Ragismic microtemperaments: Difference between revisions

The ragisma is [[4375/4374]] with a [[monzo]] of {{monzo| -1 -7 4 1 }}, the smallest 7-limit [[superparticular]] ratio. Since (10/9)⁴ = 4375/4374 × 32/21, the minor tone 10/9 tends to be an interval of relatively low [[complexity]] in temperaments tempering out the ragisma, though when looking at [[microtemperament]]s the word "relatively" should be emphasized. Even so mitonic uses it as a generator, which ennealimmal and enneadecal can do also, and amity reaches it in three generators. We also have 7/6 = 4375/4374 × (27/25)², so 27/25 also tends to relatively low complexity, with the same caveat about "relatively"; however 27/25 is the period for ennealimmal.

* ''[[Hystrix]]'', {36/35, 160/147} → [[Porcupine family #Hystrix|Porcupine family]]

* ''[[Rhinoceros]]'', {49/48, 4375/4374} → [[Unicorn family #Rhinoceros|Unicorn family]]

* ''[[Crepuscular]]'', {50/49, 4375/4374} → [[Jubilismic clan #Crepuscular|Jubilismic clan]] and [[Fifive family #Crepuscular|Fifive family]]

* ''[[Modus]]'', {64/63, 4375/4374} → [[Tetracot family #Modus|Tetracot family]]

* ''[[Flattone]]'', {81/80, 525/512} → [[Meantone family #Flattone|Meantone family]]

* [[Sensi]], {126/125, 245/243} → [[Sensipent family #Sensi|Sensipent family]] and [[Sensamagic clan #Sensi|Sensamagic clan]]

* [[Catakleismic]], {225/224, 4375/4374} → [[Kleismic family #Catakleismic|Kleismic family]]

* [[Unidec]], {1029/1024, 4375/4374} → [[Gamelismic clan #Unidec|Gamelismic clan]]

* ''[[Quartonic]]'', {1728/1715, 4000/3969} → [[Orwellismic temperaments #Quartonic|Orwellismic temperaments]]

* ''[[Srutal]]'', {2048/2025, 4375/4374} → [[Diaschismic family #Srutal|Diaschismic family]]

* ''[[Maja]]'', {2430/2401, 3125/3087} → [[Maja family #Septimal maja|Maja family]]

* [[Amity]], {4375/4374, 5120/5103} → [[Amity family #Septimal amity|Amity family]]

* [[Pontiac]], {4375/4374, 32805/32768} → [[Schismatic family #Pontiac|Schismatic family]]

* ''[[Zarvo]]'', {4375/4374, 33075/32768} → [[Gravity family #Zarvo|Gravity family]]

* ''[[Whirrschmidt]]'', {4375/4374, 393216/390625} → [[Würschmidt family #Whirrschmidt|Würschmidt family]]

* ''[[Mitonic]]'', {4375/4374, 2100875/2097152} → [[Minortonic family #Mitonic|Minortonic family]]

* ''[[Vishnu]]'', {4375/4374, 29360128/29296875} → [[Vishnuzmic family #Septimal vishnu|Vishnuzmic family]]

* ''[[Vulture]]'', {4375/4374, 33554432/33480783} → [[Vulture family #Septimal vulture|Vulture family]]

* ''[[Trillium]]'', {4375/4374, {{monzo| 40 -22 -1 -1 }}} → [[Tricot family #Trillium|Tricot family]]

* ''[[Unlit]]'', {4375/4374, {{monzo| 41 -20 -4 }}} → [[Undim family #Unlit|Undim family]]

* ''[[Dzelic]]'', {4375/4374, {{monzo|-223 47 -11 62}}} → [[37th-octave temperaments#Dzelic|37th-octave temperaments]]

Microtemperaments considered below are ennealimmal, supermajor, enneadecal, semidimi, brahmagupta, abigail, gamera, orga, chlorine, seniority, monzismic, semidimfourth, acrokleismic, quasithird, deca, keenanose, aluminium, quatracot, moulin, and palladium.  

Some near-microtemperaments are appended as octoid, parakleismic, counterkleismic, quincy, sfourth, and trideci.  

== Ennealimmal ==

 

Ennealimmal tempers out the two smallest 7-limit [[superparticular]] commas, 2401/2400 and 4375/4374, leading to a temperament of unusual efficiency. It also tempers out the [[ennealimma]], {{monzo| 1 -27 18 }}, which leads to the identification of (27/25)⁹ with the [[octave]], and gives ennealimmal a [[period]] of 1/9 octave. Its [[pergen]] is (P8/9, P5/2). While 27/25 is a 5-limit interval, a stack of two periods equates to 7/6 because of identification by 4375/4374, and this represents 7/6 with such accuracy (a fifth of a cent flat) that there is no realistic possibility of treating ennealimmal as anything other than 7-limit.

 

Aside from 10/9 which has already been mentioned, possible generators include 36/35, 21/20, 6/5, 7/5 and the neutral thirds pair 49/40~60/49, all of which have their own interesting advantages. Possible tunings are 441-, 612-, or 3600edo, though its hardly likely anyone could tell the difference.

 

If 1/9 of an octave is too small of a period for you, you could try generator-period pairs of [3, 5], [5/3, 3], [6/5, 4/3], [4/3, 8/5] or [10/9, 4/3] (for example). In particular, people fond of the idea of "[[tritave]]s" as analogous to octaves might consider the 28 or 43 note [[mos]] with generator an approximate 5/3 within 3; for instance as given by 451/970 of a "tritave". Tetrads have a low enough complexity that (for example) there are nine 1-3/2-7/4-5/2 tetrads in the 28 notes to the tritave mos, which is equivalent in average step size to a 17 2/3 to the octave mos.

 

Ennealimmal extensions discussed elsewhere include [[Compton family #Omicronbeta|omicronbeta]], [[Tritrizo clan #Undecentic|undecentic]], [[Tritrizo clan #Schisennealimmal|schisennealimmal]], and [[Tritrizo clan #Lunennealimmal|lunennealimmal]].

[[Mapping]]: [{{val|1 15 19 30}}, {{val|0 -37 -46 -75}}]

{{Multival|legend=1|37 46 75 -13 15 45}}

[[POTE generator]]: ~9/7 = 435.082

 

[[Badness]]: 0.010836

Mapping: [{{val|2 30 38 60 41}}, {{val|0 -37 -46 -75 -47}}]

POTE generator: ~9/7 = 435.082

Optimal GPV sequence: {{Val list| 80, 342, 764, 1106, 1448, 2554, 4002f, 6556cf }}

Badness: 0.012773

Enneadecal temperament tempers out the [[enneadeca]], {{monzo| -14 -19 19 }}, and as a consequence has a period of 1/19 octave. This is because the enneadeca is the amount by which nineteen just minor thirds fall short of an octave. If to this we add 4375/4374 we get the 7-limit temperament we are considering here, but note should be taken of the fact that it makes for a reasonable 5-limit microtemperament also, where the generator can be ~25/24, ~27/25, ~10/9, ~5/4 or ~3/2. To this we may add possible 7-limit generators such as ~225/224, ~15/14 or ~9/7. Since enneadecal tempers out [[703125/702464]], the amount by which 81/80 falls short of three stacked 225/224, we can equate the 225/224 generator with (81/80)^1/3. This is the interval needed to adjust the 1/3-comma meantone flat fifths and major thirds of [[19edo]] up to just ones. [[171edo]] is a good tuning for either the 5- or 7-limit, and [[494edo]] shows how to extend the temperament to the 11- or 13-limit, where it is accurate but very complex. Fans of near-perfect fifths may want to use [[665edo]] for a tuning.

[[Mapping]]: [{{val| 19 0 14 -37 }}, {{val| 0 1 1 3 }}]

 

 

Mapping generators: ~28/27, ~3

[[Optimal tuning]] ([[CTE]]): ~3/2 = 701.9275 (~225/224 = 7.1907)

{{Val list|legend=1| 19, …, 152, 171, 665, 836, 1007, 2185, 3192c }}

[[Badness]]: 0.010954

Mapping: [{{val| 19 0 14 -37 126 }}, {{val| 0 1 1 3 -2 }}]

Optimal tuning (CTE): ~3/2 = 702.1483 (~225/224 = 7.4115)

Optimal GPV sequence: {{Val list| 19, 133d, 152, 323e, 475de, 627de }}

Badness: 0.043734

Mapping: [{{val| 19 0 14 -37 126 -20 }}, {{val| 0 1 1 3 -2 3 }}]

Optimal tuning (CTE): ~3/2 = 701.9258 (~225/224 = 7.1890)

Optimal GPV sequence: {{Val list| 19, 133df, 152f, 323ef }}

Badness: 0.033545

Mapping: [{{val| 38 0 28 -74 11 }}, {{val| 0 1 1 3 2 }}]

 

Mapping generators: ~55/54, ~3

Optimal tuning (CTE): ~3/2 = 701.9351 (~225/224 = 7.1983)

Optimal GPV sequence: {{Val list| 152, 342, 836, 1178, 2014, 3192ce, 5206ce }}

Badness: 0.009985

Mapping: [{{val| 38 0 28 -74 11 -281 }}, {{val| 0 1 1 3 2 7 }}]

Optimal tuning (CTE): ~3/2 = 701.9955 (~225/224 = 7.2587)

Optimal GPV sequence: {{Val list| 152f, 342f, 494 }}

Badness: 0.020782

Mapping: [{{val| 38 0 28 -74 11 502 }}, {{val| 0 1 1 3 2 -6 }}]

Optimal tuning (CTE): ~3/2 = 701.9812 (~225/224 = 7.2444)

Optimal GPV sequence: {{Val list| 152, 342, 494, 1330, 1824, 2318d }}

Badness: 0.030391

Mapping: [{{val| 38 1 29 -71 13 111 }}, {{val| 0 2 2 6 4 1 }}]

 

Mapping generators: ~55/54, ~429/250

Optimal tuning (CTE): ~429/250 = 935.1789 (~144/143 = 12.1895)

Optimal GPV sequence: {{Val list| 190, 304d, 494, 684, 1178, 2850, 4028ce }}

Badness: 0.014694

Mapping: [{{val|19 3 17 -28 82 92 159 78}}, {{val|0 10 10 30 -6 -8 -30 1}}]

Optimal tuning (CTE): ~28/27 = 1\19, ~6545/5928 = 171.244

Vals: {{EDOs|855, 988, 1843}}

: ''For the 5-limit version of this temperament, see [[High badness temperaments #Semidimi]].''

The generator of semidimi temperament is a semi-diminished fourth interval tuned between 162/125 and 35/27. It tempers out 5-limit {{monzo|-12 -73 55}} and 7-limit 3955078125/3954653486, as well as 4375/4374.

Subgroup: 2.3.5.7

[[Mapping]]: [{{val|1 36 48 61}}, {{val|0 -55 -73 -93}}]

{{Multival|legend=1|55 73 93 -12 -7 11}}

[[POTE generator]]: ~35/27 = 449.1270

 

[[Badness]]: 0.015075

The brahmagupta temperament has a period of 1/7 octave, tempering out the [[akjaysma]], {{monzo|47 -7 -7 -7}} = 140737488355328 / 140710042265625.

Subgroup: 2.3.5.7

[[Comma list]]: 4375/4374, 70368744177664/70338939985125

[[Mapping]]: [{{val|7 2 -8 53}}, {{val|0 3 8 -11}}]

{{Multival|legend=1|21 56 -77 40 -181 -336}}

[[POTE generator]]: ~27/20 = 519.716

{{Val list|legend=1| 7, 217, 224, 441, 1106, 1547 }}

[[Badness]]: 0.029122

Mapping: [{{val|7 2 -8 53 3}}, {{val|0 3 8 -11 7}}]

POTE generator: ~27/20 = 519.704

Optimal GPV sequence: {{Val list| 7, 217, 224, 441, 665, 1771ee }}

Badness: 0.052190

Mapping: [{{val|7 2 -8 53 3 35}}, {{val|0 3 8 -11 7 -3}}]

POTE generator: ~27/20 = 519.706

Optimal GPV sequence: {{Val list| 7, 217, 224, 441, 665, 1771eef }}

Badness: 0.023132

Abigail temperament tempers out the [[pessoalisma]] in addition to the ragisma in the 7-limit. It was named by Gene Ward Smith after the birthday of First Lady Abigail Fillmore.<ref>https://yahootuninggroupsultimatebackup.github.io/tuning-math/topicId_17927.html#17930: "I propose Abigail as a name, on the grounds 313/1798 is an excellent generator, and Abigail Fillmore, wife of Millard, was born on 3-13-1798 at least as Americans recon things."</ref>

Subgroup: 2.3.5.7

[[Mapping]]: [{{val|2 7 13 -1}}, {{val|0 -11 -24 19}}]

 

[[POTE generator]]: ~6912/6125 = 208.899

{{Val list|legend=1| 46, 132, 178, 224, 270, 494, 764, 1034, 1798 }}

[[Badness]]: 0.037000

Mapping: [{{val|2 7 13 -1 1}}, {{val|0 -11 -24 19 17}}]

POTE generator: ~1155/1024 = 208.901

Optimal GPV sequence: {{Val list| 46, 132, 178, 224, 270, 494, 764 }}

Badness: 0.012860

Mapping: [{{val|2 7 13 -1 1 -2}}, {{val|0 -11 -24 19 17 27}}]

POTE generator: ~44/39 = 208.903

Optimal GPV sequence: {{Val list| 46, 178, 224, 270, 494, 764, 1258 }}

Badness: 0.008856

Subgroup: 2.3.5.7

[[Mapping]]: [{{val| 1 6 10 3 }}, {{val| 0 -23 -40 -1 }}]

Mapping generators: ~2, ~8/7

{{Multival|legend=1| 23 40 1 10 -63 -110 }}

 

 

[[Badness]]: 0.037648

Mapping: [{{val| 2 12 20 6 5 }}, {{val| 0 -23 -40 -1 5 }}]

 

Mapping generators: ~99/70, ~8/7

POTE generator: ~8/7 = 230.3370

Optimal GPV sequence: {{Val list| 26, 198, 224, 422, 646, 1068d }}

Badness: 0.040955

Mapping: [{{val| 2 12 20 6 5 17 }}, {{val| 0 -23 -40 -1 5 -25 }}]

POTE generator: ~8/7 = 230.3373

Optimal GPV sequence: {{Val list| 26, 198, 224, 422, 646f, 1068df }}

Badness: 0.020416

Mapping: [{{val| 1 6 10 3 12 }}, {{val| 0 -46 -80 -2 -89 }}]

 

Mapping generators: ~2, ~77/72

POTE generator: ~77/72 = 115.1642

Optimal GPV sequence: {{Val list| 73, 125, 198, 323, 521 }}

Badness: 0.078

Mapping: [{{val| 1 6 10 3 12 18 }}, {{val| 0 -46 -80 -2 -89 -149 }}]

POTE generator: ~77/72 = 115.1628

Optimal GPV sequence: {{Val list| 73f, 125f, 198, 323, 521 }}

Badness: 0.044

== Orga ==

Subgroup: 2.3.5.7

[[Comma list]]: 4375/4374, 54975581388800/54936068900769

[[Mapping]]: [{{val|2 21 36 5}}, {{val|0 -29 -51 1}}]

[[Wedgie]]: {{multival|58 102 -2 27 -166 -291}}

[[POTE generator]]: ~8/7 = 231.104

{{Val list|legend=1| 26, 244, 270, 836, 1106, 1376, 2482 }}

[[Badness]]: 0.040236

Comma list: 3025/3024, 4375/4374, 5767168/5764801

Mapping: [{{val|2 21 36 5 2}}, {{val|0 -29 -51 1 8}}]

POTE generator: ~8/7 = 231.103

Optimal GPV sequence: {{Val list| 26, 244, 270, 566, 836, 1106 }}

Badness: 0.016188

=== 13-limit ===

Subgroup: 2.3.5.7.11.13

Comma list: 1716/1715, 2080/2079, 3025/3024, 15379/15360

Mapping: [{{val|2 21 36 5 2 24}}, {{val|0 -29 -51 1 8 -27}}]

POTE generator: ~8/7 = 231.103

Optimal GPV sequence: {{Val list| 26, 244, 270, 566, 836f, 1106f }}

The name of chlorine temperament comes from Chlorine, the 17th element.

Chlorine temperament has a period of 1/17 octave. It tempers out the septendecima, {{monzo|-52 -17 34}}, by which 17 chromatic semitones (25/24) exceed an octave. This temperament can be described as 289&amp;323 temperament, which tempers out {{monzo|-49 4 22 -3}} as well as the ragisma. Not only the semitwelfth, but also the ~5/4 can be used as a generator.  

Subgroup: 2.3.5

[[Comma]]: {{monzo| -52 -17 34 }}

[[Mapping]]: [{{val| 17 0 26 }}, {{val| 0 2 1 }}]

Mapping generators: ~25/24, ~{{monzo| 26 9 -17 }}

[[POTE generator]]: ~{{monzo| 26 9 -17 }} = 950.9746

{{Val list|legend=1| 34, 153, 187, 221, 255, 289, 323, 612, 3349, 3961, 4573, 5185, 5797 }}

 

 

[[Comma list]]: 4375/4374, 193119049072265625/193091834023510016

 

[[Mapping]]: [{{val| 17 0 26 -87 }}, {{val| 0 2 1 10 }}]

 

 

[[POTE generator]]: ~822083584/474609375 = 950.9995

 

{{Val list|legend=1| 289, 323, 612, 935, 1547 }}

 

 

Comma list: 4375/4374, 41503/41472, 1879453125/1879048192

Mapping: [{{val| 17 0 26 -87 207 }}, {{val| 0 2 1 10 -11 }}]

POTE generators: ~822083584/474609375 = 950.9749

 

Badness: 0.063706

{{see also|Very high accuracy temperaments #Senior}}

Aside from the ragisma, the seniority temperament (26&amp;145) tempers out the wadisma, 201768035/201326592. It is so named because the senior comma ({{monzo|-17 62 -35}}, quadla-sepquingu) is tempered out.

Subgroup: 2.3.5.7

[[Mapping]]: [{{val|1 11 19 2}}, {{val|0 -35 -62 3}}]

[[Wedgie]]: {{multival|35 62 -3 17 -103 -181}}

[[POTE generator]]: ~3087/2560 = 322.804

 

[[Badness]]: 0.044877

The senator temperament (26&amp;145) is an 11-limit extension of the seniority, which tempers out 441/440 and 65536/65219. It can be extended to the 13- and 17-limit immediately, by adding 364/363 and 595/594 to the comma list in this order.

Mapping: [{{val|1 11 19 2 4}}, {{val|0 -35 -62 3 -2}}]

POTE generator: ~77/64 = 322.793

Optimal GPV sequence: {{Val list| 26, 119c, 145, 171, 316e, 487ee }}

Badness: 0.092238

Mapping: [{{val|1 11 19 2 4 15}}, {{val|0 -35 -62 3 -2 -42}}]

POTE generator: ~77/64 = 322.793

Optimal GPV sequence: {{Val list| 26, 119c, 145, 171, 316ef, 487eef }}

Badness: 0.044662

Mapping: [{{val|1 11 19 2 4 15 17}}, {{val|0 -35 -62 3 -2 -42 -48}}]

POTE generator: ~77/64 = 322.793

Optimal GPV sequence: {{Val list| 26, 119c, 145, 171, 316ef, 487eef }}