789edo: Difference between revisions
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789edo is notable for an extremely good approximation of the [[2.5.7 subgroup]], unbeaten until [[5902edo]]. It also has a very accurate representation of the 17th harmonic and has a good 9th and 23rd harmonic as well; there is a common flat tendency allowing consistency to high distance in the 2.9.5.7.33.17.23 subgroup. | 789edo is notable for an extremely good approximation of the [[2.5.7 subgroup]], unbeaten until [[5902edo]]. It also has a very accurate representation of the 17th harmonic and has a good 9th and 23rd harmonic as well; there is a common flat tendency allowing consistency to high distance in the 2.9.5.7.33.17.23 subgroup. | ||
[[1578edo]], which doubles it, provides good corrections for the 3rd and 11th harmonics, making for a very strong [[11-limit]] and higher-limit system. | |||
=== Odd harmonics === | === Odd harmonics === | ||