User:Moremajorthanmajor/7L 4s (11/4-equivalent): Difference between revisions
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Replaced content with "{{Infobox MOS |Periods=1|nLargeSteps=7|nSmallSteps=4|Equalized=3|Collapsed=2|Pattern=LLsLLsLLsLs|Equave=11/4}}'''7L 4s<11\4>''' has a generator of a narrow wolf to perfect..." Tag: Replaced |
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|Periods=1|nLargeSteps=7|nSmallSteps=4|Equalized=3|Collapsed=2|Pattern=LLsLLsLLsLs|Equave=11/4}}'''7L 4s<11\4>''' has a generator of a narrow wolf to perfect fourth of 477.632 (3/11ed11\4) to 500.377 (2/7ed11\4) cents. Insofar as it may be said to be a Reformed mode, it is an authentic Locrian mode. | |Periods=1|nLargeSteps=7|nSmallSteps=4|Equalized=3|Collapsed=2|Pattern=LLsLLsLLsLs|Equave=11/4}}'''7L 4s<11\4>''' has a generator of a narrow wolf to perfect fourth of 477.632 (3/11ed11\4) to 500.377 (2/7ed11\4) cents. Insofar as it may be said to be a Reformed mode, it is an authentic Locrian mode. | ||
==Scale tree== | ==Scale tree== | ||
{Scale tree |7L 4s<11\4>} | {Scale tree|7L 4s<11\4>} | ||
Revision as of 23:37, 28 May 2023
Lua error in Module:MOS at line 46: attempt to index local 'equave' (a nil value).7L 4s<11\4> has a generator of a narrow wolf to perfect fourth of 477.632 (3/11ed11\4) to 500.377 (2/7ed11\4) cents. Insofar as it may be said to be a Reformed mode, it is an authentic Locrian mode.
Scale tree
{Scale tree|7L 4s<11\4>}