1240edo: Difference between revisions

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Created page with "{{Infobox ET}} {{EDO intro|1240}} 1240edo is consistent in the 7-odd-limit, though the error on harmonic 3 is quite large. It is a strong tuning for 5-limit sov..."
 
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{{EDO intro|1240}}
{{EDO intro|1240}}


1240edo is [[consistent]] in the 7-odd-limit, though the error on harmonic [[3/1|3]] is quite large. It is a strong tuning for 5-limit [[soviet ferris wheel]], ({{monzo|-171 20 60}}), and a good tuning for [[dodifo]], ({{monzo|-67 -9 35}}).
1240edo is [[consistent]] in the [[7-odd-limit]], though the error on [[harmonic]] [[3/1|3]] is quite large. It is a strong tuning for 5-limit [[soviet ferris wheel]], ({{monzo|-171 20 60}}), and a good tuning for [[dodifo]], ({{monzo|-67 -9 35}}).


Beyond the 7-odd-limit, there is a number of mappings to be considered. In the 2.7.23.27.29 subgroup, it is a flat system, and in 2.9.11.13.15, it is a sharp system. In the 2.5.11.13.29, it tunes the [[genojacobin]] temperament.
Beyond the 7-odd-limit, there is a number of mappings to be considered. In the 2.27.7.23.29 [[subgroup]], it is a flat system, and in 2.9.11.13.15, it is a sharp system. In the 2.5.11.13.29, it tunes the [[genojacobin]] temperament.


=== Odd harmonics ===
=== Odd harmonics ===
{{harmonics in equal|1240|columns=14}}
{{Harmonics in equal|1240|columns=14}}


=== Subsets and supersets ===
=== Subsets and supersets ===
Since 1240 factors as {{Factorization|1240}}, it has subset edos {{EDOs|1, 2, 4, 5, 8, 10, 20, 31, 40, 62, 124, 155, 248, 310, 620}}.
Since 1240 factors as {{Factorization|1240}}, 1240edo has subset edos {{EDOs| 2, 4, 5, 8, 10, 20, 31, 40, 62, 124, 155, 248, 310, 620 }}.

Revision as of 06:40, 22 January 2024

← 1239edo 1240edo 1241edo →
Prime factorization 23 × 5 × 31
Step size 0.967742 ¢ 
Fifth 725\1240 (701.613 ¢) (→ 145\248)
Semitones (A1:m2) 115:95 (111.3 ¢ : 91.94 ¢)
Dual sharp fifth 726\1240 (702.581 ¢) (→ 363\620)
Dual flat fifth 725\1240 (701.613 ¢) (→ 145\248)
Dual major 2nd 211\1240 (204.194 ¢)
Consistency limit 7
Distinct consistency limit 7

Template:EDO intro

1240edo is consistent in the 7-odd-limit, though the error on harmonic 3 is quite large. It is a strong tuning for 5-limit soviet ferris wheel, ([-171 20 60), and a good tuning for dodifo, ([-67 -9 35).

Beyond the 7-odd-limit, there is a number of mappings to be considered. In the 2.27.7.23.29 subgroup, it is a flat system, and in 2.9.11.13.15, it is a sharp system. In the 2.5.11.13.29, it tunes the genojacobin temperament.

Odd harmonics

Approximation of odd harmonics in 1240edo
Harmonic 3 5 7 9 11 13 15 17 19 21 23 25 27 29
Error Absolute (¢) -0.342 -0.185 -0.116 +0.284 +0.295 +0.440 +0.441 -0.439 -0.416 -0.458 -0.210 -0.369 -0.059 +0.100
Relative (%) -35.4 -19.1 -12.0 +29.3 +30.5 +45.5 +45.6 -45.4 -43.0 -47.4 -21.7 -38.2 -6.1 +10.4
Steps
(reduced) 		1965
(725) 		2879
(399) 		3481
(1001) 		3931
(211) 		4290
(570) 		4589
(869) 		4845
(1125) 		5068
(108) 		5267
(307) 		5446
(486) 		5609
(649) 		5758
(798) 		5896
(936) 		6024
(1064)

Subsets and supersets

Since 1240 factors as 23 × 5 × 31, 1240edo has subset edos 2, 4, 5, 8, 10, 20, 31, 40, 62, 124, 155, 248, 310, 620.

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