9L 5s: Difference between revisions

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+{{Infobox MOS
+| Periods = 1
+| nLargeSteps = 9
+| nSmallSteps = 5
+| Equalized = 3
+| Collapsed = 2
+| Pattern = LLsLLsLLsLLsLs
+| Neutralized = 2L 6s
+}}
 L 5s refers to the structure of moment of symmetry scales with generators ranging from 2\9edo (two degrees of 9edo = 266¢) to 3\14 (three degrees of 14edo = 257¢). In the case of 14edo, L and s are the same size; in the case of 9edo, s becomes so small it disappears. The generator can be said to approximate 7/6, but just 7/6 is larger than 2\9edo, so it cannot be used as a generator. The simplest just interval that works as a generator is 36/31. Two generators are said to create a fourth like Godzilla, but in reality it is closer to 27/20, if that is considered a consonance.
-L5s is third smallest MOS of [[semiphore|Semiphore]].
+L5s is third smallest MOS of [[Semiphore]].
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@@ Line 26: / Line 35: @@
 |-
 | | generator in degrees of an edo
-| | generator in cents
+| |generator in cents
-| | L in cents
+| |L in cents
-| | s in cents
+| |s in cents
-| | notes
+| |notes
 |-
-| | 3\14
+| |3\14
-| | 257¢
+| |257¢
-| | 86¢
+| |86¢
-| | 86¢
+| |86¢
-| | L=s
+| |L=s
 |-
 | |
-| | 258.87¢
+| |258.87¢
-| | 94¢
+| |94¢
 | | 70¢
-| | Just interval 36/31
+| |Just interval 36/31
 |-
-| | 8\37
+| |8\37
-| | 259¢
+| |259¢
-| | 97¢
+| |97¢
-| | 65¢
+| |65¢
 | |
 |-
-| | 5\23
+| |5\23
-| | 261¢
+| |261¢
-| | 104¢
+| |104¢
-| | 52¢
+| |52¢
-| | L≈2s
+| |L≈2s
 |-
 | |
-| | ~261.5¢
+| |~261.5¢
-| | 104¢
+| |104¢
-| | 52¢
+| |52¢
-| | L=2s
+| |L=2s
 |-
-| | 7\32
+| |7\32
-| | 262¢
+| |262¢
-| | 113¢
+| |113¢
-| | 38¢
+| |38¢
 | |
 |-
-| | 2\9
+| |2\9
-| | 266¢
+| |266¢
-| | 266¢
+| |266¢
-| | 0¢
+| |0¢
-| | s=0
+| |s=0
 |}
 [[category:todo:expand]]