1789edo: Difference between revisions
Created page with "'''1789 EDO''' divides the octave into equal steps of 0.67 cents each. It is the 278th prime edo. Perhaps the most notable fact about 1789edo, is the fact that it tempers..." |
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1789edo can be adapted for use with the 2.5.11.13.29.31 subgroup. | 1789edo can be adapted for use with the 2.5.11.13.29.31 subgroup. | ||
==Temperaments== | ===Temperaments=== | ||
The "proper" Jacobin temperament for 1789edo is a [[maximally even]] mode of 967 notes, originating from the 822\1789 [[11/8|11/8-superfourth]] as a generator. The mode is closely related to 20/37 maximally even mode of [[37edo]] which uses 17\37 superfourth as its generator, and 967/1789 can be represented as a stack of 46 20/37 patterns merged with one 47/87 cycle arising out of [[87edo]]. | The "proper" Jacobin temperament for 1789edo is a [[maximally even]] mode of 967 notes, originating from the 822\1789 [[11/8|11/8-superfourth]] as a generator. The mode is closely related to 20/37 maximally even mode of [[37edo]] which uses 17\37 superfourth as its generator, and 967/1789 can be represented as a stack of 46 20/37 patterns merged with one 47/87 cycle arising out of [[87edo]]. | ||
Since 1789edo contains the 2.5 subgroup, it can be used for the finite decimal temperament - that is, where all the interval targets in just intonation are expressed as terminating decimals. For example, [[5/4]], [[25/16]], [[128/125]], [[32/25]], 625/512, etc. This rings particularly true for the French attempts to decimalize a lot more things than we are used to today. | |||
This property of 1789edo is amplified by poor approximation of 3 and 7, allowing for cognitive separation of the intervals (or whatever is left of it at such small step size). | |||
[[Category:Equal divisions of the octave]] | [[Category:Equal divisions of the octave]] | ||
[[Category:Prime EDO]] | [[Category:Prime EDO]] | ||