Gallery of 3-SN scales: Difference between revisions
→(2/1, 3/2, 100/81: 4375/4374)[7] (Ragismic): +{1225/1224, 1701/1700} tempering |
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See [[SN scale]] and [[Rank-3 scale]]. | See [[SN scale]] and [[Rank-3 scale]]. | ||
| Line 1,247: | Line 1,245: | ||
{| class="wikitable" | {| class="wikitable" | ||
|+Rank-2 temperings (mode 2) | |+Rank-2 temperings (mode 2) | ||
!Equivalence | ! Equivalence | ||
!Step pattern | ! Step pattern | ||
!Scale | ! Scale | ||
!Comma list | ! Comma list | ||
|- | |- | ||
|L = M | | L = M | ||
|LsLsLs | | LsLsLs | ||
|[[Augmented | | [[Augmented (temperament)|Augmented]][6] | ||
|128/125 | | 128/125 | ||
|- | |- | ||
|M = s | | M = s | ||
|ssLsss | | ssLsss | ||
|[[Enipucrop]][6] | | [[Enipucrop]][6] | ||
|1125/1024 | | 1125/1024 | ||
|- | |- | ||
|L = s | | L = s | ||
|LsssLs | | LsssLs | ||
|Antitonic[6] 4M | | Antitonic[6] 4M | ||
| 9/8 | | 9/8 | ||
|- | |- | ||
|s = 0 | | s = 0 | ||
|LsL | | LsL | ||
|[[ | | [[Father]][3] | ||
|16/15 | | 16/15 | ||
|} | |} | ||
=====[[SNS ((2/1, 5/4)-3, 16/15: 225/224)-6|((2/1, 5/4)[3], 16/15: 225/224)[6] (Marvel)]]===== | =====[[SNS ((2/1, 5/4)-3, 16/15: 225/224)-6|((2/1, 5/4)[3], 16/15: 225/224)[6] (Marvel)]]===== | ||
| Line 1,320: | Line 1,318: | ||
{| class="wikitable" | {| class="wikitable" | ||
|+Rank-2 temperings (mode 2) | |+Rank-2 temperings (mode 2) | ||
!Equivalence | ! Equivalence | ||
!Step pattern | ! Step pattern | ||
!Scale | ! Scale | ||
!Comma list | ! Comma list | ||
|- | |- | ||
|L = M | | L = M | ||
|LsLsLs | | LsLsLs | ||
|[[ | | [[August]][6] | ||
|128/125 | | 128/125 | ||
|} | |} | ||
{| class="wikitable" | {| class="wikitable" | ||
| Line 1,424: | Line 1,422: | ||
{| class="wikitable" | {| class="wikitable" | ||
|+Rank-2 temperings (mode 0) | |+Rank-2 temperings (mode 0) | ||
!Equivalence | ! Equivalence | ||
!Step pattern | ! Step pattern | ||
!Scale | ! Scale | ||
!Comma list | ! Comma list | ||
|- | |- | ||
|L = M | | L = M | ||
|[[3L 6s|sLssLssLs]] | | [[3L 6s|sLssLssLs]] | ||
|[[Augmented | | [[Augmented (temperament)|Augmented]][9] | ||
|128/125 | | 128/125 | ||
|- | |- | ||
|M = s | | M = s | ||
|[[1L 8s|ssssLssss]] | | [[1L 8s|ssssLssss]] | ||
|[[ | | [[Negri]][9] | ||
|16875/16384 | | 16875/16384 | ||
|- | |- | ||
|L = s | | L = s | ||
|[[OTC 2L ns|sLsssssLs]] | | [[OTC 2L ns|sLsssssLs]] | ||
|[[Mavila]][9] MODMOS | | [[Mavila]][9] MODMOS | ||
| 135/128 | | 135/128 | ||
|- | |- | ||
|L - M = M - s | | L - M = M - s | ||
|sLssAssLs | | sLssAssLs | ||
|[[Orson]][9] MODMOS | | [[Orson]][9] MODMOS | ||
|2109375/2097152 | | 2109375/2097152 | ||
|- | |- | ||
|s = 0 | | s = 0 | ||
|LsL | | LsL | ||
|[[Father]][3] | | [[Father]][3] | ||
|16/15 | | 16/15 | ||
|- | |- | ||
|m = 0 | | m = 0 | ||
|[[1L 6s|sssLsss]] | | [[1L 6s|sssLsss]] | ||
|[[Enipucrop]][7] | | [[Enipucrop]][7] | ||
|1125/1024 | | 1125/1024 | ||
|} | |} | ||
=====[[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)]]===== | ||
| Line 2,495: | Line 2,493: | ||
m = 0 -> LssLsLsLssLsLssLsLssLsLsLssLsLssLsLsLssLsLssLsLsLssLsLsssLsLssLsLsLssLs Andromeda[70] MODMOS | m = 0 -> LssLsLsLssLsLssLsLssLsLsLssLsLssLsLsLssLsLssLsLsLssLsLsssLsLssLsLsLssLs Andromeda[70] MODMOS | ||
==2.3.5; [[Starling]], [[Ptolemismic temperaments|No-7 Ptolemismic]], and [[Ragismic family#Ragismic|Ragismic]]== | ==2.3.5; [[Starling]], [[Ptolemismic temperaments|No-7 Ptolemismic]], [[Supermagic]], and [[Ragismic family#Ragismic|Ragismic]]== | ||
===(2/1, 3/2, 6/5)=== | ===(2/1, 3/2, 6/5)=== | ||
====[[SNS (2/1, 3/2, 6/5)-4|(2/1, 3/2, 6/5)[4]]]==== | ====[[SNS (2/1, 3/2, 6/5)-4|(2/1, 3/2, 6/5)[4]]]==== | ||
| Line 3,380: | Line 3,378: | ||
{| class="wikitable" | {| class="wikitable" | ||
|+Rank-2 temperings (mode -3) | |+Rank-2 temperings (mode -3) | ||
!Equivalence | ! Equivalence | ||
!Step pattern | ! Step pattern | ||
!Scale | ! Scale | ||
!Comma list | ! Comma list | ||
|- | |||
| m = s | |||
| [[7L 5s|sLLsLsLsLLsL]] | |||
| [[Meantone]][12] | |||
| 81/80 | |||
|- | |- | ||
| L = m | |||
| sLLsLLLsLLsL | |||
| [[Diminished (temperament)|Diminished]][12] MODMOS | |||
| 648/625 | |||
|L = m | |||
|sLLsLLLsLLsL | |||
|[[ | |||
|648/625 | |||
|- | |- | ||
|L = s | | L = s | ||
|[[11L 1s|LLLLLsLLLLLL]] | | [[11L 1s|LLLLLsLLLLLL]] | ||
|[[ | | [[Ripple]][12] | ||
|6561/6250 | | 6561/6250 | ||
|- | |- | ||
|L - m = m - s | | L - m = m - s | ||
|dLLdLsLdLLdL | | dLLdLsLdLLdL | ||
|[[Augmented | | [[Augmented (temperament)|Augmented]][12] modmos | ||
|128/125 | | 128/125 | ||
|- | |- | ||
|s = 0 | | s = 0 | ||
|[[7L 1s|LLLsLLLL]] | | [[7L 1s|LLLsLLLL]] | ||
|[[ | | [[Porcupine]][8] | ||
|250/243 | | 250/243 | ||
|} | |} | ||
=====[[SNS (2/1, 3/2, 6/5: 126/125)-12|(2/1, 3/2, 6/5: 126/125)[12] (Starling)]]===== | =====[[SNS (2/1, 3/2, 6/5: 126/125)-12|(2/1, 3/2, 6/5: 126/125)[12] (Starling)]]===== | ||
{| class="wikitable" | {| class="wikitable" | ||
| Line 3,514: | Line 3,513: | ||
{| class="wikitable" | {| class="wikitable" | ||
|+Rank-2 temperings (mode -3) | |+Rank-2 temperings (mode -3) | ||
!Equivalence | ! Equivalence | ||
!Step pattern | ! Step pattern | ||
!Scale | ! Scale | ||
!Comma list | ! Comma list | ||
|- | |- | ||
|m = s | | m = s | ||
|[[7L 5s|sLLsLsLsLLsL]] | | [[7L 5s|sLLsLsLsLLsL]] | ||
|[[ | | [[Meantone]][12] | ||
|81/80, 126/125 | | 81/80, 126/125 | ||
|- | |- | ||
|L = m | | L = m | ||
|sLLsLLLsLLsL | | sLLsLLLsLLsL | ||
|[[Diminished]][12] MODMOS | | [[Diminished (temperament)|Diminished]][12] MODMOS | ||
|36/35, 50/49 | | 36/35, 50/49 | ||
|- | |- | ||
|L - m = m - s | | L - m = m - s | ||
|dLLdLsLdLLdL | | dLLdLsLdLLdL | ||
|[[ | | [[Augene]][12] MODMOS | ||
|64/63, 126/125 | | 64/63, 126/125 | ||
|- | |- | ||
|s = 0 | | s = 0 | ||
|[[7L 1s|LLLsLLLL]] | | [[7L 1s|LLLsLLLL]] | ||
|[[ | | [[Opossum]][8] | ||
|28/27, 126/125 | | 28/27, 126/125 | ||
|} | |} | ||
{| class="wikitable" | {| class="wikitable" | ||
| Line 3,803: | Line 3,802: | ||
{| class="wikitable" | {| class="wikitable" | ||
|+Rank-2 temperings (mode -3) | |+Rank-2 temperings (mode -3) | ||
!Equivalence | ! Equivalence | ||
!Step pattern | ! Step pattern | ||
!Scale | ! Scale | ||
!Comma list | ! Comma list | ||
|- | |- | ||
|m = s | | m = s | ||
|[[7L 5s|sLLsLsLsLLsL]] | | [[7L 5s|sLLsLsLsLLsL]] | ||
|[[Meanenneadecal]][12] or [[ | | [[Meanenneadecal]][12] or [[Flattone]][12] | ||
|45/44, 81/80 | | 45/44, 81/80 | ||
|- | |- | ||
|L = m | | L = m | ||
|sLLsLLLsLLsL | | sLLsLLLsLLsL | ||
|[[ | | [[Diminished (temperament)|Diminished]][12] modmos | ||
|100/99, 128/121 | | 100/99, 128/121 | ||
|- | |- | ||
|L - m = m - s | | L - m = m - s | ||
|dLLdLsLdLLdL | | dLLdLsLdLLdL | ||
|[[ | | [[Augene]][12] modmos | ||
|100/99, 128/125 | | 100/99, 128/125 | ||
|- | |- | ||
|s = 0 | | s = 0 | ||
|[[7L 1s|LLLsLLLL]] | | [[7L 1s|LLLsLLLL]] | ||
|[[Porcupine | | [[Porcupine]][8] | ||
|55/54, 100/99 | | 55/54, 100/99 | ||
|} | |} | ||
| Line 3,995: | Line 3,994: | ||
|} | |} | ||
=====(2/1, 3/2, 6/5: 100/99, 385/384)[12] ([[Keemic | ===== (2/1, 3/2, 6/5: 100/99, 385/384)[12] ([[Keemic]]) ===== | ||
{| class="wikitable" | {| class="wikitable" | ||
!Step signature | !Step signature | ||
| Line 4,135: | Line 4,134: | ||
|(13, 5, 2) | |(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 | ===== [[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" | {| class="wikitable" | ||
!Step signature | !Step signature | ||
| Line 4,382: | Line 4,381: | ||
!Comma list | !Comma list | ||
|- | |- | ||
|m = s | | m = s | ||
|[[7L 5s|sLLsLsLsLLsL]] | | [[7L 5s|sLLsLsLsLLsL]] | ||
|[[Meanenneadecal]][12] | | [[Meanenneadecal]][12] | ||
|45/44, 56/55, 81/80 | | 45/44, 56/55, 81/80 | ||
|- | |- | ||
|L = m | | L = m | ||
|sLLsLLLsLLsL | | sLLsLLLsLLsL | ||
|[[ | | [[Diminished (temperament)|Diminished]][12] MODMOS | ||
|36/35, 50/49, 56/55 | | 36/35, 50/49, 56/55 | ||
|- | |- | ||
|s = 0 | | s = 0 | ||
|[[7L 1s|LLLsLLLL]] | | [[7L 1s|LLLsLLLL]] | ||
|[[ | | [[Opossum]][8] | ||
|28/27, 55/54, 77/75 | | 28/27, 55/54, 77/75 | ||
|} | |} | ||
{| class="wikitable" | {| class="wikitable" | ||
| Line 4,546: | Line 4,545: | ||
|(4, 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)]]===== | ===== [[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 4,554: | Line 4,553: | ||
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) | 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)==== | |||
==== (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) = | 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] ( | ==== (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 | 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 | 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 | ||
====[[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 4,573: | Line 4,573: | ||
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) | 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 4,583: | Line 4,584: | ||
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) | 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 4,592: | Line 4,594: | ||
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) | 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, | === ((2/1, 6/5)[4], 10/9) === | ||
====(2/1, | |||
==== ((2/1, 6/5)[4], 10/9)[8] ==== | |||
{| class="wikitable" | {| class="wikitable" | ||
!Step signature | !Step signature | ||
| Line 4,599: | Line 4,602: | ||
!Step sizes in cents | !Step sizes in cents | ||
|- | |- | ||
| | |4L 3M 1s | ||
| | |10/9, 27/25, 25/24 | ||
|( | |(182.4037c, 133.2376c, 70.6724c) | ||
|} | |} | ||
{| class="wikitable" | {| class="wikitable" | ||
|+ | |||
!Mode number | !Mode number | ||
!Mode in JI | !Mode in JI (height order) | ||
!Step pattern | !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" | {| class="wikitable" | ||
|+Rank-2 temperings (mode 4) | |||
!Equivalence | |||
|- | |||
! | |||
!Step pattern | !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 | ||
|~ 27/25 21/ | |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 | |||
|- | |||
L = M | |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 | |||
===((2/1, | !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] ==== | |||
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) | |||
9/ | ===== (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) | ||
~ 9/ | ~ 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) | |||
10/9 | ===== (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) | |||
~10/9 | ~ 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 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]]]==== | |||
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] | |||
====[[SNS ((2/1, 3/2)-5, 10/9: 5120/5103)-17|((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; | |||
m = s -> | L - m = m - s -> Garibaldi[17]; s = 0 -> LsLLLsL Dominant[7]; m = 0 -> sLssLssLssLssLs | ||
====[[SNS ((2/1, | =====[[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)]]===== | ||
5L 2m 10s = (35/32~12/11, 256/243~21/20, 81/80~64/63~55/54) = (156.6236c, 85.7981c, 26.2356c) TE | |||
10/9 9/8 5/4 | ~ 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 -> | m = s -> sLsssLssLssLsssLs; L = m -> sLsLsLssLssLsLsLs; L = s -> sssLsssssssssLsss; s = 0 -> LsLLLsL Arnold[7]; m = 0 -> sLssLssLssLssLs | ||
====[[SNS ((2/1, 3/2)-5, 10/9: 5120/5103)-24|((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 | |||
~ 10/9 9/8 5/4 | ~ 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 -> | m = s -> sLsssssLsssLsssLsssssLss Immunity[24] MODMOS; L = m -> sLssLssLsssLsssLssLssLss; L = s -> LLLLsLLLLLLLLLLLLLsLLLLL; s = 0 -> LsLLLsL Dominant[7] | ||
====[[SNS ((2/1, | =====[[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)]]===== | ||
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 -> | 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)]]==== | |||
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 -> | m = s -> ssLsssssssLssssLssssLsssssssLss Rodan[31] MODMOS; L = m -> ssLsssLsssLssssLssssLsssLsssLss; L = s -> LLLLLLsLLLLLLLLLLLLLLLLsLLLLLLL; | ||
7/ | 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)]]===== | |||
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) === | |||
====[[SNS ((2/1, 3/2)-12, 64/63: 5120/5103)-24|((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 | |||
~ 8/7 | ~ 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 -> | L = M -> sLsLsLsLsLsLsLsLsLsLsLsLsL; M = s -> sLsssssLsssLsssLsssssLss Immunity[24] MODMOS; L = s -> sssLsLsssLsssLsssLsLsssL; s = 0 -> LssLsLsLssLs Dominant[12] | ||
====[[SNS (2/1, 3/2, | =====[[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)]]===== | ||
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 -> | L = M -> sLsLsLsLsLsLsLsLsLsLsLsLsL; M = s -> sLsssssLsssLsssLsssssLss Immunity[24] MODMOS; L = s -> sssLsLsssLsssLsssLsLsssL; s = 0 -> LssLsLsLssLs Dominant[12] | ||
====[[SNS ((2/1, 3/2)-12, 64/63: 5120/5013)-36|((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 -> | L = M -> ssLssLssLssLssLssLssLssLssLssLssLssLssL; M = s -> ssLssssssssLsssssLsssssLssssssssLsss Rodan[36] MODMOS; L = s -> sssssLssLsssssLsssssLsssssLssLsssssL; | ||
s = 0 -> LssLsLsLssLs Dominant[12]; m = 0 -> ssLssssssLssssLssssLssssssLsss Immunity[29] MODMOS | |||
=====[[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)]]===== | |||
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)===== | ||
{| 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 | |||
|} | |||
=====[[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 | |||
|} | |||
==2.5.9; Marvel == | |||
====[[SNS (2/1, 3 | === ((2/1, 5/4)[3], 9/8)=== | ||
====[[SNS ((2/1, 5/4)-3, 9/8)-6|((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 -> | 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)]]===== | |||
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 | |||
=====[[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)]]===== | |||
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 | |||
====[[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) | |||
10/9 9/8 5/4 25/18 45/32 25/16 8/5 16/9 9/5 2/1 as LsLLsLmLsL, | |||
m = s -> | 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)]]===== | |||
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 | |||
=====[[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 | |||
~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 | |||
====[[SNS ((2/1, 5/4)-3, 9/8)-17|((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 | |||
L = 0 -> | m = s -> sLsLssLsssLssLsLs MODMOS; L = m -> LLLLLLLLsLLLLLLLL; L = s -> sLsLssLsLsLssLsLs; s = 0 -> sLsLssLssLssLsLs MODMOS; m = 0 -> LLLsLLL | ||
=====[[SNS (2/1, 3 | =====[[SNS ((2/1, 5/4)-3, 9/8: 225/224)-17|((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 | ||
L = | 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)]]===== | |||
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 | |||
s = 0 -> | 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)=== | |||
====[[SNS ((2/1, 5/4)-3, 10/9)-6|((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 | |||
=====[[SNS ((2/1, 5/4)-3, 10/9: 126/125)-6|((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 | |||
====[[SNS ((2/1, 5/4)-3, 10/9)-9|((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 | |||
L = 0 -> | m = s -> LsLLsLLsL; L = m -> LsLLLLLsL MODMOS; L = s -> LLLLsLLLL; s = 0 -> LLLsLLL; m = 0 -> LsLLLLsL MODMOS | ||
===((2/1, | =====[[SNS ((2/1, 5/4)-3, 10/9: 126/125)-9|((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 | |||
=== (2/1, 3/2, 9/ | 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]]]==== | |||
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 | |||
9/ | 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]]]===== | |||
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 family#Orwellismic|Orwellismic]]== | |||
===(2/1, 3/2, 7/6)=== | |||
====[[SNS (2/1, 3/2, 7/6)-4|(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] | |||
====[[SNS (2/1, 3/2, 7/6)-7|(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] | |||
=====[[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 | |||
~ 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] | |||
====[[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 | |||
~ 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] | |||
=====[[SNS (2/1, 3/2, 7/6: 99/98, 385/384)-12|(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] | |||
=====[[SNS (2/1, 3/2, 7/6: 176/175, 540/539)-12|(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 | |||
====[[SNS (2/1, 3/2, 7/6: 1728/1715)-17|(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] | |||
=====[[SNS (2/1, 3/2, 7/6: 99/98, 385/384)-17|(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] | |||
=====[[SNS (2/1, 3/2, 7/6: 176/175, 540/539)-17|(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 | |||
====[[SNS (2/1, 3/2, 7/6: 1728/1715)-22|(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] | |||
=====[[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 | |||
~ 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] | |||
=====[[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 | |||
~ 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] | |||
====[[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 | |||
==== (2/1, 3/2, 9/7: 245/243, 385/384)[16] Sensamagic ==== | ~ 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] | |||
=====[[SNS (2/1, 3/2, 7/6: 99/98, 385/384)-27|(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] | |||
=====[[SNS (2/1, 3/2, 7/6: 176/175, 540/539)-27|(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 | |||
====[[SNS (2/1, 3/2, 7/6: 1728/1715)-53|(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 | |||
=====[[SNS (2/1, 3/2, 7/6: 99/98, 385/384)-53|(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] | |||
=====[[SNS (2/1, 3/2, 7/6: 176/175, 540/539)-53|(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) | 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 | ~ 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 | |||
{{Navbox scale gallery}} | |||
[[Category:Step-nested scales]] | [[Category:Step-nested scales]] | ||
[[Category:Rank-3 scales]] | [[Category:Rank-3 scales]] | ||
[[Category:Lists of scales]] | [[Category:Lists of scales]] | ||
[[Category:Rank 3]] | [[Category:Rank 3]] | ||
{{Todo| cleanup }} | |||