2019edo

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← 2018edo

2019edo

2020edo →

Prime factorization

3 × 673

Step size

0.594354 ¢

Fifth

1181\2019 (701.932 ¢)

Semitones (A1:m2)

191:152 (113.5 ¢ : 90.34 ¢)

Consistency limit

11

Distinct consistency limit

11

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Theory

2019edo is excellent in the 2.3.5.7 subgroup, and with such small errors it supports a noticeable amount of very high accuracy temperaments. While it is consistent in the 11-odd-limit, there is a large relative error on the representation of the 11th harmonic.

In higher limits, it tunes 23/16 and 59/32 with the comparable relative accuracy to the 2.3.5.7 subgroup (less than 7% error). A comma basis for the 2.3.5.7.23.59 subgroup is {14337/14336, 25921/25920, 250047/250000, 48234496/48234375, 843396867/843308032}.

Prime harmonics

Approximation of prime harmonics in 2019edo
Harmonic		2	3	5	7	11	13	17	19	23	29	31
Error	Absolute (¢)	+0.000	-0.023	+0.016	-0.029	+0.242	-0.112	+0.245	+0.258	-0.043	-0.157	+0.284
Error	Relative (%)	+0.0	-3.9	+2.7	-5.0	+40.8	-18.8	+41.3	+43.4	-7.2	-26.4	+47.8
Steps (reduced)		2019 (0)	3200 (1181)	4688 (650)	5668 (1630)	6985 (928)	7471 (1414)	8253 (177)	8577 (501)	9133 (1057)	9808 (1732)	10003 (1927)

Regular temperament properties

Rank-2 temperaments

Periods per 8ve	Generator (Reduced)	Cents (Reduced)	Associated Ratio	Temperaments
1	154\2019	91.530	1953125000000000/1853020188851841	Gross
1	307\2019	182.467	10/9	Minortone
3	307\2019	182.467	10/9	Domain