1619edo: Difference between revisions

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1619edo tunes [[keenanisma]] very finely, to 6 steps, and can use it as a microchroma. In addition, it can use the keenanisma as a generator in the keenanose temperament, 270 & 1619, in which it highlights the relationship between 270 keenanismas and the octave. It also achieves this since 270 × 6 = 1620, and 1619 is 1 short of that and also excellent in the 13-limit. 1619edo has 7/6 on 360th step, a highly divisible number, 27/25 on 180th, and 33/32 on 72nd as a consequence of tempering out the commas. This means that 72ed33/32 is virtually equivalent to 1619edo. When it comes to using 33/32 as the generator, 1619edo supports the [[ravine]] temperament, which tempers out 196625/196608, 200000/199927, 2912000/2910897, and 3764768/3764475.

Another temperament which highlights the interval relationships in 1619edo is 45 & 1619, and if it had a name, it would be called ''semiravine.'' It has a comma basis 4225/4224, 4375/4374, 6656/6655, (23 5 13 -23 1 0) in the 13-limit. Its generator is 36 steps, which represents 65/64 and 66/65 tempered together, and 2 of them make 33/32. 5 of them make [[27/25]], and 10 of them make 7/6.

Since 33/32 is close to 1\45, 7\6 is close to 1\9, and 385/384 is close to 1\270, 1619edo can be thought of as [[1620edo]] where one step was extracted and all others were moved into a more harmonically just position. It achieves this because 1620edo is contorted 270edo in the 11-limit, and its 13/8 is on the flat side coming from 324edo, and thus when it is octave stretched, steps sharpen enough to arrive at 1619edo's 13-limit excellence.

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| 385/384

| [[Keenanose]]

|-

|1

|36\1619

|26.683

|65/64 ~ 66/65

|''[[Semiravine]]'' *

|-

| 1

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|}

[[Category:Equal divisions of the octave|####]]

[[Category:Equal divisions of the octave|####]]

*

[[Category:Quartismic]]

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 edo tunes [[keenanisma]] very finely, to 6 steps, and can use it as a microchroma. In addition, it can use the keenanisma as a generator in the keenanose temperament, 270 & 1619, in which it highlights the relationship between 270 keenanismas and the octave. It also achieves this since 270 × 6 = 1620, and 1619 is 1 short of that and also excellent in the 13-limit. 1619edo has 7/6 on 360th step, a highly divisible number, 27/25 on 180th, and 33/32 on 72nd as a consequence of tempering out the commas. This means that 72ed33/32 is virtually equivalent to 1619edo. When it comes to using 33/32 as the generator, 1619edo supports the [[ravine]] temperament, which tempers out 196625/196608, 200000/199927, 2912000/2910897, and 3764768/3764475.
+Another temperament which highlights the interval relationships in 1619edo is 45 & 1619, and if it had a name, it would be called ''semiravine.'' It has a comma basis 4225/4224, 4375/4374, 6656/6655, (23  5 13 -23  1 0) in the 13-limit. Its generator is 36 steps, which represents 65/64 and 66/65 tempered together, and 2 of them make 33/32. 5 of them make [[27/25]], and 10 of them make 7/6.
 Since 33/32 is close to 1\45, 7\6 is close to 1\9, and 385/384 is close to 1\270, 1619edo can be thought of as [[1620edo]] where one step was extracted and all others were moved into a more harmonically just position. It achieves this because 1620edo is contorted 270edo in the 11-limit, and its 13/8 is on the flat side coming from 324edo, and thus when it is octave stretched, steps sharpen enough to arrive at 1619edo's 13-limit excellence.
@@ Line 114: / Line 116: @@
 | 385/384
 | [[Keenanose]]
+|-
+|1
+|36\1619
+|26.683
+|65/64 ~ 66/65
+|''[[Semiravine]]'' *
 |-
 | 1
@@ Line 128: / Line 136: @@
 |}
-[[Category:Equal divisions of the octave|####]] <!-- 4-digit number -->
+[[Category:Equal divisions of the octave|####]]
+*
+<!-- 4-digit number -->
 [[Category:Quartismic]]
 {{Todo| review }}