Topic: A fibonacci scale
1 scales
| File | Description | Notes | Period (ยข) | Limit |
|---|---|---|---|---|
| fib10 | first thirteen fibonacci numbers reduced to the octave | 10 | 1200.0 | 233 |
Thread (2 messages)
From: Gene Ward Smith (2005-06-07) Subject: A fibonacci scale The following ten note scale consists of the first thirteen Fibonacci numbers, F1 through F13, reduced to an octave. It is CS, epimorphic and strictly proper. Whether or not it is JI I leave to you, but I'm not the only one to try this sort of stuff: Scala lists it as a subscale of burt_fibo and burt_fibo23. On burt_fibo I read "Warren Burt, 3/2+5/3+8/5+etc. "Recurrent Sequences", 2002". This scale is not proper, or epimorphic, or CS, but is laboring under the disadvantage of having more notes. We get the same for burt_fibo23. So where is Warren Burt lurking? ! fib10.scl first thirteen fibonacci numbers reduced to the octave 10 ! 17/16 9/8 5/4 21/16 89/64 3/2 13/8 55/32 233/128 2
From: Kraig Grady (2005-06-07) Subject: Re: [tuning-math] A fibonacci scale this scale comes from Mt Meru number 1 as burts paper are on the scales from therein. i think i remember that the 13 tone scale has intervals of almost exactly 100 cents. Is it an ET :). The best scales one can get from the recurrent sequences often involves dropping the first few factors and on the other end before your sequence converges too much as to produce indentical steps within a narrow range. you will get a better 13 tone byipicking a place to start where you don't get dublications. 3 and above at least. The latter does have its uses in that if you use the converged value, on can look at the scale as both harmonic and subharmonic While others might say it is not JI ( which i can understand) i include the non converged versions as being JI Gene Ward Smith wrote: >The following ten note scale consists of the first thirteen Fibonacci >numbers, F1 through F13, reduced to an octave. It is CS, epimorphic >and strictly proper. Whether or not it is JI I leave to you, but I'm >not the only one to try this sort of stuff: Scala lists it as a >subscale of burt_fibo and burt_fibo23. On burt_fibo I read "Warren >Burt, 3/2+5/3+8/5+etc. "Recurrent Sequences", 2002". This scale is not >proper, or epimorphic, or CS, but is laboring under the disadvantage >of having more notes. We get the same for burt_fibo23. > >So where is Warren Burt lurking? > >! fib10.scl >first thirteen fibonacci numbers reduced to the octave >10 >! >17/16 >9/8 >5/4 >21/16 >89/64 >3/2 >13/8 >55/32 >233/128 >2 > > > > > > > > >Yahoo! Groups Links > > > > > > > > > -- Kraig Grady North American Embassy of Anaphoria Island <http://anaphoria.com/> The Wandering Medicine Show KXLU <http://www.kxlu.com/main.html> 88.9 FM Wed 8-9 pm Los Angeles