Hendrix chord: Difference between revisions
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It can also be tuned as an [[Dyadic chord|essentially tempered]] chord that splits the difference between the [[19/16|19/8]] ino 10th and the [[7/3]] zo 10th.<sup> </sup> This chord tempers out the ''hendrix comma'' of [[57/56]]. It is notable for existing in [[12-EDO]], other equal divisions with hendrix chords include the {{EDOs| 9, 10, 14, 16, 17, 21, 22, 26, and 31}} equal divisions. | It can also be tuned as an [[Dyadic chord|essentially tempered]] chord that splits the difference between the [[19/16|19/8]] ino 10th and the [[7/3]] zo 10th.<sup> </sup> This chord tempers out the ''hendrix comma'' of [[57/56]]. It is notable for existing in [[12-EDO]], other equal divisions with hendrix chords include the {{EDOs| 9, 10, 14, 16, 17, 21, 22, 26, and 31}} equal divisions. | ||
[[Category:Hendrix| ]] <!-- main article --> | |||
[[Category:19-limit]] | [[Category:19-limit]] | ||
[[Category:7-odd-limit]] | [[Category:7-odd-limit]] | ||
[[Category:Chords]] | [[Category:Chords]] | ||
[[Category:Essentially tempered chords]] | [[Category:Essentially tempered chords]] | ||
[[Category:Tetrad]] | [[Category:Tetrad]] | ||
{{Todo|clarify}} | {{Todo|clarify}} | ||
Revision as of 02:12, 5 August 2022
The hendrix chord, a dom7#9no5 chord, can be tuned as an 8:10:14:19 chord = h7,19o10no5. An alternate tuning is 12:15:21:28, or 1/1 - 5/4 - 7/4 - 7/3 = h7z10no5.
It can also be tuned as an essentially tempered chord that splits the difference between the 19/8 ino 10th and the 7/3 zo 10th. This chord tempers out the hendrix comma of 57/56. It is notable for existing in 12-EDO, other equal divisions with hendrix chords include the 9, 10, 14, 16, 17, 21, 22, 26, and 31 equal divisions.