11edo: Difference between revisions
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11edo, or 11 equal divisions of the octave, is the equal tuning featuring steps of (1200/1) ~= 109.09 cents, 11 of which stack to the perfect octave 2/1. It does not approximate many small prime harmonics well at all. But approximates 11/8 | 11edo, or 11 equal divisions of the octave, is the equal tuning featuring steps of (1200/1) ~= 109.09 cents, 11 of which stack to the perfect octave 2/1. It does not approximate many small prime harmonics well at all. But approximates 11/8 very well for it's size and also approximates the interval 9/7 with only ~1 cent of error. It has 2 fifths at 654.55c and 763.64c. | ||
== Theory == | |||
==== JI Approximation ==== | |||
11edo does not approximate harmonics 3 or 5 at all. Unless one considers ~50c of error acceptable. However, 11edo approximates 7/4 acceptably well and approximates 11/8 very well. As well as the supermajor third 9/7 exceptionally well. | |||
==== Chords ==== | |||
11edo has numerous xenharmonic sounding chords. An approach to chords in 11edo is stacking the interval 9/7 for very accurate 14:18:23 chords. Another is to take advantage of the duel fifths. | |||
==== Scales ==== | |||
Arguably the main MOS scale in 11edo is the smitonic Scale 2-1-2-2-1-2-1. The smitonic scale is melodically rather similar in some regards to the 12edo diatonic scale. However, it is harmonically totally different due to the absence of harmonics 3 and 5 in 11edo. | |||
There are others including the Checkertonic scale 2-1-1-2-1-1-2-1. | |||
Revision as of 05:32, 4 January 2026
11edo, or 11 equal divisions of the octave, is the equal tuning featuring steps of (1200/1) ~= 109.09 cents, 11 of which stack to the perfect octave 2/1. It does not approximate many small prime harmonics well at all. But approximates 11/8 very well for it's size and also approximates the interval 9/7 with only ~1 cent of error. It has 2 fifths at 654.55c and 763.64c.
Theory
JI Approximation
11edo does not approximate harmonics 3 or 5 at all. Unless one considers ~50c of error acceptable. However, 11edo approximates 7/4 acceptably well and approximates 11/8 very well. As well as the supermajor third 9/7 exceptionally well.
Chords
11edo has numerous xenharmonic sounding chords. An approach to chords in 11edo is stacking the interval 9/7 for very accurate 14:18:23 chords. Another is to take advantage of the duel fifths.
Scales
Arguably the main MOS scale in 11edo is the smitonic Scale 2-1-2-2-1-2-1. The smitonic scale is melodically rather similar in some regards to the 12edo diatonic scale. However, it is harmonically totally different due to the absence of harmonics 3 and 5 in 11edo.
There are others including the Checkertonic scale 2-1-1-2-1-1-2-1.
