5941edo: Difference between revisions
Created page with "{{Infobox ET}} {{EDO intro|5941}} ==Theory== {{Harmonics in equal|5941}} As the zeta valley edo after 79edo, it approximates prime harmonics with very high error..." |
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==Theory== | ==Theory== | ||
{{Harmonics in equal|5941}} | {{Harmonics in equal|5941|columns=30}} | ||
As the [[zeta|zeta valley]] edo after [[79edo]], it approximates prime harmonics with very high errors. In particular, the 7th, 9th and | As the [[zeta|zeta valley]] edo after [[79edo]], it approximates prime harmonics with very high errors. In particular, the 7th, 9th, 11th and 23rd harmonics are off by nearly half a step. In light of this, 5941edo can be seen as excelling in the 2.9<sup>2</sup>.7<sup>2</sup>.11<sup>2</sup>.23<sup>2</sup> subgroup. Otherwise, it is strong in the 2.45.35.49.19.(31.51) subgroup. | ||
Rather fittingly, it has a [[consistency|consistency limit]] of 3. | Rather fittingly, it has a [[consistency|consistency limit]] of 3. | ||