50/33: Difference between revisions
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| Sound = ji-50-33-csound-foscil-220hz.mp3 | | Sound = ji-50-33-csound-foscil-220hz.mp3 | ||
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'''50/33''', the '''ptolemismic fifth''', the '''undecimal superfifth''' or the '''5edo-esque fifth''', is an [[11-limit]] interval. It is sharp of [[ | '''50/33''', the '''ptolemismic fifth''', the '''undecimal superfifth''' or the '''5edo-esque fifth''', is an [[11-limit]] interval. It is sharp of [[3/2]], the perfect fifth, by [[100/99]], the ptolemisma, hence the name. It is also flat of [[32/21]], the superfifth, by [[176/175]], the valinorsma. Being [[16/11]] augmented by [[25/24]], it is technically a semiaugmented fifth aka paramajor fifth. | ||
== Approximation == | == Approximation == | ||
Revision as of 15:58, 30 December 2022
| Interval information |
undecimal imperfect fifth,
5edo-esque fifth
[sound info]
50/33, the ptolemismic fifth, the undecimal superfifth or the 5edo-esque fifth, is an 11-limit interval. It is sharp of 3/2, the perfect fifth, by 100/99, the ptolemisma, hence the name. It is also flat of 32/21, the superfifth, by 176/175, the valinorsma. Being 16/11 augmented by 25/24, it is technically a semiaugmented fifth aka paramajor fifth.
Approximation
Measuring about 719.4 ¢, 50/33 is very well approximated by 5edo and its supersets.