Hemimage temperaments: Difference between revisions
→Degrees: add pretty obvious 17- and 19-limit extensions. the badness here is inconsistent/potentially wrong w.r.t fumica's default badness so i chose to add dirichlet badness. also 20cde is important as an archetype |
m →Degrees: add 41-limit extension that lowers the badness and has an accurate 41 based on convergents of 20 EDO intervals 56/4141/30 |
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Badness (Dirichlet): 1.273 | Badness (Dirichlet): 1.273 | ||
=== 23-limit === | |||
An obvious extension to the 23-limit exists by equating 4\20 = 1\5 with [[23/20]], 6\20 = 3\10 with [[69/56]], 7\20 with [[23/18]], etc. | |||
Subgroup: 2.3.5.7.11.13.17.19.23 | |||
Comma list: 325/324, 352/351, 1001/1000, 1331/1323, 289/288, 400/399, 460/459 | |||
Mapping: {{mapping| 20 0 -17 -39 -26 74 50 85 27 | 0 1 2 3 3 0 1 0 2 }} | |||
Optimal tuning (CTE): ~28/27 = 1\20, ~3/2 = 703.169 | |||
{{Optimal ET sequence|legend=1| 20cdei, 60e, 80, 140 }} | |||
Badness (Dirichlet): 1.209 | |||
=== 29-limit === | |||
By observing that 1\20 works as [[30/29]]~[[29/28]]~[[28/27]] (with 29/28 being especially accurate) and by equating [[29/22]] with 2\5 = 240{{cent}} we get a uniquely elegant extension to the 29-limit which tempers ([[33/25]])/([[29/22]]) = [[726/725]], [[784/783|S28 = 784/783]] and [[841/840|S29 = 841/840]]. An edo as large as [[220edo|220]] supports it by patent val, though it doesn't appear in the optimal ET sequence, and [[80edo]] and [[140edo]] are both much more recommendable tunings. | |||
Subgroup: 2.3.5.7.11.13.17.19.23.29 | |||
Comma list: 325/324, 352/351, 1001/1000, 1331/1323, 289/288, 400/399, 460/459, 726/725 | |||
Mapping: {{mapping| 20 0 -17 -39 -26 74 50 85 27 2 | 0 1 2 3 3 0 1 0 2 3 }} | |||
Optimal tuning (CTE): ~29/28 = 1\20, ~3/2 = 703.171 | |||
{{Optimal ET sequence|legend=1| 20cdeij, 60e, 80, 140 }} | |||
Badness (Dirichlet): 1.134 | |||
=== no-31's 37-limit === | |||
By equating 37/28 with 2\5 and more accurately 85/74 with 1\5 and 44/37 with 1\4 (among many other equivalences) we get an extension to prime 37 agreeing with many (semi)convergents. | |||
Subgroup: 2.3.5.7.11.13.17.19.23.29.37 | |||
Comma list: 325/324, 352/351, 1001/1000, 1331/1323, 289/288, 400/399, 460/459, 726/725, 481/480 | |||
Mapping: {{mapping| 20 0 -17 -39 -26 74 50 85 27 2 9 | 0 1 2 3 3 0 1 0 2 3 3 }} | |||
Optimal tuning (CTE): ~29/28 = 1\20, ~3/2 = 703.222 | |||
{{Optimal ET sequence|legend=1| 20cdeijl, 60el, 80, 140 }} | |||
Badness (Dirichlet): 1.127 | |||
=== no-31's 41-limit === | |||
By equating 60/41~41/28 with 11\20 or equivalently 56/41~41/30 with 9\20 and by equating 44/41 with 1\10 (among many other equivalences) there is a very efficient extension to prime 41. | |||
By looking at the mapping, we observe an 80-note [[MOS]] scale is ideal, so that [[80edo]] is in some sense both a trivial and maximally efficient tuning of this temperament. | |||
We also observe an abundance of JI interpretations of [[20edo]] by combining primes so that all things require 3 generators, yielding: | |||
37:44:54:56:58:60:65:69:74:82:85 | |||
Alternatively, combining primes so that all things require 2 generators yields 36:40:46:51 which except for intervals of 51 is contained implicitly in the above. | |||
The ratios therein should thus be instructive for how the structure of 20edo relates to its representation of JI in Degrees. Note that prime 47 can be added but only really makes sense in rooted form in [[140edo]]. | |||
Subgroup: 2.3.5.7.11.13.17.19.23.29.37.41 | |||
Comma list: 325/324, 352/351, 1001/1000, 1331/1323, 289/288, 400/399, 460/459, 726/725, 481/480 | |||
Mapping: {{mapping| 20 0 -17 -39 -26 74 50 85 27 2 9 12 | 0 1 2 3 3 0 1 0 2 3 3 3 }} | |||
Optimal tuning (CTE): ~29/28 = 1\20, ~3/2 = 703.207 | |||
{{Optimal ET sequence|legend=1| 20cdeijlm, 60el, 80, 140 }} | |||
Badness (Dirichlet): 1.100 | |||
== Squarschmidt == | == Squarschmidt == | ||