Minimal consistent EDOs: Difference between revisions

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	An [[EDO]] N is [[consistent]] with respect to a set of rational numbers s if the [[direct approximation]] of every element of s is the closest N-EDO approximation. It is [[distinctly consistent]] if every element of s is mapped to a distinct value. If the set s is the q [[~~odd limit]], we say N is q-limit consistent and q-limit distinctly consistent, respectively. If the set s is the q [[Odd_limit\|~~odd limit]], we say N is q-limit consistent and q-limit distinctly consistent, respectively. Below is a table of the smallest consistent, and the smallest distinctly consistent, edo for every odd number up to 135.		An [[EDO]] N is [[consistent]] with respect to a set of rational numbers s if the [[direct approximation]] of every element of s is the closest N-EDO approximation. It is [[distinctly consistent]] if every element of s is mapped to a distinct value. If the set s is the q [[odd limit]], we say N is q-limit consistent and q-limit distinctly consistent, respectively. Below is a table of the smallest consistent, and the smallest distinctly consistent, edo for every odd number up to 135.

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