Canou family: Difference between revisions

Line 1:

The '''canou family''' of rank-3 temperaments tempers out the [[canousma]], 4802000/4782969 = {{monzo|4 -14 3 4}}, a 7-limit comma measuring about 6.9 cents.

= Canou =

== Canou ==

The canou temperament features a period of an octave and generators of [[3/2]] and [[81/70]]. The 81/70-generator is about 255 cents. Two of them interestingly make a [[980/729]] at about 510 cents, an audibly off perfect fourth. Three of them make a [[14/9]]; four of them make a [[9/5]]. It therefore also features splitting the septimal diesis, [[49/48]], into three equal parts, making two distinct [[interseptimal]] intervals related to the 35th harmonic.

Line 38:

[[Complexity spectrum]]: 4/3, 9/7, 9/8, 7/6, 6/5, 10/9, 5/4, 8/7, 7/5

= Synca =

== Synca ==

Synca, for symbiotic canou, adds the [[symbiotic comma]] to the comma list.

Line 55:

[[Complexity spectrum]]: 4/3, 9/8, 9/7, 7/6, 5/4, 6/5, 10/9, 11/9, 8/7, 12/11, 11/10, 14/11, 11/8, 7/5

= Semicanou =

== Semicanou ==

Semicanou adds 9801/9800, the kalisma, to the comma list, and may be described as 80 & 94 & 118. It splits the octave into two equal parts, each representing 99/70. Note that 99/70 = (81/70)×(11/9), this extension is more than natural.

Line 75:

Badness: 2.197 × 10-3

== 13-limit ==

=== 13-limit ===

Subgroup: 2.3.5.7.11.13

Line 91:

Badness: 2.701 × 10-3

== Gentsemicanou ==

=== Gentsemicanou ===

This adds [[351/350]], the ratwolfsma, as wells as [[364/363]], the gentle comma, to the comma list. Since 351/350 = (81/70)/(15/13), the 81/70-generator simultaneously represents 15/13, adding a lot of fun to the scale.

Line 109:

Badness: 3.511 × 10-3

= Canta =

== Canta ==

By adding [[896/891]], the pentacircle comma, [[33/32]] is equated with 28/27, so the scale is filled with this 33/32~28/27 mixture. This may be described as 75e & 80 & 99e, and 80edo makes the optimal.

Line 124:

Badness: 4.523 × 10-3

== 13-limit ==

=== 13-limit ===

This adds [[351/350]], the ratwolfsma, to the comma list. Since 351/350 = (81/70)/(15/13). The 81/70-generator simultaneously represents 15/13, adding a lot of fun to the scale. Again 80edo makes the optimal.

Line 139:

Badness: 3.470 × 10-3

== Gentcanta ==

=== Gentcanta ===

This adds [[352/351]], the minthma, as well as [[364/363]], the gentle comma, to the comma list. It is a natural extension of canta, as 896/891 factors neatly into (352/351)×(364/363). Again 80edo makes the optimal.

@@ Line 1: / Line 1: @@
 The '''canou family''' of rank-3 temperaments tempers out the [[canousma]], 4802000/4782969 = {{monzo|4 -14 3 4}}, a 7-limit comma measuring about 6.9 cents.
-= Canou =
+== Canou  ==
 The canou temperament features a period of an octave and generators of [[3/2]] and [[81/70]]. The 81/70-generator is about 255 cents. Two of them interestingly make a [[980/729]] at about 510 cents, an audibly off perfect fourth. Three of them make a [[14/9]]; four of them make a [[9/5]]. It therefore also features splitting the septimal diesis, [[49/48]], into three equal parts, making two distinct [[interseptimal]] intervals related to the 35th harmonic.
@@ Line 38: / Line 38: @@
 [[Complexity spectrum]]: 4/3, 9/7, 9/8, 7/6, 6/5, 10/9, 5/4, 8/7, 7/5
-= Synca =
+== Synca  ==
 Synca, for symbiotic canou, adds the [[symbiotic comma]] to the comma list.
@@ Line 55: / Line 55: @@
 [[Complexity spectrum]]: 4/3, 9/8, 9/7, 7/6, 5/4, 6/5, 10/9, 11/9, 8/7, 12/11, 11/10, 14/11, 11/8, 7/5
-= Semicanou =
+== Semicanou  ==
 Semicanou adds 9801/9800, the kalisma, to the comma list, and may be described as 80 & 94 & 118. It splits the octave into two equal parts, each representing 99/70. Note that 99/70 = (81/70)×(11/9), this extension is more than natural.
@@ Line 75: / Line 75: @@
 Badness: 2.197 × 10<sup>-3</sup>
-== 13-limit ==
+=== 13-limit  ===
 Subgroup: 2.3.5.7.11.13
@@ Line 91: / Line 91: @@
 Badness: 2.701 × 10<sup>-3</sup>
-== Gentsemicanou ==
+=== Gentsemicanou  ===
 This adds [[351/350]], the ratwolfsma, as wells as [[364/363]], the gentle comma, to the comma list. Since 351/350 = (81/70)/(15/13), the 81/70-generator simultaneously represents 15/13, adding a lot of fun to the scale.
@@ Line 109: / Line 109: @@
 Badness: 3.511 × 10<sup>-3</sup>
-= Canta =
+== Canta  ==
 By adding [[896/891]], the pentacircle comma, [[33/32]] is equated with 28/27, so the scale is filled with this 33/32~28/27 mixture. This may be described as 75e & 80 & 99e, and 80edo makes the optimal.
@@ Line 124: / Line 124: @@
 Badness: 4.523 × 10<sup>-3</sup>
-== 13-limit ==
+=== 13-limit  ===
 This adds [[351/350]], the ratwolfsma, to the comma list. Since 351/350 = (81/70)/(15/13). The 81/70-generator simultaneously represents 15/13, adding a lot of fun to the scale. Again 80edo makes the optimal.
@@ Line 139: / Line 139: @@
 Badness: 3.470 × 10<sup>-3</sup>
-== Gentcanta ==
+=== Gentcanta  ===
 This adds [[352/351]], the minthma, as well as [[364/363]], the gentle comma, to the comma list. It is a natural extension of canta, as 896/891 factors neatly into (352/351)×(364/363). Again 80edo makes the optimal.