User:Userminusone/Goldis comma: Difference between revisions

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The "goldis comma", or the golden diesis, is a 5 limit comma that is approximately 50.55 cents in size, which is the amount by which six classic augmented second intervals of [[75/64]] fall short of [[8/3]]. Its ratio is 549755813888/533935546875, and its monzo is {{monzo| 39 -7 -12 }}. It is the sum of the [[250/243|porcupine comma]] and the [[Luna family|luna comma]], the difference between the [[negri comma]] and the [[Very high accuracy temperaments|kwazy comma]], and the difference between the [[Passion|passion comma]] and the [[semicomma]].

The "goldis comma", or the golden diesis, is a 5 limit comma that is approximately 50.55 cents in size, which is the amount by which six classic augmented second intervals of [[75/64]] fall short of [[8/3]]. Its ratio is 549755813888/533935546875, and its [[monzo]] is {{monzo| 39 -7 -12 }}. It is the sum of the [[250/243|porcupine comma]] and the [[Luna family|luna comma]], the difference between the [[negri comma]] and the [[Very high accuracy temperaments|kwazy comma]], and the difference between the [[Passion|passion comma]] and the [[semicomma]]. It is also the difference between 4 [[128/125|augmented commas]] and a [[2187/2048|pythagorean chromatic semitone]], as well as the difference between a [[9/8|pythagorean whole tone]] and three [[negri comma|negri commas]].

==Notes on naming==

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==Temperaments==

The 5 limit parent temperament, Goldis, has a generator of approximately 458 cents. ~~The major third~~ is 7 generators ~~down~~, and ~~the perfect fifth~~ is 12 generators up, making this a rather complex temperament. It ~~should be noted that there is an alternate major third 21 generators up which~~ is the most accurate ~~major third whenever the generator is~~ between ~~458~~.~~6314~~ cents and 458.~~8235~~ cents (~~or 13 steps~~ of [[34edo]])~~. Generators in this range generate Tetracot (which is contorted by order 3) rather than Goldis.~~

The 5 limit parent temperament, Goldis, has a generator of approximately 458 cents. [[5/4]] is reached by -7 generators, and [[3/2]] is reached by +12 generators, making this a rather complex temperament. It is possible to use [[Golden ratio|logarithmic phi]] (After [[octave reduction]] and [[Octave complement|octave inversion]]) as a generator for this temperament, but it isn't the most accurate option available. Valid generators for this temperament are between ~457.14 cents and ~458.63 cents. (With the exception of [[13edo]] and [[34edo]])

Goldis pure fifths generator - 458.496250072 cents

Perhaps the most accurate 7 limit extension of this temperament, which I call ~~semigoldis~~, splits the generator in half and maps one step to 8/7. Semigoldis tempers out the [[breedsma]] in addition to the goldis comma. The only downside is that this drastically increases the complexity. This temperament is supported by [[21edo]], [[68edo]], [[89edo]], [[136edo]], and [[157edo]].

(1200-1200/phi) - 458.3592135 cents

Perhaps the most accurate 7 limit extension of this temperament, which I call Semigoldis, splits the generator in half and maps one step to [[8/7]]. Semigoldis tempers out the [[breedsma]] in addition to the goldis comma. The only downside is that this drastically increases the complexity. This temperament is supported by [[21edo]], [[68edo]], [[89edo]], [[136edo]], and [[157edo]].

Semigoldis pure fifths generator - 229.248125036 cents

Curiously enough, semigoldis naturally extends to the 11 limit by adding the one and only [[quartisma]], which doesn't require the generator to be further split into any number of parts. Again, high complexity is the downside here. (~~The exception is 7~~/~~4, which is reached by only -1 generators~~). 5/4 is reached by -14 generators, 3/2 is reached by +24 generators, and 11/8 is reached by -29 generators. 89edo is a really good tuning for 11-limit semigoldis, but all the EDOs that support 7-limit semigoldis also support 11-~~limit semigoldis~~.

(600-600/phi) - 229.17960675 cents

11-limit ~~semigoldis~~ pure 11/8s generator - 229.264898539 cents

Curiously enough, Semigoldis naturally extends to the 11 limit by adding the one and only [[quartisma]], which doesn't require the generator to be further split into any number of parts. In addition, 11-limit Semigoldis tempers out the [[valinorsma]]. High complexity is the downside for this temperament, as is the case with 7-limit Semigoldis. (The exception is [[7/4]], which is reached by only -1 generators). [[5/4]] is reached by -14 generators, [[3/2]] is reached by +24 generators, and [[11/8]] is reached by -29 generators. [[89edo]] is a really good tuning for 11-limit Semigoldis, but all the EDOs that support 7-limit Semigoldis also support 11-limit Semigoldis.

11-limit Semigoldis pure 11/8s generator - 229.264898539 cents

[http://x31eq.com/cgi-bin/uv.cgi?uvs=%5B39%2C-7%2C-12%3E&page=2&limit=5 temperament finder]

==Notes on generator ranges==

It should be noted that there is an alternate [[5/4]], reached by +27 generators, which is more accurate than the -7 generator [[5/4]] whenever the generator is between ~458.63 cents and ~458.82 cents (or 13 steps of [[34edo]]). Generators in this range generate [[Tetracot]] (which is [[contorted]] by order 3) rather than Goldis.

In addition, there is an alternate [[3/2]], reached by -22 generators, which is more accurate than the +12 generator [[3/2]] whenever the generator is between ~458.82 cents (or 13 steps of [[34edo]]) and ~459.61 cents. Generators in this range generate [[Majvam]] (or [http://x31eq.com/cgi-bin/rt.cgi?ets=34%2647&limit=5 34&47]) rather than Goldis. [[Majvam]] has the advantage of being more accurate than Goldis, but the disadvantage of being more complex than Goldis, which is probably why it isn't a very popular temperament.

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-The "goldis comma", or the golden diesis, is a 5 limit comma that is approximately 50.55 cents in size, which is the amount by which six classic augmented second intervals of [[75/64]] fall short of [[8/3]]. Its ratio is 549755813888/533935546875, and its monzo is {{monzo| 39 -7 -12 }}. It is the sum of the [[250/243|porcupine comma]] and the [[Luna family|luna comma]], the difference between the [[negri comma]] and the [[Very high accuracy temperaments|kwazy comma]], and the difference between the [[Passion|passion comma]] and the [[semicomma]].
+The "goldis comma", or the golden diesis, is a 5 limit comma that is approximately 50.55 cents in size, which is the amount by which six classic augmented second intervals of [[75/64]] fall short of [[8/3]]. Its ratio is 549755813888/533935546875, and its [[monzo]] is {{monzo| 39 -7 -12 }}. It is the sum of the [[250/243|porcupine comma]] and the [[Luna family|luna comma]], the difference between the [[negri comma]] and the [[Very high accuracy temperaments|kwazy comma]], and the difference between the [[Passion|passion comma]] and the [[semicomma]]. It is also the difference between 4 [[128/125|augmented commas]] and a [[2187/2048|pythagorean chromatic semitone]], as well as the difference between a [[9/8|pythagorean whole tone]] and three [[negri comma|negri commas]].
 ==Notes on naming==
@@ Line 7: / Line 7: @@
 ==Temperaments==
-The 5 limit parent temperament, Goldis, has a generator of approximately 458 cents. The major third is 7 generators down, and the perfect fifth is 12 generators up, making this a rather complex temperament. It should be noted that there is an alternate major third 21 generators up which is the most accurate major third whenever the generator is between 458.6314 cents and 458.8235 cents (or 13 steps of [[34edo]]). Generators in this range generate Tetracot (which is contorted by order 3) rather than Goldis.
+The 5 limit parent temperament, Goldis, has a generator of approximately 458 cents. [[5/4]] is reached by -7 generators, and [[3/2]] is reached by +12 generators, making this a rather complex temperament. It is possible to use [[Golden ratio|logarithmic phi]] (After [[octave reduction]] and [[Octave complement|octave inversion]]) as a generator for this temperament, but it isn't the most accurate option available. Valid generators for this temperament are between ~457.14 cents and ~458.63 cents. (With the exception of [[13edo]] and [[34edo]])
 Goldis pure fifths generator - 458.496250072 cents
-Perhaps the most accurate 7 limit extension of this temperament, which I call semigoldis, splits the generator in half and maps one step to 8/7. Semigoldis tempers out the [[breedsma]] in addition to the goldis comma. The only downside is that this drastically increases the complexity. This temperament is supported by [[21edo]], [[68edo]], [[89edo]], [[136edo]], and [[157edo]].
+(1200-1200/phi) - 458.3592135 cents
+Perhaps the most accurate 7 limit extension of this temperament, which I call Semigoldis, splits the generator in half and maps one step to [[8/7]]. Semigoldis tempers out the [[breedsma]] in addition to the goldis comma. The only downside is that this drastically increases the complexity. This temperament is supported by [[21edo]], [[68edo]], [[89edo]], [[136edo]], and [[157edo]].
 Semigoldis pure fifths generator - 229.248125036 cents
-Curiously enough, semigoldis naturally extends to the 11 limit by adding the one and only [[quartisma]], which doesn't require the generator to be further split into any number of parts. Again, high complexity is the downside here. (The exception is 7/4, which is reached by only -1 generators). 5/4 is reached by -14 generators, 3/2 is reached by +24 generators, and 11/8 is reached by -29 generators. 89edo is a really good tuning for 11-limit semigoldis, but all the EDOs that support 7-limit semigoldis also support 11-limit semigoldis.
+(600-600/phi) - 229.17960675 cents
--limit semigoldis pure 11/8s generator - 229.264898539 cents
+Curiously enough, Semigoldis naturally extends to the 11 limit by adding the one and only [[quartisma]], which doesn't require the generator to be further split into any number of parts. In addition, 11-limit Semigoldis tempers out the [[valinorsma]]. High complexity is the downside for this temperament, as is the case with 7-limit Semigoldis. (The exception is [[7/4]], which is reached by only -1 generators). [[5/4]] is reached by -14 generators, [[3/2]] is reached by +24 generators, and [[11/8]] is reached by -29 generators. [[89edo]] is a really good tuning for 11-limit Semigoldis, but all the EDOs that support 7-limit Semigoldis also support 11-limit Semigoldis.
+-limit Semigoldis pure 11/8s generator - 229.264898539 cents
 [http://x31eq.com/cgi-bin/uv.cgi?uvs=%5B39%2C-7%2C-12%3E&page=2&limit=5 temperament finder]
+==Notes on generator ranges==
+It should be noted that there is an alternate [[5/4]], reached by +27 generators, which is more accurate than the -7 generator [[5/4]] whenever the generator is between ~458.63 cents and ~458.82 cents (or 13 steps of [[34edo]]). Generators in this range generate [[Tetracot]] (which is [[contorted]] by order 3) rather than Goldis.
+In addition, there is an alternate [[3/2]], reached by -22 generators, which is more accurate than the +12 generator [[3/2]] whenever the generator is between ~458.82 cents (or 13 steps of [[34edo]]) and ~459.61 cents. Generators in this range generate [[Majvam]] (or [http://x31eq.com/cgi-bin/rt.cgi?ets=34%2647&limit=5 34&47]) rather than Goldis. [[Majvam]] has the advantage of being more accurate than Goldis, but the disadvantage of being more complex than Goldis, which is probably why it isn't a very popular temperament.