Dicot: Difference between revisions

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{{Infobox ~~Regtemp~~

{{Infobox regtemp

| Title = Dicot

| Subgroups = 2.3.5

| Subgroups = 2.3.5, 2.3.5.11

| Comma basis = [[25/24]]

| Comma basis = [[25/24]] (2.3.5);<br>[[25/24]], [[45/44]] (2.3.5.11)

| Edo join 1 = 3 | Edo join 2 = 7

| Edo join 1 = 7 | Edo join 2 = 10

| Mapping = 1; 2 1 5

| Generators = 6/5 | Generators tuning = 351.1 | Optimization method = CWE

| MOS scales = [[3L 1s]], [[3L 4s]], [[7L 3s]]

~~| Mapping = 1; 2 1~~

| Pergen = (P8, P5/2)

| Odd limit 1 = 5 | Mistuning 1 = 35.3 | Complexity 1 = 3

| Odd limit 2 = 5~~-limit 9~~ | Mistuning 2 = 35.3 | Complexity 2 = 7

| Odd limit 2 = 2.3.5.11 15 | Mistuning 2 = 35.3 | Complexity 2 = 7

}}

{{About|the regular temperament|the ploidacot signature|Ploidacot/Dicot}}

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'''Dicot''' is an [[exotemperament]] that [[tempering out|tempers out]] [[25/24]]. It is also the first fully prototypical [[ploidacot/Dicot|dicot]] temperament. It tempers [[6/5]] and [[5/4]] into the same [[neutral third]] interval, which, when the fifth is tuned pure, is [[sqrt(3/2)]]. It is useful to represent the structure of [[5-limit]] harmonies without fully representing them in its greater accuracy, with [[mos scale]]s [[3L 4s]] and [[7L 3s]].

It can be extended by tempering out [[15/14]] and [[36/35]] in the [[7-limit]], though this could turn the [[3L 4s]] [[mos]] into a [[4L 3s]] [[mos]]. This makes [[7/6]] and [[9/7]] equated to the neutral third, viewing [[6:7:9]] as a tertian chord.

It can be extended by tempering out [[15/14]] and [[36/35]] in the [[7-limit]], called ''[[mujannabic]]'', though this could turn the [[3L 4s]] [[mos]] into a [[4L 3s]] [[mos]]. This makes [[7/6]] and [[9/7]] equated to the neutral third, viewing [[6:7:9]] as a tertian chord.

Another notable extension of dicot is [[decimal]], which splits the octave in two for [[7/5]][[~]][[10/7]] by tempering out [[50/49]], and equates [[7/6]] and [[8/7]] to the tritone complement of 5/4~6/5, neutralizing the 6:7:8 chord as well. This represents the structure of 7-limit harmonies in a way that is not based on tertian harmony and a heptatonic system, but rather a decatonic one.

Another notable extension of dicot is [[decimal]], which splits the octave in two for [[7/5]][[~]][[10/7]] by tempering out [[50/49]], and equates [[7/6]] and [[8/7]] to the tritone complement of 5/4~6/5, neutralizing the [[6:7:8]] chord as well. This represents the structure of 7-limit harmonies in a way that is not based on tertian harmony and a heptatonic system, but rather a decatonic one.

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

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== Tunings ==

=== Norm-based tunings ===

{| class="wikitable mw-collapsible mw-collapsed"

|+ style="font-size: 105%; white-space: nowrap;" | 5-limit norm-based tunings

|-

! rowspan="2" |

! colspan="3" | Euclidean

|-

! Constrained

! Constrained & skewed

! Destretched

|-

! Tenney

| CTE: ~5/4 = 354.664{{C}}

| CWE: ~5/4 = 351.086{{C}}

| POTE: ~5/4 = 348.594{{C}}

|}

{| class="wikitable mw-collapsible mw-collapsed"

|+ style="font-size: 105%; white-space: nowrap;" | 2.3.5.11-subgroup norm-based tunings

|-

! rowspan="2" |

! colspan="3" | Euclidean

|-

! Constrained

! Constrained & skewed

! Destretched

|-

! Tenney

| CTE: ~5/4 = 352.287{{C}}

| CWE: ~5/4 = 348.954{{C}}

| POTE: ~5/4 = 346.734{{C}}

|}

=== Tuning spectrum ===

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| '''[[4edo|1\4]]''' || || '''300.000''' || '''Lower bound of 5-odd-limit diamond monotone'''

|-

| || 5/3 || 315.641 || Full comma

| || [[5/3]] || 315.641 || Full comma

|-

| || 9/5 || 339.199 || 2/3-comma

| [[11edo|3\11]] || || 327.273 || 11c val

|-

| || [[9/5]] || 339.199 || 2/3-comma

|-

| '''[[7edo|2\7]]''' || || '''342.857''' || '''Lower bound of 5-limit 9-odd-limit diamond monotone'''

|-

| || 27/20 || 343.910 || 3/5-comma

| || [[27/20]] || 343.910 || 3/5-comma

|-

| [[24edo|7\24]] || || 350.000 || 24c val

|-

| || 3/2 || 350.978 || 1/2-comma

| || [[3/2]] || 350.978 || 1/2-comma

|-

| [[17edo|5\17]] || || 352.941 ||

|-

| || 45/32 || 358.045 || 2/5-comma

| || [[45/32]] || 358.045 || 2/5-comma

|-

| [[10edo|3\10]] || || 360.000 ||

|-

| || 15/8 || 362.756 || 1/3-comma

| || [[15/8]] || 362.756 || 1/3-comma

|-

| [[13edo|4\13]] || || 369.231 ||

|-

| || 5/4 || 386.314 || Untempered tuning

| || [[5/4]] || 386.314 || Untempered tuning

|-

| '''[[3edo|1\3]]''' || || '''400.000''' || '''Upper bound of 5-odd-limit, <br>and 5-limit 9-odd-limit diamond monotone'''

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<nowiki/>* Besides the octave

[[Category:Dicot| ]]

[[Category:Rank-2 temperaments]]

[[Category:Exotemperaments]]

[[Category:Dicot family]]

~~[[Category:Mint temperaments]]~~

~~[[Category:Keemic temperaments]]~~

@@ Line 1: / Line 1: @@
-{{Infobox Regtemp
+{{Infobox regtemp
 | Title = Dicot
-| Subgroups = 2.3.5
+| Subgroups = 2.3.5, 2.3.5.11
-| Comma basis = [[25/24]]
+| Comma basis = [[25/24]] (2.3.5);<br>[[25/24]], [[45/44]] (2.3.5.11)
-| Edo join 1 = 3 | Edo join 2 = 7
+| Edo join 1 = 7 | Edo join 2 = 10
+| Mapping = 1; 2 1 5
 | Generators = 6/5 | Generators tuning = 351.1 | Optimization method = CWE
 | MOS scales = [[3L 1s]], [[3L 4s]], [[7L 3s]]
-| Mapping = 1; 2 1
 | Pergen = (P8, P5/2)
 | Odd limit 1 = 5 | Mistuning 1 = 35.3 | Complexity 1 = 3
-| Odd limit 2 = 5-limit 9 | Mistuning 2 = 35.3 | Complexity 2 = 7
+| Odd limit 2 = 2.3.5.11 15 | Mistuning 2 = 35.3 | Complexity 2 = 7
 }}
 {{About|the regular temperament|the ploidacot signature|Ploidacot/Dicot}}
@@ Line 15: / Line 15: @@
 '''Dicot''' is an [[exotemperament]] that [[tempering out|tempers out]] [[25/24]]. It is also the first fully prototypical [[ploidacot/Dicot|dicot]] temperament. It tempers [[6/5]] and [[5/4]] into the same [[neutral third]] interval, which, when the fifth is tuned pure, is [[sqrt(3/2)]]. It is useful to represent the structure of [[5-limit]] harmonies without fully representing them in its greater accuracy, with [[mos scale]]s [[3L 4s]] and [[7L 3s]].
-It can be extended by tempering out [[15/14]] and [[36/35]] in the [[7-limit]], though this could turn the [[3L 4s]] [[mos]] into a [[4L 3s]] [[mos]]. This makes [[7/6]] and [[9/7]] equated to the neutral third, viewing [[6:7:9]] as a tertian chord.
+It can be extended by tempering out [[15/14]] and [[36/35]] in the [[7-limit]], called ''[[mujannabic]]'', though this could turn the [[3L 4s]] [[mos]] into a [[4L 3s]] [[mos]]. This makes [[7/6]] and [[9/7]] equated to the neutral third, viewing [[6:7:9]] as a tertian chord.
-Another notable extension of dicot is [[decimal]], which splits the octave in two for [[7/5]][[~]][[10/7]] by tempering out [[50/49]], and equates [[7/6]] and [[8/7]] to the tritone complement of 5/4~6/5, neutralizing the 6:7:8 chord as well. This represents the structure of 7-limit harmonies in a way that is not based on tertian harmony and a heptatonic system, but rather a decatonic one.
+Another notable extension of dicot is [[decimal]], which splits the octave in two for [[7/5]][[~]][[10/7]] by tempering out [[50/49]], and equates [[7/6]] and [[8/7]] to the tritone complement of 5/4~6/5, neutralizing the [[6:7:8]] chord as well. This represents the structure of 7-limit harmonies in a way that is not based on tertian harmony and a heptatonic system, but rather a decatonic one.
 For technical data, see [[Dicot family #Dicot]].
@@ Line 42: / Line 42: @@
 == Tunings ==
 === Norm-based tunings ===
-{{Todo|complete section|inline=1}}
+{| class="wikitable mw-collapsible mw-collapsed"
+|+ style="font-size: 105%; white-space: nowrap;" | 5-limit norm-based tunings
+|-
+! rowspan="2" |
+! colspan="3" | Euclidean
+|-
+! Constrained
+! Constrained & skewed
+! Destretched
+|-
+! Tenney
+| CTE: ~5/4 = 354.664{{C}}
+| CWE: ~5/4 = 351.086{{C}}
+| POTE: ~5/4 = 348.594{{C}}
+|}
+{| class="wikitable mw-collapsible mw-collapsed"
+|+ style="font-size: 105%; white-space: nowrap;" | 2.3.5.11-subgroup norm-based tunings
+|-
+! rowspan="2" |
+! colspan="3" | Euclidean
+|-
+! Constrained
+! Constrained & skewed
+! Destretched
+|-
+! Tenney
+| CTE: ~5/4 = 352.287{{C}}
+| CWE: ~5/4 = 348.954{{C}}
+| POTE: ~5/4 = 346.734{{C}}
+|}
 === Tuning spectrum ===
@@ Line 51: / Line 80: @@
 | '''[[4edo|1\4]]''' ||  || '''300.000''' || '''Lower bound of 5-odd-limit diamond monotone'''
 |-
-|  || 5/3 || 315.641 || Full comma
+|  || [[5/3]] || 315.641 || Full comma
 |-
-|  || 9/5 || 339.199 || 2/3-comma
+| [[11edo|3\11]] || || 327.273 || 11c val
+|-
+|  || [[9/5]] || 339.199 || 2/3-comma
 |-
 | '''[[7edo|2\7]]''' ||  || '''342.857''' || '''Lower bound of 5-limit 9-odd-limit diamond monotone'''
 |-
-|  || 27/20 || 343.910 || 3/5-comma
+|  || [[27/20]] || 343.910 || 3/5-comma
 |-
 | [[24edo|7\24]] ||  || 350.000 || 24c val
 |-
-|  || 3/2 || 350.978 || 1/2-comma
+|  || [[3/2]] || 350.978 || 1/2-comma
 |-
 | [[17edo|5\17]] ||  || 352.941 ||
 |-
-|  || 45/32 || 358.045 || 2/5-comma
+|  || [[45/32]] || 358.045 || 2/5-comma
 |-
 | [[10edo|3\10]] ||  || 360.000 ||
 |-
-|  || 15/8 || 362.756 || 1/3-comma
+|  || [[15/8]] || 362.756 || 1/3-comma
+|-
+| [[13edo|4\13]] || || 369.231 ||
 |-
-|  || 5/4 || 386.314 || Untempered tuning
+|  || [[5/4]] || 386.314 || Untempered tuning
 |-
 | '''[[3edo|1\3]]''' ||  || '''400.000''' || '''Upper bound of 5-odd-limit, <br>and 5-limit 9-odd-limit diamond monotone'''
@@ Line 77: / Line 110: @@
 <nowiki/>* Besides the octave
+[[Category:Dicot| ]] <!-- main article -->
 [[Category:Rank-2 temperaments]]
 [[Category:Exotemperaments]]
 [[Category:Dicot family]]
-[[Category:Mint temperaments]]
-[[Category:Keemic temperaments]]