30edt: Difference between revisions

Line 33:

|-

| | 3

| | 190.1955

| | [[Tel:190.1955|190.1955]]

|130

| | 10/9~9/8

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|-

| | 5

| | 316.9925

| | [[Tel:316.9925|316.9925]]

|216.667

| | 6/5

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|-

| | 7

| | 443.7895

| | [[Tel:443.7895|443.7895]]

|303.333

| | 9/7

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|-

| | 9

| | 570.5865

| | [[Tel:570.5865|570.5865]]

|390

| | 7/5

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|-

| | 11

| | 697.3835

| | [[Tel:697.3835|697.3835]]

|476.667

| | 3/2

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|-

| | 13

| | 824.1805

| | [[Tel:824.1805|824.1805]]

|563.333

| | 8/5

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|-

| | 15

| | 950.9775

| | [[Tel:950.9775|950.9775]]

|650

| | 19/11

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30edt contains all [[19edo|19edo]] intervals within 3/1, all temepered progressively sharper. The accumulation of the .241 cent sharpening of the unit step relative to 19edo leads to the excellent 6edt approximations of 6/5 and 5/2. Non-redundantly with simpler edts, the 41 degree ~9/2 is only .6615 cents flatter than that in 6edo.

30edt also contains all the MOS contained in 15edt, being the double of this equal division. Being even, 30edt introduces

30edt also contains all the MOS contained in 15edt, being the double of this equal division. Being even, 30edt introduces MOS with an even number of periods per tritave such as a 6L 6s similar to Hexe Dodecatonic. This MOS has a period of 1/6 of the tritave and the generator is a single or double step. The major scale is sLsLsLsLsLsL, and the minor scale is LsLsLsLsLsLs. Being a "real" 3/2, the interval of 11 degrees generates an unfair Sigma scale of 8L 3s and the major scale is LLLsLLLsLLs. The sharp 9/7 of 7 degrees, in addition to generating a Lambda MOS will generate a 4L 9s unfair Superlambda MOS which does not border on being atonal as the 17edt rendition does.

MOS with an even number of periods per tritave such as a 6L 6s similar to Hexe Dodecatonic. This MOS has a period of 1/6 of the tritave and the generator is a single or double step. The major scale is sLsLsLsLsLsL, and the minor scale is LsLsLsLsLsLs. Being a "real" 3/2, the interval of 11 degrees generates an unfair Sigma scale of 8L 3s and the major scale is LLLsLLLsLLs. The sharp 9/7 of 7 degrees, in addition to generating a Lambda MOS will generate a 4L 9s unfair Superlambda MOS which does not border on being atonal as the 17edt rendition does.

== Compositions in 30edt ==

@@ Line 33: / Line 33: @@
 |-
 | | 3
-| | 190.1955
+| | [[Tel:190.1955|190.1955]]
 |130
 | | 10/9~9/8
@@ Line 47: / Line 47: @@
 |-
 | | 5
-| | 316.9925
+| | [[Tel:316.9925|316.9925]]
 |216.667
 | | 6/5
@@ Line 61: / Line 61: @@
 |-
 | | 7
-| | 443.7895
+| | [[Tel:443.7895|443.7895]]
 |303.333
 | | 9/7
@@ Line 75: / Line 75: @@
 |-
 | | 9
-| | 570.5865
+| | [[Tel:570.5865|570.5865]]
 |390
 | | 7/5
@@ Line 89: / Line 89: @@
 |-
 | | 11
-| | 697.3835
+| | [[Tel:697.3835|697.3835]]
 |476.667
 | | 3/2
@@ Line 103: / Line 103: @@
 |-
 | | 13
-| | 824.1805
+| | [[Tel:824.1805|824.1805]]
 |563.333
 | | 8/5
@@ Line 117: / Line 117: @@
 |-
 | | 15
-| | 950.9775
+| | [[Tel:950.9775|950.9775]]
 |650
 | | 19/11
@@ Line 229: / Line 229: @@
 edt contains all [[19edo|19edo]] intervals within 3/1, all temepered progressively sharper. The accumulation of the .241 cent sharpening of the unit step relative to 19edo leads to the excellent 6edt approximations of 6/5 and 5/2. Non-redundantly with simpler edts, the 41 degree ~9/2 is only .6615 cents flatter than that in 6edo.
-edt also contains all the MOS contained in 15edt, being the double of this equal division. Being even, 30edt introduces
+edt also contains all the MOS contained in 15edt, being the double of this equal division. Being even, 30edt introduces MOS with an even number of periods per tritave such as a 6L 6s similar to Hexe Dodecatonic. This MOS has a period of 1/6 of the tritave and the generator is a single or double step. The major scale is sLsLsLsLsLsL, and the minor scale is LsLsLsLsLsLs. Being a "real" 3/2, the interval of 11 degrees generates an unfair Sigma scale of 8L 3s and the major scale is LLLsLLLsLLs. The sharp 9/7 of 7 degrees, in addition to generating a Lambda MOS will generate a 4L 9s unfair Superlambda MOS which does not border on being atonal as the 17edt rendition does.
-MOS with an even number of periods per tritave such as a 6L 6s similar to Hexe Dodecatonic. This MOS has a period of 1/6 of the tritave and the generator is a single or double step. The major scale is sLsLsLsLsLsL, and the minor scale is LsLsLsLsLsLs. Being a "real" 3/2, the interval of 11 degrees generates an unfair Sigma scale of 8L 3s and the major scale is LLLsLLLsLLs. The sharp 9/7 of 7 degrees, in addition to generating a Lambda MOS will generate a 4L 9s unfair Superlambda MOS which does not border on being atonal as the 17edt rendition does.
 == Compositions in 30edt ==