Kite's thoughts on pergens: Difference between revisions
Wikispaces>TallKite **Imported revision 627100499 - Original comment: ** |
Wikispaces>TallKite **Imported revision 627126229 - Original comment: ** |
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: This revision was by author [[User:TallKite|TallKite]] and made on <tt>2018-03-02 | : This revision was by author [[User:TallKite|TallKite]] and made on <tt>2018-03-02 14:59:50 UTC</tt>.<br> | ||
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This suggests an alternate true/false test: if neither the pergen nor the unreduced pergen is explicitly false, the pergen is a true double. For example, (P8/4, P4/2) isn't explicitly false. The unreduced pergen is (P8/4, M2/4), which also isn't explicitly false, thus (P8/4, P4/2) is a true double. It requires two commas, one for each fraction. The two commas must use different higher primes, e.g. 648/625 and 49/48. Thus __true doubles require commas of at least 7-limit__, whereas false doubles require only 5-limit. To summarize: | This suggests an alternate true/false test: if neither the pergen nor the unreduced pergen is explicitly false, the pergen is a true double. For example, (P8/4, P4/2) isn't explicitly false. The unreduced pergen is (P8/4, M2/4), which also isn't explicitly false, thus (P8/4, P4/2) is a true double. It requires two commas, one for each fraction. The two commas must use different higher primes, e.g. 648/625 and 49/48. Thus __true doubles require commas of at least 7-limit__, whereas false doubles require only 5-limit. To summarize: | ||
* **A double-split pergen is __explicitly false__ if and only if m = |b|.** | * **A double-split pergen is __explicitly false__ if and only if m = |b|.** | ||
* **A double-split pergen is a __true double__ if and only if neither it nor its unreduced form is explicitly false.** | * **A double-split pergen is a __true double__ if and only if neither it nor its unreduced form is explicitly false.** | ||
* **A double-split pergen is a __true double__ if GCD (m, n) > |b|, and a false double if GCD (m, n) = |b|.** | |||
A false double pergen's temperament can also be constructed from two commas, as if it were a true double. For example, (P8/3, P4/2) results from 128/125 and 49/48, which split the octave and the 4th respectively. | A false double pergen's temperament can also be constructed from two commas, as if it were a true double. For example, (P8/3, P4/2) results from 128/125 and 49/48, which split the octave and the 4th respectively. | ||
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This suggests an alternate true/false test: if neither the pergen nor the unreduced pergen is explicitly false, the pergen is a true double. For example, (P8/4, P4/2) isn't explicitly false. The unreduced pergen is (P8/4, M2/4), which also isn't explicitly false, thus (P8/4, P4/2) is a true double. It requires two commas, one for each fraction. The two commas must use different higher primes, e.g. 648/625 and 49/48. Thus <u>true doubles require commas of at least 7-limit</u>, whereas false doubles require only 5-limit. To summarize:<br /> | This suggests an alternate true/false test: if neither the pergen nor the unreduced pergen is explicitly false, the pergen is a true double. For example, (P8/4, P4/2) isn't explicitly false. The unreduced pergen is (P8/4, M2/4), which also isn't explicitly false, thus (P8/4, P4/2) is a true double. It requires two commas, one for each fraction. The two commas must use different higher primes, e.g. 648/625 and 49/48. Thus <u>true doubles require commas of at least 7-limit</u>, whereas false doubles require only 5-limit. To summarize:<br /> | ||
<ul><li><strong>A double-split pergen is <u>explicitly false</u> if and only if m = |b|.</strong></li><li><strong>A double-split pergen is a <u>true double</u> if and only if | <ul><li><strong>A double-split pergen is <u>explicitly false</u> if and only if m = |b|.</strong></li><li><strong>A double-split pergen is a <u>true double</u> if and only if neither it nor its unreduced form is explicitly false.</strong></li><li><strong>A double-split pergen is a <u>true double</u> if GCD (m, n) &gt; |b|, and a false double if GCD (m, n) = |b|.</strong></li></ul><br /> | ||
A false double pergen's temperament can also be constructed from two commas, as if it were a true double. For example, (P8/3, P4/2) results from 128/125 and 49/48, which split the octave and the 4th respectively.<br /> | A false double pergen's temperament can also be constructed from two commas, as if it were a true double. For example, (P8/3, P4/2) results from 128/125 and 49/48, which split the octave and the 4th respectively.<br /> | ||
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