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m ((2/1, 7/6)[4], 11/10) Guanyin: {{Navbox scale gallery}}
 
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See [[SN scale]] and [[Rank-3 scale]].
See [[SN scale]] and [[Rank-3 scale]].
For a more thorough summary, see [[Gallery of 3-SN scales]].


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.
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.
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L = M -> sLsLsLs Sharp[7]; M = s -> sLsssLs Pelogic[7]; L = s -> LLLsLLL Enipucrop[7]
L = M -> sLsLsLs Sharp[7]; M = s -> sLsssLs Pelogic[7]; L = s -> LLLsLLL Enipucrop[7]


(2, 1, 1) in 9ET; (2, 2, 1) in 10ET; (3, 2, 1) in 12ET; (4, 3, 2) in 19ET; (5, 4, 2) in 22ET; (6, 5, 3) in 29ET; (7, 5, 3) in 31ET; (9, 7, 4) in 41ET; (11, 8, 5) in 50ET; (12, 9, 5) in 53ET; (16, 12, 17) in 72ET
9-ET: (2, 1, 1); 10-ET: (2, 2, 1); 12-ET: (3, 2, 1); 19-ET: (4, 3, 2); 22-ET: (5, 4, 2); 29-ET: (6, 5, 3); 31-ET: (7, 5, 3); 41-ET: (9, 7, 4); 50-ET: (11, 8, 5); 53-ET: (12, 9, 5); 72-ET: (16, 12, 17)
====[[SNS (2/1, 3/2, 5/4)-10|(2/1, 3/2, 5/4)[10]]]====
====[[SNS (2/1, 3/2, 5/4)-10|(2/1, 3/2, 5/4)[10]]]====
2L 7m 1s = (1125/1024, 16/15, 135/128) = (162.8511c, 111.7313c, 92.1787c)
2L 7m 1s = (1125/1024, 16/15, 135/128) = (162.8511c, 111.7313c, 92.1787c)
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m = s -> sLsssssLss Pajara[10] MODMOS; L = m -> LLLLsLLLLL Negri[10]; L = s -> LsLLsLLsLL Dicot[10]; s = 0 -> sLssssLss Pelogic[9]
m = s -> sLsssssLss Pajara[10] MODMOS; L = m -> LLLLsLLLLL Negri[10]; L = s -> LsLLsLLsLL Dicot[10]; s = 0 -> sLssssLss Pelogic[9]


(2, 1, 1) in 12ET, (2, 2, 1) in 19ET, (3, 2, 2) in 22ET, (3, 3, 2) in 29ET, (4, 3, 2) in 31ET, (5, 4, 3) in 41ET, (7, 5, 4) in 53ET, (9, 7, 5) in 72ET
12-ET: (2, 1, 1); 19-ET: (2, 2, 1); 22-ET: (3, 2, 2); 29-ET: (3, 3, 2); 31-ET: (4, 3, 2); 41-ET: (5, 4, 3); 53-ET: (7, 5, 4); 72-ET: (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)]]=====
=====[[SNS (2/1, 3/2, 5/4: 225/224, 385/384)-10|(2/1, 3/2, 5/4: 225/224, 385/384)[10] (Marvel)]]=====
2L 1m 7s = (35/32~49/45~12/11, 16/15~15/14, 135/128~21/20) = (151.4797c, 116.1327c, 84.7519c) TE
2L 1m 7s = (35/32~49/45~12/11, 16/15~15/14, 135/128~21/20) = (151.4797c, 116.1327c, 84.7519c) TE
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m = s -> sLsssssLss Pajarous[10] MODMOS; L = m -> LLLLsLLLLL Negri[10]
m = s -> sLsssssLss Pajarous[10] MODMOS; L = m -> LLLLsLLLLL Negri[10]


(2, 2, 1) in 19ET, (3, 2, 2) in 22ET, (4, 3, 2) in 31ET, (5, 4, 3) in 41ET, (7, 5, 4) in 53ET, (9, 7, 5) in 72ET
12e-ET: (2, 1, 1); 19-ET: (2, 2, 1); 22-ET: (3, 2, 2); 31-ET: (4, 3, 2); 41-ET: (5, 4, 3); 53-ET: (7, 5, 4) 72-ET: (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)]]=====
=====[[SNS (2/1, 3/2, 5/4: 225/224, 441/440)-10|(2/1, 3/2, 5/4: 225/224, 441/440)[10] (Prodigy)]]=====
2L 7m 1s = (35/32~49/45, 16/15~15/14, 135/128~21/20~22/21) = (150.229c, 116.7669c, 82.9601c) TE
2L 7m 1s = (35/32~49/45, 16/15~15/14, 135/128~21/20~22/21) = (150.229c, 116.7669c, 82.9601c) TE
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m = s -> sLsssssLss Pajaric[10] MODMOS; L = m -> LLLLsLLLLL Negroni[10]
m = s -> sLsssssLss Pajaric[10] MODMOS; L = m -> LLLLsLLLLL Negroni[10]


(2, 1, 1) in 12ET, (2, 2, 1) in 19eET, (3, 3, 2) in 29ET, (4, 3, 2) in 31ET, (5, 4, 3) in 41ET, (9, 7, 5) in 72ET
12-ET: (2, 1, 1); 19e-ET: (2, 2, 1); 29-ET: (3, 3, 2); 31-ET: (4, 3, 2); 41-ET: (5, 4, 3); 53e-ET: (7, 5, 4); 72-ET: (9, 7, 5)
====[[SNS (2/1, 3/2, 5/4: 225/224)-19|(2/1, 3/2, 5/4: 225/224)[19] (Marvel)]]====
====[[SNS (2/1, 3/2, 5/4: 225/224)-19|(2/1, 3/2, 5/4: 225/224)[19] (Marvel)]]====
10L 2M 7s = (135/128~21/20, 25/24~28/27, 64/63~50/49) = (84.9028c, 66.9013c, 31.1096c) TE
10L 2M 7s = (135/128~21/20, 25/24~28/27, 64/63~50/49) = (84.9028c, 66.9013c, 31.1096c) TE
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s = 0 -> LLLsLLLLsLLL Pajara[12] 4M (Hexachordal Dodecatonic); m = 0 -> LsLsLLsLsLsLLsLsL Sharp [17]
s = 0 -> LLLsLLLLsLLL Pajara[12] 4M (Hexachordal Dodecatonic); m = 0 -> LsLsLLsLsLsLLsLsL Sharp [17]


(2, 1, 0) in 22ET; (2, 1, 1) in 29ET; (2, 2, 1) in 31ET; (3, 2, 1) in 41ET; (3, 3, 2) in 50ET; (4, 3, 1) in 53ET; (5, 4, 2) in 72ET
22-ET: (2, 1, 0); 29-ET: (2, 1, 1); 31-ET: (2, 2, 1); 41-ET: (3, 2, 1); 50-ET: (3, 3, 2); 53-ET: (4, 3, 1); 72-ET: (5, 4, 2)
=====[[SNS (2/1, 3/2, 5/4: 225/224, 385/384)-19|(2/1, 3/2, 5/4: 225/224, 385/384)[19] (Marvel)]]=====
=====[[SNS (2/1, 3/2, 5/4: 225/224, 385/384)-19|(2/1, 3/2, 5/4: 225/224, 385/384)[19] (Marvel)]]=====
10L 2M 7s = (135/128~21/20, 25/24~28/27, 64/63~50/49~55/54) = (84.7519c, 66.7278c, 31.3808c) TE
10L 2M 7s = (135/128~21/20, 25/24~28/27, 64/63~50/49~55/54) = (84.7519c, 66.7278c, 31.3808c) TE
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L = M -> LsLsLLLsLsLsLLLsLsL Meanpop[19] MODMOS; M = s -> LsLsLsLsLsLsLsLsLsL Negri[19]; s = 0 -> LLLsLLLLsLLL Pajarous[12] 4M (Hexachordal Dodecatonic)
L = M -> LsLsLLLsLsLsLLLsLsL Meanpop[19] MODMOS; M = s -> LsLsLsLsLsLsLsLsLsL Negri[19]; s = 0 -> LLLsLLLLsLLL Pajarous[12] 4M (Hexachordal Dodecatonic)


(2, 1, 0) in 22ET; (2, 2, 1) in 31ET; (3, 2, 1) in 41ET; (3, 3, 2) in 50ET; (4, 3, 1) in 53ET; (5, 4, 2) in 72ET
22-ET: (2, 1, 0); 31-ET: (2, 2, 1); 41-ET: (3, 2, 1); 50-ET: (3, 3, 2); 53-ET: (4, 3, 1); 72-ET: (5, 4, 2)
=====[[SNS (2/1, 3/2, 5/4: 225/224, 441/440)-19|(2/1, 3/2, 5/4: 225/224, 441/440)[19] (Prodigy)]]=====
=====[[SNS (2/1, 3/2, 5/4: 225/224, 441/440)-19|(2/1, 3/2, 5/4: 225/224, 441/440)[19] (Prodigy)]]=====
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) 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) TE
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L = M -> LsLsLLLsLsLsLLLsLsL Meantone[19] MODMOS; M = s -> LsLsLsLsLsLsLsLsLsL Negroni[19]; s = 0 -> LLLsLLLLsLLL Pajaric[12] 4M (Hexachordal Dodecatonic)
L = M -> LsLsLLLsLsLsLLLsLsL Meantone[19] MODMOS; M = s -> LsLsLsLsLsLsLsLsLsL Negroni[19]; s = 0 -> LLLsLLLLsLLL Pajaric[12] 4M (Hexachordal Dodecatonic)


(2, 1, 1) in 29ET; (2, 2, 1) in 31ET; (3, 2, 1) in 41ET; (4, 3, 1) in 53eET; (5, 4, 2) in 72ET
29-ET: (2, 1, 1); 31-ET: (2, 2, 1); 41-ET: (3, 2, 1); 53e-ET: (4, 3, 1); 72-ET (5, 4, 2)
====[[SNS (2/1, 3/2, 5/4: 225/224, 441/440)-31|(2/1, 3/2, 5/4: 225/224, 441/440)[31]]] (Prodigy)====
====[[SNS (2/1, 3/2, 5/4: 225/224, 441/440)-31|(2/1, 3/2, 5/4: 225/224, 441/440)[31]]] (Prodigy)====
10L 19m 2s = (~33/32, 64/63~50/49~45/44~56/55, 49/48~55/54) = (49.1533c, 33.8068c, 33.4621c) TE
10L 19m 2s = (~33/32, 64/63~50/49~45/44~56/55, 49/48~55/54) = (49.1533c, 33.8068c, 33.4621c) TE
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===((2/1, 5/4)[3], 16/15)===
===((2/1, 5/4)[3], 16/15)===
====[[SNS ((2/1, 5/4)-3, 16/15)-6|((2/1, 5/4)[3], 16/15)[6]]]====
====[[SNS ((2/1, 5/4)-3, 16/15)-6|((2/1, 5/4)[3], 16/15)[6]]]====
1L 2M 3s = (6/5, 75/64, 16/15) = (267.8165c, 315.6413c, 111.7313c)
1L 2M 3s = (6/5, 75/64, 16/15) = (315.6413c, 267.8165c, 111.7313c)


75/64 5/4 3/2 8/5 15/8 2/1 as MsLsMs
75/64 5/4 3/2 8/5 15/8 2/1 as MsLsMs
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~ 7/6 5/4 3/2 8/5 15/8 2/1 as MsLsMs
~ 7/6 5/4 3/2 8/5 15/8 2/1 as MsLsMs
L = M -> LsLsLs August[6]
====[[SNS ((2/1, 5/4)-3, 16/15)-9|((2/1, 5/4)[3], 16/15)[9]]]====
====[[SNS ((2/1, 5/4)-3, 16/15)-9|((2/1, 5/4)[3], 16/15)[9]]]====
1L 2M 6s = (9/8, 1125/1024, 16/15) = (203.9100c, 162.8511c, 111.7313c)
1L 2M 6s = (9/8, 1125/1024, 16/15) = (203.9100c, 162.8511c, 111.7313c)
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L = M -> sLssLssLs Augmented[9]; M = s -> ssssLssss Negri[9]; L = s -> sLsssssLs Mavila[9] MODMOS; s = 0 -> LsL Father[3]; m = 0 -> sssLsss Eunipucrop[7]
L = M -> sLssLssLs Augmented[9]; M = s -> ssssLssss Negri[9]; L = s -> sLsssssLs Mavila[9] MODMOS; s = 0 -> LsL Father[3]; m = 0 -> sssLsss Eunipucrop[7]
=====[[SNS ((2/1, 5/4)-3, 16/15: 225/224)-9|((2/1, 5/4)[3], 16/15: 225/224)[9] (Marvel)]]=====
=====[[SNS ((2/1, 5/4)-3, 16/15: 225/224)-9|((2/1, 5/4)[3], 16/15: 225/224)[9] (Marvel)]]=====
1L 2M 6s = (~9/8, 35/32~49/45, 16/15~15/14) = (200.9152c, 151.8041c, 116.0124c) TE
1L 2M 6s = (9/8~28/25, 35/32~49/45, 16/15~15/14) = (200.9152c, 151.8041c, 116.0124c) TE


~ 16/15 7/6 5/4 4/3 3/2 8/5 12/7 15/8 2/1 as sMssLssMs
~ 16/15 7/6 5/4 4/3 3/2 8/5 12/7 15/8 2/1 as sMssLssMs
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L = M -> to sLssLssLs August[9]; M = s -> ssssLssss Negri[9]; L = s -> sLsssssLs Pelogic[9] MODMOS
L = M -> to sLssLssLs August[9]; M = s -> ssssLssss Negri[9]; L = s -> sLsssssLs Pelogic[9] MODMOS
=====[[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)]]=====
=====[[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)]]=====
1L 2M 6s = (~9/8, 35/32~49/45~12/11, 16/15~15/14) = (200.8846c, 151.4797c, 116.1327c) TE
1L 2M 6s = (9/8~28/25, 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
~ 16/15 7/6 5/4 4/3 3/2 8/5 12/7 15/8 2/1 as sMssLssMs


L = M -> sLssLssLs August[9]; M = s -> ssssLssss Negri[9], L = s -> sLsssssLs Pelogic[9] MODMOS
L = M -> sLssLssLs August[9]; M = s -> ssssLssss Negri[9]
====[[SNS ((2/1, 5/4)-3, 16/15: 225/224)-12|((2/1, 5/4)[3], 16/15: 225/224)[12] (Marvel)]]====
====[[SNS ((2/1, 5/4)-3, 16/15: 225/224)-12|((2/1, 5/4)[3], 16/15: 225/224)[12] (Marvel)]]====
9L 1M 2s = (16/15~15/14, 135/128~21/20, ~49/48) = (116.0124c, 84.9028c, 35.7917c) TE
9L 1M 2s = (16/15~15/14, 135/128~21/20, ~49/48) = (116.0124c, 84.9028c, 35.7917c) TE
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~ 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
~ 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


L = M -> LsLLLLLLLsLL Pajara[12] MODMOS; M = s -> LsLLLsLLLsLLs August[12]; L = s -> sssssLssssss Passion[12];
L = M -> LsLLLLLLLsLL Pajara[12] MODMOS; M = s -> LsLLLsLLLsLL August[12]; L = s -> sssssLssssss Passion[12];


s = 0 -> LLLLsLLLLL Negri[10]; M = 0 -> LsLLLLLLsLL Pelogic[11] MODMOS
s = 0 -> LLLLsLLLLL Negri[10]; M = 0 -> LsLLLLLLsLL Pelogic[11] MODMOS
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L = M -> LsLLLLLLLsLL Pajarous[12] MODMOS; M = s -> LsLLLsLLLsLLs August[12]; L = s -> sssssLssssss Passion[12]; s = 0 -> LLLLsLLLLL Negri[10]
L = M -> LsLLLLLLLsLL Pajarous[12] MODMOS; M = s -> LsLLLsLLLsLLs August[12]; L = s -> sssssLssssss Passion[12]; s = 0 -> LLLLsLLLLL Negri[10]
====[[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)]]====
====[[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)]]====
9L 1m 12s = (~22/21, 36/35~33/32, 49/48~45/44~56/55) = (80.7857c, 49.4049c, 35.347c) TE
9L 1m 12s = (~22/21, 36/35~33/32, 49/48~45/44~56/55) = (80.7857c, 49.4049c, 35.347c) TE
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~ 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
~ 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


m = s -> sLssLsLsLsssLsLsLssLsL Orwell[22] MODMOS; L = m -> sLssLsLsLsLsLsLsLssLsL Pajarous[22]; L = s -> MODMOS, LLLLLLLLLLsLLLLLLLLLLL Escapade[22];
m = s -> sLssLsLsLsssLsLsLssLsL Orwell[22] MODMOS; L = m -> sLssLsLsLsLsLsLsLssLsL Pajarous[22] MODMOS; L = s -> MODMOS, LLLLLLLLLLsLLLLLLLLLLL Escapade[22];


s = 0 -> LLLLsLLLLL Negri[10]
s = 0 -> LLLLsLLLLL Negri[10]
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135/128 9/8 5/4 4/3 45/32 3/2 5/3 16/9 15/8 2/1 as smLmsmLmsm
135/128 9/8 5/4 4/3 45/32 3/2 5/3 16/9 15/8 2/1 as smLmsmLmsm


m = s -> ssLsssLsss Srutal[10] MODMOS; L = m -> sLLLsLLLsL Dicot[10] MODMOS; L = s -> LsLsLsLsLs Blackwood[10]; s = 0 -> sLssLss Mavila[9]; m =0 -> sLsLs Father[5]
m = s -> ssLsssLsss 4M (Pentachordal decatonic); L = m -> sLLLsLLLsL Dicot[10] MODMOS; L = s -> LsLsLsLsLs Blackwood[10];
 
L - m = m - s -> sLALsLALsL Negri[10] MODMOS; s = 0 -> sLssLss Mavila[7]; m =0 -> sLsLs Father[5]
=====[[SNS ((2/1, 3/2)-5, 16/15: 225/224)-10|((2/1, 3/2)[5], 16/15: 225/224)[10] (Marvel)]]=====
=====[[SNS ((2/1, 3/2)-5, 16/15: 225/224)-10|((2/1, 3/2)[5], 16/15: 225/224)[10] (Marvel)]]=====
2L 5m 3s = (10/9, 16/15~15/14, 135/128~21/20) = (182.9137c, 116.0124c, 84.9028c) TE
2L 5m 3s = (10/9, 16/15~15/14, 135/128~21/20) = (182.9137c, 116.0124c, 84.9028c) TE
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~ 21/20 9/8 5/4 4/3 7/5 3/2 5/3 16/9 15/8 2/1 as smLmsmLmsm
~ 21/20 9/8 5/4 4/3 7/5 3/2 5/3 16/9 15/8 2/1 as smLmsmLmsm


m = s -> ssLsssLsss Pajara[10] MODMOS; L = m -> sLLLsLLLsL Dicot[10] MODMOS; s = 0 -> sLssLss Pelogic[9]
m = s -> ssLsssLsss 4M (Pentachordal decatonic); L = m -> sLLLsLLLsL Dicot[10] MODMOS; s = 0 -> sLssLss Pelogic[7]
=====[[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)]]=====
=====[[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)]]=====
2L 5m 3s = (10/9, 16/15~15/14, 135/128~21/20~22/21) = (184.0358c, 116.7669c, 82.9601c) TE
2L 5m 3s = (10/9, 16/15~15/14, 135/128~21/20~22/21) = (184.0358c, 116.7669c, 82.9601c) TE
Line 169: Line 176:
~ 21/20 9/8 5/4 4/3 7/5 3/2 5/3 16/9 15/8 2/1 as smLmsmLmsm
~ 21/20 9/8 5/4 4/3 7/5 3/2 5/3 16/9 15/8 2/1 as smLmsmLmsm


m = s -> ssLsssLsss Pajaric[10] MODMOS
m = s -> ssLsssLsss 4M (Pentachordal decatonic)
====[[SNS ((2/1, 3/2)-5, 16/15)-17|((2/1, 3/2)[5], 16/15)[17]]]====
====[[SNS ((2/1, 3/2)-5, 16/15)-17|((2/1, 3/2)[5], 16/15)[17]]]====
10L 2M 5s = (135/128, 256/243, 2048/2025) = (92.1787c,
10L 2M 5s = (135/128, 256/243, 2048/2025) = (92.1787c,
Line 229: Line 236:
L = M -> LLLs Dicot[4]; M = s -> sLss Bug[4]; L = s -> LsLs Antitonic[4]
L = M -> LLLs Dicot[4]; M = s -> sLss Bug[4]; L = s -> LsLs Antitonic[4]
====[[SNS (2/1, 3/2, 6/5)-7|(2/1, 3/2, 6/5)[7]]]====
====[[SNS (2/1, 3/2, 6/5)-7|(2/1, 3/2, 6/5)[7]]]====
1L 4M 2S = (9/8, 10/9, 27/25)
1L 4M 2s = (9/8, 10/9, 27/25)


10/9 6/5 4/3 3/2 5/3 9/5 2/1 as MsMLMsM
10/9 6/5 4/3 3/2 5/3 9/5 2/1 as MsMLMsM
Line 235: Line 242:
L = M -> LsLLLsL Meantone[7], M = s -> sssLsss Porcupine[7]; L = s -> LsLsLsL Dicot[7]; s = 0 -> ssLss Bug[5]
L = M -> LsLLLsL Meantone[7], M = s -> sssLsss Porcupine[7]; L = s -> LsLsLsL Dicot[7]; s = 0 -> ssLss Bug[5]
=====[[SNS (2/1, 3/2, 6/5: 126/125)-7|(2/1, 3/2, 6/5: 126/125)[7] (Starling)]]=====
=====[[SNS (2/1, 3/2, 6/5: 126/125)-7|(2/1, 3/2, 6/5: 126/125)[7] (Starling)]]=====
1L 4M 2S = (~9/8, ~10/9, 27/25~15/14) = (202.4685c, 187.562c, 123.5395c) TE
1L 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
~ 10/9 6/5 4/3 3/2 5/3 9/5 2/1 as MsMLMsM


L = M -> LsLLLsL Meantone[7]; M = s -> sssLsss Opossum[7]; L = s -> LsLsLsL Flat[7]
L = M -> LsLLLsL Meantone[7]; M = s -> sssLsss Opossum[7]; L = s -> LsLsLsL Flat[7]
8d-ET: (2, 1, 1); 12-ET: (2, 2, 1); 15-ET: (3, 2, 2); 16-ET: (2, 3, 1); 19-ET: (3, 3, 2); 27-ET: (5, 4, 3); 31-ET: (5, 5, 3); 46-ET: (8, 7, 5); 50-ET: (8, 8, 5); 58-ET: (10, 9, 6); 77-ET: (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)]]=====
=====[[SNS (2/1, 3/2, 6/5: 100/99)-7|(2/1, 3/2, 6/5: 100/99)[7] (No-7 Ptolemismic)]]=====
1L 4M 2S = (~9/8, 10/9~11/10, 27/25~12/11) = (209.7786c, 174.0549c, 146.6352c) TE
1L 4M 2s = (~9/8, 10/9~11/10, 27/25~12/11) = (209.7786c, 174.0549c, 146.6352c) TE


~ 10/9 6/5 4/3 3/2 5/3 9/5 2/1 as msmLmsm
~ 10/9 6/5 4/3 3/2 5/3 9/5 2/1 as msmLmsm


m = s -> sssLsss Porcupine[7], L = m -> LsLLLsL Meanenneadecal[7], L = s -> LsLsLsL Flat[7]
m = s -> sssLsss Porkypine[7], L = m -> LsLLLsL Meanenneadecal[7], L = s -> LsLsLsL Flat[7]
 
8d-ET: (2, 1, 1); 12-ET: (2, 2, 1); 15-ET: (3, 2, 2); 19-ET: (3, 3, 2); 22-ET: (4, 3, 3); 27e-ET: (5, 4, 3); 29-ET: (5, 4, 4); 34-ET: (6, 5, 4); 41-ET: (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)]]=====
=====[[SNS (2/1, 3/2, 6/5: 56/55, 100/99)-7|(2/1, 3/2, 6/5: 56/55, 100/99)[7] (Thrasher)]]=====
1L 4M 2S = (~9/8, 10/9~11/10, 27/25~15/14~12/11) = (215.4452c, 179.0856c, 132.5782c) TE
1L 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
~ 10/9 6/5 4/3 3/2 5/3 9/5 2/1 as MsMLMsM


L = M -> LsLLLsL Meanenneadecal[7]; M = s -> sssLsss Opossum[7]; L = s -> LsLsLsL Flat[7]
L = M -> LsLLLsL Meanenneadecal[7]; M = s -> sssLsss Opossum[7]; L = s -> LsLsLsL Flat[7]
8d-ET: (2, 1, 1); 12-ET: (2, 2, 1); 15-ET: (3, 2, 2); 19-ET: (3, 3, 2); 27e-ET: (5, 4, 3); 34-ET: (6, 5, 4)
====[[SNS (2/1, 3/2, 6/5)-12|(2/1, 3/2, 6/5)[12]]]====
====[[SNS (2/1, 3/2, 6/5)-12|(2/1, 3/2, 6/5)[12]]]====
7L 1m 4s = (27/25, 25/24, 250/243)
7L 1m 4s = (27/25, 25/24, 250/243)
Line 264: Line 278:


m = s -> sLLsLsLsLLsL Meantone[12]; L = m -> sLLsLLLsLLsL Diminished[12] MODMOS; s = 0 -> LLLsLLLL Opossum[8]
m = s -> sLLsLsLsLLsL Meantone[12]; L = m -> sLLsLLLsLLsL Diminished[12] MODMOS; s = 0 -> LLLsLLLL Opossum[8]
12-ET: (1, 1, 1); 15-ET: (2, 1, 0); 16-ET: (1, 1, 2); 19-ET: (2, 1, 1); 27-ET: (3, 2, 1); 31-ET: (3, 2, 2); 46-ET: (5, 3, 2); 50-ET: (5, 3, 3); 58-ET: (6, 4, 3); 77-ET: (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]]]=====
=====[[SNS (2/1, 3/2, 6/5: 126/125, 196/195)-12|(2/1, 3/2, 6/5: 126/125, 196/195)[12]]]=====
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) 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) TE
Line 270: Line 286:


m = s -> sLLsLsLsLLsL Meanpop[12]; L = m -> sLLsLLLsLLsL MODMOS; s = 0 -> LLLsLLLL
m = s -> sLLsLsLsLLsL Meanpop[12]; L = m -> sLLsLLLsLLsL MODMOS; s = 0 -> LLLsLLLL
12f-ET: (1, 1, 1); 15f-ET: (2, 1, 0); 19-ET: (2, 1, 1); 27-ET: (3, 2, 1); 31-ET: (3, 2, 2); 46-ET: (5, 3, 2); 50-ET: (5, 3, 3); 58-ET: (6, 4, 3); 77-ET: (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)]]=====
=====[[SNS (2/1, 3/2, 6/5: 100/99)-12|(2/1, 3/2, 6/5: 100/99)[12] (No-7 Ptolemismic)]]=====
7L 1m 4s = (27/25~12/11, 25/24~33/32, 250/243~55/54) = (146.6352c, 63.1434c, 27.4197c) TE
7L 1m 4s = (27/25~12/11, 25/24~33/32, 250/243~55/54) = (146.6352c, 63.1434c, 27.4197c) TE
Line 282: Line 300:


m = s -> sLLsLsLsLLsL Meanenneadecal[12]; L = m -> sLLsLLLsLLsL Diminished[12] MODMOS; s = 0 -> LLLsLLLL Opossum[8]
m = s -> sLLsLsLsLLsL Meanenneadecal[12]; L = m -> sLLsLLLsLLsL Diminished[12] MODMOS; s = 0 -> LLLsLLLL Opossum[8]
12-ET: (1, 1, 1); 15-ET: (2, 1, 0); 19-ET: (2, 1, 1); 27e-ET: (3, 2, 1); 34-ET: (4, 2, 1)
=====[[SNS (2/1, 3/2, 6/5: 4375/4374)-12|(2/1, 3/2, 6/5: 4375/4374)[12] (Ragismic)]]=====
=====[[SNS (2/1, 3/2, 6/5: 4375/4374)-12|(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
7L 1m 4s = (~27/25, ~25/24, 250/243~36/35) = (133.4115c, 70.5569c, 48.8911c) TE
Line 288: Line 308:


m = s -> LsLLsLsLsLLs Falttone[12]; L = m -> LsLLsLLLsLLs MODMOS; L = s -> LLLLLLsLLLLL; s = 0 -> LLLLsLLL Hystrix[8]
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)
====[[SNS (2/1, 3/2, 6/5: 4375/4374)-20|(2/1, 3/2, 6/5: 4375/4374)[20] (Ragismic)]]====
====[[SNS (2/1, 3/2, 6/5: 4375/4374)-20|(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
7L 12m 1s = (~21/20, 250/243~36/35, ~81/80) = (84.5204c, 48.8911c, 21.6658c) TE
Line 296: Line 318:


s = 0 -> LmmLmLmmLmmLmmLmLmm Falttone[19]; m = 0 -> LLLLsLLL Hystrix[8]
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)
=====[[SNS (2/1, 3/2, 6/5: 3025/3024, 4375/4374)-20|(2/1, 3/2, 6/5: 3025/3024, 4375/4374)[20] (Thor)]]=====
=====[[SNS (2/1, 3/2, 6/5: 3025/3024, 4375/4374)-20|(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
7L 12m 1s = (~21/20, 250/243~36/35, 81/80~245/242) = (84.5509c, 48.8802c, 21.6019c) TE
Line 304: Line 328:


s = 0 -> LmmLmLmmLmmLmmLmLmm; m = 0 -> LLLLsLLL
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)
====[[SNS (2/1, 3/2, 6/5: 3025/3024, 4375/4374)-39|(2/1, 3/2, 6/5: 3025/3024, 4375/4374)[39] (Thor)]]====
====[[SNS (2/1, 3/2, 6/5: 3025/3024, 4375/4374)-39|(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
7L 12m 20s = (~28/27, ~64/63, 81/80~245/242) = (62.949c, 27.2783c, 21.6019c) TE
Line 310: Line 336:


m = s -> sssLsssssLsssLsssssLsssssLsssLsssssLsss Hemiamity[39] MODMOS; L = m -> sLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLsLs; s = 0 -> sLssLsLssLssLsLssLs
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] ====
4L 3m 1s = (10/9, 27/25, 25/24)
27/25 6/5 5/4 25/18 3/2 5/3 9/5 2/1 as MLsLMLML
L=M -> LLsLLLLL Porcupine[8]; M=s -> sLsLsLsL Diminished[8]; L=s -> LsssLsLs Father[8] MODMOS; s=0 -> sLLsLsL Dicot[7]
===== ((2/1, 6/5)[4], 10/9: 100/99)[8] =  =====
4L 3m 1s = (10/9~11/10, 27/25~12/11, 25/24~33/32) = (174.0549c, 146.6353c, 63.1433c)
~ 12/11 6/5 5/4 11/8 3/2 5/3 9/5 2/1 as MLsLMLML
===== ((2/1, 6/5)[4], 10/9: 100/99, 144/143)[8] =====
4L 3m 1s = (10/9~11/10, 27/25~12/11~13/12, 25/24~33/32) = (175.892c, 142.775c, 66.766c)
~ 12/11 6/5 5/4 11/8 3/2 5/3 9/5 2/1 as MLsLMLML
===== ((2/1, 6/5)[4], 10/9: 325/324)[8] =====
4L 3m 1s = (10/9, 27/25~13/12, 25/24)
~ 27/25 6/5 5/4 18/13 3/2 5/3 9/5 2/1 as MLsLMLML
==== ((2/1, 6/5)[4], 10/9)[15] ====
4L 8m 3s = (16/15, 25/24, 648/625)
25/24 10/9 125/108 6/5 5/4 4/3 25/18 36/25 3/2 8/5 5/3 216/125 48/25 2/1 as mLmsmLmsmLmsmLm
m=s -> sLsssLsssLsssLs Hanson[15]; L = m -> LLLsLLLsLLLsLLL Augmented[15] mod; L=s ->  sLsLsLsLsLsLsLs; Porcupine[15]; s=0 -> sLssLssLssLs Diminished[12]
===== ((2/1, 6/5)[4], 10/9: 100/99)[15] =====
4L 3m 8s = (~16/15, 648/625, 25/24~33/32)
~ 25/24 10/9 55/48 6/5 5/4 4/3 11/8 16/11 3/2 8/5 5/3 72/55 48/25 2/1 as sLsmsLsmsLsmsLs
===== ((2/1, 6/5)[4], 10/9: 100/99, 144/143)[15] =====
4L 3m 8s = (~16/15, 26/25, 25/24~33/32~27/26) = (109.1256c, 76.00911c, 66.76626c)
~ 25/24 10/9 15/13 6/5 5/4 4/3 11/8 13/9 3/2 8/5 5/3 26/15 48/25 2/1 as sLsmsLsmsLsmsLsm
===== ((2/1, 6/5)[4], 10/9: 325/324)[15] =====
4L 3m 8s = (~16/15, 26/25, 25/24~27/26)
~ 25/24 10/9 15/13 6/5 5/4 4/3 18/13 13/9 3/2 8/5 5/3 26/15 48/25 2/1 as sLsmsLsmsLsmsLsm
==== ((2/1, 6/5)[4], 10/9: 325/324)[22] ====
15L 4M 3s = (25/24~27/26, 128/125, 676/675)
LMLLsLLMLLsLLMLLsLLMLL
~ 25/24 16/15 10/9 15/13 (52/45) 6/5 5/4 32/25 4/3 18/13 (104/75) 13/9 3/2 192/125 8/5 5/3 (208/125) 26/15 65/36 416/225 48/25 2/1
L=M -> LLLLsLLLLLsLLLLLsLLLLL Magic[22] MODMOS; M=s -> LsLLsLLsLLsLLsLLsLLsLL Porcupine[22]; L=s -> sLsssssLsssssLsssssLss; s=0 -> LsLLLLsLLLLsLLLLsLL Hanson[19]
===== ((2/1, 6/5)[4], 10/9: 100/99, 144/143)[22] =====
15L 4M 3s = (25/24~33/32~27/26, 128/125, 676/675)
LMLLsLLMLLsLLMLLsLLMLL
~ 25/24 16/15 10/9 15/13 (52/45) 6/5 5/4 32/25 4/3 11/8 (104/75) 13/9 3/2 192/125 8/5 5/3 (208/125) 26/15 65/36 416/225 48/25 2/1
L=M -> LLLLsLLLLLsLLLLLsLLLLL Magic[22] MODMOS; M=s -> LsLLsLLsLLsLLsLLsLLsLL Porcupine[22]; L=s -> sLsssssLsssssLsssssLss; s=0 -> LsLLLLsLLLLsLLLLsLL Hanson[19]
===== ((2/1, 6/5)[4], 10/9: 100/99, 144/143, 225/224)[22] =====
15L 4M 3s = (25/24~33/32~27/26~28/27, 128/125~36/35, 169/168)
LMLLsLLMLLsLLMLLsLLMLL
~ 25/24 16/15 10/9 15/13 (52/45) 6/5 5/4 32/25 4/3 11/8 (39/28) 13/9 3/2 54/35 8/5 5/3 (117/71) 26/15 65/36 13/7 48/25 2/1
==2.3.5; [[Hemifamity family#Hemifamity|Hemifamity]] ==
==2.3.5; [[Hemifamity family#Hemifamity|Hemifamity]] ==
===((2/1, 3/2)[5], 10/9)===
===((2/1, 3/2)[5], 10/9)===
Line 410: Line 507:
L = M -> LsLLLs; M = s -> sssLss; L = s -> LsLsLs
L = M -> LsLLLs; M = s -> sssLss; L = s -> LsLsLs
====[[SNS ((2/1, 5/4)-3, 9/8)-10|((2/1, 5/4)[3], 9/8)[10]]]====
====[[SNS ((2/1, 5/4)-3, 9/8)-10|((2/1, 5/4)[3], 9/8)[10]]]====
6L 1M 3s = (10/9, 128/125, 81/80)
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,
10/9 9/8 5/4 25/18 45/32 25/16 8/5 16/9 9/5 2/1 as LsLLsLmLsL,
Line 416: Line 513:
m = s -> LsLLsLsLsL MODMOS; L = m -> LsLLsLLLsL; L = s -> LLLLLLsLLL; s = 0 -> LLLLsLL; m = 0 -> LsLLsLLsL
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)]]=====
=====[[SNS ((2/1, 5/4)-3, 9/8: 225/224)-10|((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
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
~ 10/9 9/8 5/4 25/18 7/5 14/9 8/5 16/9 9/5 2/1 as LsLmLsLLsL
Line 422: Line 519:
m = s -> LsLsLsLLsL MODMOS; L = m -> LsLLLsLLsL; L = s -> LLLsLLLLLL; s = 0 -> LLsLLLL; m = 0 -> LsLLsLLsL
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)]]=====
=====[[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)]]=====
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
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
~10/9 9/8 5/4 11/8 7/5 14/9 8/5 16/9 9/5 2/1 as LsLmLsLLsL
Line 496: Line 593:
8/7 7/6 4/3 3/2 12/7 7/4 2/1 as LsLMLsL
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]
L = M -> LsLLLsL Archy[7]; 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)]]=====
=====[[SNS (2/1, 3/2, 7/6: 1728/1715)-7|(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
4L 1M 2s = (~8/7, ~9/8, 49/48~36/35) = (227.1393c, 204.1935c, 43.334c) TE
Line 502: Line 599:
~ 8/7 7/6 4/3 3/2 12/7 7/4 2/1 as LsLMLsL
~ 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]
L = M -> LsLLLsL Superpyth[7]; s = 0 -> LLsLL Beep[5]
====[[SNS (2/1, 3/2, 7/6: 1728/1715)-12|(2/1, 3/2, 7/6: 1728/1715)[12] (Orwellismic)]]====
====[[SNS (2/1, 3/2, 7/6: 1728/1715)-12|(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
4L 1M 7s = (~10/9, 54/49~35/32, 49/48~36/35) = (183.8053c, 160.8595c, 43.334c) TE
Line 544: Line 641:
~ 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
~ 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]
m = s -> ssLssssLsssssssLssssLs Doublewide[22] MODMOS; L = m -> ssLssssLsssLsssLssssLs Superpyth[22]; s = 0 -> LLsLL Beep[5]
=====[[SNS (2/1, 3/2, 7/6: 99/98, 385/384)-22|(2/1, 3/2, 7/6: 99/98, 385/384)[22] (Orwellian)]]=====
=====[[SNS (2/1, 3/2, 7/6: 99/98, 385/384)-22|(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
4L 1m 17s = (~200/189, 25/24~80/77, 49/48~36/35~33/32) = (99.3869c, 69.0538c, 43.1875c) TE
Line 550: Line 647:
~ 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
~ 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]
m = s -> ssLssssLsssssssLssssLs Doublewide[22] MODMOS; L = m -> ssLssssLsssLsssLssssLs Suprapyth[22]; 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)]]=====
=====[[SNS (2/1, 3/2, 7/6: 176/175, 540/539)-22|(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
4L 1m 17s = (~200/189, 25/24~22/21, 49/48~36/35~45/44) = (97.8256c, 76.5265c, 43.0239c) TE
Line 556: Line 653:
~ 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
~ 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]
m = s -> ssLssssLsssssssLssssLs Fleetwood[22] MODMOS; L = m -> ssLssssLsssLsssLssssLs Superpyth[22]
====[[SNS (2/1, 3/2, 7/6: 1728/1715)-27|(2/1, 3/2, 7/6: 1728/1715)[27] (Orwellismic)]]====
====[[SNS (2/1, 3/2, 7/6: 1728/1715)-27|(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
4L 22M 1s = (~250/243, 49/48~36/35, ~50/49) = (53.8033c, 43.334c, 30.8575c) TE
Line 618: Line 715:
L = 0 -> LsLsLsLsLLsLsLsLsLsLLsLsLsLsLLsLsLsLsLsLLsLsLsLsL Superpyth[49]
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], 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)[12], 36/35: 1728/1715)[24] (Orwellismic)====
 
=== ((2/1, 7/6)[4], 12/11) Orwellian ===
MsMsMsML
 
12/11 7/6 14/11 11/8 3/2 8/5 96/55~26/15 2/1
 
sM
 
=== ((2/1, 7/6)[4], 11/10) Guanyin ===
11/10 7/6 77/60 15/11 3/2 8/5 44/25 2/1
 
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[[Category:Rank-3 scales]]
[[Category:Lists of scales]]
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