Würschmidt: Difference between revisions

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{{Infobox ~~Regtemp~~

{{Infobox regtemp

| Title = Würschmidt

| Subgroups = 2.3.5, 2.3.5.23

| Comma basis = [[393216/390625]] (2.3.5); <br> [[576/575]], [[12167/12150]] (2.3.5.23)

| Comma basis = [[393216/390625]] (2.3.5); <br>[[576/575]], [[12167/12150]] (2.3.5.23)

| Edo join 1 = 31 | Edo join 2 = 34

| ~~Generator~~ = 5/4 | ~~Generator~~ tuning = 387.~~734~~ | Optimization method = ~~CTE~~

| Mapping = 1; 8 1 14

| Generators = 5/4 | Generators tuning = 387.8 | Optimization method = CWE

| MOS scales = [[3L 1s]], [[3L 4s]], …, [[3L 28s]], [[31L 3s]]

~~| Mapping = 1; 8 1 14~~

| Pergen = (P8, ccP5/8)

| Color name = Saquadbiguti

| Odd limit 1 = 5 | Mistuning 1 = 1.43 | Complexity 1 = 19

| Odd limit 2 = (2.3.5.23) 25 | Mistuning 2 = 2.86 | Complexity 2 = 25

| Odd limit 2 = 2.3.5.23 25 | Mistuning 2 = 2.86 | Complexity 2 = 25

}}

'''Würschmidt''' is a [[rank-2 temperament|rank-2]] [[regular temperament|temperament]] and parent of the [[würschmidt family]], characterized by tempering out the [[würschmidt comma]] ([[ratio]]: 393216/390625, {{monzo|legend=1| 17 1 -8 }}). It can be treated as analogous to [[schismic]] with the roles of the primes 3 and 5 reversed, since würschmidt is [[generator|generated]] by a [[5/4|classical major third (5/4)]], very slightly sharpened so that eight of them make the sixth harmonic ([[6/1]]), giving [[3/2]] the same complexity [[5/4]] does in schismic, but with comparable accuracy on the part of the generator. Four generators, therefore, reach the interval [[625/512]], which is equated to [[768/625]] and functions as a neutral third.

@@ Line 1: / Line 1: @@
-{{Infobox Regtemp
+{{Infobox regtemp
 | Title = Würschmidt
 | Subgroups = 2.3.5, 2.3.5.23
-| Comma basis = [[393216/390625]] (2.3.5); <br> [[576/575]], [[12167/12150]] (2.3.5.23)
+| Comma basis = [[393216/390625]] (2.3.5); <br>[[576/575]], [[12167/12150]] (2.3.5.23)
 | Edo join 1 = 31 | Edo join 2 = 34
-| Generator = 5/4 | Generator tuning = 387.734 | Optimization method = CTE
+| Mapping = 1; 8 1 14
+| Generators = 5/4 | Generators tuning = 387.8 | Optimization method = CWE
 | MOS scales = [[3L 1s]], [[3L 4s]], …, [[3L 28s]], [[31L 3s]]
-| Mapping = 1; 8 1 14
 | Pergen = (P8, ccP5/8)
 | Color name = Saquadbiguti
 | Odd limit 1 = 5 | Mistuning 1 = 1.43 | Complexity 1 = 19
-| Odd limit 2 = (2.3.5.23) 25 | Mistuning 2 = 2.86 | Complexity 2 = 25
+| Odd limit 2 = 2.3.5.23 25 | Mistuning 2 = 2.86 | Complexity 2 = 25
 }}
 '''Würschmidt''' is a [[rank-2 temperament|rank-2]] [[regular temperament|temperament]] and parent of the [[würschmidt family]], characterized by tempering out the [[würschmidt comma]] ([[ratio]]: 393216/390625, {{monzo|legend=1| 17 1 -8 }}). It can be treated as analogous to [[schismic]] with the roles of the primes 3 and 5 reversed, since würschmidt is [[generator|generated]] by a [[5/4|classical major third (5/4)]], very slightly sharpened so that eight of them make the sixth harmonic ([[6/1]]), giving [[3/2]] the same complexity [[5/4]] does in schismic, but with comparable accuracy on the part of the generator. Four generators, therefore, reach the interval [[625/512]], which is equated to [[768/625]] and functions as a neutral third.