6000000edo: Difference between revisions

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The '''6 million divisions of the octave,''' or '''literal microtonal system,''' divides the ~~2/1~~ into steps of exactly 0.0002 cent, or 200 ~~microcent~~ each.

The '''6 million equal divisions of the octave,''' or '''literal microtonal system''', divides the [[octave]] into steps of exactly 0.0002 cent, or 200 microcents each.

While this system is absurdly large for any human application, from a technical standpoint it is the ~~only one~~ that rightfully bears the name [[~~Microtonal~~|'''microtonal''']], since it divides a tone, which is 1/6th of an octave, into 1'000'000 steps, and the SI prefix "micro-" denotes division of a unit into 1 million parts.

While this system is absurdly large for any human application, from a technical standpoint it is one of the few that rightfully bears the name [[microtone (interval size measure)|''microtonal'']], since it divides a tone, which is 1/6th of an octave, into 1'000'000 steps, and the {{w|metric prefix|SI prefix}} "micro-" denotes division of a unit into 1 million parts. If we instead take a tone to be [[9/8]], we get approximately 5884949edo, which has an almost perfectly off [[3/2]] so that its double, 11769898edo, may be reasonable.

~~== Theory ==~~

If the starting note is Middle C, one step of this tuning would have a beating period of 33086 seconds, or more than 9 hours. At 20 kHz, the extreme end of human range, the period of the wahwah caused by two similar frequencies is still more than 7 minutes. In order to hypothetically make any use of this system, humans would have to hear sounds as high pitched as 140 MHz. At this point, it is already just 36 air molecules' [[mean free path]]'s width.

~~6'000'000 factorizes~~ as ~~<math>2^7 \cdot 3 \cdot 5^6</math>~~. ~~It has 112 divisors~~, ~~most notable being {{EDOs|128 and 3125}}~~.

~~If the starting note is Middle C~~, ~~one step of this tuning would have~~ a ~~beating period of 33086 seconds~~, ~~or more than 9 hours~~. ~~At 20 kHz~~, the ~~extreme end of human range~~, ~~the period of the wahwah caused by two similar frequencies~~ is ~~still more than 7 minutes~~.

Remarkably, it has a perfect fifth that differs from just by 1 part in 231, which ultimately derives from [[80000edo]]. In a twist of irony, it provides good approximations for the 2.3.17.19 [[subgroup]], which is typically associated with [[12edo]].

~~In order to hypothetically make any use of this system, humans would have to hear sounds as high pitched~~ as ~~140 MHz~~. ~~At this point~~, ~~it is already just 36 air molecules' mean free path's width~~.

=== Prime harmonics ===

=== Subsets and supersets ===

6'000'000 factorizes as 2<sup>7</sup> × 3 × 5<sup>6</sup>. It has 112 divisors, most notable being {{EDOs|128 and 3125}}.

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-The '''6 million divisions of the octave,''' or '''literal microtonal system,''' divides the 2/1 into steps of exactly 0.0002 cent, or 200 microcent each.
+{{Novelty}}
+{{Infobox ET}}
+The '''6 million equal divisions of the octave,''' or '''literal microtonal system''', divides the [[octave]] into steps of exactly 0.0002 cent, or 200 microcents each.
-While this system is absurdly large for any human application, from a technical standpoint it is the only one that rightfully bears the name [[Microtonal|'''microtonal''']], since it divides a tone, which is 1/6th of an octave, into 1'000'000 steps, and the SI prefix "micro-" denotes division of a unit into 1 million parts.
+While this system is absurdly large for any human application, from a technical standpoint it is one of the few that rightfully bears the name [[microtone (interval size measure)|''microtonal'']], since it divides a tone, which is 1/6th of an octave, into 1'000'000 steps, and the {{w|metric prefix|SI prefix}} "micro-" denotes division of a unit into 1 million parts. If we instead take a tone to be [[9/8]], we get approximately 5884949edo, which has an almost perfectly off [[3/2]] so that its double, 11769898edo, may be reasonable.
-== Theory ==
+If the starting note is Middle C, one step of this tuning would have a beating period of 33086 seconds, or more than 9 hours. At 20 kHz, the extreme end of human range, the period of the wahwah caused by two similar frequencies is still more than 7 minutes. In order to hypothetically make any use of this system, humans would have to hear sounds as high pitched as 140 MHz. At this point, it is already just 36 air molecules' [[mean free path]]'s width.
-'000'000 factorizes as <math>2^7 \cdot 3 \cdot 5^6</math>. It has 112 divisors, most notable being {{EDOs|128 and 3125}}.
-If the starting note is Middle C, one step of this tuning would have a beating period of 33086 seconds, or more than 9 hours. At 20 kHz, the extreme end of human range, the period of the wahwah caused by two similar frequencies is still more than 7 minutes.
+Remarkably, it has a perfect fifth that differs from just by 1 part in 231, which ultimately derives from [[80000edo]]. In a twist of irony, it provides good approximations for the 2.3.17.19 [[subgroup]], which is typically associated with [[12edo]].
-In order to hypothetically make any use of this system, humans would have to hear sounds as high pitched as 140 MHz. At this point, it is already just 36 air molecules' mean free path's width.
+=== Prime harmonics ===
+{{Harmonics in equal|6000000}}
+=== Subsets and supersets ===
+'000'000 factorizes as 2<sup>7</sup> × 3 × 5<sup>6</sup>. It has 112 divisors, most notable being {{EDOs|128 and 3125}}.