Gallery of 3-SN scales: Difference between revisions

Latest revision as of 04:07, 5 January 2026

For more concise summary that's better for viewing on mobile devices, see Gallery of 3-SN scales mobile.

Scales are grouped by their germinations, the sequence of introduction of generators until 3 are reached, at which point the primitive 3-SN scale is developed (the first listed under each germination), from which all others of that germination evolve. The germination of Pythagorean, Meantone, Superpyth, Mavila, and Father MOS (2-SN) scales is (2/1, 3/2). Germinations are grouped by their subgroup, and within that, by the first comma tempered out in scales evolved from the germination.

Commas tempered out are shown in their simplest basis set, as per SN labeling conventions.

Tempered scales are shown in JI as their simplest symmetric pre-image.

Scales are written in JI and as step patterns in their symmetric mode (scales of odd cardinality) or, for scales of even cardinality, mostly in the even-symmetric mode: the mode symmetric without 2/1, otherwise in the inverse of the even-symmetric mode (the mode symmetric without 1/1).

2.3.5; Marvel

(2/1, 3/2, 5/4)

(2/1, 3/2, 5/4)[4]

Step signature	Steps in JI	Step sizes in cents
2L 1M 1s	(5/4, 6/5, 16/15)	(386.3137c, 315.6413c, 111.7313c)

Mode number	Mode in JI	Step pattern	Mode height
-2	16/15 4/3 8/5 2/1	sLML	-.2092
-1	5/4 4/3 5/3 2/1	LsLM	-.0174
1	6/5 3/2 8/5 2/1	MLsL	.0174
2	5/4 3/2 15/8 2/1	LMLs	.2092

Rank-2 temperings (mode 2)
Equivalence	Step pattern	Scale	Comma list
L = M	LLLs	Dicot[4]	25/24
M = s	LsLs	Antitonic[4]	9/8
L - M = M - s	LsLd	Bug[4] MODMOS	27/25
s = 0	LsL	Father[3]	16/15

(2/1, 3/2, 5/4)[7]

Step signature	Steps in JI	Step sizes in cents
2L 1M 4s	(75/64, 9/8, 16/15)	(274.5824c, 203.9100c, 111.7313c)

Mode number	Mode in JI	Step pattern	Mode height
-3	16/15 256/225 4/3 64/45 8/5 128/75 2/1	ssLsMsL	-.1161
-2	16/15 6/5 32/25 3/2 8/5 128/75 2/1	sMsLssL	-.0845
-1	16/15 5/4 4/3 64/45 5/3 16/9 2/1	sLssLsM	-.0316
0	16/15 5/4 4/3 3/2 8/5 15/8 2/1	sLsMsLs	0
1	9/8 6/5 45/32 3/2 8/5 15/8 2/1	MsLssLs	.0316
2	75/64 5/4 4/3 25/16 5/3 15/8 2/1	LssLsMs	.0845
3	75/64 5/4 45/32 3/2 225/128 15/8 2/1	LsMsLss	.1161

Rank-2 temperings (mode 0)
Equivalence	Step pattern	Scale	Comma list
L = M	sLsLsLs	Dicot[7]	25/24
M = s	sLsssLs	Mavila[7]	135/128
L = s	LLLsLLL	Enipucrop[7]	1125/1024
L - M = M - s	sAsLsAs	Meantone[7] MODMOS	81/80
s = 0	LsL	Father[3]	16/15

(2/1, 3/2, 5/4: 225/224)[7] (Marvel)

Step signature	Steps in JI	Step sizes in cents (TE tuning)
2L 1M 4s	(75/64~7/6, ~9/8, 16/15~15/14)	(267.8165c, 200.9152c, 116.0124c)

Mode number	Mode as simplest JI pre-image	Step pattern	Mode height
-3	~ 16/15 8/7 4/3 10/7 8/5 12/7 2/1	ssLsMsL	-.1079
-2	~ 16/15 6/5 9/7 3/2 8/5 12/7 2/1	sMsLssL	-.0793
-1	~ 16/15 5/4 4/3 10/7 5/3 16/9 2/1	sLssLsM	-.0286
0	~ 16/15 5/4 4/3 3/2 8/5 15/8 2/1	sLsMsLs	0
1	~ 9/8 6/5 7/5 3/2 8/5 15/8 2/1	MsLssLs	.0286
2	~ 7/6 5/4 4/3 14/9 5/3 15/8 2/1	LssLsMs	.0793
3	~ 7/6 5/4 7/5 3/2 7/4 15/8 2/1	LsMsLss	.1079

Rank-2 temperings (mode 0)
Equivalence	Step pattern	Scale	Comma list
L = M	sLsLsLs	Sharp[7]	25/24, 28/27
M = s	sLsssLs	Pelogic[7]	135/128, 21/20
L= s	LLLsLLL	Enipucrop[7]	35/32, 49/45
L - M = M - s	sAsLsAs	Meantone[7] MODMOS	81/80, 126/125

Rank-1 temperings
ET	9	10	12	19	22	29	31	41	50	53	72
Step sizes in ET	(2, 1, 1)	(2, 2, 1)	(3, 2, 1)	(4, 3, 2)	(5, 4, 2)	(6, 5, 3)	(7, 5, 3)	(9, 7, 4)	(11, 8, 5)	(12, 9, 5)	(16, 12, 7)

(2/1, 3/2, 5/4)[10]

Step signature	Steps in JI	Step sizes in cents
2L 7m 1s	(1125/1024, 16/15, 135/128)	(162.8511c, 111.7313c, 92.1787c)


Mode number	Mode in JI	Step pattern	Pentachordal Decatonic	Pent. Dec. Mode name	Negri[10]	UDP	Mode height
-5	16/15 256/225 6/5 32/25 512/375 3/2 8/5 128/75 2048/1125 2/1	mmsmmLmmmL	sssssLsssL	Dark minor	LLsLLLLLLL	2\|7	-.0564
-4	16/15 9/8 6/5 32/25 45/32 3/2 8/5 128/75 15/8 2/1	msmmLmmmLm	ssssLsssLs	Alternate minor	LsLLLLLLLL	1\|8	-.0411
-3	135/128 9/8 6/5 675/512 45/32 3/2 8/5 225/128 15/8 2/1	smmLmmmLmm	sssLsssLss	Bright minor	sLLLLLLLLL	0\|9	-.0258
-2	16/15 256/225 4096/3375 4/3 64/45 1024/675 8/5 128/75 2048/1125 2/1	mmmLmmsmmL	sssLsssssL	Standard minor	LLLLLLsLLL	6\|3	-.0230
-1	16/15 256/225 5/4 4/3 64/45 3/2 8/5 128/75 15/8 2/1	mmLmmsmmLm	ssLsssssLs	Dark major	LLLLLsLLLL	5\|4	-.0077
1	16/15 75/64 5/4 4/3 45/32 3/2 8/5 225/128 15/8 2/1	mLmmsmmLmm	sLsssssLss	Alternate major	LLLLsLLLLL	4\|5	.0077
2	1125/1024 75/64 5/4 675/512 45/32 3/2 3375/2048 225/128 15/8 2/1	LmmsmmLmmm	LsssssLsss	Bright major	LLLsLLLLLL	3\|6	.0239
3	16/15 256/225 5/4 4/3 64/45 1024/675 5/3 16/9 256/135 2/1	mmLmmmLmms	ssLsssLsss	Standard major	LLLLLLLLLs	9\|0	.0258
4	16/15 75/64 5/4 4/3 64/45 25/16 5/3 16/9 15/8 2/1	mLmmmLmmsm	sLsssLssss	Dark Augmented	LLLLLLLLsL	8\|1	.0411
5	1125/1024 75/64 5/4 4/3 375/256 25/16 5/3 225/128 15/8 2/1	LmmmLmmsmm	LsssLsssss	Bright Augmented	LLLLLLLsLL	7\|2	.0564

Rank-2 temperings (mode 1)
Equivalence	Step pattern	Scale	Comma list
m = s	sLsssssLss	Srutal[10] 4M (pentachordal decatonic)	2048/2025
L = m	LLLLsLLLLL	Negri[10]	16875/16384
L = s	LsLLsLLsLL	Dicot[10]	25/24
L - m = m - s	sLssdssLss	Ampersand[10] MODMOS	34171875/33554432
s = 0	sLssssLss	Mavila[9]	135/128
m = 0	LsL	Father[3]	16/15
L = 0	LLLsLLLL	Enipucrop[8]	1125/1024

(2/1, 3/2, 5/4: 225/224)[10] (Marvel)

Step signature	Steps in JI	Step sizes in cents (TE)
2L 7m 1s	(35/32~49/45, 16/15~15/14, 135/128~21/20)	(151.8041c, 116.0124c, 84.9028c)

Mode number	Mode as simplest JI pre-image	Step pattern	Pentachordal Decatonic	Pent. Dec. Mode name	Negri[10]	UDP	Mode height
-5	~ 16/15 8/7 6/5 9/7 48/35 3/2 8/5 12/7 64/35 2/1	mmsmmLmmmL	sssssLsssL	Dark minor	LLsLLLLLLL	2\|7	-.0475
-4	~ 16/15 9/8 6/5 9/7 7/5 3/2 8/5 12/7 15/8 2/1	msmmLmmmLm	ssssLsssLs	Alternate minor	LsLLLLLLLL	1\|8	-.0400
-3	~ 21/20 9/8 6/5 21/16 7/5 3/2 8/5 7/4 15/8 2/1	smmLmmmLmm	sssLsssLss	Bright minor	sLLLLLLLLL	0\|9	-.0325
-2	~ 16/15 8/7 60/49 4/3 10/7 32/21 8/5 12/7 64/35 2/1	mmmLmmsmmL	sssLsssssL	Standard minor	LLLLLLsLLL	6\|3	-.0112
-1	~ 16/15 8/7 5/4 4/3 10/7 3/2 8/5 12/7 15/8 2/1	mmLmmsmmLm	ssLsssssLs	Dark major	LLLLLsLLLL	5\|4	-.0037
1	~ 16/15 7/6 5/4 4/3 7/5 3/2 8/5 7/4 15/8 2/1	mLmmsmmLmm	sLsssssLss	Alternate major	LLLLsLLLLL	4\|5	.0037
2	~ 35/32 7/6 5/4 21/16 7/5 3/2 49/30 7/4 15/8 2/1	LmmsmmLmmm	LsssssLsss	Bright major	LLLsLLLLLL	3\|6	.0112
3	~ 16/15 8/7 5/4 4/3 10/7 32/21 5/3 16/9 40/21 2/1	mmLmmmLmms	ssLsssLsss	Standard major	LLLLLLLLLs	9\|0	.0325
4	~ 16/15 7/6 5/4 4/3 10/7 14/9 5/3 16/9 15/8 2/1	mLmmmLmmsm	sLsssLssss	Dark Augmented	LLLLLLLLsL	8\|1	.0400
5	~ 35/32 7/6 5/4 4/3 35/24 14/9 5/3 7/4 15/8 2/1	LmmmLmmsmm	LsssLsssss	Bright Augmented	LLLLLLLsLL	7\|2	.0475

Rank-2 temperings (mode 1)
Equivalence	Step pattern	Scale	Comma list
m = s	sLsssssLss	Pajara[10] 4M (pentachordal decatonic)	50/49, 64/63
L = m	LLLLsLLLLL	Negri[10]	49/48, 225/224
L = s	LsLLsLLsLL	Sharp[10]	25/24, 28/27
L - m = m - s	sLssdssLss	Miracle[10] MODMOS	225/224, 1029/1024
s = 0	sLssssLss	Pelogic[9]	21/20, 135/128

Rank-1 temperings
ET	12	19	22	29	31	41	50	53	72
Step sizes in ET	(2, 1, 1)	(2, 2, 1)	(3, 2, 2)	(3, 3, 2)	(4, 3, 2)	(5, 4, 3)	(6, 5, 3)	(7, 5, 4)	(9, 7, 5)

(2/1, 3/2, 5/4: 225/224, 385/384)[10] (Marvel)

Step signature	Steps in JI	Step sizes in cents (TE)
2L 7m 1s	(35/32~49/45~12/11, 16/15~15/14, 135/128~21/20)	(151.4797c, 116.1327c, 84.7519c)

Mode number	Mode as simplest JI pre-image	Step pattern	Pentachordal Decatonic	Pent. Dec. Mode name	Negri[10]	UDP	Mode height
-5	~ 16/15 8/7 6/5 9/7 11/8 3/2 8/5 12/7 11/6 2/1	mmsmmLmmmL	sssssLsssL	Dark minor	LLsLLLLLLL	2\|7	-.0472
-4	~ 16/15 9/8 6/5 9/7 7/5 3/2 8/5 12/7 15/8 2/1	msmmLmmmLm	ssssLsssLs	Alternate minor	LsLLLLLLLL	1\|8	-.0400
-3	~ 21/20 9/8 6/5 21/16 7/5 3/2 8/5 7/4 15/8 2/1	smmLmmmLmm	sssLsssLss	Bright minor	sLLLLLLLLL	0\|9	-.0327
-2	~ 16/15 8/7 11/9 4/3 10/7 32/21 8/5 12/7 11/6 2/1	mmmLmmsmmL	sssLsssssL	Standard minor	LLLLLLsLLL	6\|3	-.0109
-1	~ 16/15 8/7 5/4 4/3 10/7 3/2 8/5 12/7 15/8 2/1	mmLmmsmmLm	ssLsssssLs	Dark major	LLLLLsLLLL	5\|4	-.0036
1	~ 16/15 7/6 5/4 4/3 7/5 3/2 8/5 7/4 15/8 2/1	mLmmsmmLmm	sLsssssLss	Alternate major	LLLLsLLLLL	4\|5	.0036
2	~ 12/11 7/6 5/4 21/16 7/5 3/2 18/11 7/4 15/8 2/1	LmmsmmLmmm	LsssssLsss	Bright major	LLLsLLLLLL	3\|6	.0109
3	~ 16/15 8/7 5/4 4/3 10/7 32/21 5/3 16/9 40/21 2/1	mmLmmmLmms	ssLsssLsss	Standard major	LLLLLLLLLs	9\|0	.0327
4	~ 16/15 7/6 5/4 4/3 10/7 14/9 5/3 16/9 15/8 2/1	mLmmmLmmsm	sLsssLssss	Dark Augmented	LLLLLLLLsL	8\|1	.0400
5	~ 12/11 7/6 5/4 4/3 16/11 14/9 5/3 7/4 15/8 2/1	LmmmLmmsmm	LsssLsssss	Bright Augmented	LLLLLLLsLL	7\|2	.0472

Rank-2 temperings (mode 1)
Equivalence	Step pattern	Scale	Comma list
m = s	sLsssssLss	Pajarous[10] 4M (pentachordal decatonic)	50/49, 55/54, 64/63
L = m	LLLLsLLLLL	Negri[10]	45/44, 49/48, 56/55
L - m = m - s	sLssdssLss	Miracle[10] MODMOS	225/224, 243/242, 385/384

Rank-1 temperings
ET	12e	19	22	31	41	50	53	72
Step sizes in ET	(2, 1, 1)	(2, 2, 1)	(3, 2, 2)	(4, 3, 2)	(5, 4, 3)	(6, 5, 3)	(7, 5, 4)	(9, 7, 5)

(2/1, 3/2, 5/4: 225/224, 441/440)[10] (Prodigy)

Step signature	Steps in JI	Step sizes in cents (TE)
2L 7m 1s	(35/32~49/45, 16/15~15/14, 135/128~21/20~22/21)	(150.229c, 116.7669c, 82.9601c)

Mode number	Mode as simplest JI pre-image	Step pattern	Pentachordal Decatonic	Pent. Dec. Mode name	Negroni[10]	UDP	Mode height
-5	~ 16/15 8/7 6/5 9/7 48/35 3/2 8/5 12/7 64/35 2/1	mmsmmLmmmL	sssssLsssL	Dark minor	LLsLLLLLLL	2\|7	-.0466
-4	~ 16/15 9/8 6/5 9/7 7/5 3/2 8/5 12/7 15/8 2/1	msmmLmmmLm	ssssLsssLs	Alternate minor	LsLLLLLLLL	1\|8	-.0404
-3	~ 21/20 9/8 6/5 21/16 7/5 3/2 8/5 7/4 15/8 2/1	smmLmmmLmm	sssLsssLss	Bright minor	sLLLLLLLLL	0\|9	-.0343
-2	~ 16/15 8/7 27/22 4/3 10/7 32/21 8/5 12/7 64/35 2/1	mmmLmmsmmL	sssLsssssL	Standard minor	LLLLLLsLLL	6\|3	-.0092
-1	~ 16/15 8/7 5/4 4/3 10/7 3/2 8/5 12/7 15/8 2/1	mmLmmsmmLm	ssLsssssLs	Dark major	LLLLLsLLLL	5\|4	-.0031
1	~ 16/15 7/6 5/4 4/3 7/5 3/2 8/5 7/4 15/8 2/1	mLmmsmmLmm	sLsssssLss	Alternate major	LLLLsLLLLL	4\|5	.0031
2	~ 35/32 7/6 5/4 21/16 7/5 3/2 44/27 7/4 15/8 2/1	LmmsmmLmmm	LsssssLsss	Bright major	LLLsLLLLLL	3\|6	.0092
3	~ 16/15 8/7 5/4 4/3 10/7 32/21 5/3 16/9 40/21 2/1	mmLmmmLmms	ssLsssLsss	Standard major	LLLLLLLLLs	9\|0	.0343
4	~ 16/15 7/6 5/4 4/3 10/7 14/9 5/3 16/9 15/8 2/1	mLmmmLmmsm	sLsssLssss	Dark Augmented	LLLLLLLLsL	8\|1	.0404
5	~ 35/32 7/6 5/4 4/3 35/24 14/9 5/3 7/4 15/8 2/1	LmmmLmmsmm	LsssLsssss	Bright Augmented	LLLLLLLsLL	7\|2	.0466

Rank-2 temperings (mode 1)
Equivalence	Step pattern	Scale	Comma list
m = s	sLsssssLss	Pajaric[10] 4M (pentachordal decatonic)	45/44, 50/49, 56/55
L = m	LLLLsLLLLL	Negroni[10]	49/48, 55/54, 225/224
L - m = m - s	sLssdssLss	Miracle[10] MODMOS	225/224, 243/242, 385/384

Rank-1 temperings
ET	12	19e	29	31	41	53e	72
Step sizes in ET	(2, 1, 1)	(2, 2, 1)	(3, 3, 2)	(4, 3, 2)	(5, 4, 3)	(7, 5, 4)	(9, 7, 5)

(2/1, 3/2, 5/4: 225/224)[19] (Marvel)

Step signature	Steps in JI	Step sizes in cents (TE)
10L 2M 7s	(135/128~21/20, 25/24~28/27, 64/63~50/49)	(84.9028c, 66.9013c, 31.1096c)

Mode number	Mode as simplest JI pre-image	Step pattern	Mode height
-9	~ 50/49 16/15 160/147 8/7 512/441 60/49 80/63 4/3 256/189 10/7 640/441 32/21 8/5 80/49 12/7 256/147 64/35 40/21 2/1	sLsLsLMLsLsLLsLsLML	-.0464
0	~ 21/20 16/15 9/8 8/7 6/5 5/4 21/16 4/3 7/5 10/7 3/2 32/21 8/5 5/3 7/4 16/9 15/8 40/21 2/1	LsLsLMLsLsLsLMLsLsL	0
9	~ 21/20 35/32 147/128 7/6 49/40 5/4 21/16 441/320 7/5 189/128 3/2 63/40 49/30 441/256 7/4 147/80 15/8 49/25 2/1	LMLsLsLLsLsLMLsLsLs	.0464

Rank-2 temperings (mode 0)
Equivalence	Step pattern	Scale	Comma list
L = M	LsLsLLLsLsLsLLLsLsL	Meantone[19] MODMOS	81/80, 126/125
M = s	LsLsLsLsLsLsLsLsLsL	Negri[19]	49/48, 225/224
L - M = M - s	LdLdLsLdLdLdLsLdLdL	Magic[19] MODMOS	225/224, 245/243
s = 0	LLLsLLLLsLLL	Pajara[12] 4M (hexachordal dodecatonic)	50/49, 64/63
m = 0	LsLsLLsLsLsLLsLsL	Sharp[17]	25/24, 28/27

Rank-1 temperings
ET	22	29	31	41	50	53	72
Step sizes in ET	(2, 1, 0)	(2, 1, 1)	(2, 2, 1)	(3, 2, 1)	(3, 3, 2)	(4, 3, 1)	(5, 4, 2)

(2/1, 3/2, 5/4: 225/224, 385/384)[19] (Marvel)

Step signature	Steps in JI	Step sizes in cents (TE)
10L 2M 7s	(135/128~21/20, 25/24~28/27, 64/63~50/49~55/54)	(84.7519c, 66.7278c, 31.3808c)

Mode number	Mode as simplest JI pre-image	Step pattern	Mode height
-9	~ 50/49 16/15 88/81 8/7 220/189 11/9 80/63 4/3 110/81 10/7 352/243 32/21 8/5 44/27 12/7 110/63 11/6 40/21 2/1	sLsLsLMLsLsLLsLsLML	-.0460
0	~ 21/20 16/15 9/8 8/7 6/5 5/4 21/16 4/3 7/5 10/7 3/2 32/21 8/5 5/3 7/4 16/9 15/8 40/21 2/1	LsLsLMLsLsLsLMLsLsL	0
9	~ 21/20 12/11 63/55 7/6 27/22 5/4 21/16 243/176 7/5 81/55 3/2 63/40 18/11 189/110 7/4 81/44 15/8 49/25 2/1	LMLsLsLLsLsLMLsLsLs	.0460

Rank-2 temperings (mode 0)
Equivalence	Step pattern	Scale	Comma list
L = M	LsLsLLLsLsLsLLLsLsL	Meanpop[19] MODMOS	81/80, 126/125, 385/384
M = s	LsLsLsLsLsLsLsLsLsL	Negri[19]	45/44, 49/48, 56/55
L - M = M - s	LdLdLsLdLdLdLsLdLdL	Magic[19] MODMOS	100/99, 225/224, 245/243
s = 0	LLLsLLLLsLLL	Pajarous[12] 4M (hexachordal dodecatonic)	50/49, 55/54, 64/63

Rank-1 temperings
ET	22	31	41	50	53	72
Step sizes in ET	(2, 1, 0)	(2, 2, 1)	(3, 2, 1)	(3, 3, 2)	(4, 3, 1)	(5, 4, 2)

(2/1, 3/2, 5/4: 225/224, 441/440)[19] (Prodigy)

Step signature	Steps in JI	Step sizes in cents (TE)
10L 2M 7s	(135/128~21/20~22/21, 25/24~28/27, 64/63~50/49~45/44~56/55)	(82.9601c, 67.2689c, 33.8068c)

Mode number	Mode as simplest JI pre-image	Step pattern	Mode height
-9	~ 50/49 16/15 12/11 8/7 64/55 27/22 14/11 4/3 15/11 10/7 16/11 32/21 8/5 18/11 12/7 96/55 64/35 40/21 2/1	sLsLsLMLsLsLLsLsLML	-.0428
0	~ 21/20 16/15 9/8 8/7 6/5 5/4 21/16 4/3 7/5 10/7 3/2 32/21 8/5 5/3 7/4 16/9 15/8 40/21 2/1	LsLsLMLsLsLsLMLsLsL	0
9	~ 21/20 35/32 55/48 7/6 11/9 5/4 21/16 11/8 7/5 22/15 3/2 11/7 44/27 55/32 7/4 11/6 15/8 49/25 2/1	LMLsLsLLsLsLMLsLsLs	.0428

Rank-2 temperings (mode 0)
Equivalence	Step pattern	Scale	Comma list
L = M	LsLsLLLsLsLsLLLsLsL	Meantone[19] MODMOS	81/80, 99/98, 126/125
M = s	LsLsLsLsLsLsLsLsLsL	Negroni[19]	49/48, 55/54, 225/224
L - M = M - s	LdLdLsLdLdLdLsLdLdL	Witchcraft[19] MODMOS	225/224, 245/243, 441/440
s = 0	LLLsLLLLsLLL	Pajaric[12] 4M (hexachordal dodecatonic)	45/44, 50/49, 56/55

Rank-1 temperings
ET	29	31	41	53e	72
Step sizes in ET	(2, 1, 1)	(2, 2, 1)	(3, 2, 1)	(4, 3, 1)	(5, 4, 2)

(2/1, 3/2, 5/4: 225/224, 441/440)[31] (Prodigy)

Step signature	Steps in JI	Step sizes in cents (TE)
10L 19M 2s	(~33/32, 64/63~50/49~45/44~56/55, 49/48~55/54)	(49.1533c, 33.8068c, 33.4621c)

Mode 0: ~ 50/49 22/21 16/15 12/11 9/8 8/7 7/6 6/5 27/22 5/4 14/11 21/16 4/3 15/11 7/5 10/7 22/15 3/2 32/21 11/7 8/5 44/27 5/3 12/7 7/4 16/9 11/6 15/8 21/11 49/25 2/1

as mLmmLmsmLmmLmmLmLmmLmmLmsmLmmLm

Rank-2 temperings (mode 0)
Equivalence	Step pattern	Scale	Comma list
m = s	sLssLsssLssLssLsLssLssLsssLssLs	Miracle[31] MODMOS	225/224, 243/242, 385/384
L = m	LLLLLLLsLLLLLLLLLLLLLLLLLsLLLLLL	Tritonic[31] MODMOS	121/120, 225/224, 441/440
L = s	sLssLsLsLssLssLsLssLssLsLsLssLs	Meantone[31] MODMOS	81/80, 99/98, 126/125
s = 0	mLmmLmmLmmLmmLmLmmLmmLmmLmmLm	Negroni[29]	49/48, 55/54, 225/224
m = 0	LLsLLLLLLsLL	Pajaric[12] 4M (hexachordal dodecatonic)	45/44, 50/49, 56/55

Rank-1 temperings
ET	41	53e	72
Step sizes in ET	(2, 1, 1)	(3, 1, 2)	(3, 2, 2)

((2/1, 5/4)[3], 16/15)

((2/1, 5/4)[3], 16/15)[6]

Step signature	Steps in JI	Step sizes in cents
1L 2M 4s	(6/5, 75/64, 16/15)	(315.6413c, 267.8165c, 111.7313c)

Mode number	Mode in JI	Step pattern	Mode height
-3	16/15 5/4 4/3 25/16 5/3 2/1	sMsMsL	-0.1156
-2	16/15 5/4 4/3 8/5 128/75 2/1	sMsLsM	-0.0883
-1	16/15 32/25 512/375 8/5 128/75 2/1	sLsMsM	-0.0609
1	75/64 5/4 375/256 25/16 15/8 2/1	MsMsLs	0.0609
2	75/64 5/4 3/2 8/5 15/8 2/1	MsLsMs	0.0883
3	6/5 32/25 3/2 8/5 15/8 2/1	LsMsMs	0.1156

Rank-2 temperings (mode 2)
Equivalence	Step pattern	Scale	Comma list
L = M	LsLsLs	Augmented[6]	128/125
M = s	ssLsss	Enipucrop[6]	1125/1024
L = s	LsssLs	Antitonic[6] 4M	9/8
s = 0	LsL	Father[3]	16/15

((2/1, 5/4)[3], 16/15: 225/224)[6] (Marvel)

Step signature	Steps in JI	Step sizes in cents (TE tuning)
1L 2M 4s	6/5, 75/64~7/6, 16/15~15/14	(316.9276c, 267.8165c, 116.0124c)

Mode number	Mode as simplest JI pre-image	Step pattern	Mode height
-3	~ 15/14 5/4 4/3 14/9 5/3 2/1	sMsMsL	-0.1168
-2	~ 15/14 5/4 4/3 8/5 12/7 2/1	sMsLsM	-0.0840
-1	~ 15/14 9/7 48/35 8/5 12/7 2/1	sLsMsM	-0.0513
1	~ 7/6 5/4 35/28 14/9 15/8 2/1	MsMsLs	0.0513
2	~ 7/6 5/4 3/2 8/5 15/8 2/1	MsLsMs	0.0840
3	~ 6/5 9/7 3/2 8/5 15/8 2/1	LsMsMs	0.1168

Rank-2 temperings (mode 2)
Equivalence	Step pattern	Scale	Comma list
L = M	LsLsLs	August[6]	128/125

Rank-1 temperings
ET	7	9	10	12	19	22	29	31	41	50	53	72
Step sizes in ET	(2, 1, 1)	(2, 2, 1)	(3, 2, 1)	(3, 3, 1)	(5, 4, 2)	(6, 5, 2)	(8, 6, 3)	(8, 7, 3)	(11, 9, 4)	(13, 11, 5)	(14, 12, 5)	(19, 16, 7)

((2/1, 5/4)[3], 16/15)[9]

Step signature	Steps in JI	Step sizes in cents
1L 2M 6s	(9/8, 1125/1024, 16/15)	(203.9100c, 162.8511c, 111.7313c)

Mode number	Mode in JI	Step pattern	Mode height
-4	16/15 256/225 5/4 4/3 64/45 25/16 5/3 16/9 2/1	ssMssMssL	-0.0662
-3	16/15 256/225 5/4 4/3 64/45 8/5 128/75 2048/1125 2/1	ssMssLssM	-0.0405
-2	16/15 75/64 5/4 4/3 375/256 25/16 5/3 15/8 2/1	sMssMssLs	-0.0257
-1	16/15 256/225 32/25 512/375 8192/5625 8/5 128/75 2048/1125 2/1	ssLssMssM	-0.0148
0	16/15 75/64 5/4 4/3 3/2 8/5 128/75 15/8 2/1	sMssLssMs	0
1	1125/1024 75/64 5/4 5625/4096 375/256 25/16 225/128 15/8 2/1	MssMssLss	0.0148
2	16/15 6/5 32/25 512/375 3/2 8/5 128/75 15/8 2/1	sLssMssMs	0.0257
3	1125/1024 75/64 5/4 45/32 3/2 8/5 225/128 15/8 2/1	MssLssMss	0.0405
4	9/8 6/5 32/25 45/32 3/2 8/5 225/128 15/8 2/1	LssMssMss	0.0662

Rank-2 temperings (mode 0)
Equivalence	Step pattern	Scale	Comma list
L = M	sLssLssLs	Augmented[9]	128/125
M = s	ssssLssss	Negri[9]	16875/16384
L = s	sLsssssLs	Mavila[9] MODMOS	135/128
L - M = M - s	sLssAssLs	Orson[9] MODMOS	2109375/2097152
s = 0	LsL	Father[3]	16/15
m = 0	sssLsss	Enipucrop[7]	1125/1024

((2/1, 5/4)[3], 16/15: 225/224)[9] (Marvel)

Step signature	Steps in JI	Step sizes in cents (TE tuning)
1L 2M 6s	(9/8~28/25, 35/32~49/45, 16/15~15/14)	(203.9100c, 162.8511c, 111.7313c)

Mode number	Mode as simplest JI pre-image	Step pattern	Mode height
-4	~ 15/14 8/7 5/4 4/3 10/7 14/9 5/3 16/9 2/1	ssMssMssL	-0.0633
-3	~ 15/14 8/7 5/4 4/3 10/7 8/5 12/7 64/35 2/1	ssMssLssM	-0.0326
-2	~ 15/14 7/6 5/4 4/3 35/24 14/9 5/3 15/8 2/1	sMssMssLs	-0.0307
-1	~ 15/14 8/7 9/7 48/35 72/49 8/5 12/7 64/35 2/1	ssLssMssM	-0.0019
0	~ 15/14 7/6 5/4 4/3 3/2 8/5 12/7 15/8 2/1	sMssLssMs	0
1	~ 35/32 7/6 5/4 49/36 35/24 14/9 7/4 15/8 2/1	MssMssLss	0.0019
2	~ 15/14 6/5 9/7 48/35 3/2 8/5 12/7 15/8 2/1	sLssMssMs	0.0307
3	~ 35/32 7/6 5/4 7/5 3/2 8/5 7/4 15/8 2/1	MssLssMss	0.0326
4	~ 9/8 6/5 9/7 7/5 3/2 8/5 7/4 15/8 2/1	LssMssMss	0.0633

Rank-2 temperings (mode 0)
Equivalence	Step pattern	Scale	Comma list
L = M	sLssLssLs	August[9]	36/35, 128/125
M = s	ssssLssss	Negri[9]	49/48, 225/224
L = s	sLsssssLs	Pelogic[9] MODMOS	21/20, 135/128
L - M = M - s	sLssAssLs	Orwell[9] MODMOS	225/224, 1728/1715

Rank-1 temperings
ET	10	12	19	22	29	31	41	50	53	72
Step sizes in ET	(2, 1, 1)	(2, 2, 1)	(3, 2, 2)	(4, 3, 2)	(5, 3, 3)	(5, 4, 3)	(7, 5, 4)	(8, 6, 5)	(9, 8, 5)	(12, 9, 7)

((2/1, 5/4)[3], 16/15: 225/224, 385/384)[9] (Marvel)

Step signature	Steps in JI	Step sizes in cents (TE tuning)
1L 2M 6s	(9/8~28/25, 35/32~49/45~12/11, 16/15~15/14)	(200.8846c, 151.4797c, 116.1327c)

Mode number	Mode as simplest JI pre-image	Step pattern	Mode height
-4	~ 15/14 8/7 5/4 4/3 10/7 14/9 5/3 16/9 2/1	ssMssMssL	-0.0632
-3	~ 15/14 8/7 5/4 4/3 10/7 8/5 12/7 11/6 2/1	ssMssLssM	-0.0324
-2	~ 15/14 7/6 5/4 4/3 16/11 14/9 5/3 15/8 2/1	sMssMssLs	-0.0309
-1	~ 15/14 8/7 9/7 11/8 22/15 8/5 12/7 11/6 2/1	ssLssMssM	-0.0015
0	~ 15/14 7/6 5/4 4/3 3/2 8/5 12/7 15/8 2/1	sMssLssMs	0
1	~ 12/11 7/6 5/4 15/11 16/11 14/9 7/4 15/8 2/1	MssMssLss	0.0015
2	~ 15/14 6/5 9/7 11/8 3/2 8/5 12/7 15/8 2/1	sLssMssMs	0.0309
3	~ 12/11 7/6 5/4 7/5 3/2 8/5 7/4 15/8 2/1	MssLssMss	0.0324
4	~ 9/8 6/5 9/7 7/5 3/2 8/5 7/4 15/8 2/1	LssMssMss	0.0632

Rank-2 temperings (mode 0)
Equivalence	Step pattern	Scale	Comma list
L = M	sLssLssLs	August[9]	36/35, 45/44, 56/55
M = s	ssssLssss	Negri[9]	45/44, 49/48, 56/55
L - M = M - s	sLssAssLs	Orwell[9] MODMOS	99/88, 121/120, 176/175

Rank-1 temperings
ET	10	12e	19	22	31	41	50	53	72
Step sizes in ET	(2, 1, 1)	(2, 2, 1)	(3, 2, 2)	(4, 3, 2)	(5, 4, 3)	(7, 5, 4)	(8, 6, 5)	(9, 8, 5)	(12, 9, 7)

((2/1, 5/4)[3], 16/15: 225/224)[12] (Marvel)

Step signature	Steps in JI	Step sizes in cents (TE tuning)
9L 1M 2s	(16/15~15/14, 135/128~21/20, ~49/48)	(116.0124c, 84.9028c, 35.7917c)

Mode number	Mode as simplest JI pre-image	Step pattern	Mode height
-6	~ 49/48 35/32 7/6 5/4 245/192 49/36 35/24 14/9 49/30 7/4 15/8 2/1	sLLLsLLLMLLL	-0.0733
-5	~ 15/14 35/32 7/6 5/4 4/3 49/36 35/24 14/9 5/3 7/4 15/8 2/1	LsLLLsLLLMLL	-0.0433
-4	~ 49/48 35/32 7/6 5/4 12/16 7/5 3/2 8/5 49/30 7/4 15/8 2/1	sLLLMLLLsLLL	-0.0435
-3	~ 15/14 8/7 7/6 5/4 4/3 10/7 35/24 14/9 5/3 16/9 15/8 2/1	LLsLLLsLLLML	-0.0152
-2	~ 15/14 35/32 7/6 5/4 4/3 7/5 3/2 8/5 12/7 7/4 15/8 2/1	LsLLLMLLLsLL	-0.0145
-1	~ 21/20 9/8 6/5 9/7 21/16 7/5 3/2 8/5 49/30 7/4 15/8 2/1	MLLLsLLLsLLL	-0.0138
1	~ 15/14 8/7 60/49 5/4 4/3 10/7 32/21 14/9 5/3 16/9 40/21 2/1	LLLsLLLsLLLM	0.0138
2	~ 15/14 8/7 7/6 5/4 4/3 10/7 3/2 8/5 12/7 64/35 15/8 2/1	LLsLLLMLLLsL	0.0145
3	~ 15/14 9/8 6/5 9/7 48/35 7/5 3/2 8/5 12/7 7/4 15/8 2/1	LMLLLsLLLsLL	0.0152
4	~ 15/14 8/7 60/49 5/4 4/3 10/7 32/21 8/5 12/7 64/35 96/49 2/1	LLLsLLLMLLLs	0.0435
5	~ 15/14 8/7 6/5 9/7 48/35 72/49 3/2 8/5 12/7 64/35 15/8 2/1	LLMLLLsLLLsL	0.0443
6	~ 15/14 8/7 60/49 9/7 48/35 72/49 384/245 8/5 12/7 64/35 96/49 2/1	LLLMLLLsLLLs	0.0733

Rank-2 temperings (mode -2)
Equivalence	Step pattern	Scale	Comma list
L = M	LsLLLLLLLsLL	Pajara[12] MODMOS	50/49, 64/63
M = s	LsLLLsLLLsLLs	August[12]	36/35, 128/125
L = s	sssssLssssss	Passion[12]	64/63, 3125/3087
L - M = M - s	LdLLLsLLLdLL	Meantone[12] MODMOS	81/80, 126/125
s = 0	LLLLsLLLLL	Negri[10]	49/48, 225/224
M = 0	LsLLLLLLsLL	Pelogic[11] MODMOS	21/20, 135/128

Rank-1 temperings
ET	19	22	29	31	41	50	53	72
Step sizes in ET	(2, 1, 0)	(2, 2, 1)	(3, 2, 0)	(3, 2, 1)	(4, 3, 1)	(5, 3, 1)	(5, 4, 2)	(7, 5, 2)

((2/1, 5/4)[3], 16/15: 225/224, 385/384)[12] (Marvel)

Step signature	Steps in JI	Step sizes in cents (TE tuning)
9L 1M 2s	(16/15~15/14, 135/128~21/20, 49/48~45/44~56/55)	(116.1327c, 84.7519c, 35.347c)

Mode number	Mode as simplest JI pre-image	Step pattern	Mode height
-6	~ 45/44 12/11 7/6 5/4 14/11 15/11 16/11 14/9 18/11 7/4 15/8 2/1	sLLLsLLLMLLL	-0.0738
-5	~ 15/14 12/11 7/6 5/4 4/3 15/11 16/11 14/9 5/3 7/4 15/8 2/1	LsLLLsLLLMLL	-0.0445
-4	~ 45/44 12/11 7/6 5/4 12/16 7/5 3/2 8/5 18/11 7/4 15/8 2/1	sLLLMLLLsLLL	-0.0438
-3	~ 15/14 8/7 7/6 5/4 4/3 10/7 16/11 14/9 5/3 16/9 15/8 2/1	LLsLLLsLLLML	-0.0153
-2	~ 15/14 12/11 7/6 5/4 4/3 7/5 3/2 8/5 12/7 7/4 15/8 2/1	LsLLLMLLLsLL	-0.0146
-1	~ 21/20 9/8 6/5 9/7 21/16 7/5 3/2 8/5 18/11 7/4 15/8 2/1	MLLLsLLLsLLL	-0.0139
1	~ 15/14 8/7 11/9 5/4 4/3 10/7 32/21 14/9 5/3 16/9 40/21 2/1	LLLsLLLsLLLM	0.0139
2	~ 15/14 8/7 7/6 5/4 4/3 10/7 3/2 8/5 12/7 11/6 15/8 2/1	LLsLLLMLLLsL	0.0146
3	~ 15/14 9/8 6/5 9/7 11/8 7/5 3/2 8/5 12/7 7/4 15/8 2/1	LMLLLsLLLsLL	0.0153
4	~ 15/14 8/7 11/9 5/4 4/3 10/7 32/21 8/5 12/7 11/6 55/28 2/1	LLLsLLLMLLLs	0.0438
5	~ 15/14 8/7 6/5 9/7 11/8 22/15 3/2 8/5 12/7 11/6 15/8 2/1	LLMLLLsLLLsL	0.0445
6	~ 15/14 8/7 11/9 9/7 11/8 22/15 11/7 8/5 12/7 11/6 55/28 2/1	LLLMLLLsLLLs	0.0738

Rank-2 temperings (mode -2)
Equivalence	Step pattern	Scale	Comma list
L = M	LsLLLLLLLsLL	Pajarous[12] MODMOS	50/49, 55/54, 64/63
M = s	LsLLLsLLLsLL	August[12]	36/35, 45/44, 56/55
L = s	sssssLssssss	Passion[12]	64/63, 100/99, 1375/1372
L - M = M - s	LdLLLsLLLdLL	Meanpop[12] MODMOS	81/80, 126/125, 385/384
s = 0	LLLLsLLLLL	Negri[10]	45/44, 49/48, 56/55

Rank-1 temperings
ET	19	22	31	41	50	53	72
Step sizes in ET	(2, 1, 0)	(2, 2, 1)	(3, 2, 1)	(4, 3, 1)	(5, 3, 1)	(5, 4, 2)	(7, 5, 2)

(2/1, 5/4)[3], 16/15: 225/224, 385/384)[22] (Marvel)

Step signature	Steps in JI	Step sizes in cents (TE tuning)
9L 1m 12s	(~22/21, 36/35~33/32, 49/48~45/44~56/55)	(80.7857c, 49.4049c, 35.347c)

Mode number	Mode as simplest JI pre-image	Step pattern	Mode height
-7	~ 45/44 16/15 12/11 49/44 7/6 105/88 5/4 14/11 4/3 15/11 7/5 63/44 3/2 49/32 8/5 18/11 12/7 7/4 98/55 15/8 21/11 2/1	sLssLsLsLsmsLsLsLssLsL	-.0229
7	~ 22/21 16/15 55/49 8/7 7/6 11/9 5/4 64/49 4/3 88/63 10/7 22/11 3/2 11/7 8/5 176/105 12/7 88/49 11/6 15/8 55/28 2/1	LsLssLsLsLsmsLsLsLssLs	.0229

Rank-2 temperings (mode -7)
Equivalence	Step pattern	Scale	Comma list
m = s	sLssLsLsLsssLsLsLssLsL	Orwell[22] MODMOS	99/98, 121/120, 176/175
L = m	sLssLsLsLsLsLsLsLssLsL	Pajarous[22] MODMOS	50/49, 55/54, 64/63
L = s	LLLLLLLLLLsLLLLLLLLLLL	Escapade[22]	99/98, 176/175, 2560/2541
L - m = m - s	sAssAsAsAsLsAsAsAssAsA	Magic[22] MODMOS	100/99, 225/224, 245/243
s = 0	LLLLsLLLLL	Negri[10]	45/44, 49/48, 56/55

Rank-1 temperings
ET	31	41	50	53	72
Step sizes in ET	(2, 1, 1)	(3, 2, 1)	(4, 2, 1)	(3, 2, 2)	(5, 3, 2)

((2/1, 3/2)[5], 16/15)

((2/1, 3/2)[5], 16/15)[10]

Step signature	Steps in JI	Step sizes in cents
2L 5m 3s	(10/9, 16/15, 135/128)	(182.4037c, 111.7313c, 92.1787c)

Mode number	Mode in JI	Step pattern	Pentachordal Decatonic	Pent. Dec. Mode name	Blackwood[10]	UDP	Mode height
-5	16/15 9/8 6/5 81/64 27/20 3/2 8/5 27/16 9/5 2/1	msmsmLmsmL	sssssLsssL	Dark minor	sLsLsLsLsL	0\|1 (5)	-.0745
-4	135/128 9/8 1215/1024 81/64 45/32 3/2 405/256 27/16 15/8 2/1	smsmLmsmLm	ssssLsssLs	Alternate minor	LsLsLsLsLs	1\|0 (5)	-.0592
-3	16/15 9/8 6/5 4/3 64/45 3/2 8/5 27/16 9/5 2/1	msmLmsmsmL	sssLsssssL	Standard minor	sLsLsLsLsL	0\|1 (5)	-.0411
-2	135/128 9/8 5/4 4/3 45/32 3/2 405/256 27/16 15/8 2/1	smLmsmsmLm	ssLsssssLs	Dark major	LsLsLsLsLs	1\|0 (5)	-.0258
-1	16/15 9/8 6/5 4/3 64/45 3/2 8/5 16/9 256/135 2/1	msmLmsmLms	sssLsssLss	Bright minor	sLsLsLsLsL	0\|1 (5)	-.0077
1	135/128 9/8 5/4 4/3 45/32 3/2 5/3 16/9 15/8 2/1	smLmsmLmsm	ssLsssLsss	Standard major	LsLsLsLsLs	1\|0 (5)	.0077
2	16/15 32/27 512/405 4/3 64/45 3/2 8/5 16/9 256/135 2/1	mLmsmsmLms	sLsssssLss	Alternate major	sLsLsLsLsL	0\|1 (5)	.0258
3	10/9 32/27 5/4 4/3 45/32 3/2 5/3 16/9 15/8 2/1	LmsmsmLmsm	LsssssLsss	Bright major	LsLsLsLsLs	1\|0 (5)	.0411
4	16/15 32/27 512/405 4/3 64/45 128/81 2048/1215 16/9 256/135 2/1	mLmsmLmsms	sLsssLssss	Dark Augmented	sLsLsLsLsL	0\|1 (5)	.0592
5	10/9 32/27 5/4 4/3 40/27 128/81 5/3 16/9 15/8 2/1	LmsmLmsmsm	LsssLsssss	Bright Augmented	LsLsLsLsLs	1\|0 (5)	.0745

Rank-2 temperings (mode 1)
Equivalence	Step pattern	Scale	Comma list
m = s	ssLsssLsss	Srutal[10] 4M (pentachordal decatonic)	2048/2025
L = m	sLLLsLLLsL	Dicot[10] MODMOS	25/24
L = s	LsLsLsLsLs	Blackwood[10]	256/243
L - m = m - s	sLALsLALsL	Negri[10] MODMOS	16875/16384
s = 0	sLssLss	Mavila[7]	135/128
m = 0	sLsLs	Father[5]	16/15

((2/1, 3/2)[5], 16/15: 225/224)[10] (Marvel)

Step signature	Steps in JI	Step sizes in cents (TE tuning)
2L 5m 3s	(10/9, 16/15~15/14, 135/128~21/20)	(182.9137c, 116.0124c, 84.9028c)

Mode number	Mode as simplest JI pre-image	Step pattern	Pentachordal Decatonic	Pent. Dec. Mode name	Blackwood[10]	UDP	Mode height
-5	~ 15/14 9/8 6/5 81/64 27/20 3/2 8/5 27/16 9/5 2/1	msmsmLmsmL	sssssLsssL	Dark minor	sLsLsLsLsL	0\|1 (5)	-.0763
-4	~ 21/20 9/8 189/160 81/64 7/5 3/2 63/40 27/16 15/8 2/1	smsmLmsmLm	ssssLsssLs	Alternate minor	LsLsLsLsLs	1\|0 (5)	-.0688
-3	~ 15/14 9/8 6/5 4/3 10/7 3/2 8/5 27/16 9/5 2/1	msmLmsmsmL	sssLsssssL	Standard minor	sLsLsLsLsL	0\|1 (5)	-.0400
-2	~ 21/20 9/8 5/4 4/3 7/5 3/2 63/40 27/16 15/8 2/1	smLmsmsmLm	ssLsssssLs	Dark major	LsLsLsLsLs	1\|0 (5)	-.0326
-1	~ 15/14 9/8 6/5 4/3 10/7 3/2 8/5 16/9 40/21 2/1	msmLmsmLms	sssLsssLss	Bright minor	sLsLsLsLsL	0\|1 (5)	-.0037
1	~ 21/20 9/8 5/4 4/3 7/5 3/2 5/3 16/9 15/8 2/1	smLmsmLmsm	ssLsssLsss	Standard major	LsLsLsLsLs	1\|0 (5)	.0037
2	~ 15/14 32/27 80/63 4/3 10/7 3/2 8/5 16/9 40/21 2/1	mLmsmsmLms	sLsssssLss	Alternate major	sLsLsLsLsL	0\|1 (5)	.0326
3	~ 10/9 32/27 5/4 4/3 7/5 3/2 5/3 16/9 15/8 2/1	LmsmsmLmsm	LsssssLsss	Bright major	LsLsLsLsLs	1\|0 (5)	.0400
4	~ 15/14 32/27 80/63 4/3 10/7 128/81 320/189 16/9 40/21 2/1	mLmsmLmsms	sLsssLssss	Dark Augmented	sLsLsLsLsL	0\|1 (5)	.0688
5	~ 10/9 32/27 5/4 4/3 40/27 128/81 5/3 16/9 15/8 2/1	LmsmLmsmsm	LsssLsssss	Bright Augmented	LsLsLsLsLs	1\|0 (5)	.0763

Rank-2 temperings (mode 1)
Equivalence	Step pattern	Scale	Comma list
m = s	ssLsssLsss	Pajara[10] 4M (pentachordal decatonic)	50/49, 64/63
L = m	sLLLsLLLsL	Sharp[10] MODMOS	25/24, 28/27
L - m = m - s	sLALsLALsL	Negri[10] MODMOS	49/48, 225/224
s = 0	sLssLss	Pelogic[7]	21/20, 135/128

((2/1, 3/2)[5], 16/15: 225/224, 441/440)[10] (Prodigy)

Step signature	Steps in JI	Step sizes in cents (TE tuning)
2L 5m 3s	(10/9, 16/15~15/14, 135/128~21/20~22/21)	(184.0358c, 116.7669c, 82.9601c)

Mode number	Mode as simplest JI pre-image	Step pattern	Pentachordal Decatonic	Pent. Dec. Mode name	Blackwood[10]	UDP	Mode height
-5	~ 15/14 9/8 6/5 44/35 27/20 3/2 8/5 27/16 9/5 2/1	msmsmLmsmL	sssssLsssL	Dark minor	sLsLsLsLsL	0\|1 (5)	-.0779
-4	~ 21/20 9/8 33/28 44/35 7/5 3/2 11/7 27/16 15/8 2/1	smsmLmsmLm	ssssLsssLs	Alternate minor	LsLsLsLsLs	1\|0 (5)	-.0718
-3	~ 15/14 9/8 6/5 4/3 10/7 3/2 8/5 27/16 9/5 2/1	msmLmsmsmL	sssLsssssL	Standard minor	sLsLsLsLsL	0\|1 (5)	-.0405
-2	~ 21/20 9/8 5/4 4/3 7/5 3/2 11/7 27/16 15/8 2/1	smLmsmsmLm	ssLsssssLs	Dark major	LsLsLsLsLs	1\|0 (5)	-.0343
-1	~ 15/14 9/8 6/5 4/3 10/7 3/2 8/5 16/9 21/11 2/1	msmLmsmLms	sssLsssLss	Bright minor	sLsLsLsLsL	0\|1 (5)	.0031
1	~ 21/20 9/8 5/4 4/3 7/5 3/2 5/3 16/9 15/8 2/1	smLmsmLmsm	ssLsssLsss	Standard major	LsLsLsLsLs	1\|0 (5)	.0031
2	~ 15/14 32/27 15/11 4/3 10/7 3/2 8/5 16/9 21/11 2/1	mLmsmsmLms	sLsssssLss	Alternate major	sLsLsLsLsL	0\|1 (5)	.0343
3	~ 10/9 32/27 5/4 4/3 7/5 3/2 5/3 16/9 15/8 2/1	LmsmsmLmsm	LsssssLsss	Bright major	LsLsLsLsLs	1\|0 (5)	.0405
4	~ 15/14 32/27 14/11 4/3 10/7 35/22 56/33 16/9 40/21 2/1	mLmsmLmsms	sLsssLssss	Dark Augmented	sLsLsLsLsL	0\|1 (5)	.0718
5	~ 10/9 32/27 5/4 4/3 40/27 35/22 5/3 16/9 15/8 2/1	LmsmLmsmsm	LsssLsssss	Bright Augmented	LsLsLsLsLs	1\|0 (5)	.0779

Rank-2 temperings (mode 1)
Equivalence	Step pattern	Scale	Comma list
m = s	ssLsssLsss	Pajaric[10] 4M (pentachordal decatonic)	45/44, 50/49, 56/55
L - m = m - s	sLALsLALsL	Negroni[10] MODMOS	49/48, 55/54, 225/224

((2/1, 3/2)[5], 16/15)[17]

10L 2M 5s = (135/128, 256/243, 2048/2025) = (92.1787c, 90.2250c, 19.5526c)

135/128 16/15 9/8 32/27 5/4 81/64 4/3 45/32 64/45 3/2 128/81 8/5 27/16 16/9 15/8 256/135 2/1 as LsLMLsLLsLLsLMLsL

L = M -> LsLLLsLLsLLsLLLsL Helmholtz[17]; M = s -> LsLsLsLLsLLsLsLsL Dicot[17] MODMOS; s = 0 -> LLsLLLLLLsLL Srutal[12] 4M (Hexachordal Dodecatonic); M = 0 -> LsLLsLLsLLsLLsL Blackwood[15]

((2/1, 3/2)[5], 16/15: 225/224)[17] (Marvel)

2L 10M 5s = (256/243, 135/128~21/20, 2048/2025~50/49~64/63) = (98.0109c, 84.9028c, 31.1096) TE

~ 21/20 16/15 9/8 32/27 5/4 81/64 4/3 7/5 10/7 3/2 128/81 8/5 27/16 16/9 15/8 40/21 2/1 as MsMLMsMMsMMsMLMsM

L = M -> LsLLLsLLsLLsLLLsL Garibaldi[17]; M = s -> LsLsLsLLsLLsLsLsL Dicot[17] MODMOS;

s = 0 -> LLsLLLLLLsLL Pajara[12] 4M (Hexachordal Dodecatonic)

((2/1, 3/2)[5], 16/15: 225/224, 441/440)[17] (Prodigy)

2L 10M 5s = (256/243~35/33, 135/128~21/20~22/21, 2048/2025~50/49~64/63~45/44~56/55) = (101.0757c, 82.9601c, 33.8068c) TE

~ 22/21 16/15 9/8 32/27 5/4 81/64 4/3 7/5 10/7 3/2 128/81 8/5 27/16 16/9 15/8 21/11 2/1 as LsLmLsLLsLLsLmLsL

L = M -> LsLLLsLLsLLsLLLsL Andromeda[17]; s = 0 -> s = 0 -> LLsLLLLLLsLL Pajaric[12] 4M (Hexachordal Dodecatonic)

((2/1, 3/2)[5], 16/15: 225/224, 441/440)[29] (Prodigy)

2L 10m 17s = (25/24~28/27, ~33/32, 2048/2025~50/49~64/63~45/44~56/55) = (67.2689c, 49.1533c, 33.8068c) TE

~ 50/49 22/21 16/15 11/10 9/8 8/7 33/28 6/5 5/4 14/11 21/16 4/3 15/11 7/5 10/7 22/15 3/2 32/21 11/7 8/5 5/3 56/33 7/4 16/9 20/11 15/8 21/11 49/25 2/1 as smsmssmsLsmssmsmssmsLsmssmsms

m = s -> ssssssssLsssssssssssLssssssss Tritonic[29] MODMOS; L = m -> sLsLssLsLsLssLsLssLsLsLssLsLs Andromeda[29];

L = s -> LsLsLLsLLLsLLsLsLLsLLLsLLsLsL Negroni[29] MODMOS; L - m = m - s -> Marvolo[29] MODMOS;

s = 0 -> LLLsLLLLsLLL Pajaric[12] 4M (Hexachordal Dodecatonic)

((2/1, 3/2)[5], 16/15: 225/224, 441/440)[41] (Prodigy)

29L 2M 10s = (2048/2025~50/49~64/63~45/44~56/55, 49/48~55/54, ~121/120) = (33.8068c, 33.4621c, 15.3465c) TE

~ 50/49 33/32 22/21 16/15 12/11 11/10 9/8 8/7 7/6 32/27 40/33 11/9 5/4 14/11 128/99 21/16 4/3 15/11 11/8 7/5 10/7 16/11 22/15 3/2 32/16 99/64 11/7 8/5 18/11 33/20 27/16 12/7 7/4 16/9 20/11 11/6 15/8 21/11 64/33 49/25 2/1 as LsLLLsLLMLLsLLLsLLsLLLsLLsLLLsLLMLLsLLLsL

L = M -> LsLLLsLLLLLsLLLsLLsLLLsLLsLLLsLLLLLsLLLsL Miracle[31] MODMOS; M = s -> LsLLLsLLsLLsLLLsLLsLLLsLLsLLLsLLsLLsLLLsL Andromeda[31];

L - M = M - s -> Witchcraft[41] MODMOS

s = 0 -> LLLLLLsLLLLLLLLLLLLLLLLLsLLLLLL Tritonic[31] MODMOS; m = 0 -> LsLLLsLLLLsLLLsLLsLLLsLLsLLLsLLLLLsLLLsL Negroni[39] MODMOS

((2/1, 3/2)[5], 16/15: 225/224, 441/440)[72] (Prodigy)

29L 2M 41s = (1344/1331~1350/1331, 100/99~245/242~896/891, ~121/120) = (18.4603c, 18.1156c, 15.3465c) TE

as LssLsLsLssLsLsMsLsLssLsLsLssLsLssLsLsLssLsLssLsLsLssLsLsMsLsLssLsLsLssLs

L = M -> LssLsLsLssLsLsLsLsLssLsLsLssLsLssLsLsLssLsLssLsLsLssLsLsLsLsLssLsLsLssLs Marvolo[72] MODMOS;

M = s -> LssLsLsLssLsLsssLsLssLsLsLssLsLssLsLsLssLsLssLsLsLssLsLsssLsLssLsLsLssLs Miracle[72] MODMOS;

L - M = M - s -> Compton MODMOS

s = 0 -> LLLLLLsLLLLLLLLLLLLLLLLLsLLLLLL Tritonic[31] MODMOS;

m = 0 -> LssLsLsLssLsLssLsLssLsLsLssLsLssLsLsLssLsLssLsLsLssLsLsssLsLssLsLsLssLs Andromeda[70] MODMOS

2.3.5; Starling, No-7 Ptolemismic, Supermagic, and Ragismic

(2/1, 3/2, 6/5)

(2/1, 3/2, 6/5)[4]

Step signature	Steps in JI	Step sizes in cents
1L 2M 1s	(5/4, 6/5, 10/9)	(386.3137c, 315.6413c, 182.4037c)

Mode number	Mode in JI	Step pattern	Mode height
-2	10/9 4/3 5/3 2/1	sMLM	-0.1307
-1	6/5 4/3 8/5 2/1	MsML	-0.0959
1	5/4 3/2 5/3 2/1	LMsM	0.0959
2	6/5 3/2 9/5 2/1	MLMs	0.1307

Rank-2 temperings (mode 2)
Equivalence	Step pattern	Scale	Comma list
L = M	LLLs	Dicot[4]	25/24
M = s	sLss	Bug[4]	27/25
L = s	LsLs	Antitonic[4]	9/8

(2/1, 3/2, 6/5)[7]

Step signature	Steps in JI	Step sizes in cents
1L 4M 2s	(9/8, 10/9, 27/25)	(203.9100c, 182.4037c, 133.2376c)

Mode number	Mode in JI	Step pattern	Meantone[7]	UDP	Diatonic mode	Porcupine[7]	UDP	Porcupine mode	Mode height
-3	27/25 6/5 4/3 36/25 8/5 9/5 2/1	sMMsMLM	sLLsLLL	0\|6	Lochrian	sssssLs	1\|5	Dark diminished	-0.0529
-2	10/9 6/5 4/3 40/27 8/5 16/9 2/1	MsMMsML	LsLLsLL	2\|4	Aeolian	ssssssL	0\|6	Magical seventh	-0.0316
-1	27/25 6/5 27/20 3/2 81/50 9/5 2/1	sMLMsMM	sLLLsLL	1\|5	Phrygian	ssLssss	4\|2	Bright minor	-0.0213
0	10/9 6/5 4/3 3/2 5/3 9/5 2/1	MsMLMsM	LsLLLsL	3\|3	Dorian	sssLsss	3\|3	Dark minor	0
1	10/9 100/81 4/3 40/27 5/3 50/27 2/1	MMsMLMs	LLsLLLs	5\|1	Ionian	ssssLss	2\|4	Bright diminished	0.0213
2	9/8 5/4 27/20 3/2 5/3 9/5 2/1	LMsMMsM	LLsLLsL	4\|2	Mixolydian	Lssssss	6\|0	Bright major	0.0316
3	10/9 5/4 25/18 3/2 5/3 50/27 2/1	MLMsMMs	LLLsLLs	6\|0	Lydian	sLsssss	5\|1	Dark major	0.0529

Rank-2 temperings (mode 2)
Equivalence	Step pattern	Scale	Comma list
L = M	LsLLLsL	Meantone[7]	81/80
M = s	sssLsss	Porcupine[7]	250/243
L = s	LsLsLsL	Dicot[7]	25/24
L - M = M - s	LsLALsL	Tetracot[7] MODMOS	20000/19683
s = 0	ssLss	Bug[5]	27/25

(2/1, 3/2, 6/5: 126/125)[7] (Starling)

Step signature	Steps in JI	Step sizes in cents (TE)
1L 4M 2s	(~9/8, ~10/9, 27/25~15/14)	(202.4685c, 187.562c, 123.5395c)

Mode number	Mode as simplest JI pre-image	Step pattern	Meantone[7]	UDP	Diatonic mode	Porcupine[7]	UDP	Porcupine mode	Mode height
-3	~ 15/14 6/5 4/3 10/7 8/5 9/5 2/1	sMMsMLM	sLLsLLL	0\|6	Lochrian	sssssLs	1\|5	Dark diminished	-0.0616
-2	~ 15/14 6/5 27/20 3/2 45/28 9/5 2/1	sMLMsMM	sLLLsLL	1\|5	Phrygian	ssLssss	4\|2	Bright minor	-0.0314
-1	~ 10/9 6/5 4/3 40/27 8/5 16/9 2/1	MsMMsML	LsLLsLL	2\|4	Aeolian	ssssssL	0\|6	Magical seventh	-0.0302
0	~ 10/9 6/5 4/3 3/2 5/3 9/5 2/1	MsMLMsM	LsLLLsL	3\|3	Dorian	sssLsss	3\|3	Dark minor	0
1	~ 9/8 5/4 27/20 3/2 5/3 9/5 2/1	LMsMMsM	LLsLLsL	4\|2	Mixolydian	Lssssss	6\|0	Bright major	0.0302
2	~ 10/9 56/45 4/3 40/27 5/3 28/15 2/1	MMsMLMs	LLsLLLs	5\|1	Ionian	ssssLss	2\|4	Bright diminished	0.0314
3	~ 10/9 5/4 7/5 3/2 5/3 28/15 2/1	MLMsMMs	LLLsLLs	6\|0	Lydian	sLsssss	5\|1	Dark major	0.0616

Rank-2 temperings (mode 0)
Equivalence	Step pattern	Scale	Comma list
L = M	LsLLLsL	Meantone[7]	81/80, 126/125
M = s	sssLsss	Opossum[7]	28/27, 126/125
L = s	LsLsLsL	Flat[7]	21/20, 25/24

Rank-1 temperings
ET	8d	12	15	16	19	27	31	46	50	58	77
Step sizes in ET	(2, 1, 1)	(2, 2, 1)	(3, 2, 2)	(2, 3, 1)	(3, 3, 2)	(5, 4, 3)	(5, 5, 3)	(8, 7, 5)	(8, 8, 5)	(10, 9, 6)	(13, 12, 8)

(2/1, 3/2, 6/5: 100/99)[7] (No-7 Ptolemismic)

Step signature	Steps in JI	Step sizes in cents (TE)
1L 4m 2s	(9/8~25/22, 10/9~11/10, 27/25~12/11)	(209.7786c, 174.0549c, 146.6352c)

Mode number	Mode as simplest JI pre-image	Step pattern	Meantone[7]	UDP	Diatonic mode	Porcupine[7]	UDP	Porcupine mode	Mode height
-3	~ 12/11 6/5 4/3 16/11 8/5 9/5 2/1	smmsmLm	sLLsLLL	0\|6	Lochrian	sssssLs	1\|5	Dark diminished	-0.0427
-2	~ 10/9 6/5 4/3 22/15 8/5 16/9 2/1	msmmsmL	LsLLsLL	2\|4	Aeolian	ssssssL	0\|6	Magical seventh	-0.0374
-1	~ 12/11 6/5 15/11 3/2 18/11 9/5 2/1	smLmsmm	sLLLsLL	1\|5	Phrygian	ssLssss	4\|2	Bright minor	-0.0053
0	~ 10/9 6/5 4/3 3/2 5/3 9/5 2/1	msmLmsm	LsLLLsL	3\|3	Dorian	sssLsss	3\|3	Dark minor	0
1	~ 10/9 11/9 4/3 22/15 5/3 11/6 2/1	mmsmLms	LLsLLLs	5\|1	Ionian	ssssLss	2\|4	Bright diminished	0.0053
2	~ 9/8 5/4 15/11 3/2 5/3 9/5 2/1	Lmsmmsm	LLsLLsL	4\|2	Mixolydian	Lssssss	6\|0	Bright major	0.0374
3	~ 10/9 5/4 11/8 3/2 5/3 11/6 2/1	mLmsmms	LLLsLLs	6\|0	Lydian	sLsssss	5\|1	Dark major	0.0427

Rank-2 temperings (mode 2)
Equivalence	Step pattern	Scale	Comma list
m = s	sssLsss	Porkypine[7]	55/54, 100/99
L = m	LsLLLsL	Meanenneadecal[7] or Flattone[7]	45/44, 81/80
L = s	LsLsLsL	Flat[7]	25/24, 33/32
L - m = m - s	LsLALsL	Tetracot[7] MODMOS	100/99, 243/242

Rank-1 temperings
ET	8	12	15	19	22	26	27e	29	34	37	41
Step sizes in ET	(2, 1, 1)	(2, 2, 1)	(3, 2, 2)	(3, 3, 2)	(4, 3, 3)	(4, 4, 3)	(5, 4, 3)	(5, 4, 4)	(6, 5, 4)	(7, 5, 5)	(7, 6, 5)

(2/1, 3/2, 6/5: 56/55, 100/99)[7] (Thrasher)

Step signature	Steps in JI	Step sizes in cents (TE)
1L 4M 2s	(9/8~25/22, 10/9~11/10, 27/25~15/14~12/11)	(215.4452c, 179.0856c, 132.5782c)

Mode number	Mode as simplest JI pre-image	Step pattern	Meantone[7]	UDP	Porcupine[7]	UDP	Porcupine mode	Diatonic mode	Mode height
-3	~ 12/11 6/5 4/3 10/7 8/5 9/5 2/1	sMMsMLM	sLLsLLL	0\|6	sssssLs	1\|5	Dark diminished	Lochrian	-0.0591
-2	~ 10/9 6/5 4/3 22/15 8/5 16/9 2/1	MsMMsML	LsLLsLL	2\|4	ssssssL	0\|6	Magical seventh	Aeolian	-0.0433
-1	~ 12/11 6/5 15/11 3/2 18/11 9/5 2/1	sMLMsMM	sLLLsLL	1\|5	ssLssss	4\|2	Bright minor	Phrygian	-0.0158
0	~ 10/9 6/5 4/3 3/2 5/3 9/5 2/1	MsMLMsM	LsLLLsL	3\|3	sssLsss	3\|3	Dark minor	Dorian	0
1	~ 10/9 11/9 4/3 22/15 5/3 11/6 2/1	MMsMLMs	LLsLLLs	5\|1	ssssLss	2\|4	Bright diminished	Ionian	0.0158
2	~ 9/8 5/4 15/11 3/2 5/3 9/5 2/1	LMsMMsM	LLsLLsL	4\|2	Lssssss	6\|0	Bright major	Mixolydian	0.0433
3	~ 10/9 5/4 7/5 3/2 5/3 11/6 2/1	MLMsMMs	LLLsLLs	6\|0	sLsssss	5\|1	Dark major	Lydian	0.0591

Rank-2 temperings (mode 2)
Equivalence	Step pattern	Scale	Comma list
L = M	LsLLLsL	Meanenneadecal[7]	45/44, 56/55, 81/80
M = s	sssLsss	Opossum[7]	28/27, 55/54, 77/75
L = s	LsLsLsL	Flat[7]	21/20, 25/24, 33/32

Rank-1 temperings
ET	8d	12	15	19	27e	34
Step sizes in ET	(2, 1, 1)	(2, 2, 1)	(3, 2, 2)	(3, 3, 2)	(5, 4, 3)	(6, 5, 4)

(2/1, 3/2, 6/5: 100/99, 144/143)[7] (No-7 Ptolemismic)

Step signature	Steps in JI	Step sizes in cents (TE)
1L 4m 2s	(9/8~25/22, 10/9~11/10, 27/25~12/11~13/12)	(209.5416c, 175.8918c, 142.7754c)

Mode number	Mode as simplest JI pre-image	Step pattern	Meantone[7]	UDP	Diatonic mode	Porcupine[7]	UDP	Porcupine mode
-3	~ 12/11 6/5 4/3 13/9 8/5 9/5 2/1	smmsmLm	sLLsLLL	0\|6	Lochrian	sssssLs	1\|5	Dark diminished
-2	~ 10/9 6/5 4/3 22/15 8/5 16/9 2/1	msmmsmL	LsLLsLL	2\|4	Aeolian	ssssssL	0\|6	Magical seventh
-1	~ 12/11 6/5 15/11 3/2 13/8 9/5 2/1	smLmsmm	sLLLsLL	1\|5	Phrygian	ssLssss	4\|2	Bright minor
0	~ 10/9 6/5 4/3 3/2 5/3 9/5 2/1	msmLmsm	LsLLLsL	3\|3	Dorian	sssLsss	3\|3	Dark minor
1	~ 10/9 11/9 4/3 22/15 5/3 11/6 2/1	mmsmLms	LLsLLLs	5\|1	Ionian	ssssLss	2\|4	Bright diminished
2	~ 9/8 5/4 15/11 3/2 5/3 9/5 2/1	Lmsmmsm	LLsLLsL	4\|2	Mixolydian	Lssssss	6\|0	Bright major
3	~ 10/9 5/4 11/8 3/2 5/3 11/6 2/1	mLmsmms	LLLsLLs	6\|0	Lydian	sLsssss	5\|1	Dark major

Rank-2 temperings (mode 2)
Equivalence	Step pattern	Scale	Comma list
m = s	sssLsss	Porcupine[7]	40/39, 55/54, 66/65
L = m	LsLLLsL	Flattone[7]	45/44, 65/64, 81/80
L - m = m - s	LsLALsL	Tetracot[7] MODMOS	100/99, 144/143, 243/242

Rank-1 temperings
ET	8	12	15	19	22f	26	27e	34	41
Step sizes in ET	(2, 1, 1)	(2, 2, 1)	(3, 2, 2)	(3, 3, 2)	(4, 3, 3)	(4, 4, 3)	(5, 4, 3)	(6, 5, 4)	(7, 6, 5)

(2/1, 3/2, 6/5)[12]

Step signature	Steps in JI	Step sizes in cents
7L 1m 4s	(27/25, 25/24, 250/243)	(133.2376c, 70.6724c, 49.1661c)

Mode number	Mode in JI	Step pattern	Meantone[12]	UDP	Mode height
-6	250/243 10/9 2500/2187 100/81 4/3 1000/729 40/27 125/81 5/3 1250/729 50/27 2/1	sLsLLsLmLsLL	sLsLLsLsLsLL	1\|10	-0.0622
-5	250/243 10/9 125/108 5/4 625/486 25/18 3/2 125/81 5/3 1250/729 50/27 2/1	sLmLsLLsLsLL	sLsLsLLsLsLL	0\|11	-0.0587
-4	250/243 10/9 6/5 100/81 4/3 1000/729 40/27 8/5 400/243 16/9 50/27 2/1	sLLsLsLLsLmL	sLLsLsLLsLsL	4\|7	-0.0338
-3	250/243 10/9 6/5 100/81 4/3 25/18 3/2 125/81 5/3 9/5 50/27 2/1	sLLsLmLsLLsL	sLLsLsLsLLsL	3\|8	-0.0302
-2	25/24 9/8 125/108 5/4 27/20 25/18 3/2 125/81 5/3 9/5 50/27 2/1	mLsLLsLsLLsL	sLsLLsLsLLsL	2\|9	-0.0267
-1	27/25 10/9 6/5 100/81 4/3 36/25 40/27 8/5 5/3 9/5 50/27 2/1	LsLsLLsLmLsL	LsLsLLsLsLsL	6\|5	-0.0018
1	27/25 10/9 6/5 5/4 27/20 25/18 3/2 81/50 5/3 9/5 50/27 2/1	LsLmLsLLsLsL	LsLsLsLLsLsL	5\|6	0.0018
2	27/25 10/9 6/5 162/125 4/3 36/25 40/27 8/5 216/125 16/9 48/25 2/1	LsLLsLsLLsLm	LsLLsLsLLsLs	9\|2	0.0267
3	27/25 10/9 6/5 162/125 4/3 36/25 3/2 81/50 5/3 9/5 243/125 2/1	LsLLsLmLsLLs	LsLLsLsLsLLs	8\|3	0.0302
4	27/25 9/8 243/200 5/4 27/20 729/500 3/2 81/50 5/3 9/5 243/125 2/1	LmLsLLsLsLLs	LsLsLLsLsLLs	7\|4	0.0338
5	27/25 729/625 6/5 162/125 4/3 36/25 972/625 8/5 216/125 9/5 243/125 2/1	LLsLsLLsLmLs	LLsLsLLsLsLs	11\|0	0.0587
6	27/25 729/625 6/5 162/125 27/20 729/500 3/2 81/50 2187/1250 9/5 243/125 2/1	LLsLmLsLLsLs	LLsLsLsLLsLs	10\|1	0.0622

Rank-2 temperings (mode -3)
Equivalence	Step pattern	Scale	Comma list
m = s	sLLsLsLsLLsL	Meantone[12]	81/80
L = m	sLLsLLLsLLsL	Diminished[12] MODMOS	648/625
L = s	LLLLLsLLLLLL	Ripple[12]	6561/6250
L - m = m - s	dLLdLsLdLLdL	Augmented[12] modmos	128/125
s = 0	LLLsLLLL	Porcupine[8]	250/243

(2/1, 3/2, 6/5: 126/125)[12] (Starling)

Step signature	Steps in JI	Step sizes in cents (TE)
7L 1m 4s	(27/25~15/14, 25/24~21/20, 250/243~28/27)	(123.5395c, 78.929c, 64.0225c)

Mode number	Mode as simplest JI pre-image	Step pattern	Meantone[12]	UDP	Mode height
-6	~ 28/27 10/9 280/243 56/45 4/3 112/81 40/27 14/9 5/3 140/81 28/15 2/1	sLsLLsLmLsLL	sLsLLsLsLsLL	1\|10	-0.0440
-5	~ 28/27 10/9 7/6 5/4 35/27 7/5 3/2 14/9 5/3 140/81 28/15 2/1	sLmLsLLsLsLL	sLsLsLLsLsLL	0\|11	-0.0417
-4	~ 28/27 10/9 6/5 56/45 4/3 112/81 40/27 8/5 224/135 16/9 28/15 2/1	sLLsLsLLsLmL	sLLsLsLLsLsL	4\|7	-0.0237
-3	~ 28/27 10/9 6/5 56/45 4/3 7/5 3/2 14/9 5/3 9/5 28/15 2/1	sLLsLmLsLLsL	sLLsLsLsLLsL	3\|8	-0.0214
-2	~ 21/20 9/8 7/6 5/4 27/20 7/5 3/2 14/9 5/3 9/5 28/15 2/1	mLsLLsLsLLsL	sLsLLsLsLLsL	2\|9	-0.0191
-1	~ 15/14 10/9 6/5 56/45 4/3 10/7 40/27 8/5 5/3 9/5 28/15 2/1	LsLsLLsLmLsL	LsLsLLsLsLsL	6\|5	-0.0011
1	~ 15/14 10/9 6/5 5/4 27/20 7/5 3/2 45/28 5/3 9/5 28/15 2/1	LsLmLsLLsLsL	LsLsLsLLsLsL	5\|6	0.0011
2	~ 15/14 10/9 6/5 9/7 4/3 10/7 40/27 8/5 12/7 16/9 40/21 2/1	LsLLsLsLLsLm	LsLLsLsLLsLs	9\|2	0.0191
3	~ 15/14 10/9 6/5 9/7 4/3 10/7 3/2 45/28 5/3 9/5 27/14 2/1	LsLLsLmLsLLs	LsLLsLsLsLLs	8\|3	0.0214
4	~ 15/14 9/8 135/112 5/4 27/20 81/56 3/2 45/28 5/3 9/5 27/14 2/1	LmLsLLsLsLLs	LsLsLLsLsLLs	7\|4	0.0237
5	~ 15/14 81/70 6/5 9/7 4/3 10/7 54/35 8/5 12/7 9/5 27/14 2/1	LLsLsLLsLmLs	LLsLsLLsLsLs	11\|0	0.0417
6	~ 15/14 81/70 6/5 9/7 27/20 81/56 3/2 45/28 243/140 9/5 27/14 2/1	LLsLmLsLLsLs	LLsLsLsLLsLs	10\|1	0.0440

Rank-2 temperings (mode -3)
Equivalence	Step pattern	Scale	Comma list
m = s	sLLsLsLsLLsL	Meantone[12]	81/80, 126/125
L = m	sLLsLLLsLLsL	Diminished[12] MODMOS	36/35, 50/49
L - m = m - s	dLLdLsLdLLdL	Augene[12] MODMOS	64/63, 126/125
s = 0	LLLsLLLL	Opossum[8]	28/27, 126/125

Rank-1 temperings
ET	15	16	19	27	31	46	50	58	77
Step sizes in ET	(2, 1, 0)	(1, 1, 2)	(2, 1, 1)	(3, 2, 1)	(3, 2, 2)	(5, 3, 2)	(5, 3, 3)	(6, 4, 3)	(8, 5, 4)

(2/1, 3/2, 6/5: 126/125, 196/195)[12]

Step signature	Steps in JI	Step sizes in cents (TE)
7L 1m 4s	(27/25~15/14~14/13, 25/24~21/20, 250/243~28/27~65/63)	(123.5395c, 78.929c, 64.0225c)

Mode number	Mode as simplest JI pre-image	Step pattern	Meantone[12]	UDP	Mode height
-6	~ 28/27 10/9 52/45 26/21 4/3 104/75 40/27 14/9 5/3 26/15 13/7 2/1	sLsLLsLmLsLL	sLsLLsLsLsLL	1\|10	-0.0465
-5	~ 28/27 10/9 7/6 5/4 13/10 7/5 3/2 14/9 5/3 26/15 13/7 2/1	sLmLsLLsLsLL	sLsLsLLsLsLL	0\|11	-0.0433
-4	~ 28/27 10/9 6/5 26/21 4/3 104/75 40/27 8/5 104/63 16/9 13/7 2/1	sLLsLsLLsLmL	sLLsLsLLsLsL	4\|7	-0.0256
-3	~ 28/27 10/9 6/5 26/21 4/3 7/5 3/2 14/9 5/3 9/5 13/7 2/1	sLLsLmLsLLsL	sLLsLsLsLLsL	3\|8	-0.0225
-2	~ 21/20 9/8 7/6 5/4 27/20 7/5 3/2 14/9 5/3 9/5 13/7 2/1	mLsLLsLsLLsL	sLsLLsLsLLsL	2\|9	-0.0193
-1	~ 14/13 10/9 6/5 26/21 4/3 10/7 40/27 8/5 5/3 9/5 13/7 2/1	LsLsLLsLmLsL	LsLsLLsLsLsL	6\|5	-0.0016
1	~ 14/13 10/9 6/5 5/4 27/20 7/5 3/2 21/13 5/3 9/5 13/7 2/1	LsLmLsLLsLsL	LsLsLsLLsLsL	5\|6	0.0016
2	~ 14/13 10/9 6/5 9/7 4/3 10/7 40/27 8/5 12/7 16/9 40/21 2/1	LsLLsLsLLsLm	LsLLsLsLLsLs	9\|2	0.0193
3	~ 14/13 10/9 6/5 9/7 4/3 10/7 3/2 21/13 5/3 9/5 27/14 2/1	LsLLsLmLsLLs	LsLLsLsLsLLs	8\|3	0.0225
4	~ 14/13 9/8 63/52 5/4 27/20 75/52 3/2 21/13 5/3 9/5 27/14 2/1	LmLsLLsLsLLs	LsLsLLsLsLLs	7\|4	0.0256
5	~ 14/13 15/13 6/5 9/7 4/3 10/7 20/13 8/5 12/7 9/5 27/14 2/1	LLsLsLLsLmLs	LLsLsLLsLsLs	11\|0	0.0433
6	~ 14/13 15/13 6/5 9/7 27/20 75/52 3/2 21/13 45/26 9/5 27/14 2/1	LLsLmLsLLsLs	LLsLsLsLLsLs	10\|1	0.0465

Rank-2 temperings (mode -3)
Equivalence	Step pattern	Scale	Comma list
m = s	sLLsLsLsLLsL	Meanpop[12]	81/80, 105/104, 126/125

Rank-1 temperings
ET	15f	19	27	31	46	50	58	77
Step sizes in ET	(2, 1, 0)	(2, 1, 1)	(3, 2, 1)	(3, 2, 2)	(5, 3, 2)	(5, 3, 3)	(6, 4, 3)	(8, 5, 4)

(2/1, 3/2, 6/5: 100/99)[12] (No-7 Ptolemismic)

Step signature	Steps in JI	Step sizes in cents (TE)
7L 1m 4s	(27/25~12/11, 25/24~33/32, 250/243~55/54~121/120)	(146.6352c, 63.1434c, 27.4197c)

Mode number	Mode as simplest JI pre-image	Step pattern	Meantone[12]	UDP	Mode height
-6	~ 55/54 10/9 121/108 11/9 4/3 110/81 22/15 55/36 5/3 121/72 11/6 2/1	sLsLLsLmLsLL	sLsLLsLsLsLL	1\|10	-0.0899
-5	~ 55/54 10/9 55/48 5/4 121/96 11/8 3/2 55/36 5/3 121/72 11/6 2/1	sLmLsLLsLsLL	sLsLsLLsLsLL	0\|11	-0.0819
-4	~ 55/54 10/9 6/5 11/9 4/3 110/81 22/15 8/5 44/27 16/9 11/6 2/1	sLLsLsLLsLmL	sLLsLsLLsLsL	4\|7	-0.0510
-3	~ 55/54 10/9 6/5 11/9 4/3 11/8 3/2 55/36 5/3 9/5 11/6 2/1	sLLsLmLsLLsL	sLLsLsLsLLsL	3\|8	-0.0430
-2	~ 25/24 9/8 55/48 5/4 15/11 11/8 3/2 55/36 5/3 9/5 11/6 2/1	mLsLLsLsLLsL	sLsLLsLsLLsL	2\|9	-0.0349
-1	~ 12/11 10/9 6/5 11/9 4/3 16/11 22/15 8/5 5/3 9/5 11/6 2/1	LsLsLLsLmLsL	LsLsLLsLsLsL	6\|5	-0.0040
1	~ 12/11 10/9 6/5 5/4 15/11 11/8 3/2 18/11 5/3 9/5 11/6 2/1	LsLmLsLLsLsL	LsLsLsLLsLsL	5\|6	0.0040
2	~ 12/11 10/9 6/5 72/55 4/3 16/11 22/15 8/5 96/55 16/9 48/25 2/1	LsLLsLsLLsLm	LsLLsLsLLsLs	9\|2	0.0349
3	~ 12/11 10/9 6/5 72/55 4/3 16/11 3/2 18/11 5/3 9/5 108/55 2/1	LsLLsLmLsLLs	LsLLsLsLsLLs	8\|3	0.0430
4	~ 12/11 9/8 27/22 5/4 15/11 81/55 3/2 18/11 5/3 9/5 108/55 2/1	LmLsLLsLsLLs	LsLsLLsLsLLs	7\|4	0.0510
5	~ 12/11 144/121 6/5 72/55 4/3 16/11 192/121 8/5 96/55 9/5 108/55 2/1	LLsLsLLsLmLs	LLsLsLLsLsLs	11\|0	0.0819
6	~ 12/11 144/121 6/5 72/55 15/11 81/55 3/2 18/11 216/121 9/5 108/55 2/1	LLsLmLsLLsLs	LLsLsLsLLsLs	10\|1	0.0899

Rank-2 temperings (mode -3)
Equivalence	Step pattern	Scale	Comma list
m = s	sLLsLsLsLLsL	Meanenneadecal[12] or Flattone[12]	45/44, 81/80
L = m	sLLsLLLsLLsL	Diminished[12] modmos	100/99, 128/121
L - m = m - s	dLLdLsLdLLdL	Augene[12] modmos	100/99, 128/125
s = 0	LLLsLLLL	Porcupine[8]	55/54, 100/99

Rank-1 temperings
ET	15	19	22	26	27e	29	34	37	41
Step sizes in ET	(2, 1, 0)	(2, 1, 1)	(3, 1, 0)	(3, 1, 1)	(3, 2, 1)	(4, 1, 0)	(4, 2, 1)	(5, 2, 0)	(5, 2, 1)

(2/1, 3/2, 6/5: 100/99, 144/143)[12] (No-7 Ptolemismic)

Step signature	Steps in JI	Step sizes in cents (TE)
7L 1m 4s	(27/25~12/11~13/12, 25/24~33/32~27/26, 250/243~55/54~121/120~40/39)	(142.77537c, 66.76626c, 33.11646c)

Mode number	Mode as simplest JI pre-image	Step pattern	Meantone[12]	UDP
-6	~ 40/39 10/9 44/39 11/9 4/3 110/81 22/15 20/13 5/3 22/13 11/6 2/1	sLsLLsLmLsLL	sLsLLsLsLsLL	1\|10
-5	~ 40/39 10/9 15/13 5/4 33/26 11/8 3/2 20/13 5/3 22/13 11/6 2/1	sLmLsLLsLsLL	sLsLsLLsLsLL	0\|11
-4	~ 40/39 10/9 6/5 11/9 4/3 110/81 22/15 8/5 44/27 16/9 11/6 2/1	sLLsLsLLsLmL	sLLsLsLLsLsL	4\|7
-3	~ 40/39 10/9 6/5 11/9 4/3 11/8 3/2 20/13 5/3 9/5 11/6 2/1	sLLsLmLsLLsL	sLLsLsLsLLsL	3\|8
-2	~ 25/24 9/8 15/13 5/4 15/11 11/8 3/2 20/13 5/3 9/5 11/6 2/1	mLsLLsLsLLsL	sLsLLsLsLLsL	2\|9
-1	~ 12/11 10/9 6/5 11/9 4/3 13/9 22/15 8/5 5/3 9/5 11/6 2/1	LsLsLLsLmLsL	LsLsLLsLsLsL	6\|5
1	~ 12/11 10/9 6/5 5/4 15/11 11/8 3/2 13/8 5/3 9/5 11/6 2/1	LsLmLsLLsLsL	LsLsLsLLsLsL	5\|6
2	~ 12/11 10/9 6/5 13/10 4/3 13/9 22/15 8/5 26/15 16/9 48/25 2/1	LsLLsLsLLsLm	LsLLsLsLLsLs	9\|2
3	~ 12/11 10/9 6/5 13/10 4/3 13/9 3/2 13/8 5/3 9/5 39/20 2/1	LsLLsLmLsLLs	LsLLsLsLsLLs	8\|3
4	~ 12/11 9/8 27/22 5/4 15/11 81/55 3/2 13/8 5/3 9/5 39/20 2/1	LmLsLLsLsLLs	LsLsLLsLsLLs	7\|4
5	~ 12/11 13/11 6/5 13/10 4/3 13/9 52/33 8/5 26/15 9/5 39/20 2/1	LLsLsLLsLmLs	LLsLsLLsLsLs	11\|0
6	~ 12/11 13/11 6/5 13/10 15/11 81/55 3/2 13/8 39/22 9/5 39/20 2/1	LLsLmLsLLsLs	LLsLsLsLLsLs	10\|1

Rank-2 temperings (mode -3)
Equivalence	Step pattern	Scale	Comma list
m = s	sLLsLsLsLLsL	Flattone[12]	45/44, 65/64, 81/80
s = 0	LLLsLLLL	Porcupine[8]	40/39, 55/54, 66/65

Rank-1 temperings
ET	15	19	22f	26	27e	34	41
Step sizes in ET	(2, 1, 0)	(2, 1, 1)	(3, 1, 0)	(3, 1, 1)	(3, 2, 1)	(4, 2, 1)	(5, 2, 1)

(2/1, 3/2, 6/5: 100/99, 385/384)[12] (Keemic)

Step signature	Steps in JI	Step sizes in cents (TE)
7L 1m 4s	(27/25~12/11~35/32, 25/24~33/32, 250/243~55/54~64/63~121/120)	(149.51592c, 58.8799c, 23.6254c)

Mode number	Mode as simplest JI pre-image	Step pattern	Meantone[12]	UDP
-6	~ 55/54 10/9 121/108 11/9 4/3 110/81 22/15 32/21 5/3 121/72 11/6 2/1	sLsLLsLmLsLL	sLsLLsLsLsLL	1\|10
-5	~ 55/54 10/9 8/7 5/4 121/96 11/8 3/2 32/21 5/3 121/72 11/6 2/1	sLmLsLLsLsLL	sLsLsLLsLsLL	0\|11
-4	~ 55/54 10/9 6/5 11/9 4/3 110/81 22/15 8/5 44/27 16/9 11/6 2/1	sLLsLsLLsLmL	sLLsLsLLsLsL	4\|7
-3	~ 55/54 10/9 6/5 11/9 4/3 11/8 3/2 32/21 5/3 9/5 11/6 2/1	sLLsLmLsLLsL	sLLsLsLsLLsL	3\|8
-2	~ 25/24 9/8 8/7 5/4 15/11 11/8 3/2 32/21 5/3 9/5 11/6 2/1	mLsLLsLsLLsL	sLsLLsLsLLsL	2\|9
-1	~ 12/11 10/9 6/5 11/9 4/3 16/11 22/15 8/5 5/3 9/5 11/6 2/1	LsLsLLsLmLsL	LsLsLLsLsLsL	6\|5
1	~ 12/11 10/9 6/5 5/4 15/11 11/8 3/2 18/11 5/3 9/5 11/6 2/1	LsLmLsLLsLsL	LsLsLsLLsLsL	5\|6
2	~ 12/11 10/9 6/5 21/16 4/3 16/11 22/15 8/5 7/4 16/9 48/25 2/1	LsLLsLsLLsLm	LsLLsLsLLsLs	9\|2
3	~ 12/11 10/9 6/5 21/16 4/3 16/11 3/2 18/11 5/3 9/5 63/32 2/1	LsLLsLmLsLLs	LsLLsLsLsLLs	8\|3
4	~ 12/11 9/8 27/22 5/4 15/11 81/55 3/2 18/11 5/3 9/5 63/ 2/1	LmLsLLsLsLLs	LsLsLLsLsLLs	7\|4
5	~ 12/11 144/121 6/5 21/16 4/3 16/11 192/121 8/5 7/4 9/5 63/32 2/1	LLsLsLLsLmLs	LLsLsLLsLsLs	11\|0
6	~ 12/11 144/121 6/5 21/16 15/11 81/55 3/2 18/11 216/121 9/5 63/32 2/1	LLsLmLsLLsLs	LLsLsLsLLsLs	10\|1

Rank-2 temperings (mode -3)
Equivalence	Step pattern	Scale	Comma list
m = s	sLLsLsLsLLsL	Flattone[12]	45/44, 81/80, 385/384
s = 0	LLLsLLLL	Porcupine[8]	55/54, 64/63, 100/99

Rank-1 temperings
ET	15	19	22	26	34	41	104
Step sizes in ET	(2, 1, 0)	(2, 1, 1)	(3, 1, 0)	(3, 1, 1)	(4, 2, 1)	(5, 2, 1)	(13, 5, 2)

(2/1, 3/2, 6/5: 100/99, 105/104, 144/143)[12] (Keemic)

Step signature	Steps in JI	Step sizes in cents (TE)
7L 1m 4s	(27/25~12/11~13/12~35/32, 25/24~27/26~33/32, 250/243~40/39~55/54~64/63~121/120)	(145.47082c, 58.39270c, 30.85183c)

Mode number	Mode as simplest JI pre-image	Step pattern	Meantone[12]	UDP
-6	~ 40/39 10/9 44/39 11/9 4/3 110/81 22/15 20/13 5/3 22/13 11/6 2/1	sLsLLsLmLsLL	sLsLLsLsLsLL	1\|10
-5	~ 40/39 10/9 8/7 5/4 33/26 11/8 3/2 20/13 5/3 22/13 11/6 2/1	sLmLsLLsLsLL	sLsLsLLsLsLL	0\|11
-4	~ 40/39 10/9 6/5 11/9 4/3 110/81 22/15 8/5 44/27 16/9 11/6 2/1	sLLsLsLLsLmL	sLLsLsLLsLsL	4\|7
-3	~ 40/39 10/9 6/5 11/9 4/3 11/8 3/2 20/13 5/3 9/5 11/6 2/1	sLLsLmLsLLsL	sLLsLsLsLLsL	3\|8
-2	~ 25/24 9/8 8/7 5/4 15/11 11/8 3/2 20/13 5/3 9/5 11/6 2/1	mLsLLsLsLLsL	sLsLLsLsLLsL	2\|9
-1	~ 12/11 10/9 6/5 11/9 4/3 13/9 22/15 8/5 5/3 9/5 11/6 2/1	LsLsLLsLmLsL	LsLsLLsLsLsL	6\|5
1	~ 12/11 10/9 6/5 5/4 15/11 11/8 3/2 13/8 5/3 9/5 11/6 2/1	LsLmLsLLsLsL	LsLsLsLLsLsL	5\|6
2	~ 12/11 10/9 6/5 13/10 4/3 13/9 22/15 8/5 7/4 16/9 48/25 2/1	LsLLsLsLLsLm	LsLLsLsLLsLs	9\|2
3	~ 12/11 10/9 6/5 13/10 4/3 13/9 3/2 13/8 5/3 9/5 39/20 2/1	LsLLsLmLsLLs	LsLLsLsLsLLs	8\|3
4	~ 12/11 9/8 27/22 5/4 15/11 81/55 3/2 13/8 5/3 9/5 39/20 2/1	LmLsLLsLsLLs	LsLsLLsLsLLs	7\|4
5	~ 12/11 13/11 6/5 13/10 4/3 13/9 52/33 8/5 7/4 9/5 39/20 2/1	LLsLsLLsLmLs	LLsLsLLsLsLs	11\|0
6	~ 12/11 13/11 6/5 13/10 15/11 81/55 3/2 13/8 39/22 9/5 39/20 2/1	LLsLmLsLLsLs	LLsLsLsLLsLs	10\|1

Rank-2 temperings (mode -3)
Equivalence	Step pattern	Scale	Comma list
m = s	sLLsLsLsLLsL	Flattone[12]	45/44, 65/64, 78/77, 81/80
s = 0	LLLsLLLL	Porcupine[8]	40/39, 55/54, 64/63, 66/65

Rank-1 temperings
ET	15	19	22f	26	34	41
Step sizes in ET	(2, 1, 0)	(2, 1, 1)	(3, 1, 0)	(3, 1, 1)	(4, 2, 1)	(5, 2, 1)

(2/1, 3/2, 6/5: 56/55, 100/99)[12] (Thrasher)

Step signature	Steps in JI	Step sizes in cents (TE)
7L 1m 4s	(27/25~15/14~12/11, 25/24~21/20~33/32, 250/243~28/27~55/54)	(132.5782c, 82.867c, 46.5074c)

Mode number	Mode as simplest JI pre-image	Step pattern	Meantone[12]	UDP	Mode height
-6	~ 28/27 10/9 121/108 11/9 4/3 110/81 22/15 14/9 5/3 121/72 11/6 2/1	sLsLLsLmLsLL	sLsLLsLsLsLL	1\|10	-0.0671
-5	~ 28/27 10/9 7/6 5/4 121/96 11/8 3/2 14/9 5/3 121/72 11/6 2/1	sLmLsLLsLsLL	sLsLsLLsLsLL	0\|11	-0.0526
-4	~ 28/27 10/9 6/5 11/9 4/3 110/81 22/15 8/5 44/27 16/9 11/6 2/1	sLLsLsLLsLmL	sLLsLsLLsLsL	4\|7	-0.0445
-3	~ 28/27 10/9 6/5 11/9 4/3 11/8 3/2 14/9 5/3 9/5 11/6 2/1	sLLsLmLsLLsL	sLLsLsLsLLsL	3\|8	-0.0299
-2	~ 21/20 9/8 7/6 5/4 15/11 11/8 3/2 14/9 5/3 9/5 11/6 2/1	mLsLLsLsLLsL	sLsLLsLsLLsL	2\|9	-0.0154
-1	~ 12/11 10/9 6/5 11/9 4/3 16/11 22/15 8/5 5/3 9/5 11/6 2/1	LsLsLLsLmLsL	LsLsLLsLsLsL	6\|5	-0.0073
1	~ 12/11 10/9 6/5 5/4 15/11 11/8 3/2 81/50 5/3 9/5 11/6 2/1	LsLmLsLLsLsL	LsLsLsLLsLsL	5\|6	0.0073
2	~ 12/11 10/9 6/5 9/7 4/3 16/11 22/15 8/5 12/7 16/9 48/25 2/1	LsLLsLsLLsLm	LsLLsLsLLsLs	9\|2	0.0154
3	~ 12/11 10/9 6/5 9/7 4/3 16/11 3/2 18/11 5/3 9/5 27/14 2/1	LsLLsLmLsLLs	LsLLsLsLsLLs	8\|3	0.0299
4	~ 12/11 9/8 27/22 5/4 15/11 81/55 3/2 18/11 5/3 9/5 27/14 2/1	LmLsLLsLsLLs	LsLsLLsLsLLs	7\|4	0.0445
5	~ 12/11 144/121 6/5 9/7 4/3 16/11 192/121 8/5 12/7 9/5 27/14 2/1	LLsLsLLsLmLs	LLsLsLLsLsLs	11\|0	0.0526
6	~ 12/11 144/121 6/5 9/7 15/11 81/55 3/2 81/50 216/121 9/5 27/14 2/1	LLsLmLsLLsLs	LLsLsLsLLsLs	10\|1	0.0671

Rank-2 temperings (mode -3)
Equivalence	Step pattern	Scale	Comma list
m = s	sLLsLsLsLLsL	Meanenneadecal[12]	45/44, 56/55, 81/80
L = m	sLLsLLLsLLsL	Diminished[12] MODMOS	36/35, 50/49, 56/55
s = 0	LLLsLLLL	Opossum[8]	28/27, 55/54, 77/75

Rank-1 temperings
ET	15	19	27e	34
Step sizes in ET	(2, 1, 0)	(2, 1, 1)	(3, 2, 1)	(4, 2, 1)

(2/1, 3/2, 6/5: 56/55, 91/90, 100/99)[12] (Thrasher)

Step signature	Steps in JI	Step sizes in cents (TE)
7L 1m 4s	(27/25~15/14~12/11~13/12, 25/24~21/20~33/32~27/26, 250/243~28/27~55/54~40/39)

Mode number	Mode as simplest JI pre-image	Step pattern	Meantone[12]	UDP
-6	~ 28/27 10/9 44/39 11/9 4/3 110/81 22/15 14/9 5/3 22/13 11/6 2/1	sLsLLsLmLsLL	sLsLLsLsLsLL	1\|10
-5	~ 28/27 10/9 7/6 5/4 33/26 11/8 3/2 14/9 5/3 121/72 11/6 2/1	sLmLsLLsLsLL	sLsLsLLsLsLL	0\|11
-4	~ 28/27 10/9 6/5 11/9 4/3 110/81 22/15 8/5 44/27 16/9 11/6 2/1	sLLsLsLLsLmL	sLLsLsLLsLsL	4\|7
-3	~ 28/27 10/9 6/5 11/9 4/3 11/8 3/2 14/9 5/3 9/5 11/6 2/1	sLLsLmLsLLsL	sLLsLsLsLLsL	3\|8
-2	~ 21/20 9/8 7/6 5/4 15/11 11/8 3/2 14/9 5/3 9/5 11/6 2/1	mLsLLsLsLLsL	sLsLLsLsLLsL	2\|9
-1	~ 12/11 10/9 6/5 11/9 4/3 16/11 22/15 8/5 5/3 9/5 11/6 2/1	LsLsLLsLmLsL	LsLsLLsLsLsL	6\|5
1	~ 12/11 10/9 6/5 5/4 15/11 11/8 3/2 81/50 5/3 9/5 11/6 2/1	LsLmLsLLsLsL	LsLsLsLLsLsL	5\|6
2	~ 12/11 10/9 6/5 9/7 4/3 16/11 22/15 8/5 12/7 16/9 48/25 2/1	LsLLsLsLLsLm	LsLLsLsLLsLs	9\|2
3	~ 12/11 10/9 6/5 9/7 4/3 16/11 3/2 18/11 5/3 9/5 27/14 2/1	LsLLsLmLsLLs	LsLLsLsLsLLs	8\|3
4	~ 12/11 9/8 27/22 5/4 15/11 81/55 3/2 18/11 5/3 9/5 27/14 2/1	LmLsLLsLsLLs	LsLsLLsLsLLs	7\|4
5	~ 12/11 13/11 6/5 9/7 4/3 16/11 192/121 8/5 12/7 9/5 27/14 2/1	LLsLsLLsLmLs	LLsLsLLsLsLs	11\|0
6	~ 12/11 13/11 6/5 9/7 15/11 81/55 3/2 81/50 39/22 9/5 27/14 2/1	LLsLmLsLLsLs	LLsLsLsLLsLs	10\|1

Rank-2 temperings (mode -3)
Equivalence	Step pattern	Scale	Comma list
m = s	sLLsLsLsLLsL	Vincenzo[12]	45/44, 56/55, 65/64, 81/80
s = 0	LLLsLLLL	Opossum[8]	28/27, 40/39, 55/54, 66/65

Rank-1 temperings
ET	15	19	27e	34
Step sizes in ET	(2, 1, 0)	(2, 1, 1)	(3, 2, 1)	(4, 2, 1)

(2/1, 3/2, 6/5: 4375/4374)[12] (Ragismic)

7L 1m 4s = (~27/25, ~25/24, 250/243~36/35) = (133.4115c, 70.5569c, 48.8911c) TE

~ 27/25 10/9 6/5 35/27 4/3 36/25 3/2 81/50 5/3 9/5 35/18 2/1 as LsLLsLmLsLLs

m = s -> LsLLsLsLsLLs Falttone[12]; L = m -> LsLLsLLLsLLs MODMOS; L = s -> LLLLLLsLLLLL; s = 0 -> LLLLsLLL Hystrix[8]

19-ET: (2, 1, 1); 53-ET: (6, 3, 2); 72-ET: (8, 4, 3); 99-ET: (11, 6, 4); 118-ET: (13, 7, 5); 152-ET: (17, 9, 6); 171-ET: (19, 10, 7); 224-ET: (25, 13, 9); 270-ET: (30, 16, 11); 441-ET: (49, 26, 18); 494-ET: (55, 29, 20); 612-ET: (68, 36, 25)

(2/1, 3/2, 6/5: 100/99, 144/143)[20] (No-7 Ptolemismic)

7L 12m 1s = (~189/176, 250/243~55/54~121/120~40/39, 81/80~45/44~65/64) =

(2/1, 3/2, 6/5: 100/99, 385/384)[20] (Keemic)

7L 12m 1s = (~189/176, 250/243~55/54~121/120~64/63, 81/80~45/44) = (125.8905c, 35.2545c, 23.6254c) TE

40/39 12/11 10/9 32/27 6/5 11/9 13/10 4/3 11/8 22/15 3/2 20/13 13/8 5/3 16/9 9/5 11/6 39/20 2/1

(2/1, 3/2, 6/5: 4375/4374)[20] (Ragismic)

7L 12m 1s = (~21/20, 250/243~36/35, ~81/80) = (84.5204c, 48.8911c, 21.6658c) TE

~ 21/20 27/25 10/9 7/6 6/5 63/50 35/27 4/3 7/5 36/25 35/24 3/2 63/40 81/50 5/3 7/4 9/5 189/100 35/18 2/1 as LmmLmLmmLmsmLmmLmLmm

m = s -> LssLsLssLsssLssLsLss MODMOS; L = m -> LLLLLLLLLLsLLLLLLLLL; L = s -> LssLsLssLsLsLssLsLss MODMOS;

L - m = m - s -> Unidec[20] MODMOS

s = 0 -> LmmLmLmmLmmLmmLmLmm Falttone[19]; m = 0 -> LLLLsLLL Hystrix[8]

19-ET: (1, 1, 0); 53-ET: (4, 2, 1); 72-ET: (5, 3, 1); 99-ET: (7, 4, 2); 118-ET: (8, 5, 2); 152-ET: (11, 6, 3); 171-ET: (12, 7, 3); 224-ET: (16, 9, 4); 270-ET: (19, 11, 5); 441-ET: (31, 18, 8); 494-ET: (35, 20, 9); 612-ET: (43, 25, 11)

(2/1, 3/2, 6/5: 3025/3024, 4375/4374)[20] (Thor)

7L 12m 1s = (~21/20, 250/243~36/35, 81/80~245/242) = (84.5509c, 48.8802c, 21.6019c) TE

~ 21/20 27/25 10/9 7/6 6/5 63/50 35/27 4/3 7/5 36/25 35/24 3/2 63/40 81/50 5/3 7/4 9/5 121/64 35/18 2/1 as LmmLmLmmLmsmLmmLmLmm

m = s -> LssLsLssLsssLssLsLss MODMOS; L = m -> LLLLLLLLLLsLLLLLLLLL; L = s -> LssLsLssLsLsLssLsLss MODMOS;

s = 0 -> LmmLmLmmLmmLmmLmLmm; m = 0 -> LLLLsLLL

19-ET: (1, 1, 0); 34d: (3, 1, 1); 46-ET: (3, 2, 1); 72-ET: (5, 3, 1); 80-ET: (6, 3, 2); 118-ET: (8, 5, 2); 152-ET: (11, 6, 3); 171-ET: (12, 7, 3); 224-ET: (16, 9, 4); 270-ET: (19, 11, 5); 494-ET: (35, 20, 9); 612-ET: (43, 25, 11)

(2/1, 3/2, 6/5: 3025/3024, 4375/4374)[39] (Thor)

7L 12m 20s = (~28/27, ~64/63, 81/80~245/242) = (62.949c, 27.2783c, 21.6019c) TE

~ 81/80 36/35 126/121 27/25 35/32 10/9 9/8 8/7 81/70 6/5 147/121 216/175 5/4 35/27 21/16 4/3 27/20 48/35 25/18 36/25 35/24 40/27 3/2 32/21 54/35 8/5 175/108 242/147 5/3 140/81 7/4 16/9 9/5 64/35 121/63 35/18 160/81 2/1 as smsLsmsmsLsmsLsmsmsLsmsmsLsmsLsmsmsLsms

m = s -> sssLsssssLsssLsssssLsssssLsssLsssssLsss Hemiamity[39] MODMOS; L = m -> sLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLs; s = 0 -> sLssLsLssLssLsLssLs

46-ET: (2, 1, 1); 72-ET: (4, 2, 1); 80-ET: (4, 1, 2); 118-ET: (6, 3, 2); 152-ET: (8, 3, 3); 171-ET: (9, 4, 3); 224-ET: (12, 5, 4); 270-ET: (14, 6, 5); 494-ET: (26, 11, 9); 612-ET: (32, 14, 11)

((2/1, 6/5)[4], 10/9)

((2/1, 6/5)[4], 10/9)[8]

Step signature	Steps in JI	Step sizes in cents
4L 3M 1s	10/9, 27/25, 25/24	(182.4037c, 133.2376c, 70.6724c)


Mode number	Mode in JI (height order)	Step pattern	Porcupine[8] step pattern and UDP	Diminished[8] step pattern and UDP
4	10/9 6/5 4/3 36/25 8/5 216/125 48/25 2/1	LMLMLMLs	LLLLLLLs 7\|0	LsLsLsLs 1\|0 (4)
3	10/9 6/5 4/3 36/25 8/5 5/3 50/27 2/1	LMLMLsLM	LLLLLsLL 5\|2	LsLsLsLs 1\|0 (4)
2	27/25 6/5 162/125 36/25 972/625 216/125 9/5 2/1	MLMLMLsL	LLLLLLsL 6\|1	sLsLsLsL 0\|1 (4)
1	10/9 6/5 4/3 25/18 125/81 5/3 50/27 2/1	LMLsLMLM	LLLsLLLL 3\|4	LsLsLsLs 1\|0 (4)
-1	27/25 6/5 162/125 36/25 3/2 5/3 9/5 2/1	MLMLsLML	LLLLsLLL 4\|3	sLsLsLsL 0\|1 (4)
-2	10/9 125/108 625/486 25/18 125/81 5/3 50/27 2/1	LsLMLMLM	LsLLLLLL 1\|6	LsLsLsLs 1\|0 (4)
-3	27/25 6/5 5/4 25/18 3/2 5/3 9/5 2/1	MLsLMLML	LLsLLLLL 2\|5	sLsLsLsL 0\|1 (4)
-4	25/24 125/108 5/4 25/18 3/2 5/3 9/5 2/1	sLMLMLML	sLLLLLLL 0\|7	sLsLsLsL 0\|1 (4)

Rank-2 temperings (mode 4)
Equivalence	Step pattern	Scale	Comma list
M = 0	LLLLs	Bug[5]	27/25
s = 0	LsLsLsL	Dicot[7]	25/24
L = M	LLLLLLLs	Porcupine[8]	250/243
M = s	LsLsLsLs	Diminished[8]	648/625
L - M = M - s	LsLsLsLd	Sensipent[8] MODMOS	78732/78125

Rank-1 temperings
ET	12	15	19	22	26	27	29	31	34	41	46	53	65
Step sizes in ET	(2, 1, 1)	(2, 2, 1)	(3, 2, 1)	(3, 3, 1)	(4, 3, 1)	(4, 3, 2)	(4, 4, 1)	(5, 3, 2)	(5, 4, 2)	(6, 5, 2)	(7, 5, 3)	(8, 6, 3)	(10, 7, 4)

((2/1, 6/5)[4], 10/9: 875/864)[8] Supermagic

Step signature	Steps in JI	Step sizes in cents
4L 3M 1s	10/9, 27/25~35/32, 25/24~36/35	176.8769, 144.8100, 59.11533


Mode number	Mode as simplest JI pre-image	Step pattern	Porcupine[8] step pattern and UDP	Diminished[8] step pattern and UDP
4	~ 10/9 6/5 4/3 35/24 8/5 7/4 35/18 2/1	LMLMLMLs	LLLLLLLs 7\|0	LsLsLsLs 1\|0 (4)
3	~ 10/9 6/5 4/3 35/24 8/5 5/3 50/27 2/1	LMLMLsLM	LLLLLsLL 5\|2	LsLsLsLs 1\|0 (4)
2	~ 27/25 6/5 21/16 35/24 63/40 7/4 9/5 2/1	MLMLMLsL	LLLLLLsL 6\|1	sLsLsLsL 0\|1 (4)
1	~ 10/9 6/5 4/3 25/18 32/21 5/3 50/27 2/1	LMLsLMLM	LLLsLLLL 3\|4	LsLsLsLs 1\|0 (4)
-1	~ 27/25 6/5 21/16 35/24 3/2 5/3 9/5 2/1	MLMLsLML	LLLLsLLL 4\|3	sLsLsLsL 0\|1 (4)
-2	~ 10/9 8/7 80/63 25/18 32/21 5/3 50/27 2/1	LsLMLMLM	LsLLLLLL 1\|6	LsLsLsLs 1\|0 (4)
-3	~ 27/25 6/5 5/4 25/18 3/2 5/3 9/5 2/1	MLsLMLML	LLsLLLLL 2\|5	sLsLsLsL 0\|1 (4)
-4	~ 25/24 8/7 5/4 25/18 3/2 5/3 9/5 2/1	sLMLMLML	sLLLLLLL 0\|7	sLsLsLsL 0\|1 (4)

Rank-2 temperings (mode 4)
Equivalence	Step pattern	Scale	Comma list
s = 0	LsLsLsL	Dicot[7]	25/24, 15/14
L = M	LLLLLLLs	Porcupine[8]	250/243, 64/63

Rank-1 temperings
ET	15	19	22	26	34	37	41	60
Step sizes in ET	(2, 2, 1)	(3, 2, 1)	(3, 3, 1)	(4, 3, 1)	(5, 4, 2)	(5, 5, 2)	(6, 5, 2)	(9, 7, 3)

((2/1, 6/5)[4], 10/9: 100/99, 385/384)[8] Supermagic

Step signature	Steps in JI	Step sizes in cents
4L 3M 1s	10/9~11/10, 27/25~35/32~12/11, 25/24~36/35~33/32	173.1413, 149.5159, 58.8799


Mode number	Mode as simplest JI pre-image	Step pattern	Porcupine[8] step pattern and UDP	Diminished[8] step pattern and UDP
4	~ 10/9 6/5 4/3 16/11 8/5 7/4 35/18 2/1	LMLMLMLs	LLLLLLLs 7\|0	LsLsLsLs 1\|0 (4)
3	~ 10/9 6/5 4/3 16/11 8/5 5/3 11/6 2/1	LMLMLsLM	LLLLLsLL 5\|2	LsLsLsLs 1\|0 (4)
2	~ 12/11 6/5 21/16 16/11 63/40 7/4 9/5 2/1	MLMLMLsL	LLLLLLsL 6\|1	sLsLsLsL 0\|1 (4)
1	~ 10/9 6/5 4/3 11/8 32/21 5/3 11/6 2/1	LMLsLMLM	LLLsLLLL 3\|4	LsLsLsLs 1\|0 (4)
-1	~ 12/11 6/5 21/16 16/11 3/2 5/3 9/5 2/1	MLMLsLML	LLLLsLLL 4\|3	sLsLsLsL 0\|1 (4)
-2	~ 10/9 8/7 44/35 11/8 32/21 5/3 11/6 2/1	LsLMLMLM	LsLLLLLL 1\|6	LsLsLsLs 1\|0 (4)
-3	~ 12/11 6/5 5/4 11/8 3/2 5/3 9/5 2/1	MLsLMLML	LLsLLLLL 2\|5	sLsLsLsL 0\|1 (4)
-4	~ 25/24 8/7 5/4 11/8 3/2 5/3 9/5 2/1	sLMLMLML	sLLLLLLL 0\|7	sLsLsLsL 0\|1 (4)

Rank-2 temperings (mode 4)
Equivalence	Step pattern	Scale	Comma list
L = M	LLLLLLLs	Porcupine[8]	55/54, 64/63, 100/99

Rank-1 temperings
ET	15	19	22	26	34	37	41	63
Step sizes in ET	(2, 2, 1)	(3, 2, 1)	(3, 3, 1)	(4, 3, 1)	(5, 4, 2)	(5, 5, 2)	(6, 5, 2)	(9, 8, 3)

((2/1, 6/5)[4], 10/9: 100/99, 105/104, 144/143)[8] Supermagic

Step signature	Steps in JI	Step sizes in cents
4L 3M 1s	10/9~11/10, 27/25~35/32~12/11~13/12, 25/24~36/35~33/32~27/26	176.3227, 145.4708, 58.3927


Mode number	Mode as simplest JI pre-image	Step pattern	Porcupine[8] step pattern and UDP	Diminished[8] step pattern and UDP
4	~ 10/9 6/5 4/3 13/9 8/5 7/4 35/18 2/1	LMLMLMLs	LLLLLLLs 7\|0	LsLsLsLs 1\|0 (4)
3	~ 10/9 6/5 4/3 13/9 8/5 5/3 11/6 2/1	LMLMLsLM	LLLLLsLL 5\|2	LsLsLsLs 1\|0 (4)
2	~ 12/11 6/5 13/10 13/9 39/25 7/4 9/5 2/1	MLMLMLsL	LLLLLLsL 6\|1	sLsLsLsL 0\|1 (4)
1	~ 10/9 6/5 4/3 11/8 20/13 5/3 11/6 2/1	LMLsLMLM	LLLsLLLL 3\|4	LsLsLsLs 1\|0 (4)
-1	~ 12/11 6/5 13/10 13/9 3/2 5/3 9/5 2/1	MLMLsLML	LLLLsLLL 4\|3	sLsLsLsL 0\|1 (4)
-2	~ 10/9 8/7 44/35 11/8 20/13 5/3 11/6 2/1	LsLMLMLM	LsLLLLLL 1\|6	LsLsLsLs 1\|0 (4)
-3	~ 12/11 6/5 5/4 11/8 3/2 5/3 9/5 2/1	MLsLMLML	LLsLLLLL 2\|5	sLsLsLsL 0\|1 (4)
-4	~ 25/24 8/7 5/4 11/8 3/2 5/3 9/5 2/1	sLMLMLML	sLLLLLLL 0\|7	sLsLsLsL 0\|1 (4)

Rank-2 temperings (mode 4)
Equivalence	Step pattern	Scale	Comma list
L = M	LLLLLLLs	Porcupine[8]	40/39, 55/54, 64/63, 66/65

Rank-1 temperings
ET	15	19	22f	26	34	41	60
Step sizes in ET	(2, 2, 1)	(3, 2, 1)	(3, 3, 1)	(4, 3, 1)	(5, 4, 2)	(6, 5, 2)	(9, 7, 3)

((2/1, 6/5)[4], 10/9: 325/324)[8] (2.3.5.13 Marveltwin)

Step signature	Steps in JI	Step sizes in cents
4L 3M 1s	10/9, 27/25~13/12, 25/24~27/26	180.4645c, 136.7099c, 68.1467c

Mode number	Mode as simplest JI pre-image	Step pattern
4	~ 10/9 6/5 4/3 13/9 8/5 26/15 48/25 2/1	LMLMLMLs
3	~ 10/9 6/5 4/3 13/9 8/5 5/3 24/13 2/1	LMLMLsLM
2	~ 13/12 6/5 13/10 13/9 39/25 26/15 9/5 2/1	MLMLMLsL
1	~ 10/9 6/5 4/3 13/9 20/13 5/3 24/13 2/1	LMLsLMLM
-1	~ 13/12 6/5 13/10 13/9 3/2 5/3 9/5 2/1	MLMLsLML
-2	~ 10/9 15/13 50/39 18/13 20/13 5/3 24/13 2/1	LsLMLMLM
-3	~ 13/12 6/5 5/4 18/13 3/2 5/3 9/5 2/1	MLsLMLML
-4	~ 25/24 15/13 5/4 18/13 3/2 5/3 9/5 2/1	sLMLMLML

Rank-1 temperings
ET	12	15	19	22f	26	27e	29	31	34	41	46	53	72	87
Step sizes in ET	(2, 1, 1)	(2, 2, 1)	(3, 2, 1)	(3, 3, 1)	(4, 3, 1)	(4, 3, 2)	(4, 4, 1)	(5, 4, 1)	(5, 4, 2)	(6, 5, 2)	(7, 5, 3)	(8, 6, 3)	(11, 8, 4)	(13, 9, 5)

((2/1, 6/5)[4], 10/9: 100/99, 144/143)[8] (2.3.5.11.13 Ptolemismic)

Step signature	Steps in JI	Step sizes in cents
4L 3M 1s	10/9~11/10, 27/25~12/11~13/12, 25/24~33/32~27/26	175.8918c, 142.7754c, 66.7663c


Mode number	Mode as simplest JI pre-image	Step pattern	Mode in cents
4	~ 10/9 6/5 4/3 13/9 8/5 26/15 48/25 2/1	LMLMLMLs	175.892 318.667 494.559 637.334 813.226 956.002 1131.893 1198.660
3	~ 10/9 6/5 4/3 13/9 8/5 5/3 11/6 2/1	LMLMLsLM	175.892 318.667 494.559 637.334 813.226 879.993 1055.884 1198.660
2	~ 12/11 6/5 13/10 13/9 39/25 26/15 9/5 2/1	MLMLMLsL	142.775 318.667 461.443 637.334 780.120 956.002 1022.768 1198.660
1	~ 10/9 6/5 4/3 13/9 20/13 5/3 11/6 2/1	LMLsLMLM	175.892 318.667 494.559 561.325 737.218 879.993 1055.884 1198.660
-1	~ 12/11 6/5 13/10 13/9 3/2 5/3 9/5 2/1	MLMLsLML	142.775 318.667 461.443 637.334 704.101 879.993 1022.768 1198.660
-2	~ 10/9 15/13 50/39 11/8 20/13 5/3 11/6 2/1	LsLMLMLM	175.892 242.658 418.550 561.325 737.218 879.993 1055.884 1198.660
-3	~ 12/11 6/5 5/4 11/8 3/2 5/3 9/5 2/1	MLsLMLML	142.775 318.667 385.433 561.325 704.101 879.993 1022.768 1198.660
-4	~ 25/24 15/13 5/4 11/8 3/2 5/3 9/5 2/1	sLMLMLML	66.766 242.658 385.433 561.325 704.101 879.993 1022.768 1198.660

Rank-1 temperings
ET	12	15	19	22f	26	27e	29	34	41
Step sizes in ET	(2, 1, 1)	(2, 2, 1)	(3, 2, 1)	(3, 3, 1)	(4, 3, 1)	(4, 3, 2)	(4, 4, 1)	(5, 4, 2)	(6, 5, 2)

(2/1, 6/5)[4], 10/9)[15]

4L 8m 3s = (16/15, 25/24, 648/625) = (111.7313, 70.6724, 62.5652)

25/24 10/9 125/108 6/5 5/4 4/3 25/18 36/25 3/2 8/5 5/3 216/125 9/5 48/25 2/1 as mLmsmLmsmLmsmLm

m = s -> sLsssLsssLsssLs Hanson[15]; L = -> LLLsLLLsLLLsLLL Augmented[15] MODMOS; L = s -> sLsLsLsLsLsLsLs Porcupine[15];

s = 0 -> ssLsLssLsssL Diminished[12] MODMOS; m = 0 -> sLLsLsL Dicot[7]; L = 0 -> Father[11].

19-ET: (2, 1, 1); 22-ET: (2, 1, 2); 26-ET: (3, 1, 2); 27-ET: (2, 2, 1); 29-ET: (3, 1, 3); 31-ET: (3, 2, 1); 34-ET: (3, 2, 2); 41-ET: (4, 2, 3); 46-ET: (4, 3, 2); 53-ET: (5, 3, 3); 72-ET: (7, 4, 4); 87-ET: (8, 5, 5)

(2/1, 6/5)[4], 10/9: 875/864)[15] Supermagic

4L 3m 8s = (16/15, 648/625~21/20, 25/24~36/35)

~ 25/24 10/9 8/7 6/5 5/4 4/3 25/18 35/24 3/2 8/5 5/3 7/4 9/5 48/25 2/1 as sLsmsLsmsLsmsLs

15-ET: (1,1,1); 19-ET: (2, 1, 1); 22-ET: (2, 2, 1); 26-ET: (3, 2, 1); 34-ET: (3, 2, 2); 37-ET: (3, 3, 2); 41-ET: (4, 3, 2); 60-ET: (6, 4, 3)

(2/1, 6/5)[4], 10/9: 100/99, 385/384)[15] Supermagic

4L 3m 8s = (16/15, 648/625~21/20~128/121, 25/24~36/35~33/32)

~ 25/24 10/9 8/7 6/5 5/4 4/3 11/8 16/11 3/2 8/5 5/3 7/4 9/5 48/25 2/1 as sLsmsLsmsLsmsLs

15-ET: (1,1,1); 19-ET: (2, 1, 1); 22-ET: (2, 2, 1); 26-ET: (3, 2, 1); 34-ET: (3, 2, 2); 37-ET: (3, 3, 2); 41-ET: (4, 3, 2); 63-ET: (6, 5, 3)

(2/1, 6/5)[4], 10/9: 100/99, 105/104, 144/143)[15] Supermagic

4L 3m 8s = (16/15, 648/625~21/20~128/121~26/25, 25/24~36/35~33/32~27/26)

~ 25/24 10/9 8/7 6/5 5/4 4/3 11/8 13/9 3/2 8/5 5/3 7/4 9/5 48/25 2/1 as sLsmsLsmsLsmsLs

15-ET: (1,1,1); 19-ET: (2, 1, 1); 22f-ET: (2, 2, 1); 26-ET: (3, 2, 1); 34-ET: (3, 2, 2); 37-ET: (3, 3, 2); 41-ET: (4, 3, 2); 60-ET: (6, 4, 3)

(2/1, 6/5)[4], 10/9: 325/324)[15] (2.3.5.13 Marveltwin)

4L 3m 8s = (16/15, 648/625~26/25, 25/24~27/26) = (112.3178, 68.5631, 68.1467)

~ 25/24 10/9 15/13 6/5 5/4 4/3 18/13 13/9 3/2 8/5 5/3 26/15 9/5 48/25 2/1 as sLsmsLsmsLsmsLs

15d-ET: (1,1,1); 19-ET: (2, 1, 1); 22f-ET: (2, 2, 1); 26-ET: (3, 2, 1); 27-ET: (2, 2, 1); 29-ET: (3, 3, 1); 31-ET: (3, 1, 2); 34-ET: (3, 2, 2); 41-ET: (4, 3, 2); 46-ET: (4, 2, 3); 53-ET: (5, 3, 3); 72-ET: (7, 4, 4); 87-ET: (8, 5, 5)

(2/1, 6/5)[4], 10/9: 105/104, 325/324)[15] 2.3.5.7.13 Supermagic

4L 3m 8s = (16/15, 648/625~21/20~26/25, 25/24~36/35~27/26) = (121.6150, 81.3115, 58.8960)

~ 25/24 10/9 8/7 6/5 5/4 4/3 18/13 13/9 3/2 8/5 5/3 7/4 9/5 48/25 2/1 as sLsmsLsmsLsmsLs

15-ET: (1,1,1); 19-ET: (2, 1, 1); 22f-ET: (2, 2, 1); 26-ET: (3, 2, 1); 34-ET: (3, 2, 2); 37-ET: (3, 3, 2); 41-ET: (4, 3, 2); 60-ET: (6, 4, 3)

(2/1, 6/5)[4], 10/9: 100/99, 144/143)[15] (2.3.5.11.13 Ptolemismic)

4L 3m 8s = (16/15, 648/625~128/121~26/25, 25/24~33/32~27/26) = (109.1256, 76.0091, 66.7663) ⟨109.12557, 76.00911, 66.76626]

~ 25/24 10/9 15/13 6/5 5/4 4/3 11/8 13/9 3/2 8/5 5/3 26/15 9/5 48/25 2/1 as sLsmsLsmsLsmsLs

15-ET: (1, 1, 1); 19-ET: (2, 1, 1); 22f-ET: (2, 2, 1); 26-ET: (3, 2, 1); 27e-ET: (2, 1, 2); 29-ET: (3, 3, 1); 34-ET: (3, 2, 2); 41-ET: (4, 3, 2)

2.3.5; Hemifamity

((2/1, 3/2)[5], 10/9)

((2/1, 3/2)[5], 10/9)[10]

5L 2M 3s = (10/9, 16/15, 81/80)

81/80 9/8 6/5 4/3 27/20 3/2 8/5 16/9 9/5 2/1 as sLMLsLMLsL

L = M -> sLLLsLLLsL Dicot[10] MODMOS; M = s -> sLsLsLsLsL Blackwood[10]; L = s -> ssLsssLsss Supersharp[10] MODMOS;

L - M = M - s -> dLsLdLsLdL Srutal[10] MODMOS

s = 0 -> LsLLsLL Meantone[7]; M = 0 -> sLLsLLsL Father[8]

((2/1, 3/2)[5], 10/9: 5120/5103)[17] (Hemifamity)

5L 2m 10s = (~35/32, 256/243~21/20, 81/80~64/63) = (153.2376c, 85.8342c, 24.4931c) TE

~ 64/63 10/9 9/8 32/27 6/5 21/16 4/3 27/20 40/27 3/2 32/21 5/3 27/16 16/9 9/5 63/32 2/1 as sLsmsLssLssLsmsLs

m = s -> sLsssLssLssLsssLs; L = m -> sLsLsLssLssLsLsLs; L = s -> sssLsssssssssLsss;

L - m = m - s -> Garibaldi[17]; s = 0 -> LsLLLsL Dominant[7]; m = 0 -> sLssLssLssLssLs

((2/1, 3/2)[5], 10/9: 385/384, 2200/2187)[17] (Akea)

5L 2m 10s = (35/32~12/11, 256/243~21/20, 81/80~64/63~55/54) = (156.6236c, 85.7981c, 26.2356c) TE

~ 64/63 10/9 9/8 32/27 6/5 21/16 4/3 27/20 40/27 3/2 32/21 5/3 27/16 16/9 9/5 63/32 2/1 as sLsmsLssLssLsmsLs

m = s -> sLsssLssLssLsssLs; L = m -> sLsLsLssLssLsLsLs; L = s -> sssLsssssssssLsss; s = 0 -> LsLLLsL Arnold[7]; m = 0 -> sLssLssLssLssLs

((2/1, 3/2)[5], 10/9: 5120/5103)[24] (Hemifamity)

5L 2m 17s = (~175/162, ~28/27, 81/80~64/63) = (132.1305c, 61.3411c, 24.4931c) TE

~ 64/63 35/32 10/9 9/8 7/6 32/27 6/5 35/27 21/16 4/3 27/20 35/24 40/27 3/2 32/21 105/64 5/3 27/16 7/4 16/9 9/5 35/18 63/32 2/1 as sLssmssLsssLsssLssmssLss

m = s -> sLsssssLsssLsssLsssssLss Immunity[24] MODMOS; L = m -> sLssLssLsssLsssLssLssLss; L = s -> LLLLsLLLLLLLLLLLLLsLLLLL; s = 0 -> LsLLLsL Dominant[7]

((2/1, 3/2)[5], 10/9: 385/384, 2200/2187)[24] (Akea)

5L 2m 17s = (~175/162, ~28/27, 81/80~64/63~55/54) = (127.002c, 59.5625c, 26.2356c) TE

~ 64/63 12/11 10/9 9/8 7/6 32/27 6/5 35/27 21/16 4/3 27/20 16/11 40/27 3/2 32/21 18/11 5/3 27/16 7/4 16/9 9/5 35/18 63/32 2/1 as sLssmssLsssLsssLssmssLss

m = s -> sLsssssLsssLsssLsssssLss Immunity[24] MODMOS; L = m -> sLssLssLsssLsssLssLssLss; L = s -> LLLLsLLLLLLLLLLLLLsLLLLL; s = 0 -> LsLLLsL Arnold[7]

((2/1, 3/2)[5], 10/9: 5120/5103)[31] (Hemifamity)

5L 2m 24s = (~1225/1152, ~49/48, 81/80~64/63) = (107.6374c, 36.848c, 24.4931c) TE

~ 64/63 36/35 35/32 10/9 9/8 8/7 7/6 32/27 6/5 128/105 35/27 21/16 4/3 27/20 48/35 35/24 40/27 3/2 32/21 54/35 105/64 5/3 27/16 12/7 7/4 16/9 9/5 64/35 35/18 63/32 2/1 as ssLsssmsssLssssLssssLsssmsssLss

m = s -> ssLsssssssLssssLssssLsssssssLss Rodan[31] MODMOS; L = m -> ssLsssLsssLssssLssssLsssLsssLss; L = s -> LLLLLLsLLLLLLLLLLLLLLLLsLLLLLLL;

s = 0 -> LsLLLsL Dominant[7]; m = 0 -> ssLssssssLssssLssssLssssssLss Immunity[29] MODMOS

((2/1, 3/2)[5], 10/9: 385/384, 2200/2187)[31] (Akea)

5L 2m 24s = (~35/33, 49/48~56/55, 81/80~64/63~55/54) = (100.7664c, 33.3269c, 26.2356c) TE

~ 64/63 36/35 12/11 10/9 9/8 8/7 7/6 32/27 6/5 11/9 35/27 21/16 4/3 27/20 11/8 16/11 40/27 3/2 32/21 54/35 18/11 5/3 27/16 12/7 7/4 16/9 9/5 11/6 35/18 63/32 2/1 as ssLsssmsssLssssLssssLsssmsssLss

m = s -> ssLsssssssLssssLssssLsssssssLss Rodan[31] MODMOS; L = m -> ssLsssLsssLssssLssssLsssLsssLss, L = s -> LLLLLLsLLLLLLLLLLLLLLLLsLLLLLLL;

s = 0 -> LsLLLsL Arnold[7]; m = 0 -> ssLssssssLssssLssssLssssssLss

((2/1, 3/2)[12], 81/80) or ((2/1, 3/2)[12], 64/63)

((2/1, 3/2)[12], 64/63: 5120/5013)[24] (Hemifamity)

5L 7M 12s = (~135/128, ~28/27, 81/80~64/63) = (95.2825c, 61.3411c, 24.4931c) TE

~ 64/63 15/14 243/224 9/8 8/7 32/27 6/5 81/64 9/7 4/3 27/20 10/7 81/56 3/2 32/21 45/28 80/49 27/16 12/7 16/9 9/5 243/128 27/14 2/1 as sLsMsMsLsMsLsMsLsMsMsLsM

L = M -> sLsLsLsLsLsLsLsLsLsLsLsLsL; M = s -> sLsssssLsssLsssLsssssLss Immunity[24] MODMOS; L = s -> sssLsLsssLsssLsssLsLsssL; s = 0 -> LssLsLsLssLs Dominant[12]

((2/1, 3/2)[12], 64/63: 441/440, 896/891)[24] (Pele)

5L 7M 12s = (135/128~35/33, 28/27~33/32, 81/80~64/63~99/98) = (97.5911c, 58.2557c, 25.3165c) TE

~ 64/63 15/14 12/11 9/8 8/7 32/27 6/5 14/11 9/7 4/3 27/20 10/7 16/11 3/2 32/21 45/28 18/11 27/16 12/7 16/9 9/5 12/11 27/14 2/1 as sLsMsMsLsMsLsMsLsMsMsLsM

L = M -> sLsLsLsLsLsLsLsLsLsLsLsLsL; M = s -> sLsssssLsssLsssLsssssLss Immunity[24] MODMOS; L = s -> sssLsLsssLsssLsssLsLsssL; s = 0 -> LssLsLsLssLs Dominant[12]

((2/1, 3/2)[12], 64/63: 5120/5013)[36] (Hemifamity)

5L 7M 12s = (~25/24, ~49/48, 81/80~64/63) = (70.7894c, 36.848c, 24.4931c) TE

~ 64/63 36/35 15/14 243/224 54/49 9/8 8/7 81/70 32/27 6/5 128/105 81/64 9/7 64/49 4/3 27/20 48/35 10/7 81/56 72/49 3/2 32/21 54/35 45/28 80/49 81/49 27/16 12/7 243/140 16/9 9/5 64/35 243/128 27/14 96/49 2/1 as ssLssMssMssLssMssLssMssLssMssMssLssM

L = M -> ssLssLssLssLssLssLssLssLssLssLssLssLssL; M = s -> ssLssssssssLsssssLsssssLssssssssLsss Rodan[36] MODMOS; L = s -> sssssLssLsssssLsssssLsssssLssLsssssL;

s = 0 -> LssLsLsLssLs Dominant[12]; m = 0 -> ssLssssssLssssLssssLssssssLsss Immunity[29] MODMOS

((2/1, 3/2)[12], 64/63: 441/440, 896/891)[36] (Pele)

5L 7M 12s = (~25/24, ~49/48, 81/80~64/63~99/98) = (72.2746c, 32.9392c, 25.3165c) TE

~ 64/63 36/35 15/14 12/11 54/49 9/8 8/7 64/55 32/27 6/5 128/105 14/11 9/7 64/49 4/3 27/20 48/35 10/7 16/11 72/49 3/2 32/21 54/35 45/28 18/11 81/49 27/16 12/7 96/55 16/9 9/5 64/35 22/21 27/14 96/49 2/1 as ssLssMssMssLssMssLssMssLssMssMssLssM

L = M -> ssLssLssLssLssLssLssLssLssLssLssLssLssL; M = s -> ssLssssssssLsssssLsssssLssssssssLsss Rodan[36] MODMOS; L = s -> sssssLssLsssssLsssssLsssssLssLsssssL;

s = 0 -> LssLsLsLssLs Dominant[12]; m = 0 -> ssLssssssLssssLssssLssssssLsss Immunity[29] MODMOS

2.3.25

(2/1, 3/2, 100/81)

(2/1, 3/2, 100/81)[7]

(2/1, 3/2, 100/81: 4375/4374)[7] (Ragismic)

Step signature	Steps in JI	Step sizes in cents
2L 1m 4s	(2500/2187~8/7, ~9/8, ~27/25)	(231.1884c, 203.974c, 133.4123c)

Mode number	Mode in JI	Step pattern	Mode height
-3	~ 9/8 175/144 25/18 3/2 81/50 50/27 2/1	msLssLs	0.0158
-2	~ 27/25 175/144 21/16 3/2 81/50 7/4 2/1	smsLssL	-0.0211
-1	~ 8/7 100/81 25/18 3/2 12/7 50/27 2/1	LsmsLss	0.037
0	~ 27/25 100/81 4/3 3/2 81/50 50/27 2/1	sLsmsLs	0
1	~ 27/25 7/6 4/3 36/25 81/50 7/4 2/1	ssLsmsL	-0.037
2	~ 8/7 100/81 4/3 32/21 288/175 50/27 2/1	LssLsms	0.0211
3	~ 27/25 100/81 4/3 36/25 288/175 16/9 2/1	sLssLsm	-0.0158

(2/1, 3/2, 100/81: 1225/1224, 1701/1700)[7]

Step signature	Steps in JI	Step sizes in cents
2L 1m 4s	(2500/2187~8/7, ~9/8, ~27/25)	(231.5807c, 203.8094c, 133.2573c)

Mode number	Mode in JI	Step pattern	Mode height
-3	~ 9/8 17/14 25/18 3/2 34/21 50/27 2/1	msLssLs	0.0157
-2	~ 27/25 17/14 21/16 3/2 34/21 7/4 2/1	smsLssL	-0.0214
-1	~ 8/7 21/17 25/18 3/2 12/7 50/27 2/1	LsmsLss	0.0371
0	~ 27/25 21/17 4/3 3/2 34/21 50/27 2/1	sLsmsLs	0
1	~ 27/25 7/6 4/3 36/25 34/21 7/4 2/1	ssLsmsL	-0.0371
2	~ 8/7 21/17 4/3 32/21 28/17 50/27 2/1	LssLsms	0.0214
3	~ 27/25 21/17 4/3 36/25 28/17 16/9 2/1	sLssLsm	-0.0157

2.5.9; Marvel

((2/1, 5/4)[3], 9/8)

((2/1, 5/4)[3], 9/8)[6]

1L 3M 2s = (256/225, 9/8, 10/9)

9/8 5/4 45/32 8/5 9/5 2/1 as MsMLMs

L = M -> LsLLLs; M = s -> sssLss; L = s -> LsLsLs

((2/1, 5/4)[3], 9/8: 225/224)[6] (Marvel)

1L 3M 2s = (~8/7, 9/8~28/25, ~10/9) = (232.0248c, 200.9152c, 182.9137c) TE

~ 9/8 5/4 7/5 8/5 9/5 2/1 as MLMsMs

L = M -> LsLLLs; M = s -> sssLss; L = s -> LsLsLs

((2/1, 5/4)[3], 9/8: 100/99, 225/224)[6] (Apollo)

1L 3M 2s = (~8/7, 9/8~28/25, 10/9~11/10) = (229.792c, 206.94c, 174.6095c) TE

~ 9/8 5/4 7/5 8/5 9/5 2/1 as MLMsMs

L = M -> LsLLLs; M = s -> sssLss; L = s -> LsLsLs

((2/1, 5/4)[3], 9/8)[10]

6L 1m 3s = (10/9, 128/125, 81/80)

10/9 9/8 5/4 25/18 45/32 25/16 8/5 16/9 9/5 2/1 as LsLLsLmLsL,

m = s -> LsLLsLsLsL MODMOS; L = m -> LsLLsLLLsL; L = s -> LLLLLLsLLL; s = 0 -> LLLLsLL; m = 0 -> LsLLsLLsL

((2/1, 5/4)[3], 9/8: 225/224)[10] (Marvel)

6L 1m 3s = (~10/9, 128/125~36/35, 81/80~126/125) = (182.9137c, 49.1111c, 18.0015c) TE

~ 10/9 9/8 5/4 25/18 7/5 14/9 8/5 16/9 9/5 2/1 as LsLmLsLLsL

m = s -> LsLsLsLLsL MODMOS; L = m -> LsLLLsLLsL; L = s -> LLLsLLLLLL; s = 0 -> LLsLLLL; m = 0 -> LsLLsLLsL

((2/1, 5/4)[3], 9/8: 100/99, 225/224)[10] (Apollo)

6L 1m 3s = (10/9~11/10, 128/125~36/35~80/77, 81/80~126/125~45/44~56/55) = (174.6095c, 55.1825c, 32.3305c) TE

~10/9 9/8 5/4 11/8 7/5 14/9 8/5 16/9 9/5 2/1 as LsLmLsLLsL

m = s -> LsLsLsLLsL MODMOS; L = m -> LsLLLsLLsL; L = s -> LLLsLLLLLL; s = 0 -> LLsLLLL; m = 0 -> LsLLsLLsL

((2/1, 5/4)[3], 9/8)[17]

6L 10m 1s = (800/729, 81/80, 2048/2025)

81/80 10/9 9/8 100/81 5/4 81/64 25/18 45/32 64/45 36/18 128/81 8/5 81/50 16/9 9/5 160/81 2/1 as mLmLmmLmsmLmmLmLm

m = s -> sLsLssLsssLssLsLs MODMOS; L = m -> LLLLLLLLsLLLLLLLL; L = s -> sLsLssLsLsLssLsLs; s = 0 -> sLsLssLssLssLsLs MODMOS; m = 0 -> LLLsLLL

((2/1, 5/4)[3], 9/8: 225/224)[17] (Marvel)

6L 1m 10s = (~800/729, 2048/2025~64/63, 81/80~126/125) = (164.9122c, 31.1096c, 18.0015c) TE

~ 81/80 10/9 9/8 100/81 5/4 81/64 25/18 7/5 10/7 36/25 128/81 8/5 81/50 16/9 9/5 160/81 2/1 as sLsLssLsmsLssLsLs

m = s -> sLsLssLsssLssLsLs MODMOS; L = m -> sLsLssLsLsLssLsLs; L = s -> LLLLLLLLsLLLLLLLL; s = 0 -> LLLsLLL; m = 0 -> sLsLssLssLssLsLs MODMOS

((2/1, 5/4)[3], 9/8: 100/99, 225/224)[17] (Apollo)

6L 10m 1s = (~88/81, 81/80~126/125~45/44~56/55, 2048/2025~64/63~176/175) = (142.279c, 32.3305c, 22.852c) TE

~ 56/55 10/9 9/8 11/9 5/4 14/11 11/8 7/5 10/7 16/11 11/7 8/5 11/9 16/9 9/5 55/28 2/1 as mLmLmmLmsmLmmLmLm

m = s -> sLsLssLsssLssLsLs Machine[17] MODMOS; L = m -> LLLLLLLLsLLLLLLLL; L = s -> sLsLssLsLsLssLsLs; s = 0 -> sLsLssLssLssLsLs MODMOS; m = 0 -> LLLsLLL

2.5.9; Starling

((2/1, 5/4)[3], 10/9)

((2/1, 5/4)[3], 10/9)[6]

1L 2m 3s = (144/125, 9/8, 10/9)

9/8 5/4 36/25 8/5 9/5 2/1 as msLsms

m = s -> ssLsss; L = m -> LsLsLs; L = s -> sLLLsL

((2/1, 5/4)[3], 10/9: 126/125)[6]

1L 2m 3s = (~8/7, ~9/8, 10/9~28/25) = (232.1725c, 202.4685c, 187.562c) TE

~ 9/8 5/4 10/7 8/5 9/5 2/1 as msLsms

m = s -> ssLsss; L = m -> LsLsLs; L = s -> sLLLsL

((2/1, 5/4)[3], 10/9)[9]

6L 1m 2s = (10/9, 648/625, 81/80)

10/9 9/8 5/4 25/18 36/25 8/5 16/9 9/5 2/1 as LsLLmLLsL

m = s -> LsLLsLLsL; L = m -> LsLLLLLsL MODMOS; L = s -> LLLLsLLLL; s = 0 -> LLLsLLL; m = 0 -> LsLLLLsL MODMOS

((2/1, 5/4)[3], 10/9: 126/125)[9]

6L 1m 2s = (10/9~28/25, 648/625~36/35, 81/80~225/224) = (187.562c, 44.6105c, 14.9065c) TE

~ 10/9 9/8 5/4 7/5 10/7 8/5 16/9 9/5 2/1 as LsLLmLLsL

m = s -> LsLLsLLsL; L = m -> LsLLLLLsL MODMOS; L = s -> LLLLsLLLL; s = 0 -> LLLsLLL; m = 0 -> LsLLLLsL MODMOS

((2/1, 5/4)[3], 10/9: 126/125, 896/891)[16]

6L 1m 9s = (~11/10, 128/125~64/63~99/98, 81/80~225/224~56/55) = (163.6623c, 24.4284c, 21.4103c) TE

~ 56/55 10/9 9/8 63/55 5/4 9/7 7/5 45/32 16/11 8/5 81/50 16/9 9/5 20/11 2/1 as sLssLsLsmsLsLssL

m = s -> sLssLsLsssLsLssL; L = m -> sLssLsLsLsLsLssL; L = s -> LLLLLLLLsLLLLLLL; s = 0 -> LLLsLLL; m = 0 -> sLssLsLssLsLssL

((2/1, 5/4)[3], 10/9: 91/90, 126/125, 896/891)[16]

6L 1m 9s = (~11/10, 128/125~64/63~99/98, 81/80~225/224~56/55~144/143) = (160.4106c, 30.0969c, 23.0825c) TE

~ 56/55 10/9 9/8 63/55 5/4 9/7 7/5 45/32 16/11 8/5 13/8 16/9 9/5 20/11 2/1 as sLssLsLsmsLsLssL

m = s -> sLssLsLsssLsLssL; L = m -> sLssLsLsLsLsLssL; L = s -> LLLLLLLLsLLLLLLL; s = 0 -> LLLsLLL; m = 0 -> sLssLsLssLsLssL

2.3.7; Orwellismic

(2/1, 3/2, 7/6)

(2/1, 3/2, 7/6)[4]

1L 2m 1s = (9/7, 7/6, 8/7)

7/6 3/2 7/4 2/1 as mLms

m = s -> sLss Sempahore[4]

(2/1, 3/2, 7/6)[7]

4L 1M 2s = (8/7, 9/8, 49/48)

8/7 7/6 4/3 3/2 12/7 7/4 2/1 as LsLMLsL

L = M -> LsLLLsL Archy[5]; s = 0 -> LLsLL Semaphore[5]

(2/1, 3/2, 7/6: 1728/1715)[7] (Orwellismic)

4L 1M 2s = (~8/7, ~9/8, 49/48~36/35) = (227.1393c, 204.1935c, 43.334c) TE

~ 8/7 7/6 4/3 3/2 12/7 7/4 2/1 as LsLMLsL

L = M -> LsLLLsL Superpyth[5]; s = 0 -> LLsLL Beep[5]

(2/1, 3/2, 7/6: 1728/1715)[12] (Orwellismic)

4L 1M 7s = (~10/9, 54/49~35/32, 49/48~36/35) = (183.8053c, 160.8595c, 43.334c) TE

~ 36/35 8/7 7/6 6/5 4/3 48/35 3/2 54/35 12/7 7/4 9/5 2/1 as sLssLsMsLssL

L = M -> sLssLsLsLssL Superpyth[12]; M = s -> sLssLsssLssL MODMOS; s = 0 -> LLsLL Beep[5]

(2/1, 3/2, 7/6: 99/98, 385/384)[12] (Orwellian)

4L 1M 7s = (~10/9, 54/49~35/32~12/11, 49/48~36/35~33/32) = (185.7619, 155.4288c, 155.4288c) TE

~ 33/32 8/7 7/6 6/5 4/3 11/8 3/2 54/35 12/7 7/4 9/5 2/1 as sLssLsMsLssL

L = M -> sLssLsLsLssL Suprapyth[12]; M = s -> sLssLsssLssL MODMOS; s = 0 -> LLsLL Pentoid[5]

(2/1, 3/2, 7/6: 176/175, 540/539)[12] (Guanyin)

4L 1M 7s = (~10/9, 54/49~35/32~11/10, 49/48~36/35~45/44) = (183.8734c, 162.5743c, 43.0239c) TE

~ 36/35 8/7 7/6 6/5 4/3 15/11 3/2 54/35 12/7 7/4 9/5 2/1 as sLssLsMsLssL

L = M -> sLssLsLsLssL Superpyth[12]; M = s -> sLssLsssLssL MODMOS

(2/1, 3/2, 7/6: 1728/1715)[17] (Orwellismic)

4L 1M 12s = (~160/147, ~15/14, 49/48~36/35) = (140.4713c, 117.5255c, 43.334c) TE

~ 36/35 10/9 8/7 7/6 6/5 35/27 4/3 48/35 35/24 3/2 54/35 5/3 12/7 7/4 9/5 35/18 2/1 as sLsssLssMssLsssLs

L = M -> sLsssLssLssLsssLs Superpyth[17]; M = s -> sLsssLsssssLsssLs; s = 0 -> LLsLL Beep[5]

(2/1, 3/2, 7/6: 99/98, 385/384)[17] (Orwellian)

4L 1M 12s = (~160/147, 15/14~35/33, 49/48~36/35~33/32) = (142.5744c, 112.2413c, 43.1875c) TE

~ 36/35 10/9 8/7 7/6 6/5 35/27 4/3 11/8 16/11 3/2 54/35 5/3 12/7 7/4 9/5 35/18 2/1 as sLsssLssMssLsssLs

L = M -> sLsssLssLssLsssLs Suprapyth[17]; M = s -> sLsssLsssssLsssLs; s = 0 -> LLsLL Pentoid[5]

(2/1, 3/2, 7/6: 176/175, 540/539)[17] (Guanyin)

4L 1M 12s = (~88/81, 15/14~77/72, 49/48~36/35~45/44) = (140.8495c, 119.5504c, 43.0239c) TE

~ 36/35 10/9 8/7 7/6 6/5 35/27 4/3 15/11 22/15 3/2 54/35 5/3 12/7 7/4 9/5 35/18 2/1 as sLsssLssMssLsssLs

L = M -> sLsssLssLssLsssLs Superpyth[17]; M = s -> sLsssLsssssLsssLs

(2/1, 3/2, 7/6: 1728/1715)[22] (Orwellismic)

4L 1m 17s = (~200/189, ~25/24, 49/48~36/35) = (97.1373c, 74.1915c, 43.334c) TE

~ 36/35 21/20 10/9 8/7 7/6 6/5 49/40 35/27 4/3 48/35 7/5 35/24 3/2 54/27 63/40 5/3 12/7 7/4 9/5 147/80 35/18 2/1 as ssLssssLsssMsssLssssLs

m = s -> ssLssssLsssssssLssssLs Doublewide[22] MODMOS; L = m -> ssLssssLsssLsssLssssLs Superpyth[17]; s = 0 -> LLsLL Beep[5]

(2/1, 3/2, 7/6: 99/98, 385/384)[22] (Orwellian)

4L 1m 17s = (~200/189, 25/24~80/77, 49/48~36/35~33/32) = (99.3869c, 69.0538c, 43.1875c) TE

~ 36/35 21/20 10/9 8/7 7/6 6/5 49/40 35/27 4/3 11/8 7/5 16/11 3/2 54/27 63/40 5/3 12/7 7/4 9/5 147/80 35/18 2/1 as ssLssssLsssMsssLssssLs

m = s -> ssLssssLsssssssLssssLs Doublewide[22] MODMOS; L = m -> ssLssssLsssLsssLssssLs Suprapyth[17]; s = 0 -> LLsLL Pentoid[5]

(2/1, 3/2, 7/6: 176/175, 540/539)[22] (Guanyin)

4L 1m 17s = (~200/189, 25/24~22/21, 49/48~36/35~45/44) = (97.8256c, 76.5265c, 43.0239c) TE

~ 36/35 21/20 10/9 8/7 7/6 6/5 27/22 35/27 4/3 15/11 7/5 22/15 3/2 54/27 63/40 5/3 12/7 7/4 9/5 81/44 35/18 2/1 as ssLssssLsssmsssLssssLs

m = s -> ssLssssLsssssssLssssLs Fleetwood[22] MODMOS; L = m -> ssLssssLsssLsssLssssLs Superpyth[17]

(2/1, 3/2, 7/6: 1728/1715)[27] (Orwellismic)

4L 22M 1s = (~250/243, 49/48~36/35, ~50/49) = (53.8033c, 43.334c, 30.8575c) TE

~ 36/35 21/20 160/147 10/9 8/7 7/6 6/5 49/40 80/63 35/27 4/3 48/35 7/5 10/7 35/24 3/2 54/27 63/40 80/49 5/3 12/7 7/4 9/5 147/80 40/21 35/18 2/1 as MMLMMMMMLMMMMsMMMMLMMMMMLMM

L = M -> LLLLLLLLLLLLLsLLLLLLLLLLLLL Quartonic[27]; M = s -> ssLsssssLsssssssssLsssssLss Myna[27] MODMOS; L = s -> ssLsssssLssssLssssLsssssLss Superpyth[27];

s = 0 -> ssLsssssLssssssssLsssssLss Doublewide[26] MODMOS; M = 0 -> LLsLL Beep[5]

(2/1, 3/2, 7/6: 99/98, 385/384)[27] (Orwellian)

4L 22M 1s = (~250/243, 49/48~36/35~33/32, 50/49~100/99) = (56.1994c, 43.1875c, 25.8663c) TE

~ 36/35 21/20 160/147 10/9 8/7 7/6 6/5 49/40 80/63 35/27 4/3 11/8 7/5 10/7 16/11 3/2 54/27 63/40 80/49 5/3 12/7 7/4 9/5 147/80 40/21 35/18 2/1 as MMLMMMMMLMMMMsMMMMLMMMMMLMM

L = M -> LLLLLLLLLLLLLsLLLLLLLLLLLLL Quartz[27]; M = s -> ssLsssssLsssssssssLsssssLss Myno[27] MODMOS; L = s -> ssLsssssLssssLssssLsssssLss Suprapyth[27];

s = 0 -> ssLsssssLssssssssLsssssLss Doublewide[26] MODMOS; M = 0 -> LLsLL Pentoid[5]

(2/1, 3/2, 7/6: 176/175, 540/539)[27] (Guanyin)

4L 22M 1s = (~250/243, 49/48~36/35~45/44, 50/49~55/54) = (54.8017c, 43.0239c, 33.5026c) TE

~ 36/35 21/20 88/81 10/9 8/7 7/6 6/5 27/22 80/63 35/27 4/3 15/11 7/5 10/7 22/15 3/2 54/27 63/40 44/27 5/3 12/7 7/4 9/5 81/44 40/21 35/18 2/1 as mmLmmmmmLmmmmsmmmmLmmmmmLmm

m = s -> ssLsssssLsssssssssLsssssLss Myna[27] MODMOS; L = m -> LLLLLLLLLLLLLsLLLLLLLLLLLLL Quartonic[27]; L = s -> ssLsssssLssssLssssLsssssLss Superpyth[27];

s = 0 -> ssLsssssLssssssssLsssssLss Fleetwood[26] MODMOS

(2/1, 3/2, 7/6: 1728/1715)[53] (Orwellismic)

27L 4M 22s = (~50/49, 64/63~245/243, 126/125~2401/2400) = (30.8575c, 22.9458c, 12.4765c) TE

~ 50/49 36/35 360/343 21/20 15/14 27/25 54/49 441/400 9/8 8/7 125/108 7/6 25/21 6/5 60/49 49/40 5/4 63/50 9/7 162/125 21/16 4/3 200/147 48/35 480/343 7/5 10/7 343/240 35/24 147/100 3/2 32/16 125/81 14/9 100/63 8/5 80/49 49/30 5/3 42/25 12/7 216/125 7/4 16/9 800/441 49/27 50/27 28/15 40/21 343/180 35/18 49/25 2/1 as LsLsLsLsLMLsLsLsLsLsLMLsLsLsLsLMLsLsLsLsLsLMLsLsLsLsL

L = M -> LsLsLsLsLLLsLsLsLsLsLLLsLsLsLsLLLsLsLsLsLsLLLsLsLsLsL Orwell[53] MODMOS;

M = s -> LsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsL Quartonic[53]; L = s -> sssssssssLsssssssssssLsssssssssLsssssssssssLsssssssss

s = 0 -> LLLLLsLLLLLLsLLLLLsLLLLLLsLLLLL Myna[31] MODMOS; M = 0 -> LsLsLsLsLLsLsLsLsLsLLsLsLsLsLLsLsLsLsLsLLsLsLsLsL Superpyth[49];

L = 0 -> ssssLsssssLssssLsssssLssss Doublewide[22] MODMOS

(2/1, 3/2, 7/6: 99/98, 385/384)[53] (Orwellian)

4L 27M 22s = (64/63~245/243~55/54, 50/49~100/99, 126/125~2401/2400) = (30.3331c, 25.8663c, 17.3212c) TE

~ 50/49 36/35 80/77 21/20 15/14 27/25 12/11 441/400 9/8 8/7 125/108 7/6 25/21 6/5 60/49 49/40 5/4 63/50 9/7 162/125 21/16 4/3 200/147 11/8 480/343 7/5 10/7 343/240 16/11 147/100 3/2 32/16 125/81 14/9 100/63 8/5 80/49 49/30 5/3 42/25 12/7 216/125 7/4 16/9 800/441 11/6 50/27 28/15 40/21 77/40 35/18 49/25 2/1 as MsMsMsMsMLMsMsMsMsMsMLMsMsMsMsMLMsMsMsMsMsMLMsMsMsMsM

L = M -> LsLsLsLsLLLsLsLsLsLsLLLsLsLsLsLLLsLsLsLsLsLLLsLsLsLsL Orwell[53] MODMOS;

M = s -> sssssssssLsssssssssssLsssssssssLsssssssssssLsssssssss; L = s -> LsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsL Quartz[53];

s = 0 -> sssssLssssssLsssssLssssssLsssss Myno[31] MODMOS; M = 0 -> ssssLsssssLssssLsssssLssss Doublewide[22] MODMOS;

L = 0 -> LsLsLsLsLLsLsLsLsLsLLsLsLsLsLLsLsLsLsLsLLsLsLsLsL Suprapyth[49]

(2/1, 3/2, 7/6: 176/175, 540/539)[53] (Guanyin)

4L 27M 22s = (64/63~245/243~100/99, 50/49~55/54, 126/125~2401/2400~441/440) = (33.5026c, 21.2991c, 9.5213c) TE

~ 50/49 36/35 22/21 21/20 15/14 27/25 11/10 243/220 9/8 8/7 125/108 7/6 25/21 6/5 11/9 27/22 5/4 63/50 9/7 162/125 21/16 4/3 110/81 15/11 88/63 7/5 10/7 63/44 22/15 81/55 3/2 32/16 125/81 14/9 100/63 8/5 44/27 18/11 5/3 42/25 12/7 216/125 7/4 16/9 440/243 20/11 50/27 40/21 21/11 35/18 49/25 2/1 as MsMsMsMsMLMsMsMsMsMsMLMsMsMsMsMLMsMsMsMsMsMLMsMsMsMsM

L = M -> LsLsLsLsLLLsLsLsLsLsLLLsLsLsLsLLLsLsLsLsLsLLLsLsLsLsL Orwell[53] MODMOS;

M = s -> sssssssssLsssssssssssLsssssssssLsssssssssssLsssssssss Kleiboh[53] MODMOS; L = s -> LsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsL Quartonic[53];

s = 0 -> sssssLssssssLsssssLssssssLsssss Myna[31] MODMOS; M = 0 -> ssssLsssssLssssLsssssLssss Fleetwood[22] MODMOS;

L = 0 -> LsLsLsLsLLsLsLsLsLsLLsLsLsLsLLsLsLsLsLsLLsLsLsLsL Superpyth[49]

((2/1, 3/2)[12], 49/48) or ((2/1, 3/2)[12], 36/35)

((2/1, 3/2)[12], 36/35: 1728/1715)[24] (Orwellian)

2.3.7 Sensamagic

(2/1, 3/2, 9/7)

(2/1, 3/2, 9/7)[4]

2L 1M 1s = (9/7, 7/6, 28/27) = (435.0841c, 266.8709c, 62.9609c)

9/7 3/2 27/14 2/1 as LMLs

L = M -> LLLs; M = s -> LsLs; s = 0 -> LsL

(2/1, 3/2, 9/7: 245/243)[7] Sensamagic

2L 1m 4s = (~5/4, ~9/8, 28/27~36/35)

~ 28/27 9/7 4/3 3/2 14/9 27/14 2/1 as sLsmsLs

m = s -> sLsssLs; s = 0 -> LsL

5-ET: (2, 1, 0); 14c-ET: (4, 2, 1); 17-ET: (5, 3, 1); 19-ET: (6, 3, 1); 22-ET: (7, 4, 1) 24-ET: (8, 4, 1); 27-ET: (9, 5, 1); 41-ET: (13, 7, 2); 46-ET: (15, 8, 2); 68-ET: (22, 12, 3); 87-ET: (28, 15, 4)

(2/1, 3/2, 9/7: 245/243)[10] Sensamagic

2L 1m 7s = (~135/112, ~35/32, 28/27~36/35)

~ 28/27 5/4 9/7 4/3 35/24 3/2 14/9 15/8 27/14 2/1 as sLssmssLss

m = s -> sLsssssLss; s = 0 -> LsL

14c-ET: (3, 1, 1); 17-ET: (4, 2, 1); 19-ET: (5, 2, 1); 22-ET: (6, 3, 1) 24-ET: (7, 3, 1); 27-ET: (8, 4, 1); 41-ET: (11, 5, 2); 46-ET: (13, 6, 2); 68-ET: (19, 9, 3); 87-ET: (24,11,4)

(2/1, 3/2, 9/7: 245/243, 385/384)[10] Sensamagic

2L 1m 7s = (~135/112, ~35/32, 28/27~36/35~33/32)

~ 28/27 5/4 9/7 4/3 16/11 3/2 14/9 15/8 27/14 2/1 as sLssmssLss

m = s -> sLsssssLss; s = 0 -> LsL

17-ET: (4, 2, 1); 19-ET: (5, 2, 1); 22-ET: (6, 3, 1) 24-ET: (7, 3, 1); 27-ET: (8, 4, 1); 41-ET: (11, 5, 2); 46-ET: (13, 6, 2); 63-ET: (18, 8, 3); 68-ET: (19, 9, 3); 87-ET: (24, 11, 4)

(2/1, 3/2, 9/7: 245/243)[13] Sensamagic

2L 1m 10s = (~75/64, ~135/128, 28/27~36/35)

~ 28/27 16/15 5/4 9/7 4/3 48/35 35/24 3/2 14/9 8/5 15/8 27/14 2/1 as ssLsssmsssLss

m = s -> ssLsssssssLss Pycnic[13] MODMOS; s = 0 -> LsL

14c-ET: (2, 0, 1); 17-ET: (3, 1, 1); 19-ET: (4, 1, 1); 22-ET: (5, 2, 1) 24-ET: (6, 2, 1); 27-ET: (7, 3, 1); 41-ET: (9, 3, 2); 46-ET: (11, 4, 2); 68-ET: (16, 6, 3); 87-ET: (20, 7,4)

(2/1, 3/2, 9/7: 245/243, 385/384)[13] Sensamagic

2L 1m 10s = (~75/64, 135/128~35/33, 28/27~36/35~33/32)

~ 28/27 16/15 5/4 9/7 4/3 11/8 16/11 3/2 14/9 8/5 15/8 27/14 2/1 as ssLsssmsssLss

m = s -> ssLsssssssLss; s = 0 -> LsL

17-ET: (3, 1, 1); 19-ET: (4, 1, 1); 22-ET: (5, 2, 1) 24-ET: (6, 2, 1); 27-ET: (7, 3, 1); 41-ET: (9, 3, 2); 46-ET: (11, 4, 2); 63-ET: (15, 5, 3); 68-ET: (16, 6, 3); 87-ET: (20, 7,4)

(2/1, 3/2, 9/7: 245/243, 385/384)[16] Sensamagic

2L 13m 1s = (~25/22, 28/27~36/35~33/32, ~45/44)

~ 28/27 16/15 40/33 5/4 9/7 4/3 11/8 45/32 16/11 3/2 14/9 8/5 20/11 15/8 27/14 2/1 as mmLmmmmsmmmmLmmm

m = s -> ssLsssssssssLsss Shrutar[16] MODMOS; s = 0 -> ssLssssssssLsss

17-ET: (2, 1, 0); 19-ET: (3, 1, 0); 22-ET: (4, 1, 1) 24-ET: (5, 1, 1); 27-ET: (6, 1, 2); 41-ET: (7, 2, 1); 46-ET: (9, 2, 2); 63-ET: (12, 3, 2); 68-ET: (13, 3, 3); 87-ET: (16, 4, 3)

(2/1, 3/2, 9/7: 245/243, 385/384)[31] Sensamagic

2L 16m 13s = (10/9~54/49, ~45/44, 176/175~121/120)

~ 45/44 28/27 35/33 16/15 12/11 11/10 9/8 154/135 7/6 9/7 405/308 4/3 15/11 11/8 45/32 64/45 16/11 22/15 3/2 616/405 14/9 12/7 135/77 16/9 20/11 11/6 15/8 66/35 27/14 88/45 2/1 as msmsmsmsmLmsmsmsmsmsmLmsmsmsmsm

m = s -> sssssssssLsssssssssssLsssssssss; s = 0 -> sssssLssssssLsssss Shrutar[18] MODMOS

41-ET: (6, 1, 1); 46-ET: (7, 2, 0); 63-ET: (10, 2, 1); 68-ET: (10, 3, 0); 87-ET: (13, 3, 1)

(2/1, 3/2, 9/7: 729/728)[7]

2L 1m 4s = (~26/21, ~9/8, 28/27~27/26)

~ 28/27 9/7 4/3 3/2 14/9 27/14 2/1 sLsmsLs

m = s -> sLsssLs; s = 0 -> LsL

5-ET: (2, 1, 0); 17-ET: (5, 3, 1); 19-ET: (6, 3, 1); 22f-ET: (7, 4, 1) 24-ET: (8, 4, 1); 36-ET: (11, 6, 2); 41-ET: (13, 7, 2); 53-ET: (16, 9, 3); 58-ET: (18, 10, 3); 77-ET: (24, 13, 4); 94-ET: (29, 16, 5)

(2/1, 3/2, 9/7: 729/728)[10]

2L 1m 7s = (~117/98, ~13/12, 28/27~27/26)

~ 28/27 26/21 9/7 4/3 13/9 3/2 14/9 13/7 27/14 2/1 sLssmssLss

m = s -> sLsssssLss; s = 0 -> LsL

17-ET: (4, 2, 1); 19-ET: (5, 2, 1); 22f-ET: (6, 3, 1) 24-ET: (7, 3, 1); 36-ET: (9, 4, 2); 41-ET: (11, 5, 2); 53-ET: (13, 6, 3); 58-ET: (15, 7, 3); 77-ET: (20, 9, 4); 94-ET: (24, 11, 5)

(2/1, 3/2, 9/7: 729/728)[13]

2L 1m 10s = (~169/147, ~117/112, 28/27~27/26)

~ 28/27 14/13 26/21 9/7 4/3 18/13 13/9 3/2 14/9 21/13 13/7 27/14 2/1 ssLsssmsssLss

m = s -> ssLsssssssLss; s = 0 -> LsL

17-ET: (3, 1, 1); 19-ET: (4, 1, 1); 22f-ET: (5, 2, 1) 24-ET: (6, 2, 1); 36-ET: (7, 2, 2); 41-ET: (9, 3, 2); 53-ET: (10, 3, 3); 58-ET: (12, 4, 3); 77-ET: (16, 5, 4); 94-ET: (19, 6, 5)

(2/1, 3/2, 9/7: 351/350, 676/675)[13]

2L 1m 10s = (~169/147, ~117/112, 28/27~27/26~26/25)

~ 28/27 14/13 26/21 9/7 4/3 18/13 13/9 3/2 14/9 21/13 13/7 27/14 2/1 ssLsssmsssLss

m = s -> ssLsssssssLss; s = 0 -> LsL

17-ET: (3, 1, 1); 19-ET: (4, 1, 1); 24-ET: (6, 2, 1); 53-ET: (10, 3, 3); 58-ET: (12, 4, 3); 77-ET: (16, 5, 4); 111-ET: (22, 7, 6); 130-ET: (26, 8, 7)

(2/1, 3/2, 9/7: 351/350, 676/675)[16]

2L 13m 1s = (~845/756, 28/27~27/26~26/25, ~169/168)

~ 26/25 14/13 25/21 26/21 9/7 4/3 18/13 39/28 13/9 3/2 14/9 21/13 25/14 13/7 23/13 2/1 as mmLmmmmsmmmmLmmm

m = s -> ssLsssssssssLsss; s = 0 -> ssLssssssssLsss

17-ET: (2, 1, 0); 19-ET: (3, 1, 0); 24-ET: (5, 1, 1); 53-ET: (7, 3, 0); 58-ET: (9, 3, 1); 77-ET: (12, 4, 1); 111-ET: (16, 6, 1); 130-ET: (19, 7, 1)

(2/1, 3/2, 9/7: 351/350, 676/675)[31]

2L 13m 16s = (~10/9, ~336/325, 169/168~225/224)

~169/168 26/25 117/112 14/13 13/12 28/25 9/8 378/325 7/6 9/7 325/252 4/3 75/56 18/13 39/28 56/39 13/9 112/75 3/2 14/9 12/7 325/189 16/9 25/14 24/13 13/7 224/117 25/13 336/169 2/1 as smsmsmsmsLsmsmsmsmsmsLsmsmsmsms

m = s -> sssssssssLsssssssssssLsssssssss; s = 0 -> ssssLsssssLssss Catakleismic[15] MODMOS

53-ET: (7, 3, 0); 58-ET: (8, 2, 1); 77-ET: (11, 3, 1); 111-ET: (15, 5, 1); 130-ET: (18, 6, 1)

2.3.11 Pentacircle

((2/1, 3/2)[5], 12/11)

((2/1, 3/2)[5], 12/11)[10]

5L 2M 3s = (12/11, 88/81, 33/32)

12/11 9/8 27/22 4/3 16/11 3/2 18/11 27/16 81/44 2/1 as LsLMLsLsLM

((2/1, 3/2)[5], 12/11: 896/891)[10]

5L 2M 3s = (12/11, 88/81, 33/32~28/27)

~ 12/11 9/8 27/22 4/3 16/11 3/2 18/11 27/16 81/44 2/1 as LsLMLsLsLM

((2/1, 3/2)[5], 12/11: 896/891)[17]

5L 2M 10s = (128/121~81/77, 256/243~22/21, 33/32~28/27)

~ 28/27 12/11 9/8 32/27 11/9 9/7 4/3 11/8 16/11 3/2 14/9 18/11 27/16 16/9 11/6 27/14 2/1 as sLsMsLssLssLsMsLs

2.3.13 Squbema

((2/1, 3/2)[5], 13/12)

((2/1, 3/2)[5], 13/12)[10]

5L 2M 3s = (13/12, 128/117, 27/26)

13/12 9/8 39/32 4/3 13/9 3/2 13/8 27/16 117/64 2/1 as LsLMLsLsLM

((2/1, 3/2)[5], 13/12: 729/728)[10]

5L 2M 3s = (13/12, 128/117, 27/26~28/27)

~ 13/12 9/8 39/32 4/3 13/9 3/2 13/8 27/16 117/64 2/1 as LsLMLsLsLM

((2/1, 3/2)[5], 13/12: 729/728)[17]

5L 2M 10s = (91/81, 256/243~96/91, 27/26~28/27)

~ 28/27 13/12 9/8 32/27 16/13 9/7 4/3 18/13 13/9 3/2 14/9 13/8 27/16 16/9 24/13 27/14 2/1 as sLsMsLssLssLsMsLs

((2/1, 3/2)[5], 12/11~13/12: 144/143, 729/728)[17]

5L 2M 10s = (91/81~81/77, 256/243~96/91~22/21, 27/26~28/27~33/32)

~ 28/27 12/11 9/8 32/27 11/9 9/7 4/3 11/8 13/9 3/2 14/9 13/8 27/16 16/9 12/11 27/14 2/1 as sLsMsLssLssLsMsLs

View • Talk • EditScale galleries
JI scales	12-tone JI • Combination product set • Constant structure • Harry Partch-related • Maximal harmony epimorphic • MOS transversal • Non-octave JI • Wakalix • Z-polygon transversal • Other JI Full list: Category:Just intonation scales
Tempered scales	11-tone MOS • 12-tone tempered • Chromatic pair • Clipper • Double mode • Essentially tempered • Fantasy detemper • Marvel woo • Meantone • Min ambiguity • MOS cradle • Negri-9 • Neutral third • Non-octave tempered • Scalesmith systematic • Ternary • Other tempered Full list: Category:Tempered scales
Scales in EDOs	in 10edo • 11 • 13 • 14 • 15 • 16 • 17 • 18 • 19 • 20 • 21 • 22 • 23 • 24 • 25 • 26 • 27 • 28 • 29 • 30 • 31 • 33 • 34 • 35 • 36 • 37 • 38 • 40 • 41 • 42 • 43 • 46 • 49 • 53 • 72 • 80
All other scale gallery pages are included in Category:Lists of scales

@@ Line 1: / Line 1: @@
-See [[SN scale]] and [[Rank 3 scale]].
+See [[SN scale]] and [[Rank-3 scale]].
-Scales are grouped by their ''germinations'', the sequence of introduction of generators until 3 are reached, at which point the ''primitive'' 3-SN scale is developed (the first listed under each germination), from which all others of that germination evolve. The germination of Pythagorean, Meantone, Superpyth, Mavila, and Father MOS (2-SN) scales is (2/1, 3/2). Germinations are grouped by their subgroup, and within that, by the first comma tempered out in scales evolved from the germination.
+For more concise summary that's better for viewing on mobile devices, see [[Gallery of 3-SN scales mobile|Gallery of 3-SN scales mobile.]]
-Commas tempered out are shown in their simplest basis set, as per SN labeling conventions.
+Scales are grouped by their ''germinations'', the sequence of introduction of generators until 3 are reached, at which point the ''primitive'' 3-SN scale is developed (the first listed under each germination), from which all others of that germination evolve. The germination of [[Pythagorean]], [[Meantone]], [[Superpyth]], [[Mavila]], and [[Father]] [[MOS scale|MOS]] (2-SN) scales is ([[Octave|2/1]], [[3/2]]). Germinations are grouped by their [[subgroup]], and within that, by the first [[comma]] [[Tempering out|tempered out]] in scales evolved from the germination.
-Tempered scales are shown in JI as their simplest symmetric pre-image.
+Commas tempered out are shown in their simplest basis set, as per [[SN scale#Labeling|SN labeling conventions]].
-Scales are written in JI and as step patterns in their symmetric mode (scales of odd cardinality) or, for scales of even cardinality, mostly in the even-symmetric mode: the mode symmetric without 2/1 (scales of even cardinality)
+Tempered scales are shown in [[Just intonation|JI]] as their simplest symmetric pre-image.
-== 2.3.5, Marvel ==
+Scales are written in [[Just intonation|JI]] and as step patterns in their symmetric mode (scales of odd cardinality) or, for scales of even cardinality, mostly in the even-symmetric mode: the mode symmetric without [[Octave|2/1]], otherwise in the inverse of the even-symmetric mode (the mode symmetric without [[1/1]]).
+==2.3.5; [[Marvel]]==
+===(2/1, 3/2, 5/4) ===
+====[[SNS (2/1, 3/2, 5/4)-4|(2/1, 3/2, 5/4)[4]]]====
+{| class="wikitable"
+!Step signature
+!Steps in JI
+!Step sizes in cents
+|-
+|2L 1M 1s
+|(5/4, 6/5, 16/15)
+|(386.3137c, 315.6413c, 111.7313c)
+|}
+{| class="wikitable"
+!Mode number
+!Mode in JI
+!Step pattern
+![[Mode height]]
+|-
+| -2
+|16/15 4/3 8/5 2/1
+|sLML
+| -.2092
+|-
+| -1
+|5/4 4/3 5/3 2/1
+|LsLM
+| -.0174
+|-
+|1
+|6/5 3/2 8/5 2/1
+|MLsL
+|.0174
+|-
+|2
+|5/4 3/2 15/8 2/1
+|LMLs
+|.2092
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode 2)
+!Equivalence
+!Step pattern
+!Scale
+!Comma list
+|-
+|L = M
+|[[3L 1s|LLLs]]
+|[[Dicot]][4]
+|25/24
+|-
+|M = s
+|[[2L 2s|LsLs]]
+|Antitonic[4]
+|9/8
+|-
+|L - M = M - s
+|LsLd
+|Bug[4] MODMOS
+|27/25
+|-
+|s = 0
+|LsL
+|[[Trienstonic clan#Father|Father]][3]
+|16/15
+|}
-=== (2/1, 3/2, 5/4) ===
+====[[SNS (2/1, 3/2, 5/4)-7|(2/1, 3/2, 5/4)[7]]]====
+{| class="wikitable"
+! Step signature
+!Steps in JI
+!Step sizes in cents
+|-
+|2L 1M 4s
+|(75/64, 9/8, 16/15)
+|(274.5824c, 203.9100c, 111.7313c)
+|}
+{| class="wikitable"
+!Mode number
+!Mode in JI
+!Step pattern
+![[Mode height]]
+|-
+| -3
+|16/15 256/225 4/3 64/45 8/5 128/75 2/1
+|ssLsMsL
+| -.1161
+|-
+| -2
+|16/15 6/5 32/25 3/2 8/5 128/75 2/1
+|sMsLssL
+| -.0845
+|-
+| -1
+|16/15 5/4 4/3 64/45 5/3 16/9 2/1
+|sLssLsM
+| -.0316
+|-
+|0
+|16/15 5/4 4/3 3/2 8/5 15/8 2/1
+|sLsMsLs
+|0
+|-
+|1
+|9/8 6/5 45/32 3/2 8/5 15/8 2/1
+|MsLssLs
+|.0316
+|-
+|2
+|75/64 5/4 4/3 25/16 5/3 15/8 2/1
+|LssLsMs
+|.0845
+|-
+|3
+|75/64 5/4 45/32 3/2 225/128 15/8 2/1
+|LsMsLss
+|.1161
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode 0)
+!Equivalence
+!Step pattern
+!Scale
+!Comma list
+|-
+|L = M
+|[[3L 4s|sLsLsLs]]
+|[[Dicot]][7]
+|25/24
+|-
+|M = s
+|[[2L 5s|sLsssLs]]
+|[[Mavila]][7]
+|135/128
+|-
+|L = s
+| [[6L 1s|LLLsLLL]]
+|[[Enipucrop]][7]
+|1125/1024
+|-
+|L - M = M - s
+|sAsLsAs
+|[[Meantone]][7] MODMOS
+|81/80
+|-
+| s = 0
+|LsL
+|[[Trienstonic clan#Father|Father]][3]
+|16/15
+|}
-==== [[SNS (2/1, 3/2, 5/4)-4|(2/1, 3/2, 5/4)[4]]] ====
+=====[[SNS (2/1, 3/2, 5/4: 225/224)-7|(2/1, 3/2, 5/4: 225/224)[7]]] ([[Marvel]])=====
-L 1M 1s = (5/4, 6/5, 16/15)
+{| class="wikitable"
+! Step signature
+! Steps in JI
+!Step sizes in cents (TE tuning)
+|-
+|2L 1M 4s
+|(75/64~7/6, ~9/8, 16/15~15/14)
+| (267.8165c, 200.9152c, 116.0124c)
+|}
+{| class="wikitable"
+!Mode number
+!Mode as simplest JI pre-image
+!Step pattern
+![[Mode height]]
+|-
+| -3
+|~ 16/15 8/7 4/3 10/7 8/5 12/7 2/1
+|ssLsMsL
+| -.1079
+|-
+| -2
+|~ 16/15 6/5 9/7 3/2 8/5 12/7 2/1
+|sMsLssL
+| -.0793
+|-
+| -1
+|~ 16/15 5/4 4/3 10/7 5/3 16/9 2/1
+|sLssLsM
+| -.0286
+|-
+|0
+|~ 16/15 5/4 4/3 3/2 8/5 15/8 2/1
+|sLsMsLs
+|0
+|-
+|1
+|~ 9/8 6/5 7/5 3/2 8/5 15/8 2/1
+|MsLssLs
+|.0286
+|-
+|2
+|~ 7/6 5/4 4/3 14/9 5/3 15/8 2/1
+|LssLsMs
+|.0793
+|-
+|3
+|~ 7/6 5/4 7/5 3/2 7/4 15/8 2/1
+|LsMsLss
+|.1079
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode 0)
+!Equivalence
+!Step pattern
+!Scale
+!Comma list
+|-
+|L = M
+|[[3L 4s|sLsLsLs]]
+|[[Sharp]][7]
+|25/24, 28/27
+|-
+|M = s
+|[[2L 5s|sLsssLs]]
+|[[Pelogic]][7]
+|135/128, 21/20
+|-
+|L= s
+|[[6L 1s|LLLsLLL]]
+|[[Enipucrop]][7]
+| 35/32, 49/45
+|-
+|L - M = M - s
+|sAsLsAs
+|[[Meantone]][7] MODMOS
+|81/80, 126/125
+|}
+{| class="wikitable"
+|+Rank-1 temperings
+!ET
+|[[9edo|9]]
+|[[10edo|10]]
+|[[12edo|12]]
+|[[19edo|19]]
+| [[22edo|22]]
+|[[29edo|29]]
+|[[31edo|31]]
+|[[41edo|41]]
+|[[50edo|50]]
+|[[53edo|53]]
+|[[72edo|72]]
+|-
+!Step sizes in ET
+|(2, 1, 1)
+|(2, 2, 1)
+|(3, 2, 1)
+|(4, 3, 2)
+|(5, 4, 2)
+|(6, 5, 3)
+|(7, 5, 3)
+|(9, 7, 4)
+|(11, 8, 5)
+|(12, 9, 5)
+|(16, 12, 7)
+|}
-/4 3/2 15/8 2/1 as LMLs
+====[[SNS (2/1, 3/2, 5/4)-10|(2/1, 3/2, 5/4)[10]]]====
+{| class="wikitable"
+! Step signature
+! Steps in JI
+!Step sizes in cents
+|-
+|2L 7m 1s
+|(1125/1024, 16/15, 135/128)
+| (162.8511c, 111.7313c, 92.1787c)
+|}
+{| class="wikitable"
+|+
+!Mode number
+!Mode in JI
+!Step pattern
+!Pentachordal
+Decatonic
+!Pent. Dec.
+Mode name
+!Negri[10]
+!UDP
+![[Mode height]]
+|-
+| -5
+|16/15 256/225 6/5 32/25 512/375 3/2 8/5 128/75 2048/1125 2/1
+|mmsmmLmmmL
+|sssssLsssL
+|Dark minor
+|LLsLLLLLLL
+|<nowiki>2|7</nowiki>
+| -.0564
+|-
+| -4
+|16/15 9/8 6/5 32/25 45/32 3/2 8/5 128/75 15/8 2/1
+|msmmLmmmLm
+|ssssLsssLs
+|Alternate minor
+|LsLLLLLLLL
+|<nowiki>1|8</nowiki>
+| -.0411
+|-
+| -3
+|135/128 9/8 6/5 675/512 45/32 3/2 8/5 225/128 15/8 2/1
+|smmLmmmLmm
+|sssLsssLss
+|Bright minor
+|sLLLLLLLLL
+|<nowiki>0|9</nowiki>
+| -.0258
+|-
+| -2
+|16/15 256/225 4096/3375 4/3 64/45 1024/675 8/5 128/75 2048/1125 2/1
+|mmmLmmsmmL
+|sssLsssssL
+|Standard minor
+|LLLLLLsLLL
+|<nowiki>6|3</nowiki>
+| -.0230
+|-
+| -1
+|16/15 256/225 5/4 4/3 64/45 3/2 8/5 128/75 15/8 2/1
+|mmLmmsmmLm
+|ssLsssssLs
+|Dark major
+|LLLLLsLLLL
+|<nowiki>5|4</nowiki>
+| -.0077
+|-
+|1
+|16/15 75/64 5/4 4/3 45/32 3/2 8/5 225/128 15/8 2/1
+|mLmmsmmLmm
+|sLsssssLss
+|Alternate major
+|LLLLsLLLLL
+|<nowiki>4|5</nowiki>
+|.0077
+|-
+|2
+|1125/1024 75/64 5/4 675/512 45/32 3/2 3375/2048 225/128 15/8 2/1
+|LmmsmmLmmm
+|LsssssLsss
+|Bright major
+|LLLsLLLLLL
+|<nowiki>3|6</nowiki>
+|.0239
+|-
+|3
+|16/15 256/225 5/4 4/3 64/45 1024/675 5/3 16/9 256/135 2/1
+|mmLmmmLmms
+|ssLsssLsss
+|Standard major
+|LLLLLLLLLs
+|<nowiki>9|0</nowiki>
+|.0258
+|-
+|4
+|16/15 75/64 5/4 4/3 64/45 25/16 5/3 16/9 15/8 2/1
+|mLmmmLmmsm
+|sLsssLssss
+|Dark Augmented
+|LLLLLLLLsL
+|<nowiki>8|1</nowiki>
+|.0411
+|-
+|5
+|1125/1024 75/64 5/4 4/3 375/256 25/16 5/3 225/128 15/8 2/1
+|LmmmLmmsmm
+|LsssLsssss
+|Bright Augmented
+|LLLLLLLsLL
+|<nowiki>7|2</nowiki>
+|.0564
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode 1)
+!Equivalence
+!Step pattern
+!Scale
+!Comma list
+|-
+|m = s
+|[[OTC 2L 8s|sLsssssLss]]
+|[[Srutal]][10] 4M (pentachordal decatonic)
+|2048/2025
+|-
+|L = m
+|[[9L 1s|LLLLsLLLLL]]
+|[[Marvel temperaments#Negri|Negri]][10]
+|16875/16384
+|-
+|L = s
+|[[7L 3s|LsLLsLLsLL]]
+|[[Dicot]][10]
+|25/24
+|-
+|L - m = m - s
+|sLssdssLss
+|[[Ampersand]][10] MODMOS
+|34171875/33554432
+|-
+|s = 0
+|[[2L 7s|sLssssLss]]
+|[[Mavila]][9]
+|135/128
+|-
+|m = 0
+|LsL
+|[[Trienstonic clan#Father|Father]][3]
+|16/15
+|-
+|L = 0
+|[[7L 1s|LLLsLLLL]]
+|[[Enipucrop]][8]
+|1125/1024
+|}
+=====[[SNS (2/1, 3/2, 5/4: 225/224)-10|(2/1, 3/2, 5/4: 225/224)[10]]] ([[Marvel]])=====
+{| class="wikitable"
+! Step signature
+! Steps in JI
+!Step sizes in cents (TE)
+|-
+|2L 7m 1s
+|(35/32~49/45, 16/15~15/14, 135/128~21/20)
+| (151.8041c, 116.0124c, 84.9028c)
+|}
+{| class="wikitable"
+!Mode number
+!Mode as simplest JI pre-image
+!Step pattern
+!Pentachordal
+Decatonic
+!Pent. Dec.
+Mode name
+!Negri[10]
+!UDP
+![[Mode height]]
+|-
+| -5
+|~ 16/15 8/7 6/5 9/7 48/35 3/2 8/5 12/7 64/35 2/1
+|mmsmmLmmmL
+|sssssLsssL
+|Dark minor
+|LLsLLLLLLL
+|<nowiki>2|7</nowiki>
+| -.0475
+|-
+| -4
+|~ 16/15 9/8 6/5 9/7 7/5 3/2 8/5 12/7 15/8 2/1
+|msmmLmmmLm
+|ssssLsssLs
+|Alternate minor
+|LsLLLLLLLL
+|<nowiki>1|8</nowiki>
+| -.0400
+|-
+| -3
+|~ 21/20 9/8 6/5 21/16 7/5 3/2 8/5 7/4 15/8 2/1
+|smmLmmmLmm
+|sssLsssLss
+|Bright minor
+|sLLLLLLLLL
+|<nowiki>0|9</nowiki>
+| -.0325
+|-
+| -2
+|~ 16/15 8/7 60/49 4/3 10/7 32/21 8/5 12/7 64/35 2/1
+|mmmLmmsmmL
+|sssLsssssL
+|Standard minor
+|LLLLLLsLLL
+|<nowiki>6|3</nowiki>
+| -.0112
+|-
+| -1
+|~ 16/15 8/7 5/4 4/3 10/7 3/2 8/5 12/7 15/8 2/1
+|mmLmmsmmLm
+|ssLsssssLs
+|Dark major
+|LLLLLsLLLL
+|<nowiki>5|4</nowiki>
+| -.0037
+|-
+|1
+|~ 16/15 7/6 5/4 4/3 7/5 3/2 8/5 7/4 15/8 2/1
+|mLmmsmmLmm
+|sLsssssLss
+|Alternate major
+|LLLLsLLLLL
+|<nowiki>4|5</nowiki>
+|.0037
+|-
+|2
+|~ 35/32 7/6 5/4 21/16 7/5 3/2 49/30 7/4 15/8 2/1
+|LmmsmmLmmm
+|LsssssLsss
+|Bright major
+|LLLsLLLLLL
+|<nowiki>3|6</nowiki>
+|.0112
+|-
+|3
+|~ 16/15 8/7 5/4 4/3 10/7 32/21 5/3 16/9 40/21 2/1
+|mmLmmmLmms
+|ssLsssLsss
+|Standard major
+|LLLLLLLLLs
+|<nowiki>9|0</nowiki>
+|.0325
+|-
+|4
+|~ 16/15 7/6 5/4 4/3 10/7 14/9 5/3 16/9 15/8 2/1
+|mLmmmLmmsm
+|sLsssLssss
+|Dark Augmented
+|LLLLLLLLsL
+|<nowiki>8|1</nowiki>
+|.0400
+|-
+|5
+|~ 35/32 7/6 5/4 4/3 35/24 14/9 5/3 7/4 15/8 2/1
+|LmmmLmmsmm
+|LsssLsssss
+|Bright Augmented
+|LLLLLLLsLL
+|<nowiki>7|2</nowiki>
+|.0475
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode 1)
+!Equivalence
+!Step pattern
+!Scale
+!Comma list
+|-
+|m = s
+|[[OTC 2L 8s|sLsssssLss]]
+|[[Pajara]][10] 4M (pentachordal decatonic)
+|50/49, 64/63
+|-
+|L = m
+|[[9L 1s|LLLLsLLLLL]]
+|[[Marvel temperaments#Negri|Negri]][10]
+|49/48, 225/224
+|-
+|L = s
+|[[7L 3s|LsLLsLLsLL]]
+|[[Sharp]][10]
+|25/24, 28/27
+|-
+|L - m = m - s
+|sLssdssLss
+|[[Miracle]][10] MODMOS
+|225/224, 1029/1024
+|-
+|s = 0
+|[[2L 7s|sLssssLss]]
+|[[Pelogic]][9]
+|21/20, 135/128
+|}
+{| class="wikitable"
+|+Rank-1 temperings
+!ET
+|[[12edo|12]]
+|[[19edo|19]]
+|[[22edo|22]]
+|[[29edo|29]]
+|[[31edo|31]]
+|[[41edo|41]]
+|[[50edo|50]]
+|[[53edo|53]]
+|[[72edo|72]]
+|-
+!Step sizes in ET
+|(2, 1, 1)
+|(2, 2, 1)
+|(3, 2, 2)
+|(3, 3, 2)
+|(4, 3, 2)
+|(5, 4, 3)
+|(6, 5, 3)
+|(7, 5, 4)
+|(9, 7, 5)
+|}
+=====[[SNS (2/1, 3/2, 5/4: 225/224, 385/384)-10|(2/1, 3/2, 5/4: 225/224, 385/384)[10]]] ([[Marvel]])=====
+{| class="wikitable"
+! Step signature
+! Steps in JI
+!Step sizes in cents (TE)
+|-
+|2L 7m 1s
+|(35/32~49/45~12/11, 16/15~15/14, 135/128~21/20)
+| (151.4797c, 116.1327c, 84.7519c)
+|}
+{| class="wikitable"
+!Mode number
+!Mode as simplest JI pre-image
+!Step pattern
+!Pentachordal
+Decatonic
+!Pent. Dec.
+Mode name
+!Negri[10]
+!UDP
+![[Mode height]]
+|-
+| -5
+|~ 16/15 8/7 6/5 9/7 11/8 3/2 8/5 12/7 11/6 2/1
+|mmsmmLmmmL
+|sssssLsssL
+|Dark minor
+|LLsLLLLLLL
+|<nowiki>2|7</nowiki>
+| -.0472
+|-
+| -4
+|~ 16/15 9/8 6/5 9/7 7/5 3/2 8/5 12/7 15/8 2/1
+|msmmLmmmLm
+|ssssLsssLs
+|Alternate minor
+|LsLLLLLLLL
+|<nowiki>1|8</nowiki>
+| -.0400
+|-
+| -3
+|~ 21/20 9/8 6/5 21/16 7/5 3/2 8/5 7/4 15/8 2/1
+|smmLmmmLmm
+|sssLsssLss
+|Bright minor
+|sLLLLLLLLL
+|<nowiki>0|9</nowiki>
+| -.0327
+|-
+| -2
+|~ 16/15 8/7 11/9 4/3 10/7 32/21 8/5 12/7 11/6 2/1
+|mmmLmmsmmL
+|sssLsssssL
+|Standard minor
+|LLLLLLsLLL
+|<nowiki>6|3</nowiki>
+| -.0109
+|-
+| -1
+|~ 16/15 8/7 5/4 4/3 10/7 3/2 8/5 12/7 15/8 2/1
+|mmLmmsmmLm
+|ssLsssssLs
+|Dark major
+|LLLLLsLLLL
+|<nowiki>5|4</nowiki>
+| -.0036
+|-
+|1
+|~ 16/15 7/6 5/4 4/3 7/5 3/2 8/5 7/4 15/8 2/1
+|mLmmsmmLmm
+|sLsssssLss
+|Alternate major
+|LLLLsLLLLL
+|<nowiki>4|5</nowiki>
+|.0036
+|-
+|2
+|~ 12/11 7/6 5/4 21/16 7/5 3/2 18/11 7/4 15/8 2/1
+|LmmsmmLmmm
+|LsssssLsss
+|Bright major
+|LLLsLLLLLL
+|<nowiki>3|6</nowiki>
+|.0109
+|-
+|3
+|~ 16/15 8/7 5/4 4/3 10/7 32/21 5/3 16/9 40/21 2/1
+|mmLmmmLmms
+|ssLsssLsss
+|Standard major
+|LLLLLLLLLs
+|<nowiki>9|0</nowiki>
+|.0327
+|-
+|4
+|~ 16/15 7/6 5/4 4/3 10/7 14/9 5/3 16/9 15/8 2/1
+|mLmmmLmmsm
+|sLsssLssss
+|Dark Augmented
+|LLLLLLLLsL
+|<nowiki>8|1</nowiki>
+|.0400
+|-
+|5
+|~ 12/11 7/6 5/4 4/3 16/11 14/9 5/3 7/4 15/8 2/1
+|LmmmLmmsmm
+|LsssLsssss
+|Bright Augmented
+|LLLLLLLsLL
+|<nowiki>7|2</nowiki>
+|.0472
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode 1)
+!Equivalence
+!Step pattern
+!Scale
+!Comma list
+|-
+|m = s
+|[[OTC 2L 8s|sLsssssLss]]
+|[[Pajarous]][10] 4M (pentachordal decatonic)
+|50/49, 55/54, 64/63
+|-
+|L = m
+|[[9L 1s|LLLLsLLLLL]]
+|[[Marvel temperaments#Negri|Negri]][10]
+|45/44, 49/48, 56/55
+|-
+|L - m = m - s
+|sLssdssLss
+|[[Miracle]][10] MODMOS
+|225/224, 243/242, 385/384
+|}
+{| class="wikitable"
+|+Rank-1 temperings
+!ET
+|12e
+|[[19edo|19]]
+|[[22edo|22]]
+|[[31edo|31]]
+|[[41edo|41]]
+|[[50edo|50]]
+|[[53edo|53]]
+|[[72edo|72]]
+|-
+!Step sizes in ET
+|(2, 1, 1)
+|(2, 2, 1)
+|(3, 2, 2)
+|(4, 3, 2)
+|(5, 4, 3)
+|(6, 5, 3)
+|(7, 5, 4)
+|(9, 7, 5)
+|}
+=====[[SNS (2/1, 3/2, 5/4: 225/224, 441/440)-10|(2/1, 3/2, 5/4: 225/224, 441/440)[10]]] ([[Prodigy]])=====
+{| class="wikitable"
+! Step signature
+! Steps in JI
+!Step sizes in cents (TE)
+|-
+|2L 7m 1s
+|(35/32~49/45, 16/15~15/14, 135/128~21/20~22/21)
+| (150.229c, 116.7669c, 82.9601c)
+|}
+{| class="wikitable"
+!Mode number
+!Mode as simplest JI pre-image
+!Step pattern
+!Pentachordal
+Decatonic
+!Pent. Dec.
+Mode name
+!Negroni[10]
+!UDP
+![[Mode height]]
+|-
+| -5
+|~ 16/15 8/7 6/5 9/7 48/35 3/2 8/5 12/7 64/35 2/1
+|mmsmmLmmmL
+|sssssLsssL
+|Dark minor
+|LLsLLLLLLL
+|<nowiki>2|7</nowiki>
+| -.0466
+|-
+| -4
+|~ 16/15 9/8 6/5 9/7 7/5 3/2 8/5 12/7 15/8 2/1
+|msmmLmmmLm
+|ssssLsssLs
+|Alternate minor
+|LsLLLLLLLL
+|<nowiki>1|8</nowiki>
+| -.0404
+|-
+| -3
+|~ 21/20 9/8 6/5 21/16 7/5 3/2 8/5 7/4 15/8 2/1
+|smmLmmmLmm
+|sssLsssLss
+|Bright minor
+|sLLLLLLLLL
+|<nowiki>0|9</nowiki>
+| -.0343
+|-
+| -2
+|~ 16/15 8/7 27/22 4/3 10/7 32/21 8/5 12/7 64/35 2/1
+|mmmLmmsmmL
+|sssLsssssL
+|Standard minor
+|LLLLLLsLLL
+|<nowiki>6|3</nowiki>
+| -.0092
+|-
+| -1
+|~ 16/15 8/7 5/4 4/3 10/7 3/2 8/5 12/7 15/8 2/1
+|mmLmmsmmLm
+|ssLsssssLs
+|Dark major
+|LLLLLsLLLL
+|<nowiki>5|4</nowiki>
+| -.0031
+|-
+|1
+|~ 16/15 7/6 5/4 4/3 7/5 3/2 8/5 7/4 15/8 2/1
+|mLmmsmmLmm
+|sLsssssLss
+|Alternate major
+|LLLLsLLLLL
+|<nowiki>4|5</nowiki>
+|.0031
+|-
+|2
+|~ 35/32 7/6 5/4 21/16 7/5 3/2 44/27 7/4 15/8 2/1
+|LmmsmmLmmm
+|LsssssLsss
+|Bright major
+|LLLsLLLLLL
+|<nowiki>3|6</nowiki>
+|.0092
+|-
+|3
+|~ 16/15 8/7 5/4 4/3 10/7 32/21 5/3 16/9 40/21 2/1
+|mmLmmmLmms
+|ssLsssLsss
+|Standard major
+|LLLLLLLLLs
+|<nowiki>9|0</nowiki>
+|.0343
+|-
+|4
+|~ 16/15 7/6 5/4 4/3 10/7 14/9 5/3 16/9 15/8 2/1
+|mLmmmLmmsm
+|sLsssLssss
+|Dark Augmented
+|LLLLLLLLsL
+|<nowiki>8|1</nowiki>
+|.0404
+|-
+|5
+|~ 35/32 7/6 5/4 4/3 35/24 14/9 5/3 7/4 15/8 2/1
+|LmmmLmmsmm
+|LsssLsssss
+|Bright Augmented
+|LLLLLLLsLL
+|<nowiki>7|2</nowiki>
+|.0466
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode 1)
+!Equivalence
+!Step pattern
+!Scale
+!Comma list
+|-
+|m = s
+|[[OTC 2L 8s|sLsssssLss]]
+|[[Pajaric]][10] 4M (pentachordal decatonic)
+|45/44, 50/49, 56/55
+|-
+|L = m
+|[[9L 1s|LLLLsLLLLL]]
+|[[Negroni]][10]
+|49/48, 55/54, 225/224
+|-
+|L - m = m - s
+|sLssdssLss
+|[[Miracle]][10] MODMOS
+|225/224, 243/242, 385/384
+|}
+{| class="wikitable"
+|+Rank-1 temperings
+!ET
+|[[12edo|12]]
+|19e
+|[[29edo|29]]
+|[[31edo|31]]
+|[[41edo|41]]
+|53e
+|[[72edo|72]]
+|-
+!Step sizes in ET
+|(2, 1, 1)
+|(2, 2, 1)
+|(3, 3, 2)
+|(4, 3, 2)
+|(5, 4, 3)
+|(7, 5, 4)
+|(9, 7, 5)
+|}
+====[[SNS (2/1, 3/2, 5/4: 225/224)-19|(2/1, 3/2, 5/4: 225/224)[19]]] (Marvel)====
+{| class="wikitable"
+! Step signature
+! Steps in JI
+!Step sizes in cents (TE)
+|-
+|10L 2M 7s
+|(135/128~21/20, 25/24~28/27, 64/63~50/49)
+| (84.9028c, 66.9013c, 31.1096c)
+|}
+{| class="wikitable"
+!Mode number
+!Mode as simplest JI pre-image
+!Step pattern
+![[Mode height]]
+|-
+| -9
+|~ 50/49 16/15 160/147 8/7 512/441 60/49 80/63 4/3 256/189 10/7 640/441 32/21 8/5 80/49 12/7 256/147 64/35 40/21 2/1
+|sLsLsLMLsLsLLsLsLML
+| -.0464
+|-
+|0
+|~ 21/20 16/15 9/8 8/7 6/5 5/4 21/16 4/3 7/5 10/7 3/2 32/21 8/5 5/3 7/4 16/9 15/8 40/21 2/1
+|LsLsLMLsLsLsLMLsLsL
+|0
+|-
+|9
+|~ 21/20 35/32 147/128 7/6 49/40 5/4 21/16 441/320 7/5 189/128 3/2 63/40 49/30 441/256 7/4 147/80 15/8 49/25 2/1
+|LMLsLsLLsLsLMLsLsLs
+|.0464
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode 0)
+!Equivalence
+!Step pattern
+!Scale
+!Comma list
+|-
+|L = M
+|LsLsLLLsLsLsLLLsLsL
+|[[Septimal meantone|Meantone]][19] MODMOS
+|81/80, 126/125
+|-
+|M = s
+|[[10L 9s|LsLsLsLsLsLsLsLsLsL]]
+|[[Marvel temperaments#Negri|Negri]][19]
+|49/48, 225/224
+|-
+|L - M = M - s
+|LdLdLsLdLdLdLsLdLdL
+|[[Magic]][19] MODMOS
+|225/224, 245/243
+|-
+|s = 0
+|[[OTC 10L 2s|LLLsLLLLsLLL]]
+|[[Pajara]][12] 4M (hexachordal dodecatonic)
+|50/49, 64/63
+|-
+|m = 0
+|[[10L 7s|LsLsLLsLsLsLLsLsL]]
+|[[Sharp]][17]
+|25/24, 28/27
+|}
+{| class="wikitable"
+|+Rank-1 temperings
+!ET
+|[[22edo|22]]
+|[[29edo|29]]
+|[[31edo|31]]
+|[[41edo|41]]
+|[[50edo|50]]
+|[[53edo|53]]
+|[[72edo|72]]
+|-
+!Step sizes in ET
+|(2, 1, 0)
+|(2, 1, 1)
+|(2, 2, 1)
+|(3, 2, 1)
+|(3, 3, 2)
+|(4, 3, 1)
+|(5, 4, 2)
+|}
-tempers to LLLs Dicot[4], LsLs Antitonic[4]
+=====[[SNS (2/1, 3/2, 5/4: 225/224, 385/384)-19|(2/1, 3/2, 5/4: 225/224, 385/384)[19]]] (Marvel)=====
+{| class="wikitable"
+! Step signature
+! Steps in JI
+!Step sizes in cents (TE)
+|-
+|10L 2M 7s
+|(135/128~21/20, 25/24~28/27, 64/63~50/49~55/54)
+| (84.7519c, 66.7278c, 31.3808c)
+|}
+{| class="wikitable"
+!Mode number
+!Mode as simplest JI pre-image
+!Step pattern
+![[Mode height]]
+|-
+| -9
+|~ 50/49 16/15 88/81 8/7 220/189 11/9 80/63 4/3 110/81 10/7 352/243 32/21 8/5 44/27 12/7 110/63 11/6 40/21 2/1
+|sLsLsLMLsLsLLsLsLML
+| -.0460
+|-
+|0
+|~ 21/20 16/15 9/8 8/7 6/5 5/4 21/16 4/3 7/5 10/7 3/2 32/21 8/5 5/3 7/4 16/9 15/8 40/21 2/1
+|LsLsLMLsLsLsLMLsLsL
+|0
+|-
+|9
+|~ 21/20 12/11 63/55 7/6 27/22 5/4 21/16 243/176 7/5 81/55 3/2 63/40 18/11 189/110 7/4 81/44 15/8 49/25 2/1
+|LMLsLsLLsLsLMLsLsLs
+|.0460
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode 0)
+!Equivalence
+!Step pattern
+!Scale
+!Comma list
+|-
+|L = M
+|LsLsLLLsLsLsLLLsLsL
+|[[Meanpop]][19] MODMOS
+|81/80, 126/125, 385/384
+|-
+|M = s
+|[[10L 9s|LsLsLsLsLsLsLsLsLsL]]
+|[[Marvel temperaments#Negri|Negri]][19]
+|45/44, 49/48, 56/55
+|-
+|L - M = M - s
+|LdLdLsLdLdLdLsLdLdL
+|[[Magic]][19] MODMOS
+|100/99, 225/224, 245/243
+|-
+|s = 0
+|[[OTC 10L 2s|LLLsLLLLsLLL]]
+|[[Pajarous]][12] 4M (hexachordal dodecatonic)
+|50/49, 55/54, 64/63
+|}
+{| class="wikitable"
+|+Rank-1 temperings
+!ET
+|[[22edo|22]]
+|[[31edo|31]]
+|[[41edo|41]]
+|[[50edo|50]]
+|[[53edo|53]]
+|[[72edo|72]]
+|-
+!Step sizes in ET
+|(2, 1, 0)
+|(2, 2, 1)
+|(3, 2, 1)
+|(3, 3, 2)
+|(4, 3, 1)
+|(5, 4, 2)
+|}
-==== [[SNS (2/1, 3/2, 5/4)-7|(2/1, 3/2, 5/4)[7]]] ====
+=====[[SNS (2/1, 3/2, 5/4: 225/224, 441/440)-19|(2/1, 3/2, 5/4: 225/224, 441/440)[19]]] ([[Prodigy]])=====
-L 1M 4s = (75/64, 9/8, 16/15)
+{| class="wikitable"
+! Step signature
+! Steps in JI
+!Step sizes in cents (TE)
+|-
+|10L 2M 7s
+|(135/128~21/20~22/21, 25/24~28/27, 64/63~50/49~45/44~56/55)
+| (82.9601c, 67.2689c, 33.8068c)
+|}
+{| class="wikitable"
+!Mode number
+!Mode as simplest JI pre-image
+!Step pattern
+![[Mode height]]
+|-
+| -9
+|~ 50/49 16/15 12/11 8/7 64/55 27/22 14/11 4/3 15/11 10/7 16/11 32/21 8/5 18/11 12/7 96/55 64/35 40/21 2/1
+|sLsLsLMLsLsLLsLsLML
+| -.0428
+|-
+|0
+|~ 21/20 16/15 9/8 8/7 6/5 5/4 21/16 4/3 7/5 10/7 3/2 32/21 8/5 5/3 7/4 16/9 15/8 40/21 2/1
+|LsLsLMLsLsLsLMLsLsL
+|0
+|-
+|9
+|~ 21/20 35/32 55/48 7/6 11/9 5/4 21/16 11/8 7/5 22/15 3/2 11/7 44/27 55/32 7/4 11/6 15/8 49/25 2/1
+|LMLsLsLLsLsLMLsLsLs
+|.0428
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode 0)
+!Equivalence
+!Step pattern
+!Scale
+!Comma list
+|-
+|L = M
+|LsLsLLLsLsLsLLLsLsL
+|[[Septimal meantone|Meantone]][19] MODMOS
+|81/80, 99/98, 126/125
+|-
+|M = s
+|[[10L 9s|LsLsLsLsLsLsLsLsLsL]]
+|[[Marvel temperaments#Negroni|Negroni]][19]
+|49/48, 55/54, 225/224
+|-
+|L - M = M - s
+|LdLdLsLdLdLdLsLdLdL
+|[[Witchcraft]][19] MODMOS
+|225/224, 245/243, 441/440
+|-
+|s = 0
+|[[OTC 10L 2s|LLLsLLLLsLLL]]
+|[[Pajaric]][12] 4M (hexachordal dodecatonic)
+|45/44, 50/49, 56/55
+|}
+{| class="wikitable"
+|+Rank-1 temperings
+!ET
+|[[29edo|29]]
+|[[31edo|31]]
+|[[41edo|41]]
+|53e
+|[[72edo|72]]
+|-
+!Step sizes in ET
+|(2, 1, 1)
+|(2, 2, 1)
+|(3, 2, 1)
+|(4, 3, 1)
+|(5, 4, 2)
+|}
-/15 5/4 4/3 3/2 8/5 15/8 as sLsMsLs
+====[[SNS (2/1, 3/2, 5/4: 225/224, 441/440)-31|(2/1, 3/2, 5/4: 225/224, 441/440)[31]]] ([[Prodigy]])====
+{| class="wikitable"
+! Step signature
+! Steps in JI
+!Step sizes in cents (TE)
+|-
+|10L 19M 2s
+|(~33/32, 64/63~50/49~45/44~56/55, 49/48~55/54)
+| (49.1533c, 33.8068c, 33.4621c)
+|}
-tempers to sLsLsLs Dicot[7], sLsssLs Mavila[7], LLLsLLL Enipucrop[7]
+Mode 0: ~ 50/49 22/21 16/15 12/11 9/8 8/7 7/6 6/5 27/22 5/4 14/11 21/16 4/3 15/11 7/5 10/7 22/15 3/2 32/21 11/7 8/5 44/27 5/3 12/7 7/4 16/9 11/6 15/8 21/11 49/25 2/1
-=====[[SNS (2/1, 3/2, 5/4: 225/224)-7|(2/1, 3/2, 5/4: 225/224)[7]]]=====
+as mLmmLmsmLmmLmmLmLmmLmmLmsmLmmLm
-L 1M 4s = (75/64~7/6, ~9/8, 16/15~15/14) = (267.8165c, 200.9152c, 116.0124c) TE
+{| class="wikitable"
+|+Rank-2 temperings (mode 0)
+!Equivalence
+!Step pattern
+!Scale
+!Comma list
+|-
+|m = s
+|sLssLsssLssLssLsLssLssLsssLssLs
+|[[Miracle]][31] MODMOS
+|225/224, 243/242, 385/384
+|-
+|L = m
+|LLLLLLLsLLLLLLLLLLLLLLLLLsLLLLLL
+|[[Tritonic]][31] MODMOS
+|121/120, 225/224, 441/440
+|-
+|L = s
+|sLssLsLsLssLssLsLssLssLsLsLssLs
+|[[Septimal meantone|Meantone[]]31] MODMOS
+|81/80, 99/98, 126/125
+|-
+|s = 0
+|mLmmLmmLmmLmmLmLmmLmmLmmLmmLm
+|[[Marvel temperaments#Negroni|Negroni]][29]
+|49/48, 55/54, 225/224
+|-
+|m = 0
+|LLsLLLLLLsLL
+|[[Pajaric]][12] 4M (hexachordal dodecatonic)
+|45/44, 50/49, 56/55
+|}
+{| class="wikitable"
+|+Rank-1 temperings
+!ET
+|[[41edo|41]]
+|53e
+|[[72edo|72]]
+|-
+!Step sizes in ET
+|(2, 1, 1)
+|(3, 1, 2)
+|(3, 2, 2)
+|}
+===((2/1, 5/4)[3], 16/15)===
+====[[SNS ((2/1, 5/4)-3, 16/15)-6|((2/1, 5/4)[3], 16/15)[6]]]====
+{| class="wikitable"
+! Step signature
+! Steps in JI
+!Step sizes in cents
+|-
+|1L 2M 4s
+|(6/5, 75/64, 16/15)
+| (315.6413c, 267.8165c, 111.7313c)
+|}
+{| class="wikitable"
+!Mode number
+!Mode in JI
+!Step pattern
+![[Mode height]]
+|-
+|  -3
+|16/15 5/4 4/3 25/16 5/3 2/1
+|sMsMsL
+|  -0.1156
+|-
+|  -2
+|16/15 5/4 4/3 8/5 128/75 2/1
+|sMsLsM
+|  -0.0883
+|-
+|  -1
+|16/15 32/25 512/375 8/5 128/75 2/1
+|sLsMsM
+|  -0.0609
+|-
+|1
+|75/64 5/4 375/256 25/16 15/8 2/1
+|MsMsLs
+|0.0609
+|-
+|2
+|75/64 5/4 3/2 8/5 15/8 2/1
+|MsLsMs
+|0.0883
+|-
+|3
+|6/5 32/25 3/2 8/5 15/8 2/1
+|LsMsMs
+|0.1156
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode 2)
+! Equivalence
+! Step pattern
+! Scale
+! Comma list
+|-
+| L = M
+| LsLsLs
+| [[Augmented (temperament)|Augmented]][6]
+| 128/125
+|-
+| M = s
+| ssLsss
+| [[Enipucrop]][6]
+| 1125/1024
+|-
+| L = s
+| LsssLs
+| Antitonic[6] 4M
+| 9/8
+|-
+| s = 0
+| LsL
+| [[Father]][3]
+| 16/15
+|}
+=====[[SNS ((2/1, 5/4)-3, 16/15: 225/224)-6|((2/1, 5/4)[3], 16/15: 225/224)[6] (Marvel)]]=====
+{| class="wikitable"
+! Step signature
+! Steps in JI
+!Step sizes in cents (TE tuning)
+|-
+|1L 2M 4s
+|6/5, 75/64~7/6, 16/15~15/14
+| (316.9276c, 267.8165c, 116.0124c)
+|}
+{| class="wikitable"
+!Mode number
+!Mode as simplest JI pre-image
+!Step pattern
+![[Mode height]]
+|-
+|  -3
+|~ 15/14 5/4 4/3 14/9 5/3 2/1
+|sMsMsL
+|  -0.1168
+|-
+|  -2
+|~ 15/14 5/4 4/3 8/5 12/7 2/1
+|sMsLsM
+|  -0.0840
+|-
+|  -1
+|~ 15/14 9/7 48/35 8/5 12/7 2/1
+|sLsMsM
+|  -0.0513
+|-
+|1
+|~ 7/6 5/4 35/28 14/9 15/8 2/1
+|MsMsLs
+|0.0513
+|-
+|2
+|~ 7/6 5/4 3/2 8/5 15/8 2/1
+|MsLsMs
+|0.0840
+|-
+|3
+|~ 6/5 9/7 3/2 8/5 15/8 2/1
+|LsMsMs
+|0.1168
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode 2)
+! Equivalence
+! Step pattern
+! Scale
+! Comma list
+|-
+| L = M
+| LsLsLs
+| [[August]][6]
+| 128/125
+|}
+{| class="wikitable"
+|+Rank-1 temperings
+!ET
+|[[7edo|7]]
+|[[9edo|9]]
+|[[10edo|10]]
+|[[12edo|12]]
+|[[19edo|19]]
+|[[22edo|22]]
+|[[29edo|29]]
+|[[31edo|31]]
+|[[41edo|41]]
+|[[50edo|50]]
+|[[53edo|53]]
+|[[72edo|72]]
+|-
+!Step sizes in ET
+|(2, 1, 1)
+|(2, 2, 1)
+|(3, 2, 1)
+|(3, 3, 1)
+|(5, 4, 2)
+|(6, 5, 2)
+|(8, 6, 3)
+|(8, 7, 3)
+|(11, 9, 4)
+|(13, 11, 5)
+|(14, 12, 5)
+|(19, 16, 7)
+|}
+====[[SNS ((2/1, 5/4)-3, 16/15)-9|((2/1, 5/4)[3], 16/15)[9]]]====
+{| class="wikitable"
+! Step signature
+! Steps in JI
+!Step sizes in cents
+|-
+|1L 2M 6s
+|(9/8, 1125/1024, 16/15)
+| (203.9100c, 162.8511c, 111.7313c)
+|}
+{| class="wikitable"
+!Mode number
+!Mode in JI
+!Step pattern
+![[Mode height]]
+|-
+| -4
+|16/15 256/225 5/4 4/3 64/45 25/16 5/3 16/9 2/1
+|ssMssMssL
+| -0.0662
+|-
+|  -3
+|16/15 256/225 5/4 4/3 64/45 8/5 128/75 2048/1125 2/1
+|ssMssLssM
+|  -0.0405
+|-
+|  -2
+|16/15 75/64 5/4 4/3 375/256 25/16 5/3 15/8 2/1
+|sMssMssLs
+|  -0.0257
+|-
+|  -1
+|16/15 256/225 32/25 512/375 8192/5625 8/5 128/75 2048/1125 2/1
+|ssLssMssM
+|  -0.0148
+|-
+|0
+|16/15 75/64 5/4 4/3 3/2 8/5 128/75 15/8 2/1
+|sMssLssMs
+|0
+|-
+|1
+|1125/1024 75/64 5/4 5625/4096 375/256 25/16 225/128 15/8 2/1
+|MssMssLss
+|0.0148
+|-
+|2
+|16/15 6/5 32/25 512/375 3/2 8/5 128/75 15/8 2/1
+|sLssMssMs
+|0.0257
+|-
+|3
+|1125/1024 75/64 5/4 45/32 3/2 8/5 225/128 15/8 2/1
+|MssLssMss
+|0.0405
+|-
+|4
+|9/8 6/5 32/25 45/32 3/2 8/5 225/128 15/8 2/1
+|LssMssMss
+|0.0662
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode 0)
+! Equivalence
+! Step pattern
+! Scale
+! Comma list
+|-
+| L = M
+| [[3L 6s|sLssLssLs]]
+| [[Augmented (temperament)|Augmented]][9]
+| 128/125
+|-
+| M = s
+| [[1L 8s|ssssLssss]]
+| [[Negri]][9]
+| 16875/16384
+|-
+| L = s
+| [[OTC 2L ns|sLsssssLs]]
+| [[Mavila]][9] MODMOS
+| 135/128
+|-
+| L - M = M - s
+| sLssAssLs
+| [[Orson]][9] MODMOS
+| 2109375/2097152
+|-
+| s = 0
+| LsL
+| [[Father]][3]
+| 16/15
+|-
+| m = 0
+| [[1L 6s|sssLsss]]
+| [[Enipucrop]][7]
+| 1125/1024
+|}
+=====[[SNS ((2/1, 5/4)-3, 16/15: 225/224)-9|((2/1, 5/4)[3], 16/15: 225/224)[9] (Marvel)]]=====
+{| class="wikitable"
+! Step signature
+! Steps in JI
+!Step sizes in cents (TE tuning)
+|-
+|1L 2M 6s
+|(9/8~28/25, 35/32~49/45, 16/15~15/14)
+| (203.9100c, 162.8511c, 111.7313c)
+|}
+{| class="wikitable"
+!Mode number
+!Mode as simplest JI pre-image
+!Step pattern
+![[Mode height]]
+|-
+| -4
+|~ 15/14 8/7 5/4 4/3 10/7 14/9 5/3 16/9 2/1
+|ssMssMssL
+|  -0.0633
+|-
+|  -3
+|~ 15/14 8/7 5/4 4/3 10/7 8/5 12/7 64/35 2/1
+|ssMssLssM
+|  -0.0326
+|-
+|  -2
+|~ 15/14 7/6 5/4 4/3 35/24 14/9 5/3 15/8 2/1
+|sMssMssLs
+|  -0.0307
+|-
+|  -1
+|~ 15/14 8/7 9/7 48/35 72/49 8/5 12/7 64/35 2/1
+|ssLssMssM
+|  -0.0019
+|-
+|0
+|~ 15/14 7/6 5/4 4/3 3/2 8/5 12/7 15/8 2/1
+|sMssLssMs
+|0
+|-
+|1
+|~ 35/32 7/6 5/4 49/36 35/24 14/9 7/4 15/8 2/1
+|MssMssLss
+|0.0019
+|-
+|2
+|~ 15/14 6/5 9/7 48/35 3/2 8/5 12/7 15/8 2/1
+|sLssMssMs
+|0.0307
+|-
+|3
+|~ 35/32 7/6 5/4 7/5 3/2 8/5 7/4 15/8 2/1
+|MssLssMss
+|0.0326
+|-
+|4
+|~ 9/8 6/5 9/7 7/5 3/2 8/5 7/4 15/8 2/1
+|LssMssMss
+|0.0633
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode 0)
+!Equivalence
+!Step pattern
+!Scale
+!Comma list
+|-
+|L = M
+|[[3L 6s|sLssLssLs]]
+|[[August]][9]
+|36/35, 128/125
+|-
+|M = s
+|[[1L 8s|ssssLssss]]
+|[[Marvel temperaments#Negri|Negri]][9]
+|49/48, 225/224
+|-
+|L = s
+|[[OTC 2L ns|sLsssssLs]]
+|[[Pelogic]][9] MODMOS
+| 21/20, 135/128
+|-
+|L - M = M - s
+|sLssAssLs
+|[[Orwell]][9] MODMOS
+|225/224, 1728/1715
+|}
+{| class="wikitable"
+|+Rank-1 temperings
+!ET
+|[[10edo|10]]
+|[[12edo|12]]
+|[[19edo|19]]
+|[[22edo|22]]
+|[[29edo|29]]
+|[[31edo|31]]
+|[[41edo|41]]
+|[[50edo|50]]
+|[[53edo|53]]
+|[[72edo|72]]
+|-
+!Step sizes in ET
+|(2, 1, 1)
+|(2, 2, 1)
+|(3, 2, 2)
+|(4, 3, 2)
+|(5, 3, 3)
+|(5, 4, 3)
+|(7, 5, 4)
+|(8, 6, 5)
+|(9, 8, 5)
+|(12, 9, 7)
+|}
+====[[SNS ((2/1, 5/4)-3, 16/15: 225/224, 385/384)-9|((2/1, 5/4)[3], 16/15: 225/224, 385/384)[9] (Marvel)]]====
+{| class="wikitable"
+! Step signature
+! Steps in JI
+!Step sizes in cents (TE tuning)
+|-
+|1L 2M 6s
+|(9/8~28/25, 35/32~49/45~12/11, 16/15~15/14)
+| (200.8846c, 151.4797c, 116.1327c)
+|}
+{| class="wikitable"
+!Mode number
+!Mode as simplest JI pre-image
+!Step pattern
+![[Mode height]]
+|-
+| -4
+|~ 15/14 8/7 5/4 4/3 10/7 14/9 5/3 16/9 2/1
+|ssMssMssL
+|  -0.0632
+|-
+|  -3
+|~ 15/14 8/7 5/4 4/3 10/7 8/5 12/7 11/6 2/1
+|ssMssLssM
+|  -0.0324
+|-
+|  -2
+|~ 15/14 7/6 5/4 4/3 16/11 14/9 5/3 15/8 2/1
+|sMssMssLs
+|  -0.0309
+|-
+|  -1
+|~ 15/14 8/7 9/7 11/8 22/15 8/5 12/7 11/6 2/1
+|ssLssMssM
+|  -0.0015
+|-
+|0
+|~ 15/14 7/6 5/4 4/3 3/2 8/5 12/7 15/8 2/1
+|sMssLssMs
+|0
+|-
+|1
+|~ 12/11 7/6 5/4 15/11 16/11 14/9 7/4 15/8 2/1
+|MssMssLss
+|0.0015
+|-
+|2
+|~ 15/14 6/5 9/7 11/8 3/2 8/5 12/7 15/8 2/1
+|sLssMssMs
+|0.0309
+|-
+|3
+|~ 12/11 7/6 5/4 7/5 3/2 8/5 7/4 15/8 2/1
+|MssLssMss
+|0.0324
+|-
+|4
+|~ 9/8 6/5 9/7 7/5 3/2 8/5 7/4 15/8 2/1
+|LssMssMss
+|0.0632
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode 0)
+!Equivalence
+!Step pattern
+!Scale
+!Comma list
+|-
+|L = M
+|[[3L 6s|sLssLssLs]]
+|[[August]][9]
+|36/35, 45/44, 56/55
+|-
+|M = s
+|[[1L 8s|ssssLssss]]
+|[[Marvel temperaments#Negri|Negri]][9]
+|45/44, 49/48, 56/55
+|-
+|L - M = M - s
+|sLssAssLs
+|[[Orwell]][9] MODMOS
+|99/88, 121/120, 176/175
+|}
+{| class="wikitable"
+|+Rank-1 temperings
+!ET
+|[[10edo|10]]
+|12e
+|[[19edo|19]]
+|[[22edo|22]]
+|[[31edo|31]]
+|[[41edo|41]]
+|[[50edo|50]]
+|[[53edo|53]]
+|[[72edo|72]]
+|-
+!Step sizes in ET
+|(2, 1, 1)
+|(2, 2, 1)
+|(3, 2, 2)
+|(4, 3, 2)
+|(5, 4, 3)
+|(7, 5, 4)
+|(8, 6, 5)
+|(9, 8, 5)
+|(12, 9, 7)
+|}
+====[[SNS ((2/1, 5/4)-3, 16/15: 225/224)-12|((2/1, 5/4)[3], 16/15: 225/224)[12] (Marvel)]]====
+{| class="wikitable"
+! Step signature
+! Steps in JI
+!Step sizes in cents (TE tuning)
+|-
+|9L 1M 2s
+|(16/15~15/14, 135/128~21/20, ~49/48)
+| (116.0124c, 84.9028c, 35.7917c)
+|}
+{| class="wikitable"
+!Mode number
+!Mode as simplest JI pre-image
+!Step pattern
+![[Mode height]]
+|-
+| -6
+|~ 49/48 35/32 7/6 5/4 245/192 49/36 35/24 14/9 49/30 7/4 15/8 2/1
+|sLLLsLLLMLLL
+| -0.0733
+|-
+| -5
+|~ 15/14 35/32 7/6 5/4 4/3 49/36 35/24 14/9 5/3 7/4 15/8 2/1
+|LsLLLsLLLMLL
+| -0.0433
+|-
+|  -4
+|~ 49/48 35/32 7/6 5/4 12/16 7/5 3/2 8/5 49/30 7/4 15/8 2/1
+|sLLLMLLLsLLL
+|  -0.0435
+|-
+|  -3
+|~ 15/14 8/7 7/6 5/4 4/3 10/7 35/24 14/9 5/3 16/9 15/8 2/1
+|LLsLLLsLLLML
+|  -0.0152
+|-
+|  -2
+|~ 15/14 35/32 7/6 5/4 4/3 7/5 3/2 8/5 12/7 7/4 15/8 2/1
+|LsLLLMLLLsLL
+|  -0.0145
+|-
+|  -1
+|~ 21/20 9/8 6/5 9/7 21/16 7/5 3/2 8/5 49/30 7/4 15/8 2/1
+|MLLLsLLLsLLL
+|  -0.0138
+|-
+|1
+|~ 15/14 8/7 60/49 5/4 4/3 10/7 32/21 14/9 5/3 16/9 40/21 2/1
+|LLLsLLLsLLLM
+|0.0138
+|-
+|2
+|~ 15/14 8/7 7/6 5/4 4/3 10/7 3/2 8/5 12/7 64/35 15/8 2/1
+|LLsLLLMLLLsL
+|0.0145
+|-
+|3
+|~ 15/14 9/8 6/5 9/7 48/35 7/5 3/2 8/5 12/7 7/4 15/8 2/1
+|LMLLLsLLLsLL
+|0.0152
+|-
+|4
+|~ 15/14 8/7 60/49 5/4 4/3 10/7 32/21 8/5 12/7 64/35 96/49 2/1
+|LLLsLLLMLLLs
+|0.0435
+|-
+|5
+|~ 15/14 8/7 6/5 9/7 48/35 72/49 3/2 8/5 12/7 64/35 15/8 2/1
+|LLMLLLsLLLsL
+|0.0443
+|-
+|6
+|~ 15/14 8/7 60/49 9/7 48/35 72/49 384/245 8/5 12/7 64/35 96/49 2/1
+|LLLMLLLsLLLs
+|0.0733
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode -2)
+!Equivalence
+!Step pattern
+!Scale
+!Comma list
+|-
+|L = M
+|LsLLLLLLLsLL
+|[[Pajara]][12] MODMOS
+|50/49, 64/63
+|-
+|M = s
+|LsLLLsLLLsLLs
+|[[August]][12]
+|36/35, 128/125
+|-
+|L = s
+|sssssLssssss
+|[[Passion family#Septimal passion|Passion]][12]
+| 64/63, 3125/3087
+|-
+|L - M = M - s
+|LdLLLsLLLdLL
+|[[Meantone]][12] MODMOS
+|81/80, 126/125
+|-
+|s = 0
+|LLLLsLLLLL
+|[[Marvel temperaments#Negri|Negri]][10]
+|49/48, 225/224
+|-
+|M = 0
+|LsLLLLLLsLL
+|[[Pelogic]][11] MODMOS
+|21/20, 135/128
+|}
+{| class="wikitable"
+|+Rank-1 temperings
+!ET
+|[[19edo|19]]
+|[[22edo|22]]
+|[[29edo|29]]
+|[[31edo|31]]
+|[[41edo|41]]
+|[[50edo|50]]
+|[[53edo|53]]
+|[[72edo|72]]
+|-
+!Step sizes in ET
+|(2, 1, 0)
+|(2, 2, 1)
+|(3, 2, 0)
+|(3, 2, 1)
+|(4, 3, 1)
+|(5, 3, 1)
+|(5, 4, 2)
+|(7, 5, 2)
+|}
+=====[[SNS ((2/1, 5/4)-3, 16/15: 225/224, 385/384)-12|((2/1, 5/4)[3], 16/15: 225/224, 385/384)[12] (Marvel)]]=====
+{| class="wikitable"
+! Step signature
+! Steps in JI
+!Step sizes in cents (TE tuning)
+|-
+|9L 1M 2s
+|(16/15~15/14, 135/128~21/20, 49/48~45/44~56/55)
+| (116.1327c, 84.7519c, 35.347c)
+|}
+{| class="wikitable"
+!Mode number
+!Mode as simplest JI pre-image
+!Step pattern
+![[Mode height]]
+|-
+| -6
+|~ 45/44 12/11 7/6 5/4 14/11 15/11 16/11 14/9 18/11 7/4 15/8 2/1
+|sLLLsLLLMLLL
+| -0.0738
+|-
+| -5
+|~ 15/14 12/11 7/6 5/4 4/3 15/11 16/11 14/9 5/3 7/4 15/8 2/1
+|LsLLLsLLLMLL
+| -0.0445
+|-
+|  -4
+|~ 45/44 12/11 7/6 5/4 12/16 7/5 3/2 8/5 18/11 7/4 15/8 2/1
+|sLLLMLLLsLLL
+|  -0.0438
+|-
+|  -3
+|~ 15/14 8/7 7/6 5/4 4/3 10/7 16/11 14/9 5/3 16/9 15/8 2/1
+|LLsLLLsLLLML
+|  -0.0153
+|-
+|  -2
+|~ 15/14 12/11 7/6 5/4 4/3 7/5 3/2 8/5 12/7 7/4 15/8 2/1
+|LsLLLMLLLsLL
+|  -0.0146
+|-
+|  -1
+|~ 21/20 9/8 6/5 9/7 21/16 7/5 3/2 8/5 18/11 7/4 15/8 2/1
+|MLLLsLLLsLLL
+|  -0.0139
+|-
+|1
+|~ 15/14 8/7 11/9 5/4 4/3 10/7 32/21 14/9 5/3 16/9 40/21 2/1
+|LLLsLLLsLLLM
+|0.0139
+|-
+|2
+|~ 15/14 8/7 7/6 5/4 4/3 10/7 3/2 8/5 12/7 11/6 15/8 2/1
+|LLsLLLMLLLsL
+|0.0146
+|-
+|3
+|~ 15/14 9/8 6/5 9/7 11/8 7/5 3/2 8/5 12/7 7/4 15/8 2/1
+|LMLLLsLLLsLL
+|0.0153
+|-
+|4
+|~ 15/14 8/7 11/9 5/4 4/3 10/7 32/21 8/5 12/7 11/6 55/28 2/1
+|LLLsLLLMLLLs
+|0.0438
+|-
+|5
+|~ 15/14 8/7 6/5 9/7 11/8 22/15 3/2 8/5 12/7 11/6 15/8 2/1
+|LLMLLLsLLLsL
+|0.0445
+|-
+|6
+|~ 15/14 8/7 11/9 9/7 11/8 22/15 11/7 8/5 12/7 11/6 55/28 2/1
+|LLLMLLLsLLLs
+|0.0738
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode -2)
+!Equivalence
+!Step pattern
+!Scale
+!Comma list
+|-
+|L = M
+|LsLLLLLLLsLL
+|[[Pajarous]][12] MODMOS
+|50/49, 55/54, 64/63
+|-
+|M = s
+|LsLLLsLLLsLL
+|[[August]][12]
+|36/35, 45/44, 56/55
+|-
+|L = s
+|sssssLssssss
+|[[Passion family#Septimal passion|Passion]][12]
+| 64/63, 100/99, 1375/1372
+|-
+|L - M = M - s
+|LdLLLsLLLdLL
+|[[Meanpop]][12] MODMOS
+|81/80, 126/125, 385/384
+|-
+|s = 0
+|LLLLsLLLLL
+|[[Marvel temperaments#Negri|Negri]][10]
+|45/44, 49/48, 56/55
+|}
+{| class="wikitable"
+|+Rank-1 temperings
+!ET
+|[[19edo|19]]
+|[[22edo|22]]
+|[[31edo|31]]
+|[[41edo|41]]
+|[[50edo|50]]
+|[[53edo|53]]
+|[[72edo|72]]
+|-
+!Step sizes in ET
+|(2, 1, 0)
+|(2, 2, 1)
+|(3, 2, 1)
+|(4, 3, 1)
+|(5, 3, 1)
+|(5, 4, 2)
+|(7, 5, 2)
+|}
+===== [[SNS ((2/1, 5/4)-3, 16/15: 225/224, 385/384)-22|(2/1, 5/4)[3], 16/15: 225/224, 385/384)[22] (Marvel)]] =====
+{| class="wikitable"
+!Step signature
+!Steps in JI
+!Step sizes in cents (TE tuning)
+|-
+|9L 1m 12s
+|(~22/21, 36/35~33/32, 49/48~45/44~56/55)
+| (80.7857c, 49.4049c, 35.347c)
+|}
+{| class="wikitable"
+!Mode number
+!Mode as simplest JI pre-image
+!Step pattern
+![[Mode height]]
+|-
+|  -7
+|~ 45/44 16/15 12/11 49/44 7/6 105/88 5/4 14/11 4/3 15/11 7/5 63/44 3/2 49/32 8/5 18/11 12/7 7/4 98/55 15/8 21/11 2/1
+|sLssLsLsLsmsLsLsLssLsL
+|  -.0229
+|-
+|7
+|~ 22/21 16/15 55/49 8/7 7/6 11/9 5/4 64/49 4/3 88/63 10/7 22/11 3/2 11/7 8/5 176/105 12/7 88/49 11/6 15/8 55/28 2/1
+|LsLssLsLsLsmsLsLsLssLs
+|.0229
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode -7)
+!Equivalence
+!Step pattern
+!Scale
+!Comma list
+|-
+|m = s
+|sLssLsLsLsssLsLsLssLsL
+|[[Semicomma family#Orwell|Orwell]][22] MODMOS
+|99/98, 121/120, 176/175
+|-
+|L = m
+|sLssLsLsLsLsLsLsLssLsL
+|[[Pajarous]][22] MODMOS
+|50/49, 55/54, 64/63
+|-
+|L = s
+|LLLLLLLLLLsLLLLLLLLLLL
+|[[Escapade family#Septimal escapade|Escapade]][22]
+| 99/98, 176/175, 2560/2541
+|-
+|L - m = m - s
+|sAssAsAsAsLsAsAsAssAsA
+|[[Magic]][22] MODMOS
+|100/99, 225/224, 245/243
+|-
+|s = 0
+|LLLLsLLLLL
+|[[Marvel temperaments#Negri|Negri]][10]
+|45/44, 49/48, 56/55
+|}
+{| class="wikitable"
+|+Rank-1 temperings
+!ET
+|[[31edo|31]]
+|[[41edo|41]]
+|[[50edo|50]]
+|[[53edo|53]]
+|[[72edo|72]]
+|-
+!Step sizes in ET
+|(2, 1, 1)
+|(3, 2, 1)
+|(4, 2, 1)
+|(3, 2, 2)
+|(5, 3, 2)
+|}
+=== ((2/1, 3/2)[5], 16/15)===
+====[[SNS ((2/1, 3/2)-5, 16/15)-10|((2/1, 3/2)[5], 16/15)[10]]]====
+{| class="wikitable"
+!Step signature
+!Steps in JI
+!Step sizes in cents
+|-
+|2L 5m 3s
+|(10/9, 16/15, 135/128)
+| (182.4037c, 111.7313c, 92.1787c)
+|}
+{| class="wikitable"
+!Mode number
+!Mode in JI
+!Step pattern
+!Pentachordal
+Decatonic
+!Pent. Dec.
+Mode name
+!Blackwood[10]
+!UDP
+![[Mode height]]
+|-
+|  -5
+|16/15 9/8 6/5 81/64 27/20 3/2 8/5 27/16 9/5 2/1
+|msmsmLmsmL
+|sssssLsssL
+|Dark minor
+|sLsLsLsLsL
+|<nowiki>0|1 (5)</nowiki>
+|  -.0745
+|-
+|  -4
+|135/128 9/8 1215/1024 81/64 45/32 3/2 405/256 27/16 15/8 2/1
+|smsmLmsmLm
+|ssssLsssLs
+|Alternate minor
+|LsLsLsLsLs
+|<nowiki>1|0 (5)</nowiki>
+|  -.0592
+|-
+|  -3
+|16/15 9/8 6/5 4/3 64/45 3/2 8/5 27/16 9/5 2/1
+|msmLmsmsmL
+|sssLsssssL
+|Standard minor
+|sLsLsLsLsL
+|<nowiki>0|1 (5)</nowiki>
+|  -.0411
+|-
+|  -2
+|135/128 9/8 5/4 4/3 45/32 3/2 405/256 27/16 15/8 2/1
+|smLmsmsmLm
+|ssLsssssLs
+|Dark major
+|LsLsLsLsLs
+|<nowiki>1|0 (5)</nowiki>
+|  -.0258
+|-
+|  -1
+|16/15 9/8 6/5 4/3 64/45 3/2 8/5 16/9 256/135 2/1
+|msmLmsmLms
+|sssLsssLss
+|Bright minor
+|sLsLsLsLsL
+|<nowiki>0|1 (5)</nowiki>
+|  -.0077
+|-
+|1
+|135/128 9/8 5/4 4/3 45/32 3/2 5/3 16/9 15/8 2/1
+|smLmsmLmsm
+|ssLsssLsss
+|Standard major
+|LsLsLsLsLs
+|<nowiki>1|0 (5)</nowiki>
+|.0077
+|-
+|2
+|16/15 32/27 512/405 4/3 64/45 3/2 8/5 16/9 256/135 2/1
+|mLmsmsmLms
+|sLsssssLss
+|Alternate major
+|sLsLsLsLsL
+|<nowiki>0|1 (5)</nowiki>
+|.0258
+|-
+|3
+|10/9 32/27 5/4 4/3 45/32 3/2 5/3 16/9 15/8 2/1
+|LmsmsmLmsm
+|LsssssLsss
+|Bright major
+|LsLsLsLsLs
+|<nowiki>1|0 (5)</nowiki>
+|.0411
+|-
+|4
+|16/15 32/27 512/405 4/3 64/45 128/81 2048/1215 16/9 256/135 2/1
+|mLmsmLmsms
+|sLsssLssss
+|Dark Augmented
+|sLsLsLsLsL
+|<nowiki>0|1 (5)</nowiki>
+|.0592
+|-
+|5
+|10/9 32/27 5/4 4/3 40/27 128/81 5/3 16/9 15/8 2/1
+|LmsmLmsmsm
+|LsssLsssss
+|Bright Augmented
+|LsLsLsLsLs
+|<nowiki>1|0 (5)</nowiki>
+|.0745
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode 1)
+!Equivalence
+!Step pattern
+!Scale
+!Comma list
+|-
+|m = s
+|[[OTC 2L 8s|ssLsssLsss]]
+|[[Srutal]][10] 4M (pentachordal decatonic)
+|2048/2025
+|-
+|L = m
+|[[7L 3s|sLLLsLLLsL]]
+|[[Dicot family|Dicot]][10] MODMOS
+|25/24
+|-
+|L = s
+|[[5L 5s|LsLsLsLsLs]]
+|[[Limmic temperaments#5-limit .28blackwood.29|Blackwood]][10]
+|256/243
+|-
+|L - m = m - s
+|sLALsLALsL
+|[[Marvel temperaments#Negri|Negri]][10] MODMOS
+|16875/16384
+|-
+|s = 0
+|[[2L 5s|sLssLss]]
+|[[Mavila]][7]
+|135/128
+|-
+|m = 0
+|[[2L 3s|sLsLs]]
+|[[Trienstonic clan#Father|Father]][5]
+|16/15
+|}
+=====[[SNS ((2/1, 3/2)-5, 16/15: 225/224)-10|((2/1, 3/2)[5], 16/15: 225/224)[10] (Marvel)]]=====
+{| class="wikitable"
+!Step signature
+!Steps in JI
+!Step sizes in cents (TE tuning)
+|-
+|2L 5m 3s
+|(10/9, 16/15~15/14, 135/128~21/20)
+| (182.9137c, 116.0124c, 84.9028c)
+|}
+{| class="wikitable"
+!Mode number
+!Mode as simplest JI pre-image
+!Step pattern
+!Pentachordal
+Decatonic
+!Pent. Dec.
+Mode name
+!Blackwood[10]
+!UDP
+![[Mode height]]
+|-
+|  -5
+|~ 15/14 9/8 6/5 81/64 27/20 3/2 8/5 27/16 9/5 2/1
+|msmsmLmsmL
+|sssssLsssL
+|Dark minor
+|sLsLsLsLsL
+|<nowiki>0|1 (5)</nowiki>
+|  -.0763
+|-
+|  -4
+|~ 21/20 9/8 189/160 81/64 7/5 3/2 63/40 27/16 15/8 2/1
+|smsmLmsmLm
+|ssssLsssLs
+|Alternate minor
+|LsLsLsLsLs
+|<nowiki>1|0 (5)</nowiki>
+|  -.0688
+|-
+|  -3
+|~ 15/14 9/8 6/5 4/3 10/7 3/2 8/5 27/16 9/5 2/1
+|msmLmsmsmL
+|sssLsssssL
+|Standard minor
+|sLsLsLsLsL
+|<nowiki>0|1 (5)</nowiki>
+|  -.0400
+|-
+|  -2
+|~ 21/20 9/8 5/4 4/3 7/5 3/2 63/40 27/16 15/8 2/1
+|smLmsmsmLm
+|ssLsssssLs
+|Dark major
+|LsLsLsLsLs
+|<nowiki>1|0 (5)</nowiki>
+|  -.0326
+|-
+|  -1
+|~ 15/14 9/8 6/5 4/3 10/7 3/2 8/5 16/9 40/21 2/1
+|msmLmsmLms
+|sssLsssLss
+|Bright minor
+|sLsLsLsLsL
+|<nowiki>0|1 (5)</nowiki>
+|  -.0037
+|-
+|1
+|~ 21/20 9/8 5/4 4/3 7/5 3/2 5/3 16/9 15/8 2/1
+|smLmsmLmsm
+|ssLsssLsss
+|Standard major
+|LsLsLsLsLs
+|<nowiki>1|0 (5)</nowiki>
+|.0037
+|-
+|2
+|~ 15/14 32/27 80/63 4/3 10/7 3/2 8/5 16/9 40/21 2/1
+|mLmsmsmLms
+|sLsssssLss
+|Alternate major
+|sLsLsLsLsL
+|<nowiki>0|1 (5)</nowiki>
+|.0326
+|-
+|3
+|~ 10/9 32/27 5/4 4/3 7/5 3/2 5/3 16/9 15/8 2/1
+|LmsmsmLmsm
+|LsssssLsss
+|Bright major
+|LsLsLsLsLs
+|<nowiki>1|0 (5)</nowiki>
+|.0400
+|-
+|4
+|~ 15/14 32/27 80/63 4/3 10/7 128/81 320/189 16/9 40/21 2/1
+|mLmsmLmsms
+|sLsssLssss
+|Dark Augmented
+|sLsLsLsLsL
+|<nowiki>0|1 (5)</nowiki>
+|.0688
+|-
+|5
+|~ 10/9 32/27 5/4 4/3 40/27 128/81 5/3 16/9 15/8 2/1
+|LmsmLmsmsm
+|LsssLsssss
+|Bright Augmented
+|LsLsLsLsLs
+|<nowiki>1|0 (5)</nowiki>
+|.0763
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode 1)
+!Equivalence
+!Step pattern
+!Scale
+!Comma list
+|-
+|m = s
+|[[OTC 2L 8s|ssLsssLsss]]
+|[[Diaschismic family#Pajara|Pajara]][10] 4M (pentachordal decatonic)
+|50/49, 64/63
+|-
+|L = m
+|[[OTC 7L 3s|sLLLsLLLsL]]
+|[[Dicot family|Sharp]][10] MODMOS
+|25/24, 28/27
+|-
+|L - m = m - s
+|sLALsLALsL
+|[[Marvel temperaments#Negri|Negri]][10] MODMOS
+|49/48, 225/224
+|-
+|s = 0
+|[[2L 5s|sLssLss]]
+|[[Pelogic family#Pelogic|Pelogic]][7]
+|21/20, 135/128
+|}
+=====[[SNS ((2/1, 3/2)-5, 16/15: 225/224, 441/440)-10|((2/1, 3/2)[5], 16/15: 225/224, 441/440)[10] (Prodigy)]]=====
+{| class="wikitable"
+!Step signature
+!Steps in JI
+!Step sizes in cents (TE tuning)
+|-
+|2L 5m 3s
+|(10/9, 16/15~15/14, 135/128~21/20~22/21)
+| (184.0358c, 116.7669c, 82.9601c)
+|}
+{| class="wikitable"
+!Mode number
+!Mode as simplest JI pre-image
+!Step pattern
+!Pentachordal
+Decatonic
+!Pent. Dec.
+Mode name
+!Blackwood[10]
+!UDP
+![[Mode height]]
+|-
+|  -5
+|~ 15/14 9/8 6/5 44/35 27/20 3/2 8/5 27/16 9/5 2/1
+|msmsmLmsmL
+|sssssLsssL
+|Dark minor
+|sLsLsLsLsL
+|<nowiki>0|1 (5)</nowiki>
+|  -.0779
+|-
+|  -4
+|~ 21/20 9/8 33/28 44/35 7/5 3/2 11/7 27/16 15/8 2/1
+|smsmLmsmLm
+|ssssLsssLs
+|Alternate minor
+|LsLsLsLsLs
+|<nowiki>1|0 (5)</nowiki>
+|  -.0718
+|-
+|  -3
+|~ 15/14 9/8 6/5 4/3 10/7 3/2 8/5 27/16 9/5 2/1
+|msmLmsmsmL
+|sssLsssssL
+|Standard minor
+|sLsLsLsLsL
+|<nowiki>0|1 (5)</nowiki>
+|  -.0405
+|-
+|  -2
+|~ 21/20 9/8 5/4 4/3 7/5 3/2 11/7 27/16 15/8 2/1
+|smLmsmsmLm
+|ssLsssssLs
+|Dark major
+|LsLsLsLsLs
+|<nowiki>1|0 (5)</nowiki>
+|  -.0343
+|-
+|  -1
+|~ 15/14 9/8 6/5 4/3 10/7 3/2 8/5 16/9 21/11 2/1
+|msmLmsmLms
+|sssLsssLss
+|Bright minor
+|sLsLsLsLsL
+|<nowiki>0|1 (5)</nowiki>
+| .0031
+|-
+|1
+|~ 21/20 9/8 5/4 4/3 7/5 3/2 5/3 16/9 15/8 2/1
+|smLmsmLmsm
+|ssLsssLsss
+|Standard major
+|LsLsLsLsLs
+|<nowiki>1|0 (5)</nowiki>
+|.0031
+|-
+|2
+|~ 15/14 32/27 15/11 4/3 10/7 3/2 8/5 16/9 21/11 2/1
+|mLmsmsmLms
+|sLsssssLss
+|Alternate major
+|sLsLsLsLsL
+|<nowiki>0|1 (5)</nowiki>
+|.0343
+|-
+|3
+|~ 10/9 32/27 5/4 4/3 7/5 3/2 5/3 16/9 15/8 2/1
+|LmsmsmLmsm
+|LsssssLsss
+|Bright major
+|LsLsLsLsLs
+|<nowiki>1|0 (5)</nowiki>
+|.0405
+|-
+|4
+|~ 15/14 32/27 14/11 4/3 10/7 35/22 56/33 16/9 40/21 2/1
+|mLmsmLmsms
+|sLsssLssss
+|Dark Augmented
+|sLsLsLsLsL
+|<nowiki>0|1 (5)</nowiki>
+|.0718
+|-
+|5
+|~ 10/9 32/27 5/4 4/3 40/27 35/22 5/3 16/9 15/8 2/1
+|LmsmLmsmsm
+|LsssLsssss
+|Bright Augmented
+|LsLsLsLsLs
+|<nowiki>1|0 (5)</nowiki>
+|.0779
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode 1)
+!Equivalence
+!Step pattern
+!Scale
+!Comma list
+|-
+|m = s
+|[[OTC 2L 8s|ssLsssLsss]]
+|[[Diaschismic family#Pajaric|Pajaric]][10] 4M (pentachordal decatonic)
+|45/44, 50/49, 56/55
+|-
+|L - m = m - s
+|sLALsLALsL
+|[[Marvel temperaments#Negroni|Negroni]][10] MODMOS
+|49/48, 55/54, 225/224
+|}
+====[[SNS ((2/1, 3/2)-5, 16/15)-17|((2/1, 3/2)[5], 16/15)[17]]]====
+L 2M 5s = (135/128, 256/243, 2048/2025) = (92.1787c, 90.2250c, 19.5526c)
+/128 16/15 9/8 32/27 5/4 81/64 4/3 45/32 64/45 3/2 128/81 8/5 27/16 16/9 15/8 256/135 2/1 as LsLMLsLLsLLsLMLsL
+L = M -> LsLLLsLLsLLsLLLsL Helmholtz[17]; M = s -> LsLsLsLLsLLsLsLsL Dicot[17] MODMOS; s = 0 -> LLsLLLLLLsLL Srutal[12] 4M (Hexachordal Dodecatonic); M = 0 -> LsLLsLLsLLsLLsL Blackwood[15]
+=====[[SNS ((2/1, 3/2)-5, 16/15: 225/224)-17|((2/1, 3/2)[5], 16/15: 225/224)[17] (Marvel)]]=====
+L 10M 5s = (256/243, 135/128~21/20, 2048/2025~50/49~64/63) = (98.0109c, 84.9028c, 31.1096)  TE
+~ 21/20 16/15 9/8 32/27 5/4 81/64 4/3 7/5 10/7 3/2 128/81 8/5 27/16 16/9 15/8 40/21 2/1 as MsMLMsMMsMMsMLMsM
+L = M -> LsLLLsLLsLLsLLLsL Garibaldi[17]; M = s -> LsLsLsLLsLLsLsLsL Dicot[17] MODMOS;
+s = 0 -> LLsLLLLLLsLL Pajara[12] 4M (Hexachordal Dodecatonic)
+=====[[SNS ((2/1, 3/2)-5, 16/15: 225/224, 441/440)-17|((2/1, 3/2)[5], 16/15: 225/224, 441/440)[17] (Prodigy)]]=====
+L 10M 5s = (256/243~35/33, 135/128~21/20~22/21, 2048/2025~50/49~64/63~45/44~56/55) = (101.0757c, 82.9601c, 33.8068c) TE
+~ 22/21 16/15 9/8 32/27 5/4 81/64 4/3 7/5 10/7 3/2 128/81 8/5 27/16 16/9 15/8 21/11 2/1 as LsLmLsLLsLLsLmLsL
+L = M -> LsLLLsLLsLLsLLLsL Andromeda[17]; s = 0 -> s = 0 -> LLsLLLLLLsLL Pajaric[12] 4M (Hexachordal Dodecatonic)
+====[[SNS ((2/1, 3/2)-5, 16/15: 225/224, 441/440)-29|((2/1, 3/2)[5], 16/15: 225/224, 441/440)[29] (Prodigy)]]====
+L 10m 17s = (25/24~28/27, ~33/32, 2048/2025~50/49~64/63~45/44~56/55) = (67.2689c, 49.1533c, 33.8068c) TE
+~ 50/49 22/21 16/15 11/10 9/8 8/7 33/28 6/5 5/4 14/11 21/16 4/3 15/11 7/5 10/7 22/15 3/2 32/21 11/7 8/5 5/3 56/33 7/4 16/9 20/11 15/8 21/11 49/25 2/1 as smsmssmsLsmssmsmssmsLsmssmsms
+m = s -> ssssssssLsssssssssssLssssssss Tritonic[29] MODMOS; L = m -> sLsLssLsLsLssLsLssLsLsLssLsLs Andromeda[29];
+L = s -> LsLsLLsLLLsLLsLsLLsLLLsLLsLsL Negroni[29] MODMOS; L - m = m - s -> Marvolo[29] MODMOS;
+s = 0 -> LLLsLLLLsLLL Pajaric[12] 4M (Hexachordal Dodecatonic)
+====[[SNS ((2/1, 3/2)-5, 16/15: 225/224, 441/440)-41|((2/1, 3/2)[5], 16/15: 225/224, 441/440)[41] (Prodigy)]]====
+L 2M 10s = (2048/2025~50/49~64/63~45/44~56/55, 49/48~55/54, ~121/120) = (33.8068c, 33.4621c, 15.3465c) TE
+~ 50/49 33/32 22/21 16/15 12/11 11/10 9/8 8/7 7/6 32/27 40/33 11/9 5/4 14/11 128/99 21/16 4/3 15/11 11/8 7/5 10/7 16/11 22/15 3/2 32/16 99/64 11/7 8/5 18/11 33/20 27/16 12/7 7/4 16/9 20/11 11/6 15/8 21/11 64/33 49/25 2/1 as LsLLLsLLMLLsLLLsLLsLLLsLLsLLLsLLMLLsLLLsL
+L = M -> LsLLLsLLLLLsLLLsLLsLLLsLLsLLLsLLLLLsLLLsL Miracle[31] MODMOS; M = s -> LsLLLsLLsLLsLLLsLLsLLLsLLsLLLsLLsLLsLLLsL Andromeda[31];
+L - M = M - s -> Witchcraft[41] MODMOS
+s = 0 -> LLLLLLsLLLLLLLLLLLLLLLLLsLLLLLL Tritonic[31] MODMOS; m = 0 -> LsLLLsLLLLsLLLsLLsLLLsLLsLLLsLLLLLsLLLsL Negroni[39] MODMOS
+====[[SNS ((2/1, 3/2)-5, 16/15: 225/224, 441/440)-72|((2/1, 3/2)[5], 16/15: 225/224, 441/440)[72] (Prodigy)]]====
+L 2M 41s = (1344/1331~1350/1331, 100/99~245/242~896/891, ~121/120) = (18.4603c, 18.1156c, 15.3465c) TE
+as LssLsLsLssLsLsMsLsLssLsLsLssLsLssLsLsLssLsLssLsLsLssLsLsMsLsLssLsLsLssLs
+L = M -> LssLsLsLssLsLsLsLsLssLsLsLssLsLssLsLsLssLsLssLsLsLssLsLsLsLsLssLsLsLssLs Marvolo[72] MODMOS;
+M = s -> LssLsLsLssLsLsssLsLssLsLsLssLsLssLsLsLssLsLssLsLsLssLsLsssLsLssLsLsLssLs Miracle[72] MODMOS;
+L - M = M - s -> Compton MODMOS
+s = 0 -> LLLLLLsLLLLLLLLLLLLLLLLLsLLLLLL Tritonic[31] MODMOS;
+m = 0 -> LssLsLsLssLsLssLsLssLsLsLssLsLssLsLsLssLsLssLsLsLssLsLsssLsLssLsLsLssLs Andromeda[70] MODMOS
+==2.3.5; [[Starling]], [[Ptolemismic temperaments|No-7 Ptolemismic]], [[Supermagic]], and [[Ragismic family#Ragismic|Ragismic]]==
+===(2/1, 3/2, 6/5)===
+====[[SNS (2/1, 3/2, 6/5)-4|(2/1, 3/2, 6/5)[4]]]====
+{| class="wikitable"
+!Step signature
+!Steps in JI
+!Step sizes in cents
+|-
+|1L 2M 1s
+|(5/4, 6/5, 10/9)
+|(386.3137c, 315.6413c, 182.4037c)
+|}
+{| class="wikitable"
+!Mode number
+!Mode in JI
+!Step pattern
+![[Mode height]]
+|-
+|  -2
+|10/9 4/3 5/3 2/1
+|sMLM
+|  -0.1307
+|-
+|  -1
+|6/5 4/3 8/5 2/1
+|MsML
+|  -0.0959
+|-
+|1
+|5/4 3/2 5/3 2/1
+|LMsM
+|0.0959
+|-
+|2
+|6/5 3/2 9/5 2/1
+|MLMs
+|0.1307
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode 2)
+!Equivalence
+!Step pattern
+!Scale
+!Comma list
+|-
+|L = M
+|[[3L 1s|LLLs]]
+|[[Dicot]][4]
+|25/24
+|-
+|M = s
+|[[1L 3s|sLss]]
+|[[Bug family|Bug]][4]
+|27/25
+|-
+|L = s
+|[[2L 2s|LsLs]]
+|Antitonic[4]
+|9/8
+|}
+====[[SNS (2/1, 3/2, 6/5)-7|(2/1, 3/2, 6/5)[7]]]====
+{| class="wikitable"
+!Step signature
+!Steps in JI
+!Step sizes in cents
+|-
+|1L 4M 2s
+|(9/8, 10/9, 27/25)
+|(203.9100c, 182.4037c, 133.2376c)
+|}
+{| class="wikitable"
+!Mode number
+!Mode in JI
+!Step pattern
+!Meantone[7]
+!UDP
+!Diatonic mode
+!Porcupine[7]
+!UDP
+!Porcupine mode
+![[Mode height]]
+|-
+| -3
+|27/25 6/5 4/3 36/25 8/5 9/5 2/1
+|sMMsMLM
+|sLLsLLL
+|<nowiki>0|6</nowiki>
+|Lochrian
+|sssssLs
+|<nowiki>1|5</nowiki>
+|Dark diminished
+| -0.0529
+|-
+|  -2
+|10/9 6/5 4/3 40/27 8/5 16/9 2/1
+|MsMMsML
+|LsLLsLL
+|<nowiki>2|4</nowiki>
+|Aeolian
+|ssssssL
+|<nowiki>0|6</nowiki>
+|Magical seventh
+|  -0.0316
+|-
+|  -1
+|27/25 6/5 27/20 3/2 81/50 9/5 2/1
+|sMLMsMM
+|sLLLsLL
+|<nowiki>1|5</nowiki>
+|Phrygian
+|ssLssss
+|<nowiki>4|2</nowiki>
+|Bright minor
+|  -0.0213
+|-
+|0
+|10/9 6/5 4/3 3/2 5/3 9/5 2/1
+|MsMLMsM
+|LsLLLsL
+|<nowiki>3|3</nowiki>
+|Dorian
+|sssLsss
+|<nowiki>3|3</nowiki>
+|Dark minor
+|0
+|-
+|1
+|10/9 100/81 4/3 40/27 5/3 50/27 2/1
+|MMsMLMs
+|LLsLLLs
+|<nowiki>5|1</nowiki>
+|Ionian
+|ssssLss
+|<nowiki>2|4</nowiki>
+|Bright diminished
+|0.0213
+|-
+|2
+|9/8 5/4 27/20 3/2 5/3 9/5 2/1
+|LMsMMsM
+|LLsLLsL
+|<nowiki>4|2</nowiki>
+|Mixolydian
+|Lssssss
+|<nowiki>6|0</nowiki>
+|Bright major
+|0.0316
+|-
+|3
+|10/9 5/4 25/18 3/2 5/3 50/27 2/1
+|MLMsMMs
+|LLLsLLs
+|<nowiki>6|0</nowiki>
+|Lydian
+|sLsssss
+|<nowiki>5|1</nowiki>
+|Dark major
+|0.0529
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode 2)
+!Equivalence
+!Step pattern
+!Scale
+!Comma list
+|-
+|L = M
+|[[5L 2s|LsLLLsL]]
+|[[Meantone family|Meantone]][7]
+|81/80
+|-
+|M = s
+|[[1L 6s|sssLsss]]
+|[[Porcupine family#Porcupine|Porcupine]][7]
+|250/243
+|-
+|L = s
+|[[4L 3s|LsLsLsL]]
+|[[Dicot family|Dicot]][7]
+|25/24
+|-
+|L - M = M - s
+|LsLALsL
+|[[Tetracot]][7] MODMOS
+|20000/19683
+|-
+|s = 0
+|[[1L 4s|ssLss]]
+|[[Bug family|Bug]][5]
+|27/25
+|}
+=====[[SNS (2/1, 3/2, 6/5: 126/125)-7|(2/1, 3/2, 6/5: 126/125)[7] (Starling)]]=====
+{| class="wikitable"
+!Step signature
+!Steps in JI
+!Step sizes in cents (TE)
+|-
+|1L 4M 2s
+|(~9/8, ~10/9, 27/25~15/14)
+|(202.4685c, 187.562c, 123.5395c)
+|}
+{| class="wikitable"
+!Mode number
+!Mode as simplest JI pre-image
+!Step pattern
+!Meantone[7]
+!UDP
+!Diatonic mode
+!Porcupine[7]
+!UDP
+!Porcupine mode
+![[Mode height]]
+|-
+| -3
+|~ 15/14 6/5 4/3 10/7 8/5 9/5 2/1
+|sMMsMLM
+|sLLsLLL
+|<nowiki>0|6</nowiki>
+|Lochrian
+|sssssLs
+|<nowiki>1|5</nowiki>
+|Dark diminished
+| -0.0616
+|-
+|  -2
+|~ 15/14 6/5 27/20 3/2 45/28 9/5 2/1
+|sMLMsMM
+|sLLLsLL
+|<nowiki>1|5</nowiki>
+|Phrygian
+|ssLssss
+|<nowiki>4|2</nowiki>
+|Bright minor
+|  -0.0314
+|-
+| -1
+|~ 10/9 6/5 4/3 40/27 8/5 16/9 2/1
+|MsMMsML
+|LsLLsLL
+|<nowiki>2|4</nowiki>
+|Aeolian
+|ssssssL
+|<nowiki>0|6</nowiki>
+|Magical seventh
+| -0.0302
+|-
+|0
+|~ 10/9 6/5 4/3 3/2 5/3 9/5 2/1
+|MsMLMsM
+|LsLLLsL
+|<nowiki>3|3</nowiki>
+|Dorian
+|sssLsss
+|<nowiki>3|3</nowiki>
+|Dark minor
+|0
+|-
+|1
+|~ 9/8 5/4 27/20 3/2 5/3 9/5 2/1
+|LMsMMsM
+|LLsLLsL
+|<nowiki>4|2</nowiki>
+|Mixolydian
+|Lssssss
+|<nowiki>6|0</nowiki>
+|Bright major
+|0.0302
+|-
+|2
+|~ 10/9 56/45 4/3 40/27 5/3 28/15 2/1
+|MMsMLMs
+|LLsLLLs
+|<nowiki>5|1</nowiki>
+|Ionian
+|ssssLss
+|<nowiki>2|4</nowiki>
+|Bright diminished
+|0.0314
+|-
+|3
+|~ 10/9 5/4 7/5 3/2 5/3 28/15 2/1
+|MLMsMMs
+|LLLsLLs
+|<nowiki>6|0</nowiki>
+|Lydian
+|sLsssss
+|<nowiki>5|1</nowiki>
+|Dark major
+|0.0616
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode 0)
+!Equivalence
+!Step pattern
+!Scale
+!Comma list
+|-
+|L = M
+|[[5L 2s|LsLLLsL]]
+|[[Meantone family#Septimal meantone|Meantone]][7]
+|81/80, 126/125
+|-
+|M = s
+|[[1L 6s|sssLsss]]
+|[[Trienstonic clan#Opossum|Opossum]][7]
+|28/27, 126/125
+|-
+|L = s
+|[[4L 3s|LsLsLsL]]
+|[[Dicot family#Flat|Flat]][7]
+|21/20, 25/24
+|}
+{| class="wikitable"
+|+Rank-1 temperings
+!ET
+|8d
+|[[12edo|12]]
+|[[15edo|15]]
+|[[16edo|16]]
+|[[19edo|19]]
+|[[27edo|27]]
+|[[31edo|31]]
+|[[46edo|46]]
+|[[50edo|50]]
+|[[58edo|58]]
+|[[77edo|77]]
+|-
+!Step sizes in ET
+|(2, 1, 1)
+|(2, 2, 1)
+|(3, 2, 2)
+|(2, 3, 1)
+|(3, 3, 2)
+|(5, 4, 3)
+|(5, 5, 3)
+|(8, 7, 5)
+|(8, 8, 5)
+|(10, 9, 6)
+|(13, 12, 8)
+|}
+=====[[SNS (2/1, 3/2, 6/5: 100/99)-7|(2/1, 3/2, 6/5: 100/99)[7] (No-7 Ptolemismic)]]=====
+{| class="wikitable"
+!Step signature
+!Steps in JI
+!Step sizes in cents (TE)
+|-
+|1L 4m 2s
+|(9/8~25/22, 10/9~11/10, 27/25~12/11)
+|(209.7786c, 174.0549c, 146.6352c)
+|}
+{| class="wikitable"
+!Mode number
+!Mode as simplest JI pre-image
+!Step pattern
+!Meantone[7]
+!UDP
+!Diatonic mode
+!Porcupine[7]
+!UDP
+!Porcupine mode
+![[Mode height]]
+|-
+| -3
+|~ 12/11 6/5 4/3 16/11 8/5 9/5 2/1
+|smmsmLm
+|sLLsLLL
+|<nowiki>0|6</nowiki>
+|Lochrian
+|sssssLs
+|<nowiki>1|5</nowiki>
+|Dark diminished
+| -0.0427
+|-
+|  -2
+|~ 10/9 6/5 4/3 22/15 8/5 16/9 2/1
+|msmmsmL
+|LsLLsLL
+|<nowiki>2|4</nowiki>
+|Aeolian
+|ssssssL
+|<nowiki>0|6</nowiki>
+|Magical seventh
+|  -0.0374
+|-
+|  -1
+|~ 12/11 6/5 15/11 3/2 18/11 9/5 2/1
+|smLmsmm
+|sLLLsLL
+|<nowiki>1|5</nowiki>
+|Phrygian
+|ssLssss
+|<nowiki>4|2</nowiki>
+|Bright minor
+|  -0.0053
+|-
+|0
+|~ 10/9 6/5 4/3 3/2 5/3 9/5 2/1
+|msmLmsm
+|LsLLLsL
+|<nowiki>3|3</nowiki>
+|Dorian
+|sssLsss
+|<nowiki>3|3</nowiki>
+|Dark minor
+|0
+|-
+|1
+|~ 10/9 11/9 4/3 22/15 5/3 11/6 2/1
+|mmsmLms
+|LLsLLLs
+|<nowiki>5|1</nowiki>
+|Ionian
+|ssssLss
+|<nowiki>2|4</nowiki>
+|Bright diminished
+|0.0053
+|-
+|2
+|~ 9/8 5/4 15/11 3/2 5/3 9/5 2/1
+|Lmsmmsm
+|LLsLLsL
+|<nowiki>4|2</nowiki>
+|Mixolydian
+|Lssssss
+|<nowiki>6|0</nowiki>
+|Bright major
+|0.0374
+|-
+|3
+|~ 10/9 5/4 11/8 3/2 5/3 11/6 2/1
+|mLmsmms
+|LLLsLLs
+|<nowiki>6|0</nowiki>
+|Lydian
+|sLsssss
+|<nowiki>5|1</nowiki>
+|Dark major
+|0.0427
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode 2)
+!Equivalence
+!Step pattern
+!Scale
+!Comma list
+|-
+|m = s
+|[[1L 6s|sssLsss]]
+|[[Porcupine family#Porkypine|Porkypine]][7]
+|55/54, 100/99
+|-
+|L = m
+|[[5L 2s|LsLLLsL]]
+|[[Meanenneadecal]][7] or [[Meantone family#Flattone|Flattone]][7]
+|45/44, 81/80
+|-
+|L = s
+|[[4L 3s|LsLsLsL]]
+|[[Dicot family|Flat]][7]
+|25/24, 33/32
+|-
+|L - m = m - s
+|LsLALsL
+|[[Tetracot family#Subgroup temperament|Tetracot]][7] MODMOS
+|100/99, 243/242
+|}
+{| class="wikitable"
+|+Rank-1 temperings
+!ET
+|8
+|[[12edo|12]]
+|[[15edo|15]]
+|[[19edo|19]]
+|[[22edo|22]]
+|[[26edo|26]]
+|27e
+|[[29edo|29]]
+|[[34edo|34]]
+|[[37edo|37]]
+|[[41edo|41]]
+|-
+!Step sizes in ET
+|(2, 1, 1)
+|(2, 2, 1)
+|(3, 2, 2)
+|(3, 3, 2)
+|(4, 3, 3)
+|(4, 4, 3)
+|(5, 4, 3)
+|(5, 4, 4)
+|(6, 5, 4)
+|(7, 5, 5)
+|(7, 6, 5)
+|}
+=====[[SNS (2/1, 3/2, 6/5: 56/55, 100/99)-7|(2/1, 3/2, 6/5: 56/55, 100/99)[7] (Thrasher)]]=====
+{| class="wikitable"
+!Step signature
+!Steps in JI
+!Step sizes in cents (TE)
+|-
+|1L 4M 2s
+|(9/8~25/22, 10/9~11/10, 27/25~15/14~12/11)
+|(215.4452c, 179.0856c, 132.5782c)
+|}
+{| class="wikitable"
+!Mode number
+!Mode as simplest JI pre-image
+!Step pattern
+!Meantone[7]
+!UDP
+!Porcupine[7]
+!UDP
+!Porcupine mode
+!Diatonic mode
+![[Mode height]]
+|-
+| -3
+|~ 12/11 6/5 4/3 10/7 8/5 9/5 2/1
+|sMMsMLM
+|sLLsLLL
+|<nowiki>0|6</nowiki>
+|sssssLs
+|<nowiki>1|5</nowiki>
+|Dark diminished
+|Lochrian
+| -0.0591
+|-
+|  -2
+|~ 10/9 6/5 4/3 22/15 8/5 16/9 2/1
+|MsMMsML
+|LsLLsLL
+|<nowiki>2|4</nowiki>
+|ssssssL
+|<nowiki>0|6</nowiki>
+|Magical seventh
+|Aeolian
+|  -0.0433
+|-
+|  -1
+|~ 12/11 6/5 15/11 3/2 18/11 9/5 2/1
+|sMLMsMM
+|sLLLsLL
+|<nowiki>1|5</nowiki>
+|ssLssss
+|<nowiki>4|2</nowiki>
+|Bright minor
+|Phrygian
+|  -0.0158
+|-
+|0
+|~ 10/9 6/5 4/3 3/2 5/3 9/5 2/1
+|MsMLMsM
+|LsLLLsL
+|<nowiki>3|3</nowiki>
+|sssLsss
+|<nowiki>3|3</nowiki>
+|Dark minor
+|Dorian
+|0
+|-
+|1
+|~ 10/9 11/9 4/3 22/15 5/3 11/6 2/1
+|MMsMLMs
+|LLsLLLs
+|<nowiki>5|1</nowiki>
+|ssssLss
+|<nowiki>2|4</nowiki>
+|Bright diminished
+|Ionian
+|0.0158
+|-
+|2
+|~ 9/8 5/4 15/11 3/2 5/3 9/5 2/1
+|LMsMMsM
+|LLsLLsL
+|<nowiki>4|2</nowiki>
+|Lssssss
+|<nowiki>6|0</nowiki>
+|Bright major
+|Mixolydian
+|0.0433
+|-
+|3
+|~ 10/9 5/4 7/5 3/2 5/3 11/6 2/1
+|MLMsMMs
+|LLLsLLs
+|<nowiki>6|0</nowiki>
+|sLsssss
+|<nowiki>5|1</nowiki>
+|Dark major
+|Lydian
+|0.0591
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode 2)
+!Equivalence
+!Step pattern
+!Scale
+!Comma list
+|-
+|L = M
+|[[5L 2s|LsLLLsL]]
+|[[Meanenneadecal]][7]
+|45/44, 56/55, 81/80
+|-
+|M = s
+|[[1L 6s|sssLsss]]
+|[[Trienstonic clan#Opossum|Opossum]][7]
+|28/27, 55/54, 77/75
+|-
+|L = s
+|[[4L 3s|LsLsLsL]]
+|[[Dicot family#Flat|Flat]][7]
+|21/20, 25/24, 33/32
+|}
+{| class="wikitable"
+|+Rank-1 temperings
+!ET
+|8d
+|[[12edo|12]]
+|[[15edo|15]]
+|[[19edo|19]]
+|27e
+|[[34edo|34]]
+|-
+!Step sizes in ET
+|(2, 1, 1)
+|(2, 2, 1)
+|(3, 2, 2)
+|(3, 3, 2)
+|(5, 4, 3)
+|(6, 5, 4)
+|}
+===== (2/1, 3/2, 6/5: 100/99, 144/143)[7] (No-7 Ptolemismic) =====
+{| class="wikitable"
+!Step signature
+!Steps in JI
+!Step sizes in cents (TE)
+|-
+|1L 4m 2s
+|(9/8~25/22, 10/9~11/10, 27/25~12/11~13/12)
+|(209.5416c, 175.8918c, 142.7754c)
+|}
+{| class="wikitable"
+!Mode number
+!Mode as simplest JI pre-image
+!Step pattern
+!Meantone[7]
+!UDP
+!Diatonic mode
+!Porcupine[7]
+!UDP
+!Porcupine mode
+![[Mode height]]
+|-
+|  -3
+|~ 12/11 6/5 4/3 13/9 8/5 9/5 2/1
+|smmsmLm
+|sLLsLLL
+|<nowiki>0|6</nowiki>
+|Lochrian
+|sssssLs
+|<nowiki>1|5</nowiki>
+|Dark diminished
+|
+|-
+|  -2
+|~ 10/9 6/5 4/3 22/15 8/5 16/9 2/1
+|msmmsmL
+|LsLLsLL
+|<nowiki>2|4</nowiki>
+|Aeolian
+|ssssssL
+|<nowiki>0|6</nowiki>
+|Magical seventh
+|
+|-
+|  -1
+|~ 12/11 6/5 15/11 3/2 13/8 9/5 2/1
+|smLmsmm
+|sLLLsLL
+|<nowiki>1|5</nowiki>
+|Phrygian
+|ssLssss
+|<nowiki>4|2</nowiki>
+|Bright minor
+|
+|-
+|0
+|~ 10/9 6/5 4/3 3/2 5/3 9/5 2/1
+|msmLmsm
+|LsLLLsL
+|<nowiki>3|3</nowiki>
+|Dorian
+|sssLsss
+|<nowiki>3|3</nowiki>
+|Dark minor
+|
+|-
+|1
+|~ 10/9 11/9 4/3 22/15 5/3 11/6 2/1
+|mmsmLms
+|LLsLLLs
+|<nowiki>5|1</nowiki>
+|Ionian
+|ssssLss
+|<nowiki>2|4</nowiki>
+|Bright diminished
+|
+|-
+|2
+|~ 9/8 5/4 15/11 3/2 5/3 9/5 2/1
+|Lmsmmsm
+|LLsLLsL
+|<nowiki>4|2</nowiki>
+|Mixolydian
+|Lssssss
+|<nowiki>6|0</nowiki>
+|Bright major
+|
+|-
+|3
+|~ 10/9 5/4 11/8 3/2 5/3 11/6 2/1
+|mLmsmms
+|LLLsLLs
+|<nowiki>6|0</nowiki>
+|Lydian
+|sLsssss
+|<nowiki>5|1</nowiki>
+|Dark major
+|
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode 2)
+!Equivalence
+!Step pattern
+!Scale
+!Comma list
+|-
+|m = s
+|[[1L 6s|sssLsss]]
+|[[Porcupine family#13-limit|Porcupine]][7]
+|40/39, 55/54, 66/65
+|-
+|L = m
+|[[5L 2s|LsLLLsL]]
+|[[Meantone family#Flattone|Flattone]][7]
+|45/44, 65/64, 81/80
+|-
+|L - m = m - s
+|LsLALsL
+|[[Tetracot family#Subgroup temperament|Tetracot]][7] MODMOS
+|100/99, 144/143, 243/242
+|}
+{| class="wikitable"
+|+Rank-1 temperings
+!ET
+|8
+|[[12edo|12]]
+|[[15edo|15]]
+|[[19edo|19]]
+|22f
+|[[26edo|26]]
+|27e
+|[[34edo|34]]
+|[[41edo|41]]
+|-
+!Step sizes in ET
+|(2, 1, 1)
+|(2, 2, 1)
+|(3, 2, 2)
+|(3, 3, 2)
+|(4, 3, 3)
+|(4, 4, 3)
+|(5, 4, 3)
+|(6, 5, 4)
+|(7, 6, 5)
+|}
+====[[SNS (2/1, 3/2, 6/5)-12|(2/1, 3/2, 6/5)[12]]]====
+{| class="wikitable"
+!Step signature
+!Steps in JI
+!Step sizes in cents
+|-
+|7L 1m 4s
+|(27/25, 25/24, 250/243)
+|(133.2376c, 70.6724c, 49.1661c)
+|}
+{| class="wikitable"
+!Mode number
+!Mode in JI
+!Step pattern
+!Meantone[12]
+!UDP
+![[Mode height]]
+|-
+| -6
+|250/243 10/9 2500/2187 100/81 4/3 1000/729 40/27 125/81 5/3 1250/729 50/27 2/1
+|sLsLLsLmLsLL
+|sLsLLsLsLsLL
+|<nowiki>1|10</nowiki>
+| -0.0622
+|-
+| -5
+|250/243 10/9 125/108 5/4 625/486 25/18 3/2 125/81 5/3 1250/729 50/27 2/1
+|sLmLsLLsLsLL
+|sLsLsLLsLsLL
+|<nowiki>0|11</nowiki>
+| -0.0587
+|-
+| -4
+|250/243 10/9 6/5 100/81 4/3 1000/729 40/27 8/5 400/243 16/9 50/27 2/1
+|sLLsLsLLsLmL
+|sLLsLsLLsLsL
+|<nowiki>4|7</nowiki>
+| -0.0338
+|-
+| -3
+|250/243 10/9 6/5 100/81 4/3 25/18 3/2 125/81 5/3 9/5 50/27 2/1
+|sLLsLmLsLLsL
+|sLLsLsLsLLsL
+|<nowiki>3|8</nowiki>
+| -0.0302
+|-
+|  -2
+|25/24 9/8 125/108 5/4 27/20 25/18 3/2 125/81 5/3 9/5 50/27 2/1
+|mLsLLsLsLLsL
+|sLsLLsLsLLsL
+|<nowiki>2|9</nowiki>
+|  -0.0267
+|-
+|  -1
+|27/25 10/9 6/5 100/81 4/3 36/25 40/27 8/5 5/3 9/5 50/27 2/1
+|LsLsLLsLmLsL
+|LsLsLLsLsLsL
+|<nowiki>6|5</nowiki>
+|  -0.0018
+|-
+|1
+|27/25 10/9 6/5 5/4 27/20 25/18 3/2 81/50 5/3 9/5 50/27 2/1
+|LsLmLsLLsLsL
+|LsLsLsLLsLsL
+|<nowiki>5|6</nowiki>
+|0.0018
+|-
+|2
+|27/25 10/9 6/5 162/125 4/3 36/25 40/27 8/5 216/125 16/9 48/25 2/1
+|LsLLsLsLLsLm
+|LsLLsLsLLsLs
+|<nowiki>9|2</nowiki>
+|0.0267
+|-
+|3
+|27/25 10/9 6/5 162/125 4/3 36/25 3/2 81/50 5/3 9/5 243/125 2/1
+|LsLLsLmLsLLs
+|LsLLsLsLsLLs
+|<nowiki>8|3</nowiki>
+|0.0302
+|-
+|4
+|27/25 9/8 243/200 5/4 27/20 729/500 3/2 81/50 5/3 9/5 243/125 2/1
+|LmLsLLsLsLLs
+|LsLsLLsLsLLs
+|<nowiki>7|4</nowiki>
+|0.0338
+|-
+|5
+|27/25 729/625 6/5 162/125 4/3 36/25 972/625 8/5 216/125 9/5 243/125 2/1
+|LLsLsLLsLmLs
+|LLsLsLLsLsLs
+|<nowiki>11|0</nowiki>
+|0.0587
+|-
+|6
+|27/25 729/625 6/5 162/125 27/20 729/500 3/2 81/50 2187/1250 9/5 243/125 2/1
+|LLsLmLsLLsLs
+|LLsLsLsLLsLs
+|<nowiki>10|1</nowiki>
+|0.0622
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode -3)
+! Equivalence
+! Step pattern
+! Scale
+! Comma list
+|-
+| m = s
+| [[7L 5s|sLLsLsLsLLsL]]
+| [[Meantone]][12]
+| 81/80
+|-
+| L = m
+| sLLsLLLsLLsL
+| [[Diminished (temperament)|Diminished]][12] MODMOS
+| 648/625
+|-
+| L = s
+| [[11L 1s|LLLLLsLLLLLL]]
+| [[Ripple]][12]
+| 6561/6250
+|-
+| L - m = m - s
+| dLLdLsLdLLdL
+| [[Augmented (temperament)|Augmented]][12] modmos
+| 128/125
+|-
+| s = 0
+| [[7L 1s|LLLsLLLL]]
+| [[Porcupine]][8]
+| 250/243
+|}
+=====[[SNS (2/1, 3/2, 6/5: 126/125)-12|(2/1, 3/2, 6/5: 126/125)[12] (Starling)]]=====
+{| class="wikitable"
+!Step signature
+!Steps in JI
+!Step sizes in cents (TE)
+|-
+|7L 1m 4s
+|(27/25~15/14, 25/24~21/20, 250/243~28/27)
+|(123.5395c, 78.929c, 64.0225c)
+|}
+{| class="wikitable"
+!Mode number
+!Mode as simplest JI pre-image
+!Step pattern
+!Meantone[12]
+!UDP
+![[Mode height]]
+|-
+|  -6
+|~ 28/27 10/9 280/243 56/45 4/3 112/81 40/27 14/9 5/3 140/81 28/15 2/1
+|sLsLLsLmLsLL
+|sLsLLsLsLsLL
+|<nowiki>1|10</nowiki>
+|  -0.0440
+|-
+|  -5
+|~ 28/27 10/9 7/6 5/4 35/27 7/5 3/2 14/9 5/3 140/81 28/15 2/1
+|sLmLsLLsLsLL
+|sLsLsLLsLsLL
+|<nowiki>0|11</nowiki>
+|  -0.0417
+|-
+|  -4
+|~ 28/27 10/9 6/5 56/45 4/3 112/81 40/27 8/5 224/135 16/9 28/15 2/1
+|sLLsLsLLsLmL
+|sLLsLsLLsLsL
+|<nowiki>4|7</nowiki>
+|  -0.0237
+|-
+|  -3
+|~ 28/27 10/9 6/5 56/45 4/3 7/5 3/2 14/9 5/3 9/5 28/15 2/1
+|sLLsLmLsLLsL
+|sLLsLsLsLLsL
+|<nowiki>3|8</nowiki>
+|  -0.0214
+|-
+|  -2
+|~ 21/20 9/8 7/6 5/4 27/20 7/5 3/2 14/9 5/3 9/5 28/15 2/1
+|mLsLLsLsLLsL
+|sLsLLsLsLLsL
+|<nowiki>2|9</nowiki>
+|  -0.0191
+|-
+|  -1
+|~ 15/14 10/9 6/5 56/45 4/3 10/7 40/27 8/5 5/3 9/5 28/15 2/1
+|LsLsLLsLmLsL
+|LsLsLLsLsLsL
+|<nowiki>6|5</nowiki>
+|  -0.0011
+|-
+|1
+|~ 15/14 10/9 6/5 5/4 27/20 7/5 3/2 45/28 5/3 9/5 28/15 2/1
+|LsLmLsLLsLsL
+|LsLsLsLLsLsL
+|<nowiki>5|6</nowiki>
+|0.0011
+|-
+|2
+|~ 15/14 10/9 6/5 9/7 4/3 10/7 40/27 8/5 12/7 16/9 40/21 2/1
+|LsLLsLsLLsLm
+|LsLLsLsLLsLs
+|<nowiki>9|2</nowiki>
+|0.0191
+|-
+|3
+|~ 15/14 10/9 6/5 9/7 4/3 10/7 3/2 45/28 5/3 9/5 27/14 2/1
+|LsLLsLmLsLLs
+|LsLLsLsLsLLs
+|<nowiki>8|3</nowiki>
+|0.0214
+|-
+|4
+|~ 15/14 9/8 135/112 5/4 27/20 81/56 3/2 45/28 5/3 9/5 27/14 2/1
+|LmLsLLsLsLLs
+|LsLsLLsLsLLs
+|<nowiki>7|4</nowiki>
+|0.0237
+|-
+|5
+|~ 15/14 81/70 6/5 9/7 4/3 10/7 54/35 8/5 12/7 9/5 27/14 2/1
+|LLsLsLLsLmLs
+|LLsLsLLsLsLs
+|<nowiki>11|0</nowiki>
+|0.0417
+|-
+|6
+|~ 15/14 81/70 6/5 9/7 27/20 81/56 3/2 45/28 243/140 9/5 27/14 2/1
+|LLsLmLsLLsLs
+|LLsLsLsLLsLs
+|<nowiki>10|1</nowiki>
+|0.0440
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode -3)
+! Equivalence
+! Step pattern
+! Scale
+! Comma list
+|-
+| m = s
+| [[7L 5s|sLLsLsLsLLsL]]
+| [[Meantone]][12]
+| 81/80, 126/125
+|-
+| L = m
+| sLLsLLLsLLsL
+| [[Diminished (temperament)|Diminished]][12] MODMOS
+| 36/35, 50/49
+|-
+| L - m = m - s
+| dLLdLsLdLLdL
+| [[Augene]][12] MODMOS
+| 64/63, 126/125
+|-
+| s = 0
+| [[7L 1s|LLLsLLLL]]
+| [[Opossum]][8]
+| 28/27, 126/125
+|}
+{| class="wikitable"
+|+Rank-1 temperings
+!ET
+|[[15edo|15]]
+|[[16edo|16]]
+|[[19edo|19]]
+|[[27edo|27]]
+|[[31edo|31]]
+|[[46edo|46]]
+|[[50edo|50]]
+|[[58edo|58]]
+|[[77edo|77]]
+|-
+!Step sizes in ET
+|(2, 1, 0)
+|(1, 1, 2)
+|(2, 1, 1)
+|(3, 2, 1)
+|(3, 2, 2)
+|(5, 3, 2)
+|(5, 3, 3)
+|(6, 4, 3)
+|(8, 5, 4)
+|}
+=====[[SNS (2/1, 3/2, 6/5: 126/125, 196/195)-12|(2/1, 3/2, 6/5: 126/125, 196/195)[12]]]=====
+{| class="wikitable"
+!Step signature
+!Steps in JI
+!Step sizes in cents (TE)
+|-
+|7L 1m 4s
+|(27/25~15/14~14/13, 25/24~21/20, 250/243~28/27~65/63)
+|(123.5395c, 78.929c, 64.0225c)
+|}
+{| class="wikitable"
+!Mode number
+!Mode as simplest JI pre-image
+!Step pattern
+!Meantone[12]
+!UDP
+![[Mode height]]
+|-
+|  -6
+|~ 28/27 10/9 52/45 26/21 4/3 104/75 40/27 14/9 5/3 26/15 13/7 2/1
+|sLsLLsLmLsLL
+|sLsLLsLsLsLL
+|<nowiki>1|10</nowiki>
+|  -0.0465
+|-
+|  -5
+|~ 28/27 10/9 7/6 5/4 13/10 7/5 3/2 14/9 5/3 26/15 13/7 2/1
+|sLmLsLLsLsLL
+|sLsLsLLsLsLL
+|<nowiki>0|11</nowiki>
+|  -0.0433
+|-
+|  -4
+|~ 28/27 10/9 6/5 26/21 4/3 104/75 40/27 8/5 104/63 16/9 13/7 2/1
+|sLLsLsLLsLmL
+|sLLsLsLLsLsL
+|<nowiki>4|7</nowiki>
+|  -0.0256
+|-
+|  -3
+|~ 28/27 10/9 6/5 26/21 4/3 7/5 3/2 14/9 5/3 9/5 13/7 2/1
+|sLLsLmLsLLsL
+|sLLsLsLsLLsL
+|<nowiki>3|8</nowiki>
+|  -0.0225
+|-
+|  -2
+|~ 21/20 9/8 7/6 5/4 27/20 7/5 3/2 14/9 5/3 9/5 13/7 2/1
+|mLsLLsLsLLsL
+|sLsLLsLsLLsL
+|<nowiki>2|9</nowiki>
+|  -0.0193
+|-
+|  -1
+|~ 14/13 10/9 6/5 26/21 4/3 10/7 40/27 8/5 5/3 9/5 13/7 2/1
+|LsLsLLsLmLsL
+|LsLsLLsLsLsL
+|<nowiki>6|5</nowiki>
+|  -0.0016
+|-
+|1
+|~ 14/13 10/9 6/5 5/4 27/20 7/5 3/2 21/13 5/3 9/5 13/7 2/1
+|LsLmLsLLsLsL
+|LsLsLsLLsLsL
+|<nowiki>5|6</nowiki>
+|0.0016
+|-
+|2
+|~ 14/13 10/9 6/5 9/7 4/3 10/7 40/27 8/5 12/7 16/9 40/21 2/1
+|LsLLsLsLLsLm
+|LsLLsLsLLsLs
+|<nowiki>9|2</nowiki>
+|0.0193
+|-
+|3
+|~ 14/13 10/9 6/5 9/7 4/3 10/7 3/2 21/13 5/3 9/5 27/14 2/1
+|LsLLsLmLsLLs
+|LsLLsLsLsLLs
+|<nowiki>8|3</nowiki>
+|0.0225
+|-
+|4
+|~ 14/13 9/8 63/52 5/4 27/20 75/52 3/2 21/13 5/3 9/5 27/14 2/1
+|LmLsLLsLsLLs
+|LsLsLLsLsLLs
+|<nowiki>7|4</nowiki>
+|0.0256
+|-
+|5
+|~ 14/13 15/13 6/5 9/7 4/3 10/7 20/13 8/5 12/7 9/5 27/14 2/1
+|LLsLsLLsLmLs
+|LLsLsLLsLsLs
+|<nowiki>11|0</nowiki>
+|0.0433
+|-
+|6
+|~ 14/13 15/13 6/5 9/7 27/20 75/52 3/2 21/13 45/26 9/5 27/14 2/1
+|LLsLmLsLLsLs
+|LLsLsLsLLsLs
+|<nowiki>10|1</nowiki>
+|0.0465
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode -3)
+!Equivalence
+!Step pattern
+!Scale
+!Comma list
+|-
+|m = s
+|[[7L 5s|sLLsLsLsLLsL]]
+|[[Meanpop]][12]
+|81/80, 105/104, 126/125
+|}
+{| class="wikitable"
+|+Rank-1 temperings
+!ET
+|15f
+|[[19edo|19]]
+|[[27edo|27]]
+|[[31edo|31]]
+|[[46edo|46]]
+|[[50edo|50]]
+|[[58edo|58]]
+|[[77edo|77]]
+|-
+!Step sizes in ET
+|(2, 1, 0)
+|(2, 1, 1)
+|(3, 2, 1)
+|(3, 2, 2)
+|(5, 3, 2)
+|(5, 3, 3)
+|(6, 4, 3)
+|(8, 5, 4)
+|}
+=====[[SNS (2/1, 3/2, 6/5: 100/99)-12|(2/1, 3/2, 6/5: 100/99)[12] (No-7 Ptolemismic)]]=====
+{| class="wikitable"
+!Step signature
+!Steps in JI
+!Step sizes in cents (TE)
+|-
+|7L 1m 4s
+|(27/25~12/11, 25/24~33/32, 250/243~55/54~121/120)
+|(146.6352c, 63.1434c, 27.4197c)
+|}
+{| class="wikitable"
+!Mode number
+!Mode as simplest JI pre-image
+!Step pattern
+!Meantone[12]
+!UDP
+![[Mode height]]
+|-
+| -6
+|~ 55/54 10/9 121/108 11/9 4/3 110/81 22/15 55/36 5/3 121/72 11/6 2/1
+|sLsLLsLmLsLL
+|sLsLLsLsLsLL
+|<nowiki>1|10</nowiki>
+| -0.0899
+|-
+| -5
+|~ 55/54 10/9 55/48 5/4 121/96 11/8 3/2 55/36 5/3 121/72 11/6 2/1
+|sLmLsLLsLsLL
+|sLsLsLLsLsLL
+|<nowiki>0|11</nowiki>
+| -0.0819
+|-
+| -4
+|~ 55/54 10/9 6/5 11/9 4/3 110/81 22/15 8/5 44/27 16/9 11/6 2/1
+|sLLsLsLLsLmL
+|sLLsLsLLsLsL
+|<nowiki>4|7</nowiki>
+| -0.0510
+|-
+| -3
+|~ 55/54 10/9 6/5 11/9 4/3 11/8 3/2 55/36 5/3 9/5 11/6 2/1
+|sLLsLmLsLLsL
+|sLLsLsLsLLsL
+|<nowiki>3|8</nowiki>
+| -0.0430
+|-
+|  -2
+|~ 25/24 9/8 55/48 5/4 15/11 11/8 3/2 55/36 5/3 9/5 11/6 2/1
+|mLsLLsLsLLsL
+|sLsLLsLsLLsL
+|<nowiki>2|9</nowiki>
+|  -0.0349
+|-
+|  -1
+|~ 12/11 10/9 6/5 11/9 4/3 16/11 22/15 8/5 5/3 9/5 11/6 2/1
+|LsLsLLsLmLsL
+|LsLsLLsLsLsL
+|<nowiki>6|5</nowiki>
+|  -0.0040
+|-
+|1
+|~ 12/11 10/9 6/5 5/4 15/11 11/8 3/2 18/11 5/3 9/5 11/6 2/1
+|LsLmLsLLsLsL
+|LsLsLsLLsLsL
+|<nowiki>5|6</nowiki>
+|0.0040
+|-
+|2
+|~ 12/11 10/9 6/5 72/55 4/3 16/11 22/15 8/5 96/55 16/9 48/25 2/1
+|LsLLsLsLLsLm
+|LsLLsLsLLsLs
+|<nowiki>9|2</nowiki>
+|0.0349
+|-
+|3
+|~ 12/11 10/9 6/5 72/55 4/3 16/11 3/2 18/11 5/3 9/5 108/55 2/1
+|LsLLsLmLsLLs
+|LsLLsLsLsLLs
+|<nowiki>8|3</nowiki>
+|0.0430
+|-
+|4
+|~ 12/11 9/8 27/22 5/4 15/11 81/55 3/2 18/11 5/3 9/5 108/55 2/1
+|LmLsLLsLsLLs
+|LsLsLLsLsLLs
+|<nowiki>7|4</nowiki>
+|0.0510
+|-
+|5
+|~ 12/11 144/121 6/5 72/55 4/3 16/11 192/121 8/5 96/55 9/5 108/55 2/1
+|LLsLsLLsLmLs
+|LLsLsLLsLsLs
+|<nowiki>11|0</nowiki>
+|0.0819
+|-
+|6
+|~ 12/11 144/121 6/5 72/55 15/11 81/55 3/2 18/11 216/121 9/5 108/55 2/1
+|LLsLmLsLLsLs
+|LLsLsLsLLsLs
+|<nowiki>10|1</nowiki>
+|0.0899
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode -3)
+! Equivalence
+! Step pattern
+! Scale
+! Comma list
+|-
+| m = s
+| [[7L 5s|sLLsLsLsLLsL]]
+| [[Meanenneadecal]][12] or [[Flattone]][12]
+| 45/44, 81/80
+|-
+| L = m
+| sLLsLLLsLLsL
+| [[Diminished (temperament)|Diminished]][12] modmos
+| 100/99, 128/121
+|-
+| L - m = m - s
+| dLLdLsLdLLdL
+| [[Augene]][12] modmos
+| 100/99, 128/125
+|-
+| s = 0
+| [[7L 1s|LLLsLLLL]]
+| [[Porcupine]][8]
+| 55/54, 100/99
+|}
+{| class="wikitable"
+|+Rank-1 temperings
+!ET
+|[[15edo|15]]
+|[[19edo|19]]
+|[[22edo|22]]
+|[[26edo|26]]
+|27e
+|[[29edo|29]]
+|[[34edo|34]]
+|[[37edo|37]]
+|[[41edo|41]]
+|-
+!Step sizes in ET
+|(2, 1, 0)
+|(2, 1, 1)
+|(3, 1, 0)
+|(3, 1, 1)
+|(3, 2, 1)
+|(4, 1, 0)
+|(4, 2, 1)
+|(5, 2, 0)
+|(5, 2, 1)
+|}
+===== (2/1, 3/2, 6/5: 100/99, 144/143)[12] (No-7 Ptolemismic) =====
+{| class="wikitable"
+!Step signature
+!Steps in JI
+!Step sizes in cents (TE)
+|-
+|7L 1m 4s
+|(27/25~12/11~13/12, 25/24~33/32~27/26, 250/243~55/54~121/120~40/39)
+|[http://x31eq.com/cgi-bin/rt.cgi?ets=7%261ce%264f&limit=2.3.5.11.13 (142.77537c, 66.76626c, 33.11646c)]
+|}
+{| class="wikitable"
+!Mode number
+!Mode as simplest JI pre-image
+!Step pattern
+!Meantone[12]
+!UDP
+![[Mode height]]
+|-
+|  -6
+|~ 40/39 10/9 44/39 11/9 4/3 110/81 22/15 20/13 5/3 22/13 11/6 2/1
+|sLsLLsLmLsLL
+|sLsLLsLsLsLL
+|<nowiki>1|10</nowiki>
+|
+|-
+|  -5
+|~ 40/39 10/9 15/13 5/4 33/26 11/8 3/2 20/13 5/3 22/13 11/6 2/1
+|sLmLsLLsLsLL
+|sLsLsLLsLsLL
+|<nowiki>0|11</nowiki>
+|
+|-
+|  -4
+|~ 40/39 10/9 6/5 11/9 4/3 110/81 22/15 8/5 44/27 16/9 11/6 2/1
+|sLLsLsLLsLmL
+|sLLsLsLLsLsL
+|<nowiki>4|7</nowiki>
+|
+|-
+|  -3
+|~ 40/39 10/9 6/5 11/9 4/3 11/8 3/2 20/13 5/3 9/5 11/6 2/1
+|sLLsLmLsLLsL
+|sLLsLsLsLLsL
+|<nowiki>3|8</nowiki>
+|
+|-
+|  -2
+|~ 25/24 9/8 15/13 5/4 15/11 11/8 3/2 20/13 5/3 9/5 11/6 2/1
+|mLsLLsLsLLsL
+|sLsLLsLsLLsL
+|<nowiki>2|9</nowiki>
+|
+|-
+|  -1
+|~ 12/11 10/9 6/5 11/9 4/3 13/9 22/15 8/5 5/3 9/5 11/6 2/1
+|LsLsLLsLmLsL
+|LsLsLLsLsLsL
+|<nowiki>6|5</nowiki>
+|
+|-
+|1
+|~ 12/11 10/9 6/5 5/4 15/11 11/8 3/2 13/8 5/3 9/5 11/6 2/1
+|LsLmLsLLsLsL
+|LsLsLsLLsLsL
+|<nowiki>5|6</nowiki>
+|
+|-
+|2
+|~ 12/11 10/9 6/5 13/10 4/3 13/9 22/15 8/5 26/15 16/9 48/25 2/1
+|LsLLsLsLLsLm
+|LsLLsLsLLsLs
+|<nowiki>9|2</nowiki>
+|
+|-
+|3
+|~ 12/11 10/9 6/5 13/10 4/3 13/9 3/2 13/8 5/3 9/5 39/20 2/1
+|LsLLsLmLsLLs
+|LsLLsLsLsLLs
+|<nowiki>8|3</nowiki>
+|
+|-
+|4
+|~ 12/11 9/8 27/22 5/4 15/11 81/55 3/2 13/8 5/3 9/5 39/20 2/1
+|LmLsLLsLsLLs
+|LsLsLLsLsLLs
+|<nowiki>7|4</nowiki>
+|
+|-
+|5
+|~ 12/11 13/11 6/5 13/10 4/3 13/9 52/33 8/5 26/15 9/5 39/20 2/1
+|LLsLsLLsLmLs
+|LLsLsLLsLsLs
+|<nowiki>11|0</nowiki>
+|
+|-
+|6
+|~ 12/11 13/11 6/5 13/10 15/11 81/55 3/2 13/8 39/22 9/5 39/20 2/1
+|LLsLmLsLLsLs
+|LLsLsLsLLsLs
+|<nowiki>10|1</nowiki>
+|
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode -3)
+!Equivalence
+!Step pattern
+!Scale
+!Comma list
+|-
+|m = s
+|[[7L 5s|sLLsLsLsLLsL]]
+|[[Meantone family#Flattone|Flattone]][12]
+|45/44, 65/64, 81/80
+|-
+|s = 0
+|[[7L 1s|LLLsLLLL]]
+|[[Porcupine family#13-limit|Porcupine]][8]
+|40/39, 55/54, 66/65
+|}
+{| class="wikitable"
+|+Rank-1 temperings
+!ET
+|[[15edo|15]]
+|[[19edo|19]]
+|22f
+|[[26edo|26]]
+|27e
+|[[34edo|34]]
+|[[41edo|41]]
+|-
+!Step sizes in ET
+|(2, 1, 0)
+|(2, 1, 1)
+|(3, 1, 0)
+|(3, 1, 1)
+|(3, 2, 1)
+|(4, 2, 1)
+|(5, 2, 1)
+|}
+===== (2/1, 3/2, 6/5: 100/99, 385/384)[12] ([[Keemic]]) =====
+{| class="wikitable"
+!Step signature
+!Steps in JI
+!Step sizes in cents (TE)
+|-
+|7L 1m 4s
+|(27/25~12/11~35/32, 25/24~33/32, 250/243~55/54~64/63~121/120)
+|(149.51592c, 58.8799c, 23.6254c)
+|}
+{| class="wikitable"
+!Mode number
+!Mode as simplest JI pre-image
+!Step pattern
+!Meantone[12]
+!UDP
+![[Mode height]]
+|-
+|  -6
+|~ 55/54 10/9 121/108 11/9 4/3 110/81 22/15 32/21 5/3 121/72 11/6 2/1
+|sLsLLsLmLsLL
+|sLsLLsLsLsLL
+|<nowiki>1|10</nowiki>
+|
+|-
+|  -5
+|~ 55/54 10/9 8/7 5/4 121/96 11/8 3/2 32/21 5/3 121/72 11/6 2/1
+|sLmLsLLsLsLL
+|sLsLsLLsLsLL
+|<nowiki>0|11</nowiki>
+|
+|-
+|  -4
+|~ 55/54 10/9 6/5 11/9 4/3 110/81 22/15 8/5 44/27 16/9 11/6 2/1
+|sLLsLsLLsLmL
+|sLLsLsLLsLsL
+|<nowiki>4|7</nowiki>
+|
+|-
+|  -3
+|~ 55/54 10/9 6/5 11/9 4/3 11/8 3/2 32/21 5/3 9/5 11/6 2/1
+|sLLsLmLsLLsL
+|sLLsLsLsLLsL
+|<nowiki>3|8</nowiki>
+|
+|-
+|  -2
+|~ 25/24 9/8 8/7 5/4 15/11 11/8 3/2 32/21 5/3 9/5 11/6 2/1
+|mLsLLsLsLLsL
+|sLsLLsLsLLsL
+|<nowiki>2|9</nowiki>
+|
+|-
+|  -1
+|~ 12/11 10/9 6/5 11/9 4/3 16/11 22/15 8/5 5/3 9/5 11/6 2/1
+|LsLsLLsLmLsL
+|LsLsLLsLsLsL
+|<nowiki>6|5</nowiki>
+|
+|-
+|1
+|~ 12/11 10/9 6/5 5/4 15/11 11/8 3/2 18/11 5/3 9/5 11/6 2/1
+|LsLmLsLLsLsL
+|LsLsLsLLsLsL
+|<nowiki>5|6</nowiki>
+|
+|-
+|2
+|~ 12/11 10/9 6/5 21/16 4/3 16/11 22/15 8/5 7/4 16/9 48/25 2/1
+|LsLLsLsLLsLm
+|LsLLsLsLLsLs
+|<nowiki>9|2</nowiki>
+|
+|-
+|3
+|~ 12/11 10/9 6/5 21/16 4/3 16/11 3/2 18/11 5/3 9/5 63/32 2/1
+|LsLLsLmLsLLs
+|LsLLsLsLsLLs
+|<nowiki>8|3</nowiki>
+|
+|-
+|4
+|~ 12/11 9/8 27/22 5/4 15/11 81/55 3/2 18/11 5/3 9/5 63/ 2/1
+|LmLsLLsLsLLs
+|LsLsLLsLsLLs
+|<nowiki>7|4</nowiki>
+|
+|-
+|5
+|~ 12/11 144/121 6/5 21/16 4/3 16/11 192/121 8/5 7/4 9/5 63/32 2/1
+|LLsLsLLsLmLs
+|LLsLsLLsLsLs
+|<nowiki>11|0</nowiki>
+|
+|-
+|6
+|~ 12/11 144/121 6/5 21/16 15/11 81/55 3/2 18/11 216/121 9/5 63/32 2/1
+|LLsLmLsLLsLs
+|LLsLsLsLLsLs
+|<nowiki>10|1</nowiki>
+|
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode -3)
+!Equivalence
+!Step pattern
+!Scale
+!Comma list
+|-
+|m = s
+|[[7L 5s|sLLsLsLsLLsL]]
+|[[Meantone family#Flattone|Flattone]][12]
+|45/44, 81/80, 385/384
+|-
+|s = 0
+|[[7L 1s|LLLsLLLL]]
+|[[Porcupine family#11-limit|Porcupine]][8]
+|55/54, 64/63, 100/99
+|}
+{| class="wikitable"
+|+Rank-1 temperings
+!ET
+|[[15edo|15]]
+|[[19edo|19]]
+|[[22edo|22]]
+|[[26edo|26]]
+|[[34edo|34]]
+|[[41edo|41]]
+|[[104edo|104]]
+|-
+!Step sizes in ET
+|(2, 1, 0)
+|(2, 1, 1)
+|(3, 1, 0)
+|(3, 1, 1)
+|(4, 2, 1)
+|(5, 2, 1)
+|(13, 5, 2)
+|}
+===== [[SNS (2/1, 3/2, 6/5: 100/99, 105/104, 144/143)-12|(2/1, 3/2, 6/5: 100/99, 105/104, 144/143)[12]]] ([[Keemic]]) =====
+{| class="wikitable"
+!Step signature
+!Steps in JI
+!Step sizes in cents (TE)
+|-
+|7L 1m 4s
+|(27/25~12/11~13/12~35/32, 25/24~27/26~33/32, 250/243~40/39~55/54~64/63~121/120)
+|(145.47082c, 58.39270c, 30.85183c)
+|}
+{| class="wikitable"
+!Mode number
+!Mode as simplest JI pre-image
+!Step pattern
+!Meantone[12]
+!UDP
+![[Mode height]]
+|-
+|  -6
+|~ 40/39 10/9 44/39 11/9 4/3 110/81 22/15 20/13 5/3 22/13 11/6 2/1
+|sLsLLsLmLsLL
+|sLsLLsLsLsLL
+|<nowiki>1|10</nowiki>
+|
+|-
+|  -5
+|~ 40/39 10/9 8/7 5/4 33/26 11/8 3/2 20/13 5/3 22/13 11/6 2/1
+|sLmLsLLsLsLL
+|sLsLsLLsLsLL
+|<nowiki>0|11</nowiki>
+|
+|-
+|  -4
+|~ 40/39 10/9 6/5 11/9 4/3 110/81 22/15 8/5 44/27 16/9 11/6 2/1
+|sLLsLsLLsLmL
+|sLLsLsLLsLsL
+|<nowiki>4|7</nowiki>
+|
+|-
+|  -3
+|~ 40/39 10/9 6/5 11/9 4/3 11/8 3/2 20/13 5/3 9/5 11/6 2/1
+|sLLsLmLsLLsL
+|sLLsLsLsLLsL
+|<nowiki>3|8</nowiki>
+|
+|-
+|  -2
+|~ 25/24 9/8 8/7 5/4 15/11 11/8 3/2 20/13 5/3 9/5 11/6 2/1
+|mLsLLsLsLLsL
+|sLsLLsLsLLsL
+|<nowiki>2|9</nowiki>
+|
+|-
+|  -1
+|~ 12/11 10/9 6/5 11/9 4/3 13/9 22/15 8/5 5/3 9/5 11/6 2/1
+|LsLsLLsLmLsL
+|LsLsLLsLsLsL
+|<nowiki>6|5</nowiki>
+|
+|-
+|1
+|~ 12/11 10/9 6/5 5/4 15/11 11/8 3/2 13/8 5/3 9/5 11/6 2/1
+|LsLmLsLLsLsL
+|LsLsLsLLsLsL
+|<nowiki>5|6</nowiki>
+|
+|-
+|2
+|~ 12/11 10/9 6/5 13/10 4/3 13/9 22/15 8/5 7/4 16/9 48/25 2/1
+|LsLLsLsLLsLm
+|LsLLsLsLLsLs
+|<nowiki>9|2</nowiki>
+|
+|-
+|3
+|~ 12/11 10/9 6/5 13/10 4/3 13/9 3/2 13/8 5/3 9/5 39/20 2/1
+|LsLLsLmLsLLs
+|LsLLsLsLsLLs
+|<nowiki>8|3</nowiki>
+|
+|-
+|4
+|~ 12/11 9/8 27/22 5/4 15/11 81/55 3/2 13/8 5/3 9/5 39/20 2/1
+|LmLsLLsLsLLs
+|LsLsLLsLsLLs
+|<nowiki>7|4</nowiki>
+|
+|-
+|5
+|~ 12/11 13/11 6/5 13/10 4/3 13/9 52/33 8/5 7/4 9/5 39/20 2/1
+|LLsLsLLsLmLs
+|LLsLsLLsLsLs
+|<nowiki>11|0</nowiki>
+|
+|-
+|6
+|~ 12/11 13/11 6/5 13/10 15/11 81/55 3/2 13/8 39/22 9/5 39/20 2/1
+|LLsLmLsLLsLs
+|LLsLsLsLLsLs
+|<nowiki>10|1</nowiki>
+|
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode -3)
+!Equivalence
+!Step pattern
+!Scale
+!Comma list
+|-
+|m = s
+|[[7L 5s|sLLsLsLsLLsL]]
+|[[Meantone family#Flattone|Flattone]][12]
+|45/44, 65/64, 78/77, 81/80
+|-
+|s = 0
+|[[7L 1s|LLLsLLLL]]
+|[[Porcupine family#13-limit|Porcupine]][8]
+|40/39, 55/54, 64/63, 66/65
+|}
+{| class="wikitable"
+|+Rank-1 temperings
+!ET
+|[[15edo|15]]
+|[[19edo|19]]
+|22f
+|[[26edo|26]]
+|[[34edo|34]]
+|[[41edo|41]]
+|-
+!Step sizes in ET
+|(2, 1, 0)
+|(2, 1, 1)
+|(3, 1, 0)
+|(3, 1, 1)
+|(4, 2, 1)
+|(5, 2, 1)
+|}
+=====[[SNS (2/1, 3/2, 6/5: 56/55, 100/99)-12|(2/1, 3/2, 6/5: 56/55, 100/99)[12] (Thrasher)]]=====
+{| class="wikitable"
+!Step signature
+!Steps in JI
+!Step sizes in cents (TE)
+|-
+|7L 1m 4s
+|(27/25~15/14~12/11, 25/24~21/20~33/32, 250/243~28/27~55/54)
+|(132.5782c, 82.867c, 46.5074c)
+|}
+{| class="wikitable"
+!Mode number
+!Mode as simplest JI pre-image
+!Step pattern
+!Meantone[12]
+!UDP
+![[Mode height]]
+|-
+|  -6
+|~ 28/27 10/9 121/108 11/9 4/3 110/81 22/15 14/9 5/3 121/72 11/6 2/1
+|sLsLLsLmLsLL
+|sLsLLsLsLsLL
+|<nowiki>1|10</nowiki>
+|  -0.0671
+|-
+|  -5
+|~ 28/27 10/9 7/6 5/4 121/96 11/8 3/2 14/9 5/3 121/72 11/6 2/1
+|sLmLsLLsLsLL
+|sLsLsLLsLsLL
+|<nowiki>0|11</nowiki>
+|  -0.0526
+|-
+|  -4
+|~ 28/27 10/9 6/5 11/9 4/3 110/81 22/15 8/5 44/27 16/9 11/6 2/1
+|sLLsLsLLsLmL
+|sLLsLsLLsLsL
+|<nowiki>4|7</nowiki>
+|  -0.0445
+|-
+|  -3
+|~ 28/27 10/9 6/5 11/9 4/3 11/8 3/2 14/9 5/3 9/5 11/6 2/1
+|sLLsLmLsLLsL
+|sLLsLsLsLLsL
+|<nowiki>3|8</nowiki>
+|  -0.0299
+|-
+|  -2
+|~ 21/20 9/8 7/6 5/4 15/11 11/8 3/2 14/9 5/3 9/5 11/6 2/1
+|mLsLLsLsLLsL
+|sLsLLsLsLLsL
+|<nowiki>2|9</nowiki>
+|  -0.0154
+|-
+|  -1
+|~ 12/11 10/9 6/5 11/9 4/3 16/11 22/15 8/5 5/3 9/5 11/6 2/1
+|LsLsLLsLmLsL
+|LsLsLLsLsLsL
+|<nowiki>6|5</nowiki>
+|  -0.0073
+|-
+|1
+|~ 12/11 10/9 6/5 5/4 15/11 11/8 3/2 81/50 5/3 9/5 11/6 2/1
+|LsLmLsLLsLsL
+|LsLsLsLLsLsL
+|<nowiki>5|6</nowiki>
+|0.0073
+|-
+|2
+|~ 12/11 10/9 6/5 9/7 4/3 16/11 22/15 8/5 12/7 16/9 48/25 2/1
+|LsLLsLsLLsLm
+|LsLLsLsLLsLs
+|<nowiki>9|2</nowiki>
+|0.0154
+|-
+|3
+|~ 12/11 10/9 6/5 9/7 4/3 16/11 3/2 18/11 5/3 9/5 27/14 2/1
+|LsLLsLmLsLLs
+|LsLLsLsLsLLs
+|<nowiki>8|3</nowiki>
+|0.0299
+|-
+|4
+|~ 12/11 9/8 27/22 5/4 15/11 81/55 3/2 18/11 5/3 9/5 27/14 2/1
+|LmLsLLsLsLLs
+|LsLsLLsLsLLs
+|<nowiki>7|4</nowiki>
+|0.0445
+|-
+|5
+|~ 12/11 144/121 6/5 9/7 4/3 16/11 192/121 8/5 12/7 9/5 27/14 2/1
+|LLsLsLLsLmLs
+|LLsLsLLsLsLs
+|<nowiki>11|0</nowiki>
+|0.0526
+|-
+|6
+|~ 12/11 144/121 6/5 9/7 15/11 81/55 3/2 81/50 216/121 9/5 27/14 2/1
+|LLsLmLsLLsLs
+|LLsLsLsLLsLs
+|<nowiki>10|1</nowiki>
+|0.0671
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode -3)
+!Equivalence
+!Step pattern
+!Scale
+!Comma list
+|-
+| m = s
+| [[7L 5s|sLLsLsLsLLsL]]
+| [[Meanenneadecal]][12]
+| 45/44, 56/55, 81/80
+|-
+| L = m
+| sLLsLLLsLLsL
+| [[Diminished (temperament)|Diminished]][12] MODMOS
+| 36/35, 50/49, 56/55
+|-
+| s = 0
+| [[7L 1s|LLLsLLLL]]
+| [[Opossum]][8]
+| 28/27, 55/54, 77/75
+|}
+{| class="wikitable"
+|+Rank-1 temperings
+!ET
+|[[15edo|15]]
+|[[19edo|19]]
+|27e
+|[[34edo|34]]
+|-
+!Step sizes in ET
+|(2, 1, 0)
+|(2, 1, 1)
+|(3, 2, 1)
+|(4, 2, 1)
+|}
+=====(2/1, 3/2, 6/5: 56/55, 91/90, 100/99)[12] (Thrasher)=====
+{| class="wikitable"
+!Step signature
+!Steps in JI
+!Step sizes in cents (TE)
+|-
+|7L 1m 4s
+|(27/25~15/14~12/11~13/12, 25/24~21/20~33/32~27/26, 250/243~28/27~55/54~40/39)
+|
+|}
+{| class="wikitable"
+!Mode number
+!Mode as simplest JI pre-image
+!Step pattern
+!Meantone[12]
+!UDP
+![[Mode height]]
+|-
+|  -6
+|~ 28/27 10/9 44/39 11/9 4/3 110/81 22/15 14/9 5/3 22/13 11/6 2/1
+|sLsLLsLmLsLL
+|sLsLLsLsLsLL
+|<nowiki>1|10</nowiki>
+|
+|-
+|  -5
+|~ 28/27 10/9 7/6 5/4 33/26 11/8 3/2 14/9 5/3 121/72 11/6 2/1
+|sLmLsLLsLsLL
+|sLsLsLLsLsLL
+|<nowiki>0|11</nowiki>
+|
+|-
+|  -4
+|~ 28/27 10/9 6/5 11/9 4/3 110/81 22/15 8/5 44/27 16/9 11/6 2/1
+|sLLsLsLLsLmL
+|sLLsLsLLsLsL
+|<nowiki>4|7</nowiki>
+|
+|-
+|  -3
+|~ 28/27 10/9 6/5 11/9 4/3 11/8 3/2 14/9 5/3 9/5 11/6 2/1
+|sLLsLmLsLLsL
+|sLLsLsLsLLsL
+|<nowiki>3|8</nowiki>
+|
+|-
+|  -2
+|~ 21/20 9/8 7/6 5/4 15/11 11/8 3/2 14/9 5/3 9/5 11/6 2/1
+|mLsLLsLsLLsL
+|sLsLLsLsLLsL
+|<nowiki>2|9</nowiki>
+|
+|-
+|  -1
+|~ 12/11 10/9 6/5 11/9 4/3 16/11 22/15 8/5 5/3 9/5 11/6 2/1
+|LsLsLLsLmLsL
+|LsLsLLsLsLsL
+|<nowiki>6|5</nowiki>
+|
+|-
+|1
+|~ 12/11 10/9 6/5 5/4 15/11 11/8 3/2 81/50 5/3 9/5 11/6 2/1
+|LsLmLsLLsLsL
+|LsLsLsLLsLsL
+|<nowiki>5|6</nowiki>
+|
+|-
+|2
+|~ 12/11 10/9 6/5 9/7 4/3 16/11 22/15 8/5 12/7 16/9 48/25 2/1
+|LsLLsLsLLsLm
+|LsLLsLsLLsLs
+|<nowiki>9|2</nowiki>
+|
+|-
+|3
+|~ 12/11 10/9 6/5 9/7 4/3 16/11 3/2 18/11 5/3 9/5 27/14 2/1
+|LsLLsLmLsLLs
+|LsLLsLsLsLLs
+|<nowiki>8|3</nowiki>
+|
+|-
+|4
+|~ 12/11 9/8 27/22 5/4 15/11 81/55 3/2 18/11 5/3 9/5 27/14 2/1
+|LmLsLLsLsLLs
+|LsLsLLsLsLLs
+|<nowiki>7|4</nowiki>
+|
+|-
+|5
+|~ 12/11 13/11 6/5 9/7 4/3 16/11 192/121 8/5 12/7 9/5 27/14 2/1
+|LLsLsLLsLmLs
+|LLsLsLLsLsLs
+|<nowiki>11|0</nowiki>
+|
+|-
+|6
+|~ 12/11 13/11 6/5 9/7 15/11 81/55 3/2 81/50 39/22 9/5 27/14 2/1
+|LLsLmLsLLsLs
+|LLsLsLsLLsLs
+|<nowiki>10|1</nowiki>
+|
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode -3)
+!Equivalence
+!Step pattern
+!Scale
+!Comma list
+|-
+|m = s
+|[[7L 5s|sLLsLsLsLLsL]]
+|[[Meantone family#Vincenzo|Vincenzo]][12]
+|45/44, 56/55, 65/64, 81/80
+|-
+|s = 0
+|[[7L 1s|LLLsLLLL]]
+|[[Trienstonic clan#Opossum|Opossum]][8]
+|28/27, 40/39, 55/54, 66/65
+|}
+{| class="wikitable"
+|+Rank-1 temperings
+!ET
+|[[15edo|15]]
+|[[19edo|19]]
+|27e
+|[[34edo|34]]
+|-
+!Step sizes in ET
+|(2, 1, 0)
+|(2, 1, 1)
+|(3, 2, 1)
+|(4, 2, 1)
+|}
+===== [[SNS (2/1, 3/2, 6/5: 4375/4374)-12|(2/1, 3/2, 6/5: 4375/4374)[12] (Ragismic)]] =====
+L 1m 4s = (~27/25, ~25/24, 250/243~36/35) = (133.4115c, 70.5569c, 48.8911c) TE
+~ 27/25 10/9 6/5 35/27 4/3 36/25 3/2 81/50 5/3 9/5 35/18 2/1 as LsLLsLmLsLLs
+m = s -> LsLLsLsLsLLs Falttone[12]; L = m -> LsLLsLLLsLLs MODMOS; L = s -> LLLLLLsLLLLL; s = 0 -> LLLLsLLL Hystrix[8]
+-ET: (2, 1, 1); 53-ET: (6, 3, 2); 72-ET: (8, 4, 3); 99-ET: (11, 6, 4); 118-ET: (13, 7, 5); 152-ET: (17, 9, 6); 171-ET: (19, 10, 7); 224-ET: (25, 13, 9); 270-ET: (30, 16, 11); 441-ET: (49, 26, 18); 494-ET: (55, 29, 20); 612-ET: (68, 36, 25)
+==== (2/1, 3/2, 6/5: 100/99, 144/143)[20] (No-7 Ptolemismic) ====
+L 12m 1s = (~189/176, 250/243~55/54~121/120~40/39, 81/80~45/44~65/64) =
+==== (2/1, 3/2, 6/5: 100/99, 385/384)[20] (Keemic) ====
+L 12m 1s = (~189/176, 250/243~55/54~121/120~64/63, 81/80~45/44) = (125.8905c, 35.2545c, 23.6254c) TE
+/39 12/11 10/9 32/27 6/5 11/9 13/10 4/3 11/8 22/15 3/2 20/13 13/8 5/3 16/9 9/5 11/6 39/20 2/1
+==== [[SNS (2/1, 3/2, 6/5: 4375/4374)-20|(2/1, 3/2, 6/5: 4375/4374)[20] (Ragismic)]] ====
+L 12m 1s = (~21/20, 250/243~36/35, ~81/80) = (84.5204c, 48.8911c, 21.6658c) TE
+~ 21/20 27/25 10/9 7/6 6/5 63/50 35/27 4/3 7/5 36/25 35/24 3/2 63/40 81/50 5/3 7/4 9/5 189/100 35/18 2/1 as LmmLmLmmLmsmLmmLmLmm
+m = s -> LssLsLssLsssLssLsLss MODMOS; L = m -> LLLLLLLLLLsLLLLLLLLL; L = s -> LssLsLssLsLsLssLsLss MODMOS;
+L - m = m - s -> Unidec[20] MODMOS
+s = 0 -> LmmLmLmmLmmLmmLmLmm Falttone[19]; m = 0 -> LLLLsLLL Hystrix[8]
+-ET: (1, 1, 0); 53-ET: (4, 2, 1); 72-ET: (5, 3, 1); 99-ET: (7, 4, 2); 118-ET: (8, 5, 2); 152-ET: (11, 6, 3); 171-ET: (12, 7, 3); 224-ET: (16, 9, 4); 270-ET: (19, 11, 5); 441-ET: (31, 18, 8); 494-ET: (35, 20, 9); 612-ET: (43, 25, 11)
+===== [[SNS (2/1, 3/2, 6/5: 3025/3024, 4375/4374)-20|(2/1, 3/2, 6/5: 3025/3024, 4375/4374)[20] (Thor)]] =====
+L 12m 1s = (~21/20, 250/243~36/35, 81/80~245/242) = (84.5509c, 48.8802c, 21.6019c) TE
+~ 21/20 27/25 10/9 7/6 6/5 63/50 35/27 4/3 7/5 36/25 35/24 3/2 63/40 81/50 5/3 7/4 9/5 121/64 35/18 2/1 as LmmLmLmmLmsmLmmLmLmm
+m = s -> LssLsLssLsssLssLsLss MODMOS; L = m -> LLLLLLLLLLsLLLLLLLLL; L = s -> LssLsLssLsLsLssLsLss MODMOS;
+s = 0 -> LmmLmLmmLmmLmmLmLmm; m = 0 -> LLLLsLLL
+-ET: (1, 1, 0); 34d: (3, 1, 1); 46-ET: (3, 2, 1); 72-ET: (5, 3, 1); 80-ET: (6, 3, 2); 118-ET: (8, 5, 2); 152-ET: (11, 6, 3); 171-ET: (12, 7, 3); 224-ET: (16, 9, 4); 270-ET: (19, 11, 5); 494-ET: (35, 20, 9); 612-ET: (43, 25, 11)
+==== [[SNS (2/1, 3/2, 6/5: 3025/3024, 4375/4374)-39|(2/1, 3/2, 6/5: 3025/3024, 4375/4374)[39] (Thor)]] ====
+L 12m 20s = (~28/27, ~64/63, 81/80~245/242) = (62.949c, 27.2783c, 21.6019c) TE
+~ 81/80 36/35 126/121 27/25 35/32 10/9 9/8 8/7 81/70 6/5 147/121 216/175 5/4 35/27 21/16 4/3 27/20 48/35 25/18 36/25 35/24 40/27 3/2 32/21 54/35 8/5 175/108 242/147 5/3 140/81 7/4 16/9 9/5 64/35 121/63 35/18 160/81 2/1 as smsLsmsmsLsmsLsmsmsLsmsmsLsmsLsmsmsLsms
+m = s -> sssLsssssLsssLsssssLsssssLsssLsssssLsss Hemiamity[39] MODMOS; L = m -> sLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLs; s = 0 -> sLssLsLssLssLsLssLs
+-ET: (2, 1, 1); 72-ET: (4, 2, 1); 80-ET: (4, 1, 2); 118-ET: (6, 3, 2); 152-ET: (8, 3, 3); 171-ET: (9, 4, 3); 224-ET: (12, 5, 4); 270-ET: (14, 6, 5); 494-ET: (26, 11, 9); 612-ET: (32, 14, 11)
+=== ((2/1, 6/5)[4], 10/9) ===
+==== ((2/1, 6/5)[4], 10/9)[8] ====
+{| class="wikitable"
+!Step signature
+!Steps in JI
+!Step sizes in cents
+|-
+|4L 3M 1s
+|10/9, 27/25, 25/24
+|(182.4037c, 133.2376c, 70.6724c)
+|}
+{| class="wikitable"
+|+
+!Mode number
+!Mode in JI (height order)
+!Step pattern
+!Porcupine[8]
+step pattern and UDP
+!Diminished[8]
+step pattern and UDP
+|-
+|4
+|10/9 6/5 4/3 36/25 8/5 216/125 48/25 2/1
+|LMLMLMLs
+|<nowiki>LLLLLLLs 7|0</nowiki>
+|<nowiki>LsLsLsLs 1|0 (4)</nowiki>
+|-
+|3
+|10/9 6/5 4/3 36/25 8/5 5/3 50/27 2/1
+|LMLMLsLM
+|<nowiki>LLLLLsLL 5|2</nowiki>
+|<nowiki>LsLsLsLs 1|0 (4)</nowiki>
+|-
+|2
+|27/25 6/5 162/125 36/25 972/625 216/125 9/5 2/1
+|MLMLMLsL
+|<nowiki>LLLLLLsL 6|1</nowiki>
+|<nowiki>sLsLsLsL 0|1 (4)</nowiki>
+|-
+|1
+|10/9 6/5 4/3 25/18 125/81 5/3 50/27 2/1
+|LMLsLMLM
+|<nowiki>LLLsLLLL 3|4</nowiki>
+|<nowiki>LsLsLsLs 1|0 (4)</nowiki>
+|-
+| -1
+|27/25 6/5 162/125 36/25 3/2 5/3 9/5 2/1
+|MLMLsLML
+|<nowiki>LLLLsLLL 4|3</nowiki>
+|<nowiki>sLsLsLsL 0|1 (4)</nowiki>
+|-
+| -2
+|10/9 125/108 625/486 25/18 125/81 5/3 50/27 2/1
+|LsLMLMLM
+|<nowiki>LsLLLLLL 1|6</nowiki>
+|<nowiki>LsLsLsLs 1|0 (4)</nowiki>
+|-
+| -3
+|27/25 6/5 5/4 25/18 3/2 5/3 9/5 2/1
+|MLsLMLML
+|<nowiki>LLsLLLLL 2|5</nowiki>
+|<nowiki>sLsLsLsL 0|1 (4)</nowiki>
+|-
+| -4
+|25/24 125/108 5/4 25/18 3/2 5/3 9/5 2/1
+|sLMLMLML
+|<nowiki>sLLLLLLL 0|7</nowiki>
+|<nowiki>sLsLsLsL 0|1 (4)</nowiki>
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode 4)
+!Equivalence
+!Step pattern
+!Scale
+!Comma list
+|-
+|M = 0
+|LLLLs
+|Bug[5]
+|27/25
+|-
+|s = 0
+|LsLsLsL
+|Dicot[7]
+|25/24
+|-
+|L = M
+|LLLLLLLs
+|Porcupine[8]
+|250/243
+|-
+|M = s
+|LsLsLsLs
+|Diminished[8]
+|648/625
+|-
+|L - M = M - s
+|LsLsLsLd
+|Sensipent[8] MODMOS
+|78732/78125
+|}
+{| class="wikitable"
+|+Rank-1 temperings
+!ET
+|12
+|15
+|19
+|22
+|26
+|27
+|29
+|31
+|34
+|41
+|46
+|53
+|65
+|-
+!Step sizes in ET
+|(2, 1, 1)
+|(2, 2, 1)
+|(3, 2, 1)
+|(3, 3, 1)
+|(4, 3, 1)
+|(4, 3, 2)
+|(4, 4, 1)
+|(5, 3, 2)
+|(5, 4, 2)
+|(6, 5, 2)
+|(7, 5, 3)
+|(8, 6, 3)
+|(10, 7, 4)
+|}
+===== ((2/1, 6/5)[4], 10/9: 875/864)[8] Supermagic =====
+{| class="wikitable"
+!Step signature
+!Steps in JI
+!Step sizes in cents
+|-
+|4L 3M 1s
+|10/9, 27/25~35/32, 25/24~36/35
+|176.8769, 144.8100, 59.11533
+|}
+{| class="wikitable"
+|+
+!Mode number
+!Mode as simplest JI pre-image
+!Step pattern
+!Porcupine[8]
+step pattern and UDP
+!Diminished[8]
+step pattern and UDP
+|-
+|4
+|~ 10/9 6/5 4/3 35/24 8/5 7/4 35/18 2/1
+|LMLMLMLs
+|<nowiki>LLLLLLLs 7|0</nowiki>
+|<nowiki>LsLsLsLs 1|0 (4)</nowiki>
+|-
+|3
+|~ 10/9 6/5 4/3 35/24 8/5 5/3 50/27 2/1
+|LMLMLsLM
+|<nowiki>LLLLLsLL 5|2</nowiki>
+|<nowiki>LsLsLsLs 1|0 (4)</nowiki>
+|-
+|2
+|~ 27/25 6/5 21/16 35/24 63/40 7/4 9/5 2/1
+|MLMLMLsL
+|<nowiki>LLLLLLsL 6|1</nowiki>
+|<nowiki>sLsLsLsL 0|1 (4)</nowiki>
+|-
+|1
+|~ 10/9 6/5 4/3 25/18 32/21 5/3 50/27 2/1
+|LMLsLMLM
+|<nowiki>LLLsLLLL 3|4</nowiki>
+|<nowiki>LsLsLsLs 1|0 (4)</nowiki>
+|-
+| -1
+|~ 27/25 6/5 21/16 35/24 3/2 5/3 9/5 2/1
+|MLMLsLML
+|<nowiki>LLLLsLLL 4|3</nowiki>
+|<nowiki>sLsLsLsL 0|1 (4)</nowiki>
+|-
+| -2
+|~ 10/9 8/7 80/63 25/18 32/21 5/3 50/27 2/1
+|LsLMLMLM
+|<nowiki>LsLLLLLL 1|6</nowiki>
+|<nowiki>LsLsLsLs 1|0 (4)</nowiki>
+|-
+| -3
+|~ 27/25 6/5 5/4 25/18 3/2 5/3 9/5 2/1
+|MLsLMLML
+|<nowiki>LLsLLLLL 2|5</nowiki>
+|<nowiki>sLsLsLsL 0|1 (4)</nowiki>
+|-
+| -4
+|~ 25/24 8/7 5/4 25/18 3/2 5/3 9/5 2/1
+|sLMLMLML
+|<nowiki>sLLLLLLL 0|7</nowiki>
+|<nowiki>sLsLsLsL 0|1 (4)</nowiki>
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode 4)
+!Equivalence
+!Step pattern
+!Scale
+!Comma list
+|-
+|s = 0
+|LsLsLsL
+|Dicot[7]
+|25/24, 15/14
+|-
+|L = M
+|LLLLLLLs
+|Porcupine[8]
+|250/243, 64/63
+|}
+{| class="wikitable"
+|+Rank-1 temperings
+!ET
+|15
+|19
+|22
+|26
+|34
+|37
+|41
+|60
+|-
+!Step sizes in ET
+|(2, 2, 1)
+|(3, 2, 1)
+|(3, 3, 1)
+|(4, 3, 1)
+|(5, 4, 2)
+|(5, 5, 2)
+|(6, 5, 2)
+|(9, 7, 3)
+|}
+===== ((2/1, 6/5)[4], 10/9: 100/99, 385/384)[8] Supermagic =====
+{| class="wikitable"
+!Step signature
+!Steps in JI
+!Step sizes in cents
+|-
+|4L 3M 1s
+|10/9~11/10, 27/25~35/32~12/11, 25/24~36/35~33/32
+|173.1413, 149.5159, 58.8799
+|}
+{| class="wikitable"
+|+
+!Mode number
+!Mode as simplest JI pre-image
+!Step pattern
+!Porcupine[8]
+step pattern and UDP
+!Diminished[8]
+step pattern and UDP
+|-
+|4
+|~ 10/9 6/5 4/3 16/11 8/5 7/4 35/18 2/1
+|LMLMLMLs
+|<nowiki>LLLLLLLs 7|0</nowiki>
+|<nowiki>LsLsLsLs 1|0 (4)</nowiki>
+|-
+|3
+|~ 10/9 6/5 4/3 16/11 8/5 5/3 11/6 2/1
+|LMLMLsLM
+|<nowiki>LLLLLsLL 5|2</nowiki>
+|<nowiki>LsLsLsLs 1|0 (4)</nowiki>
+|-
+|2
+|~ 12/11 6/5 21/16 16/11 63/40 7/4 9/5 2/1
+|MLMLMLsL
+|<nowiki>LLLLLLsL 6|1</nowiki>
+|<nowiki>sLsLsLsL 0|1 (4)</nowiki>
+|-
+|1
+|~ 10/9 6/5 4/3 11/8 32/21 5/3 11/6 2/1
+|LMLsLMLM
+|<nowiki>LLLsLLLL 3|4</nowiki>
+|<nowiki>LsLsLsLs 1|0 (4)</nowiki>
+|-
+| -1
+|~ 12/11 6/5 21/16 16/11 3/2 5/3 9/5 2/1
+|MLMLsLML
+|<nowiki>LLLLsLLL 4|3</nowiki>
+|<nowiki>sLsLsLsL 0|1 (4)</nowiki>
+|-
+| -2
+|~ 10/9 8/7 44/35 11/8 32/21 5/3 11/6 2/1
+|LsLMLMLM
+|<nowiki>LsLLLLLL 1|6</nowiki>
+|<nowiki>LsLsLsLs 1|0 (4)</nowiki>
+|-
+| -3
+|~ 12/11 6/5 5/4 11/8 3/2 5/3 9/5 2/1
+|MLsLMLML
+|<nowiki>LLsLLLLL 2|5</nowiki>
+|<nowiki>sLsLsLsL 0|1 (4)</nowiki>
+|-
+| -4
+|~ 25/24 8/7 5/4 11/8 3/2 5/3 9/5 2/1
+|sLMLMLML
+|<nowiki>sLLLLLLL 0|7</nowiki>
+|<nowiki>sLsLsLsL 0|1 (4)</nowiki>
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode 4)
+!Equivalence
+!Step pattern
+!Scale
+!Comma list
+|-
+|L = M
+|LLLLLLLs
+|Porcupine[8]
+|55/54, 64/63, 100/99
+|}
+{| class="wikitable"
+|+Rank-1 temperings
+!ET
+|15
+|19
+|22
+|26
+|34
+|37
+|41
+|63
+|-
+!Step sizes in ET
+|(2, 2, 1)
+|(3, 2, 1)
+|(3, 3, 1)
+|(4, 3, 1)
+|(5, 4, 2)
+|(5, 5, 2)
+|(6, 5, 2)
+|(9, 8, 3)
+|}
+===== ((2/1, 6/5)[4], 10/9: 100/99, 105/104, 144/143)[8] Supermagic =====
+{| class="wikitable"
+!Step signature
+!Steps in JI
+!Step sizes in cents
+|-
+|4L 3M 1s
+|10/9~11/10, 27/25~35/32~12/11~13/12, 25/24~36/35~33/32~27/26
+|176.3227, 145.4708, 58.3927
+|}
+{| class="wikitable"
+|+
+!Mode number
+!Mode as simplest JI pre-image
+!Step pattern
+!Porcupine[8]
+step pattern and UDP
+!Diminished[8]
+step pattern and UDP
+|-
+|4
+|~ 10/9 6/5 4/3 13/9 8/5 7/4 35/18 2/1
+|LMLMLMLs
+|<nowiki>LLLLLLLs 7|0</nowiki>
+|<nowiki>LsLsLsLs 1|0 (4)</nowiki>
+|-
+|3
+|~ 10/9 6/5 4/3 13/9 8/5 5/3 11/6 2/1
+|LMLMLsLM
+|<nowiki>LLLLLsLL 5|2</nowiki>
+|<nowiki>LsLsLsLs 1|0 (4)</nowiki>
+|-
+|2
+|~ 12/11 6/5 13/10 13/9 39/25 7/4 9/5 2/1
+|MLMLMLsL
+|<nowiki>LLLLLLsL 6|1</nowiki>
+|<nowiki>sLsLsLsL 0|1 (4)</nowiki>
+|-
+|1
+|~ 10/9 6/5 4/3 11/8 20/13 5/3 11/6 2/1
+|LMLsLMLM
+|<nowiki>LLLsLLLL 3|4</nowiki>
+|<nowiki>LsLsLsLs 1|0 (4)</nowiki>
+|-
+| -1
+|~ 12/11 6/5 13/10 13/9 3/2 5/3 9/5 2/1
+|MLMLsLML
+|<nowiki>LLLLsLLL 4|3</nowiki>
+|<nowiki>sLsLsLsL 0|1 (4)</nowiki>
+|-
+| -2
+|~ 10/9 8/7 44/35 11/8 20/13 5/3 11/6 2/1
+|LsLMLMLM
+|<nowiki>LsLLLLLL 1|6</nowiki>
+|<nowiki>LsLsLsLs 1|0 (4)</nowiki>
+|-
+| -3
+|~ 12/11 6/5 5/4 11/8 3/2 5/3 9/5 2/1
+|MLsLMLML
+|<nowiki>LLsLLLLL 2|5</nowiki>
+|<nowiki>sLsLsLsL 0|1 (4)</nowiki>
+|-
+| -4
+|~ 25/24 8/7 5/4 11/8 3/2 5/3 9/5 2/1
+|sLMLMLML
+|<nowiki>sLLLLLLL 0|7</nowiki>
+|<nowiki>sLsLsLsL 0|1 (4)</nowiki>
+|}
+{| class="wikitable"
+|+Rank-2 temperings (mode 4)
+!Equivalence
+!Step pattern
+!Scale
+!Comma list
+|-
+|L = M
+|LLLLLLLs
+|Porcupine[8]
+|40/39, 55/54, 64/63, 66/65
+|}
+{| class="wikitable"
+|+Rank-1 temperings
+!ET
+|15
+|19
+|22f
+|26
+|34
+|41
+|60
+|-
+!Step sizes in ET
+|(2, 2, 1)
+|(3, 2, 1)
+|(3, 3, 1)
+|(4, 3, 1)
+|(5, 4, 2)
+|(6, 5, 2)
+|(9, 7, 3)
+|}
+===== ((2/1, 6/5)[4], 10/9: 325/324)[8] (2.3.5.13 Marveltwin) =====
+{| class="wikitable"
+!Step signature
+!Steps in JI
+!Step sizes in cents
+|-
+|4L 3M 1s
+|10/9, 27/25~13/12, 25/24~27/26
+|180.4645c, 136.7099c, 68.1467c
+|}
+{| class="wikitable"
+!Mode number
+!Mode as simplest JI pre-image
+!Step pattern
+|-
+|4
+|~ 10/9 6/5 4/3 13/9 8/5 26/15 48/25 2/1
+|LMLMLMLs
+|-
+|3
+|~ 10/9 6/5 4/3 13/9 8/5 5/3 24/13 2/1
+|LMLMLsLM
+|-
+|2
+|~ 13/12 6/5 13/10 13/9 39/25 26/15 9/5 2/1
+|MLMLMLsL
+|-
+|1
+|~ 10/9 6/5 4/3 13/9 20/13 5/3 24/13 2/1
+|LMLsLMLM
+|-
+| -1
+|~ 13/12 6/5 13/10 13/9 3/2 5/3 9/5 2/1
+|MLMLsLML
+|-
+| -2
+|~ 10/9 15/13 50/39 18/13 20/13 5/3 24/13 2/1
+|LsLMLMLM
+|-
+| -3
+|~ 13/12 6/5 5/4 18/13 3/2 5/3 9/5 2/1
+|MLsLMLML
+|-
+| -4
+|~ 25/24 15/13 5/4 18/13 3/2 5/3 9/5 2/1
+|sLMLMLML
+|}
+{| class="wikitable"
+|+Rank-1 temperings
+!ET
+|12
+|15
+|19
+|22f
+|26
+|27e
+|29
+|31
+|34
+|41
+|46
+|53
+|72
+|87
+|-
+!Step sizes in ET
+|(2, 1, 1)
+|(2, 2, 1)
+|(3, 2, 1)
+|(3, 3, 1)
+|(4, 3, 1)
+|(4, 3, 2)
+|(4, 4, 1)
+|(5, 4, 1)
+|(5, 4, 2)
+|(6, 5, 2)
+|(7, 5, 3)
+|(8, 6, 3)
+|(11, 8, 4)
+|(13, 9, 5)
+|}
+===== ((2/1, 6/5)[4], 10/9: 100/99, 144/143)[8] (2.3.5.11.13 Ptolemismic) =====
+{| class="wikitable"
+!Step signature
+!Steps in JI
+!Step sizes in cents
+|-
+|4L 3M 1s
+|10/9~11/10, 27/25~12/11~13/12, 25/24~33/32~27/26
+|175.8918c, 142.7754c, 66.7663c
+|}
+{| class="wikitable"
+|+
+!Mode number
+!Mode as simplest JI pre-image
+!Step pattern
+!Mode in cents
+|-
+|4
+|~ 10/9 6/5 4/3 13/9 8/5 26/15 48/25 2/1
+|LMLMLMLs
+|175.892 318.667 494.559 637.334 813.226 956.002 1131.893 1198.660
+|-
+|3
+|~ 10/9 6/5 4/3 13/9 8/5 5/3 11/6 2/1
+|LMLMLsLM
+|175.892 318.667 494.559 637.334 813.226 879.993 1055.884 1198.660
+|-
+|2
+|~ 12/11 6/5 13/10 13/9 39/25 26/15 9/5 2/1
+|MLMLMLsL
+|142.775 318.667 461.443 637.334 780.120 956.002 1022.768 1198.660
+|-
+|1
+|~ 10/9 6/5 4/3 13/9 20/13 5/3 11/6 2/1
+|LMLsLMLM
+|175.892 318.667 494.559 561.325 737.218 879.993 1055.884 1198.660
+|-
+| -1
+|~ 12/11 6/5 13/10 13/9 3/2 5/3 9/5 2/1
+|MLMLsLML
+|142.775 318.667 461.443 637.334 704.101 879.993 1022.768 1198.660
+|-
+| -2
+|~ 10/9 15/13 50/39 11/8 20/13 5/3 11/6 2/1
+|LsLMLMLM
+|175.892 242.658 418.550 561.325 737.218 879.993 1055.884 1198.660
+|-
+| -3
+|~ 12/11 6/5 5/4 11/8 3/2 5/3 9/5 2/1
+|MLsLMLML
+|142.775 318.667 385.433 561.325 704.101 879.993 1022.768 1198.660
+|-
+| -4
+|~ 25/24 15/13 5/4 11/8 3/2 5/3 9/5 2/1
+|sLMLMLML
+|66.766 242.658 385.433 561.325 704.101 879.993 1022.768 1198.660
+|}
+{| class="wikitable"
+|+Rank-1 temperings
+!ET
+|12
+|15
+|19
+|22f
+|26
+|27e
+|29
+|34
+|41
+|-
+!Step sizes in ET
+|(2, 1, 1)
+|(2, 2, 1)
+|(3, 2, 1)
+|(3, 3, 1)
+|(4, 3, 1)
+|(4, 3, 2)
+|(4, 4, 1)
+|(5, 4, 2)
+|(6, 5, 2)
+|}
+==== (2/1, 6/5)[4], 10/9)[15] ====
+L 8m 3s = (16/15, 25/24, 648/625) = (111.7313, 70.6724, 62.5652)
+/24 10/9 125/108 6/5 5/4 4/3 25/18 36/25 3/2 8/5 5/3 216/125 9/5 48/25 2/1 as mLmsmLmsmLmsmLm
+m = s -> sLsssLsssLsssLs Hanson[15]; L = -> LLLsLLLsLLLsLLL Augmented[15] MODMOS; L = s -> sLsLsLsLsLsLsLs Porcupine[15];
+s = 0 -> ssLsLssLsssL Diminished[12] MODMOS; m = 0 -> sLLsLsL Dicot[7]; L = 0 -> Father[11].
+-ET: (2, 1, 1); 22-ET: (2, 1, 2); 26-ET: (3, 1, 2); 27-ET: (2, 2, 1); 29-ET: (3, 1, 3); 31-ET: (3, 2, 1); 34-ET: (3, 2, 2); 41-ET: (4, 2, 3); 46-ET: (4, 3, 2); 53-ET: (5, 3, 3); 72-ET: (7, 4, 4); 87-ET: (8, 5, 5)
+===== (2/1, 6/5)[4], 10/9: 875/864)[15] Supermagic =====
+L 3m 8s = (16/15, 648/625~21/20, 25/24~36/35)
+~ 25/24 10/9 8/7 6/5 5/4 4/3 25/18 35/24 3/2 8/5 5/3 7/4 9/5 48/25 2/1 as sLsmsLsmsLsmsLs
+-ET: (1,1,1); 19-ET: (2, 1, 1); 22-ET: (2, 2, 1); 26-ET: (3, 2, 1); 34-ET: (3, 2, 2); 37-ET: (3, 3, 2); 41-ET: (4, 3, 2); 60-ET: (6, 4, 3)
+===== (2/1, 6/5)[4], 10/9: 100/99, 385/384)[15] Supermagic =====
+L 3m 8s = (16/15, 648/625~21/20~128/121, 25/24~36/35~33/32)
-~ 16/15 5/4 4/3 3/2 8/5 15/8 as sLsMsLs
+~ 25/24 10/9 8/7 6/5 5/4 4/3 11/8 16/11 3/2 8/5 5/3 7/4 9/5 48/25 2/1 as sLsmsLsmsLsmsLs
-tempers to sLsLsLs Dicot[7], sLsssLs Pelogic[7], LLLsLLL Enipucrop[7]
+-ET: (1,1,1); 19-ET: (2, 1, 1); 22-ET: (2, 2, 1); 26-ET: (3, 2, 1); 34-ET: (3, 2, 2); 37-ET: (3, 3, 2); 41-ET: (4, 3, 2); 63-ET: (6, 5, 3)
-==== [[SNS (2/1, 3/2, 5/4)-10|(2/1, 3/2, 5/4)[10]]] ====
+===== (2/1, 6/5)[4], 10/9: 100/99, 105/104, 144/143)[15] Supermagic =====
-L 7m 1s = (1125/1024, 16/15, 135/128)
+L 3m 8s = (16/15, 648/625~21/20~128/121~26/25, 25/24~36/35~33/32~27/26)
-/15 75/64 5/4 4/3 45/32 3/2 8/5 128/75 15/8 as mLmmsmmLmm
+~ 25/24 10/9 8/7 6/5 5/4 4/3 11/8 13/9 3/2 8/5 5/3 7/4 9/5 48/25 2/1 as sLsmsLsmsLsmsLs
-tempers to sLsssssLss Srutal[10] MODMOS, LsLLsLLsLL Dicot[10],
+-ET: (1,1,1); 19-ET: (2, 1, 1); 22f-ET: (2, 2, 1); 26-ET: (3, 2, 1); 34-ET: (3, 2, 2); 37-ET: (3, 3, 2); 41-ET: (4, 3, 2); 60-ET: (6, 4, 3)
-=====[[SNS (2/1, 3/2, 5/4: 225/224)-10|(2/1, 3/2, 5/4: 225/224)[10]]]=====
+===== (2/1, 6/5)[4], 10/9: 325/324)[15] (2.3.5.13 Marveltwin) =====
-L 7M 1s = (35/32~49/45, 16/15~15/14, 135/128~21/20) = (151.8041c, 116.0124c, 84.9028c) TE
+L 3m 8s = (16/15, 648/625~26/25, 25/24~27/26) = (112.3178, 68.5631, 68.1467)
-~ 16/15 7/6 5/4 4/3 7/5 3/2 8/5 7/4 15/8 as mLmmsmmLmm
+~ 25/24 10/9 15/13 6/5 5/4 4/3 18/13 13/9 3/2 8/5 5/3 26/15 9/5 48/25 2/1 as sLsmsLsmsLsmsLs
-tempers to sLsssssLss Pajara[10] MODMOS, LsLLsLLsLL Dicot[10]
+d-ET: (1,1,1); 19-ET: (2, 1, 1); 22f-ET: (2, 2, 1); 26-ET: (3, 2, 1); 27-ET: (2, 2, 1); 29-ET: (3, 3, 1); 31-ET: (3, 1, 2); 34-ET: (3, 2, 2); 41-ET: (4, 3, 2); 46-ET: (4, 2, 3); 53-ET: (5, 3, 3); 72-ET: (7, 4, 4); 87-ET: (8, 5, 5)
-=====[[SNS (2/1, 3/2, 5/4: 225/224, 385/384)-10|(2/1, 3/2, 5/4: 225/224, 385/384)[10]]]=====
+===== (2/1, 6/5)[4], 10/9: 105/104, 325/324)[15] 2.3.5.7.13 Supermagic =====
-L 1M 7s = (35/32~49/45~12/11, 16/15~15/14, 135/128~21/20) = (151.4797c, 116.1327c, 84.7519c) TE
+L 3m 8s = (16/15, 648/625~21/20~26/25, 25/24~36/35~27/26) = (121.6150, 81.3115, 58.8960)
-~ 16/15 7/6 5/4 4/3 7/5 3/2 8/5 7/4 15/8 as mLmmsmmLmm
+~ 25/24 10/9 8/7 6/5 5/4 4/3 18/13 13/9 3/2 8/5 5/3 7/4 9/5 48/25 2/1 as sLsmsLsmsLsmsLs
-=====[[SNS (2/1, 3/2, 5/4: 225/224, 441/440)-10|(2/1, 3/2, 5/4: 225/224, 441/440)[10]]]=====
+-ET: (1,1,1); 19-ET: (2, 1, 1); 22f-ET: (2, 2, 1); 26-ET: (3, 2, 1); 34-ET: (3, 2, 2); 37-ET: (3, 3, 2); 41-ET: (4, 3, 2); 60-ET: (6, 4, 3)
-L 7m 1s = (35/32~49/45, 16/15~15/14, 135/128~21/20~22/21) = (150.229c, 116.7669c, 82.9601c) TE
+===== (2/1, 6/5)[4], 10/9: 100/99, 144/143)[15] (2.3.5.11.13 Ptolemismic) =====
+L 3m 8s = (16/15, 648/625~128/121~26/25, 25/24~33/32~27/26) = (109.1256, 76.0091, 66.7663) ⟨109.12557, 76.00911, 66.76626]
-~ 16/15 7/6 5/4 4/3 7/5 3/2 8/5 7/4 15/8 as mLmmsmmLmm
+~ 25/24 10/9 15/13 6/5 5/4 4/3 11/8 13/9 3/2 8/5 5/3 26/15 9/5 48/25 2/1 as sLsmsLsmsLsmsLs
-==== [[SNS (2/1, 3/2, 5/4: 225/224)-19|(2/1, 3/2, 5/4: 225/224)[19]]] ====
+-ET: (1, 1, 1); 19-ET: (2, 1, 1); 22f-ET: (2, 2, 1); 26-ET: (3, 2, 1); 27e-ET: (2, 1, 2); 29-ET: (3, 3, 1); 34-ET: (3, 2, 2); 41-ET: (4, 3, 2)
-L 2M 7s = (135/128~21/20, 25/24~28/27, 64/63~50/49) = (84.9028c, 66.9013c, 31.1096c) TE
+==2.3.5; [[Hemifamity family#Hemifamity|Hemifamity]] ==
+===((2/1, 3/2)[5], 10/9)===
+====[[SNS ((2/1, 3/2)-5, 10/9)-10|((2/1, 3/2)[5], 10/9)[10]]]====
+L 2M 3s = (10/9, 16/15, 81/80)
-~ 21/20 16/15 9/8 8/7 6/5 5/4 21/16 4/3 7/5 10/7 3/2 32/21 8/5 5/3 7/4 15/8 40/21 as LsLsLMLsLsLsLMLsLsL
+/80 9/8 6/5 4/3 27/20 3/2 8/5 16/9 9/5 2/1 as sLMLsLMLsL
-tempers to LsLsLLLsLsLsLLLsLsL Meantone[19] MODMOS, LsLsLsLsLsLsLsLsLsL Negri[19]
+L = M -> sLLLsLLLsL Dicot[10] MODMOS; M = s -> sLsLsLsLsL Blackwood[10]; L = s -> ssLsssLsss Supersharp[10] MODMOS;
-=====[[SNS (2/1, 3/2, 5/4: 225/224, 385/384)-19|(2/1, 3/2, 5/4: 225/224, 385/384)[19]]]=====
+L - M = M - s -> dLsLdLsLdL Srutal[10] MODMOS
-L 2M 7s = (135/128~21/20, 25/24~28/27, 64/63~50/49~55/54) = (84.7519c, 66.7278c, 31.3808c) TE
-~ 21/20 16/15 9/8 8/7 6/5 5/4 21/16 4/3 7/5 10/7 3/2 32/21 8/5 5/3 7/4 15/8 40/21 as LsLsLMLsLsLsLMLsLsL
+s = 0 -> LsLLsLL Meantone[7]; M = 0 -> sLLsLLsL Father[8]
+====[[SNS ((2/1, 3/2)-5, 10/9: 5120/5103)-17|((2/1, 3/2)[5], 10/9: 5120/5103)[17] (Hemifamity)]]====
+L 2m 10s = (~35/32, 256/243~21/20, 81/80~64/63) = (153.2376c, 85.8342c, 24.4931c) TE
-tempers to LsLsLLLsLsLsLLLsLsL Meanpop[19] MODMOS, LsLsLsLsLsLsLsLsLsL Negri[19]
+~ 64/63 10/9 9/8 32/27 6/5 21/16 4/3 27/20 40/27 3/2 32/21 5/3 27/16 16/9 9/5 63/32 2/1 as sLsmsLssLssLsmsLs
-=====[[SNS (2/1, 3/2, 5/4: 225/224, 441/440)-19|(2/1, 3/2, 5/4: 225/224, 441/440)[19]]]=====
+m = s -> sLsssLssLssLsssLs; L = m -> sLsLsLssLssLsLsLs; L = s -> sssLsssssssssLsss;
-L 2M 7s = (135/128~21/20~22/21, 25/24~28/27, 64/63~50/49~45/44~56/55) = (82.9601c, 67.2689c, 33.8068c) TE
-~ 21/20 16/15 9/8 8/7 6/5 5/4 21/16 4/3 7/5 10/7 3/2 32/21 8/5 5/3 7/4 15/8 40/21 as LsLsLMLsLsLsLMLsLsL
+L - m = m - s -> Garibaldi[17]; s = 0 -> LsLLLsL Dominant[7]; m = 0 -> sLssLssLssLssLs
+=====[[SNS ((2/1, 3/2)-5, 10/9: 385/384, 2200/2187)-17|((2/1, 3/2)[5], 10/9: 385/384, 2200/2187)[17] (Akea)]]=====
+L 2m 10s = (35/32~12/11, 256/243~21/20, 81/80~64/63~55/54) = (156.6236c, 85.7981c, 26.2356c) TE
-tempers to LsLsLLLsLsLsLLLsLsL Meantone[19] MODMOS, LsLsLsLsLsLsLsLsLsL Negroni[19]
+~ 64/63 10/9 9/8 32/27 6/5 21/16 4/3 27/20 40/27 3/2 32/21 5/3 27/16 16/9 9/5 63/32 2/1 as sLsmsLssLssLsmsLs
-==== [[SNS (2/1, 3/2, 5/4: 225/224, 441/440)-31|(2/1, 3/2, 5/4: 225/224, 441/440)[31]]] ====
+m = s -> sLsssLssLssLsssLs; L = m -> sLsLsLssLssLsLsLs; L = s -> sssLsssssssssLsss; s = 0 -> LsLLLsL Arnold[7]; m = 0 -> sLssLssLssLssLs
-L+19m+2s = (~33/32, 64/63~50/49~45/44~56/55, 49/48~55/54) = (49.1533c, 33.8068c, 33.4621c) TE
+====[[SNS ((2/1, 3/2)-5, 10/9: 5120/5103)-24|((2/1, 3/2)[5], 10/9: 5120/5103)[24] (Hemifamity)]]====
+L 2m 17s = (~175/162, ~28/27, 81/80~64/63) = (132.1305c, 61.3411c, 24.4931c) TE
-~ 50/49 22/21 16/15 12/11 9/8 8/7 7/6 6/5 27/22 5/4 14/11 21/16 4/3 15/11 7/5 10/7 22/15 3/2 32/21 11/7 8/5 44/27 5/3 12/7 7/4 16/9 11/6 15/8 21/11 49/25 2/1
+~ 64/63 35/32 10/9 9/8 7/6 32/27 6/5 35/27 21/16 4/3 27/20 35/24 40/27 3/2 32/21 105/64 5/3 27/16 7/4 16/9 9/5 35/18 63/32 2/1 as sLssmssLsssLsssLssmssLss
-as mLmmLmsmLmmLmmLmLmmLmmLmsmLmmLm
+m = s -> sLsssssLsssLsssLsssssLss Immunity[24] MODMOS; L = m -> sLssLssLsssLsssLssLssLss; L = s -> LLLLsLLLLLLLLLLLLLsLLLLL; s = 0 -> LsLLLsL Dominant[7]
+=====[[SNS ((2/1, 3/2)-5, 10/9: 385/384, 2200/2187)-24|((2/1, 3/2)[5], 10/9: 385/384, 2200/2187)[24] (Akea)]]=====
+L 2m 17s = (~175/162, ~28/27, 81/80~64/63~55/54) = (127.002c, 59.5625c, 26.2356c) TE
+~ 64/63 12/11 10/9 9/8 7/6 32/27 6/5 35/27 21/16 4/3 27/20 16/11 40/27 3/2 32/21 18/11 5/3 27/16 7/4 16/9 9/5 35/18 63/32 2/1 as sLssmssLsssLsssLssmssLss
+m = s -> sLsssssLsssLsssLsssssLss Immunity[24] MODMOS; L = m -> sLssLssLsssLsssLssLssLss; L = s -> LLLLsLLLLLLLLLLLLLsLLLLL; s = 0 -> LsLLLsL Arnold[7]
+====[[SNS ((2/1, 3/2)-5, 10/9: 5120/5103)-31|((2/1, 3/2)[5], 10/9: 5120/5103)[31] (Hemifamity)]]====
+L 2m 24s = (~1225/1152, ~49/48, 81/80~64/63) = (107.6374c, 36.848c, 24.4931c) TE
+~ 64/63 36/35 35/32 10/9 9/8 8/7 7/6 32/27 6/5 128/105 35/27 21/16 4/3 27/20 48/35 35/24 40/27 3/2 32/21 54/35 105/64 5/3 27/16 12/7 7/4 16/9 9/5 64/35 35/18 63/32 2/1 as ssLsssmsssLssssLssssLsssmsssLss
+m = s -> ssLsssssssLssssLssssLsssssssLss Rodan[31] MODMOS; L = m -> ssLsssLsssLssssLssssLsssLsssLss; L = s -> LLLLLLsLLLLLLLLLLLLLLLLsLLLLLLL;
-tempers to sLssLsssLssLssLsLssLssLsssLssLs Miracle[31] MODMOS, LLLLLLLsLLLLLLLLLLLLLLLLLsLLLLLL Tritonic[31] MODMOS, sLssLsLsLssLssLsLssLssLsLsLssLs Meantone[31] MODMOS
+s = 0 -> LsLLLsL Dominant[7]; m = 0 -> ssLssssssLssssLssssLssssssLss Immunity[29] MODMOS
+=====[[SNS ((2/1, 3/2)-5, 10/9: 385/384, 2200/2187)-31|((2/1, 3/2)[5], 10/9: 385/384, 2200/2187)[31] (Akea)]]=====
+L 2m 24s = (~35/33, 49/48~56/55, 81/80~64/63~55/54) = (100.7664c, 33.3269c, 26.2356c) TE
-=== ((2/1, 5/4)[3], 16/15) ===
+~ 64/63 36/35 12/11 10/9 9/8 8/7 7/6 32/27 6/5 11/9 35/27 21/16 4/3 27/20 11/8 16/11 40/27 3/2 32/21 54/35 18/11 5/3 27/16 12/7 7/4 16/9 9/5 11/6 35/18 63/32 2/1 as ssLsssmsssLssssLssssLsssmsssLss
-==== [[SNS ((2/1, 5/4)-3, 16/15)-6|((2/1, 5/4)[3], 16/15)[6]]] ====
+m = s -> ssLsssssssLssssLssssLsssssssLss Rodan[31] MODMOS; L = m -> ssLsssLsssLssssLssssLsssLsssLss, L = s -> LLLLLLsLLLLLLLLLLLLLLLLsLLLLLLL;
-L 2M 3s = (6/5, 75/64, 16/15)
-/64 5/4 3/2 8/5 15/8 2/1 as MsLsMs
+s = 0 -> LsLLLsL Arnold[7]; m = 0 -> ssLssssssLssssLssssLssssssLss
+===((2/1, 3/2)[12], 81/80) or ((2/1, 3/2)[12], 64/63) ===
+====[[SNS ((2/1, 3/2)-12, 64/63: 5120/5103)-24|((2/1, 3/2)[12], 64/63: 5120/5013)[24] (Hemifamity)]]====
+L 7M 12s = (~135/128, ~28/27, 81/80~64/63) = (95.2825c, 61.3411c, 24.4931c) TE
-tempers to LsLsLs Augmented[6], ssLsss Enipucrop[6], LsssLs Antitonic[6] MODMOS
+~ 64/63 15/14 243/224 9/8 8/7 32/27 6/5 81/64 9/7 4/3 27/20 10/7 81/56 3/2 32/21 45/28 80/49 27/16 12/7 16/9 9/5 243/128 27/14 2/1 as sLsMsMsLsMsLsMsLsMsMsLsM
-=====[[SNS ((2/1, 5/4)-3, 16/15: 225/224)-6|((2/1, 5/4)[3], 16/15: 225/224)[6]]]=====
+L = M -> sLsLsLsLsLsLsLsLsLsLsLsLsL; M = s -> sLsssssLsssLsssLsssssLss Immunity[24] MODMOS; L = s -> sssLsLsssLsssLsssLsLsssL; s = 0 -> LssLsLsLssLs Dominant[12]
-L 2M 3s = (6/5, 75/64~7/6, 16/15~15/14) = (316.9276c, 267.8165c, 116.0124c) TE
+=====[[SNS ((2/1, 3/2)-12, 64/63: 441/440, 896/891)-24|((2/1, 3/2)[12], 64/63: 441/440, 896/891)[24] (Pele)]]=====
+L 7M 12s = (135/128~35/33, 28/27~33/32, 81/80~64/63~99/98) = (97.5911c, 58.2557c, 25.3165c) TE
-~ 7/6 5/4 3/2 8/5 15/8 2/1 as MsLsMs
+~ 64/63 15/14 12/11 9/8 8/7 32/27 6/5 14/11 9/7 4/3 27/20 10/7 16/11 3/2 32/21 45/28 18/11 27/16 12/7 16/9 9/5 12/11 27/14 2/1 as sLsMsMsLsMsLsMsLsMsMsLsM
-==== [[SNS ((2/1, 5/4)-3, 16/15)-9|((2/1, 5/4)[3], 16/15)[9]]] ====
+L = M -> sLsLsLsLsLsLsLsLsLsLsLsLsL; M = s -> sLsssssLsssLsssLsssssLss Immunity[24] MODMOS; L = s -> sssLsLsssLsssLsssLsLsssL; s = 0 -> LssLsLsLssLs Dominant[12]
-L 2M 6s = (9/8, 1125/1024, 16/15)
+====[[SNS ((2/1, 3/2)-12, 64/63: 5120/5013)-36|((2/1, 3/2)[12], 64/63: 5120/5013)[36] (Hemifamity)]]====
+L 7M 12s = (~25/24, ~49/48, 81/80~64/63) = (70.7894c, 36.848c, 24.4931c) TE
-/15 75/64 5/4 4/3 3/2 8/5 128/75 15/8 2/1 as sMssLssMs
+~ 64/63 36/35 15/14 243/224 54/49 9/8 8/7 81/70 32/27 6/5 128/105 81/64 9/7 64/49 4/3 27/20 48/35 10/7 81/56 72/49 3/2 32/21 54/35 45/28 80/49 81/49 27/16 12/7 243/140 16/9 9/5 64/35 243/128 27/14 96/49 2/1 as ssLssMssMssLssMssLssMssLssMssMssLssM
-tempers to sLssLssLs Augmented[9], ssssLssss Negri[9], sLsssssLs Mavila[9] MODMOS
+L = M -> ssLssLssLssLssLssLssLssLssLssLssLssLssL; M = s -> ssLssssssssLsssssLsssssLssssssssLsss Rodan[36] MODMOS; L = s -> sssssLssLsssssLsssssLsssssLssLsssssL;
-=====[[SNS ((2/1, 5/4)-3, 16/15: 225/224)-9|((2/1, 5/4)[3], 16/15: 225/224)[9]]]=====
+s = 0 -> LssLsLsLssLs Dominant[12]; m = 0 -> ssLssssssLssssLssssLssssssLsss Immunity[29] MODMOS
-L 2M 6s = (~9/8, 35/32~49/45, 16/15~15/14) = (200.9152c, 151.8041c, 116.0124c) TE
+=====[[SNS ((2/1, 3/2)-12, 64/63: 441/440, 896/891)-36|((2/1, 3/2)[12], 64/63: 441/440, 896/891)[36] (Pele)]]=====
+L 7M 12s = (~25/24, ~49/48, 81/80~64/63~99/98) = (72.2746c, 32.9392c, 25.3165c) TE
-~ 16/15 7/6 5/4 4/3 3/2 8/5 12/7 15/8 2/1 as sMssLssMs
+~ 64/63 36/35 15/14 12/11 54/49 9/8 8/7 64/55 32/27 6/5 128/105 14/11 9/7 64/49 4/3 27/20 48/35 10/7 16/11 72/49 3/2 32/21 54/35 45/28 18/11 81/49 27/16 12/7 96/55 16/9 9/5 64/35 22/21 27/14 96/49 2/1 as ssLssMssMssLssMssLssMssLssMssMssLssM
-tempers to sLssLssLs August[9], ssssLssss Negri[9], sLsssssLs Pelogic[9] MODMOS
+L = M -> ssLssLssLssLssLssLssLssLssLssLssLssLssL; M = s -> ssLssssssssLsssssLsssssLssssssssLsss Rodan[36] MODMOS; L = s -> sssssLssLsssssLsssssLsssssLssLsssssL;
-=====[[SNS ((2/1, 5/4)-3, 16/15: 225/224, 385/384)-9|((2/1, 5/4)[3], 16/15: 225/224, 385/384)[9]]]=====
+s = 0 -> LssLsLsLssLs Dominant[12]; m = 0 -> ssLssssssLssssLssssLssssssLsss Immunity[29] MODMOS
-L 2M 6s = (~9/8, 35/32~49/45~12/11, 16/15~15/14) = (200.8846c, 151.4797c, 116.1327c) TE
-~ 16/15 7/6 5/4 4/3 3/2 8/5 12/7 15/8 2/1 as sMssLssMs
+==2.3.25==
+===(2/1, 3/2, 100/81)===
+====(2/1, 3/2, 100/81)[7]====
+=====(2/1, 3/2, 100/81: 4375/4374)[7] (Ragismic)=====
+{| class="wikitable"
+!Step signature
+!Steps in JI
+!Step sizes in cents
+|-
+|2L 1m 4s
+|(2500/2187~8/7, ~9/8, ~27/25)
+|(231.1884c, 203.974c, 133.4123c)
+|}
+{| class="wikitable"
+!Mode number
+!Mode in JI
+!Step pattern
+![[Mode height]]
+|-
+|  -3
+|~ 9/8 175/144 25/18 3/2 81/50 50/27 2/1
+|msLssLs
+|  0.0158
+|-
+|  -2
+|~ 27/25 175/144 21/16 3/2 81/50 7/4 2/1
+|smsLssL
+|  -0.0211
+|-
+|  -1
+|~ 8/7 100/81 25/18 3/2 12/7 50/27 2/1
+|LsmsLss
+|  0.037
+|-
+|  0
+|~ 27/25 100/81 4/3 3/2 81/50 50/27 2/1
+|sLsmsLs
+|  0
+|-
+|  1
+|~ 27/25 7/6 4/3 36/25 81/50 7/4 2/1
+|ssLsmsL
+|  -0.037
+|-
+|  2
+|~ 8/7 100/81 4/3 32/21 288/175 50/27 2/1
+|LssLsms
+|  0.0211
+|-
+|  3
+|~ 27/25 100/81 4/3 36/25 288/175 16/9 2/1
+|sLssLsm
+|  -0.0158
+|}
-tempers to sLssLssLs August[9] , ssssLssss Negri[9], sLsssssLs Pelogic[9] MODMOS
+=====[[SNS_(2/1,_3/2,_100/81:_1225/1224,_1701/1700)-7|(2/1, 3/2, 100/81: 1225/1224, 1701/1700)[7]]]=====
+{| class="wikitable"
+!Step signature
+!Steps in JI
+!Step sizes in cents
+|-
+|2L 1m 4s
+|(2500/2187~8/7, ~9/8, ~27/25)
+|(231.5807c, 203.8094c, 133.2573c)
+|}
+{| class="wikitable"
+!Mode number
+!Mode in JI
+!Step pattern
+![[Mode height]]
+|-
+|  -3
+|~ 9/8 17/14 25/18 3/2 34/21 50/27 2/1
+|msLssLs
+|  0.0157
+|-
+|  -2
+|~ 27/25 17/14 21/16 3/2 34/21 7/4 2/1
+|smsLssL
+|  -0.0214
+|-
+|  -1
+|~ 8/7 21/17 25/18 3/2 12/7 50/27 2/1
+|LsmsLss
+|  0.0371
+|-
+|  0
+|~ 27/25 21/17 4/3 3/2 34/21 50/27 2/1
+|sLsmsLs
+|  0
+|-
+|  1
+|~ 27/25 7/6 4/3 36/25 34/21 7/4 2/1
+|ssLsmsL
+|  -0.0371
+|-
+|  2
+|~ 8/7 21/17 4/3 32/21 28/17 50/27 2/1
+|LssLsms
+|  0.0214
+|-
+|  3
+|~ 27/25 21/17 4/3 36/25 28/17 16/9 2/1
+|sLssLsm
+|  -0.0157
+|}
-==== [[SNS ((2/1, 5/4)-3, 16/15: 225/224)-12|((2/1, 5/4)[3], 16/15: 225/224)[12]]] ====
+==2.5.9; Marvel ==
-L 1M 2s = (16/15~15/14, 135/128~21/20, ~49/48) = (116.0124c, 84.9028c, 35.7917c) TE
+=== ((2/1, 5/4)[3], 9/8)===
+====[[SNS ((2/1, 5/4)-3, 9/8)-6|((2/1, 5/4)[3], 9/8)[6]]]====
+L 3M 2s = (256/225, 9/8, 10/9)
-~ 16/15 35/32 7/6 5/4 4/3 7/5 3/2 8/5 12/7 7/4 15/8 2/1 as LsLLLMLLLsLL
+/8 5/4 45/32 8/5 9/5 2/1 as MsMLMs
-tempers to LsLLLLLLLsLL Pajara[12] MODMOS, LsLLLsLLLsLLs August[12], sssssLssssss Passion[12]
+L = M -> LsLLLs; M = s -> sssLss; L = s -> LsLsLs
+=====[[SNS ((2/1, 5/4)-3, 9/8: 225/224)-6|((2/1, 5/4)[3], 9/8: 225/224)[6] (Marvel)]]=====
+L 3M 2s = (~8/7, 9/8~28/25, ~10/9) = (232.0248c, 200.9152c, 182.9137c) TE
-=====[[SNS ((2/1, 5/4)-3, 16/15: 225/224, 385/384)-12|((2/1, 5/4)[3], 16/15: 225/224, 385/384)[12]]]=====
+~ 9/8 5/4 7/5 8/5 9/5 2/1 as MLMsMs
-L 1M 2s = (16/15~15/14, 135/128~21/20, 49/48~45/44~56/55) = (116.1327c, 84.7519c, 35.347c) TE
-~ 16/15 12/11 7/6 5/4 4/3 7/5 3/2 8/5 12/7 7/4 15/8 2/1 as LsLLLMLLLsLL
+L = M -> LsLLLs; M = s -> sssLss; L = s -> LsLsLs
+=====[[SNS ((2/1, 5/4)-3, 9/8: 100/99, 225/224)-6|((2/1, 5/4)[3], 9/8: 100/99, 225/224)[6] (Apollo)]]=====
+L 3M 2s = (~8/7, 9/8~28/25, 10/9~11/10) = (229.792c, 206.94c, 174.6095c) TE
-tempers to LsLLLLLLLsLL Pajarous[12] MODMOS, LsLLLsLLLsLLs August[12], sssssLssssss Passion[12]
+~ 9/8 5/4 7/5 8/5 9/5 2/1 as MLMsMs
-==== [[SNS ((2/1, 5/4)-3, 16/15: 225/224, 385/384)-22|((2/1, 5/4)[3], 16/15: 225/224, 385/384)[22]]] ====
+L = M -> LsLLLs; M = s -> sssLss; L = s -> LsLsLs
-L 1m 12s = (~22/21, 36/35~33/32, 49/48~45/44~56/55) = (80.7857c, 49.4049c, 35.347c) TE
+====[[SNS ((2/1, 5/4)-3, 9/8)-10|((2/1, 5/4)[3], 9/8)[10]]]====
+L 1m 3s = (10/9, 128/125, 81/80)
-~ 49/48 16/15 12/11 49/44 7/6 105/88 5/4 14/11 4/3 15/11 7/5 63/44 3/2 49/32 8/5 18/11 12/7 7/4 98/55 15/8 21/11 2/1 as sLssLsLsLsmsLsLsLssLsL
+/9 9/8 5/4 25/18 45/32 25/16 8/5 16/9 9/5 2/1 as LsLLsLmLsL,
+m = s -> LsLLsLsLsL MODMOS; L = m -> LsLLsLLLsL; L = s -> LLLLLLsLLL; s = 0 -> LLLLsLL; m = 0 -> LsLLsLLsL
+=====[[SNS ((2/1, 5/4)-3, 9/8: 225/224)-10|((2/1, 5/4)[3], 9/8: 225/224)[10] (Marvel)]]=====
+L 1m 3s = (~10/9, 128/125~36/35, 81/80~126/125) = (182.9137c, 49.1111c, 18.0015c) TE
+~ 10/9 9/8 5/4 25/18 7/5 14/9 8/5 16/9 9/5 2/1 as LsLmLsLLsL
-tempers to sLssLsLsLsssLsLsLssLsL Orwell[22] MODMOS, sLssLsLsLsLsLsLsLssLsL Pajarous[22], MODMOS, LLLLLLLLLLsLLLLLLLLLLL Escapade[22]
+m = s -> LsLsLsLLsL MODMOS; L = m -> LsLLLsLLsL; L = s -> LLLsLLLLLL; s = 0 -> LLsLLLL; m = 0 -> LsLLsLLsL
+=====[[SNS ((2/1, 5/4)-3, 9/8: 100/99, 225/224)-10|((2/1, 5/4)[3], 9/8: 100/99, 225/224)[10] (Apollo)]]=====
+L 1m 3s = (10/9~11/10, 128/125~36/35~80/77, 81/80~126/125~45/44~56/55) = (174.6095c, 55.1825c, 32.3305c) TE
-=== ((2/1, 3/2)[5], 16/15) ===
+~10/9 9/8 5/4 11/8 7/5 14/9 8/5 16/9 9/5 2/1 as LsLmLsLLsL
-==== [[SNS ((2/1, 3/2)-5, 16/15)-10|((2/1, 3/2)[5], 16/15)[10]]] ====
+m = s -> LsLsLsLLsL MODMOS; L = m -> LsLLLsLLsL; L = s -> LLLsLLLLLL; s = 0 -> LLsLLLL; m = 0 -> LsLLsLLsL
-L 5m 3s = (10/9, 16/15, 135/128)
+====[[SNS ((2/1, 5/4)-3, 9/8)-17|((2/1, 5/4)[3], 9/8)[17]]]====
+L 10m 1s = (800/729, 81/80, 2048/2025)
-/128 9/8 5/4 4/3 45/32 3/2 5/3 16/9 15/8 2/1 as smLmsmLmsm
+/80 10/9 9/8 100/81 5/4 81/64 25/18 45/32 64/45 36/18 128/81 8/5 81/50 16/9 9/5 160/81 2/1 as mLmLmmLmsmLmmLmLm
-tempers to ssLsssLsss Srutal[10] MODMOS, sLLLsLLLsL Dicot[10] MODMOS, LsLsLsLsLs Blackwood[10]
+m = s -> sLsLssLsssLssLsLs MODMOS;  L = m -> LLLLLLLLsLLLLLLLL; L = s -> sLsLssLsLsLssLsLs; s = 0 -> sLsLssLssLssLsLs MODMOS; m = 0 -> LLLsLLL
+=====[[SNS ((2/1, 5/4)-3, 9/8: 225/224)-17|((2/1, 5/4)[3], 9/8: 225/224)[17] (Marvel)]]=====
+L 1m 10s = (~800/729, 2048/2025~64/63, 81/80~126/125) = (164.9122c, 31.1096c, 18.0015c) TE
-=====[[SNS ((2/1, 3/2)-5, 16/15: 225/224)-10|((2/1, 3/2)[5], 16/15: 225/224)[10]]]=====
+~ 81/80 10/9 9/8 100/81 5/4 81/64 25/18 7/5 10/7 36/25 128/81 8/5 81/50 16/9 9/5 160/81 2/1 as sLsLssLsmsLssLsLs
-L 5m 3s = (10/9, 16/15~15/14, 135/128~21/20) = (182.9137c, 116.0124c, 84.9028c) TE
-~ 21/20 9/8 5/4 4/3 7/5 3/2 5/3 16/9 15/8 2/1 as smLmsmLmsm
+m = s -> sLsLssLsssLssLsLs MODMOS;  L = m ->  sLsLssLsLsLssLsLs; L = s -> LLLLLLLLsLLLLLLLL; s = 0 -> LLLsLLL; m = 0 -> sLsLssLssLssLsLs MODMOS
+=====[[SNS ((2/1, 5/4)-3, 9/8: 100/99, 225/224)-17|((2/1, 5/4)[3], 9/8: 100/99, 225/224)[17] (Apollo)]]=====
+L 10m 1s = (~88/81, 81/80~126/125~45/44~56/55, 2048/2025~64/63~176/175) = (142.279c, 32.3305c, 22.852c) TE
-tempers to ssLsssLsss Pajara[10] MODMOS, sLLLsLLLsL Dicot[10] MODMOS
+~ 56/55 10/9 9/8 11/9 5/4 14/11 11/8 7/5 10/7 16/11 11/7 8/5 11/9 16/9 9/5 55/28 2/1 as mLmLmmLmsmLmmLmLm
-=====[[SNS ((2/1, 3/2)-5, 16/15: 225/224, 441/440)-10|((2/1, 3/2)[5], 16/15: 225/224, 441/440)[10]]]=====
+m = s -> sLsLssLsssLssLsLs Machine[17] MODMOS; L = m -> LLLLLLLLsLLLLLLLL; L = s -> sLsLssLsLsLssLsLs; s = 0 -> sLsLssLssLssLsLs MODMOS; m = 0 -> LLLsLLL
-L 5m 3s = (10/9, 16/15~15/14, 135/128~21/20~22/21) = (184.0358c, 116.7669c, 82.9601c) TE
+==2.5.9; Starling==
+===((2/1, 5/4)[3], 10/9)===
+====[[SNS ((2/1, 5/4)-3, 10/9)-6|((2/1, 5/4)[3], 10/9)[6]]]====
+L 2m 3s = (144/125, 9/8, 10/9)
-~ 21/20 9/8 5/4 4/3 7/5 3/2 5/3 16/9 15/8 2/1 as smLmsmLmsm
+/8 5/4 36/25 8/5 9/5 2/1 as msLsms
-tempers to ssLsssLsss Pajaric[10] MODMOS
+m = s -> ssLsss; L = m -> LsLsLs; L = s -> sLLLsL
+=====[[SNS ((2/1, 5/4)-3, 10/9: 126/125)-6|((2/1, 5/4)[3], 10/9: 126/125)[6]]]=====
+L 2m 3s = (~8/7, ~9/8, 10/9~28/25) = (232.1725c, 202.4685c, 187.562c) TE
-==== [[SNS ((2/1, 3/2)-5, 16/15)-17|((2/1, 3/2)[5], 16/15)[17]]] ====
+~ 9/8 5/4 10/7 8/5 9/5 2/1 as msLsms
-L 2M 5s = (135/128, 256/243, 2048/2025)
-/128 16/15 9/8 32/27 5/4 81/64 4/3 45/32 64/45 3/2 128/81 8/5 27/16 16/9 15/8 256/135 2/1 as LsLMLsLLsLLsLMLsL
+m = s -> ssLsss; L = m -> LsLsLs; L = s -> sLLLsL
+====[[SNS ((2/1, 5/4)-3, 10/9)-9|((2/1, 5/4)[3], 10/9)[9]]]====
+L 1m 2s = (10/9, 648/625, 81/80)
-tempers to LsLLLsLLsLLsLLLsL Helmholtz[17], LsLsLsLLsLLsLsLsL Dicot[17] MODMOS
+/9 9/8 5/4 25/18 36/25 8/5 16/9 9/5 2/1 as LsLLmLLsL
-=====[[SNS ((2/1, 3/2)-5, 16/15: 225/224)-17|((2/1, 3/2)[5], 16/15: 225/224)[17]]]=====
+m = s -> LsLLsLLsL; L = m -> LsLLLLLsL MODMOS; L = s -> LLLLsLLLL; s = 0 -> LLLsLLL; m = 0 -> LsLLLLsL MODMOS
-L 10M 5s = (256/243, 135/128~21/20, 2048/2025~50/49~64/63) = (98.0109c, 84.9028c, 31.1096)  TE
+=====[[SNS ((2/1, 5/4)-3, 10/9: 126/125)-9|((2/1, 5/4)[3], 10/9: 126/125)[9]]]=====
+L 1m 2s = (10/9~28/25, 648/625~36/35, 81/80~225/224) = (187.562c, 44.6105c, 14.9065c) TE
-~ 21/20 16/15 9/8 32/27 5/4 81/64 4/3 7/5 10/7 3/2 128/81 8/5 27/16 16/9 15/8 40/21 2/1 as MsMLMsMMsMMsMLMsM
+~ 10/9 9/8 5/4 7/5 10/7 8/5 16/9 9/5 2/1 as LsLLmLLsL
-tempers to LsLLLsLLsLLsLLLsL Garibaldi[17], LsLsLsLLsLLsLsLsL Dicot[17] MODMOS
+m = s -> LsLLsLLsL; L = m -> LsLLLLLsL MODMOS; L = s -> LLLLsLLLL; s = 0 -> LLLsLLL; m = 0 -> LsLLLLsL MODMOS
+====[[SNS ((2/1, 5/4)-3, 10/9: 126/126, 896/891)-16|((2/1, 5/4)[3], 10/9: 126/125, 896/891)[16]]]====
+L 1m 9s = (~11/10, 128/125~64/63~99/98, 81/80~225/224~56/55) = (163.6623c, 24.4284c, 21.4103c) TE
-=====[[SNS ((2/1, 3/2)-5, 16/15: 225/224, 441/440)-17|((2/1, 3/2)[5], 16/15: 225/224, 441/440)[17]]]=====
+~ 56/55 10/9 9/8 63/55 5/4 9/7 7/5 45/32 16/11 8/5 81/50 16/9 9/5 20/11 2/1 as sLssLsLsmsLsLssL
-L 10M 5s = (256/243~35/33, 135/128~21/20~22/21, 2048/2025~50/49~64/63~45/44~56/55) = (101.0757c, 82.9601c, 33.8068c) TE
-~ 22/21 16/15 9/8 32/27 5/4 81/64 4/3 7/5 10/7 3/2 128/81 8/5 27/16 16/9 15/8 21/11 2/1 as LsLmLsLLsLLsLmLsL
+m = s -> sLssLsLsssLsLssL; L = m -> sLssLsLsLsLsLssL; L = s -> LLLLLLLLsLLLLLLL; s = 0 -> LLLsLLL; m = 0 -> sLssLsLssLsLssL
+=====[[SNS ((2/1, 5/4)-3, 10/9: 91/90, 126/126, 896/891)-16|((2/1, 5/4)[3], 10/9: 91/90, 126/125, 896/891)[16]]]=====
+L 1m 9s = (~11/10, 128/125~64/63~99/98, 81/80~225/224~56/55~144/143) = (160.4106c, 30.0969c, 23.0825c) TE
-tempers to LsLLLsLLsLLsLLLsL Andromeda[17]
+~ 56/55 10/9 9/8 63/55 5/4 9/7 7/5 45/32 16/11 8/5 13/8 16/9 9/5 20/11 2/1 as sLssLsLsmsLsLssL
-==== [[SNS ((2/1, 3/2)-5, 16/15: 225/224, 441/440)-29|((2/1, 3/2)[5], 16/15: 225/224, 441/440)[29]]] ====
+m = s -> sLssLsLsssLsLssL; L = m -> sLssLsLsLsLsLssL; L = s -> LLLLLLLLsLLLLLLL; s = 0 -> LLLsLLL; m = 0 -> sLssLsLssLsLssL
-L 10m 17s = (25/24~28/27, ~33/32, 2048/2025~50/49~64/63~45/44~56/55) = (67.2689c, 49.1533c, 33.8068c) TE
+==2.3.7; [[Orwellismic family#Orwellismic|Orwellismic]]==
+===(2/1, 3/2, 7/6)===
+====[[SNS (2/1, 3/2, 7/6)-4|(2/1, 3/2, 7/6)[4]]]====
+L 2m 1s = (9/7, 7/6, 8/7)
-~ 50/49 22/21 16/15 11/10 9/8 8/7 33/28 6/5 5/4 14/11 21/16 4/3 15/11 7/5 10/7 22/15 3/2 32/21 11/7 8/5 5/3 56/33 7/4 16/9 20/11 15/8 21/11 49/25 2/1 as smsmssmsLsmssmsmssmsLsmssmsms
+/6 3/2 7/4 2/1 as mLms
-tempers to  ssssssssLsssssssssssLssssssss Tritonic[29] MODMOS, sLsLssLsLsLssLsLssLsLsLssLsLs Andromeda[29], LsLsLLsLLLsLLsLsLLsLLLsLLsLsL Negroni[29] MODMOS
+m = s -> sLss Sempahore[4]
+====[[SNS (2/1, 3/2, 7/6)-7|(2/1, 3/2, 7/6)[7]]]====
+L 1M 2s = (8/7, 9/8, 49/48)
-==== [[SNS ((2/1, 3/2)-5, 16/15: 225/224, 441/440)-41|((2/1, 3/2)[5], 16/15: 225/224, 441/440)[41]]] ====
+/7 7/6 4/3 3/2 12/7 7/4 2/1 as LsLMLsL
-L 2M 10s = (2048/2025~50/49~64/63~45/44~56/55, 49/48~55/54, ~121/120) = (33.8068c, 33.4621c, 15.3465c) TE
-~ 50/49 33/32 22/21 16/15 12/11 11/10 9/8 8/7 7/6 32/27 40/33 11/9 5/4 14/11 128/99 21/16 4/3 15/11 11/8 7/5 10/7 16/11 22/15 3/2 32/16 99/64 11/7 8/5 18/11 33/20 27/16 12/7 7/4 16/9 20/11 11/6 15/8 21/11 64/33 49/25 2/1 as LsLLLsLLMLLsLLLsLLsLLLsLLsLLLsLLMLLsLLLsL
+L = M -> LsLLLsL Archy[5]; s = 0 -> LLsLL Semaphore[5]
+=====[[SNS (2/1, 3/2, 7/6: 1728/1715)-7|(2/1, 3/2, 7/6: 1728/1715)[7] (Orwellismic)]]=====
+L 1M 2s = (~8/7, ~9/8, 49/48~36/35) = (227.1393c, 204.1935c, 43.334c) TE
-tempers to LsLLLsLLLLLsLLLsLLsLLLsLLsLLLsLLLLLsLLLsL Miracle[31] MODMOS, LsLLLsLLsLLsLLLsLLsLLLsLLsLLLsLLsLLsLLLsL Andromeda[31]
+~ 8/7 7/6 4/3 3/2 12/7 7/4 2/1 as LsLMLsL
-==== [[SNS ((2/1, 3/2)-5, 16/15: 225/224, 441/440)-72|((2/1, 3/2)[5], 16/15: 225/224, 441/440)[72]]] ====
+L = M -> LsLLLsL Superpyth[5]; s = 0 -> LLsLL Beep[5]
-L 2M 41s = (1344/1331~1350/1331, 100/99~245/242~896/891, ~121/120) = (18.4603c, 18.1156c, 15.3465c) TE
+====[[SNS (2/1, 3/2, 7/6: 1728/1715)-12|(2/1, 3/2, 7/6: 1728/1715)[12] (Orwellismic)]]====
+L 1M 7s = (~10/9, 54/49~35/32, 49/48~36/35) = (183.8053c, 160.8595c, 43.334c) TE
-as LssLsLsLssLsLsMsLsLssLsLsLssLsLssLsLsLssLsLssLsLsLssLsLsMsLsLssLsLsLssLs
+~ 36/35 8/7 7/6 6/5 4/3 48/35 3/2 54/35 12/7 7/4 9/5 2/1 as sLssLsMsLssL
-tempers to LssLsLsLssLsLsLsLsLssLsLsLssLsLssLsLsLssLsLssLsLsLssLsLsLsLsLssLsLsLssLs Marvolo[72] MODMOS, LssLsLsLssLsLsssLsLssLsLsLssLsLssLsLsLssLsLssLsLsLssLsLsssLsLssLsLsLssLs Miracle[72] MODMOS
+L = M -> sLssLsLsLssL Superpyth[12]; M = s -> sLssLsssLssL MODMOS; s = 0 -> LLsLL Beep[5]
+=====[[SNS (2/1, 3/2, 7/6: 99/98, 385/384)-12|(2/1, 3/2, 7/6: 99/98, 385/384)[12] (Orwellian)]]=====
+L 1M 7s = (~10/9, 54/49~35/32~12/11, 49/48~36/35~33/32) = (185.7619, 155.4288c, 155.4288c) TE
-== 2.3.5, Starling and Luyoyo ==
+~ 33/32 8/7 7/6 6/5 4/3 11/8 3/2 54/35 12/7 7/4 9/5 2/1 as sLssLsMsLssL
-=== (2/1, 3/2, 6/5) ===
+L = M -> sLssLsLsLssL Suprapyth[12]; M = s -> sLssLsssLssL MODMOS; s = 0 -> LLsLL Pentoid[5]
+=====[[SNS (2/1, 3/2, 7/6: 176/175, 540/539)-12|(2/1, 3/2, 7/6: 176/175, 540/539)[12] (Guanyin)]]=====
+L 1M 7s = (~10/9, 54/49~35/32~11/10, 49/48~36/35~45/44) = (183.8734c, 162.5743c, 43.0239c) TE
-==== [[SNS (2/1, 3/2, 6/5)-4|(2/1, 3/2, 6/5)[4]]] ====
+~ 36/35 8/7 7/6 6/5 4/3 15/11 3/2 54/35 12/7 7/4 9/5 2/1 as sLssLsMsLssL
-L 2M 1s = (5/4, 6/5, 10/9)
-/5 3/2 9/5 2/1 as MLMs
+L = M -> sLssLsLsLssL Superpyth[12]; M = s -> sLssLsssLssL MODMOS
+====[[SNS (2/1, 3/2, 7/6: 1728/1715)-17|(2/1, 3/2, 7/6: 1728/1715)[17] (Orwellismic)]]====
+L 1M 12s = (~160/147, ~15/14, 49/48~36/35) = (140.4713c, 117.5255c, 43.334c) TE
-tempers to LLLs Dicot[4], sLss Bug[4], LsLs Antitonic[4]
+~ 36/35 10/9 8/7 7/6 6/5 35/27 4/3 48/35 35/24 3/2 54/35 5/3 12/7 7/4 9/5 35/18 2/1 as sLsssLssMssLsssLs
-==== [[SNS (2/1, 3/2, 6/5)-7|(2/1, 3/2, 6/5)[7]]] ====
+L = M -> sLsssLssLssLsssLs Superpyth[17]; M = s -> sLsssLsssssLsssLs; s = 0 -> LLsLL Beep[5]
-L 4M 2S = (9/8, 10/9, 27/25)
+=====[[SNS (2/1, 3/2, 7/6: 99/98, 385/384)-17|(2/1, 3/2, 7/6: 99/98, 385/384)[17] (Orwellian)]]=====
+L 1M 12s = (~160/147, 15/14~35/33, 49/48~36/35~33/32) = (142.5744c, 112.2413c, 43.1875c) TE
-/9 6/5 4/3 3/2 5/3 9/5 2/1 as MsMLMsM
+~ 36/35 10/9 8/7 7/6 6/5 35/27 4/3 11/8 16/11 3/2 54/35 5/3 12/7 7/4 9/5 35/18 2/1 as sLsssLssMssLsssLs
-tempers to LsLLLsL Meantone[7], sssLsss Porcupine[7], LsLsLsL Dicot[7]
+L = M -> sLsssLssLssLsssLs Suprapyth[17]; M = s -> sLsssLsssssLsssLs; s = 0 -> LLsLL Pentoid[5]
+=====[[SNS (2/1, 3/2, 7/6: 176/175, 540/539)-17|(2/1, 3/2, 7/6: 176/175, 540/539)[17] (Guanyin)]]=====
+L 1M 12s = (~88/81, 15/14~77/72, 49/48~36/35~45/44) = (140.8495c, 119.5504c, 43.0239c) TE
-===== [[SNS (2/1, 3/2, 6/5: 126/125)-7|(2/1, 3/2, 6/5: 126/125)[7]]] =====
+~ 36/35 10/9 8/7 7/6 6/5 35/27 4/3 15/11 22/15 3/2 54/35 5/3 12/7 7/4 9/5 35/18 2/1 as sLsssLssMssLsssLs
-L 4M 2S = (~9/8, ~10/9, 27/25~15/14) = (202.4685c, 187.562c, 123.5395c) TE
-~ 10/9 6/5 4/3 3/2 5/3 9/5 2/1 as MsMLMsM
+L = M -> sLsssLssLssLsssLs Superpyth[17]; M = s -> sLsssLsssssLsssLs
+====[[SNS (2/1, 3/2, 7/6: 1728/1715)-22|(2/1, 3/2, 7/6: 1728/1715)[22] (Orwellismic)]]====
+L 1m 17s = (~200/189, ~25/24, 49/48~36/35) = (97.1373c, 74.1915c, 43.334c) TE
-tempers to LsLLLsL Meantone[7], sssLsss Opossum[7], LsLsLsL Flat[7]
+~ 36/35 21/20 10/9 8/7 7/6 6/5 49/40 35/27 4/3 48/35 7/5 35/24 3/2 54/27 63/40 5/3 12/7 7/4 9/5 147/80 35/18 2/1 as ssLssssLsssMsssLssssLs
-===== [[SNS (2/1, 3/2, 6/5: 100/99)-7|(2/1, 3/2, 6/5: 100/99)[7]]] =====
+m = s -> ssLssssLsssssssLssssLs Doublewide[22] MODMOS; L = m -> ssLssssLsssLsssLssssLs Superpyth[17]; s = 0 -> LLsLL Beep[5]
-L 4M 2S = (~9/8, 10/9~11/10, 27/25~12/11) = (209.7786c, 174.0549c, 146.6352c) TE
+=====[[SNS (2/1, 3/2, 7/6: 99/98, 385/384)-22|(2/1, 3/2, 7/6: 99/98, 385/384)[22] (Orwellian)]]=====
+L 1m 17s = (~200/189, 25/24~80/77, 49/48~36/35~33/32) = (99.3869c, 69.0538c, 43.1875c) TE
-~ 10/9 6/5 4/3 3/2 5/3 9/5 2/1 as msmLmsm
+~ 36/35 21/20 10/9 8/7 7/6 6/5 49/40 35/27 4/3 11/8 7/5 16/11 3/2 54/27 63/40 5/3 12/7 7/4 9/5 147/80 35/18 2/1 as ssLssssLsssMsssLssssLs
-tempers to sssLsss Porcupine[7], LsLLLsL Meanenneadecal[7], LsLsLsL Flat[7]
+m = s -> ssLssssLsssssssLssssLs Doublewide[22] MODMOS; L = m -> ssLssssLsssLsssLssssLs Suprapyth[17]; s = 0 -> LLsLL Pentoid[5]
+=====[[SNS (2/1, 3/2, 7/6: 176/175, 540/539)-22|(2/1, 3/2, 7/6: 176/175, 540/539)[22] (Guanyin)]]=====
+L 1m 17s = (~200/189, 25/24~22/21, 49/48~36/35~45/44) = (97.8256c, 76.5265c, 43.0239c) TE
-===== [[SNS (2/1, 3/2, 6/5: 56/55, 100/99)-7|(2/1, 3/2, 6/5: 56/55, 100/99)[7]]] =====
+~ 36/35 21/20 10/9 8/7 7/6 6/5 27/22 35/27 4/3 15/11 7/5 22/15 3/2 54/27 63/40 5/3 12/7 7/4 9/5 81/44 35/18 2/1 as ssLssssLsssmsssLssssLs
-L 4M 2S = (~9/8, 10/9~11/10, 27/25~15/14~12/11) = (215.4452c, 179.0856c, 132.5782c) TE
-~ 10/9 6/5 4/3 3/2 5/3 9/5 2/1 as MsMLMsM
+m = s -> ssLssssLsssssssLssssLs Fleetwood[22] MODMOS; L = m -> ssLssssLsssLsssLssssLs Superpyth[17]
+====[[SNS (2/1, 3/2, 7/6: 1728/1715)-27|(2/1, 3/2, 7/6: 1728/1715)[27] (Orwellismic)]]====
+L 22M 1s = (~250/243, 49/48~36/35, ~50/49) = (53.8033c, 43.334c, 30.8575c) TE
-tempers to LsLLLsL Meanenneadecal[7], sssLsss Opossum[7], LsLsLsL Flat[7]
+~ 36/35 21/20 160/147 10/9 8/7 7/6 6/5 49/40 80/63 35/27 4/3 48/35 7/5 10/7 35/24 3/2 54/27 63/40 80/49 5/3 12/7 7/4 9/5 147/80 40/21 35/18 2/1 as MMLMMMMMLMMMMsMMMMLMMMMMLMM
-==== [[SNS (2/1, 3/2, 6/5)-12|(2/1, 3/2, 6/5)[12]]] ====
+L = M -> LLLLLLLLLLLLLsLLLLLLLLLLLLL Quartonic[27]; M = s -> ssLsssssLsssssssssLsssssLss Myna[27] MODMOS; L = s -> ssLsssssLssssLssssLsssssLss Superpyth[27];
-L 1m 4s = (27/25, 25/24, 250/243)
-/243 10/9 6/5 100/81 4/3 25/18 3/2 125/81 5/3 9/5 50/27 2/1 as sLLsLmLsLLsL
+s = 0 -> ssLsssssLssssssssLsssssLss Doublewide[26] MODMOS; M = 0 -> LLsLL Beep[5]
+=====[[SNS (2/1, 3/2, 7/6: 99/98, 385/384)-27|(2/1, 3/2, 7/6: 99/98, 385/384)[27] (Orwellian)]]=====
+L 22M 1s = (~250/243, 49/48~36/35~33/32, 50/49~100/99) = (56.1994c, 43.1875c, 25.8663c) TE
-tempers to sLLsLsLsLLsL Meantone[12], sLLsLLLsLLsL Diminished[12] MODMOS, LLLLLsLLLLLL Ripple[12]
+~ 36/35 21/20 160/147 10/9 8/7 7/6 6/5 49/40 80/63 35/27 4/3 11/8 7/5 10/7 16/11 3/2 54/27 63/40 80/49 5/3 12/7 7/4 9/5 147/80 40/21 35/18 2/1 as MMLMMMMMLMMMMsMMMMLMMMMMLMM
-===== [[SNS (2/1, 3/2, 6/5: 126/125)-12|(2/1, 3/2, 6/5: 126/125)[12]]] =====
+L = M -> LLLLLLLLLLLLLsLLLLLLLLLLLLL Quartz[27]; M = s -> ssLsssssLsssssssssLsssssLss Myno[27] MODMOS; L = s -> ssLsssssLssssLssssLsssssLss Suprapyth[27];
-L 1m 4s = (27/25~15/14, 25/24~21/20, 250/243~28/27) = (123.5395c, 78.929c, 64.0225c) TE
-~ 28/27 10/9 6/5 56/45 4/3 7/5 3/2 14/9 5/3 9/5 28/15 2/1 as sLLsLmLsLLsL
+s = 0 -> ssLsssssLssssssssLsssssLss Doublewide[26] MODMOS; M = 0 -> LLsLL Pentoid[5]
+=====[[SNS (2/1, 3/2, 7/6: 176/175, 540/539)-27|(2/1, 3/2, 7/6: 176/175, 540/539)[27] (Guanyin)]]=====
+L 22M 1s = (~250/243, 49/48~36/35~45/44, 50/49~55/54) = (54.8017c, 43.0239c, 33.5026c) TE
-tempers to sLLsLsLsLLsL Meantone[12], sLLsLLLsLLsL Diminished[12] MODMOS
+~ 36/35 21/20 88/81 10/9 8/7 7/6 6/5 27/22 80/63 35/27 4/3 15/11 7/5 10/7 22/15 3/2 54/27 63/40 44/27 5/3 12/7 7/4 9/5 81/44 40/21 35/18 2/1 as mmLmmmmmLmmmmsmmmmLmmmmmLmm
-===== [[SNS (2/1, 3/2, 6/5: 126/125, 196/195)-12|(2/1, 3/2, 6/5: 126/125, 196/195)[12]]] =====
+m = s -> ssLsssssLsssssssssLsssssLss Myna[27] MODMOS; L = m -> LLLLLLLLLLLLLsLLLLLLLLLLLLL Quartonic[27]; L = s -> ssLsssssLssssLssssLsssssLss Superpyth[27];
-L 1m 4s = (27/25~15/14~14/13, 25/24~21/20, 250/243~28/27~65/63) = (123.5395c, 78.929c, 64.0225c) TE
-~ 28/27 10/9 6/5 26/21 4/3 7/5 3/2 14/9 5/3 9/5 28/15 2/1 as sLLsLmLsLLsL
+s = 0 -> ssLsssssLssssssssLsssssLss Fleetwood[26] MODMOS
+====[[SNS (2/1, 3/2, 7/6: 1728/1715)-53|(2/1, 3/2, 7/6: 1728/1715)[53] (Orwellismic)]]====
+L 4M 22s = (~50/49, 64/63~245/243, 126/125~2401/2400) = (30.8575c, 22.9458c, 12.4765c) TE
-tempers to sLLsLsLsLLsL Meantone[12], sLLsLLLsLLsL Diminished[12] MODMOS
+~ 50/49 36/35 360/343 21/20 15/14 27/25 54/49 441/400 9/8 8/7 125/108 7/6 25/21 6/5 60/49 49/40 5/4 63/50 9/7 162/125 21/16 4/3 200/147 48/35 480/343 7/5 10/7 343/240 35/24 147/100 3/2 32/16 125/81 14/9 100/63 8/5 80/49 49/30 5/3 42/25 12/7 216/125 7/4 16/9 800/441 49/27 50/27 28/15 40/21 343/180 35/18 49/25 2/1 as LsLsLsLsLMLsLsLsLsLsLMLsLsLsLsLMLsLsLsLsLsLMLsLsLsLsL
-===== [[SNS (2/1, 3/2, 6/5: 100/99)-12|(2/1, 3/2, 6/5: 100/99)[12]]] =====
+L = M -> LsLsLsLsLLLsLsLsLsLsLLLsLsLsLsLLLsLsLsLsLsLLLsLsLsLsL Orwell[53] MODMOS;
-L 1m 4s = (27/25~12/11, 25/24~33/32, 250/243~55/54) = (146.6352c, 63.1434c, 27.4197c) TE
-~ 55/54 10/9 6/5 11/9 4/3 11/8 3/2 55/36 5/3 9/5 11/6 2/1 as sLLsLmLsLLsL
+M = s -> LsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsL Quartonic[53]; L = s -> sssssssssLsssssssssssLsssssssssLsssssssssssLsssssssss
-tempers to sLLsLsLsLLsL Meanenneadecal[12], sLLsLLLsLLsL Diminished[12] MODMOS
+s = 0 -> LLLLLsLLLLLLsLLLLLsLLLLLLsLLLLL Myna[31] MODMOS; M = 0 -> LsLsLsLsLLsLsLsLsLsLLsLsLsLsLLsLsLsLsLsLLsLsLsLsL Superpyth[49];
-===== [[SNS (2/1, 3/2, 6/5: 56/55, 100/99)-12|(2/1, 3/2, 6/5: 56/55, 100/99)[12]]] =====
+L = 0 -> ssssLsssssLssssLsssssLssss Doublewide[22] MODMOS
-L 1m 4s = (27/25~15/14~12/11, 25/24~21/20~33/32, 250/243~28/27~55/54) = (132.5782c, 82.867c, 46.5074c) TE
+=====[[SNS (2/1, 3/2, 7/6: 99/98, 385/384)-53|(2/1, 3/2, 7/6: 99/98, 385/384)[53] (Orwellian)]]=====
+L 27M 22s = (64/63~245/243~55/54, 50/49~100/99, 126/125~2401/2400) = (30.3331c, 25.8663c, 17.3212c) TE
-~ 28/27 10/9 6/5 11/9 4/3 7/5 3/2 14/9 5/3 9/5 11/6 2/1 as sLLsLmLsLLsL
+~ 50/49 36/35 80/77 21/20 15/14 27/25 12/11 441/400 9/8 8/7 125/108 7/6 25/21 6/5 60/49 49/40 5/4 63/50 9/7 162/125 21/16 4/3 200/147 11/8 480/343 7/5 10/7 343/240 16/11 147/100 3/2 32/16 125/81 14/9 100/63 8/5 80/49 49/30 5/3 42/25 12/7 216/125 7/4 16/9 800/441 11/6 50/27 28/15 40/21 77/40 35/18 49/25 2/1 as MsMsMsMsMLMsMsMsMsMsMLMsMsMsMsMLMsMsMsMsMsMLMsMsMsMsM
-tempers to sLLsLsLsLLsL Meanenneadecal[12], sLLsLLLsLLsL Diminished[12] MODMOS
+L = M -> LsLsLsLsLLLsLsLsLsLsLLLsLsLsLsLLLsLsLsLsLsLLLsLsLsLsL Orwell[53] MODMOS;
-== 2.3.5, Hemifamity ==
+M = s -> sssssssssLsssssssssssLsssssssssLsssssssssssLsssssssss; L = s -> LsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsL Quartz[53];
-=== ((2/1, 3/2)[5], 10/9) ===
+s = 0 -> sssssLssssssLsssssLssssssLsssss Myno[31] MODMOS; M = 0 -> ssssLsssssLssssLsssssLssss Doublewide[22] MODMOS;
-==== [[SNS ((2/1, 3/2)-5, 10/9)-10|((2/1, 3/2)[5], 10/9)[10]]] ====
+L = 0 -> LsLsLsLsLLsLsLsLsLsLLsLsLsLsLLsLsLsLsLsLLsLsLsLsL Suprapyth[49]
-L 2M 3s = (10/9, 16/15, 81/80)
+=====[[SNS (2/1, 3/2, 7/6: 176/175, 540/539)-53|(2/1, 3/2, 7/6: 176/175, 540/539)[53] (Guanyin)]]=====
+L 27M 22s = (64/63~245/243~100/99, 50/49~55/54, 126/125~2401/2400~441/440) = (33.5026c, 21.2991c, 9.5213c) TE
-/80 9/8 6/5 4/3 27/20 3/2 8/5 16/9 9/5 2/1 as sLMLsLMLsL
+~ 50/49 36/35 22/21 21/20 15/14 27/25 11/10 243/220 9/8 8/7 125/108 7/6 25/21 6/5 11/9 27/22 5/4 63/50 9/7 162/125 21/16 4/3 110/81 15/11 88/63 7/5 10/7 63/44 22/15 81/55 3/2 32/16 125/81 14/9 100/63 8/5 44/27 18/11 5/3 42/25 12/7 216/125 7/4 16/9 440/243 20/11 50/27 40/21 21/11 35/18 49/25 2/1 as MsMsMsMsMLMsMsMsMsMsMLMsMsMsMsMLMsMsMsMsMsMLMsMsMsMsM
-tempers to sLLLsLLLsL Dicot[10] MOSMOS, sLsLsLsLsL Blackwood[10], ssLsssLsss Supersharp[10] MODMOS
+L = M -> LsLsLsLsLLLsLsLsLsLsLLLsLsLsLsLLLsLsLsLsLsLLLsLsLsLsL Orwell[53] MODMOS;
-==== [[((2/1, 3/2)-5, 10/9: 5120/5103)-17|((2/1, 3/2)[5], 10/9: 5120/5103)[17]]] ====
+M = s -> sssssssssLsssssssssssLsssssssssLsssssssssssLsssssssss Kleiboh[53] MODMOS; L = s -> LsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsL Quartonic[53];
-L 2m 10s = (~35/32, 256/243~21/20, 81/80~64/63) = (153.2376c, 85.8342c, 24.4931c) TE
-~ 64/63 10/9 9/8 32/27 6/5 21/16 4/3 27/20 40/27 3/2 32/21 5/3 27/16 16/9 9/5 63/32 2/1 as sLsmsLssLssLsmsLs
+s = 0 -> sssssLssssssLsssssLssssssLsssss Myna[31] MODMOS; M = 0 -> ssssLsssssLssssLsssssLssss Fleetwood[22] MODMOS;
-tempers to sLsssLssLssLsssLs, sLsLsLssLssLsLsLs, sssLsssssssssLsss
+L = 0 -> LsLsLsLsLLsLsLsLsLsLLsLsLsLsLLsLsLsLsLsLLsLsLsLsL Superpyth[49]
+===((2/1, 3/2)[12], 49/48) or ((2/1, 3/2)[12], 36/35)===
+====((2/1, 3/2)[12], 36/35: 1728/1715)[24] (Orwellian)====
-=====[[((2/1, 3/2)-5, 10/9: 385/384, 2200/2187)-17|((2/1, 3/2)[5], 10/9: 385/384, 2200/2187)[17]]]=====
+== 2.3.7 Sensamagic ==
-L 2m 10s = (35/32~12/11, 256/243~21/20, 81/80~64/63~55/54) = (156.6236c, 85.7981c, 26.2356c) TE
-~ 64/63 10/9 9/8 32/27 6/5 21/16 4/3 27/20 40/27 3/2 32/21 5/3 27/16 16/9 9/5 63/32 2/1 as sLsmsLssLssLsmsLs
+=== (2/1, 3/2, 9/7) ===
-tempers to sLsssLssLssLsssLs, sLsLsLssLssLsLsLs, sssLsssssssssLsss
+==== (2/1, 3/2, 9/7)[4] ====
+L 1M 1s = (9/7, 7/6, 28/27) = (435.0841c, 266.8709c, 62.9609c)
-==== [[((2/1, 3/2)-5, 10/9: 5120/5103)-24|((2/1, 3/2)[5], 10/9: 5120/5103)[24]]] ====
+/7 3/2 27/14 2/1 as LMLs
-L 2m 17s = (~175/162, ~28/27, 81/80~64/63) = (132.1305c, 61.3411c, 24.4931c) TE
-~ 64/63 35/32 10/9 9/8 7/6 32/27 6/5 35/27 21/16 4/3 27/20 35/24 40/27 3/2 32/21 105/64 5/3 27/16 7/4 16/9 9/5 35/18 63/32 2/1 as sLssmssLsssLsssLssmssLss
+L = M -> LLLs; M = s -> LsLs; s = 0 -> LsL
+==== (2/1, 3/2, 9/7: 245/243)[7] Sensamagic ====
+L 1m 4s = (~5/4, ~9/8, 28/27~36/35)
-tempers to sLsssssLsssLsssLsssssLss Immunity[24] MODMOS, sLssLssLsssLsssLssLssLss, LLLLsLLLLLLLLLLLLLsLLLLL
+~ 28/27 9/7 4/3 3/2 14/9 27/14 2/1 as sLsmsLs
-===== [[((2/1, 3/2)-5, 10/9: 385/384, 2200/2187)-24|((2/1, 3/2)[5], 10/9: 385/384, 2200/2187)[24]]] =====
+m = s -> sLsssLs; s = 0 -> LsL
-L 2m 17s = (~175/162, ~28/27, 81/80~64/63~55/54) = (127.002c, 59.5625c, 26.2356c) TE
-~ 64/63 12/11 10/9 9/8 7/6 32/27 6/5 35/27 21/16 4/3 27/20 16/11 40/27 3/2 32/21 18/11 5/3 27/16 7/4 16/9 9/5 35/18 63/32 2/1 as sLssmssLsssLsssLssmssLss
+-ET: (2, 1, 0); 14c-ET: (4, 2, 1); 17-ET: (5, 3, 1); 19-ET: (6, 3, 1); 22-ET: (7, 4, 1) 24-ET: (8, 4, 1); 27-ET: (9, 5, 1); 41-ET: (13, 7, 2); 46-ET: (15, 8, 2); 68-ET: (22, 12, 3); 87-ET: (28, 15, 4)
-tempers to sLsssssLsssLsssLsssssLss Immunity[24] MODMOS, sLssLssLsssLsssLssLssLss, LLLLsLLLLLLLLLLLLLsLLLLL
+==== (2/1, 3/2, 9/7: 245/243)[10] Sensamagic ====
+L 1m 7s = (~135/112, ~35/32, 28/27~36/35)
-==== [[((2/1, 3/2)-5, 10/9: 5120/5103)-31|((2/1, 3/2)[5], 10/9: 5120/5103)[31]]] ====
+~ 28/27 5/4 9/7 4/3 35/24 3/2 14/9 15/8 27/14 2/1 as sLssmssLss
-L 2m 24s = (~1225/1152, ~49/48, 81/80~64/63) = (107.6374c, 36.848c, 24.4931c) TE
-~ 64/63 36/35 35/32 10/9 9/8 8/7 7/6 32/27 6/5 128/105 35/27 21/16 4/3 27/20 48/35 35/24 40/27 3/2 32/21 54/35 105/64 5/3 27/16 12/7 7/4 16/9 9/5 64/35 35/18 63/32 2/1 as ssLsssmsssLssssLssssLsssmsssLss
+m  = s -> sLsssssLss; s = 0 -> LsL
-tempers to ssLsssssssLssssLssssLsssssssLss Rodan[31] MODMOS, ssLsssLsssLssssLssssLsssLsssLss, LLLLLLsLLLLLLLLLLLLLLLLsLLLLLLL
+c-ET: (3, 1, 1); 17-ET: (4, 2, 1); 19-ET: (5, 2, 1); 22-ET: (6, 3, 1) 24-ET: (7, 3, 1); 27-ET: (8, 4, 1); 41-ET: (11, 5, 2); 46-ET: (13, 6, 2); 68-ET: (19, 9, 3); 87-ET: (24,11,4)
-===== [[((2/1, 3/2)-5, 10/9: 385/384, 2200/2187)-31|((2/1, 3/2)[5], 10/9: 385/384, 2200/2187)[31]]] =====
+===== (2/1, 3/2, 9/7: 245/243, 385/384)[10] Sensamagic =====
-L 2m 24s = (~35/33, 49/48~56/55, 81/80~64/63~55/54) = (100.7664c, 33.3269c, 26.2356c) TE
+L 1m 7s = (~135/112, ~35/32, 28/27~36/35~33/32)
-~ 64/63 36/35 12/11 10/9 9/8 8/7 7/6 32/27 6/5 11/9 35/27 21/16 4/3 27/20 11/8 16/11 40/27 3/2 32/21 54/35 18/11 5/3 27/16 12/7 7/4 16/9 9/5 11/6 35/18 63/32 2/1 as ssLsssmsssLssssLssssLsssmsssLss
+~ 28/27 5/4 9/7 4/3 16/11 3/2 14/9 15/8 27/14 2/1 as sLssmssLss
-tempers to ssLsssssssLssssLssssLsssssssLss Rodan[31] MODMOS, ssLsssLsssLssssLssssLsssLsssLss, LLLLLLsLLLLLLLLLLLLLLLLsLLLLLLL
+m  = s -> sLsssssLss; s = 0 -> LsL
-=== ((2/1, 3/2)[12], 81/80), ((2/1, 3/2)[12], 64/63) ===
+-ET: (4, 2, 1); 19-ET: (5, 2, 1); 22-ET: (6, 3, 1) 24-ET: (7, 3, 1); 27-ET: (8, 4, 1); 41-ET: (11, 5, 2); 46-ET: (13, 6, 2); 63-ET: (18, 8, 3); 68-ET: (19, 9, 3); 87-ET: (24, 11, 4)
-==== [[((2/1, 3/2)-12, 64/63: 5120/5103)-24|((2/1, 3/2)[12], 64/63: 5120/5013)[24]]] ====
+==== (2/1, 3/2, 9/7: 245/243)[13] Sensamagic ====
-L 7M 12s = (~135/128, ~28/27, 81/80~64/63) = (95.2825c, 61.3411c, 24.4931c) TE
+L 1m 10s = (~75/64, ~135/128, 28/27~36/35)
-~ 64/63 15/14 243/224 9/8 8/7 32/27 6/5 81/64 9/7 4/3 27/20 10/7 81/56 3/2 32/21 45/28 80/49 27/16 12/7 16/9 9/5 243/128 27/14 2/1 as sLsMsMsLsMsLsMsLsMsMsLsM
+~ 28/27 16/15 5/4 9/7 4/3 48/35 35/24 3/2 14/9 8/5 15/8 27/14 2/1 as ssLsssmsssLss
-tempers to sLsLsLsLsLsLsLsLsLsLsLsLsL, sLsssssLsssLsssLsssssLss Immunity[24] MODMOS, sssLsLsssLsssLsssLsLsssL
+m = s -> ssLsssssssLss Pycnic[13] MODMOS; s = 0 -> LsL
-===== [[((2/1, 3/2)-12, 64/63: 441/440, 896/891)-24|((2/1, 3/2)[12], 64/63: 441/440, 896/891)[24]]] =====
+c-ET: (2, 0, 1); 17-ET: (3, 1, 1); 19-ET: (4, 1, 1); 22-ET: (5, 2, 1) 24-ET: (6, 2, 1); 27-ET: (7, 3, 1); 41-ET: (9, 3, 2); 46-ET: (11, 4, 2); 68-ET: (16, 6, 3); 87-ET: (20, 7,4)
-L 7M 12s = (135/128~35/33, 28/27~33/32, 81/80~64/63~99/98) = (97.5911c, 58.2557c, 25.3165c) TE
-~ 64/63 15/14 12/11 9/8 8/7 32/27 6/5 14/11 9/7 4/3 27/20 10/7 16/11 3/2 32/21 45/28 18/11 27/16 12/7 16/9 9/5 12/11 27/14 2/1 as sLsMsMsLsMsLsMsLsMsMsLsM
+===== (2/1, 3/2, 9/7: 245/243, 385/384)[13] Sensamagic =====
+L 1m 10s = (~75/64, 135/128~35/33, 28/27~36/35~33/32)
-tempers to sLsLsLsLsLsLsLsLsLsLsLsLsL, sLsssssLsssLsssLsssssLss Immunity[24] MODMOS, sssLsLsssLsssLsssLsLsssL
+~ 28/27 16/15 5/4 9/7 4/3 11/8 16/11 3/2 14/9 8/5 15/8 27/14 2/1 as ssLsssmsssLss
-==== [[((2/1, 3/2)-12, 64/63: 5120/5013)-36|((2/1, 3/2)[12], 64/63: 5120/5013)[36]]] ====
+m = s -> ssLsssssssLss; s = 0 -> LsL
-L 7M 12s = (~25/24, ~49/48, 81/80~64/63) = (70.7894c, 36.848c, 24.4931c) TE
-~ 64/63 36/35 15/14 243/224 54/49 9/8 8/7 81/70 32/27 6/5 128/105 81/64 9/7 64/49 4/3 27/20 48/35 10/7 81/56 72/49 3/2 32/21 54/35 45/28 80/49 81/49 27/16 12/7 243/140 16/9 9/5 64/35 243/128 27/14 96/49 2/1 as ssLssMssMssLssMssLssMssLssMssMssLssM
+-ET: (3, 1, 1); 19-ET: (4, 1, 1); 22-ET: (5, 2, 1) 24-ET: (6, 2, 1); 27-ET: (7, 3, 1); 41-ET: (9, 3, 2); 46-ET: (11, 4, 2); 63-ET: (15, 5, 3); 68-ET: (16, 6, 3); 87-ET: (20, 7,4)
-tempers to ssLssLssLssLssLssLssLssLssLssLssLssLssL, ssLssssssssLsssssLsssssLssssssssLsss Rodan[36] MODMOS, sssssLssLsssssLsssssLsssssLssLsssssL
+==== (2/1, 3/2, 9/7: 245/243, 385/384)[16] Sensamagic ====
+L 13m 1s = (~25/22, 28/27~36/35~33/32, ~45/44)
-===== [[((2/1, 3/2)-12, 64/63: 441/440, 896/891)-36|((2/1, 3/2)[12], 64/63: 441/440, 896/891)[36]]] =====
+~ 28/27 16/15 40/33 5/4 9/7 4/3 11/8 45/32 16/11 3/2 14/9 8/5 20/11 15/8 27/14 2/1 as mmLmmmmsmmmmLmmm
-L 7M 12s = (~25/24, ~49/48, 81/80~64/63~99/98) = (72.2746c, 32.9392c, 25.3165c) TE
-~ 64/63 36/35 15/14 12/11 54/49 9/8 8/7 64/55 32/27 6/5 128/105 14/11 9/7 64/49 4/3 27/20 48/35 10/7 16/11 72/49 3/2 32/21 54/35 45/28 18/11 81/49 27/16 12/7 96/55 16/9 9/5 64/35 22/21 27/14 96/49 2/1 as ssLssMssMssLssMssLssMssLssMssMssLssM
+m = s -> ssLsssssssssLsss Shrutar[16] MODMOS; s = 0 -> ssLssssssssLsss
-tempers to ssLssLssLssLssLssLssLssLssLssLssLssLssL, ssLssssssssLsssssLsssssLssssssssLsss Rodan[36] MODMOS, sssssLssLsssssLsssssLsssssLssLsssssL
+-ET: (2, 1, 0); 19-ET: (3, 1, 0); 22-ET: (4, 1, 1) 24-ET: (5, 1, 1); 27-ET: (6, 1, 2); 41-ET: (7, 2, 1); 46-ET: (9, 2, 2); 63-ET: (12, 3, 2); 68-ET: (13, 3, 3); 87-ET: (16, 4, 3)
-== 2.5.9, Marvel ==
+==== (2/1, 3/2, 9/7: 245/243, 385/384)[31] Sensamagic ====
+L 16m 13s = (10/9~54/49, ~45/44, 176/175~121/120)
-=== ((2/1, 5/4)[3], 9/8) ===
+~ 45/44 28/27 35/33 16/15 12/11 11/10 9/8 154/135 7/6 9/7 405/308 4/3 15/11 11/8 45/32 64/45 16/11 22/15 3/2 616/405 14/9 12/7 135/77 16/9 20/11 11/6 15/8 66/35 27/14 88/45 2/1 as msmsmsmsmLmsmsmsmsmsmLmsmsmsmsm
-==== [[((2/1, 5/4)-3, 9/8)-6|((2/1, 5/4)[3], 9/8)[6]]] ====
+m = s -> sssssssssLsssssssssssLsssssssss; s = 0 -> sssssLssssssLsssss Shrutar[18] MODMOS
-L 3M 2s = (256/225, 9/8, 10/9)
-/8 5/4 45/32 8/5 9/5 2/1 as MsMLMs
+-ET: (6, 1, 1); 46-ET: (7, 2, 0); 63-ET: (10, 2, 1); 68-ET: (10, 3, 0); 87-ET: (13, 3, 1)
-tempers to LsLLLs, sssLss, LsLsLs
+==== (2/1, 3/2, 9/7: 729/728)[7] ====
+L 1m 4s = (~26/21, ~9/8, 28/27~27/26)
-===== [[((2/1, 5/4)-3, 9/8: 225/224)-6|((2/1, 5/4)[3], 9/8: 225/224)[6]]] =====
+~ 28/27 9/7 4/3 3/2 14/9 27/14 2/1 sLsmsLs
-L 3M 2s = (~8/7, 9/8~28/25, ~10/9) = (232.0248c, 200.9152c, 182.9137c)
-~ 9/8 5/4 7/5 8/5 9/5 2/1 as MLMsMs
+m = s -> sLsssLs; s = 0 -> LsL
-tempers to LsLLLs, sssLss, LsLsLs
+-ET: (2, 1, 0); 17-ET: (5, 3, 1); 19-ET: (6, 3, 1); 22f-ET: (7, 4, 1) 24-ET: (8, 4, 1); 36-ET: (11, 6, 2); 41-ET: (13, 7, 2); 53-ET: (16, 9, 3); 58-ET: (18, 10, 3); 77-ET: (24, 13, 4); 94-ET: (29, 16, 5)
-===== [[SNS ((2/1, 5/4)-3, 9/8: 100/99, 225/224)-6|((2/1, 5/4)[3], 9/8: 100/99, 225/224)[6]]] =====
+==== (2/1, 3/2, 9/7: 729/728)[10] ====
-L 3M 2s = (~8/7, 9/8~28/25, 10/9~11/10) = (229.792c, 206.94c, 174.6095c)
+L 1m 7s = (~117/98, ~13/12, 28/27~27/26)
-~ 9/8 5/4 7/5 8/5 9/5 2/1 as MLMsMs
+~ 28/27 26/21 9/7 4/3 13/9 3/2 14/9 13/7 27/14 2/1 sLssmssLss
-tempers to LsLLLs, sssLss, LsLsLs
+m  = s -> sLsssssLss; s = 0 -> LsL
-==== [[SNS ((2/1, 5/4)-3, 9/8)-10|((2/1, 5/4)[3], 9/8)[10]]] ====
+-ET: (4, 2, 1); 19-ET: (5, 2, 1); 22f-ET: (6, 3, 1) 24-ET: (7, 3, 1); 36-ET: (9, 4, 2); 41-ET: (11, 5, 2); 53-ET: (13, 6, 3); 58-ET: (15, 7, 3); 77-ET: (20, 9, 4); 94-ET: (24, 11, 5)
-L 1M 3s = (10/9, 128/125, 81/80)
-/9 9/8 5/4 25/18 45/32 25/16 8/5 16/9 9/5 2/1 as LsLLsLmLsL,
+==== (2/1, 3/2, 9/7: 729/728)[13] ====
+L 1m 10s = (~169/147, ~117/112, 28/27~27/26)
-tempers to LsLLsLsLsL, LsLLsLLLsL, LLLLLLsLLL
+~ 28/27 14/13 26/21 9/7 4/3 18/13 13/9 3/2 14/9 21/13 13/7 27/14 2/1 ssLsssmsssLss
-===== [[SNS ((2/1, 5/4)-3, 9/8: 225/224)-10|((2/1, 5/4)[3], 9/8: 225/224)[10]]] =====
+m = s -> ssLsssssssLss; s = 0 -> LsL
-L 1M 3s = (~10/9, 128/125~36/35, 81/80~126/125) = (182.9137c, 49.1111c, 18.0015c) TE
-~ 10/9 9/8 5/4 25/18 7/5 14/9 8/5 16/9 9/5 2/1 as LsLmLsLLsL
+-ET: (3, 1, 1); 19-ET: (4, 1, 1); 22f-ET: (5, 2, 1) 24-ET: (6, 2, 1); 36-ET: (7, 2, 2); 41-ET: (9, 3, 2); 53-ET: (10, 3, 3); 58-ET: (12, 4, 3); 77-ET: (16, 5, 4); 94-ET: (19, 6, 5)
-tempers to LsLLsLsLsL, LsLLsLLLsL, LLLLLLsLLL
+===== (2/1, 3/2, 9/7: 351/350, 676/675)[13] =====
+L 1m 10s = (~169/147, ~117/112, 28/27~27/26~26/25)
-===== [[SNS ((2/1, 5/4)-3, 9/8: 100/99, 225/224)-10|((2/1, 5/4)[3], 9/8: 100/99, 225/224)[10]]] =====
+~ 28/27 14/13 26/21 9/7 4/3 18/13 13/9 3/2 14/9 21/13 13/7 27/14 2/1 ssLsssmsssLss
-L 1M 3s = (10/9~11/10, 128/125~36/35~80/77, 81/80~126/125~45/44~56/55) = (174.6095c, 55.1825c, 32.3305c) TE
-~10/9 9/8 5/4 11/8 7/5 14/9 8/5 16/9 9/5 2/1 as LsLmLsLLsL
+m = s -> ssLsssssssLss; s = 0 -> LsL
-tempers to LsLLsLsLsL, LsLLsLLLsL, LLLLLLsLLL
+-ET: (3, 1, 1); 19-ET: (4, 1, 1); 24-ET: (6, 2, 1); 53-ET: (10, 3, 3); 58-ET: (12, 4, 3); 77-ET: (16, 5, 4); 111-ET: (22, 7, 6); 130-ET: (26, 8, 7)
-==== [[SNS ((2/1, 5/4)-3, 9/8)-17|((2/1, 5/4)[3], 9/8)[17]]] ====
+==== (2/1, 3/2, 9/7: 351/350, 676/675)[16] ====
-L 10m 1s = (800/729, 81/80, 2048/2025)
+L 13m 1s = (~845/756, 28/27~27/26~26/25, ~169/168)
-/80 10/9 9/8 100/81 5/4 81/64 25/18 45/32 64/45 36/18 128/81 8/5 81/50 16/9 9/5 160/81 2/1 as mLmLmmLmsmLmmLmLm
+~ 26/25 14/13 25/21 26/21 9/7 4/3 18/13 39/28 13/9 3/2 14/9 21/13 25/14 13/7 23/13 2/1 as mmLmmmmsmmmmLmmm
-tempers to sLsLssLsssLssLsLs MODMOS, LLLLLLLLsLLLLLLLL, sLsLssLsLsLssLsLs
+m = s -> ssLsssssssssLsss; s = 0 -> ssLssssssssLsss
-===== [[SNS ((2/1, 5/4)-3, 9/8: 225/224)-17|((2/1, 5/4)[3], 9/8: 225/224)[17]]] =====
+-ET: (2, 1, 0); 19-ET: (3, 1, 0); 24-ET: (5, 1, 1); 53-ET: (7, 3, 0); 58-ET: (9, 3, 1); 77-ET: (12, 4, 1); 111-ET: (16, 6, 1); 130-ET: (19, 7, 1)
-L 1m 10s = (~800/729, 2048/2025~64/63, 81/80~126/125) = (164.9122c, 31.1096c, 18.0015c) TE
-~ 81/80 10/9 9/8 100/81 5/4 81/64 25/18 7/5 10/7 36/25 128/81 8/5 81/50 16/9 9/5 160/81 2/1 as sLsLssLsmsLssLsLs
+==== (2/1, 3/2, 9/7: 351/350, 676/675)[31] ====
+L 13m 16s = (~10/9, ~336/325, 169/168~225/224)
-tempers to sLsLssLsssLssLsLs MODMOS, sLsLssLsLsLssLsLs, LLLLLLLLsLLLLLLLL
+~169/168 26/25 117/112 14/13 13/12 28/25 9/8 378/325 7/6 9/7 325/252 4/3 75/56 18/13 39/28 56/39 13/9 112/75 3/2 14/9 12/7 325/189 16/9 25/14 24/13 13/7 224/117 25/13 336/169 2/1 as smsmsmsmsLsmsmsmsmsmsLsmsmsmsms
-===== [[SNS ((2/1, 5/4)-3, 9/8: 100/99, 225/224)-17|((2/1, 5/4)[3], 9/8: 100/99, 225/224)[17]]] =====
+m = s -> sssssssssLsssssssssssLsssssssss; s = 0 -> ssssLsssssLssss Catakleismic[15] MODMOS
-L 10m 1s = (~88/81, 81/80~126/125~45/44~56/55, 2048/2025~64/63~176/175) = (142.279c, 32.3305c, 22.852c) TE
-~ 56/55 10/9 9/8 11/9 5/4 14/11 11/8 7/5 10/7 16/11 11/7 8/5 11/9 16/9 9/5 55/28 2/1 as mLmLmmLmsmLmmLmLm
+-ET: (7, 3, 0); 58-ET: (8, 2, 1); 77-ET: (11, 3, 1); 111-ET: (15, 5, 1); 130-ET: (18, 6, 1)
-tempers to sLsLssLsssLssLsLs Machine[17] MODMOS, LLLLLLLLsLLLLLLLL, sLsLssLsLsLssLsLs
+== 2.3.11 Pentacircle ==
-== 2.5.9, Starling ==
+=== ((2/1, 3/2)[5], 12/11) ===
-=== ((2/1, 5/4)[3], 10/9) ===
+==== ((2/1, 3/2)[5], 12/11)[10] ====
+L 2M 3s = (12/11, 88/81, 33/32)
-==== ((2/1, 5/4)[3], 10/9)[6] ====
+/11 9/8 27/22 4/3 16/11 3/2 18/11 27/16 81/44 2/1 as LsLMLsLsLM
-L 2m 3s = (144/125, 9/8, 10/9)
-/8 5/4 36/25 8/5 9/5 2/1 as msLsms
+==== ((2/1, 3/2)[5], 12/11: 896/891)[10] ====
+L 2M 3s = (12/11, 88/81, 33/32~28/27)
-tempers to ssLsss, LsLsLs, sLLLsL
+~  12/11 9/8 27/22 4/3 16/11 3/2 18/11 27/16 81/44 2/1 as LsLMLsLsLM
-===== ((2/1, 5/4)[3], 10/9: 126/125)[6] =====
+==== ((2/1, 3/2)[5], 12/11: 896/891)[17] ====
-L 2m 3s = (~8/7, ~9/8, 10/9~28/25)
+L 2M 10s = (128/121~81/77, 256/243~22/21, 33/32~28/27)
-~ 9/8 5/4 10/7 8/5 9/5 2/1 as msLsms
+~ 28/27 12/11 9/8 32/27 11/9 9/7 4/3 11/8 16/11 3/2 14/9 18/11 27/16 16/9 11/6 27/14 2/1 as sLsMsLssLssLsMsLs
-tempers to ssLsss, LsLsLs, sLLLsL
+== 2.3.13 Squbema ==
-==== ((2/1, 5/4)[3], 10/9)[9] ====
-L 1m 2s = (10/9, 648/625, 81/80)
-/9 9/8 5/4 25/18 36/25 8/5 16/9 9/5 2/1 as LsLLmLLsL
+=== ((2/1, 3/2)[5], 13/12) ===
-tempers to LsLLsLLsL, LsLLLLLsL, LLLLsLLLL
+==== ((2/1, 3/2)[5], 13/12)[10] ====
+L 2M 3s = (13/12, 128/117, 27/26)
-===== ((2/1, 5/4)[3], 10/9: 126/125)[9] =====
+/12 9/8 39/32 4/3 13/9 3/2 13/8 27/16 117/64 2/1 as LsLMLsLsLM
-L 1m 2s = (10/9~28/25, 648/625~36/35, 81/80~225/224)
-~ 10/9 9/8 5/4 7/5 10/7 8/5 16/9 9/5 2/1 as LsLLmLLsL
+==== ((2/1, 3/2)[5], 13/12: 729/728)[10] ====
+L 2M 3s = (13/12, 128/117, 27/26~28/27)
-tempers to LsLLsLLsL, LsLLLLLsL, LLLLsLLLL
+~ 13/12 9/8 39/32 4/3 13/9 3/2 13/8 27/16 117/64 2/1 as LsLMLsLsLM
-==== ((2/1, 5/4)[3], 10/9: 126/125, 896/891)[16] ====
+===== ((2/1, 3/2)[5], 13/12: 729/728)[17] =====
-L 1m 9s = (~11/10, 128/125~64/63~99/98, 81/80~225/224~56/55)
+L 2M 10s = (91/81, 256/243~96/91, 27/26~28/27)
-~ 56/55 10/9 9/8 63/55 5/4 9/7 7/5 45/32 16/11 8/5 81/50 16/9 9/5 20/11 2/1 as sLssLsLsmsLsLssL
+~ 28/27 13/12 9/8 32/27 16/13 9/7 4/3 18/13 13/9 3/2 14/9 13/8 27/16 16/9 24/13 27/14 2/1 as sLsMsLssLssLsMsLs
-tempers to sLssLsLsssLsLssL, sLssLsLsLsLsLssL, LLLLLLLLsLLLLLLL
+===== ((2/1, 3/2)[5], 12/11~13/12: 144/143, 729/728)[17] =====
+L 2M 10s = (91/81~81/77, 256/243~96/91~22/21, 27/26~28/27~33/32)
-===== ((2/1, 5/4)[3], 10/9: 91/90, 126/125, 325/324)[16] =====
+~ 28/27 12/11 9/8 32/27 11/9 9/7 4/3 11/8 13/9 3/2 14/9 13/8 27/16 16/9 12/11 27/14 2/1 as sLsMsLssLssLsMsLs
-L 1m 9s = (~11/10, 128/125~64/63~99/98, 81/80~225/224~56/55~144/143)
-~ 56/55 10/9 9/8 63/55 5/4 9/7 7/5 45/32 16/11 8/5 13/8 16/9 9/5 20/11 2/1 as sLssLsLsmsLsLssL
-tempers to sLssLsLsssLsLssL, sLssLsLsLsLsLssL, LLLLLLLLsLLLLLLL
-[[Category:Gallery]]
+{{Navbox scale gallery}}
-[[Category:Scales]]
+[[Category:Step-nested scales]]
-[[Category:Step-Nested Scales]]
+[[Category:Rank-3 scales]]
+[[Category:Lists of scales]]
+[[Category:Rank 3]]
+{{Todo| cleanup }}