Decimal: Difference between revisions

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{{Infobox ~~Regtemp~~

{{Infobox regtemp

| Title = Decimal

| Subgroups = 2.3.5.7

| Comma basis = [[25/24]], [[49/48]]

| Edo join 1 = 4 | Edo join 2 = 6

| ~~Generator~~ = 7/4 | ~~Generator~~ tuning = 951.0 | Optimization method = CWE

| Mapping = 2; 2 1 1

| Generators = 7/4 | Generators tuning = 951.0 | Optimization method = CWE

| MOS scales = [[4L 2s]], [[4L 6s]], [[10L 4s]]

~~| Mapping = 2; 2 1 1~~

| Pergen = (P8/2, P4/2)

| Odd limit 1 = 7 | Mistuning 1 = 35.3 | Complexity 1 = 10

| Odd limit 1 = 7 | Mistuning 1 = 35.3 | Complexity 1 = 6

| Odd limit 2 = (7-limit) 21 | Mistuning 2 = 35.3 | Complexity 2 = 24

| Odd limit 2 = 7-limit 21 | Mistuning 2 = 35.3 | Complexity 2 = 10

}}

'''Decimal''' is an [[exotemperament]] in the [[dicot family]], [[semaphoresmic clan]], and [[jubilismic clan]] of [[regular temperament|temperaments]]. It is ~~also~~ the ~~prototypical fully~~ [[~~hemipyth~~]] temperament, ~~with approximations of~~ [[7/5]][[~]][[10/7]] at [[sqrt(2)]], [[7/4]]~[[12/7]] at [[sqrt(3)]], [[5/4]]~[[6/5]] at [[sqrt(3/2)]] ~~and~~ [[7/6]]~[[8/7]] at [[sqrt(4/3)]], and [[~~pergen~~]] (P8/2, P4/2), ~~splitting all Pythagorean intervals~~.

'''Decimal''' is an [[exotemperament]] in the [[dicot family]], [[semaphoresmic clan]], and [[jubilismic clan]] of [[regular temperament|temperaments]]. It is a [[weak extension|weak]] [[extension]] of [[dicot]], the [[5-limit]] temperament tempering out [[25/24]], splitting the octave in two parts, each representing [[7/5]][[~]][[10/7]]. It is also the prototypical fully [[hemipyth]] temperament, with [[sqrt(2)]] representing 7/5~10/7, [[sqrt(3)]] representing [[7/4]]~[[12/7]], [[sqrt(3/2)]] representng [[5/4]]~[[6/5]], and [[sqrt(4/3)]] representing [[7/6]]~[[8/7]], with a [[pergen]] of (P8/2, P4/2), splitting all Pythagorean intervals in two.

More precisely, it is the [[7-limit]] temperament that [[tempering out|tempers out]] both [[25/24]], the classic chromatic semitone, and [[49/48]], the septimal diesis. These two intervals have a rather similar function separating close intervals and creating "major" and "minor" triads (either pental ones splitting the perfect fifth or septimal ones splitting the perfect fourth), and tempering them out allows 5/4~6/5 to be sqrt(3/2) a neutral third and 7/6~8/7 to be a sqrt(4/3) neutral semifourth. This equates the [[4:5:6]] and [[6:7:8]] triads with their inverses, therefore also equating the [[4:5:6:7]] major tetrad with the [[70:84:105:120|1/(12:10:8:7)]] minor tetrad. The neutral third and semifourth can be equated (far more accurately) to [[11/9]] and [[15/13]] respectively, tempering out [[243/242]] and [[676/675]] and extending this temperament to the [[13-limit]]. Since {{nowrap|(25/24)/(49/48) {{=}} [[50/49]] }}, it also tempers that out, splitting the octave in two equal parts. As both the generator and period are half that of the diatonic scale, this means it forms mos scales of 4, 6, 10, 14, 24, … tones.

Decimal can serve as a structural archetype for a [[decatonic]] system that views the [[4:5:6]] and [[10:12:15|1/(4:5:6)]] chords as a major–minor pair (which is equated in decimal temperament as 25/24 is tempered out), and the [[6:7:8]] and [[21:24:28|1/(6:7:8)]] chords as another major–minor pair, neutralized in decimal via vanishing of 49/48.

~~More precisely, it~~ is ~~the~~ [[~~7-limit~~]] ~~temperament that [[tempering out|tempers out]] both [[25~~/~~24]], the classic chromatic semitone,~~ and [[49/48]], the septimal diesis. These two intervals have a rather similar function separating close intervals and creating "major" and "minor" triads (either pental ones splitting the perfect fifth or septimal ones splitting the perfect fourth), and tempering them out allows 5/4~6/5 to ~~be sqrt(3~~/~~2) a neutral third and 7/6~8/7 to be a sqrt(4/3) neutral semifourth~~. ~~These can be equated (far~~ more ~~accurately) to~~ [[~~11/9~~]] ~~and [[15/13]] respectively~~, ~~tempering out [[243~~/~~242]] and [[676~~/~~675]] and extending this temperament~~ to ~~the [[13-limit]]. Since {{nowrap|(~~25/24~~)/(49/48) {{=}}~~ [[50/49]] }}, ~~it also tempers~~ that ~~out, splitting the octave in two equal parts~~. ~~As both the generator and period are half that~~ of the ~~diatonic scale~~, ~~this means it forms mos scales of 4, 6, 10, 14, 24, 38, … tones~~.

A more accurate system based on 10 interval classes that distinguishes major and minor chords is [[pajara]], where 50/49 remains tempered and 49/48 is equated to 25/24. An even more accurate one is [[miracle]], which equates 50/49 with 49/48 to half of 25/24 by tempering out [[2401/2400]], though its structure is more complex than that of pajara. Both of these temperaments also temper out the marvel comma, [[225/224]].

~~For technical data, see [[~~Dicot family #Decimal~~]].~~

== Interval chain ==

@@ Line 1: / Line 1: @@
-{{Infobox Regtemp
+{{Infobox regtemp
 | Title = Decimal
 | Subgroups = 2.3.5.7
 | Comma basis = [[25/24]], [[49/48]]
 | Edo join 1 = 4 | Edo join 2 = 6
-| Generator = 7/4 | Generator tuning = 951.0 | Optimization method = CWE
+| Mapping = 2; 2 1 1
+| Generators = 7/4 | Generators tuning = 951.0 | Optimization method = CWE
 | MOS scales = [[4L 2s]], [[4L 6s]], [[10L 4s]]
-| Mapping = 2; 2 1 1
 | Pergen = (P8/2, P4/2)
-| Odd limit 1 = 7 | Mistuning 1 = 35.3 | Complexity 1 = 10
+| Odd limit 1 = 7 | Mistuning 1 = 35.3 | Complexity 1 = 6
-| Odd limit 2 = (7-limit) 21 | Mistuning 2 = 35.3 | Complexity 2 = 24
+| Odd limit 2 = 7-limit 21 | Mistuning 2 = 35.3 | Complexity 2 = 10
 }}
-'''Decimal''' is an [[exotemperament]] in the [[dicot family]], [[semaphoresmic clan]], and [[jubilismic clan]] of [[regular temperament|temperaments]]. It is also the prototypical fully [[hemipyth]] temperament, with approximations of [[7/5]][[~]][[10/7]] at [[sqrt(2)]], [[7/4]]~[[12/7]] at [[sqrt(3)]], [[5/4]]~[[6/5]] at [[sqrt(3/2)]] and [[7/6]]~[[8/7]] at [[sqrt(4/3)]], and [[pergen]] (P8/2, P4/2), splitting all Pythagorean intervals.
+'''Decimal''' is an [[exotemperament]] in the [[dicot family]], [[semaphoresmic clan]], and [[jubilismic clan]] of [[regular temperament|temperaments]]. It is a [[weak extension|weak]] [[extension]] of [[dicot]], the [[5-limit]] temperament tempering out [[25/24]], splitting the octave in two parts, each representing [[7/5]][[~]][[10/7]]. It is also the prototypical fully [[hemipyth]] temperament, with [[sqrt(2)]] representing 7/5~10/7, [[sqrt(3)]] representing [[7/4]]~[[12/7]], [[sqrt(3/2)]] representng [[5/4]]~[[6/5]], and [[sqrt(4/3)]] representing [[7/6]]~[[8/7]], with a [[pergen]] of (P8/2, P4/2), splitting all Pythagorean intervals in two.
+More precisely, it is the [[7-limit]] temperament that [[tempering out|tempers out]] both [[25/24]], the classic chromatic semitone, and [[49/48]], the septimal diesis. These two intervals have a rather similar function separating close intervals and creating "major" and "minor" triads (either pental ones splitting the perfect fifth or septimal ones splitting the perfect fourth), and tempering them out allows 5/4~6/5 to be sqrt(3/2) a neutral third and 7/6~8/7 to be a sqrt(4/3) neutral semifourth. This equates the [[4:5:6]] and [[6:7:8]] triads with their inverses, therefore also equating the [[4:5:6:7]] major tetrad with the [[70:84:105:120|1/(12:10:8:7)]] minor tetrad. The neutral third and semifourth can be equated (far more accurately) to [[11/9]] and [[15/13]] respectively, tempering out [[243/242]] and [[676/675]] and extending this temperament to the [[13-limit]]. Since {{nowrap|(25/24)/(49/48) {{=}} [[50/49]] }}, it also tempers that out, splitting the octave in two equal parts. As both the generator and period are half that of the diatonic scale, this means it forms mos scales of 4, 6, 10, 14, 24, … tones.
+Decimal can serve as a structural archetype for a [[decatonic]] system that views the [[4:5:6]] and [[10:12:15|1/(4:5:6)]] chords as a major–minor pair (which is equated in decimal temperament as 25/24 is tempered out), and the [[6:7:8]] and [[21:24:28|1/(6:7:8)]] chords as another major–minor pair, neutralized in decimal via vanishing of 49/48.
-More precisely, it is the [[7-limit]] temperament that [[tempering out|tempers out]] both [[25/24]], the classic chromatic semitone, and [[49/48]], the septimal diesis. These two intervals have a rather similar function separating close intervals and creating "major" and "minor" triads (either pental ones splitting the perfect fifth or septimal ones splitting the perfect fourth), and tempering them out allows 5/4~6/5 to be sqrt(3/2) a neutral third and 7/6~8/7 to be a sqrt(4/3) neutral semifourth. These can be equated (far more accurately) to [[11/9]] and [[15/13]] respectively, tempering out [[243/242]] and [[676/675]] and extending this temperament to the [[13-limit]]. Since {{nowrap|(25/24)/(49/48) {{=}} [[50/49]] }}, it also tempers that out, splitting the octave in two equal parts. As both the generator and period are half that of the diatonic scale, this means it forms mos scales of 4, 6, 10, 14, 24, 38, … tones.
+A more accurate system based on 10 interval classes that distinguishes major and minor chords is [[pajara]], where 50/49 remains tempered and 49/48 is equated to 25/24. An even more accurate one is [[miracle]], which equates 50/49 with 49/48 to half of 25/24 by tempering out [[2401/2400]], though its structure is more complex than that of pajara. Both of these temperaments also temper out the marvel comma, [[225/224]].
-For technical data, see [[Dicot family #Decimal]].
+{{Tdlink|Dicot family #Decimal}}
 == Interval chain ==