29edo: Difference between revisions
Contribution (talk | contribs) Logarithmic intervals are not very relevant |
useful according to who? at least accoustic phi is interesting; we dont yet know if it is irrelevant for human hearing yet. (Undo revision 104862 by Contribution (talk)) (maybe discuss in the talk page?) Tag: Undo |
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The following table shows how [[15-odd-limit intervals]] are represented in 29edo. Prime harmonics are in '''bold'''. | The following table shows how [[15-odd-limit intervals]] are represented in 29edo. Prime harmonics are in '''bold'''. | ||
{{15-odd-limit|29}} | {{15-odd-limit|29}} | ||
== Logarithmic π and ϕ, Acoustic π and ϕ == | |||
29edo has decent approximations of logarithmic π (4\29), [[Logarithmic phi|logarithmic ϕ]] (18\29), [[11/7#Proximity with π/2|acoustic π]] (19\29) and [[Acoustic phi|acoustic ϕ]] (20\29).<ref>octave-reduced equivalences</ref> | |||
These intervals can be better approximated on various lower EDOs, but not all these four at the same time. | |||
<references /> | |||
Not until [[304edo|304]] do we find a better EDO in terms of relative error on these intervals. | |||
== Regular temperament properties == | == Regular temperament properties == | ||