BudjarnLambeth/Ed257/128: Difference between revisions

Revision as of 11:40, 4 February 2024

An equal division of reduced harmonic 257 (ed257/128) is an equal-step tuning in which the octave-reduced 257th harmonic (257/128) is justly tuned and is divided in a given number of equal steps. 257/128 is very close to the octave, 2/1, but it is slightly sharper. This makes it suitable as an alternative to edos whose consonances are too flat, such as 7edo.

7ed255/128

Harmonics

Approximation of harmonics in 7ed257/128
Harmonic		2	3	4	5	6	7	8	9	10	11	12
Error	Absolute (¢)	+6.7	-5.6	+13.5	-28.0	+1.1	+79.0	+20.2	-11.3	-21.3	-13.9	+7.9
Error	Relative (%)	+3.9	-3.3	+7.8	-16.3	+0.6	+45.8	+11.7	-6.5	-12.3	-8.1	+4.6
Steps (reduced)		7 (0)	11 (4)	14 (0)	16 (2)	18 (4)	20 (6)	21 (0)	22 (1)	23 (2)	24 (3)	25 (4)

7edo, 16ed5, 22ed9 for comparison:

Approximation of harmonics in 7edo
Harmonic		2	3	4	5	6	7	8	9	10	11	12
Error	Absolute (¢)	+0.0	-16.2	+0.0	-43.5	-16.2	+59.7	+0.0	-32.5	-43.5	-37.0	-16.2
Error	Relative (%)	+0.0	-9.5	+0.0	-25.3	-9.5	+34.9	+0.0	-18.9	-25.3	-21.6	-9.5
Steps (reduced)		7 (0)	11 (4)	14 (0)	16 (2)	18 (4)	20 (6)	21 (0)	22 (1)	23 (2)	24 (3)	25 (4)

Approximation of harmonics in 16ed5
Harmonic		2	3	4	5	6	7	8	9	10	11	12
Error	Absolute (¢)	+19.0	+13.6	+38.0	+0.0	+32.6	-60.1	+57.0	+27.3	+19.0	+28.2	+51.7
Error	Relative (%)	+10.9	+7.8	+21.8	+0.0	+18.7	-34.5	+32.8	+15.7	+10.9	+16.2	+29.7
Steps (reduced)		7 (7)	11 (11)	14 (14)	16 (0)	18 (2)	19 (3)	21 (5)	22 (6)	23 (7)	24 (8)	25 (9)

Approximation of harmonics in 22ed9
Harmonic		2	3	4	5	6	7	8	9	10	11	12
Error	Absolute (¢)	+10.3	+0.0	+20.7	-19.8	+10.3	-83.6	+31.0	+0.0	-9.5	-1.6	+20.7
Error	Relative (%)	+6.0	+0.0	+12.0	-11.5	+6.0	-48.4	+17.9	+0.0	-5.5	-0.9	+12.0
Steps (reduced)		7 (7)	11 (11)	14 (14)	16 (16)	18 (18)	19 (19)	21 (21)	22 (0)	23 (1)	24 (2)	25 (3)

Intervals

172.393
344.786
517.178
689.571
861.964
1034.357
1206.749

9ed255/128

Harmonics

Approximation of harmonics in 9ed257/128
Harmonic		2	3	4	5	6	7	8	9	10	11	12
Error	Absolute (¢)	+6.7	-24.8	+13.5	+29.4	-18.0	-16.7	+20.2	-49.6	+36.2	+5.3	-11.3
Error	Relative (%)	+5.0	-18.5	+10.1	+22.0	-13.5	-12.5	+15.1	-37.0	+27.0	+3.9	-8.4
Steps (reduced)		9 (0)	14 (5)	18 (0)	21 (3)	23 (5)	25 (7)	27 (0)	28 (1)	30 (3)	31 (4)	32 (5)

9edo for comparison:

Approximation of harmonics in 9edo
Harmonic		2	3	4	5	6	7	8	9	10	11	12
Error	Absolute (¢)	+0.0	-35.3	+0.0	+13.7	-35.3	-35.5	+0.0	+62.8	+13.7	-18.0	-35.3
Error	Relative (%)	+0.0	-26.5	+0.0	+10.3	-26.5	-26.6	+0.0	+47.1	+10.3	-13.5	-26.5
Steps (reduced)		9 (0)	14 (5)	18 (0)	21 (3)	23 (5)	25 (7)	27 (0)	29 (2)	30 (3)	31 (4)	32 (5)

Intervals

134.083
268.167
402.25
536.333
670.416
804.5
938.583
1072.666
1206.749

14ed255/128

Harmonics

Approximation of harmonics in 14ed257/128
Harmonic		2	3	4	5	6	7	8	9	10	11	12
Error	Absolute (¢)	+6.7	-5.6	+13.5	-28.0	+1.1	-7.2	+20.2	-11.3	-21.3	-13.9	+7.9
Error	Relative (%)	+7.8	-6.5	+15.7	-32.5	+1.3	-8.3	+23.5	-13.1	-24.7	-16.1	+9.1
Steps (reduced)		14 (0)	22 (8)	28 (0)	32 (4)	36 (8)	39 (11)	42 (0)	44 (2)	46 (4)	48 (6)	50 (8)

14edo for comparison:

Approximation of harmonics in 14edo
Harmonic		2	3	4	5	6	7	8	9	10	11	12
Error	Absolute (¢)	+0.0	-16.2	+0.0	+42.3	-16.2	-26.0	+0.0	-32.5	+42.3	-37.0	-16.2
Error	Relative (%)	+0.0	-18.9	+0.0	+49.3	-18.9	-30.3	+0.0	-37.9	+49.3	-43.2	-18.9
Steps (reduced)		14 (0)	22 (8)	28 (0)	33 (5)	36 (8)	39 (11)	42 (0)	44 (2)	47 (5)	48 (6)	50 (8)

Intervals

86.196
172.393
258.589
344.786
430.982
517.178
603.375
689.571
775.768
861.964
948.16
1034.357
1120.553
1206.749

16ed255/128

Harmonics

Approximation of harmonics in 16ed257/128
Harmonic		2	3	4	5	6	7	8	9	10	11	12
Error	Absolute (¢)	+6.7	-16.4	+13.5	+4.3	-9.7	+25.2	+20.2	-32.8	+11.0	-3.1	-2.9
Error	Relative (%)	+8.9	-21.8	+17.9	+5.7	-12.8	+33.4	+26.8	-43.5	+14.6	-4.1	-3.9
Steps (reduced)		16 (0)	25 (9)	32 (0)	37 (5)	41 (9)	45 (13)	48 (0)	50 (2)	53 (5)	55 (7)	57 (9)

16edo for comparison:

Approximation of harmonics in 16edo
Harmonic		2	3	4	5	6	7	8	9	10	11	12
Error	Absolute (¢)	+0.0	-27.0	+0.0	-11.3	-27.0	+6.2	+0.0	+21.1	-11.3	-26.3	-27.0
Error	Relative (%)	+0.0	-35.9	+0.0	-15.1	-35.9	+8.2	+0.0	+28.1	-15.1	-35.1	-35.9
Steps (reduced)		16 (0)	25 (9)	32 (0)	37 (5)	41 (9)	45 (13)	48 (0)	51 (3)	53 (5)	55 (7)	57 (9)

Intervals

75.422
150.844
226.266
301.687
377.109
452.531
527.953
603.375
678.797
754.218
829.64
905.062
980.484
1055.906
1131.328
1206.749

19ed255/128

Harmonics

Approximation of harmonics in 19ed257/128
Harmonic		2	3	4	5	6	7	8	9	10	11	12
Error	Absolute (¢)	+6.7	+3.4	+13.5	+8.3	+10.2	-2.6	+20.2	+6.9	+15.0	-23.0	+16.9
Error	Relative (%)	+10.6	+5.4	+21.3	+13.0	+16.0	-4.1	+31.9	+10.8	+23.6	-36.2	+26.7
Steps (reduced)		19 (0)	30 (11)	38 (0)	44 (6)	49 (11)	53 (15)	57 (0)	60 (3)	63 (6)	65 (8)	68 (11)

19edo for comparison:

Approximation of harmonics in 19edo
Harmonic		2	3	4	5	6	7	8	9	10	11	12
Error	Absolute (¢)	+0.0	-7.2	+0.0	-7.4	-7.2	-21.5	+0.0	-14.4	-7.4	+17.1	-7.2
Error	Relative (%)	+0.0	-11.4	+0.0	-11.7	-11.4	-34.0	+0.0	-22.9	-11.7	+27.1	-11.4
Steps (reduced)		19 (0)	30 (11)	38 (0)	44 (6)	49 (11)	53 (15)	57 (0)	60 (3)	63 (6)	66 (9)	68 (11)

Intervals

63.513
127.026
190.539
254.053
317.566
381.079
444.592
508.105
571.618
635.131
698.644
762.158
825.671
889.184
952.697
1016.21
1079.723
1143.236
1206.749

Related concepts

@@ Line 1: / Line 1: @@
 An '''equal division of reduced harmonic 257''' ('''ed257/128''') is an [[equal-step tuning]] in which the octave-reduced 257th harmonic ([[257/128]]) is [[Just intonation|justly tuned]] and is divided in a given number of equal steps. 257/128 is very close to the [[octave]], 2/1, but it is slightly sharper. This makes it suitable as an alternative to edos whose consonances are too flat, such as [[7edo]].
 == 7ed255/128 ==
@@ Line 19: / Line 20: @@
 * 1034.357
 * 1206.749
+== 9ed255/128 ==
+=== Harmonics ===
+{{Harmonics in equal|9|257|128|intervals=integer}}
+[[9edo]] for comparison:
+{{Harmonics in equal|9|intervals=integer|collapsed=1}}
+=== Intervals ===
+* 134.083
+* 268.167
+* 402.25
+* 536.333
+* 670.416
+* 804.5
+* 938.583
+* 1072.666
+* 1206.749
+== 14ed255/128 ==
+=== Harmonics ===
+{{Harmonics in equal|14|257|128|intervals=integer}}
+[[14edo]] for comparison:
+{{Harmonics in equal|14|intervals=integer|collapsed=1}}
+=== Intervals ===
+* 86.196
+* 172.393
+* 258.589
+* 344.786
+* 430.982
+* 517.178
+* 603.375
+* 689.571
+* 775.768
+* 861.964
+* 948.16
+* 1034.357
+* 1120.553
+* 1206.749
+== 16ed255/128 ==
+=== Harmonics ===
+{{Harmonics in equal|16|257|128|intervals=integer}}
+[[16edo]] for comparison:
+{{Harmonics in equal|16|intervals=integer|collapsed=1}}
+=== Intervals ===
+* 75.422
+* 150.844
+* 226.266
+* 301.687
+* 377.109
+* 452.531
+* 527.953
+* 603.375
+* 678.797
+* 754.218
+* 829.64
+* 905.062
+* 980.484
+* 1055.906
+* 1131.328
+* 1206.749
+== 19ed255/128 ==
+=== Harmonics ===
+{{Harmonics in equal|19|257|128|intervals=integer}}
+[[19edo]] for comparison:
+{{Harmonics in equal|19|intervals=integer|collapsed=1}}
+=== Intervals ===
+* 63.513
+* 127.026
+* 190.539
+* 254.053
+* 317.566
+* 381.079
+* 444.592
+* 508.105
+* 571.618
+* 635.131
+* 698.644
+* 762.158
+* 825.671
+* 889.184
+* 952.697
+* 1016.21
+* 1079.723
+* 1143.236
+* 1206.749
 == Related concepts ==

BudjarnLambeth/Ed257/128: Difference between revisions

Revision as of 11:40, 4 February 2024

Contents

7ed255/128

Harmonics

Intervals

9ed255/128

Harmonics

Intervals

14ed255/128

Harmonics

Intervals

16ed255/128

Harmonics

Intervals

19ed255/128

Harmonics

Intervals

Related concepts

Navigation menu

BudjarnLambeth/Ed257/128: Difference between revisions

Revision as of 11:40, 4 February 2024

7ed255/128

Harmonics

Intervals

9ed255/128

Harmonics

Intervals

14ed255/128

Harmonics

Intervals

16ed255/128

Harmonics

Intervals

19ed255/128

Harmonics

Intervals

Related concepts

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