@@ Line 1: / Line 1: @@
-{{Infobox ET
+{{Infobox ET}}
-| Prime factorization = 3 × 37
+{{ED intro}}
-| Step size = 10.81081¢
-| Fifth = 65\111 (702.7¢)
-| Major 2nd = 19\111 (205.4¢)
-| Semitones = 11:8 (118.9¢ : 86.5¢)
-| Consistency = 21
-}}
-The '''111 equal divisions of the octave''' ('''111edo'''), or the '''111(-tone) equal temperament''' ('''111tet''', '''111et''') when viewed from a [[regular temperament]] perspective, is the [[equal division of the octave]] into 111 parts, each of size about 10.811 [[cent]]s.
 == 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 harmonics 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 [[distinctly consistent]] through the [[15-odd-limit]], marking it as an important higher limit tuning. It has a sharp tendency, with [[prime harmonic|primes]] 3 through 19 all tuned sharp. Since {{nowrap| 111 {{=}} 3 × 37 }}, 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 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]].
+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]].
-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 further tempers out among others [[351/350]], [[352/351]], [[640/637]], [[676/675]], [[847/845]], [[1001/1000]], [[1188/1183]], [[1573/1568]] in the 13-limit; [[256/255]], [[325/324]], [[442/441]] in the 17-limit; [[286/285]], [[400/399]], [[476/475]] in the 19-limit. It excels as a full [[23-limit]] temperament, tempering out [[253/252]] and [[276/275]]. The [[23/1|23]] is tuned a little flat, unlike the lower primes. [[23/19]], [[23/21]] and their [[octave complement]]s are the only inconsistently mapped intervals in the [[23-odd-limit]].
-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. The trio piece 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.
+It is a particularly good tuning for the 11- or 13-limit versions of [[semisept]], the {{nowrap| 31 & 80 }} temperament, and [[buzzard]], the {{nowrap| 53 & 58 }} temperament. [[Gene Ward Smith]]'s trio in [[#Music]] section is in [[guanyin]] temperament, the [[rank-3 temperament]] [[tempering out]] 176/175 and 540/539, for which 111 also provides the optimal patent val.
 === Prime harmonics ===
-{{Primes in edo|111|columns=11}}
+{{Harmonics in equal|111|columns=9}}
+{{Harmonics in equal|111|columns=9|start=10|collapsed=true|title=Approximation of prime harmonics in 111edo (continued)}}
+=== Octave stretch ===
+edo can benefit from slightly [[stretched and compressed tuning|compressing the octave]] if that is acceptable, using tunings such as [[176edt]] or [[287ed6]]. This improves the approximated harmonics 3, 5, 7, 13, 17 and 19; the 11 becomes less accurate as it is quite spot-on already. 23 also gets worse on compression, so the compression should be very mild if the target is the full 23-limit.
+=== Subsets and supersets ===
+Since 111 factors into primes as {{nowrap| 3 × 37 }}, 111edo contains [[3edo]] and [[37edo]] as its subsets. Of these, 37edo has the same approximations of several prime harmonics, notably 5, 7, 11, and 13, and thus offers the same accuracy in the no-3's [[13-odd-limit]]. [[333edo]], which slices the step of 111edo in three, is a significant tuning.
+== Intervals ==
+{| class="wikitable center-1 right-2 center-4"
+|-
+! #
+! Cents
+! Approximated ratios*
+! [[Ups and downs notation]]
+|-
+| 0
+| 0.0
+| [[1/1]]
+| {{UDnote|step=0}}
+|-
+| 1
+| 10.8
+| [[121/120]], [[126/125]], [[144/143]], [[161/160]], [[169/168]], [[196/195]], [[225/224]]
+| {{UDnote|step=1}}
+|-
+| 2
+| 21.6
+| ''[[64/63]]'', [[81/80]], [[91/90]], [[100/99]], [[105/104]]
+| {{UDnote|step=2}}
+|-
+| 3
+| 32.4
+| ''[[46/45]]'', [[50/49]], [[55/54]], [[56/55]], [[57/56]], ''[[65/64]]''
+| {{UDnote|step=3}}
+|-
+| 4
+| 43.2
+| [[36/35]], [[39/38]], [[40/39]], [[45/44]], ''[[49/48]]''
+| {{UDnote|step=4}}
+|-
+| 5
+| 54.1
+| [[33/32]], [[34/33]], [[35/34]]
+| {{UDnote|step=5}}
+|-
+| 6
+| 64.9
+| [[26/25]], [[27/26]], [[28/27]]
+| {{UDnote|step=6}}
+|-
+| 7
+| 75.7
+| [[22/21]], [[23/22]], [[24/23]], [[25/24]]
+| {{UDnote|step=7}}
+|-
+| 8
+| 86.5
+| [[20/19]], [[21/20]]
+| {{UDnote|step=8}}
+|-
+| 9
+| 97.3
+| [[18/17]], [[19/18]]
+| {{UDnote|step=9}}
+|-
+| 10
+| 108.1
+| [[16/15]], [[17/16]]
+| {{UDnote|step=10}}
+|-
+| 11
+| 118.9
+| [[15/14]]
+| {{UDnote|step=11}}
+|-
+| 12
+| 129.7
+| [[14/13]]
+| {{UDnote|step=12}}
+|-
+| 13
+| 140.5
+| [[13/12]]
+| {{UDnote|step=13}}
+|-
+| 14
+| 151.4
+| [[12/11]]
+| {{UDnote|step=14}}
+|-
+| 15
+| 162.2
+| [[11/10]]
+| {{UDnote|step=15}}
+|-
+| 16
+| 173.0
+| [[21/19]]
+| {{UDnote|step=16}}
+|-
+| 17
+| 183.8
+| [[10/9]]
+| {{UDnote|step=17}}
+|-
+| 18
+| 194.6
+| [[19/17]], [[28/25]]
+| {{UDnote|step=18}}
+|-
+| 19
+| 205.4
+| [[9/8]]
+| {{UDnote|step=19}}
+|-
+| 20
+| 216.2
+| [[17/15]], [[26/23]]
+| {{UDnote|step=20}}
+|-
+| 21
+| 227.0
+| [[8/7]]
+| {{UDnote|step=21}}
+|-
+| 22
+| 237.8
+| [[23/20]]
+| {{UDnote|step=22}}
+|-
+| 23
+| 248.6
+| [[15/13]], [[22/19]]
+| {{UDnote|step=23}}
+|-
+| 24
+| 259.5
+|
+| {{UDnote|step=24}}
+|-
+| 25
+| 270.3
+| [[7/6]]
+| {{UDnote|step=25}}
+|-
+| 26
+| 281.1
+| [[20/17]]
+| {{UDnote|step=26}}
+|-
+| 27
+| 291.9
+| [[13/11]]
+| {{UDnote|step=27}}
+|-
+| 28
+| 302.7
+| [[19/16]], [[25/21]]
+| {{UDnote|step=28}}
+|-
+| 29
+| 313.5
+| [[6/5]]
+| {{UDnote|step=29}}
+|-
+| 30
+| 324.3
+| ''[[23/19]]'', [[77/64]]
+| {{UDnote|step=30}}
+|-
+| 31
+| 335.1
+| [[17/14]], [[40/33]]
+| {{UDnote|step=31}}
+|-
+| 32
+| 345.9
+| [[11/9]], [[28/23]], [[39/32]]
+| {{UDnote|step=32}}
+|-
+| 33
+| 356.8
+| [[16/13]], [[27/22]]
+| {{UDnote|step=33}}
+|-
+| 34
+| 367.6
+| [[21/17]], [[26/21]]
+| {{UDnote|step=34}}
+|-
+| 35
+| 378.4
+| [[56/45]]
+| {{UDnote|step=35}}
+|-
+| 36
+| 389.2
+| [[5/4]]
+| {{UDnote|step=36}}
+|-
+| 37
+| 400.0
+| [[24/19]], [[34/27]]
+| {{UDnote|step=37}}
+|-
+| 38
+| 410.8
+| [[19/15]]
+| {{UDnote|step=38}}
+|-
+| 39
+| 421.6
+| [[14/11]], [[23/18]]
+| {{UDnote|step=39}}
+|-
+| 40
+| 432.4
+| [[9/7]]
+| {{UDnote|step=40}}
+|-
+| 41
+| 443.2
+| [[22/17]]
+| {{UDnote|step=41}}
+|-
+| 42
+| 454.1
+| [[13/10]]
+| {{UDnote|step=42}}
+|-
+| 43
+| 464.9
+| [[17/13]]
+| {{UDnote|step=43}}
+|-
+| 44
+| 475.7
+| [[21/16]], [[25/19]]
+| {{UDnote|step=44}}
+|-
+| 45
+| 486.5
+| [[45/34]], [[65/49]]
+| {{UDnote|step=45}}
+|-
+| 46
+| 497.3
+| [[4/3]]
+| {{UDnote|step=46}}
+|-
+| 47
+| 508.1
+| [[51/38]]
+| {{UDnote|step=47}}
+|-
+| 48
+| 518.9
+| [[23/17]], [[27/20]]
+| {{UDnote|step=48}}
+|-
+| 49
+| 529.7
+| [[19/14]]
+| {{UDnote|step=49}}
+|-
+| 50
+| 540.5
+| [[15/11]], [[26/19]]
+| {{UDnote|step=50}}
+|-
+| 51
+| 551.4
+| [[11/8]]
+| {{UDnote|step=51}}
+|-
+| 52
+| 562.2
+| [[18/13]]
+| {{UDnote|step=52}}
+|-
+| 53
+| 573.0
+| [[32/23]]
+| {{UDnote|step=53}}
+|-
+| 54
+| 583.8
+| [[7/5]]
+| {{UDnote|step=54}}
+|-
+| 55
+| 594.6
+| [[24/17]]
+| {{UDnote|step=55}}
+|-
+| …
+| …
+| …
+| …
+|}
+<nowiki/>* As a 23-limit temperament, inconsistently mapped intervals in ''italic''
+== Approximation to JI ==
+=== Interval mappings ===
+{{Q-odd-limit intervals}}
 == Regular temperament properties ==
 {| class="wikitable center-4 center-5 center-6"
-! rowspan="2" | Subgroup
+|-
+! rowspan="2" | [[Subgroup]]
 ! rowspan="2" | [[Comma list]]
 ! rowspan="2" | [[Mapping]]
@@ Line 34: / Line 333: @@
 |-
 | 2.3
-| {{monzo| 176 -111 }}
+| {{Monzo| 176 -111 }}
-| [{{val| 111 176 }}]
+| {{Mapping| 111 176 }}
-| -0.236
+| −0.236
 | 0.236
 | 2.18
@@ Line 42: / Line 341: @@
 | 2.3.5
 | 78732/78125, 67108864/66430125
-| [{{val| 111 176 258 }}]
+| {{Mapping| 111 176 258 }}
-| -0.570
+| −0.570
 | 0.510
 | 4.72
@@ Line 49: / Line 348: @@
 | 2.3.5.7
 | 1728/1715, 3136/3125, 5120/5103
-| [{{val| 111 176 258 312 }}]
+| {{Mapping| 111 176 258 312 }}
-| -0.797
+| −0.797
 | 0.591
 | 5.47
@@ Line 56: / Line 355: @@
 | 2.3.5.7.11
 | 176/175, 540/539, 1331/1323, 5120/5103
-| [{{val| 111 176 258 312 384 }}]
+| {{Mapping| 111 176 258 312 384 }}
-| -0.639
+| −0.639
 | 0.615
 | 5.69
@@ Line 63: / Line 362: @@
 | 2.3.5.7.11.13
 | 176/175, 351/350, 540/539, 676/675, 1331/1323
-| [{{val| 111 176 258 312 384 411 }}]
+| {{Mapping| 111 176 258 312 384 411 }}
-| -0.655
+| −0.655
 | 0.562
 | 5.21
@@ Line 70: / Line 369: @@
 | 2.3.5.7.11.13.17
 | 176/175, 256/255, 351/350, 442/441, 540/539, 715/714
-| [{{val| 111 176 258 312 384 411 454 }}]
+| {{Mapping| 111 176 258 312 384 411 454 }}
-| -0.672
+| −0.672
 | 0.523
 | 4.84
@@ Line 77: / Line 376: @@
 | 2.3.5.7.11.13.17.19
 | 176/175, 256/255, 286/285, 324/323, 351/350, 400/399, 476/475
-| [{{val| 111 176 258 312 384 411 454 472 }}]
+| {{Mapping| 111 176 258 312 384 411 454 472 }}
-| -0.740
+| −0.740
 | 0.521
 | 4.83
+|-
+| 2.3.5.7.11.13.17.19.23
+| 176/175, 253/252, 256/255, 276/275, 286/285, 324/323, 351/350, 400/399
+| {{Mapping| 111 176 258 312 384 411 454 472 502 }}
+| −0.628
+| 0.586
+| 5.43
 |}
+* 111et has lower absolute errors than any previous equal temperaments in the 13-, 17-, 19-, and 23-limit, beating [[94edo|94]] and [[103edo|103h]] before being superseded by [[121edo|121i]].
 === Rank-2 temperaments ===
-Note: 2.5.7.11.13 subgroup temperaments supported by 37EDO are not listed.
+Note: 2.5.7.11.13 subgroup temperaments supported by 37edo are not listed.
 {| class="wikitable center-all left-5"
-|+Table of rank-2 temperaments by generator
+|+ style="font-size: 105%;" | Table of rank-2 temperaments by generator
-! Periods<br>per octave
+|-
-! Generator<br>(reduced)
+! Periods<br>per 8ve
-! Cents<br>(reduced)
+! Generator*
-! Associated ratio<br>(reduced)
+! Cents*
+! Associated<br>ratio*
 ! Temperament
 |-
@@ Line 105: / Line 413: @@
 | 13/12
 | [[Quanic]]
+|-
+| 1
+| 14\111
+| 151.35
+| 12/11
+| [[Browser]]
 |-
 | 1
@@ Line 111: / Line 425: @@
 | 400/363
 | [[Undetrita]]
+|-
+| 1
+| 20\111
+| 216.22
+| 17/15
+| [[Tremka]]
+|-
+| 1
+| 23\111
+| 248.65
+| 15/13
+| [[Hemikwai]]
 |-
 | 1
@@ Line 127: / Line 453: @@
 | 41\111
 | 443.24
-| 162/125
+| 22/17
-| [[Sensipent]]
+| [[Warrior]]
 |-
 | 1
@@ Line 140: / Line 466: @@
 | 475.68
 | 21/16
-| [[Vulture]] / [[buzzard]]
+| [[Buzzard]]
 |-
 | 1
@@ Line 187: / Line 513: @@
 | 23\111<br>(14\111)
 | 248.65<br>(151.35)
-| 231/200<br>(12/11)
+| 15/13<br>(12/11)
 | [[Hemimist]]
 |-
@@ Line 195: / Line 521: @@
 | 4/3<br>(18/17~19/18)
 | [[Misty]]
+|-
+| 37
+| 46\111<br>(1\111)
+| 497.30<br>(10.81)
+| 4/3<br>(169/168)
+| [[Rubidium]]
 |}
+<nowiki/>* [[Normal forms #Equave-reduced-generator form|Octave-reduced form]], reduced to the first half-octave, and [[normal forms #Minimal-generator form|minimal form]] in parentheses if distinct
 == Scales ==
-Since 111EDO has a step of 10.811 cents, it also allows one to use its MOS scales as circulating temperaments{{clarify}}.
+* Direct sunlight (subset of [[Sensi]][19]): 5 7 34 19 5 36 5 ((5, 12, 46, 65, 70, 106, 111)\111)
-{| class="wikitable"
+* Hypersakura (subset of Sensi[19]): 5 41 19 5 41 ((5, 46, 65, 70, 111)\111)
-|+Circulating temperaments in 111EDO
-!Tones
+== Instruments ==
-!Pattern
+* [[Lumatone mapping for 111edo]]
-!L:s
-|-
-| 5
-| [[1L 4s]]
-| 23:22
-|-
-| 6
-| [[3L 3s]]
-| 19:18
-|-
-| 7
-| [[6L 1s]]
-| 16:15
-|-
-| 8
-| [[7L 1s]]
-| 14:13
-|-
-| 9
-| [[3L 6s]]
-| 13:12
-|-
-| 10
-| [[1L 9s]]
-| 12:11
-|-
-| 11
-| [[1L 10s]]
-| 11:10
-|-
-| 12
-| [[3L 9s]]
-| 10:9
-|-
-| 13
-| [[6L 7s]]
-| 9:8
-|-
-| 14
-| [[13L 1s]]
-| rowspan="2" |8:7
-|-
-| 15
-| [[6L 9s]]
-|-
-| 16
-| [[15L 1s]]
-| rowspan="3" |7:6
-|-
-| 17
-| [[9L 8s]]
-|-
-| 18
-| 3L 15s
-|-
-| 19
-| [[16L 3s]]
-| rowspan="4" |6:5
-|-
-| 20
-| 11L 9s
-|-
-| 21
-| 6L 15s
-|-
-| 22
-| 1L 21s
-|-
-| 23
-| 19L 4s
-| rowspan="5" | 5:4
-|-
-| 24
-| 15L 9s
-|-
-| 25
-| 11L 14s
-|-
-| 26
-| 7L 19s
-|-
-| 27
-| 3L 24s
-|-
-| 28
-| 27L 1s
-| rowspan="9" |4:3
-|-
-| 29
-| 24L 5s
-|-
-| 30
-| 21L 9s
-|-
-| 31
-| 18L 13s
-|-
-| 32
-| 15L 17s
-|-
-| 33
-| 12L 21s
-|-
-| 34
-| 9L 25s
-|-
-| 35
-| 6L 29s
-|-
-| 36
-| 3L 33s
-|-
-| 37
-| [[37edo|37EDO]]
-| equal
-|-
-| 38
-| 35L 3s
-| rowspan="18" |3:2
-|-
-| 39
-| 33L 6s
-|-
-| 40
-| 31L 9s
-|-
-| 41
-| 29L 12s
-|-
-| 42
-| 27L 15s
-|-
-| 43
-| 25L 18s
-|-
-| 44
-| 23L 21s
-|-
-| 45
-| 21L 24s
-|-
-| 46
-| 19L 27s
-|-
-| 47
-| 17L 30s
-|-
-| 48
-| 15L 33s
-|-
-| 49
-| 13L 36s
-|-
-| 50
-| 11L 39s
-|-
-| 51
-| 9L 42s
-|-
-| 52
-| 7L 45s
-|-
-| 53
-| 5L 48s
-|-
-| 54
-| 3L 51s
-|-
-| 55
-| 1L 54s
-|-
-| 56
-| 55L 1s
-| rowspan="33" |2:1
-|-
-| 57
-| 54L 3s
-|-
-| 58
-| 53L 5s
-|-
-| 59
-| 52L 7s
-|-
-| 60
-| 51L 9s
-|-
-| 61
-| 50L 11s
-|-
-| 62
-| 49L 13s
-|-
-| 63
-| 48L 15s
-|-
-| 64
-| 47L 17s
-|-
-| 65
-| 46L 19s
-|-
-| 66
-| 45L 21s
-|-
-| 67
-| 44L 23s
-|-
-| 68
-| 43L 25s
-|-
-| 69
-| 42L 27s
-|-
-| 70
-| 41L 29s
-|-
-| 71
-| 40L 31s
-|-
-| 72
-| 39L 33s
-|-
-| 73
-| 38L 35s
-|-
-| 74
-| 37L 37s
-|-
-| 75
-| 36L 39s
-|-
-| 76
-| 35L 41s
-|-
-| 77
-| 34L 43s
-|-
-| 78
-| 33L 45s
-|-
-| 79
-| 32L 47s
-|-
-| 80
-| 31L 49s
-|-
-| 81
-| 30L 51s
-|-
-| 82
-| 29L 53s
-|-
-| 83
-| 28L 55s
-|-
-| 84
-| 27L 57s
-|-
-| 85
-| 26L 59s
-|-
-| 86
-| 25L 61s
-|-
-| 87
-| 24L 63s
-|-
-| 88
-| 23L 65s
-|}
 == Music ==
-* [http://www.archive.org/details/TrioForSoftsaturnNebulasingAndTrombonehead_297 Trio for SoftSaturn, NebulaSing and TromBonehead] [http://www.archive.org/download/TrioForSoftsaturnNebulasingAndTrombonehead_297/trio-gorts.mp3 play] by [[Gene Ward Smith]]
+; [[Gene Ward Smith]]
+* ''Trio for SoftSaturn, NebulaSing and TromBonehead'' (archived 2010) – [https://soundcloud.com/genewardsmith/trio-gorts SoundCloud] | [https://www.archive.org/details/TrioForSoftsaturnNebulasingAndTrombonehead_297 details] | [https://www.archive.org/download/TrioForSoftsaturnNebulasingAndTrombonehead_297/trio-gorts.mp3 play] – in Guanyin[22], 111edo tuning
-[[Category:Equal divisions of the octave]]
 [[Category:Listen]]
 [[Category:Buzzard]]

111edo: Difference between revisions