IFDO: Difference between revisions
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For example, in [[12ifdo]] the first degree is [[24/23]], the second is 24/22 ([[12/11]]), and so on. For an IFDO system, the difference between ''inverse'' interval ratios is equal (they form an inverse-arithmetic progression), rather than their difference between interval ratios being equal as in [[AFDO]] systems (an arithmetic progression). All IFDOs are subsets of [[just intonation]], and up to transposition, any IFDO is a superset of a smaller IFDO and a subset of a larger IFDO (i.e. ''n''-ifdo is a superset of (''n'' - 1)-ifdo and a subset of (''n'' + 1)-ifdo for any integer ''n'' > 1). | For example, in [[12ifdo]] the first degree is [[24/23]], the second is 24/22 ([[12/11]]), and so on. For an IFDO system, the difference between ''inverse'' interval ratios is equal (they form an inverse-arithmetic progression), rather than their difference between interval ratios being equal as in [[AFDO]] systems (an arithmetic progression). All IFDOs are subsets of [[just intonation]], and up to transposition, any IFDO is a superset of a smaller IFDO and a subset of a larger IFDO (i.e. ''n''-ifdo is a superset of (''n'' - 1)-ifdo and a subset of (''n'' + 1)-ifdo for any integer ''n'' > 1). | ||
When treated as a [[scale]], the IFDO is equivalent to the undertone scale, also known as an aliquot scale<ref>''1/1, The Journal of the Just Intonation Network'', Volume 4, Number 1, Winter 1988, p.6, Michael Sloper. </ref>. An IFDO is equivalent to a UDO ([[utonal division]] of the octave). It may also be called an ''n''-ELDO ([[equal length division]] of the octave) since it includes the pitches found by dividing the length of a string or resonating chamber into ''n'' equal parts; however, this more general acronym is typically reserved for divisions of irrational intervals (unlike the octave) which are therefore not subsets of just intonation. | When treated as a [[scale]], the IFDO is equivalent to the undertone scale, also known as an aliquot scale<ref>''1/1, The Journal of the Just Intonation Network'', Volume 4, Number 1, Winter 1988, p.6, Michael Sloper. </ref>. However, an undertone scale often has an assumption of a tonic whereas an IFDO simply describes all the theoretically available pitch relations. Therefore, a passage built on 1/(12::22) could be said to be in Mode 12, but is technically covered by 11ifdo. | ||
An IFDO is equivalent to a UDO ([[utonal division]] of the octave). It may also be called an ''n''-ELDO ([[equal length division]] of the octave) since it includes the pitches found by dividing the length of a string or resonating chamber into ''n'' equal parts; however, this more general acronym is typically reserved for divisions of irrational intervals (unlike the octave) which are therefore not subsets of just intonation. | |||
== Formula == | == Formula == | ||
| Line 12: | Line 14: | ||
<math>\displaystyle c = (2n)/(2n - k)</math> | <math>\displaystyle c = (2n)/(2n - k)</math> | ||
== | == Equal divisions of length == | ||
The '''equal division of length''' ('''EDL''') is equivalent to the IFDO. However, ''n''-edl corresponds to (''n''/2)-ifdo for any even number ''n''. Therefore, EDL cannot be used to represent an odd-numbered IFDO. | |||
''n''-edl divides a string length to ''n'' equal divisions, so we have ''n''/2 divisions per octave. If the first division is ''l''<sub>1</sub> and the last, ''l''<sub>''n''</sub>, we have: | |||
: ''l''<sub>1</sub> = ''l''<sub>2</sub> = ''l''<sub>3</sub> = … = ''l''<sub>''n''</sub> | |||
So the sum of divisions is ''l'' or the string length. Note that the number of divisions in octave is half of the string length. By dividing a string length of ''l'' to ''n'' divisions we have: | |||
: ''n'':(''n'' - 1):(''n'' - 2):(''n'' - 3):…:(''n'' - ''m''):…:1 | |||
where ''n'' - ''m'' is ''n''/2. | |||
For example, by dividing string length to 12 equal divisions we have a series as: | |||
: 12:11:10:9:8:7:6:5:4:3:2:1 | |||
which shows 12-edl: | |||
[[file:edl1.jpg]] | |||
12:12 means 12 from 12 divisions, 12:11 means 11 from 12 divisions and so on. Ratios as 12:11 shows active string length for each degree, which is vibrating. EDL system shows ascending trend of divisions sizes due to its inner structure and if compared with [[EDO]]: | |||
[[file:Edl2.JPG]] | |||
== Relation to superparticular ratios == | |||
An IFDO has step sizes of [[superparticular ratio]]s with decreasing numerators. For example, [[5ifdo]] has step sizes [[10/9]], [[9/8]], [[8/7]], [[7/6]], and [[6/5]]. | |||
== Relation to utonality and subharmonic series == | |||
We can consider an IFDO system as a [[Otonality and utonality|utonal system]]. ''Utonality'' is a term introduced by [[Harry Partch]] to describe chords whose notes are the undertones (divisors) of a given fixed tone. Considering IFDO, a utonality is a collection of pitches which can be expressed in ratios that have the same numerators. For example, 7/4, 7/5, 7/6 form an utonality in which 7 as the numerator is called a "[[numerary nexus]]". | |||
== Properties == | |||
* ''n''-ifdo has [[maximum variety]] ''n''. | |||
* Except for 1ifdo and 2ifdo, IFDOs are [[chiral]]. The inverse of ''n''-ifdo is ''n''-afdo. | |||
** 1ifdo is equivalent to 1afdo and 1edo; | |||
** 2ifdo is equivalent to 2afdo. | |||
== Individual pages for IFDOs == | |||
=== By size === | |||
{| class="wikitable center-all" | |||
|+ style=white-space:nowrap | 0…99 | |||
| [[0ifdo|0]] | |||
| [[1edo|1]] | |||
| [[2ifdo|2]] | |||
| [[3ifdo|3]] | |||
| [[4ifdo|4]] | |||
| [[5ifdo|5]] | |||
| [[6ifdo|6]] | |||
| [[7ifdo|7]] | |||
| [[8ifdo|8]] | |||
| [[9ifdo|9]] | |||
|- | |||
| [[10ifdo|10]] | |||
| [[11ifdo|11]] | |||
| [[12ifdo|12]] | |||
| [[13ifdo|13]] | |||
| [[14ifdo|14]] | |||
| [[15ifdo|15]] | |||
| [[16ifdo|16]] | |||
| [[17ifdo|17]] | |||
| [[18ifdo|18]] | |||
| [[19ifdo|19]] | |||
|- | |||
| [[20ifdo|20]] | |||
| [[21ifdo|21]] | |||
| [[22ifdo|22]] | |||
| [[23ifdo|23]] | |||
| [[24ifdo|24]] | |||
| [[25ifdo|25]] | |||
| [[26ifdo|26]] | |||
| [[27ifdo|27]] | |||
| [[28ifdo|28]] | |||
| [[29ifdo|29]] | |||
|- | |||
| [[30ifdo|30]] | |||
| [[31ifdo|31]] | |||
| [[32ifdo|32]] | |||
| [[33ifdo|33]] | |||
| [[34ifdo|34]] | |||
| [[35ifdo|35]] | |||
| [[36ifdo|36]] | |||
| [[37ifdo|37]] | |||
| [[38ifdo|38]] | |||
| [[39ifdo|39]] | |||
|- | |||
| [[40ifdo|40]] | |||
| [[41ifdo|41]] | |||
| [[42ifdo|42]] | |||
| [[43ifdo|43]] | |||
| [[44ifdo|44]] | |||
| [[45ifdo|45]] | |||
| [[46ifdo|46]] | |||
| [[47ifdo|47]] | |||
| [[48ifdo|48]] | |||
| [[49ifdo|49]] | |||
|- | |||
| [[50ifdo|50]] | |||
| [[51ifdo|51]] | |||
| [[52ifdo|52]] | |||
| [[53ifdo|53]] | |||
| [[54ifdo|54]] | |||
| [[55ifdo|55]] | |||
| [[56ifdo|56]] | |||
| [[57ifdo|57]] | |||
| [[58ifdo|58]] | |||
| [[59ifdo|59]] | |||
|- | |||
| [[60ifdo|60]] | |||
| [[61ifdo|61]] | |||
| [[62ifdo|62]] | |||
| [[63ifdo|63]] | |||
| [[64ifdo|64]] | |||
| [[65ifdo|65]] | |||
| [[66ifdo|66]] | |||
| [[67ifdo|67]] | |||
| [[68ifdo|68]] | |||
| [[69ifdo|69]] | |||
|- | |||
| [[70ifdo|70]] | |||
| [[71ifdo|71]] | |||
| [[72ifdo|72]] | |||
| [[73ifdo|73]] | |||
| [[74ifdo|74]] | |||
| [[75ifdo|75]] | |||
| [[76ifdo|76]] | |||
| [[77ifdo|77]] | |||
| [[78ifdo|78]] | |||
| [[79ifdo|79]] | |||
|- | |||
| [[80ifdo|80]] | |||
| [[81ifdo|81]] | |||
| [[82ifdo|82]] | |||
| [[83ifdo|83]] | |||
| [[84ifdo|84]] | |||
| [[85ifdo|85]] | |||
| [[86ifdo|86]] | |||
| [[87ifdo|87]] | |||
| [[88ifdo|88]] | |||
| [[89ifdo|89]] | |||
|- | |||
| [[90ifdo|90]] | |||
| [[91ifdo|91]] | |||
| [[92ifdo|92]] | |||
| [[93ifdo|93]] | |||
| [[94ifdo|94]] | |||
| [[95ifdo|95]] | |||
| [[96ifdo|96]] | |||
| [[97ifdo|97]] | |||
| [[98ifdo|98]] | |||
| [[99ifdo|99]] | |||
|} | |||
{| class="wikitable center-all mw-collapsible mw-collapsed" | |||
|+ style=white-space:nowrap | 100…199 | |||
| [[100ifdo|100]] | |||
| [[101ifdo|101]] | |||
| [[102ifdo|102]] | |||
| [[103ifdo|103]] | |||
| [[104ifdo|104]] | |||
| [[105ifdo|105]] | |||
| [[106ifdo|106]] | |||
| [[107ifdo|107]] | |||
| [[108ifdo|108]] | |||
| [[109ifdo|109]] | |||
|- | |||
| [[110ifdo|110]] | |||
| [[111ifdo|111]] | |||
| [[112ifdo|112]] | |||
| [[113ifdo|113]] | |||
| [[114ifdo|114]] | |||
| [[115ifdo|115]] | |||
| [[116ifdo|116]] | |||
| [[117ifdo|117]] | |||
| [[118ifdo|118]] | |||
| [[119ifdo|119]] | |||
|- | |||
| [[120ifdo|120]] | |||
| [[121ifdo|121]] | |||
| [[122ifdo|122]] | |||
| [[123ifdo|123]] | |||
| [[124ifdo|124]] | |||
| [[125ifdo|125]] | |||
| [[126ifdo|126]] | |||
| [[127ifdo|127]] | |||
| [[128ifdo|128]] | |||
| [[129ifdo|129]] | |||
|- | |||
| [[130ifdo|130]] | |||
| [[131ifdo|131]] | |||
| [[132ifdo|132]] | |||
| [[133ifdo|133]] | |||
| [[134ifdo|134]] | |||
| [[135ifdo|135]] | |||
| [[136ifdo|136]] | |||
| [[137ifdo|137]] | |||
| [[138ifdo|138]] | |||
| [[139ifdo|139]] | |||
|- | |||
| [[140ifdo|140]] | |||
| [[141ifdo|141]] | |||
| [[142ifdo|142]] | |||
| [[143ifdo|143]] | |||
| [[144ifdo|144]] | |||
| [[145ifdo|145]] | |||
| [[146ifdo|146]] | |||
| [[147ifdo|147]] | |||
| [[148ifdo|148]] | |||
| [[149ifdo|149]] | |||
|- | |||
| [[150ifdo|150]] | |||
| [[151ifdo|151]] | |||
| [[152ifdo|152]] | |||
| [[153ifdo|153]] | |||
| [[154ifdo|154]] | |||
| [[155ifdo|155]] | |||
| [[156ifdo|156]] | |||
| [[157ifdo|157]] | |||
| [[158ifdo|158]] | |||
| [[159ifdo|159]] | |||
|- | |||
| [[160ifdo|160]] | |||
| [[161ifdo|161]] | |||
| [[162ifdo|162]] | |||
| [[163ifdo|163]] | |||
| [[164ifdo|164]] | |||
| [[165ifdo|165]] | |||
| [[166ifdo|166]] | |||
| [[167ifdo|167]] | |||
| [[168ifdo|168]] | |||
| [[169ifdo|169]] | |||
|- | |||
| [[170ifdo|170]] | |||
| [[171ifdo|171]] | |||
| [[172ifdo|172]] | |||
| [[173ifdo|173]] | |||
| [[174ifdo|174]] | |||
| [[175ifdo|175]] | |||
| [[176ifdo|176]] | |||
| [[177ifdo|177]] | |||
| [[178ifdo|178]] | |||
| [[179ifdo|179]] | |||
|- | |||
| [[180ifdo|180]] | |||
| [[181ifdo|181]] | |||
| [[182ifdo|182]] | |||
| [[183ifdo|183]] | |||
| [[184ifdo|184]] | |||
| [[185ifdo|185]] | |||
| [[186ifdo|186]] | |||
| [[187ifdo|187]] | |||
| [[188ifdo|188]] | |||
| [[189ifdo|189]] | |||
|- | |||
| [[190ifdo|190]] | |||
| [[191ifdo|191]] | |||
| [[192ifdo|192]] | |||
| [[193ifdo|193]] | |||
| [[194ifdo|194]] | |||
| [[195ifdo|195]] | |||
| [[196ifdo|196]] | |||
| [[197ifdo|197]] | |||
| [[198ifdo|198]] | |||
| [[199ifdo|199]] | |||
|} | |||
=== By prime family === | |||
'''Under-2''': {{IFDOs|2, 4, 8, 16, 32, 64, 128, 256, 512}} | |||
'''Under-3''': {{IFDOs|3, 6, 12, 24, 48, 96, 192, 384}} | |||
'''Under-5''': {{IFDOs|5, 10, 20, 40, 80, 160, 320}} | |||
'''Under-7''': {{IFDOs|7, 14, 28, 56, 112, 224, 448}} | |||
'''Under-11''': {{IFDOs|11, 22, 44, 88, 176, 352}} | |||
'''Under-13''': {{IFDOs|13, 26, 52, 104, 208, 416}} | |||
'''Under-17''': {{IFDOs|17, 34, 68, 136, 272, 544}} | |||
'''Under-19''': {{IFDOs|19, 38, 76, 152, 304}} | |||
'''Under-23''': {{IFDOs|23, 46, 92, 184, 368}} | |||
'''Under-29''': {{IFDOs|29, 58, 116, 232, 464}} | |||
'''Under-31''': {{IFDOs|31, 62, 124, 248, 496}} | |||
=== By other properties === | |||
'''Prime''': {{IFDOs|2, 3, 5, 7, 11, 13, 17, 19, 23, 29, 31, 37, 41, 43, 47, 53, 59, 61, 67, 71, 73, 79, 83, 89, 97, 101, 103, 107, 109, 113, 127, 131, 137, 139, 149, 151, 157, 163, 167, 173, 179, 181, 191, 193, 197, 199, 211, 223, 227, 229, 233, 239, 241, 251, 257, 263, 269, 271}} | |||
'''Semiprime''': {{IFDOs|4, 6, 9, 10, 14, 15, 21, 22, 25, 26, 33, 34, 35, 38, 39, 46, 49, 51, 55, 57, 58, 62, 65, 69, 74, 77, 82, 85, 86, 87, 91, 93, 94, 95, 106, 111, 115, 118, 119, 121, 122, 123, 129, 133, 134, 141, 142, 143, 145, 146, 155, 158, 159, 161, 166, 169, 177, 178, 183, 185, 187}} | |||
'''Odd squarefree semiprime''': {{IFDOs|15, 21, 33, 35, 39, 51, 55, 57, 65, 69, 77, 85, 87, 91, 93, 95, 111, 115, 119, 123, 129, 133, 141, 143, 145, 155, 159, 161, 177, 183, 185, 187, 201, 203, 205, 209, 213, 215, 217, 219, 221, 235, 237, 247, 249, 253, 259, 265, 267, 287, 291, 295, 299, 301, 303}} | |||
'''Prime powers (without primes)''': {{IFDOs|4, 8, 9, 16, 25, 27, 32, 49, 64, 81, 121, 125, 128, 169, 243, 256, 289, 343, 361, 512, 529, 625, 729, 841, 961, 1024, 1331, 1369, 1681, 1849, 2048}} | |||
== See also == | == See also == | ||
| Line 24: | Line 332: | ||
** [[AFDO]] – arithmetic frequency division of the octave | ** [[AFDO]] – arithmetic frequency division of the octave | ||
** [[EDO]] – equal division of the octave | ** [[EDO]] – equal division of the octave | ||
* [[UD|UD, or utonal division]] | |||
== External links == | |||
* [https://web.archive.org/web/20220630142502/https://sites.google.com/site/240edo/equaldivisionsoflength(edl) 96~EDO | ''Equal divisions of length''] | |||
== Notes == | == Notes == | ||