5-limit: Difference between revisions
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The octave equivalence classes of 5-limit or ''quinquimal'' intervals can usefully be depicted on a lattice diagram, either as a [[wikipedia: Hexagonal lattice |hexagonal lattice]] or as a [[wikipedia: Square lattice|square lattice]]; this can be done automatically by [[Scala]]. If the intervals are depicted with maximum symmetry as a hexagonal lattice, then the corresponding 5-limit triads define a [[wikipedia:Hexagonal tiling|hexagonal tiling]]. | The octave equivalence classes of 5-limit or ''quinquimal'' intervals can usefully be depicted on a lattice diagram, either as a [[wikipedia: Hexagonal lattice |hexagonal lattice]] or as a [[wikipedia: Square lattice|square lattice]]; this can be done automatically by [[Scala]]. If the intervals are depicted with maximum symmetry as a hexagonal lattice, then the corresponding 5-limit triads define a [[wikipedia:Hexagonal tiling|hexagonal tiling]]. | ||
[[EDO]]s which do relatively well in approximating the 5-limit (harmonics 3 and 5) | [[EDO]]s which do relatively well in approximating the 5-limit (harmonics 3 and 5) are {{EDOs| 2, 3, 7, 9, 10, 12, 19, 22, 31, 34, 53, 118, 289, 323, 441, 494, 559, 612, 1171, 1783, 2513, 3684, 4296, … }} ([[OEIS: A060525]]) | ||
Another approach is to find EDOs which have better approximations for [[5-odd-limit]] intervals than all smaller EDOs | Another approach is to find EDOs which have better approximations for [[5-odd-limit]] intervals than all smaller EDOs. This results in {{EDOs| 1, 2, 3, 5, 7, 12, 19, 31, 34, 53, 118, 171, 289, 323, 441, 612, 730, 1171, 1783, 2513, 4296, … }} ([[OEIS: A054540]]) | ||
== Syntonic comma pairs == | == Syntonic comma pairs == | ||
A significant interval in 5-limit JI is [[81/80]], the syntonic comma or Didymus' comma, which measures about 21.5¢. Although it rarely appears as an interval in a scale, it represents the difference between many 5-limit intervals and a nearby [[3-limit]] (Pythagorean) interval. 81/80 is tempered out in [[12edo]], [[meantone]], and many other related systems, meaning that those 5- and 3-limit distinctions are obliterated and one interval stands in for each. Living in a largely 12edo musical culture from birth, we are not accustomed to distinguishing two different major thirds, two different minor seconds, etc. Below is a list of some common intervals involving 3 and 5 which are distinguished by 81/80. The next column modifies intervals by another 81/80, for a total of 6561/6400 (43 cents). '''Bold''' fractions are simplest for this interval category. | A significant interval in 5-limit JI is [[81/80]], the syntonic comma or Didymus' comma, which measures about 21.5¢. Although it rarely appears as an interval in a scale, it represents the difference between many 5-limit intervals and a nearby [[3-limit]] (Pythagorean) interval. 81/80 is tempered out in [[12edo|12EDO]], [[meantone]], and many other related systems, meaning that those 5- and 3-limit distinctions are obliterated and one interval stands in for each. Living in a largely 12edo musical culture from birth, we are not accustomed to distinguishing two different major thirds, two different minor seconds, etc. Below is a list of some common intervals involving 3 and 5 which are distinguished by 81/80. The next column modifies intervals by another 81/80, for a total of 6561/6400 (43 cents). '''Bold''' fractions are simplest for this interval category. | ||
{| class="wikitable" | {| class="wikitable" | ||
| Line 41: | Line 41: | ||
| 43.013 | | 43.013 | ||
| Lgg1 | | Lgg1 | ||
|lagugu 1sn | | lagugu 1sn | ||
|- | |- | ||
| aug. 1sn | | aug. 1sn | ||
| Line 56: | Line 56: | ||
| '''70.672''' | | '''70.672''' | ||
| yy1 | | yy1 | ||
|yoyo 1sn | | yoyo 1sn | ||
|- | |- | ||
| minor 2nd | | minor 2nd | ||
| Line 71: | Line 71: | ||
| 133.238 | | 133.238 | ||
| gg2 | | gg2 | ||
|gugu 2nd | | gugu 2nd | ||
|- | |- | ||
| major 2nd | | major 2nd | ||
| Line 86: | Line 86: | ||
| 160.897 | | 160.897 | ||
| syy2 | | syy2 | ||
|sayoyo 2nd | | sayoyo 2nd | ||
|- | |- | ||
| aug. 2nd | | aug. 2nd | ||
| Line 101: | Line 101: | ||
| '''274.582''' | | '''274.582''' | ||
| yy2 | | yy2 | ||
|yoyo 2nd | | yoyo 2nd | ||
|- | |- | ||
| minor 3rd | | minor 3rd | ||
| Line 116: | Line 116: | ||
| 337.148 | | 337.148 | ||
| gg3 | | gg3 | ||
|gugu 3rd | | gugu 3rd | ||
|- | |- | ||
| major 3rd | | major 3rd | ||
| Line 131: | Line 131: | ||
| 364.807 | | 364.807 | ||
| yy3 | | yy3 | ||
|yoyo 3rd | | yoyo 3rd | ||
|- | |- | ||
| dim. 4th | | dim. 4th | ||
| Line 146: | Line 146: | ||
| '''427.373''' | | '''427.373''' | ||
| gg4 | | gg4 | ||
|gugu 4th | | gugu 4th | ||
|- | |- | ||
| 4th | | 4th | ||
| Line 161: | Line 161: | ||
| 541.058 | | 541.058 | ||
| Lgg4 | | Lgg4 | ||
|lagugu 4th | | lagugu 4th | ||
|- | |- | ||
| aug. 4th | | aug. 4th | ||
| Line 176: | Line 176: | ||
| '''568.717''' | | '''568.717''' | ||
| yy4 | | yy4 | ||
|yoyo 4th | | yoyo 4th | ||
|- | |- | ||
| dim. 5th | | dim. 5th | ||
| Line 191: | Line 191: | ||
| '''631.283''' | | '''631.283''' | ||
| gg5 | | gg5 | ||
|gugu 5th | | gugu 5th | ||
|- | |- | ||
| 5th | | 5th | ||
| Line 206: | Line 206: | ||
| 658.942 | | 658.942 | ||
| syy5 | | syy5 | ||
|sayoyo 5th | | sayoyo 5th | ||
|- | |- | ||
| aug. fifth | | aug. fifth | ||
| Line 221: | Line 221: | ||
| '''772.627''' | | '''772.627''' | ||
| yy5 | | yy5 | ||
|yoyo 5th | | yoyo 5th | ||
|- | |- | ||
| minor 6th | | minor 6th | ||
| Line 236: | Line 236: | ||
| 835.193 | | 835.193 | ||
| gg6 | | gg6 | ||
|gugu 6th | | gugu 6th | ||
|- | |- | ||
| major 6th | | major 6th | ||
| Line 251: | Line 251: | ||
| 862.852 | | 862.852 | ||
| yy6 | | yy6 | ||
|yoyo 6th | | yoyo 6th | ||
|- | |- | ||
| dim. 7th | | dim. 7th | ||
| Line 266: | Line 266: | ||
| '''925.418''' | | '''925.418''' | ||
| gg7 | | gg7 | ||
|gugu 7th | | gugu 7th | ||
|- | |- | ||
| minor 7th | | minor 7th | ||
| Line 281: | Line 281: | ||
| 1039.103 | | 1039.103 | ||
| Lgg7 | | Lgg7 | ||
|lagugu 7th | | lagugu 7th | ||
|- | |- | ||
| major 7th | | major 7th | ||
| Line 296: | Line 296: | ||
| 1066.762 | | 1066.762 | ||
| yy7 | | yy7 | ||
|yoyo 7th | | yoyo 7th | ||
|- | |- | ||
| dim. 8ve | | dim. 8ve | ||
| Line 311: | Line 311: | ||
| '''1129.328''' | | '''1129.328''' | ||
| gg8 | | gg8 | ||
|gugu 8ve | | gugu 8ve | ||
|- | |- | ||
| octave | | octave | ||
| Line 326: | Line 326: | ||
| 1156.987 | | 1156.987 | ||
| syy8 | | syy8 | ||
|sayoyo 8ve | | sayoyo 8ve | ||
|} | |} | ||
Revision as of 08:21, 12 September 2021
The 5-limit consists of all just intonation intervals whose numerators and denominators are both products of the primes 2, 3, and 5; these are sometimes called regular numbers. Some examples of 5-limit intervals are 5/4, 6/5, 10/9 and 81/80. The 5-odd-limit consists of intervals whose numerators and denominators, when all factors of two have been removed, are less than or equal to 5. Reduced to an octave, these are the ratios 1/1, 6/5, 5/4, 4/3, 3/2, 8/5, 5/3, 2/1. Approximating these ratios has been basic to Western common-practice music since the Renaissance.
The octave equivalence classes of 5-limit or quinquimal intervals can usefully be depicted on a lattice diagram, either as a hexagonal lattice or as a square lattice; this can be done automatically by Scala. If the intervals are depicted with maximum symmetry as a hexagonal lattice, then the corresponding 5-limit triads define a hexagonal tiling.
EDOs which do relatively well in approximating the 5-limit (harmonics 3 and 5) are 2, 3, 7, 9, 10, 12, 19, 22, 31, 34, 53, 118, 289, 323, 441, 494, 559, 612, 1171, 1783, 2513, 3684, 4296, … (OEIS: A060525)
Another approach is to find EDOs which have better approximations for 5-odd-limit intervals than all smaller EDOs. This results in 1, 2, 3, 5, 7, 12, 19, 31, 34, 53, 118, 171, 289, 323, 441, 612, 730, 1171, 1783, 2513, 4296, … (OEIS: A054540)
Syntonic comma pairs
A significant interval in 5-limit JI is 81/80, the syntonic comma or Didymus' comma, which measures about 21.5¢. Although it rarely appears as an interval in a scale, it represents the difference between many 5-limit intervals and a nearby 3-limit (Pythagorean) interval. 81/80 is tempered out in 12EDO, meantone, and many other related systems, meaning that those 5- and 3-limit distinctions are obliterated and one interval stands in for each. Living in a largely 12edo musical culture from birth, we are not accustomed to distinguishing two different major thirds, two different minor seconds, etc. Below is a list of some common intervals involving 3 and 5 which are distinguished by 81/80. The next column modifies intervals by another 81/80, for a total of 6561/6400 (43 cents). Bold fractions are simplest for this interval category.
| interval
category |
wa (3-limit) interval | yo or gu (5-limit) interval (81/80) | yoyo or gugu interval (6561/6400) | ||||||||||
|---|---|---|---|---|---|---|---|---|---|---|---|---|---|
| ratio | cents | Color name | ratio | cents | Color name | ratio | cents | Color name | |||||
| unison | C | 1/1 | 0.000 | w1 | wa unison | 81/80 | 21.506 | g1 | gu comma | 6561/6400 | 43.013 | Lgg1 | lagugu 1sn |
| aug. 1sn | C# | 2187/2048 | 113.685 | Lw1 | lawa 1sn | 135/128 | 92.179 | Ly1 | layo 1sn | 25/24 | 70.672 | yy1 | yoyo 1sn |
| minor 2nd | Db | 256/243 | 90.225 | sw2 | sawa 2nd | 16/15 | 111.731 | g2 | gu 2nd | 27/25 | 133.238 | gg2 | gugu 2nd |
| major 2nd | D | 9/8 | 203.910 | w2 | wa 2nd | 10/9 | 182.404 | y2 | yo 2nd | 800/729 | 160.897 | syy2 | sayoyo 2nd |
| aug. 2nd | D# | 19683/16384 | 317.595 | Lw2 | lawa 2nd | 1215/1024 | 296.089 | Ly2 | layo 2nd | 75/64 | 274.582 | yy2 | yoyo 2nd |
| minor 3rd | Eb | 32/27 | 294.135 | w3 | wa 3rd | 6/5 | 315.641 | g3 | gu 3rd | 243/200 | 337.148 | gg3 | gugu 3rd |
| major 3rd | E | 81/64 | 407.820 | Lw3 | lawa 3rd | 5/4 | 386.314 | y3 | yo 3rd | 100/81 | 364.807 | yy3 | yoyo 3rd |
| dim. 4th | Fb | 8192/6561 | 384.360 | sw4 | sawa 4th | 512/405 | 405.866 | sg4 | sagu 4th | 32/25 | 427.373 | gg4 | gugu 4th |
| 4th | F | 4/3 | 498.045 | w4 | wa 4th | 27/20 | 519.551 | g4 | gu 4th | 2187/1600 | 541.058 | Lgg4 | lagugu 4th |
| aug. 4th | F# | 729/512 | 611.730 | Lw4 | lawa 4th | 45/32 | 590.224 | y4 | yo 4th | 25/18 | 568.717 | yy4 | yoyo 4th |
| dim. 5th | Gb | 1024/729 | 588.270 | sw5 | sawa 5th | 64/45 | 609.776 | g5 | gu 5th | 36/25 | 631.283 | gg5 | gugu 5th |
| 5th | G | 3/2 | 701.955 | w5 | wa 5th | 40/27 | 680.449 | y5 | yo 5th | 3200/2187 | 658.942 | syy5 | sayoyo 5th |
| aug. fifth | G# | 6561/4096 | 815.640 | Lw5 | lawa 5th | 405/256 | 794.134 | Ly5 | layo 5th | 25/16 | 772.627 | yy5 | yoyo 5th |
| minor 6th | Ab | 128/81 | 792.180 | sw6 | sawa 6th | 8/5 | 813.686 | g6 | gu 6th | 81/50 | 835.193 | gg6 | gugu 6th |
| major 6th | A | 27/16 | 905.865 | w6 | wa 6th | 5/3 | 884.359 | y6 | yo 6th | 400/243 | 862.852 | yy6 | yoyo 6th |
| dim. 7th | Bbb | 32768/19683 | 882.405 | sw7 | sawa 7th | 2048/1215 | 903.911 | sg7 | sagu 7th | 128/75 | 925.418 | gg7 | gugu 7th |
| minor 7th | Bb | 16/9 | 996.090 | w7 | wa 7th | 9/5 | 1017.596 | g7 | gu 7th | 729/400 | 1039.103 | Lgg7 | lagugu 7th |
| major 7th | B | 243/128 | 1109.775 | Lw7 | lawa 7th | 15/8 | 1088.269 | y7 | yo 7th | 50/27 | 1066.762 | yy7 | yoyo 7th |
| dim. 8ve | Cb | 4096/2187 | 1086.315 | sw8 | sawa 8ve | 256/135 | 1107.821 | sg8 | sagu 8ve | 48/25 | 1129.328 | gg8 | gugu 8ve |
| octave | C | 2/1 | 1200.000 | w8 | wa 8ve | 160/81 | 1178.494 | y8 | yo 8ve | 12800/6561 | 1156.987 | syy8 | sayoyo 8ve |
It is important to note that 5-limit music does not mean favoring intervals of 5 over intervals of 3. It means allowing for both 3's and 5's in generating harmonic material, and so it is an interplay between both. The 5-limit includes the 3-limit – a work in 5-limit JI will utilize intervals from both sides of the chart above.
Music
- Duodene2 by Chris Vaisvil
- Ariel's 12-tone JI by Chris Vaisvil
- The Ballad of Jed Clampett by Paul Henning
- Do Wah Diddy Diddy by Jeff Barry and Ellie Greenwich
- Symphony 4, first movement by William Copper
- Magnificat by William Copper
- Catch for Woodwin Quintet by William Copper