ABACABADABACABA JI scales: Difference between revisions
No edit summary |
m Text replacement - "Category:Just intonation scales" to "Category:Just intonation scales Category:Pages with mostly numerical content" |
||
| (7 intermediate revisions by 4 users not shown) | |||
| Line 1: | Line 1: | ||
ABACABADABACABA is the (8,4,2,1) [[SNS]] pattern | ABACABADABACABA is the quaternary [[Fraenkel word]] or the rank-4 power [[SNS]], i.e., the (8,4,2,1) [[SNS]] pattern. When covering a period of 2/1, such scales are known as Cantor-3 scales. ABACABADABACABA scales can be conceived of as two equivalent [[ABACABA JI scales|ABACABA scales]] and a remaining step D, akin to how ABACABA scales can be conceived of as two equivalent ABA tetrachords and a remaining step C. We will classify ABACABADABACABA scales on this page as such, grouping them by the interval subtended by ABACABA, which we will call an octochord. As [[step-nested scales]], ABACABADABACABA scales can be described of as SNS (P, P/O, O/T, A), or equivalently as SNS (P, O, T, A) etc. where P is the period, O is the interval subtended by ABACABA, the octochord, and T is the interval subtended by ABA, the tetrachord. ABACABADABACABA scales, unlike ABA and ABACABA scales, are not [[Rank-3 scale#Pairwise well-formed scales|pairwise well-formed]], and thus their mean variety is above 4. ABACABADABACABA scales have v4454654 4564544, with mean variety ~ 4.57. | ||
== 729-limit ABACABADABACABA JI scales with period 2/1, with steps > 20c == | == 729-limit ABACABADABACABA JI scales with period 2/1, with steps > 20c == | ||
| Line 202: | Line 202: | ||
|256/245 (~76.03c) | |256/245 (~76.03c) | ||
|1/1 33/32 35/33 35/32 8/7 33/28 40/33 5/4 8/5 33/20 48/33 7/4 64/35 66/35 64/33 2/1 | |1/1 33/32 35/33 35/32 8/7 33/28 40/33 5/4 8/5 33/20 48/33 7/4 64/35 66/35 64/33 2/1 | ||
| | |1225 | ||
|22 | |22 | ||
|- | |- | ||
| Line 209: | Line 209: | ||
|256/245 (~76.03c) | |256/245 (~76.03c) | ||
|1/1 35/34 17/16 35/32 8/7 20/17 17/14 5/4 8/5 28/17 17/10 7/4 64/35 32/17 35/17 2/1 | |1/1 35/34 17/16 35/32 8/7 20/17 17/14 5/4 8/5 28/17 17/10 7/4 64/35 32/17 35/17 2/1 | ||
| | |1225 | ||
|22 | |22 | ||
|} | |} | ||
| Line 227: | Line 227: | ||
|250/243 (~49.17c) | |250/243 (~49.17c) | ||
|1/1 36/35 21/20 27/25 10/9 8/7 7/6 6/5 5/3 12/7 7/4 9/5 50/27 40/21 35/18 2/1 | |1/1 36/35 21/20 27/25 10/9 8/7 7/6 6/5 5/3 12/7 7/4 9/5 50/27 40/21 35/18 2/1 | ||
| | |1225 | ||
|26/27 | |26/27 | ||
|} | |} | ||
| Line 245: | Line 245: | ||
|250/243 (~49.17c) | |250/243 (~49.17c) | ||
|1/1 36/35 21/20 27/25 10/9 8/7 7/6 6/5 5/4 9/7 21/16 27/20 25/18 10/7 35/24 3/2 | |1/1 36/35 21/20 27/25 10/9 8/7 7/6 6/5 5/4 9/7 21/16 27/20 25/18 10/7 35/24 3/2 | ||
| | |1225 | ||
|} | |} | ||
Noticing that A and C are almost exactly the same size, we temper them together without much loss of accuracy, tempering out [[4375/4374]], the [[Ragisma]]. The tempered scale then has a scale pattern of ABAAABACABAAABA (relabeling so the most frequent step is A and the least frequent is C). | Noticing that A and C are almost exactly the same size, we temper them together without much loss of accuracy, tempering out [[4375/4374]], the [[Ragisma]]. The tempered scale then has a scale pattern of ABAAABACABAAABA (relabeling so the most frequent step is A and the least frequent is C). | ||
[[Category:Step-nested scales]] | |||
[[Category:Just intonation scales]] | |||
[[Category:Pages with mostly numerical content]] | |||