Superparticular ratio: Difference between revisions
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{{Wikipedia| Superparticular ratio }} | |||
'''Superparticular''' numbers are ratios of the form <math>\frac{n+1}{n}</math>, or <math>1+\frac{1}{n}</math>, where n is a whole number greater than 0. | '''Superparticular''' numbers are ratios of the form <math>\frac{n+1}{n}</math>, or <math>1+\frac{1}{n}</math>, where n is a whole number greater than 0. | ||
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* The difference tone of the dyad is also the virtual fundamental. | * The difference tone of the dyad is also the virtual fundamental. | ||
* The first 6 such ratios ([[3/2]], [[4/3]], [[5/4]], [[6/5]], [[7/6]], [[8/7]]) are notable [[Harmonic Entropy|harmonic entropy]] minima. | * The first 6 such ratios ([[3/2]], [[4/3]], [[5/4]], [[6/5]], [[7/6]], [[8/7]]) are notable [[Harmonic Entropy|harmonic entropy]] minima. | ||
* The difference (i.e. quotient) between two successive epimoric ratios is always an epimoric ratio. | * The logarithmic difference (i.e. quotient) between two successive epimoric ratios is always an epimoric ratio. | ||
* The sum (i.e. product) of two successive epimoric ratios is either an epimoric ratio or an [[Superpartient|epimeric ratio]]. | * The logarithmic sum (i.e. product) of two successive epimoric ratios is either an epimoric ratio or an [[Superpartient|epimeric ratio]]. | ||
* Every epimoric ratio can be split into the product of two epimoric ratios. One way is via the identity: <math>1+\frac{1}{n} = (1+\frac{1}{2n})\times(1+\frac{1}{2n+1})</math>, but more than one such splitting method may exist. | * Every epimoric ratio can be split into the product of two epimoric ratios. One way is via the identity: <math>1+\frac{1}{n} = (1+\frac{1}{2n})\times(1+\frac{1}{2n+1})</math>, but more than one such splitting method may exist. | ||
* If a/b and c/d are Farey neighbors, that is if a/b < c/d and bc - ad = 1, then (c/d)/(a/b) = bc/ad is epimoric. | * If ''a''/''b'' and ''c''/''d'' are Farey neighbors, that is if ''a''/''b'' < ''c''/''d'' and ''bc'' - ''ad'' = 1, then (''c''/''d'')/(''a''/''b'') = ''bc''/''ad'' is epimoric. | ||
* The ratios between successive members of any given [[wikipedia: | * The ratios between successive members of any given [[wikipedia:Farey sequence|Farey sequence]] will be superparticular. | ||
Curiously enough, the ancient Greeks did not consider 2/1 to be superparticular because it is a [[Harmonic|multiple of the fundamental]] (the same rule applies to all natural harmonics in the Greek system). Another explanation for the exclusion of 2/1 can be found on the [[Generalized superparticulars]] page. | Curiously enough, the ancient Greeks did not consider 2/1 to be superparticular because it is a [[Harmonic|multiple of the fundamental]] (the same rule applies to all natural harmonics in the Greek system). Another explanation for the exclusion of 2/1 can be found on the [[Generalized superparticulars]] page. | ||
== See also == | == See also == | ||
* [[List of superparticular intervals]] | * [[List of superparticular intervals]] | ||
[[Category:Terms]] | [[Category:Terms]] | ||
[[Category:Greek]] | [[Category:Greek]] | ||
[[Category:Ratio]] | [[Category:Ratio]] | ||
[[Category:Superparticular| ]] <!-- main article --> | [[Category:Superparticular| ]] <!-- main article --> | ||
Revision as of 20:39, 13 November 2021
Superparticular numbers are ratios of the form [math]\displaystyle{ \frac{n+1}{n} }[/math], or [math]\displaystyle{ 1+\frac{1}{n} }[/math], where n is a whole number greater than 0.
The word "superparticular" has Latin etymology and means "above by one part". The equivalent word of Greek origin is "epimoric" (from επιμοριοσ, epimorios).
These ratios have some peculiar properties:
- The difference tone of the dyad is also the virtual fundamental.
- The first 6 such ratios (3/2, 4/3, 5/4, 6/5, 7/6, 8/7) are notable harmonic entropy minima.
- The logarithmic difference (i.e. quotient) between two successive epimoric ratios is always an epimoric ratio.
- The logarithmic sum (i.e. product) of two successive epimoric ratios is either an epimoric ratio or an epimeric ratio.
- Every epimoric ratio can be split into the product of two epimoric ratios. One way is via the identity: [math]\displaystyle{ 1+\frac{1}{n} = (1+\frac{1}{2n})\times(1+\frac{1}{2n+1}) }[/math], but more than one such splitting method may exist.
- If a/b and c/d are Farey neighbors, that is if a/b < c/d and bc - ad = 1, then (c/d)/(a/b) = bc/ad is epimoric.
- The ratios between successive members of any given Farey sequence will be superparticular.
Curiously enough, the ancient Greeks did not consider 2/1 to be superparticular because it is a multiple of the fundamental (the same rule applies to all natural harmonics in the Greek system). Another explanation for the exclusion of 2/1 can be found on the Generalized superparticulars page.