosdegree)
UDP	Cyclic order	Step pattern	0	1	2	3	4	5	6	7	8	9	10	11	12	13	14	15	16	17	18	19	20	21	22	23
22\|0	1	LLLLLLLLLLLLLLLLLLLLLLs	Perf.	Perf.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Aug.	Perf.
21\|1	2	LLLLLLLLLLLLLLLLLLLLLsL	Perf.	Perf.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Perf.	Perf.
20\|2	3	LLLLLLLLLLLLLLLLLLLLsLL	Perf.	Perf.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Min.	Perf.	Perf.
19\|3	4	LLLLLLLLLLLLLLLLLLLsLLL	Perf.	Perf.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Min.	Min.	Perf.	Perf.
18\|4	5	LLLLLLLLLLLLLLLLLLsLLLL	Perf.	Perf.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Min.	Min.	Min.	Perf.	Perf.
17\|5	6	LLLLLLLLLLLLLLLLLsLLLLL	Perf.	Perf.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Min.	Min.	Min.	Min.	Perf.	Perf.
16\|6	7	LLLLLLLLLLLLLLLLsLLLLLL	Perf.	Perf.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Min.	Min.	Min.	Min.	Min.	Perf.	Perf.
15\|7	8	LLLLLLLLLLLLLLLsLLLLLLL	Perf.	Perf.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Min.	Min.	Min.	Min.	Min.	Min.	Perf.	Perf.
14\|8	9	LLLLLLLLLLLLLLsLLLLLLLL	Perf.	Perf.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Perf.	Perf.
13\|9	10	LLLLLLLLLLLLLsLLLLLLLLL	Perf.	Perf.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Perf.	Perf.
12\|10	11	LLLLLLLLLLLLsLLLLLLLLLL	Perf.	Perf.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Perf.	Perf.
11\|11	12	LLLLLLLLLLLsLLLLLLLLLLL	Perf.	Perf.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Perf.	Perf.
10\|12	13	LLLLLLLLLLsLLLLLLLLLLLL	Perf.	Perf.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Perf.	Perf.
9\|13	14	LLLLLLLLLsLLLLLLLLLLLLL	Perf.	Perf.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Perf.	Perf.
8\|14	15	LLLLLLLLsLLLLLLLLLLLLLL	Perf.	Perf.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Perf.	Perf.
7\|15	16	LLLLLLLsLLLLLLLLLLLLLLL	Perf.	Perf.	Maj.	Maj.	Maj.	Maj.	Maj.	Maj.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Perf.	Perf.
6\|16	17	LLLLLLsLLLLLLLLLLLLLLLL	Perf.	Perf.	Maj.	Maj.	Maj.	Maj.	Maj.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Perf.	Perf.
5\|17	18	LLLLLsLLLLLLLLLLLLLLLLL	Perf.	Perf.	Maj.	Maj.	Maj.	Maj.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Perf.	Perf.
4\|18	19	LLLLsLLLLLLLLLLLLLLLLLL	Perf.	Perf.	Maj.	Maj.	Maj.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Perf.	Perf.
3\|19	20	LLLsLLLLLLLLLLLLLLLLLLL	Perf.	Perf.	Maj.	Maj.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Perf.	Perf.
2\|20	21	LLsLLLLLLLLLLLLLLLLLLLL	Perf.	Perf.	Maj.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Perf.	Perf.
1\|21	22	LsLLLLLLLLLLLLLLLLLLLLL	Perf.	Perf.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Perf.	Perf.
0\|22	23	sLLLLLLLLLLLLLLLLLLLLLL	Perf.	Dim.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Min.	Perf.	Perf.

Scale tree

Scale tree and tuning spectrum of 22L 1s
Generator^(edo)						Cents		Step ratio		Comments^{(always proper)}
Generator^(edo)						Bright	Dark	L:s	Hardness	Comments^{(always proper)}
1\23						52.174	1147.826	1:1	1.000	Equalized 22L 1s
					6\137	52.555	1147.445	6:5	1.200
				5\114		52.632	1147.368	5:4	1.250
					9\205	52.683	1147.317	9:7	1.286
			4\91			52.747	1147.253	4:3	1.333	Supersoft 22L 1s
					11\250	52.800	1147.200	11:8	1.375
				7\159		52.830	1147.170	7:5	1.400
					10\227	52.863	1147.137	10:7	1.429
		3\68				52.941	1147.059	3:2	1.500	Soft 22L 1s
					11\249	53.012	1146.988	11:7	1.571
				8\181		53.039	1146.961	8:5	1.600
					13\294	53.061	1146.939	13:8	1.625
			5\113			53.097	1146.903	5:3	1.667	Semisoft 22L 1s
					12\271	53.137	1146.863	12:7	1.714
				7\158		53.165	1146.835	7:4	1.750
					9\203	53.202	1146.798	9:5	1.800
	2\45					53.333	1146.667	2:1	2.000	Basic 22L 1s
					9\202	53.465	1146.535	9:4	2.250
				7\157		53.503	1146.497	7:3	2.333
					12\269	53.532	1146.468	12:5	2.400
			5\112			53.571	1146.429	5:2	2.500	Semihard 22L 1s
					13\291	53.608	1146.392	13:5	2.600
				8\179		53.631	1146.369	8:3	2.667
					11\246	53.659	1146.341	11:4	2.750
		3\67				53.731	1146.269	3:1	3.000	Hard 22L 1s
					10\223	53.812	1146.188	10:3	3.333
				7\156		53.846	1146.154	7:2	3.500
					11\245	53.878	1146.122	11:3	3.667
			4\89			53.933	1146.067	4:1	4.000	Superhard 22L 1s
					9\200	54.000	1146.000	9:2	4.500
				5\111		54.054	1145.946	5:1	5.000
					6\133	54.135	1145.865	6:1	6.000
1\22						54.545	1145.455	1:0	→ ∞	Collapsed 22L 1s