2ed13/10: Difference between revisions
Fixing "page titles" and giving normal headers. |
m Removing from Category:Edonoi using Cat-a-lot |
||
| (6 intermediate revisions by 4 users not shown) | |||
| Line 1: | Line 1: | ||
{{Infobox ET}} | |||
'''2 equal divisions of 13/10''', when viewed from a regular temperament perspective, is a nonoctave tuning system created by diving the interval of 13/10 into two steps of about 227.1 cents each. It is equivalent to about 5.284edo. | |||
==Theory== | |||
[[13/10|13:10]], as a frequency ratio, measures approximately 454.2 cents. It lies in the extremely xenharmonic and ambiguous territory between the perceptual category of a "third" and that of a "fourth" (see [[interseptimal]]). It appears in the [[OverToneSeries|overtone series]] between the tenth and thirteen overtones. The "square root of 13:10", then, means an interval which logarithmically bisects 13:10. It's an irrational number which measures, in cents, about 227.1. | |||
The | "The square root of 13:10" can also refer to the scale that is produced by repeatedly stacking the interval "the square root of 13:10". It is an [[edonoi|EDONOI]], or "equal division of a nonoctave interval," and as such, it does not contain a perfect octave (2:1). It is also [[macrotonal|macrotonal]], since the smallest step, at 227.1 cents, is larger than a semitone. | ||
In terms of [[EDO|equal divisions of the octave]], it fits between [[5edo|5edo]] and [[6edo|6edo]]. Melodically, it can sound somewhat "pentatonic," but harmonically it is very different. | |||
===Harmonic content=== | |||
{{Harmonics in equal|2|13|10}} | |||
Sqrt 13:10 (the scale) contains no octaves, and also no close approximation of the third harmonic (the perfect fifth). However, it comes very close to certain just intervals involving the numbers 5, 7, 11 and 13: in particular: 8/7, 13/10, 22/13, 11/5, 5/2, 20/7, 13/4, 26/7, 11/2, and 44/7. These near-just intervals can be combined so as to make available a set of 20 harmonic and subharmonic chords. | Sqrt 13:10 (the scale) contains no octaves, and also no close approximation of the third harmonic (the perfect fifth). However, it comes very close to certain just intervals involving the numbers 5, 7, 11 and 13: in particular: 8/7, 13/10, 22/13, 11/5, 5/2, 20/7, 13/4, 26/7, 11/2, and 44/7. These near-just intervals can be combined so as to make available a set of 20 harmonic and subharmonic chords. | ||
| Line 21: | Line 20: | ||
[[File:sqrt13_10_harmonic_contents.jpg|alt=sqrt13_10_harmonic_contents.jpg|sqrt13_10_harmonic_contents.jpg]] | [[File:sqrt13_10_harmonic_contents.jpg|alt=sqrt13_10_harmonic_contents.jpg|sqrt13_10_harmonic_contents.jpg]] | ||
== Music == | |||
==Music== | |||
* [http://soundcloud.com/andrew_heathwaite/truffles Truffles?] by [[Andrew Heathwaite]] and [[Michael Gaiuranos]] | |||
== Scala file == | |||
<pre> | |||
! sqrt13over10.scl | ! sqrt13over10.scl | ||
The square root of 13:10 nonoctave temperament. | The square root of 13:10 nonoctave temperament. | ||
2 | 2 | ||
! | ! | ||
227.106973952238 | 227.106973952238 | ||
13/10 | 13/10 | ||
</pre> | |||