97edo: Difference between revisions

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 Since 97edo is a prime edo, it lacks specific modulation circles, symmetrical chords or sub-edos that are present in composite edos. When notable equal divisions like {{EDOs|19, 31, 41, or 53}} have strong JI-based harmony, 97edo does not have easily representable modulation because of its inability to represent superparticulars. However, this might result in interest in this tuning through JI-agnostic approaches.
+{{Q-odd-limit intervals|97}}
-{| class="wikitable center-all"
-|+style=white-space:nowrap| Superparticular intervals up to 17/16<br> by direct approximation (even if inconsistent)
-|-
-! Interval !! Error (Relative, [[Relative cent|r¢]])
-|-
-| 3/2 || 25.9
-|-
-| 4/3 || 25.8
-|-
-| 5/4 || 22.7
-|-
-| 6/5 || 48.6
-|-
-| 7/6 || 42.8
-|-
-| 8/7 || 31.4
-|-
-| 9/8 || 48.2
-|-
-| 10/9 || 25.6
-|-
-| 11/10 || 33.7
-|-
-| 12/11 || 17.6
-|-
-| 13/12 || 20.1
-|-
-| 14/13 || 37.0
-|-
-| 15/14 || 34.6
-|-
-| 16/15 || 3.1
-|-
-| 17/16 || 48.3
-|}
 == Intervals ==