Lumatone mapping for 48edo: Difference between revisions

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~~There are many conceivable ways to map [[48edo]] onto the [[Lumatone]] keyboard. Unfortunately, as it has multiple rings of 5ths, the [[Standard~~ Lumatone mapping ~~for Pythagorean]] is not one of them. Since it is [[Highly_composite_equal_division|highly composite]], many other mappings will also fail to cover the entire gamut.~~ If you want an evenly distributed heptatonic scale that gives easy access to the perfect 5th, you instead need to use the [[tetracot]] mapping, which is probably the most efficient and intuitive way of organising its intervals.

{{Lumatone mapping intro}} If you want an evenly distributed heptatonic scale that gives easy access to the perfect 5th, you instead need to use the [[tetracot]] mapping, which is probably the most efficient and intuitive way of organising its intervals. Though the [[7L 6s]] MOS has a 6:1 step ratio, making it very lopsided.

There are three other mappings that reach the perfect ~~5th~~ in 4 generator steps that might also be useful. These are the [[Negri]] mapping

There are three other mappings that reach the perfect fith in 4 generator steps that might also be useful. These are the [[Negri]] mapping

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Or the [[Buzzard]] mapping.

And the [[Buzzard]] mapping.

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-There are many conceivable ways to map [[48edo]] onto the [[Lumatone]] keyboard. Unfortunately, as it has multiple rings of 5ths, the [[Standard Lumatone mapping for Pythagorean]] is not one of them. Since it is [[Highly_composite_equal_division|highly composite]], many other mappings will also fail to cover the entire gamut. If you want an evenly distributed heptatonic scale that gives easy access to the perfect 5th, you instead need to use the [[tetracot]] mapping, which is probably the most efficient and intuitive way of organising its intervals.
+{{Lumatone mapping intro}} If you want an evenly distributed heptatonic scale that gives easy access to the perfect 5th, you instead need to use the [[tetracot]] mapping, which is probably the most efficient and intuitive way of organising its intervals. Though the [[7L&nbsp;6s]] MOS has a 6:1 step ratio, making it very lopsided.
 {{Lumatone EDO mapping|n=48|start=33|xstep=7|ystep=-1}}
-There are three other mappings that reach the perfect 5th in 4 generator steps that might also be useful. These are the [[Negri]] mapping
+There are three other mappings that reach the perfect fith in 4 generator steps that might also be useful. These are the [[Negri]] mapping
 {{Lumatone EDO mapping|n=48|start=4|xstep=5|ystep=3}}
@@ Line 11: / Line 11: @@
-Or the [[Buzzard]] mapping.
+And the [[Buzzard]] mapping.
 {{Lumatone EDO mapping|n=48|start=7|xstep=9|ystep=-8}}
 {{Navbox Lumatone}}