Perfect fourth: Difference between revisions

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 {{About|the [[interval region]]|the just perfect fourth|4/3}}
-A '''perfect fourth (P4)''' is an interval that spans three steps of the [[5L 2s|diatonic]] scale with a perfect quality, i.e. the quality that exists in all but one modes. Depending on the specific tuning, it ranges from 480 to 514 [[cent]]s ([[5edo|2\5]] to [[7edo|3\7]]).
+A '''perfect fourth (P4)''' is an interval that spans three steps of the [[5L 2s|diatonic]] scale with a perfect quality, i.e. the quality that exists in all but one modes. Depending on the specific tuning, it ranges from 480 to 514{{cent}} ([[5edo|2\5]] to [[7edo|3\7]]).
 In [[just intonation]], the just perfect fourth is [[4/3]]. Other intervals are also classified as perfect fourths, sometimes called '''wolf fourths''' or '''imperfect fourths''', if they are reasonably mapped to 3\7 and [[24edo|10\24]] (precisely three steps of the diatonic scale and five steps of the chromatic scale). The use of 24edo's 10\24 as the mapping criteria here rather than [[12edo]]'s 5\12 better captures the characteristics of many intervals in the [[11-limit|11-]] and [[13-limit]].
-As a concrete [[interval region]], it is typically near 500 cents in size, distinct from the [[semiaugmented fourth]] of roughly 550 cents. A rough tuning range for the perfect fourth is about 470 to 530 cents according to [[Margo Schulter]]'s theory of interval regions. Another common range is the stricter range from 480 to 514 cents, which generates a diatonic scale.
+As a concrete [[interval region]], it is typically near 500{{c}} in size, distinct from the [[semiaugmented fourth]] of roughly 550{{c}}. A rough tuning range for the perfect fourth is about 470 to 530{{c}} according to [[Margo Schulter]]'s theory of interval regions. Another common range is the stricter range from 480 to 514{{c}}, which generates a diatonic scale.
-This article covers intervals from 450 to 550 cents, in order to cover the range of intervals without needing extra articles for subfourths or superfourths.
+This article covers intervals from 450 to 550{{c}}, in order to cover the range of intervals without needing extra articles for subfourths or superfourths.
 == In just intonation ==
 === By prime limit ===
-The only "perfect" fourth in JI is the '''Pythagorean perfect fourth''' of [[4/3]], about 498 cents in size, which corresponds to the MOS-based interval category of the diatonic perfect fourth and is the octave complement of the perfect fifth of [[3/2]]. However, various "out of tune" fourths exist, such as the '''Pythagorean wolf fourth''' [[177147/131072]], which is sharp of 4/3 by one [[Pythagorean comma]], and is about 522 cents in size.
+The only "perfect" fourth in JI is the '''Pythagorean perfect fourth''' of [[4/3]], about 498{{c}} in size, which corresponds to the MOS-based interval category of the diatonic perfect fourth and is the octave complement of the perfect fifth of [[3/2]]. However, various "out of tune" fourths exist, such as the '''Pythagorean wolf fourth''' [[177147/131072]], which is sharp of 4/3 by one [[Pythagorean comma]], and is about 522{{c}} in size.
 Other "out of tune" fourths in higher [[Prime limit|limits]] include:
-* The 5-limit '''acute fourth''' is a ratio of 27/20, and is about 520 cents
+* The 5-limit '''acute fourth''' is a ratio of 27/20, and is about 520{{c}}
-* The 7-limit '''subfourth''' is a ratio of 21/16, and is about 471 cents.
+* The 7-limit '''subfourth''' is a ratio of 21/16, and is about 471{{c}}.
-* The 11-limit '''augmented fourth''' is a ratio of 15/11, and is about 537 cents.
+* The 11-limit '''augmented fourth''' is a ratio of 15/11, and is about 537{{c}}.
-** There is also an 11-limit '''grave fourth,''' which is a ratio of 33/25, and is about 480 cents.
+** There is also an 11-limit '''grave fourth,''' which is a ratio of 33/25, and is about 480{{c}}.
-* The 13-limit '''infrafourth''' is a ratio of 13/10, and is about 454 cents, but it might be better analyzed as an [[Major third|ultramajor third]]. Despite that, it is also here for completeness.
+* The 13-limit '''infrafourth''' is a ratio of 13/10, and is about 454{{c}}, but it might be better analyzed as an [[Major third|ultramajor third]]. Despite that, it is also here for completeness.
 === By delta ===
 {| class="wikitable"
-|+
-!Delta 1
-!Cents
-!Delta 3
-!Cents
-!Delta 4
-!Cents
-!Delta 5
-!Cents
-!Delta 6
-!Cents
 |-
-|4/3
+! Delta 1
-|498c
+! Cents
-|13/10
+! Delta 3
-|454c
+! Cents
-|15/11
+! Delta 4
-|537c
+! Cents
-|19/14
+! Delta 5
-|529c
+! Cents
-|23/17
+! Delta 6
-|523c
+! Cents
 |-
-|
+| 4/3
-|
+| 498{{c}}
-|
+| 13/10
-|
+| 454{{c}}
-|17/13
+| 15/11
-|464c
+| 537{{c}}
-|21/16
+| 19/14
-|471c
+| 529{{c}}
-|25/19
+| 23/17
-|475c
+| 523{{c}}
 |-
 |
 |
 |
 |
-|
+| 17/13
-|
+| 464{{c}}
-|
+| 21/16
-|
+| 471{{c}}
-|
+| 25/19
-|
+| 475{{c}}
 |}
@@ Line 71: / Line 60: @@
 The following table lists the best tuning of 4/3, as well as other fourths if present, in various significant [[edos]].
 {| class="wikitable"
-|+
-!Edo
-!4/3
-!Other fourths
 |-
-|5
+! Edo
-|480c
+! 4/3
-|
+! Other fourths
 |-
-|7
+| 5
-|514c
+| 480{{c}}
 |
 |-
-|12
+| 7
-|500c
+| 514{{c}}
 |
 |-
-|15
+| 12
-|480c
+| 500{{c}}
 |
 |-
-|16
+| 15
-|525c
+| 480{{c}}
-|450c ≈ 13/10
+|
 |-
-|17
+| 16
-|494c
+| 525{{c}}
-|
+| 450{{c}} ≈ 13/10
 |-
-|19
+| 17
-|506c
+| 494{{c}}
 |
 |-
-|22
+| 19
-|491c
+| 506{{c}}
-|545c ≈ 15/11
+|
 |-
-|24
+| 22
-|500c
+| 491{{c}}
-|450c ≈ 13/10, 550c ≈ 15/11
+| 545{{c}} ≈ 15/11
 |-
-|25
+| 24
-|480c
+| 500{{c}}
-|528c ≈ 27/20
+| 450{{c}} ≈ 13/10, 550{{c}} ≈ 15/11
 |-
-|26
+| 25
-|508c
+| 480{{c}}
-|462c ≈ 21/16, 13/10
+| 528{{c}} ≈ 27/20
 |-
-|27
+| 26
-|489c
+| 508{{c}}
-|533c ≈ 15/11
+| 462{{c}} ≈ 21/16, 13/10
 |-
-|29
+| 27
-|496c
+| 489{{c}}
-|455c ≈ 13/10, 537c ≈ 15/11
+| 533{{c}} ≈ 15/11
 |-
-|31
+| 29
-|503c
+| 496{{c}}
-|464c ≈ 21/16, 541c ≈ 15/11
+| 455{{c}} ≈ 13/10, 537{{c}} ≈ 15/11
 |-
-|34
+| 31
-|494c
+| 503{{c}}
-|458c ≈ 13/10, 529c ≈ 27/20, 15/11
+| 464{{c}} ≈ 21/16, 541{{c}} ≈ 15/11
 |-
-|41
+| 34
-|498c
+| 494{{c}}
-|468c ≈ 21/16, 526c ≈ 27/20
+| 458{{c}} ≈ 13/10, 529{{c}} ≈ 27/20, 15/11
 |-
-|53
+| 41
-|498c
+| 498{{c}}
-|452c ≈ 13/10, 476c ≈ 21/16, 521c ≈ 27/20, 543c ≈ 15/11
+| 468{{c}} ≈ 21/16, 526{{c}} ≈ 27/20
+|-
+| 53
+| 498{{c}}
+| 452{{c}} ≈ 13/10, 476{{c}} ≈ 21/16, 521{{c}} ≈ 27/20, 543{{c}} ≈ 15/11
 |}
@@ Line 154: / Line 143: @@
 * [[Meantone]], the temperament sharpening 4/3 such that three 4/3s stack to [[6/5]]
 * [[Mavila]], the temperament sharpening 4/3 such that three 4/3s stack to [[6/5|5/4]]
-* Various historical [[Well temperament|well temperaments]] generated by tempered 4/3s or 3/2s, equivalent to 12edo as compton and meantone
+* Various historical [[Well temperament]]s generated by tempered 4/3s or 3/2s, equivalent to 12edo as compton and meantone
 {{Navbox intervals}}