17ed4: Difference between revisions

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17ed4

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Prime factorization

17 (prime)

Step size

141.176 ¢

Octave

9\17ed4 (1270.59 ¢)

Twelfth

13\17ed4 (1835.29 ¢)

Consistency limit

1

Distinct consistency limit

1

17 equal divisions of the 4th harmonic (abbreviated 17ed4) is a nonoctave tuning system that divides the interval of 4/1 into 17 equal parts of about 141 ¢ each. Each step represents a frequency ratio of 4^1/17, or the 17th root of 4. It corresponds to 8.5edo or every second step of 17edo.

Theory

17ed4 is the smallest ED4 to contain a diatonic fifth, in this case 17edo's sharp fifth, and it can be used to generate heptatonic (3L 4s<4/1>) and decatonic (7L 3s<4/1>) MOS scales with a period of 4/1. The decatonic scale is the more usable of these two scales, corresponding to an octave-repeating pentatonic scale in terms of step sizes, while the heptatonic scale has too large step sizes, corresponding to an octave-repeating tritonic or tetratonic scale in terms of step sizes.

Intervals

#	Cents	Approximate ratios	17edo notation	Diaquadic notation (J = 1/1)
0	0.00	1/1	C	J
1	141.18	13/12, 12/11, 14/13, 25/23	C#	J#, Kb
2	282.36	13/11, 7/6	Eb	K
3	423.54	32/25, 9/7, 14/11, 33/26, 23/18	E	K#, Lb
4	564.72	11/8, 18/13, 32/23	^F	L
5	705.90	3/2, 32/21	G	M
6	847.08	13/8, 18/11, 23/14	G#, vA	M#, Nb
7	988.26	16/9, 7/4, 25/14, 44/25, 23/13	Bb	N
8	1129.44	25/13, 48/25, 27/14, 64/33, 23/12	B	N#, Ob
9	1270.62	15/7	^C	O
10	1411.80	9/4, 16/7	D	O#, Pb
11	1552.98	12/5, 5/2	vE	P
12	1694.16	8/3	F	Q
13	1835.34	3/1	F#	Q#, Rb
14	1976.52	16/5	^G, Ab	R
15	2117.70	10/3	A	R#, Sb
16	2258.88	11/3	vB	S
17	2400.00	4/1	C	J

Harmonics

Approximation of harmonics in 17ed4
Harmonic		2	3	4	5	6	7	8	9	10	11	12
Error	Absolute (¢)	+70.6	-66.7	+0.0	+37.2	+3.9	+19.4	+70.6	+7.9	-33.4	-57.2	-66.7
Error	Relative (%)	+50.0	-47.2	+0.0	+26.4	+2.8	+13.7	+50.0	+5.6	-23.6	-40.5	-47.2
Steps (reduced)		9 (9)	13 (13)	17 (0)	20 (3)	22 (5)	24 (7)	26 (9)	27 (10)	28 (11)	29 (12)	30 (13)

Approximation of harmonics in 17ed4
Harmonic		13	14	15	16	17	18	19	20	21	22	23
Error	Absolute (¢)	-64.1	-51.2	-29.4	+0.0	+36.2	-62.7	-15.2	+37.2	-47.3	+13.4	-63.6
Error	Relative (%)	-45.4	-36.3	-20.9	+0.0	+25.7	-44.4	-10.7	+26.4	-33.5	+9.5	-45.0
Steps (reduced)		31 (14)	32 (15)	33 (16)	34 (0)	35 (1)	35 (1)	36 (2)	37 (3)	37 (3)	38 (4)	38 (4)

@@ Line 1: / Line 1: @@
-{{Infobox ET|17ed1840616/1678131}}
+{{Infobox ET}}
-<!--Using continued fraction convergent of 4^(1/17) until Infobox ET starts working with ED4s-->
+{{ED intro}} It corresponds to 8.5edo or every second step of [[17edo]].
-'''17ed4''' is the [[Ed4|equal division of the double octave]] into 17 parts of 141.18 [[cent|cents]] each, corresponding to 8.5edo or every second step of [[17edo]].
 ==Theory==
-ed4 contains [[17edo]]'s sharp fifth, and it can be used to generate heptatonic (3L 4s) and decatonic (7L 3s) MOS scales with a period of [[4/1]]. The decatonic scale is the more usable of these two scales, corresponding to an octave-repeating pentatonic scale in terms of step sizes, while the heptatonic scale has too large step sizes, corresponding to an octave-repeating tritonic or tetratonic scale in terms of step sizes.
+ed4 is the smallest ED4 to contain a diatonic fifth, in this case [[17edo]]'s sharp fifth, and it can be used to generate heptatonic (3L 4s<4/1>) and decatonic ([[7L 3s (4/1-equivalent)|7L 3s<4/1>]]) MOS scales with a period of [[4/1]]. The decatonic scale is the more usable of these two scales, corresponding to an octave-repeating pentatonic scale in terms of step sizes, while the heptatonic scale has too large step sizes, corresponding to an octave-repeating tritonic or tetratonic scale in terms of step sizes.
 ==Intervals==
 {|class="wikitable"
@@ Line 11: / Line 12: @@
 !Approximate ratios
 ![[17edo]] notation
-![[7L 3s (4/1-equivalent)|7L 3s<4/1>]] notation (J = 1/1)
+![[7L 3s (4/1-equivalent)|Diaquadic]] notation (J = 1/1)
 |-
 |0
@@ Line 23: / Line 24: @@
 |[[13/12]], [[12/11]], [[14/13]], [[25/23]]
 |C#
-|J#, Kbb
+|J#, Kb
 |-
 |2
@@ Line 29: / Line 30: @@
 |[[13/11]], [[7/6]]
 |Eb
-|Jx, Kb
+|K
 |-
 |3
@@ Line 35: / Line 36: @@
 |[[32/25]], [[9/7]], [[14/11]], [[33/26]], [[23/18]]
 |E
-|K
+|K#, Lb
 |-
 |4
@@ Line 41: / Line 42: @@
 |[[11/8]], [[18/13]], [[32/23]]
 |^F
-|K#, Lb
+|L
 |-
 |5
@@ Line 47: / Line 48: @@
 |[[3/2]], [[32/21]]
 |G
-|L
+|M
 |-
 |6
@@ Line 53: / Line 54: @@
 |[[13/8]], [[18/11]], [[23/14]]
 |G#, vA
-|M
+|M#, Nb
 |-
 |7
@@ Line 59: / Line 60: @@
 |[[16/9]], [[7/4]], [[25/14]], [[44/25]], [[23/13]]
 |Bb
-|M#, Nb
+|N
 |-
 |8
@@ Line 65: / Line 66: @@
 |[[25/13]], [[48/25]], [[27/14]], [[64/33]], [[23/12]]
 |B
-|N
+|N#, Ob
 |-
 |9
@@ Line 71: / Line 72: @@
 |[[15/7]]
 |^C
-|N#, Ob
+|O
 |-
 |10
 |1411.80
-|[[16/7]]
+|[[9/4]], [[16/7]]
 |D
-|O
+|O#, Pb
 |-
 |11
@@ Line 89: / Line 90: @@
 |[[8/3]]
 |F
-|P#, Qb
+|Q
 |-
 |13
@@ Line 95: / Line 96: @@
 |[[3/1]]
 |F#
-|Q
+|Q#, Rb
 |-
 |14
@@ Line 101: / Line 102: @@
 |[[16/5]]
 |^G, Ab
-|Q#, Rb
+|R
 |-
 |15
@@ Line 107: / Line 108: @@
 |[[10/3]]
 |A
-|R
+|R#, Sb
 |-
 |16
@@ Line 113: / Line 114: @@
 |[[11/3]]
 |vB
-|R#, Jb
+|S
 |-
 |17
@@ Line 121: / Line 122: @@
 |J
 |}
+== Harmonics ==
+{{Harmonics in equal
+| steps = 17
+| num = 4
+| denom = 1
+}}
+{{Harmonics in equal
+| steps = 17
+| num = 4
+| denom = 1
+| start = 12
+| collapsed = 1
+}}
 [[Category:Macrotonal]]
 [[Category:Nonoctave]]
-[[Category:Ed4]]
+{{todo|expand}}

17ed4: Difference between revisions

Latest revision as of 21:18, 31 July 2025

Theory

Intervals

Harmonics

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