9/7: Difference between revisions

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| Sound = jid_9_7_pluck_adu_dr220.mp3

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In [[just intonation]], '''9/7''' is the '''supermajor third''' or '''septimal major third''' of approximately 435.1{{cent}}, characteristic of [[7-limit]] and beyond. On its own, it has a very strident quality, but in the context of a chord, it can sound perfectly consonant. The 9-limit hexad 4:5:6:7:8:9 includes a septimal supermajor third between the 7th and the 9th. The interval has an interesting neutral quality to it similar to the way 9/8 behaves as ratios of nine all share this quality.

In [[~~Just Intonation~~]], ~~'''~~9/7~~''' is the '''supermajor third''' or '''septimal~~ major third~~'''~~ of ~~approximately 435~~.1¢, ~~characteristic of~~ [[~~7-limit~~]] ~~and beyond~~. ~~On its own, it has a very strident quality, but in~~ the ~~context of a chord, it can sound perfectly consonant. The~~ 9-limit hexad ~~4:5:6:7:8:9 includes a septimal supermajor third between the 7th~~ and ~~the 9th. The interval has an interesting neutral quality to~~ it ~~similar to the way~~ 9/~~8 behaves~~ as ~~ratios of nine all share this quality~~.

A just chord can be built with this wide third in place of the more traditional [[5/4]]. This supermajor triad would be 14:18:21. This triad can be very effective in music, but in this context, the modern ear accustomed to 12edo thirds of 400{{cent}} is likely to hear 9/7 as a mistuned major third instead of a new class of interval in its own right. Because 9/7 is a ratio of 9, it shares sonority qualities with [[9/8]] much more than 5/4. Chords such as the [[9-odd-limit]] hexad above and subsets of it give more opportunity for 9/7 to be heard as consonant.

~~A just chord can be built with this wide third in place of the more traditional~~ [[~~5/4~~]]~~. This supermajor triad would be 14:18:21. This triad can be very effective in music~~, ~~but in this context, the modern ear accustomed to 12edo thirds of 400¢~~ is ~~likely to hear 9/7 as a mistuned major third instead of a new class of interval in its own right~~. ~~Because 9/7 is a ratio of 9, it shares sonority qualities with [[9/8]] much more than 5/4. Chords such as the [[9-odd-limit|9-limit]] hexad above and subsets~~ of ~~it give more opportunity for~~ 9/7 ~~to be heard as consonant~~.

== Approximation ==

In [[11edo]], 4\11 is about 1.3{{cent}} sharp of 9/7.

== See also ==

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* [[7/6]] – its [[fifth complement]]

* [[28/27]] – its [[fourth complement]]

* [[11edo]] has a good approximation: 4\11

* [[Gallery of just intervals]]

* [[Gallery of ~~Just Intervals]]~~

* [[Wikipedia:Septimal major third|Septimal major third - Wikipedia]]

[[Category:7-limit]]

~~[[Category:Interval ratio]]~~

~~[[Category:Just interval]]~~

[[Category:Third]]

[[Category:Major third]]

[[Category:Supermajor third]]

[[Category:Over-7]]

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 | Sound = jid_9_7_pluck_adu_dr220.mp3
 }}
+{{Wikipedia|Septimal major third}}
+In [[just intonation]], '''9/7''' is the '''supermajor third''' or '''septimal major third''' of approximately 435.1{{cent}}, characteristic of [[7-limit]] and beyond. On its own, it has a very strident quality, but in the context of a chord, it can sound perfectly consonant. The 9-limit hexad 4:5:6:7:8:9 includes a septimal supermajor third between the 7th and the 9th. The interval has an interesting neutral quality to it similar to the way 9/8 behaves as ratios of nine all share this quality.
-In [[Just Intonation]], '''9/7''' is the '''supermajor third''' or '''septimal major third''' of approximately 435.1¢, characteristic of [[7-limit]] and beyond. On its own, it has a very strident quality, but in the context of a chord, it can sound perfectly consonant. The 9-limit hexad 4:5:6:7:8:9 includes a septimal supermajor third between the 7th and the 9th. The interval has an interesting neutral quality to it similar to the way 9/8 behaves as ratios of nine all share this quality.
+A just chord can be built with this wide third in place of the more traditional [[5/4]]. This supermajor triad would be 14:18:21. This triad can be very effective in music, but in this context, the modern ear accustomed to 12edo thirds of 400{{cent}} is likely to hear 9/7 as a mistuned major third instead of a new class of interval in its own right. Because 9/7 is a ratio of 9, it shares sonority qualities with [[9/8]] much more than 5/4. Chords such as the [[9-odd-limit]] hexad above and subsets of it give more opportunity for 9/7 to be heard as consonant.
-A just chord can be built with this wide third in place of the more traditional [[5/4]]. This supermajor triad would be 14:18:21. This triad can be very effective in music, but in this context, the modern ear accustomed to 12edo thirds of 400¢ is likely to hear 9/7 as a mistuned major third instead of a new class of interval in its own right. Because 9/7 is a ratio of 9, it shares sonority qualities with [[9/8]] much more than 5/4. Chords such as the [[9-odd-limit|9-limit]] hexad above and subsets of it give more opportunity for 9/7 to be heard as consonant.
+== Approximation ==
+In [[11edo]], 4\11 is about 1.3{{cent}} sharp of 9/7.
 == See also ==
@@ Line 17: / Line 20: @@
 * [[7/6]] – its [[fifth complement]]
 * [[28/27]] – its [[fourth complement]]
-* [[11edo]] has a good approximation: 4\11
+* [[Gallery of just intervals]]
-* [[Gallery of Just Intervals]]
-* [[Wikipedia:Septimal major third|Septimal major third - Wikipedia]]
 [[Category:7-limit]]
-[[Category:Interval ratio]]
-[[Category:Just interval]]
 [[Category:Third]]
 [[Category:Major third]]
 [[Category:Supermajor third]]
 [[Category:Over-7]]