Seven limit tetrads: Difference between revisions
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The two [[7-limit|seven-limit]] [[Tetrad|tetrads]] are the [[Otonality and utonality|otonal]], which in close position is 1-5/4-3/2-7/4, and the [[Otonality and utonality|utonal]], 1-6/5-3/2-12/7, with [[scale]] [[Step|steps]] 5/4-6/5-7/6-8/7 and 6/5-5/4-8/7-7/6 respectively. These are the two most basic chords of seven-limit harmony, and form a [[The Seven Limit Symmetrical Lattices|cubic lattice]]. | The two [[7-limit|seven-limit]] [[Tetrad|tetrads]] are the [[Otonality and utonality|otonal]], which in close position is 1-5/4-3/2-7/4, and the [[Otonality and utonality|utonal]], 1-6/5-3/2-12/7, with [[scale]] [[Step|steps]] 5/4-6/5-7/6-8/7 and 6/5-5/4-8/7-7/6 respectively. These are the two most basic chords of seven-limit harmony, and form a [[The Seven Limit Symmetrical Lattices|cubic lattice]]. | ||
More seven-limit tetrads can be found on the [[Kite's color notation|color notation]] page. | More seven-limit tetrads can be found on the [[Kite's color notation|color notation]] page. | ||
[[Category:7-limit]] | [[Category:7-limit]] | ||
[[Category:Chords]] | [[Category:Chords]] | ||
[[Category: | [[Category:Tetrads]] | ||
{{Todo| review | discuss title }} | |||
Revision as of 12:00, 23 May 2023
The two seven-limit tetrads are the otonal, which in close position is 1-5/4-3/2-7/4, and the utonal, 1-6/5-3/2-12/7, with scale steps 5/4-6/5-7/6-8/7 and 6/5-5/4-8/7-7/6 respectively. These are the two most basic chords of seven-limit harmony, and form a cubic lattice.
More seven-limit tetrads can be found on the color notation page.