Gamelismic clan: Difference between revisions

The [[2.3.7 subgroup|2.3.7-subgroup]] [[comma]] for the '''gamelismic clan''' is the gamelisma, [[1029/1024]], with [[monzo]] {{monzo| -10 1 0 3 }}. For any member of the clan, for the rank-3 [[gamelismic family #Gamelismic|gamelismic temperament]] itself, and for the rank-2 2.3.7 temperament [[slendric]] (a.k.a. gamelic), this means three [[~]][[8/7]] intervals give a fifth, [[3/2]]. In fact, we find that {{nowrap|3/2 {{=}} (8/7)³ × 1029/1024}}. From this it follows that gamelismic temperaments tend to flatten both the fifth and the harmonic seventh, or if they do not, the other of the pair must be flattened even more. [[36edo]] is a good tuning for slendric, though if the full 7-limit is desired, [[72edo]], [[77edo]], or [[118edo]] might be preferred.

* ''[[Echidnic]]'' (+686/675} → [[Diaschismic family #Echidnic|Diaschismic family]]

* [[Blackwood]] (+28/27) → [[Limmic temperaments #Blackwood|Limmic temperaments]]

* ''[[Trismegistus]]'' (+3125/3072) → [[Magic family #Trismegistus|Magic family]]

No-five subgroup extensions of slendric include radon, a 2.3.7.11 extension that may be viewed as no-five rodan, and baladic, a 2.3.7.13.17 extension, considered below. Dicussed elsewhere is [[No-fives subgroup temperaments #Gigapyth|gigapyth]] in the 2.3.7.85 subgroup.  

== Slendric ==

{{Main| Slendric }}

[[Subgroup]]: 2.3.7

[[Comma list]]: 1029/1024

: sval mapping generators: ~2, ~8/7

{{Mapping|legend=3| 1 1 0 3 | 0 3 0 -1 }}

: [[gencom]]: [2 8/7; 1029/1024]

: [[error map]]: {{val| 0.000 -0.288 -2.715 }}

* [[POTE]]: ~2 = 1200.000, ~8/7 = 233.688

: error map: {{val| 0.000 -0.892 -2.513 }}

=== Euslendric ===

Forms of slendric in the most optimal range for the 2.3.7 temperament (36 & 77) lack an obvious strong mapping of prime 5 or prime 11. However, slendric can extend well to the no-fives no-elevens [[29-limit]] by tempering out [[273/272]], [[343/342]], [[378/377]], [[392/391]], [[513/512]], and [[729/728]], or a comma basis defined in terms of [[S-expression]]s as {S7/S8, S14/S16, S15/S20, S24/S26, S27, S28}. [[113edo]] is an obvious tuning.

==== 2.3.7.13 ====

[[Subgroup]]: 2.3.7.13

[[Comma list]]: 729/728, 1029/1024

[[Mapping|Sval mapping]]: [{{val|1 1 3 0}}, {{val|0 3 -1 19}}]

[[Optimal tuning]]s:  

* [[CTE]]: ~2/1 = 1200.000, ~8/7 = 233.734

* [[POTE]]: ~2/1 = 1200.000, ~8/7 = 233.622

{{Optimal ET sequence|legend=1| 5, ..., 31f, 36, 77, 113 }}

Badness (Dirichlet): 0.339

==== 2.3.7.13.17 ====

Subgroup: 2.3.7.13.17

Comma list: 273/272, 729/728, 833/832

Sval mapping: [{{val|1 1 3 0 0}}, {{val|0 3 -1 19 21}}]

Optimal tunings:

* [[CTE]]: ~2/1 = 1200.000, ~8/7 = 233.657

* [[POTE]]: ~2/1 = 1200.000, ~8/7 = 233.546

{{Optimal ET sequence|legend=1| 5g, ..., 31fg, 36, 113, 149 }}

Badness (Dirichlet): 0.332

Subgroup: 2.3.7.13.17.19

Comma list: 273/272, 343/342, 513/512, 729/728

Sval mapping: [{{val|1 1 3 0 0 6}}, {{val|0 3 -1 19 21 -9}}]

* [[CTE]]: ~2/1 = 1200.000, ~8/7 = 233.657

* [[POTE]]: ~2/1 = 1200.000, ~8/7 = 233.601

{{Optimal ET sequence|legend=1| 5g, ..., 36, 77, 113 }}

Badness (Dirichlet): 0.380

==== 2.3.7.13.17.19.23 ====

Subgroup: 2.3.7.13.17.19.23

Comma list: 273/272, 343/342, 392/391, 513/512, 729/728

Sval mapping: [{{val|1 1 3 0 0 6 9}}, {{val|0 3 -1 19 21 -9 -23}}]

* [[CTE]]: ~2/1 = 1200.000, ~8/7 = 233.624

* [[POTE]]: ~2/1 = 1200.000, ~8/7 = 233.607

{{Optimal ET sequence|legend=1| 5gi, ..., 36, 77, 113 }}

Badness (Dirichlet): 0.474

==== 2.3.7.13.17.19.23.29 ====

Subgroup: 2.3.7.13.17.19.23.29

Comma list: 273/272, 343/342, 378/377, 392/391, 513/512, 609/608

Sval mapping: [{{val|1 1 3 0 0 6 9 7}}, {{val|0 3 -1 19 21 -9 -23 -11}}]

* [[CTE]]: ~2/1 = 1200.000, ~8/7 = 233.626

* [[POTE]]: ~2/1 = 1200.000, ~8/7 = 233.620

{{Optimal ET sequence|legend=1| 5gi, ..., 36, 77, 113 }}

Badness (Dirichlet): 0.473

=== Radon ===

Radon is the no-fives version of [[rodan]], equating the diatonic major third to [[14/11]].

[[Subgroup]]: 2.3.7.11

[[Comma list]]: 896/891, 1029/1024

{{Mapping|legend=2| 1 1 3 6 | 0 3 -1 -13 }}

{{Mapping|legend=3| 1 1 0 3 6 | 0 3 0 -1 -13 }}

: [[gencom]]: [2 8/7; 896/891 1029/1024]

[[Optimal tuning]]s:  

* [[CTE]]: ~2 = 1200.000, ~8/7 = 234.384

: [[error map]]: {{val| 0.000 +1.197 -3.210 +1.691 }}

* [[POTE]]: ~2 = 1200.000, ~8/7 = 234.381

: error map: {{val| 0.000 +1.187 -3.206 +1.735 }}

Baladic is a 2.3.7.13.17 subgroup temperament that attempts to approximate the Maqam Sikah Baladi scale. It tempers out {{S|13}} = [[169/168]], which splits [[7/6]] in half ([[13/12]]~[[14/13]]) and one finds that the octave is therefore split in half via the interval [[91/64]], which is then equated to [[17/12]]. 36edo is an excellent baladic tuning.

==== 2.3.7.13 ====

[[Subgroup]]: 2.3.7.13

[[Comma list]]: 169/168, 1029/1024

[[Mapping|Sval mapping]]: [{{val|2 2 6 7}}, {{val|0 3 -1 1}}]

: sval mapping generators: ~91/64, ~8/7

[[Optimal tuning]]s:  

* [[Tp tuning|POL2]]: ~91/64 = 600.0000, ~8/7 = 233.6044

{{Optimal ET sequence|legend=1| 10, 26, 36, 154f, 190ff, 226ff, 262dfff }}

[[Tp tuning #T2 tuning|RMS error]]: 0.5452 cents

==== 2.3.7.13.17 ====

[[Comma list]]: 169/168, 273/272, 289/288

{{Mapping|legend=2| 2 2 6 7 7 | 0 3 -1 1 3 }}

: sval mapping generators: ~17/12, ~8/7

[[Optimal tuning]]s:  

* [[CTE]]: ~17/12 = 600.000, ~8/7 = 234.138

* [[POTE]]: ~17/12 = 600.000, ~8/7 = 233.616

{{Optimal ET sequence|legend=1| 10, 26, 36, 154f, 190ffg, 226ffg }}

{{main|Mothra}}

Mothra tempers out [[81/80]] and finds the prime 5 at a stack of four fifths as does any temperament in the [[meantone family]]. It also tempers out [[1728/1715]], the orwellisma. It can be described as the {{nowrap|26 &amp; 31}}. Using [[31edo]] with a generator of 6/31 is an excellent tuning choice. However, a pure mos mothra scale is often described as directionless and has limited chord-building potential<ref>[https://www.youtube.com/watch?v=uH3ahBzDSrs 31-EDO Music Theory: Supermajor Hexatonic Scale] by [[Zhea Erose]]</ref>, so something other than a mos may be used as a scale to get the most out of mothra. There are examples of non-mos mothra scales in 31edo [[Strictly proper 7-tone 31edo scales|in the article on strictly proper 7-tone 31edo scales]].  

Note that mothra is also called '''cynder''' in the 7-limit, which can be a little confusing sometimes.  

Its [[S-expression]]-based comma list is {[[1728/1715|S6/S7]], [[1029/1024|S7/S8]](, [[81/80|S6/S8 = S9]])}, taking advantage of the fact that [[81/80]] is a [[semiparticular]].

[[Subgroup]]: 2.3.5.7

[[Comma list]]: 81/80, 1029/1024

{{Mapping|legend=1| 1 1 0 3 | 0 3 12 -1 }}

: mapping generators: ~2, ~8/7

* [[CTE]]: ~2 = 1200.000, ~8/7 = 232.400

* [[POTE]]: ~2 = 1200.000, ~8/7 = 232.193

: error map: {{val| 0.000 -5.375 +0.005 -1.019 }}

[[Algebraic generator]]: Rabrindanath, largest real root of ''x''⁸ - 3''x''² + 1, or 232.0774 cents.

[[Minimax tuning]]:  

* [[7-odd-limit|7-]] and [[9-odd-limit]]: ~8/7 = {{monzo| 0 0 1/12 }}

: [{{monzo| 1 0 0 0 }}, {{monzo| 1 0 1/4 0 }}, {{monzo| 0 0 1 0 }}, {{monzo| 3 0 -1/12 0 }}]

{{Optimal ET sequence|legend=1| 5, 21c, 26, 31 }}

[[Badness]] (Smith): 0.037146

Badness (Dirichlet): 0.940

=== Undecimal mothra ===

Undecimal mothra is the extension of 7-limit cynder which tempers out 385/384 as is natural in slendric temperaments. It is the simplest extension, supported within a reasonable tuning range (between [[26edo]] and [[31edo]]), and is supported by the patent val of [[5edo]], which implies that it is better behaved as a cluster temperament. It is also notable for being supported by the just tuning of 8/7, and has a restriction to the 2.7.11 subgroup, namely [[amaranthine]], that is a microtemperament.

Subgroup: 2.3.5.7.11

 

Mapping: {{mapping| 1 1 0 3 5 | 0 3 12 -1 -8 }}

* CTE: ~2 = 1200.000, ~8/7 = 232.203

* POTE: ~2 = 1200.000, ~8/7 = 232.031

{{Optimal ET sequence|legend=0| 5, 26, 31, 88, 119be, 150be }}

Badness (Smith): 0.025642

 

==== 13-limit ====

Subgroup: 2.3.5.7.11.13

Comma list: 81/80, 99/98, 105/104, 144/143

Mapping: {{mapping| 1 1 0 3 5 1 | 0 3 12 -1 -8 14 }}

Optimal tunings:  

* CTE: ~2 = 1200.000, ~8/7 = 231.993

* POTE: ~2 = 1200.000, ~8/7 = 231.811

{{Optimal ET sequence|legend=0| 5, 26, 31, 57, 88 }}

Badness (Smith): 0.023954

Badness (Dirichlet): 0.990

* ''Prelude for solo piano'' (2014) by [[Chris Vaisvil]] – [https://web.archive.org/web/20201127013310/http://micro.soonlabel.com/16-ET/mothra/20141028_mothra16br4.mp3 play] | [https://www.chrisvaisvil.com/prelude-for-solo-piano-in-mothra16-brat-4-tuning/ blog] – in Mothra[16], brat 4 tuning

==== 17-limit ====

Comma list: 81/80, 99/98, 105/104, 120/119, 144/143

Mapping: {{mapping| 1 1 0 3 5 1 | 0 3 12 -1 -8 14 16 }}

* CTE: ~2 = 1200.000, ~8/7 = 231.891

* POTE: ~2 = 1200.000, ~8/7 = 231.708

{{Optimal ET sequence|legend=0| 5g, 26, 31, 57, 88 }}

Badness (Dirichlet): 1.001

==== 19-limit ====

Comma list: 81/80, 99/98, 105/104, 120/119, 144/143, 153/152

Mapping: {{mapping| 1 1 0 3 5 1 | 0 3 12 -1 -8 14 16 22 }}

Optimal tunings:  

* CTE: ~2 = 1200.000, ~8/7 = 231.837

* POTE: ~2 = 1200.000, ~8/7 = 231.653

{{Optimal ET sequence|legend=0| 5gh, 26, 31, 57 }}

Badness (Dirichlet): 1.053

The [[S-expression]]-based comma list of mosura suggests it might be the most natural extension of 7-limit cynder to the 11-limit: {[[1728/1715|S6/S7]], [[1029/1024|S7/S8]], ([[81/80|S6/S8 = S9]],) [[176/175|S8/S10]]}.

Subgroup: 2.3.5.7.11

Comma list: 81/80, 176/175, 540/539

Mapping: {{mapping| 1 1 0 3 -1 | 0 3 12 -1 23 }}

* CTE: ~2 = 1200.000, ~8/7 = 232.557

* POTE: ~2 = 1200.000, ~8/7 = 232.419

{{Optimal ET sequence|legend=0| 5e, 26e, 31, 129 }}

Badness (Smith): 0.031334

Badness (Dirichlet): 1.036

==== 13-limit ====

Comma list: 81/80, 144/143, 176/175, 196/195

Mapping: {{mapping| 1 1 0 3 -1 7 | 0 3 12 -1 23 -17 }}

* CTE: ~2 = 1200.000, ~8/7 = 232.635

* POTE: ~2 = 1200.000, ~8/7 = 232.640

{{Optimal ET sequence|legend=0| 31, 67, 98 }}

Badness (Smith): 0.036857

Badness (Dirichlet): 1.523

Subgroup: 2.3.5.7.11.13.17

 

Mapping: {{mapping| 1 1 0 3 -1 7 | 0 3 12 -1 23 -17 -15 }}

* CTE: ~2 = 1200.000, ~8/7 = 232.681

* POTE: ~2 = 1200.000, ~8/7 = 232.693

{{Optimal ET sequence|legend=0| 31, 67, 98 }}

Badness (Dirichlet): 1.527

==== 19-limit ====

Subgroup: 2.3.5.7.11.13.17.19

Comma list: 81/80, 96/95, 144/143, 153/152, 176/175, 196/195

Mapping: {{mapping| 1 1 0 3 -1 7 | 0 3 12 -1 23 -17 -15 -9 }}

* CTE: ~2 = 1200.000, ~8/7 = 232.717

* POTE: ~2 = 1200.000, ~8/7 = 232.730

{{Optimal ET sequence|legend=0| 31, 67, 98h }}

Badness (Dirichlet): 1.496

=== Cyndra ===

Comma list: 45/44, 81/80, 1029/1024

Mapping: {{mapping| 1 1 0 3 0 | 0 3 12 -1 18 }}

* CTE: ~2 = 1200.000, ~8/7 = 231.566

* POTE: ~2 = 1200.000, ~8/7 = 231.317

{{Optimal ET sequence|legend=0| 5e, 21ce, 26 }}

Badness (Smith): 0.055706

Comma list: 45/44, 78/77, 81/80, 640/637

Mapping: {{mapping| 1 1 0 3 0 1 | 0 3 12 -1 18 14 }}

* CTE: ~2 = 1200.000, ~8/7 = 231.546

* POTE: ~2 = 1200.000, ~8/7 = 231.293

{{Optimal ET sequence|legend=0| 5e, 21cef, 26 }}

Badness (Smith): 0.034124

== Rodan ==

: ''For the 5-limit version, see [[Syntonic–diatonic equivalence continuum #Rodan (5-limit)]].''

 

Rodan tempers out 245/243 and can be described as the {{nowrap|41 &amp; 46}} temperament. This temperament extends neatly to the 13-limit, though the perfect fifth is sharper than ideal for slendric.  

[[Comma list]]: 245/243, 1029/1024

{{Mapping|legend=1| 1 1 -1 3 | 0 3 17 -1 }}

* [[CTE]]: ~2 = 1200.000, ~8/7 = 234.450

: [[error map]]: {{val| 0.000 +1.396 -0.660 -3.276 }}

* [[POTE]]: ~2 = 1200.000, ~8/7 = 234.417

: error map: {{val| 0.000 +1.295 -1.229 -3.243 }}

[[Minimax tuning]]:  

* [[7-odd-limit|7-]] and [[9-odd-limit]]: ~8/7 = {{monzo| 2/9 0 1/18 -1/18 }}

: {{monzo list| 1 0 0 0 | 5/3 0 1/6 -1/6 | 25/9 0 17/18 -17/18 | 25/9 0 -1/18 1/18 }}

: [[eigenmonzo basis|unchanged-interval (eigenmonzo) basis]]: 2.7/5

[[Algebraic generator]]: larger root of 20''x''² - 36''x'' + 15, or (9 + √6)/10.

 

[[Badness]] (Smith): 0.037112

Comma list: 245/243, 385/384, 441/440

Mapping: {{mapping| 1 1 -1 3 6 | 0 3 17 -1 -13 }}

* CTE: ~2 = 1200.000, ~8/7 = 234.463

* POTE: ~2 = 1200.000, ~8/7 = 234.459

Minimax tuning:  

* 11-odd-limit: ~8/7 = {{monzo| 4/19 2/19 0 0 -1/19 }}

: [{{monzo| 1 0 0 0 0 }}, {{monzo| 31/19 6/19 0 0 -3/19 }}, {{monzo| 49/19 34/19 0 0 -17/19 }}, {{monzo| 53/19 -2/19 0 0 1/19 }}, {{monzo| 62/19 -26/19 0 0 13/19 }}]

: unchanged-interval (eigenmonzo) basis: 2.11/9

Algebraic generator: positive root of ''x''² + 16''x'' - 31, or √95 - 8.

{{Optimal ET sequence|legend=0| 41, 87 }}

 

==== 13-limit ====

Comma list: 196/195, 245/243, 352/351, 364/363

Mapping: {{mapping| 1 1 -1 3 6 8 | 0 3 17 -1 -13 -22 }}

* CTE: ~2 = 1200.000, ~8/7 = 234.482

* POTE: ~2 = 1200.000, ~8/7 = 234.482

: unchanged-interval (eigenmonzo) basis: 2.13/9

Algebraic generator: Gatetone, positive root of 4''x''⁶ - 7''x'' - 1. Recurrence converges slowly.

{{Optimal ET sequence|legend=0| 41, 46, 87 }}

Badness (Smith): 0.018448

Subgroup: 2.3.5.7.11.13.17

Comma list: 154/153, 196/195, 245/243, 256/255, 273/272

Mapping: {{mapping| 1 1 -1 3 6 8 8 | 0 3 17 -1 -13 -22 -20 }}

Optimal tunings:  

* CTE: ~2 = 1200.000, ~8/7 = 234.532

* POTE: ~2 = 1200.000, ~8/7 = 234.524

* 17-odd-limit: ~8/7 = {{monzo| 3/13 1/13 0 0 0 0 -1/26 }}

Badness (Smith): 0.016743

Subgroup: 2.3.5.7.11.13

 

Mapping: {{mapping| 1 1 -1 3 6 -1 | 0 3 17 -1 -13 24 }}

* CTE: ~2 = 1200.000, ~8/7 = 234.670

* POTE: ~2 = 1200.000, ~8/7 = 234.639

{{Optimal ET sequence|legend=0| 5, 41f, 46 }}

Badness (Smith): 0.033986

=== Aerodino ===

Subgroup: 2.3.5.7.11

Comma list: 176/175, 245/243, 1029/1024

Mapping: {{mapping| 1 1 -1 3 -3 | 0 3 17 -1 33 }}

* CTE: ~2 = 1200.000, ~8/7 = 234.719

* POTE: ~2 = 1200.000, ~8/7 = 234.728

{{Optimal ET sequence|legend=0| 5e, 41e, 46 }}

Badness (Smith): 0.054294

==== 13-limit ====

Subgroup: 2.3.5.7.11.13

Comma list: 91/90, 176/175, 245/243, 847/845

Mapping: {{mapping| 1 1 -1 3 -3 -1 | 0 3 17 -1 33 24 }}

* CTE: ~2 = 1200.000, ~8/7 = 234.786

* POTE: ~2 = 1200.000, ~8/7 = 234.782

{{Optimal ET sequence|legend=0| 5e, 41ef, 46 }}

Badness (Smith): 0.035836

=== Varan ===

Subgroup: 2.3.5.7.11

Comma list: 100/99, 245/243, 1029/1024

Mapping: {{mapping| 1 1 -1 3 -2 | 0 3 17 -1 28 }}

* CTE: ~2 = 1200.000, ~8/7 = 234.197

* POTE: ~2 = 1200.000, ~8/7 = 234.145

{{Optimal ET sequence|legend=0| 5e, 36ce, 41 }}

Badness (Smith): 0.044937

Subgroup: 2.3.5.7.11.13

Comma list: 100/99, 105/104, 245/243, 352/351

Mapping: {{mapping| 1 1 -1 3 -2 0 | 0 3 17 -1 28 19 }}

Optimal tunings:  

* CTE: ~2 = 1200.000, ~8/7 = 234.111

* POTE: ~2 = 1200.000, ~8/7 = 234.089

{{Optimal ET sequence|legend=0| 5e, 36ce, 41 }}

Badness (Smith): 0.032284

== Guiron ==

Guiron tempers out the [[schisma]], and finds the prime 5 at the diminished fourth as does any temperament in the [[schismatic family]]. It can be described as the {{nowrap|36 &amp; 41}} temperament. It is more complex than rodan, but the optimal tuning is closer to optimal slendric.  

[[Subgroup]]: 2.3.5.7

[[Comma list]]: 1029/1024, 10976/10935

{{Mapping|legend=1| 1 1 7 3 | 0 3 -24 -1 }}

[[Optimal tuning]]s:  

* [[CTE]]: ~2 = 1200.000, ~8/7 = 233.903

: [[error map]]: {{val| 0.000 -0.246 +0.012 -2.729 }}

* [[POTE]]: ~2 = 1200.000, ~8/7 = 233.930

[[Minimax tuning]]:

* [[7-odd-limit|7-]] and [[9-odd-limit]]: ~8/7 = {{monzo| 7/24 0 -1/24 }}

{{Optimal ET sequence|legend=1| 36, 41, 77, 118, 277d }}

[[Badness]] (Smith): 0.047544

=== 11-limit ===

Comma list: 385/384, 441/440, 10976/10935

Mapping: {{mapping| 1 1 7 3 -2 | 0 3 -24 -1 28 }}

Optimal tunings:  

* CTE: ~2 = 1200.000, ~8/7 = 233.930

* POTE: ~2 = 1200.000, ~8/7 = 233.931

* 11-odd-limit: ~8/7 = {{monzo| 7/24 0 -1/24 }}

: [{{monzo| 1 0 0 0 0 }}, {{monzo| 15/8 0 -1/8 0 0 }}, {{monzo| 0 0 1 0 0 }}, {{monzo| 65/24 0 1/24 0 0 }}, {{monzo| 37/6 0 -7/6 0 0 }}]

{{Optimal ET sequence|legend=0| 36e, 41, 77, 118, 159, 277d }}

Badness (Smith): 0.026648

=== 13-limit ===

Comma list: 196/195, 352/351, 385/384, 729/728

Mapping: {{mapping| 1 1 7 3 -2 0 | 0 3 -24 -1 28 19 }}

: mapping generators: ~2, ~8/7

Optimal tunings:  

* CTE: ~2 = 1200.000, ~8/7 = 233.902

* POTE: ~2 = 1200.000, ~8/7 = 233.899

{{Optimal ET sequence|legend=0| 36e, 41, 77, 118 }}

Badness (Smith): 0.028444

== Gorgo ==

: ''For the 5-limit version, see [[Syntonic–diatonic equivalence continuum #Laconic]].''

Gorgo tempers the generator of ~8/7 together with ~10/9. It can be described as the {{nowrap|16 &amp; 21}} temperament.  

If we discard the inaccurate mapping of prime 3, we get [[shoe]], so that the large commas of gorgo are explained practically entirely by the inaccurate 3, meaning that this temperament is much more accurate than its comma list suggests.

[[Subgroup]]: 2.3.5.7

[[Comma list]]: 36/35, 1029/1024

{{Mapping|legend=1| 1 1 1 3 | 0 3 7 -1 }}

[[Optimal tuning]]s:  

: error map: {{val| 0.000 -16.954 +12.022 +2.840 }}

{{Optimal ET sequence|legend=1| 5, 11c, 16, 21 }}

[[Badness]] (Smith): 0.060663

Subgroup: 2.3.5.7.11

Comma list: 36/35, 45/44, 1029/1024

Mapping: {{mapping| 1 1 1 3 1 | 0 3 7 -1 13 }}

Optimal tunings:  

* CTE: ~2 = 1200.000, ~8/7 = 227.833

* POTE: ~2 = 1200.000, ~8/7 = 227.373

{{Optimal ET sequence|legend=0| 5e, 16, 21, 37b }}

 

Badness (Smith): 0.049500

==== 13-limit ====

Subgroup: 2.3.5.7.11.13

Comma list: 27/26, 36/35, 45/44, 507/500

Mapping: {{mapping| 1 1 1 3 1 2 | 0 3 7 -1 13 9 }}

Optimal tunings:  

* POTE: ~2 = 1200.000, ~8/7 = 227.230

{{Optimal ET sequence|legend=0| 5e, 16, 21, 37b }}

 

 

=== Spartan ===

Comma list: 36/35, 56/55, 1029/1024

Mapping: {{mapping| 1 1 1 3 5 | 0 3 7 -1 -8 }}

* CTE: ~2 = 1200.000, ~8/7 = 229.420

* POTE: ~2 = 1200.000, ~8/7 = 229.535

{{Optimal ET sequence|legend=0| 5, 16e, 21 }}

Badness (Smith): 0.062683

==== 13-limit ====

Comma list: 27/26, 36/35, 56/55, 507/500

Mapping: {{mapping| 1 1 1 3 5 2 | 0 3 7 -1 -8 9 }}

* CTE: ~2 = 1200.000, ~8/7 = 228.758

* POTE: ~2 = 1200.000, ~8/7 = 229.059

{{Optimal ET sequence|legend=0| 5, 16e, 21 }}

Badness (Smith): 0.047071

* [https://web.archive.org/web/20201127012514/http://clones.soonlabel.com/public/micro/gene_ward_smith/Others/Herman/gorgo-example.mp3 ''Gorgo Example''] by [[Herman Miller]]

: ''For the 5-limit version, see [[Syntonic–diatonic equivalence continuum #University]].''

Gidorah is a very low-accuracy temperament where the generator of ~8/7 is lumped together with ~6/5. 16c-, 21cc-, and 26ccc-edo are among the possible tunings.

[[Subgroup]]: 2.3.5.7

[[Comma list]]: 21/20, 144/125

{{Mapping|legend=1| 1 1 2 3 | 0 3 2 -1 }}

* [[CTE]]: ~2 = 1200.000, ~8/7 = 227.100