Tour of regular temperaments: Difference between revisions

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These are families defined by a 3-limit (color name: wa) comma. If only primes 2 and 3 are part of the [[subgroup]], the comma creates a rank-1 temperament, an [[edo]]. But if another prime such as 5 is present, the comma creates a rank-2 temperament. Since edos are discussed elsewhere, this section assumes the presence of at least one additional prime. The rank-2 temperament created consists of multiple "copies" of an edo. The edo copies can be thought of as being offset from one another by a small comma. This small comma is represented in the [[pergen]] by ^1.

; Blackwood family (P8/5, ^1)

; [[Limmic temperaments|Blackwood family]] (P8/5, ^1)

: This family tempers out the [[limma]], {{monzo| 8 -5 }} (256/243). It equates 5 fifths with 3 octaves, which creates multiple copies of [[5edo]]. The fifth is ~720¢, quite sharp. The only member of this family is the [[blackwood]] temperament, which is 5-limit. Blackwood's edo copies are offset from one another by 5/4, or alternatively by 81/80. 5/4 is usually tempered sharp, perhaps ~400¢, to match the sharp fifth. Its color name is Sawati.

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; [[Mercator family]] (P8/53, ^1)

: This family tempers out the [[Mercator's comma]], {{monzo| -84 53 }}, which creates multiple copies of [[53edo]]. Its color name is Wa-53.

=== Families defined by a 2.3.5 comma ===

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; Triruti clan (P8/3, P5)

: This clan tempers out the Triru comma, {{monzo| -1 6 0 -3 }} (729/686), a low-accuracy temperament. Three ~9/7 periods equals an octave. The generator is ~3/2, and two generators minus a period equals ~7/4. An obvious 5-limit interpretation of the ~400{{c}} period is 5/4, leading to the [[augmented]] temperament.

: This clan tempers out the Triru comma, {{monzo| -1 6 0 -3 }} (729/686), a low-accuracy temperament. Three ~9/7 periods equals an octave. The generator is ~3/2, and two generators minus a period equals ~7/4. An obvious 5-limit interpretation of the ~400{{c}} period is 5/4, leading to the [[augmented (temperament)|augmented]] temperament.

; [[Gamelismic clan]] (P8, P5/3)

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: This clan tempers out the [[bleu comma]], {{monzo| 3 7 0 -5 }} (17496/16807). The ~54/49 generator is about 139{{c}}. Two of them equal ~7/6, three equal ~9/7, five equal ~3/2, and seven equal ~7/4.

; ~~Saquinzoti~~ clan (P8, P12/5)

; [[Septimagic clan]] (P8, P12/5)

: This clan tempers out the ~~Saquinzo~~ comma, {{monzo| 5 -12 0 5 }} (537824/531441). Its generator is {{nowrap| ~243/196 {{=}} ~380{{c}} }}. Five generators makes ~3/1. 7/4 is equated to 12 generators minus 3 octaves. An obvious 5-limit interpretation of the generator is 5/4, leading to the [[magic]] temperament, which is in the magic family.

: This clan tempers out the [[septimagic comma]], {{monzo| 5 -12 0 5 }} (537824/531441). Its generator is {{nowrap| ~243/196 {{=}} ~380{{c}} }}. Five generators makes ~3/1. 7/4 is equated to 12 generators minus 3 octaves. An obvious 5-limit interpretation of the generator is 5/4, leading to the [[magic]] temperament, which is in the magic family. Its color name is Saquinzoti.

; Lasepzoti clan (P8, P11/7)

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; [[Septiennealimmal clan]] (P8/9, P5)

: This clan tempers out the [[septimal ennealimma|septiennealimma]], {{monzo| -11 -9 0 9 }} (40353607/40310784). It has a period of 1/9 octave, which represents ~7/6. The generator is ~3/2. This clan includes a number of regular temperaments including [[enneaportent]], [[ennealimmal]], and [[novemkleismic]]. Its color name is Tritrizoti.

=== Clans defined by a 2.3.11 comma ===

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: This 2.3.11 clan tempers out the [[nexus comma]] {{monzo| -16 -3 0 0 6 }}. Its 1/3-octave period is ~121/96 and its least-cents generator is ~12/11. A period plus a generator equals ~11/8. Six of these generators equals ~27/16. A period minus a generator equals ~1331/1152 or ~1536/1331. Two of these alternative generators equals ~4/3. Its color name is Tribiloti.

; Alphaxenic ~~or Laquadloti~~ clan (P8/2, M2/4)

; Alphaxenic clan (P8/2, M2/4)

: This 2.3.11 clan tempers out the [[Alpharabian comma]] {{monzo| -17 2 0 0 4 }}. Its half-octave period is ~363/256, and its generator is ~33/32. Four generators equals ~9/8. 3/2 is equated to a period plus 2 generators, and 11/8 is equated to a period minus a generator. This clan includes a strong extension to the comic or Saquadyobiti temperament, which is in the jubilismic clan. Its color name is Laquadloti.

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: This clan tempers out the [[vorwell comma]] (named for being tempered in [[septimal vulture]] and [[orwell]]), {{monzo| 27 0 -8 -3 }} (134217728/133984375). The generator is {{nowrap| ~1024/875 {{=}} ~272{{c}} }}. Three generators equals ~8/5 and eight of them equals ~7/2. Its color name is Sasatriru-aquadbiguti Nowa.

; ~~Quinzo-atriyoti Nowa~~ clan (P8, M3/5)

; Rainy clan (P8, M3/5)

: This clan tempers out the [[rainy comma]], {{monzo| -21 0 3 5 }} (2100875/2097152). The generator is {{nowrap| ~256/245 {{=}} ~77{{c}} }}. Three generators equals ~8/7 and five of them equals the classic major third (~5/4).

: This clan tempers out the [[rainy comma]], {{monzo| -21 0 3 5 }} (2100875/2097152). The generator is {{nowrap| ~256/245 {{=}} ~77{{c}} }}. Three generators equals ~8/7 and five of them equals the classic major third (~5/4). Its color name is Quinzo-atriyoti Nowa.

; [[Llywelynsmic clan]] (P8, cM3/7)

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; [[Quince clan]] (P8, m6/7)

: This clan tempers out the [[quince comma]], {{monzo| -15 0 -2 7 }} (823543/819200). The generator is {{nowrap| ~343/320 {{=}} ~116{{c}} }}. Two generators equals ~8/7, five generators equals ~7/5, and seven generators equals the classical minor sixth ~8/5. An obvious 5-limit interpretation of the generator is ~16/15, leading to the [[miracle]] temperament, which is in the gamelismic clan. Its color name is Lasepzo-aguguti Nowa.

; Exodia clan (P8, ccM3/8)

: This clan tempers out the [[exodia comma]], {{monzo| -48 0 11 8 }}. The generator is {{nowrap| ~262144/214375 {{=}} ~348{{c}} }}. Eight generators equals ~5/1, 11 of them equals ~64/7, and 19 of them equals ~320/7 (five octaves above ~10/7). Its color name is Trila-quadbizo-aleyoti Nowa.

; Slither clan (P8, ccm6/9)

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; Compass temperaments

: Compass rank-2 temperaments temper out the [[compass comma]], {{monzo| -6 -2 10 -5 }} (9765625/9680832). Its color name is Quinruyoyoti.

; [[Sensibeta temperaments]]

: Sensibeta rank-2 temperaments temper out the [[sensibeta comma]], {{monzo| -1 -12 5 3 }} (1071875/1062882). Its color name is Satrizo-aquinyoti.

; Trimyna temperaments

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; [[Mistismic temperaments]]

: Mistismic rank-2 temperaments temper out the [[mistisma]], {{monzo| 16 -6 -4 1 }} (458752/455625). Its color name is Sazoquadguti.

; [[Bronzismic temperaments]]

: Bronzismic rank-2 temperaments temper out the [[bronzisma]], {{monzo| 21 -5 -2 -3 }} (2097152/2083725). Its color name is Satriru-aguguti.

; [[Varunismic temperaments]]

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; [[Pentacircle clan]] (P8, P5, ^1)

: These temper out the [[pentacircle comma]], {{monzo| 7 -4 0 1 -1 }} (896/891). The interval between 11/8 and 7/4 is equated to 81/64. Since that is a 3-limit interval, every 2.3.11 interval is equated to a 2.3.7 interval and vice versa, and both the pergen and the lattice are identical to that of either 2.3.7 JI or 2.3.11 JI. In the pergen, ^1 is either ~64/63 or ~33/32 or ~729/704. Its color name is Saluzoti.

; [[Moctdelismic clan]]

: These temper out the [[moctdelisma]], {{monzo| -2 0 3 -3 1 }} (1375/1372). To be a rank-3 temperament, either an additional comma must vanish or the prime subgroup must omit prime 3. Thus no assumptions can be made about the pergen. Its color name is Lotriruyoti.

; [[Wizardharry clan]] (P8, P4/3, ^1)

: These temper out the [[4000/3993|wizardharry comma]], {{monzo| 5 -1 3 0 -3 }} (4000/3993), and split the fourth in three. In the pergen, ^1 is either ~33/32 or ~729/704. Its color name is Triluyoti.

; [[Semicanousmic clan]] (P8, P5, ^1)

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; [[Miscellaneous 5-limit temperaments]]

: High in badness, but worth cataloging for one reason or another.

; [[Miscellaneous 7-limit temperaments]]

: Various rank-3 temperaments which are high in badness.

; [[Low harmonic entropy linear temperaments]]

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; Middle Path tables

: Tables of temperaments where {{nowrap| complexity/7.65 + damage/10 < 1 }}. Useful for beginners looking for a list of a manageable number of temperaments, which approximate harmonious intervals accurately with a manageable number of notes.

:: [[Middle Path table of ~~five~~-limit rank ~~two~~ temperaments]]

:: [[Middle Path table of 5-limit rank-2 temperaments]]

:: [[Middle Path table of ~~seven~~-limit rank ~~two~~ temperaments]]

:: [[Middle Path table of 7-limit rank-2 temperaments]]

:: [[Middle Path table of ~~eleven~~-limit rank ~~two~~ temperaments]]

:: [[Middle Path table of 11-limit rank-2 temperaments]]

== Maps of temperaments ==

* [[Map of rank-2 temperaments]], sorted by generator size

* [[Catalog of rank ~~two~~ temperaments]]

** [[Catalog of 7-limit rank-2 temperaments]]

** [[Catalog of ~~seven~~-limit rank ~~two~~ temperaments]]

** [[Catalog of 11-limit rank-2 temperaments]]

** [[Catalog of ~~eleven~~-limit rank ~~two~~ temperaments]]

** [[Catalog of 13-limit rank-2 temperaments]]

** [[Catalog of ~~thirteen~~-limit rank ~~two~~ temperaments]]

* [[Catalog of 11-limit rank-3 temperaments]]

* [[List of rank ~~two~~ temperaments by generator and period]]

* [[List of rank-2 temperaments by generator and period]]

* [[List of rank-2 temperaments supported by EDOs]]

* [[Rank-2 temperaments by mapping of 3]]

* [[Temperaments for MOS shapes]]

* [[Tree of rank two temperaments]]

== Temperament nomenclature ==

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 These are families defined by a 3-limit (color name: wa) comma. If only primes 2 and 3 are part of the [[subgroup]], the comma creates a rank-1 temperament, an [[edo]]. But if another prime such as 5 is present, the comma creates a rank-2 temperament. Since edos are discussed elsewhere, this section assumes the presence of at least one additional prime. The rank-2 temperament created consists of multiple "copies" of an edo. The edo copies can be thought of as being offset from one another by a small comma. This small comma is represented in the [[pergen]] by ^1.
-; Blackwood family (P8/5, ^1)
+; [[Limmic temperaments|Blackwood family]] (P8/5, ^1)
 : This family tempers out the [[limma]], {{monzo| 8 -5 }} (256/243). It equates 5 fifths with 3 octaves, which creates multiple copies of [[5edo]]. The fifth is ~720¢, quite sharp. The only member of this family is the [[blackwood]] temperament, which is 5-limit. Blackwood's edo copies are offset from one another by 5/4, or alternatively by 81/80. 5/4 is usually tempered sharp, perhaps ~400¢, to match the sharp fifth. Its color name is Sawati.
@@ Line 24: / Line 24: @@
 ; [[Mercator family]] (P8/53, ^1)
 : This family tempers out the [[Mercator's comma]], {{monzo| -84 53 }}, which creates multiple copies of [[53edo]]. Its color name is Wa-53.
 === Families defined by a 2.3.5 comma ===
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 ; Triruti clan (P8/3, P5)
-: This clan tempers out the Triru comma, {{monzo| -1 6 0 -3 }} (729/686), a low-accuracy temperament. Three ~9/7 periods equals an octave. The generator is ~3/2, and two generators minus a period equals ~7/4. An obvious 5-limit interpretation of the ~400{{c}} period is 5/4, leading to the [[augmented]] temperament.
+: This clan tempers out the Triru comma, {{monzo| -1 6 0 -3 }} (729/686), a low-accuracy temperament. Three ~9/7 periods equals an octave. The generator is ~3/2, and two generators minus a period equals ~7/4. An obvious 5-limit interpretation of the ~400{{c}} period is 5/4, leading to the [[augmented (temperament)|augmented]] temperament.
 ; [[Gamelismic clan]] (P8, P5/3)
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 : This clan tempers out the [[bleu comma]], {{monzo| 3 7 0 -5 }} (17496/16807). The ~54/49 generator is about 139{{c}}. Two of them equal ~7/6, three equal ~9/7, five equal ~3/2, and seven equal ~7/4.
-; Saquinzoti clan (P8, P12/5)
+; [[Septimagic clan]] (P8, P12/5)
-: This clan tempers out the Saquinzo comma, {{monzo| 5 -12 0 5 }} (537824/531441). Its generator is {{nowrap| ~243/196 {{=}} ~380{{c}} }}. Five generators makes ~3/1. 7/4 is equated to 12 generators minus 3 octaves. An obvious 5-limit interpretation of the generator is 5/4, leading to the [[magic]] temperament, which is in the magic family.
+: This clan tempers out the [[septimagic comma]], {{monzo| 5 -12 0 5 }} (537824/531441). Its generator is {{nowrap| ~243/196 {{=}} ~380{{c}} }}. Five generators makes ~3/1. 7/4 is equated to 12 generators minus 3 octaves. An obvious 5-limit interpretation of the generator is 5/4, leading to the [[magic]] temperament, which is in the magic family. Its color name is Saquinzoti.
 ; Lasepzoti clan (P8, P11/7)
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 ; [[Septiennealimmal clan]] (P8/9, P5)
 : This clan tempers out the [[septimal ennealimma|septiennealimma]], {{monzo| -11 -9 0 9 }} (40353607/40310784). It has a period of 1/9 octave, which represents ~7/6. The generator is ~3/2. This clan includes a number of regular temperaments including [[enneaportent]], [[ennealimmal]], and [[novemkleismic]]. Its color name is Tritrizoti.
 === Clans defined by a 2.3.11 comma ===
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 : This 2.3.11 clan tempers out the [[nexus comma]] {{monzo| -16 -3 0 0 6 }}. Its 1/3-octave period is ~121/96 and its least-cents generator is ~12/11. A period plus a generator equals ~11/8. Six of these generators equals ~27/16. A period minus a generator equals ~1331/1152 or ~1536/1331. Two of these alternative generators equals ~4/3. Its color name is Tribiloti.
-; Alphaxenic or Laquadloti clan (P8/2, M2/4)
+; Alphaxenic clan (P8/2, M2/4)
 : This 2.3.11 clan tempers out the [[Alpharabian comma]] {{monzo| -17 2 0 0 4 }}. Its half-octave period is ~363/256, and its generator is ~33/32. Four generators equals ~9/8. 3/2 is equated to a period plus 2 generators, and 11/8 is equated to a period minus a generator. This clan includes a strong extension to the comic or Saquadyobiti temperament, which is in the jubilismic clan. Its color name is Laquadloti.
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 : This clan tempers out the [[vorwell comma]] (named for being tempered in [[septimal vulture]] and [[orwell]]), {{monzo| 27 0 -8 -3 }} (134217728/133984375). The generator is {{nowrap| ~1024/875 {{=}} ~272{{c}} }}. Three generators equals ~8/5 and eight of them equals ~7/2. Its color name is Sasatriru-aquadbiguti Nowa.
-; Quinzo-atriyoti Nowa clan (P8, M3/5)
+; Rainy clan (P8, M3/5)
-: This clan tempers out the [[rainy comma]], {{monzo| -21 0 3 5 }} (2100875/2097152). The generator is {{nowrap| ~256/245 {{=}} ~77{{c}} }}. Three generators equals ~8/7 and five of them equals the classic major third (~5/4).
+: This clan tempers out the [[rainy comma]], {{monzo| -21 0 3 5 }} (2100875/2097152). The generator is {{nowrap| ~256/245 {{=}} ~77{{c}} }}. Three generators equals ~8/7 and five of them equals the classic major third (~5/4). Its color name is Quinzo-atriyoti Nowa.
 ; [[Llywelynsmic clan]] (P8, cM3/7)
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 ; [[Quince clan]] (P8, m6/7)
 : This clan tempers out the [[quince comma]], {{monzo| -15 0 -2 7 }} (823543/819200). The generator is {{nowrap| ~343/320 {{=}} ~116{{c}} }}. Two generators equals ~8/7, five generators equals ~7/5, and seven generators equals the classical minor sixth ~8/5. An obvious 5-limit interpretation of the generator is ~16/15, leading to the [[miracle]] temperament, which is in the gamelismic clan. Its color name is Lasepzo-aguguti Nowa.
+; Exodia clan (P8, ccM3/8)
+: This clan tempers out the [[exodia comma]], {{monzo| -48 0 11 8 }}. The generator is {{nowrap| ~262144/214375 {{=}} ~348{{c}} }}. Eight generators equals ~5/1, 11 of them equals ~64/7, and 19 of them equals ~320/7 (five octaves above ~10/7). Its color name is Trila-quadbizo-aleyoti Nowa.
 ; Slither clan (P8, ccm6/9)
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 ; Compass temperaments
 : Compass rank-2 temperaments temper out the [[compass comma]], {{monzo| -6 -2 10 -5 }} (9765625/9680832). Its color name is Quinruyoyoti.
+; [[Sensibeta temperaments]]
+: Sensibeta rank-2 temperaments temper out the [[sensibeta comma]], {{monzo| -1 -12 5 3 }} (1071875/1062882). Its color name is Satrizo-aquinyoti.
 ; Trimyna temperaments
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 ; [[Mistismic temperaments]]
 : Mistismic rank-2 temperaments temper out the [[mistisma]], {{monzo| 16 -6 -4 1 }} (458752/455625). Its color name is Sazoquadguti.
+; [[Bronzismic temperaments]]
+: Bronzismic rank-2 temperaments temper out the [[bronzisma]], {{monzo| 21 -5 -2 -3 }} (2097152/2083725). Its color name is Satriru-aguguti.
 ; [[Varunismic temperaments]]
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 ; [[Pentacircle clan]] (P8, P5, ^1)
 : These temper out the [[pentacircle comma]], {{monzo| 7 -4 0 1 -1 }} (896/891). The interval between 11/8 and 7/4 is equated to 81/64. Since that is a 3-limit interval, every 2.3.11 interval is equated to a 2.3.7 interval and vice versa, and both the pergen and the lattice are identical to that of either 2.3.7 JI or 2.3.11 JI. In the pergen, ^1 is either ~64/63 or ~33/32 or ~729/704. Its color name is Saluzoti.
+; [[Moctdelismic clan]]
+: These temper out the [[moctdelisma]], {{monzo| -2 0 3 -3 1 }} (1375/1372). To be a rank-3 temperament, either an additional comma must vanish or the prime subgroup must omit prime 3. Thus no assumptions can be made about the pergen. Its color name is Lotriruyoti.
+; [[Wizardharry clan]] (P8, P4/3, ^1)
+: These temper out the [[4000/3993|wizardharry comma]], {{monzo| 5 -1 3 0 -3 }} (4000/3993), and split the fourth in three. In the pergen, ^1 is either ~33/32 or ~729/704. Its color name is Triluyoti.
 ; [[Semicanousmic clan]] (P8, P5, ^1)
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 ; [[Miscellaneous 5-limit temperaments]]
 : High in badness, but worth cataloging for one reason or another.
+; [[Miscellaneous 7-limit temperaments]]
+: Various rank-3 temperaments which are high in badness.
 ; [[Low harmonic entropy linear temperaments]]
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 ; Middle Path tables
 : Tables of temperaments where {{nowrap| complexity/7.65 + damage/10 < 1 }}. Useful for beginners looking for a list of a manageable number of temperaments, which approximate harmonious intervals accurately with a manageable number of notes.
-:: [[Middle Path table of five-limit rank two temperaments]]
+:: [[Middle Path table of 5-limit rank-2 temperaments]]
-:: [[Middle Path table of seven-limit rank two temperaments]]
+:: [[Middle Path table of 7-limit rank-2 temperaments]]
-:: [[Middle Path table of eleven-limit rank two temperaments]]
+:: [[Middle Path table of 11-limit rank-2 temperaments]]
 == Maps of temperaments ==
 * [[Map of rank-2 temperaments]], sorted by generator size
-* [[Catalog of rank two temperaments]]
+** [[Catalog of 7-limit rank-2 temperaments]]
-** [[Catalog of seven-limit rank two temperaments]]
+** [[Catalog of 11-limit rank-2 temperaments]]
-** [[Catalog of eleven-limit rank two temperaments]]
+** [[Catalog of 13-limit rank-2 temperaments]]
-** [[Catalog of thirteen-limit rank two temperaments]]
+* [[Catalog of 11-limit rank-3 temperaments]]
-* [[List of rank two temperaments by generator and period]]
+* [[List of rank-2 temperaments by generator and period]]
+* [[List of rank-2 temperaments supported by EDOs]]
 * [[Rank-2 temperaments by mapping of 3]]
 * [[Temperaments for MOS shapes]]
-* [[Tree of rank two temperaments]]
 == Temperament nomenclature ==