3125edo: Difference between revisions

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=== Rank-2 temperaments ===
=== Rank-2 temperaments ===
{| class="wikitable center-all left-5"
{{rank-2 begin}}
! Periods<br>per 8ve
! Generator*
! Cents*
! Associated<br>Ratio
! Temperaments
|-
|-
| 1
| 1
Line 65: Line 60:
| 16807/12288
| 16807/12288
| [[Revopent]]
| [[Revopent]]
|}
{{rank-2 end}}
<nowiki>*</nowiki> [[Normal lists|octave-reduced form]], reduced to the first half-octave, and [[Normal lists|minimal form]] in parentheses if it is distinct
{{orf}}


== Music ==
== Music ==

Revision as of 01:33, 16 November 2024

← 3124edo 3125edo 3126edo →
Prime factorization 55
Step size 0.384 ¢ 
Fifth 1828\3125 (701.952 ¢)
Semitones (A1:m2) 296:235 (113.7 ¢ : 90.24 ¢)
Consistency limit 15
Distinct consistency limit 15

Template:EDO intro

Theory

3125edo is distinctly consistent through the 15-odd-limit. A basis for its 7-limit commas is 78125000/78121827, 645700815/645657712 and 281484423828125/281474976710656. In the 11-limit, 151263/151250, 820125/819896, 21437500/21434787 and 117440512/117406179 are tempered out – it should be noted this edo is so far the only one known to have been confirmed as tempering out 117440512/117406179 prior to the independent discovery of this comma's significance as the difference between a stack of five 33/32 quartertones and one 7/6 subminor third. In the 13-limit, 6656/6655, 123201/123200, 140625/140608, 151263/151250 and 1399680/1399489 are all tempered out.

In the 2.5.11.13.19.23.29.31 subgroup, it supports a temperament called estates general, described as 1789 & 3125.

Prime harmonics

Approximation of prime harmonics in 3125edo
Harmonic 2 3 5 7 11 13 17 19 23 29 31
Error Absolute (¢) +0.000 -0.003 -0.010 +0.006 +0.106 +0.048 -0.123 +0.087 -0.050 -0.073 +0.052
Relative (%) +0.0 -0.8 -2.5 +1.6 +27.6 +12.6 -32.1 +22.7 -13.1 -19.1 +13.7
Steps
(reduced) 		3125
(0) 		4953
(1828) 		7256
(1006) 		8773
(2523) 		10811
(1436) 		11564
(2189) 		12773
(273) 		13275
(775) 		14136
(1636) 		15181
(2681) 		15482
(2982)

Subsets and supersets

3125 = 55, and as such it is the 5th edo of the form nn. It has subset edos 5, 25, 125, and 625.

Regular temperament properties

3125et is notable for being an extremely strong 7-limit system, being the first equal division past 171edo with a lower relative error.

Rank-2 temperaments

Template:Rank-2 begin |- | 1 | 139\3125 | 53.376 | 33/32 | Prequartismic |- | 1 | 411\3125 | 157.824 | 36756909/33554432 | Hemiegads |- | 1 | 577\3125 | 221.568 | 8388608/7381125 | Fortune |- | 1 | 822\3125 | 315.648 | 6/5 | Egads |- | 1 | 894\3125 | 343.296 | 8000/6561 | Raider |- | 1 | 1359\3125 | 521.856 | 80275/59392 | Estates general |- | 1 | 1412\3125 | 542.208 | 16807/12288 | Revopent Template:Rank-2 end Template:Orf

Music

Eliora
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