User:Zhenlige/EDO impressions: Difference between revisions
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*[[4edo|4]]: 12edo diminished seventh chords. | *[[4edo|4]]: 12edo diminished seventh chords. | ||
*[[5edo|5]]: Equalized [[2L 3s|pentatonic]] scale. Kinda familiar but everything is warped. The first EDO containing an interval that roughly resembles [[3/2]]. | *[[5edo|5]]: Equalized [[2L 3s|pentatonic]] scale. Kinda familiar but everything is warped. The first EDO containing an interval that roughly resembles [[3/2]]. | ||
*[[6edo|6]]: Incomplete 12edo. | *[[6edo|6]]: Incomplete [[12edo]]. | ||
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*[[9edo|9]]: A subset of [[ennealimmal]]. | *[[9edo|9]]: A subset of [[ennealimmal]]. | ||
*. | *[[10edo|10]]: A stack of [[13/8]]. Subset of [[130edo]] and [[270edo]]. | ||
*[[11edo|11]]: Incomplete 22edo. | *[[11edo|11]]: Incomplete [[22edo]]. | ||
*[[12edo|12]]: It deserves its position. A good tuning for almost all types of music, though not perfect. Very excellent [[3/2]] as well as prime [[17/1|17]] and [[19/1|19]] for its size, but inaccurate [[5/4]] and worse [[7/4]]. Suitable for symmetric scales. Easy to make [[../12neji|accurate NEJIs]]. Its 2.3.17.19 subgroup really deserves exploration. | *[[12edo|12]]: It deserves its position. A good tuning for almost all types of music, though not perfect. Very excellent [[3/2]] as well as prime [[17/1|17]] and [[19/1|19]] for its size, but inaccurate [[5/4]] and worse [[7/4]]. Suitable for symmetric scales. Easy to make [[../12neji|accurate NEJIs]]. Its 2.3.17.19 subgroup really deserves exploration. | ||
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*[[22edo|22]]: The simplest non-meantone EDO with reasonable 5-limit. Good [[superpyth]] and [[porcupine]] tuning. The upper bound of a good fifth. | *[[22edo|22]]: The simplest non-meantone EDO with reasonable 5-limit. Good [[superpyth]] and [[porcupine]] tuning. The upper bound of a good fifth. | ||
*[[23edo|23]]: Incomplete 46edo. | *[[23edo|23]]: Incomplete [[46edo]]. | ||
*[[24edo|24]]: 12edo with neutral intervals. Good for prime [[11/1|11]]. Accurate in subgroup 2.3.11.17.19. | *[[24edo|24]]: 12edo with neutral intervals. Good for prime [[11/1|11]]. Accurate in subgroup 2.3.11.17.19. | ||
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*[[53edo|53]]: Almost just [[3/2]], and accurate [[7-limit]]. Purely an approximation of JI and not many efficient temperaments are supported. Good for 5-limit [[schismatic]] with occasional [[garibaldi]] [[7/1|7]]. | *[[53edo|53]]: Almost just [[3/2]], and accurate [[7-limit]]. Purely an approximation of JI and not many efficient temperaments are supported. Good for 5-limit [[schismatic]] with occasional [[garibaldi]] [[7/1|7]]. | ||
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*[[65edo|65]]: | *[[65edo|65]]: A circle of fifths in [[130edo]]. | ||
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*[[72edo|72]]: An excellent extension of 12- and 24edo. Good for [[miracle]]. The relative error of primes is within 1/3 steps up to large primes except a few including 13, 53 and 59. Suitable for octave stretching in 17-limit. | *[[72edo|72]]: An excellent extension of 12- and 24edo. Good for [[miracle]]. The relative error of primes is within 1/3 steps up to large primes except a few including 13, 53 and 59. Suitable for octave stretching in 17-limit. | ||