111edo: Difference between revisions

← 110edo 111edo 112edo →
Prime factorization	3 × 37
Step size	10.8108 ¢
Fifth	65\111 (702.703 ¢)
Semitones (A1:m2)	11:8 (118.9 ¢ : 86.49 ¢)
Consistency limit	21
Distinct consistency limit	15

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Revision as of 13:21, 4 June 2024

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Theory

111edo is consistent through to the 21-odd-limit, and is the smallest edo uniquely consistent through the 15-odd-limit, marking it as an important higher limit tuning. It has a sharp tendency, with harmonics 3 through 19 all tuned sharp. 111 = 3 × 37, and 111edo shares the mappings for 5, 7, 11, and 13 with 37edo.

It is also significant for lower limits, especially in terms of what it tempers out in its patent val; for example, it tempers out 176/175 and gives an excellent optimal patent val for the corresponding 11-limit rank-4 temperament.

In fact in the 7-limit it tempers out 1728/1715, 3136/3125 and 5120/5103, and in the 11-limit, 176/175, 540/539, 1331/1323, 1375/1372, and notably the quartisma.

It is a particularly good tuning for the 11- or 13-limit versions of semisept, the 31 & 80 temperament, and buzzard, the 53 & 58 temperament. Gene Ward Smith's trio in #Music section is in guanyin temperament, the planar temperament tempering out 176/175 and 540/539, for which 111 also provides the optimal patent val.

Prime harmonics

Approximation of prime harmonics in 111edo
Harmonic		2	3	5	7	11	13	17	19	23	29	31
Error	Absolute (¢)	+0.00	+0.75	+2.88	+4.15	+0.03	+2.72	+3.15	+5.19	-1.25	-2.55	+0.91
Error	Relative (%)	+0.0	+6.9	+26.6	+38.4	+0.3	+25.1	+29.2	+48.0	-11.5	-23.6	+8.4
Steps (reduced)		111 (0)	176 (65)	258 (36)	312 (90)	384 (51)	411 (78)	454 (10)	472 (28)	502 (58)	539 (95)	550 (106)

Subsets and supersets

333edo, which slices the step of 111edo in three, is a significant tuning.

Intervals

Steps	Cents	Approximate ratios	Ups and downs notation
0	0	1/1	D
1	10.8		^D, ^⁴E♭♭
2	21.6		^^D, ^⁵E♭♭
3	32.4		^³D, v⁵E♭
4	43.2	39/38, 40/39, 41/40, 42/41	^⁴D, v⁴E♭
5	54.1	32/31, 33/32	^⁵D, v³E♭
6	64.9	27/26, 28/27	v⁵D♯, vvE♭
7	75.7	23/22, 24/23, 47/45	v⁴D♯, vE♭
8	86.5	21/20, 41/39	v³D♯, E♭
9	97.3	18/17	vvD♯, ^E♭
10	108.1	33/31	vD♯, ^^E♭
11	118.9	15/14, 46/43	D♯, ^³E♭
12	129.7	14/13, 41/38	^D♯, ^⁴E♭
13	140.5	13/12, 38/35	^^D♯, ^⁵E♭
14	151.4	12/11	^³D♯, v⁵E
15	162.2	45/41	^⁴D♯, v⁴E
16	173	21/19	^⁵D♯, v³E
17	183.8	10/9	v⁵D𝄪, vvE
18	194.6	19/17, 28/25, 47/42	v⁴D𝄪, vE
19	205.4	9/8	E
20	216.2	17/15	^E, ^⁴F♭
21	227	41/36	^^E, ^⁵F♭
22	237.8	31/27, 39/34, 47/41	^³E, v⁵F
23	248.6	15/13	^⁴E, v⁴F
24	259.5	36/31, 43/37	^⁵E, v³F
25	270.3		v⁵E♯, vvF
26	281.1	20/17, 47/40	v⁴E♯, vF
27	291.9	45/38	F
28	302.7	25/21, 31/26	^F, ^⁴G♭♭
29	313.5	6/5	^^F, ^⁵G♭♭
30	324.3	41/34, 47/39	^³F, v⁵G♭
31	335.1	17/14, 40/33	^⁴F, v⁴G♭
32	345.9	11/9	^⁵F, v³G♭
33	356.8		v⁵F♯, vvG♭
34	367.6	21/17, 26/21, 47/38	v⁴F♯, vG♭
35	378.4	46/37	v³F♯, G♭
36	389.2		vvF♯, ^G♭
37	400	29/23, 34/27	vF♯, ^^G♭
38	410.8	19/15, 33/26	F♯, ^³G♭
39	421.6	37/29	^F♯, ^⁴G♭
40	432.4		^^F♯, ^⁵G♭
41	443.2	31/24, 40/31	^³F♯, v⁵G
42	454.1	13/10	^⁴F♯, v⁴G
43	464.9	17/13	^⁵F♯, v³G
44	475.7	25/19	v⁵F𝄪, vvG
45	486.5	45/34	v⁴F𝄪, vG
46	497.3	4/3	G
47	508.1		^G, ^⁴A♭♭
48	518.9	27/20, 31/23	^^G, ^⁵A♭♭
49	529.7	19/14	^³G, v⁵A♭
50	540.5	41/30	^⁴G, v⁴A♭
51	551.4	11/8	^⁵G, v³A♭
52	562.2	18/13, 47/34	v⁵G♯, vvA♭
53	573	32/23, 39/28, 46/33	v⁴G♯, vA♭
54	583.8	7/5	v³G♯, A♭
55	594.6	31/22	vvG♯, ^A♭
56	605.4	44/31	vG♯, ^^A♭
57	616.2	10/7	G♯, ^³A♭
58	627	23/16, 33/23	^G♯, ^⁴A♭
59	637.8	13/9	^^G♯, ^⁵A♭
60	648.6	16/11	^³G♯, v⁵A
61	659.5	41/28	^⁴G♯, v⁴A
62	670.3	28/19	^⁵G♯, v³A
63	681.1	40/27, 43/29, 46/31	v⁵G𝄪, vvA
64	691.9		v⁴G𝄪, vA
65	702.7	3/2	A
66	713.5		^A, ^⁴B♭♭
67	724.3	38/25, 41/27	^^A, ^⁵B♭♭
68	735.1	26/17	^³A, v⁵B♭
69	745.9	20/13	^⁴A, v⁴B♭
70	756.8	31/20	^⁵A, v³B♭
71	767.6		v⁵A♯, vvB♭
72	778.4	47/30	v⁴A♯, vB♭
73	789.2	30/19, 41/26	v³A♯, B♭
74	800	27/17, 46/29	vvA♯, ^B♭
75	810.8		vA♯, ^^B♭
76	821.6	37/23, 45/28	A♯, ^³B♭
77	832.4	21/13, 34/21	^A♯, ^⁴B♭
78	843.2		^^A♯, ^⁵B♭
79	854.1	18/11	^³A♯, v⁵B
80	864.9	28/17, 33/20	^⁴A♯, v⁴B
81	875.7		^⁵A♯, v³B
82	886.5	5/3	v⁵A𝄪, vvB
83	897.3	42/25, 47/28	v⁴A𝄪, vB
84	908.1		B
85	918.9	17/10	^B, ^⁴C♭
86	929.7		^^B, ^⁵C♭
87	940.5	31/18	^³B, v⁵C
88	951.4	26/15, 45/26	^⁴B, v⁴C
89	962.2		^⁵B, v³C
90	973		v⁵B♯, vvC
91	983.8	30/17	v⁴B♯, vC
92	994.6	16/9	C
93	1005.4	25/14, 34/19	^C, ^⁴D♭♭
94	1016.2	9/5	^^C, ^⁵D♭♭
95	1027	38/21, 47/26	^³C, v⁵D♭
96	1037.8		^⁴C, v⁴D♭
97	1048.6	11/6	^⁵C, v³D♭
98	1059.5	24/13, 35/19	v⁵C♯, vvD♭
99	1070.3	13/7	v⁴C♯, vD♭
100	1081.1	28/15, 43/23	v³C♯, D♭
101	1091.9	47/25	vvC♯, ^D♭
102	1102.7	17/9	vC♯, ^^D♭
103	1113.5	40/21	C♯, ^³D♭
104	1124.3	23/12, 44/23	^C♯, ^⁴D♭
105	1135.1	27/14	^^C♯, ^⁵D♭
106	1145.9	31/16	^³C♯, v⁵D
107	1156.8	39/20, 41/21	^⁴C♯, v⁴D
108	1167.6		^⁵C♯, v³D
109	1178.4		v⁵C𝄪, vvD
110	1189.2		v⁴C𝄪, vD
111	1200	2/1	D

Regular temperament properties

Subgroup	Comma List	Mapping	Optimal 8ve Stretch (¢)	Tuning Error
Subgroup	Comma List	Mapping	Optimal 8ve Stretch (¢)	Absolute (¢)	Relative (%)
2.3	[176 -111⟩	[⟨111 176]]	-0.236	0.236	2.18
2.3.5	78732/78125, 67108864/66430125	[⟨111 176 258]]	-0.570	0.510	4.72
2.3.5.7	1728/1715, 3136/3125, 5120/5103	[⟨111 176 258 312]]	-0.797	0.591	5.47
2.3.5.7.11	176/175, 540/539, 1331/1323, 5120/5103	[⟨111 176 258 312 384]]	-0.639	0.615	5.69
2.3.5.7.11.13	176/175, 351/350, 540/539, 676/675, 1331/1323	[⟨111 176 258 312 384 411]]	-0.655	0.562	5.21
2.3.5.7.11.13.17	176/175, 256/255, 351/350, 442/441, 540/539, 715/714	[⟨111 176 258 312 384 411 454]]	-0.672	0.523	4.84
2.3.5.7.11.13.17.19	176/175, 256/255, 286/285, 324/323, 351/350, 400/399, 476/475	[⟨111 176 258 312 384 411 454 472]]	-0.740	0.521	4.83

Rank-2 temperaments

Note: 2.5.7.11.13 subgroup temperaments supported by 37edo are not listed.

Table of rank-2 temperaments by generator
Periods per 8ve	Generator*	Cents*	Associated Ratio*	Temperament
1	11\111	118.92	15/14	Subsedia
1	13\111	140.54	13/12	Quanic
1	14\111	151.35	12/11	Browser
1	16\111	172.97	400/363	Undetrita
1	20\111	216.22	17/15	Tremka
1	23\111	248.65	15/13	Hemikwai
1	31\111	335.14	17/14	Cohemimabila
1	35\111	378.38	56/45	Subpental
1	41\111	443.24	22/17	Warrior
1	43\111	464.86	17/13	Semisept
1	44\111	475.68	21/16	Buzzard
1	46\111	497.30	4/3	Kwai
1	49\111	529.73	19/14	Tuskaloosa
1	55\111	594.59	55/39	Gaster
3	7\111	75.68	24/23	Terture
3	12\111	129.73	14/13	Trimabila
3	13\111	140.54	243/224	Septichrome
3	17\111	183.55	10/9	Mirkat
3	23\111 (14\111)	248.65 (151.35)	15/13 (12/11)	Hemimist
3	46\111 (9\111)	497.30 (97.30)	4/3 (18/17~19/18)	Misty

* octave-reduced form, reduced to the first half-octave, and minimal form in parentheses if it is distinct

Scales

Direct sunlight (subset of Sensi[19]): 5 7 34 19 5 36 5 ((5, 12, 46, 65, 70, 106, 111)\111)
Hypersakura (subset of Sensi[19]): 5 41 19 5 41 ((5, 46, 65, 70, 111)\111)

Music

Gene Ward Smith

Trio for SoftSaturn, NebulaSing and TromBonehead (archived 2010) – SoundCloud | details | play – guanyin[22] in 111edo tuning

@@ Line 3: / Line 3: @@
 == Theory ==
-edo is [[consistent]] through to the [[21-odd-limit]], and is the smallest edo uniquely consistent through the [[15-odd-limit]], marking it as an important higher limit tuning. With [[harmonic]]s 3 through 19 all tuned sharp, 111edo is somewhat related to [[37edo]], with which it shares the mappings for 5, 7, 11, and 13.
+edo is [[consistent]] through to the [[21-odd-limit]], and is the smallest edo uniquely consistent through the [[15-odd-limit]], marking it as an important higher limit tuning. It has a sharp tendency, with [[harmonic]]s 3 through 19 all tuned sharp. 111 = 3 × 37, and 111edo shares the mappings for [[5/1|5]], [[7/1|7]], [[11/1|11]], and [[13/1|13]] with [[37edo]].
 It is also significant for lower limits, especially in terms of what it [[tempering out|tempers out]] in its [[patent val]]; for example, it tempers out [[176/175]] and gives an excellent [[optimal patent val]] for the corresponding [[11-limit]] [[rank-4 temperament]].
-In fact in the [[7-limit]] it tempers out [[1728/1715]], [[3136/3125]] and [[5120/5103]], and in the 11-limit, 176/175, 540/539, 1331/1323, 1375/1372, and notably the [[quartisma]].
+In fact in the [[7-limit]] it tempers out [[1728/1715]], [[3136/3125]] and [[5120/5103]], and in the 11-limit, 176/175, [[540/539]], 1331/1323, [[1375/1372]], and notably the [[quartisma]].
 It is a particularly good tuning for the 11- or 13-limit versions of [[semisept]], the 31 &amp; 80 temperament, and [[buzzard]], the 53 &amp; 58 temperament. [[Gene Ward Smith]]'s trio in [[#Music]] section is in [[Orwellismic family #Guanyin|guanyin temperament]], the [[planar temperament]] [[tempering out]] 176/175 and 540/539, for which 111 also provides the optimal patent val.
@@ Line 13: / Line 13: @@
 === Prime harmonics ===
 {{Harmonics in equal|111}}
+=== Subsets and supersets ===
+[[333edo]], which slices the step of 111edo in three, is a significant tuning.
 == Intervals ==

111edo: Difference between revisions

Revision as of 13:21, 4 June 2024

Contents

Theory

Prime harmonics

Subsets and supersets

Intervals

Regular temperament properties

Rank-2 temperaments

Scales

Music

Navigation menu

111edo: Difference between revisions

Revision as of 13:21, 4 June 2024

Theory

Prime harmonics

Subsets and supersets

Intervals

Regular temperament properties

Rank-2 temperaments

Scales

Music

Navigation menu

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