262edt: Difference between revisions
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{{Infobox ET}} | {{Infobox ET}} | ||
'''262EDT''' is the [[EDT|equal division of the third harmonic]] into 262 parts of 7.2594 [[cent|cents]] each, corresponding to 165.3036 [[edo]] (similar to every third step of [[496edo]]). It doubles [[131edt]], which is consistent to the no-evens 25-[[odd limit#Nonoctave equaves|throdd limit]], and is [[contorted]] with it to the no-twos [[23-limit]], but it improves the representation of a number of higher primes so that 262edt is consistent to the entire no-evens 53-throdd limit with the exception of only 9 inconsistent interval pairs (19/13, 19/17, 25/19, 41/19, 41/37, 47/17, 47/25, 47/41, and 49/41), all of which are still within 60% of a step off. | '''262EDT''' is the [[EDT|equal division of the third harmonic]] into 262 parts of 7.2594 [[cent|cents]] each, corresponding to 165.3036 [[edo]] (similar to every third step of [[496edo]]). It doubles [[131edt]], which is consistent to the no-evens 25-[[odd limit#Nonoctave equaves|throdd limit]], and is [[contorted]] with it to the no-twos [[23-limit]], but it improves the representation of a number of higher primes so that 262edt is consistent to the entire no-evens 53-throdd limit with the exception of only 9 inconsistent interval pairs (19/13, 19/17, 25/19, 41/19, 41/37, 47/17, 47/25, 47/41, and 49/41, and their complements), all of which are still within 60% of a step off. | ||
== Intervals == | == Intervals == | ||