Logarithmic phi: Difference between revisions
Jump to navigation
Jump to search
deleted the mmtm theory link |
m added golden sequences & tuning link |
||
| Line 9: | Line 9: | ||
==See also== | ==See also== | ||
*[[Generating a scale through successive divisions of the octave by the Golden Ratio]] | * [[Generating a scale through successive divisions of the octave by the Golden Ratio]] | ||
*[[Golden meantone]] | * [[Golden sequences and tuning]] | ||
*[[Metallic MOS]] | * [[Golden meantone]] | ||
* [[Metallic MOS]] | |||
;The MOS patterns generated by logarithmic phi | ;The MOS patterns generated by logarithmic phi | ||
*[[3L 2s]] | * [[3L 2s]] | ||
*[[5L 3s]] | * [[5L 3s]] | ||
*[[8L 5s]] | * [[8L 5s]] | ||
*[[13L 8s]] | * [[13L 8s]] | ||
*[[21L 13s]] | * [[21L 13s]] | ||
*... | * ... | ||
;Related regular temperaments | ;Related regular temperaments | ||
Revision as of 15:35, 28 March 2025
| Interval information |
Logarithmic phi, or 1200*[math]\displaystyle{ \varphi }[/math] cents = 1941.6 cents (or, octave-reduced, 741.6 cents) is useful as a generator, for example in Erv Wilson's "Golden Horagrams". As a frequency relation it is [math]\displaystyle{ 2^{\varphi} }[/math], or [math]\displaystyle{ 2^{\varphi - 1} = 2^{1/\varphi} }[/math] when octave-reduced. Logarithmic phi is notable for being the most difficult interval to approximate by EDOs, and as such a "small equal division of logarithmic phi" nonoctave tuning would minimize pseudo-octaves.
Logarithmic phi is not to be confused with acoustic phi, which is 833.1¢.
See also
- Generating a scale through successive divisions of the octave by the Golden Ratio
- Golden sequences and tuning
- Golden meantone
- Metallic MOS
- The MOS patterns generated by logarithmic phi
- Related regular temperaments
- Father temperament
- Aurora temperament
- Triforce divides an 1/3 octave period into logarithmic-phi-sized fractions.
- Music