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{{Infobox ET}} | {{Infobox ET}} | ||
[[File:13edt.png|thumb|alt=13edt.png|A plot of the [[ | [[File:13edt.png|thumb|alt=13edt.png|A plot of the [[the Riemann zeta function and tuning#Removing primes|no-twos Z-function]], in terms of which 13edt is the fourth no-twos zeta peak [[EDT]].]] | ||
'''13 equal divisions of the tritave''' ('''13edt''') is the [[nonoctave]] [[tuning system]] derived by dividing the [[tritave]] (3/1) into 13 equal steps of 146.3 [[cent]]s each, or the thirteenth root of 3. It is best known as the equal-tempered version of the [[ | '''13 equal divisions of the tritave''' ('''13edt''') is the [[nonoctave]] [[tuning system]] derived by dividing the [[tritave]] (3/1) into 13 equal steps of 146.3 [[cent]]s each, or the thirteenth root of 3. It is best known as the equal-tempered version of the [[Bohlen–Pierce]] scale, and therefore has received by far the most attention among equal divisions of the tritave. | ||
It provides an excellent approximation to the [[3.5.7 subgroup]], especially for its size, being comparable to [[34edo]]'s accuracy in the 5-limit. In this subgroup, it tempers out [[245/243]] and [[3125/3087]], the same commas as [[Sensamagic_clan#Bohpier|bohpier temperament]]. It is less impressive in higher prime limits, but makes for excellent no-twos 7-limit harmony. For higher limits, the multiples of 13 ([[26edt]], [[39edt]] and [[52edt]]) come to the fore. | It provides an excellent approximation to the [[3.5.7 subgroup]], especially for its size, being comparable to [[34edo]]'s accuracy in the 5-limit. In this subgroup, it tempers out [[245/243]] and [[3125/3087]], the same commas as [[Sensamagic_clan#Bohpier|bohpier temperament]]. It is less impressive in higher prime limits, but makes for excellent no-twos 7-limit harmony. For higher limits, the multiples of 13 ([[26edt]], [[39edt]], and [[52edt]]) come to the fore. | ||
13edt can be described as approximately 8.202[[edo]]. This implies that each step of 13edt can be approximated by 5 steps of [[41edo]]. | 13edt can be described as approximately 8.202[[edo]]. This implies that each step of 13edt can be approximated by 5 steps of [[41edo]]. | ||
In the [[no-2]] [[3/1-equave-7-limit]], [[13edt]] maintains the smallest relative error of any EDT until [[258edt]] and [[271edt]], and the smallest absolute error until [[56edt]]. | In the [[no-2]] [[3/1]]-[[equave]]-[[7-limit]], [[13edt]] maintains the smallest relative error of any EDT until [[258edt]] and [[271edt]], and the smallest absolute error until [[56edt]]. | ||
== Theory == | == Theory == | ||
{{Harmonics in equal|13|3|1|prec=2}} | {{Harmonics in equal|13|3|1|prec=2|intervals=odd}} | ||
{{Harmonics in equal|13|3|1|prec=2|intervals=odd| | {{Harmonics in equal|13|3|1|prec=2|intervals=odd|start=12}} | ||
* [[Relationship between Bohlen-Pierce and octave-ful temperaments]] | * [[Relationship between Bohlen-Pierce and octave-ful temperaments]] | ||
| Line 24: | Line 24: | ||
! [[Cent]]s | ! [[Cent]]s | ||
! [[Hekt]]s | ! [[Hekt]]s | ||
! [[4L 5s (3/1-equivalent)|Enneatonic]] degree | ! [[4L 5s (3/1-equivalent)|Enneatonic]]<br />degree | ||
! Corresponding | ! Corresponding<br />3.5.7 subgroup<br />intervals | ||
3.5.7 subgroup <br> | ! [[Lambda ups and downs notation|Lambda]]<br />(sLsLsLsLs, {{nowrap|E {{=}} 1/1}}) | ||
intervals | |||
! [[Lambda ups and downs notation|Lambda]] | |||
(sLsLsLsLs, | |||
E = 1/1) | |||
|- | |- | ||
| 0 | | 0 | ||
| Line 43: | Line 39: | ||
| 100 | | 100 | ||
| A1/m2 | | A1/m2 | ||
| [[49/45]] ( | | [[49/45]] (−1.1{{c}}); [[27/25]] (+13.1{{c}}) | ||
| F | | F | ||
|- | |- | ||
| Line 50: | Line 46: | ||
| 200 | | 200 | ||
| M2/d3 | | M2/d3 | ||
| [[25/21]] ( | | [[25/21]] (−9.2{{c}}) | ||
| F#, Gb | | F#, Gb | ||
|- | |- | ||
| Line 57: | Line 53: | ||
| 300 | | 300 | ||
| A2/P3/d4 | | A2/P3/d4 | ||
| [[9/7]] (+3. | | [[9/7]] (+3.8{{c}}) | ||
| G | | G | ||
|- | |- | ||
| Line 64: | Line 60: | ||
| 400 | | 400 | ||
| A3/m4/d5 | | A3/m4/d5 | ||
| [[7/5]] (+2. | | [[7/5]] (+2.7{{c}}) | ||
| H | | H | ||
|- | |- | ||
| Line 71: | Line 67: | ||
| 500 | | 500 | ||
| M4/m5 | | M4/m5 | ||
| [[75/49]] ( | | [[75/49]] (−5.4{{c}}) | ||
| H#, Jb | | H#, Jb | ||
|- | |- | ||
| Line 78: | Line 74: | ||
| 600 | | 600 | ||
| A4/M5 | | A4/M5 | ||
| [[5/3]] ( | | [[5/3]] (−6.5{{c}}) | ||
| J | | J | ||
|- | |- | ||
| Line 85: | Line 81: | ||
| 700 | | 700 | ||
| A5/m6/d7 | | A5/m6/d7 | ||
| [[9/5]] (+6. | | [[9/5]] (+6.5{{c}}) | ||
| A | | A | ||
|- | |- | ||
| Line 92: | Line 88: | ||
| 800 | | 800 | ||
| M6/m7 | | M6/m7 | ||
| [[49/25]] (+5. | | [[49/25]] (+5.4{{c}}) | ||
| A#, Bb | | A#, Bb | ||
|- | |- | ||
| Line 99: | Line 95: | ||
| 900 | | 900 | ||
| A6/M7/d8 | | A6/M7/d8 | ||
| [[15/7]] ( | | [[15/7]] (−2.7{{c}}) | ||
| B | | B | ||
|- | |- | ||
| Line 106: | Line 102: | ||
| 1000 | | 1000 | ||
| P8/d9 | | P8/d9 | ||
| [[7/3]] ( | | [[7/3]] (−3.8{{c}}) | ||
| C | | C | ||
|- | |- | ||
| Line 113: | Line 109: | ||
| 1100 | | 1100 | ||
| A8/m9 | | A8/m9 | ||
| [[63/25]] (+9. | | [[63/25]] (+9.2{{c}}) | ||
| C#, Db | | C#, Db | ||
|- | |- | ||
| Line 120: | Line 116: | ||
| 1200 | | 1200 | ||
| M9/d10 | | M9/d10 | ||
| [[135/49]] (+1. | | [[135/49]] (+1.1{{c}}); [[25/9]] (−13.1{{c}}) | ||
| D | | D | ||
|- | |- | ||
| Line 155: | Line 151: | ||
=== Rank-2 temperaments === | === Rank-2 temperaments === | ||
{| class="wikitable center-all right-3 left-5" | {| class="wikitable center-all right-3 left-5" | ||
|+Table of rank-2 temperaments by generator | |+ style="font-size: 105%;" | Table of rank-2 temperaments by generator | ||
! Periods<br>per tritave | |- | ||
! Generator<br>(reduced) | ! Periods<br />per tritave | ||
! Cents<br>(reduced) | ! Generator<br />(reduced) | ||
! Associated<br>ratio | ! Cents<br />(reduced) | ||
! Associated<br />ratio | |||
! Temperament | ! Temperament | ||
|- | |- | ||
| Line 186: | Line 183: | ||
| [[Canopus]] | | [[Canopus]] | ||
|- | |- | ||
|1 | | 1 | ||
|5\13 | | 5\13 | ||
|731.63 | | 731.63 | ||
|75/49 | | 75/49 | ||
| | | | ||
|- | |- | ||
| Line 206: | Line 203: | ||
* [[23ed7|23ED7]]: relative ED7 | * [[23ed7|23ED7]]: relative ED7 | ||
[[Category:Tritave]] | [[Category:Tritave]] | ||
[[Category:Macrotonal]] | [[Category:Macrotonal]] | ||
[[Category:Nonoctave]] | [[Category:Nonoctave]] | ||
[[Category: | [[Category:Bohlen–Pierce]] | ||
Latest revision as of 16:47, 22 May 2026
| ← 12edt | 13edt | 14edt → |
13 equal divisions of the tritave (13edt) is the nonoctave tuning system derived by dividing the tritave (3/1) into 13 equal steps of 146.3 cents each, or the thirteenth root of 3. It is best known as the equal-tempered version of the Bohlen–Pierce scale, and therefore has received by far the most attention among equal divisions of the tritave.
It provides an excellent approximation to the 3.5.7 subgroup, especially for its size, being comparable to 34edo's accuracy in the 5-limit. In this subgroup, it tempers out 245/243 and 3125/3087, the same commas as bohpier temperament. It is less impressive in higher prime limits, but makes for excellent no-twos 7-limit harmony. For higher limits, the multiples of 13 (26edt, 39edt, and 52edt) come to the fore.
13edt can be described as approximately 8.202edo. This implies that each step of 13edt can be approximated by 5 steps of 41edo.
In the no-2 3/1-equave-7-limit, 13edt maintains the smallest relative error of any EDT until 258edt and 271edt, and the smallest absolute error until 56edt.
Theory
| Harmonic | 3 | 5 | 7 | 9 | 11 | 13 | 15 | 17 | 19 | 21 | 23 | |
|---|---|---|---|---|---|---|---|---|---|---|---|---|
| Error | Absolute (¢) | +0.00 | -6.53 | -3.83 | +0.00 | -54.80 | -51.40 | -6.53 | +69.39 | +23.14 | -3.83 | -15.02 |
| Relative (%) | +0.0 | -4.5 | -2.6 | +0.0 | -37.5 | -35.1 | -4.5 | +47.4 | +15.8 | -2.6 | -10.3 | |
| Steps (reduced) |
13 (0) |
19 (6) |
23 (10) |
26 (0) |
28 (2) |
30 (4) |
32 (6) |
34 (8) |
35 (9) |
36 (10) |
37 (11) | |
| Harmonic | 25 | 27 | 29 | 31 | 33 | 35 | 37 | 39 | 41 | 43 | 45 | |
|---|---|---|---|---|---|---|---|---|---|---|---|---|
| Error | Absolute (¢) | -13.07 | +0.00 | +22.59 | +53.44 | -54.80 | -10.36 | +39.74 | -51.40 | +8.32 | +72.17 | -6.53 |
| Relative (%) | -8.9 | +0.0 | +15.4 | +36.5 | -37.5 | -7.1 | +27.2 | -35.1 | +5.7 | +49.3 | -4.5 | |
| Steps (reduced) |
38 (12) |
39 (0) |
40 (1) |
41 (2) |
41 (2) |
42 (3) |
43 (4) |
43 (4) |
44 (5) |
45 (6) |
45 (6) | |
Intervals
| Steps | Cents | Hekts | Enneatonic degree |
Corresponding 3.5.7 subgroup intervals |
Lambda (sLsLsLsLs, E = 1/1) |
|---|---|---|---|---|---|
| 0 | 0 | 0 | P1 | 1/1 | E |
| 1 | 146.3 | 100 | A1/m2 | 49/45 (−1.1 ¢); 27/25 (+13.1 ¢) | F |
| 2 | 292.6 | 200 | M2/d3 | 25/21 (−9.2 ¢) | F#, Gb |
| 3 | 438.9 | 300 | A2/P3/d4 | 9/7 (+3.8 ¢) | G |
| 4 | 585.2 | 400 | A3/m4/d5 | 7/5 (+2.7 ¢) | H |
| 5 | 731.5 | 500 | M4/m5 | 75/49 (−5.4 ¢) | H#, Jb |
| 6 | 877.8 | 600 | A4/M5 | 5/3 (−6.5 ¢) | J |
| 7 | 1024.1 | 700 | A5/m6/d7 | 9/5 (+6.5 ¢) | A |
| 8 | 1170.4 | 800 | M6/m7 | 49/25 (+5.4 ¢) | A#, Bb |
| 9 | 1316.7 | 900 | A6/M7/d8 | 15/7 (−2.7 ¢) | B |
| 10 | 1463.0 | 1000 | P8/d9 | 7/3 (−3.8 ¢) | C |
| 11 | 1609.3 | 1100 | A8/m9 | 63/25 (+9.2 ¢) | C#, Db |
| 12 | 1755.7 | 1200 | M9/d10 | 135/49 (+1.1 ¢); 25/9 (−13.1 ¢) | D |
| 13 | 1902.0 | 1300 | A9/P10 | 3/1 | E |
JI approximation
Regular temperament properties
| Subgroup | Comma list | Mapping | Optimal Equave stretch (¢) |
Tuning error | |
|---|---|---|---|---|---|
| Absolute (¢) | Relative (%) | ||||
| 3.5.7 | 245/243, 3125/3087 | [⟨13 19 23]] (b13) | +1.393 | 1.150 | 0.79 |
Rank-2 temperaments
| Periods per tritave |
Generator (reduced) |
Cents (reduced) |
Associated ratio |
Temperament |
|---|---|---|---|---|
| 1 | 1\13 | 146.30 | 49/45 | Procyon |
| 1 | 2\13 | 292.61 | 25/21 | Sirius |
| 1 | 3\13 | 438.91 | 9/7 | BPS |
| 1 | 4\13 | 585.22 | 7/5 | Canopus |
| 1 | 5\13 | 731.63 | 75/49 | |
| 1 | 6\13 | 877.83 | 5/3 | Arcturus |
See also
- Bohlen-p_et
- Catalog of 3.5.7 subgroup rank two temperaments
- No-twos subgroup temperaments#3.5.7 subgroup temperaments
- 19ED5: relative ED5
- 23ED7: relative ED7