User:Aura/4191814edo: Difference between revisions

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~~== Theory ==~~

This edo has a [[consistency]] limit of 21, which is the most impressive out of all the 3-2 [[telicity|telic]] multiples of [[190537edo]]. It tempers out the [[archangelic comma]] in the [[3-limit]], and though this system's 5-limit and 7-limit are rather lackluster for an edo this size, the representation of the prime [[11/1|11]] is a bit better, and the representations of the [[13/1|13]], [[17/1|17]], and [[19/1|19]] are excellent, all which help to bridge the lackluster [[5/1|5]] and [[7/1|7]]. Thus, this system is worthy of a great deal of further exploration in the [[19-limit]].

This ~~EDO~~ has a consistency limit of 21, which is the most impressive out of all of the 3-2 [[telicity|telic]] multiples of [[190537edo]], though this ~~EDO seems to be at its best in~~ the ~~2.3.~~11.13.17.19 ~~subgroup~~. Thus, it is worthy of a great deal of further exploration in the [[19-limit]]~~. It tempers out the [[Archangelic comma]] in the 3-limit~~.

~~{{Harmonics~~ in ~~equal|4191814}}~~

In this system, the [[perfect fifth]] at 2452054\4191814 is divisible by the prime factors of 2, 11, 227 and 491. However, the [[perfect fourth]], at 1739760\4191814, has more prime divisors, namely the prime factors of 2<sup>4</sup>, 3, 5, 11 and 659. The latter means that just as in [[159edo]], the perfect fourth is divisible by 33, and thus, this system can offer not only a more accurate version of [[Ozan Yarman]]'s original 79-tone system, but also [[metatemperament]]s to [[yarman I]] and [[yarman II]].

~~[[Category:Equal divisions~~ of ~~the octave|#####]] ~~

=== Prime harmonics ===

{{Harmonics in equal|4191814|columns=9|start=10|collapsed=true|title=Approximation of prime harmonics in 4191814edo (continued)}}

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-{{Infobox ET}}
+{{Mathematical interest}}
-{{EDO intro|4191814}}
+{{Infobox ET|debug=1}}
+{{ED intro}}
-== Theory ==
+This edo has a [[consistency]] limit of 21, which is the most impressive out of all the 3-2 [[telicity|telic]] multiples of [[190537edo]]. It tempers out the [[archangelic comma]] in the [[3-limit]], and though this system's 5-limit and 7-limit are rather lackluster for an edo this size, the representation of the prime [[11/1|11]] is a bit better, and the representations of the [[13/1|13]], [[17/1|17]], and [[19/1|19]] are excellent, all which help to bridge the lackluster [[5/1|5]] and [[7/1|7]]. Thus, this system is worthy of a great deal of further exploration in the [[19-limit]].
-This EDO has a consistency limit of 21, which is the most impressive out of all of the 3-2 [[telicity|telic]] multiples of [[190537edo]], though this EDO seems to be at its best in the 2.3.11.13.17.19 subgroup.  Thus, it is worthy of a great deal of further exploration in the [[19-limit]].  It tempers out the [[Archangelic comma]] in the 3-limit.
-{{Harmonics in equal|4191814}}
+In this system, the [[perfect fifth]] at 2452054\4191814 is divisible by the prime factors of 2, 11, 227 and 491. However, the [[perfect fourth]], at 1739760\4191814, has more prime divisors, namely the prime factors of 2<sup>4</sup>, 3, 5, 11 and 659. The latter means that just as in [[159edo]], the perfect fourth is divisible by 33, and thus, this system can offer not only a more accurate version of [[Ozan Yarman]]'s original 79-tone system, but also [[metatemperament]]s to [[yarman I]] and [[yarman II]].
-[[Category:Equal divisions of the octave|#####]] <!-- 7-digit number -->
+=== Prime harmonics ===
+{{Harmonics in equal|4191814|columns=9}}
+{{Harmonics in equal|4191814|columns=9|start=10|collapsed=true|title=Approximation of prime harmonics in 4191814edo (continued)}}