2023edo: Difference between revisions

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now leaves is full 17-limit now that I composed the song and tried it out, writing it down in the table
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{{Infobox ET}}
{{Infobox ET}}
{{EDO intro|2023}}
{{ED intro}}
 
== Theory ==
== Theory ==
{{Harmonics in equal|2023}}
2023edo is [[Enfactoring|enfactored]] in the 5-limit, with the same mapping as [[289edo]]. As such it maps the period to [[25/24]], which means [[septendecima]] is also tempered out. In the 17-limit on the [[patent val]], it is a tuning for the [[leaves]] temperament.
2023edo is enfactored in the 5-limit, with the same mapping as [[289edo]].
 
In the 17-limit on the patent val, it is a tuning for the [[leaves]] temperament. It is also period-17, and maps the period to 25/24, which means [[septendecima]] is also tempered out.  


If we impose a stricter harmonic approach, and require all errors to be below 25%, the subgroup consisting of first 7 such harmonics for 2023edo is 2.13.17.23.47.61.71.
If we impose a stricter harmonic approach, and require all errors to be below 25%, the subgroup consisting of first 7 such harmonics for 2023edo is 2.13.17.23.47.61.71.
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In the 2023e val, it supports the altierran rank-3 temperament tempering out the [[schisma]] and the [[quartisma]].
In the 2023e val, it supports the altierran rank-3 temperament tempering out the [[schisma]] and the [[quartisma]].


The divisors of 2023 are {{EDOs|1, 7, 17, 119, 289}}. It factors as 7 * 17<sup>2</sup>.
=== Prime harmonics ===
{{Harmonics in equal|2023}}
 
=== Subsets and supersets ===
Since 2023 factors as {{factorization|2023}}, 2023edo has subset edos {{EDOs| 7, 17, 119, and 289 }}.


== Regular temperament properties ==
== Regular temperament properties ==
=== Rank-2 temperaments ===
=== Rank-2 temperaments ===
Note: 5-limit temperaments represented by 289edo are not included.
Note: 5-limit temperaments supported by 289edo are not included.
{| class="wikitable center-all left-4"
{| class="wikitable center-all left-5"
!Periods
|+ style="font-size: 105%;" | Table of rank-2 temperaments by generator
per 8ve
|-
!Generator
! Periods<br />per 8ve
(Reduced)
! Generator*
!Cents
! Cents*
(Reduced)
! Associated<br />ratio*
!Associated
! Temperaments
Ratio
!Temperament
|-
|-
|17
| 17
|144\2023
| 144\2023<br />(25\2023)
(25\2023)
| 85.417<br />(14.829)
|85.417
| 1024/975<br />(8192/8125)
(14.829)
| [[Leaves]]
|1024/975
(?)
|[[Leaves]]
|}
|}
<nowiki />* [[Normal lists|Octave-reduced form]], reduced to the first half-octave, and [[Normal lists|minimal form]] in parentheses if distinct
== Music ==
== Music ==
; [[Eliora]]
* [https://www.youtube.com/watch?v=8K2RYO_oCnM ''Bagatelle in 11/8♭ Leaves''] (2023)


* [https://www.youtube.com/watch?v=8K2RYO_oCnM Bagatelle in 11/8♭ Leaves, (Op. 2, No. 2)] by [[Eliora]]
[[Category:Listen]]
 
[[Category:Equal divisions of the octave|####]]<!-- 4-digit number -->
[[Category:Quartismic]]

Latest revision as of 23:06, 20 February 2025

← 2022edo 2023edo 2024edo →
Prime factorization 7 × 172
Step size 0.593178 ¢ 
Fifth 1183\2023 (701.73 ¢) (→ 169\289)
Semitones (A1:m2) 189:154 (112.1 ¢ : 91.35 ¢)
Dual sharp fifth 1184\2023 (702.323 ¢)
Dual flat fifth 1183\2023 (701.73 ¢) (→ 169\289)
Dual major 2nd 344\2023 (204.053 ¢)
Consistency limit 7
Distinct consistency limit 7

2023 equal divisions of the octave (abbreviated 2023edo or 2023ed2), also called 2023-tone equal temperament (2023tet) or 2023 equal temperament (2023et) when viewed under a regular temperament perspective, is the tuning system that divides the octave into 2023 equal parts of about 0.593 ¢ each. Each step represents a frequency ratio of 21/2023, or the 2023rd root of 2.

Theory

2023edo is enfactored in the 5-limit, with the same mapping as 289edo. As such it maps the period to 25/24, which means septendecima is also tempered out. In the 17-limit on the patent val, it is a tuning for the leaves temperament.

If we impose a stricter harmonic approach, and require all errors to be below 25%, the subgroup consisting of first 7 such harmonics for 2023edo is 2.13.17.23.47.61.71.

In the 2023e val, it supports the altierran rank-3 temperament tempering out the schisma and the quartisma.

Prime harmonics

Approximation of odd harmonics in 2023edo
Harmonic 3 5 7 9 11 13 15 17 19 21 23
Error Absolute (¢) -0.225 -0.155 -0.166 +0.143 -0.255 +0.006 +0.214 +0.037 +0.263 +0.203 -0.098
Relative (%) -37.9 -26.1 -27.9 +24.2 -43.0 +1.0 +36.0 +6.3 +44.3 +34.2 -16.6
Steps
(reduced) 		3206
(1183) 		4697
(651) 		5679
(1633) 		6413
(344) 		6998
(929) 		7486
(1417) 		7904
(1835) 		8269
(177) 		8594
(502) 		8886
(794) 		9151
(1059)

Subsets and supersets

Since 2023 factors as 7 × 172, 2023edo has subset edos 7, 17, 119, and 289.

Regular temperament properties

Rank-2 temperaments

Note: 5-limit temperaments supported by 289edo are not included.

Table of rank-2 temperaments by generator
Periods
per 8ve 		Generator* Cents* Associated
ratio* 		Temperaments
17 144\2023
(25\2023) 		85.417
(14.829) 		1024/975
(8192/8125) 		Leaves

* Octave-reduced form, reduced to the first half-octave, and minimal form in parentheses if distinct

Music

Eliora
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