80edo: Difference between revisions
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The '''80 equal temperament''', often abbreviated 80-tET, 80-EDO, or 80-ET, is the scale derived by dividing the octave into 80 equally-sized steps. Each step is exactly 15 [[ | The '''80 equal temperament''', often abbreviated 80-tET, 80-EDO, or 80-ET, is the scale derived by dividing the octave into 80 equally-sized steps. Each step is exactly 15 [[cent]]s. | ||
== Theory == | == Theory == | ||
80et is the first equal temperament that represents the [[19-limit]] [[tonality diamond]] [[consistent | 80et is the first equal temperament that represents the [[19-limit]] [[tonality diamond]] [[consistent]]ly, though it barely manages to do so. | ||
80et [[Tempering_out|tempers out]] 176/175 and 540/539 in the [[11-limit]], 169/168, [[325/324]], [[351/350]], [[352/351]], [[364/363]] and 1001/1000 in the [[13-limit]], 136/135, 221/220, 256/255, 289/288, 561/560, 595/594, 715/714, 936/935, 1275/1274 in the [[17-limit]], 190/189, 286/285, 361/360, 400/399, 456/455, 476/475, 969/968, 1331/1330, [[1445/1444]], 1521/1520, 1540/1539 and 1729/1728 in the 19-limit, not to mention such important non-superparticular commas as [[2048/2025]], 4000/3969, 1728/1715 and 3136/3125. | 80et [[Tempering_out|tempers out]] 176/175 and 540/539 in the [[11-limit]], 169/168, [[325/324]], [[351/350]], [[352/351]], [[364/363]] and 1001/1000 in the [[13-limit]], 136/135, 221/220, 256/255, 289/288, 561/560, 595/594, 715/714, 936/935, 1275/1274 in the [[17-limit]], 190/189, 286/285, 361/360, 400/399, 456/455, 476/475, 969/968, 1331/1330, [[1445/1444]], 1521/1520, 1540/1539 and 1729/1728 in the 19-limit, not to mention such important non-superparticular commas as [[2048/2025]], 4000/3969, 1728/1715 and 3136/3125. | ||
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41&80 <<7 26 25 -3 -24 -33 20 ... || | 41&80 <<7 26 25 -3 -24 -33 20 ... || | ||
In each case, the numbers joined by an ampersand represent 19-limit [[ | In each case, the numbers joined by an ampersand represent 19-limit [[patent val]]s (meaning obtained by rounding to the nearest integer) and the first and most important part of the wedgie is given. | ||
== Intervals == | == Intervals == | ||
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== Just approximation == | == Just approximation == | ||
{| class="wikitable center-all" | {| class="wikitable center-all" | ||
! colspan="2" | | ! colspan="2" | <!-- empty cell --> | ||
! prime 2 | ! prime 2 | ||
! prime 3 | ! prime 3 | ||
| Line 237: | Line 237: | ||
| -5.04 | | -5.04 | ||
|- | |- | ||
![[Relative error|relative]] (%) | ! [[Relative error|relative]] (%) | ||
| 0.0 | | 0.0 | ||
| +20.3 | | +20.3 | ||
Revision as of 12:02, 18 December 2020
The 80 equal temperament, often abbreviated 80-tET, 80-EDO, or 80-ET, is the scale derived by dividing the octave into 80 equally-sized steps. Each step is exactly 15 cents.
Theory
80et is the first equal temperament that represents the 19-limit tonality diamond consistently, though it barely manages to do so.
80et tempers out 176/175 and 540/539 in the 11-limit, 169/168, 325/324, 351/350, 352/351, 364/363 and 1001/1000 in the 13-limit, 136/135, 221/220, 256/255, 289/288, 561/560, 595/594, 715/714, 936/935, 1275/1274 in the 17-limit, 190/189, 286/285, 361/360, 400/399, 456/455, 476/475, 969/968, 1331/1330, 1445/1444, 1521/1520, 1540/1539 and 1729/1728 in the 19-limit, not to mention such important non-superparticular commas as 2048/2025, 4000/3969, 1728/1715 and 3136/3125.
80et provides the optimal patent val for 5-limit diaschismic, for 13-limit srutal, and for 7-, 11- and 13-limit bidia. It is a good tuning for various temperaments in canou family, especially in higher limits.
80et supports a profusion of 19-limit (and lower) rank two temperaments which have mostly not been explored. We might mention:
31&80 <<7 6 15 27 -24 -23 -20 ... ||
72&80 <<24 30 40 24 32 24 0 ... ||
34&80 <<2 -4 -50 22 16 2 -40 ... ||
46&80 <<2 -4 30 22 16 2 40 ... ||
29&80 <<3 34 45 33 24 -37 20 ... ||
12&80 <<4 -8 -20 -36 32 4 0 ... ||
22&80 <<6 -10 12 -14 -32 6 -40 ... ||
58&80 <<6 -10 12 -14 -32 6 40 ... ||
41&80 <<7 26 25 -3 -24 -33 20 ... ||
In each case, the numbers joined by an ampersand represent 19-limit patent vals (meaning obtained by rounding to the nearest integer) and the first and most important part of the wedgie is given.
Intervals
| Degree | Cents | Approximate Ratios* |
|---|---|---|
| 0 | 0 | 1/1 |
| 1 | 15 | 64/63 |
| 2 | 30 | 81/80, 50/49 |
| 3 | 45 | 36/35, 49/48, 34/33 |
| 4 | 60 | 28/27, 33/32, 26/25, 35/34 |
| 5 | 75 | 25/24, 22/21, 27/26 |
| 6 | 90 | 21/20, 19/18, 20/19 |
| 7 | 105 | 16/15, 17/16, 18/17 |
| 8 | 120 | 15/14 |
| 9 | 135 | 13/12, 14/13 |
| 10 | 150 | 12/11 |
| 11 | 165 | 11/10 |
| 12 | 180 | 10/9, 21/19 |
| 13 | 195 | 19/17 |
| 14 | 210 | 9/8, 17/15 |
| 15 | 225 | 8/7 |
| 16 | 240 | |
| 17 | 255 | 81/70, 15/13, 22/19 |
| 18 | 270 | 7/6 |
| 19 | 285 | 13/11, 20/17 |
| 20 | 300 | 25/21, 19/16 |
| 21 | 315 | 6/5 |
| 22 | 330 | 17/14 |
| 23 | 345 | 11/9 |
| 24 | 360 | 16/13 |
| 25 | 375 | 21/17 |
| 26 | 390 | 5/4 |
| 27 | 405 | 24/19, 19/15 |
| 28 | 420 | 14/11 |
| 29 | 435 | 9/7 |
| 30 | 450 | 35/27, 13/10, 22/17 |
| 31 | 465 | 17/13 |
| 32 | 480 | 21/16, 25/19 |
| 33 | 495 | 4/3 |
| 34 | 510 | |
| 35 | 525 | 19/14 |
| 36 | 540 | 26/19 |
| 37 | 555 | 11/8 |
| 38 | 570 | 18/13 |
| 39 | 585 | 7/5 |
| 40 | 600 | 17/12, 24/17 |
| … | … | … |
* based on treating 80edo as a 19-limit temperament; other approaches are possible.
Just approximation
| prime 2 | prime 3 | prime 5 | prime 7 | prime 11 | prime 13 | prime 17 | prime 19 | prime 23 | prime 29 | prime 31 | ||
|---|---|---|---|---|---|---|---|---|---|---|---|---|
| Error | absolute (¢) | 0.00 | +3.04 | +3.69 | +6.17 | +3.68 | -0.53 | +0.04 | +2.49 | +1.73 | +5.42 | -5.04 |
| relative (%) | 0.0 | +20.3 | +24.6 | +41.1 | +24.5 | -3.5 | +0.3 | +16.6 | +11.5 | +36.2 | -33.6 | |