359edo: Difference between revisions
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= | =359 tone equal temperament= | ||
359-tET or 359-EDO divides the octave | 359-tET or 359-EDO divides the octave into 359 parts of 3.34262 cents each. 359-EDO contains a very close approximation of the pure 3/2 fifth of 701.955 cents, with the 210\359 step of 701.94986 cents. 359-EDO supports a type of exaggerated Hornbostel mode, with an approximation of the blown fifth that he described of the pan flutes of some regions of South America; the Pythagorean fifth (701.955c) minus the Pythagorean comma (23.46c) = 678.495c; in 359-EDO this is the step 203\359 of 678.55153c. | ||
Pythagorean diatonic scale: 61 61 27 61 61 61 27 | |||
Exaggerated Hornbostel superdiatonic scale: 47 47 47 15 47 47 47 47 15 (fails in the position of Phi and the square root of Pi [+1\359 step of each one]). | |||
[[Category:edo]] | |||
[[Category:nano]] | [[Category:nano]] | ||
[[Category:theory]] | [[Category:theory]] | ||
Revision as of 04:22, 6 December 2018
359 tone equal temperament
359-tET or 359-EDO divides the octave into 359 parts of 3.34262 cents each. 359-EDO contains a very close approximation of the pure 3/2 fifth of 701.955 cents, with the 210\359 step of 701.94986 cents. 359-EDO supports a type of exaggerated Hornbostel mode, with an approximation of the blown fifth that he described of the pan flutes of some regions of South America; the Pythagorean fifth (701.955c) minus the Pythagorean comma (23.46c) = 678.495c; in 359-EDO this is the step 203\359 of 678.55153c.
Pythagorean diatonic scale: 61 61 27 61 61 61 27
Exaggerated Hornbostel superdiatonic scale: 47 47 47 15 47 47 47 47 15 (fails in the position of Phi and the square root of Pi [+1\359 step of each one]).