52edt: Difference between revisions

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 == Harmonics ==
-While 52edt does not improve much on [[26edt]]'s mapping of the odd primes, it is notable for mapping 11, 13, 19, and 29 ''slightly'' better than 26edt, giving them (despite being nearly half a step off in the case of 11) a flat tendency in keeping with all the other odd primes, which allows 52edt to be the first edt that is [[consistent]] to the no-twos 29-[[throdd limit]], which is a record unbeaten until [[144edt]].
+While 52edt does not improve much on [[26edt]]'s mapping of the odd primes, it still maps 11, 13, 19, and 29 ''slightly'' better than 26edt, which is notable for giving them (despite being nearly half a step off in the case of 11) a flat tendency in keeping with all the other odd primes, which allows 52edt to be the first edt that is [[consistent]] to the no-twos 29-[[throdd limit]], which is a record unbeaten until [[144edt]].
 {{Harmonics in equal|52|3|1|intervals = prime|columns = 9}}
 {{Harmonics in equal|52|3|1|start = 12|collapsed = 1|intervals = odd}}