Horwell temperaments: Difference between revisions
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{{Technical data page}} | |||
This is a collection of [[rank-2 temperament|rank-2]] '''horwell temperaments''', which temper out the [[horwell comma]] ({{monzo|legend=1| -16 1 5 1 }}, [[ratio]]: 65625/65536). | |||
Temperaments discussed elsewhere are | |||
* [[Pontiac]] (+4375/4374) → [[Schismatic family #Pontiac|Schismatic family]] | |||
* ''[[Keen]]'' (+875/864) → [[Diaschismic family #Keen|Diaschismic family]] | |||
* ''[[Paramity]]'' (+1600000/1594323) → [[Amity family #Paramity|Amity family]] | |||
* ''[[Countercata]]'' (+5120/5103) → [[Kleismic family #Countercata|Kleismic family]] | |||
* [[Orwell]] (+1728/1715) → [[Semicomma family #Orwell|Semicomma family]] | |||
* ''[[Worschmidt]]'' (+126/125) → [[Würschmidt family #Worschmidt|Würschmidt family]] | |||
* ''[[Escaped]]'' (+245/243) → [[Escapade family #Escaped|Escapade family]] | |||
* ''[[Semabila]]'' (+49/48) → [[Mabila family #Septimal mabila|Mabila family]] | |||
* ''[[Narayana]]'' (+321489/320000) → [[Vishnu family #Narayana|Vishnu family]] | |||
* [[Hemithirds]] (+1029/1024) → [[Hemimean clan #Hemithirds|Hemimean clan]] | |||
* ''[[Bisupermajor]]'' (+10976/10935) → [[Hemimage temperaments #Bisupermajor|Hemimage temperaments]] | |||
* ''[[Maquiloid]]'' (+686/675) → [[Maquila family #Maquiloid|Maquila family]] | |||
* ''[[Kaboom]]'' (+4802000/4782969) → [[Vavoom family #Kaboom|Vavoom family]] | |||
* [[Tertiaseptal]] (+2401/2400) → [[Breedsmic temperaments #Tertiaseptal|Breedsmic temperaments]] | |||
* ''[[Eris]]'' (+16875/16807) → [[Canopic clan #Eris|Canopic clan]] | |||
* ''[[Soviet ferris wheel]]'' (+{{monzo| -5 -9 -5 11 }}) → [[20th-octave temperaments #Soviet ferris wheel|20th-octave temperaments]] | |||
== | Considered below are fifthplus, mutt, oquatonic, emkay, kastro, and bezique, in the order of increasing [[badness]]. | ||
{{ | |||
== Fifthplus == | |||
: ''For the 5-limit version, see [[Miscellaneous 5-limit temperaments #Sesesix]].'' | |||
Fifthplus tempers out the [[wizma]] in addition to the horwell comma, and may be described as the {{nowrap| 22 & 171 }}. The name ''fifthplus'' means using a sharp fifth interval (such as a [[superpyth]] fifth) as a generator. It is a restriction of [[24576/24565 #2.3.5.7.17 subgroup (prime archagall)|prime archagall]]. | |||
[[Subgroup]]: 2.3.5.7 | |||
[[Comma list]]: 65625/65536, 420175/419904 | |||
{{Mapping|legend=1| 1 -12 10 -22 | 0 23 -13 42 }} | |||
: mapping generators: ~2, ~5488/3645 | |||
[[ | [[Optimal tuning]]s: | ||
* [[WE]]: ~2 = 1200.0934{{c}}, ~5488/3645 = 708.8291{{c}} | |||
: [[error map]]: {{val| +0.093 -0.007 -0.158 -0.059 }} | |||
* [[CWE]]: ~2 = 1200.0000{{c}}, ~5488/3645 = 708.7752{{c}} | |||
: error map: {{val| 0.000 -0.126 -0.391 -0.268 }} | |||
{{Optimal ET sequence|legend=1| 22, 149, 171, 1903c, 2074c, …, 3613ccd }} | |||
[[Badness]] (Sintel): 0.654 | |||
[[ | == Mutt == | ||
{{Main| Mutt }} | |||
: ''For the 5-limit version, see [[Father–3 equivalence continuum #Mutt (5-limit)]].'' | |||
Mutt tempers out the [[landscape comma]] in addition to the horwell comma, and may be described as the {{nowrap| 84 & 87 }} temperament. | |||
[[Subgroup]]: 2.3.5.7 | |||
[[Comma list]]: 65625/65536, 250047/250000 | |||
{{ | {{Mapping|legend=1| 3 -2 6 20 | 0 7 1 -12 }} | ||
: mapping generators: ~63/50, ~5/4 | |||
[[Optimal tuning]]s: | |||
* [[WE]]: ~63/50 = 400.0351{{c}}, ~5/4 = 385.9974{{c}} (~126/125 = 14.0377{{c}}) | |||
: [[error map]]: {{val| +0.105 -0.043 -0.105 -0.092 }} | |||
* [[CWE]]: ~63/50 = 400.0000{{c}}, ~5/4 = 385.9638{{c}} (~126/125 = 14.0362{{c}}) | |||
: error map: {{val| 0.000 -0.208 -0.350 -0.392 }} | |||
{{Optimal ET sequence|legend=1| 84, 87, 171 }} | |||
Badness: 0. | [[Badness]] (Sintel): 0.719 | ||
=== 11-limit === | === 11-limit === | ||
| Line 38: | Line 72: | ||
Comma list: 441/440, 4375/4356, 16384/16335 | Comma list: 441/440, 4375/4356, 16384/16335 | ||
Mapping: | Mapping: {{mapping| 3 -2 6 20 21 | 0 7 1 -12 -11 }} | ||
Optimal tunings: | |||
* WE: ~44/35 = 399.9783{{c}}, ~5/4 = 385.9993{{c}} (~126/125 = 13.9790{{c}}) | |||
* CWE: ~44/35 = 400.0000{{c}}, ~5/4 = 386.0208{{c}} (~126/125 = 13.9792{{c}}) | |||
{{Optimal ET sequence|legend=0| 84, 87, 171, 258 }} | |||
Badness: | Badness (Sintel): 1.93 | ||
=== 13-limit === | === 13-limit === | ||
| Line 51: | Line 87: | ||
Comma list: 364/363, 441/440, 625/624, 2200/2197 | Comma list: 364/363, 441/440, 625/624, 2200/2197 | ||
Mapping: | Mapping: {{mapping| 3 -2 6 20 21 14 | 0 7 1 -12 -11 -3 }} | ||
Optimal tunings: | |||
* WE: ~44/35 = 399.9610{{c}}, ~5/4 = 385.9842{{c}} (~126/125 = 13.9768{{c}}) | |||
* CWE: ~44/35 = 400.0000{{c}}, ~5/4 = 386.0231{{c}} (~126/125 = 13.9769{{c}}) | |||
{{Optimal ET sequence|legend=0| 84, 87, 171, 258, 429ef }} | |||
Badness: | Badness (Sintel): 1.20 | ||
== | == Oquatonic == | ||
Subgroup: 2.3.5.7 | : ''For the 5-limit version, see [[28th-octave temperaments #Oquatonic (5-limit)]].'' | ||
Oquatonic has a period of 1/28 octave and tempers out the horwell (65625/65536) and the [[dimcomp comma]] (390625/388962). In this temperament, the [[5/4]] major third is mapped to 9\28. | |||
The name ''oquatonic'' was given by [[Petr Pařízek]] in 2011 as an abbreviation of the Italian [[wiktionary: ottantaquatro|''ottantaquatro'' ("eighty-four")]]<ref name="petr's long post"/>. | |||
[[Subgroup]]: 2.3.5.7 | |||
[[Comma list]]: 65625/65536, 390625/388962 | |||
{{Mapping|legend=1| 28 0 65 123 | 0 1 0 -1 }} | |||
: mapping generators: ~128/125, ~3 | |||
[[Optimal tuning]]s: | |||
* [[WE]]: ~128/125 = 42.8570{{c}}, ~3/2 = 702.1112{{c}} | |||
: [[error map]]: {{val| -0.004 +0.152 -0.609 +0.477 }} | |||
* [[CWE]]: ~128/125 = 42.8571{{c}}, ~3/2 = 702.1132{{c}} | |||
: error map: {{val| 0.000 +0.158 -0.599 +0.489 }} | |||
{{Optimal ET sequence|legend=1| 28, 56, 84, 140, 224, 364, 588, 952 }} | |||
[[Badness]] (Sintel): 2.23 | |||
=== 11-limit === | |||
Subgroup: 2.3.5.7.11 | |||
Comma list: 1375/1372, 6250/6237, 65625/65536 | |||
Mapping: {{mapping| 28 0 65 123 230 | 0 1 0 -1 -3 }} | |||
Optimal tunings: | |||
* WE: ~128/125 = 42.8577{{c}}, ~3/2 = 702.0275{{c}} | |||
* CWE: ~128/125 = 42.8571{{c}}, ~3/2 = 702.0174{{c}} | |||
{{Optimal ET sequence|legend=0| 84, 140, 224, 364, 588 }} | |||
Badness (Sintel): 1.58 | |||
=== 13-limit === | |||
Subgroup: 2.3.5.7.11.13 | |||
Comma list: 625/624, 1375/1372, 2080/2079, 2200/2197 | |||
{{ | Mapping: {{mapping| 28 0 65 123 230 148 | 0 1 0 -1 -3 -1 }} | ||
Optimal tunings: | |||
* WE: ~40/39 = 42.8571{{c}}, ~3/2 = 702.0289{{c}} | |||
* CWE: ~40/39 = 42.8571{{c}}, ~3/2 = 702.0288{{c}} | |||
{{ | {{Optimal ET sequence|legend=0| 84, 140, 224, 364, 588 }} | ||
Badness (Sintel): 0.908 | |||
== Emkay == | == Emkay == | ||
: ''For the 5-limit version, see [[Miscellaneous 5-limit temperaments #Emka]].'' | |||
[[File:Scale Tree Graph For Emkay.png|thumb|Scale tree graph for emkay.]] | |||
Subgroup: 2.3.5.7 | Emkay may be described as the {{nowrap| 87 & 224 }} temperament. It tempers out the same 5-limit comma as the [[emka]] (37 & 50), but with the horwell comma (65625/65536) rather than the hemimean comma (3136/3125) tempered out. | ||
[[Subgroup]]: 2.3.5.7 | |||
[[Comma list]]: 65625/65536, 244140625/243045684 | [[Comma list]]: 65625/65536, 244140625/243045684 | ||
{{Mapping|legend=1| 1 -13 -2 39 | 0 27 8 -67 }} | |||
: mapping generators: ~2, ~4536/3125 | |||
[[ | [[Optimal tuning]]s: | ||
* [[WE]]: ~2 = 1200.0279{{c}}, ~4536/3125 = 648.2405{{c}} | |||
: [[error map]]: {{val| +0.028 +0.177 -0.445 +0.146 }} | |||
* [[CWE]]: ~2 = 1200.0000{{c}}, ~4536/3125 = 648.2254{{c}} | |||
: error map: {{val| 0.000 +0.133 -0.510 +0.069 }} | |||
{{ | {{Optimal ET sequence|legend=1| 87, 137, 224, 311, 535, 1381c, 1916c }} | ||
[[Badness]]: | [[Badness]] (Sintel): 3.43 | ||
=== 11-limit === | === 11-limit === | ||
| Line 97: | Line 180: | ||
Comma list: 3025/3024, 4000/3993, 65625/65536 | Comma list: 3025/3024, 4000/3993, 65625/65536 | ||
Mapping: | Mapping: {{mapping| 1 -13 -2 39 4 | 0 27 8 -67 -1 }} | ||
Optimal tunings: | |||
* WE: ~2 = 1199.9958{{c}}, ~16/11 = 648.2231{{c}} | |||
* CWE: ~2 = 1200.0000{{c}}, ~16/11 = 648.2254{{c}} | |||
{{Optimal ET sequence|legend=0| 87, 137, 224, 311, 535 }} | |||
Badness: | Badness (Sintel): 1.18 | ||
=== 13-limit === | === 13-limit === | ||
| Line 110: | Line 195: | ||
Comma list: 625/624, 1575/1573, 2080/2079, 2200/2197 | Comma list: 625/624, 1575/1573, 2080/2079, 2200/2197 | ||
Mapping: | Mapping: {{mapping| 1 -13 -2 39 4 1 | 0 27 8 -67 -1 5 }} | ||
Optimal tunings: | |||
* WE: ~2 = 1199.9694{{c}}, ~16/11 = 648.2085{{c}} | |||
* CWE: ~2 = 1200.0000{{c}}, ~16/11 = 648.2251{{c}} | |||
{{Optimal ET sequence|legend=0| 87, 137, 224, 311, 535 }} | |||
Badness: 0. | Badness (Sintel): 0.738 | ||
== Kastro == | == Kastro == | ||
: ''For the 5-limit version, see [[Very high accuracy temperaments #Astro]].'' | |||
Kastro may be described as the {{nowrap| 109 & 118 }} temperament, named by [[Petr Pařízek]] in 2011 as a variation of ''astro''<ref name="petr's long post">[https://yahootuninggroupsultimatebackup.github.io/tuning/topicId_101780.html Yahoo! Tuning Group | ''Suggested names for the unclasified temperaments'']</ref>. | |||
Subgroup: 2.3.5.7 | [[Subgroup]]: 2.3.5.7 | ||
[[Comma list]]: 65625/65536, 117649/116640 | [[Comma list]]: 65625/65536, 117649/116640 | ||
{{Mapping|legend=1| 1 -26 13 -23 | 0 31 -12 29 }} | |||
: mapping generators: ~2, ~6272/3375 | |||
[[ | [[Optimal tuning]]s: | ||
* [[WE]]: ~2 = 1200.1529{{c}}, ~6272/3375 = 1067.9515{{c}} | |||
: [[error map]]: {{val| +0.153 +0.567 +0.256 -1.749 }} | |||
* [[CWE]]: ~2 = 1200.0000{{c}}, ~6272/3375 = 1067.8174{{c}} | |||
: error map: {{val| 0.000 +0.384 -0.122 -2.122 }} | |||
{{ | {{Optimal ET sequence|legend=1| 109, 118, 345d, 463d, 581dd }} | ||
[[Badness]]: | [[Badness]] (Sintel): 4.64 | ||
=== 11-limit === | === 11-limit === | ||
| Line 138: | Line 232: | ||
Comma list: 385/384, 3388/3375, 12005/11979 | Comma list: 385/384, 3388/3375, 12005/11979 | ||
Mapping: | Mapping: {{mapping| 1 -26 13 -23 -9 | 0 31 -12 29 14 }} | ||
Optimal tunings: | |||
* WE: ~2 = 1200.2427{{c}}, ~224/121 = 1068.0296{{c}} | |||
* CWE: ~2 = 1200.0000{{c}}, ~224/121 = 1067.8166{{c}} | |||
{{Optimal ET sequence|legend=0| 109, 118, 345de, 463de, 581dde }} | |||
Badness: | Badness (Sintel): 1.74 | ||
=== 13-limit === | === 13-limit === | ||
| Line 151: | Line 247: | ||
Comma list: 169/168, 364/363, 385/384, 3388/3375 | Comma list: 169/168, 364/363, 385/384, 3388/3375 | ||
Mapping: | Mapping: {{mapping| 1 -26 13 -23 -9 -23 | 0 31 -12 29 14 30 }} | ||
Optimal tunings: | |||
* WE: ~2 = 1200.4303{{c}}, ~13/7 = 1068.2040{{c}} | |||
* CWE: ~2 = 1200.0000{{c}}, ~13/7 = 1067.8267{{c}} | |||
{{Optimal ET sequence|legend=0| 109, 118f, 227f }} | |||
Badness (Sintel): 1.93 | |||
== Bezique == | |||
Bezique splits the octave into 32 equal parts and reaches 3/2, 8/5 and 11/8 in just one generator with the 64-tone mos. A notable edo tuning overshadowed by [[224edo]] is [[320edo]]. Bezique was named by [[Eliora]] in 2023 for the fact that the card game of bezique is played with two packs of 32 cards. | |||
[[Subgroup]]: 2.3.5.7 | |||
[[Comma list]]: 65625/65536, 847288609443/843308032000 | |||
{{Mapping|legend=1| 32 0 125 -113 | 0 1 -1 4 }} | |||
: mapping generators: ~100352/98415, ~3 | |||
[[Optimal tuning]]s: | |||
* [[WE]]: ~100352/98415 = 37.5038{{c}}, ~3/2 = 701.6058{{c}} | |||
: [[error map]]: {{val| +0.120 -0.229 -0.071 +0.154 }} | |||
* [[CWE]]: ~100352/98415 = 37.5000{{c}}, ~3/2 = 701.5544{{c}} | |||
: error map: {{val| 0.000 -0.401 -0.368 -0.108 }} | |||
{{Optimal ET sequence|legend=1| 96d, 224, 544, 768, 1312, 2080bc }} | |||
[[Badness]] (Sintel): 6.82 | |||
=== 11-limit === | |||
Subgroup: 2.3.5.7.11 | |||
Comma list: 9801/9800, 46656/46585, 65625/65536 | |||
Mapping: {{mapping| 32 0 125 -113 60 | 0 1 -1 4 1 }} | |||
Optimal tunings: | |||
* WE: ~45/44 = 37.5025{{c}}, ~3/2 = 701.5912{{c}} | |||
* CWE: ~45/44 = 37.5000{{c}}, ~3/2 = 701.5566{{c}} | |||
= | {{Optimal ET sequence|legend=0| 96d, 224, 544, 768 }} | ||
Badness (Sintel): 2.25 | |||
Subgroup: 2.3.5.7 | === 13-limit === | ||
Subgroup: 2.3.5.7.11.13 | |||
Comma list: 729/728, 1575/1573, 4225/4224, 6656/6655 | |||
Mapping: {{mapping| 32 0 125 -113 60 17 | 0 1 -1 4 1 2 }} | |||
{{ | Optimal tunings: | ||
* WE: ~45/44 = 37.5021{{c}}, ~3/2 = 701.5769{{c}} | |||
* CWE: ~45/44 = 37.5000{{c}}, ~3/2 = 701.5490{{c}} | |||
{{Optimal ET sequence|legend=0| 96d, 224, 544, 768, 1312 }} | |||
Badness (Sintel): 1.23 | |||
== References == | |||
[[Category:Temperament collections]] | |||
[[Category:Temperament | |||
[[Category:Horwell temperaments| ]] <!-- main article --> | [[Category:Horwell temperaments| ]] <!-- main article --> | ||
[[Category:Rank 2]] | [[Category:Rank 2]] | ||
Latest revision as of 15:19, 22 June 2026
- This is a list showing technical temperament data. For an explanation of what information is shown here, you may look at the technical data guide for regular temperaments.
This is a collection of rank-2 horwell temperaments, which temper out the horwell comma (monzo: [-16 1 5 1⟩, ratio: 65625/65536).
Temperaments discussed elsewhere are
- Pontiac (+4375/4374) → Schismatic family
- Keen (+875/864) → Diaschismic family
- Paramity (+1600000/1594323) → Amity family
- Countercata (+5120/5103) → Kleismic family
- Orwell (+1728/1715) → Semicomma family
- Worschmidt (+126/125) → Würschmidt family
- Escaped (+245/243) → Escapade family
- Semabila (+49/48) → Mabila family
- Narayana (+321489/320000) → Vishnu family
- Hemithirds (+1029/1024) → Hemimean clan
- Bisupermajor (+10976/10935) → Hemimage temperaments
- Maquiloid (+686/675) → Maquila family
- Kaboom (+4802000/4782969) → Vavoom family
- Tertiaseptal (+2401/2400) → Breedsmic temperaments
- Eris (+16875/16807) → Canopic clan
- Soviet ferris wheel (+[-5 -9 -5 11⟩) → 20th-octave temperaments
Considered below are fifthplus, mutt, oquatonic, emkay, kastro, and bezique, in the order of increasing badness.
Fifthplus
- For the 5-limit version, see Miscellaneous 5-limit temperaments #Sesesix.
Fifthplus tempers out the wizma in addition to the horwell comma, and may be described as the 22 & 171. The name fifthplus means using a sharp fifth interval (such as a superpyth fifth) as a generator. It is a restriction of prime archagall.
Subgroup: 2.3.5.7
Comma list: 65625/65536, 420175/419904
Mapping: [⟨1 -12 10 -22], ⟨0 23 -13 42]]
- mapping generators: ~2, ~5488/3645
- WE: ~2 = 1200.0934 ¢, ~5488/3645 = 708.8291 ¢
- error map: ⟨+0.093 -0.007 -0.158 -0.059]
- CWE: ~2 = 1200.0000 ¢, ~5488/3645 = 708.7752 ¢
- error map: ⟨0.000 -0.126 -0.391 -0.268]
Optimal ET sequence: 22, 149, 171, 1903c, 2074c, …, 3613ccd
Badness (Sintel): 0.654
Mutt
- For the 5-limit version, see Father–3 equivalence continuum #Mutt (5-limit).
Mutt tempers out the landscape comma in addition to the horwell comma, and may be described as the 84 & 87 temperament.
Subgroup: 2.3.5.7
Comma list: 65625/65536, 250047/250000
Mapping: [⟨3 -2 6 20], ⟨0 7 1 -12]]
- mapping generators: ~63/50, ~5/4
- WE: ~63/50 = 400.0351 ¢, ~5/4 = 385.9974 ¢ (~126/125 = 14.0377 ¢)
- error map: ⟨+0.105 -0.043 -0.105 -0.092]
- CWE: ~63/50 = 400.0000 ¢, ~5/4 = 385.9638 ¢ (~126/125 = 14.0362 ¢)
- error map: ⟨0.000 -0.208 -0.350 -0.392]
Optimal ET sequence: 84, 87, 171
Badness (Sintel): 0.719
11-limit
Subgroup: 2.3.5.7.11
Comma list: 441/440, 4375/4356, 16384/16335
Mapping: [⟨3 -2 6 20 21], ⟨0 7 1 -12 -11]]
Optimal tunings:
- WE: ~44/35 = 399.9783 ¢, ~5/4 = 385.9993 ¢ (~126/125 = 13.9790 ¢)
- CWE: ~44/35 = 400.0000 ¢, ~5/4 = 386.0208 ¢ (~126/125 = 13.9792 ¢)
Optimal ET sequence: 84, 87, 171, 258
Badness (Sintel): 1.93
13-limit
Subgroup: 2.3.5.7.11.13
Comma list: 364/363, 441/440, 625/624, 2200/2197
Mapping: [⟨3 -2 6 20 21 14], ⟨0 7 1 -12 -11 -3]]
Optimal tunings:
- WE: ~44/35 = 399.9610 ¢, ~5/4 = 385.9842 ¢ (~126/125 = 13.9768 ¢)
- CWE: ~44/35 = 400.0000 ¢, ~5/4 = 386.0231 ¢ (~126/125 = 13.9769 ¢)
Optimal ET sequence: 84, 87, 171, 258, 429ef
Badness (Sintel): 1.20
Oquatonic
- For the 5-limit version, see 28th-octave temperaments #Oquatonic (5-limit).
Oquatonic has a period of 1/28 octave and tempers out the horwell (65625/65536) and the dimcomp comma (390625/388962). In this temperament, the 5/4 major third is mapped to 9\28.
The name oquatonic was given by Petr Pařízek in 2011 as an abbreviation of the Italian ottantaquatro ("eighty-four")[1].
Subgroup: 2.3.5.7
Comma list: 65625/65536, 390625/388962
Mapping: [⟨28 0 65 123], ⟨0 1 0 -1]]
- mapping generators: ~128/125, ~3
- WE: ~128/125 = 42.8570 ¢, ~3/2 = 702.1112 ¢
- error map: ⟨-0.004 +0.152 -0.609 +0.477]
- CWE: ~128/125 = 42.8571 ¢, ~3/2 = 702.1132 ¢
- error map: ⟨0.000 +0.158 -0.599 +0.489]
Optimal ET sequence: 28, 56, 84, 140, 224, 364, 588, 952
Badness (Sintel): 2.23
11-limit
Subgroup: 2.3.5.7.11
Comma list: 1375/1372, 6250/6237, 65625/65536
Mapping: [⟨28 0 65 123 230], ⟨0 1 0 -1 -3]]
Optimal tunings:
- WE: ~128/125 = 42.8577 ¢, ~3/2 = 702.0275 ¢
- CWE: ~128/125 = 42.8571 ¢, ~3/2 = 702.0174 ¢
Optimal ET sequence: 84, 140, 224, 364, 588
Badness (Sintel): 1.58
13-limit
Subgroup: 2.3.5.7.11.13
Comma list: 625/624, 1375/1372, 2080/2079, 2200/2197
Mapping: [⟨28 0 65 123 230 148], ⟨0 1 0 -1 -3 -1]]
Optimal tunings:
- WE: ~40/39 = 42.8571 ¢, ~3/2 = 702.0289 ¢
- CWE: ~40/39 = 42.8571 ¢, ~3/2 = 702.0288 ¢
Optimal ET sequence: 84, 140, 224, 364, 588
Badness (Sintel): 0.908
Emkay
- For the 5-limit version, see Miscellaneous 5-limit temperaments #Emka.
Emkay may be described as the 87 & 224 temperament. It tempers out the same 5-limit comma as the emka (37 & 50), but with the horwell comma (65625/65536) rather than the hemimean comma (3136/3125) tempered out.
Subgroup: 2.3.5.7
Comma list: 65625/65536, 244140625/243045684
Mapping: [⟨1 -13 -2 39], ⟨0 27 8 -67]]
- mapping generators: ~2, ~4536/3125
- WE: ~2 = 1200.0279 ¢, ~4536/3125 = 648.2405 ¢
- error map: ⟨+0.028 +0.177 -0.445 +0.146]
- CWE: ~2 = 1200.0000 ¢, ~4536/3125 = 648.2254 ¢
- error map: ⟨0.000 +0.133 -0.510 +0.069]
Optimal ET sequence: 87, 137, 224, 311, 535, 1381c, 1916c
Badness (Sintel): 3.43
11-limit
Subgroup: 2.3.5.7.11
Comma list: 3025/3024, 4000/3993, 65625/65536
Mapping: [⟨1 -13 -2 39 4], ⟨0 27 8 -67 -1]]
Optimal tunings:
- WE: ~2 = 1199.9958 ¢, ~16/11 = 648.2231 ¢
- CWE: ~2 = 1200.0000 ¢, ~16/11 = 648.2254 ¢
Optimal ET sequence: 87, 137, 224, 311, 535
Badness (Sintel): 1.18
13-limit
Subgroup: 2.3.5.7.11.13
Comma list: 625/624, 1575/1573, 2080/2079, 2200/2197
Mapping: [⟨1 -13 -2 39 4 1], ⟨0 27 8 -67 -1 5]]
Optimal tunings:
- WE: ~2 = 1199.9694 ¢, ~16/11 = 648.2085 ¢
- CWE: ~2 = 1200.0000 ¢, ~16/11 = 648.2251 ¢
Optimal ET sequence: 87, 137, 224, 311, 535
Badness (Sintel): 0.738
Kastro
- For the 5-limit version, see Very high accuracy temperaments #Astro.
Kastro may be described as the 109 & 118 temperament, named by Petr Pařízek in 2011 as a variation of astro[1].
Subgroup: 2.3.5.7
Comma list: 65625/65536, 117649/116640
Mapping: [⟨1 -26 13 -23], ⟨0 31 -12 29]]
- mapping generators: ~2, ~6272/3375
- WE: ~2 = 1200.1529 ¢, ~6272/3375 = 1067.9515 ¢
- error map: ⟨+0.153 +0.567 +0.256 -1.749]
- CWE: ~2 = 1200.0000 ¢, ~6272/3375 = 1067.8174 ¢
- error map: ⟨0.000 +0.384 -0.122 -2.122]
Optimal ET sequence: 109, 118, 345d, 463d, 581dd
Badness (Sintel): 4.64
11-limit
Subgroup: 2.3.5.7.11
Comma list: 385/384, 3388/3375, 12005/11979
Mapping: [⟨1 -26 13 -23 -9], ⟨0 31 -12 29 14]]
Optimal tunings:
- WE: ~2 = 1200.2427 ¢, ~224/121 = 1068.0296 ¢
- CWE: ~2 = 1200.0000 ¢, ~224/121 = 1067.8166 ¢
Optimal ET sequence: 109, 118, 345de, 463de, 581dde
Badness (Sintel): 1.74
13-limit
Subgroup: 2.3.5.7.11.13
Comma list: 169/168, 364/363, 385/384, 3388/3375
Mapping: [⟨1 -26 13 -23 -9 -23], ⟨0 31 -12 29 14 30]]
Optimal tunings:
- WE: ~2 = 1200.4303 ¢, ~13/7 = 1068.2040 ¢
- CWE: ~2 = 1200.0000 ¢, ~13/7 = 1067.8267 ¢
Optimal ET sequence: 109, 118f, 227f
Badness (Sintel): 1.93
Bezique
Bezique splits the octave into 32 equal parts and reaches 3/2, 8/5 and 11/8 in just one generator with the 64-tone mos. A notable edo tuning overshadowed by 224edo is 320edo. Bezique was named by Eliora in 2023 for the fact that the card game of bezique is played with two packs of 32 cards.
Subgroup: 2.3.5.7
Comma list: 65625/65536, 847288609443/843308032000
Mapping: [⟨32 0 125 -113], ⟨0 1 -1 4]]
- mapping generators: ~100352/98415, ~3
- WE: ~100352/98415 = 37.5038 ¢, ~3/2 = 701.6058 ¢
- error map: ⟨+0.120 -0.229 -0.071 +0.154]
- CWE: ~100352/98415 = 37.5000 ¢, ~3/2 = 701.5544 ¢
- error map: ⟨0.000 -0.401 -0.368 -0.108]
Optimal ET sequence: 96d, 224, 544, 768, 1312, 2080bc
Badness (Sintel): 6.82
11-limit
Subgroup: 2.3.5.7.11
Comma list: 9801/9800, 46656/46585, 65625/65536
Mapping: [⟨32 0 125 -113 60], ⟨0 1 -1 4 1]]
Optimal tunings:
- WE: ~45/44 = 37.5025 ¢, ~3/2 = 701.5912 ¢
- CWE: ~45/44 = 37.5000 ¢, ~3/2 = 701.5566 ¢
Optimal ET sequence: 96d, 224, 544, 768
Badness (Sintel): 2.25
13-limit
Subgroup: 2.3.5.7.11.13
Comma list: 729/728, 1575/1573, 4225/4224, 6656/6655
Mapping: [⟨32 0 125 -113 60 17], ⟨0 1 -1 4 1 2]]
Optimal tunings:
- WE: ~45/44 = 37.5021 ¢, ~3/2 = 701.5769 ¢
- CWE: ~45/44 = 37.5000 ¢, ~3/2 = 701.5490 ¢
Optimal ET sequence: 96d, 224, 544, 768, 1312
Badness (Sintel): 1.23