@@ Line 6: / Line 6: @@
 | Title = Meantone
 | Subgroups = 2.3.5, 2.3.5.7
-| Comma basis = 81/80 (2.3.5); <br>81/80, 126/125 (2.3.5.7)
+| Comma basis = [[81/80]] (2.3.5); <br>[[81/80]], [[126/125]] (2.3.5.7)
-| Generator = 3/2
+| Edo join 1 = 12 | Edo join 2 = 19
 | Mapping = 1; 1 4 10
+| Generators = 3/2
+| Generators tuning = 696.7
+| Optimization method = CWE
+| MOS scales = [[2L&nbsp;3s]], [[5L&nbsp;2s]], [[7L&nbsp;5s]], [[12L&nbsp;7s]]
 | Pergen = (P8, P5)
 | Color name = Guti
-| Edo join 1 = 12 | Edo join 2 = 19
+| Odd limit 1 = 5 | Mistuning 1 = 5.4 | Complexity 1 = 5
-| Optimization method = CWE
+| Odd limit 2 = 9 | Mistuning 2 = 10.8 | Complexity 2 = 12
-| Generator tuning = 696.7
-| MOS scales = [[2L&nbsp;3s]], [[5L&nbsp;2s]], [[7L&nbsp;5s]], [[12L&nbsp;7s]]
-| Odd limit 1 = 5 | Mistuning 1 = 5.4 | Complexity 1 = 12
-| Odd limit 2 = 9 | Mistuning 2 = 10.8 | Complexity 2 = 31
 }}
-'''Meantone''' is a familiar historical [[temperament]] based on a [[chain of fifths]] (or fourths), possessing two [[generator|generating intervals]]: the [[octave]] and the [[3/2|fifth]], from which all pitches are composed. This qualifies it as a [[rank-2 temperament]]. The octave is typically pure or close to pure, and the fifth is a few [[cents]] narrower than pure. The rationale for narrowing the fifth is to temper out the [[syntonic comma]], 81/80, which means that stacking four fifths (such as {{dash|C, G, D, A, E|hair|med}}) results in a major third (C–E) that is close to the just interval [[5/4]] rather than the more complex Pythagorean interval [[81/64]]; good tunings of meantone also lead to soft [[diatonic]] and [[Chromatic scale|chromatic]] scales, which are desirable for interval categorization.
+'''Meantone''' is a familiar [[Historical temperaments|historical temperament]] based on a [[chain of fifths]] (or fourths), possessing two [[generator|generating intervals]]: the [[octave]] and the [[3/2|fifth]], from which all pitches are composed. This qualifies it as a [[rank-2 temperament]]. The octave is typically pure or close to pure, and the fifth is a few [[cents]] narrower than pure. The rationale for narrowing the fifth is to temper out the [[syntonic comma]], 81/80, which means that stacking four fifths (such as {{dash|C, G, D, A, E|hair|med}}) results in a major third (C–E) that is close to the just interval [[5/4]] rather than the more complex Pythagorean interval [[81/64]]; good tunings of meantone also lead to soft [[diatonic]] and [[Chromatic scale|chromatic]] scales, which are desirable for interval categorization.
 [[Meantone intervals|Intervals in meantone]] have standard names based on the number of steps of the diatonic scale they span (this corresponds to the [[val]] {{val| 7 11 16 }}), with a modifier {…"double diminished", "diminished", "minor", "major", "augmented", "double augmented"…} that tells you the specific interval in increments of a chromatic semitone. Note that in a general meantone system, all of these intervals are distinct. For example, a diminished fourth is a different interval from a major third.
@@ Line 25: / Line 25: @@
 == History ==
-{{See also|Historical temperaments}}
+{{See also| Historical temperaments }}
-Meantone with fifths flatter than 700{{cent}} were the dominant tuning used in Europe from around late 15th century to around early 18th century, after which various [[well temperament]]s and eventually [[12edo|12-tone equal temperament]] won in popularity. However, even today, the vast majority of common-practice Western music theory is based exclusively on meantone, as 12-tone equal temperament is itself a meantone tuning.
+Meantone tunings with fifths flatter than 700{{cent}} were the dominant tuning used in Europe from around late 15th century to around early 18th century, after which various [[well temperament]]s and eventually 12-tone equal temperament won in popularity. However, even today, the vast majority of common-practice Western music theory is based exclusively on meantone, as 12-tone equal temperament is itself a meantone tuning.
 == Extensions ==
@@ Line 33: / Line 33: @@
 {{Wikipedia| Septimal meantone temperament }}
-'''Septimal meantone''' or '''7-limit meantone''' is a natural extension of meantone which also addresses septimal intervals including but not limited to [[7/4]], [[7/5]], and [[7/6]]. By extending the [[circle of fifths]], consonant septimal intervals start to appear. For example, 7/4 is represented by an augmented sixth and is notably present in the augmented sixth chord; it can also be seen as a diesis-flat minor seventh.
+'''Septimal meantone''' or '''7-limit meantone''' is a natural extension of meantone which also addresses septimal intervals including but not limited to [[7/4]], [[7/5]], and [[7/6]]. By extending the [[circle of fifths]], consonant septimal intervals start to appear. For example, 7/4 is represented by an augmented sixth (+10 fifths, C–A♯), and is notably present in the augmented sixth chord; it can also be seen as a diesis-flat minor seventh, as the diesis represents [[36/35]]~[[64/63]]. In septimal meantone, 7/5 is an augmented fourth, 7/6 is an augmented second, and [[9/7]] is a diminished fourth. Notably, septimal meantone equates the interval of a diminished fifth between the third and the seventh of a [[dominant seventh chord]] to [[10/7]], making it a [[9-odd-limit]] [[essentially tempered chord]]. Septimal meantone is best tuned close to [[31edo]] or [[Quarter-comma meantone|1/4-comma]].
-See [[meantone vs meanpop]] for a comparison of undecimal (11-limit) extensions.
+Extending meantone to the [[11-limit]] is not as simple. For one, there is the factorization of 81/80 as ([[121/120]])*([[243/242]]), and tempering both out leads to [[mohaha]] in the [[2.3.5.11 subgroup]], which splits the perfect fifth into two [[11/9]]~[[27/22]] neutral thirds. Adding back the septimal meantone mapping of 7 (+20 neutral thirds) gives [[migration]], but mohaha has an alternative mapping of [[7/4]] at the semi-diminished seventh (-13 neutral thirds), known as [[mohajira]]. Extensions to prime 11 generated by the perfect fifth are trickier. If 121/120 and 243/242 are not tempered out, then one of them must be mapped positively, and the other negatively. Since 121/120 is the difference between [[11/10]] and [[12/11]], it makes more sense to map it positively, and thus 243/242 negatively, leading 11/9 to be mapped wider than 27/22 and causing inconsistencies. Nonetheless, 31edo supports septimal meantone well while also having a neutral third, and there are two extensions generated by the fifth which map 11/9 to the neutral third. [[Undecimal meantone]] (also known as ''huygens'') maps 11/9 to +16 fifths (C–D𝄪) and 11/8 to +18 fifths (C–E𝄪), tempering out [[99/98]], [[176/175]], and [[441/440]]. Huygens works in the range from 31edo (696.8{{C}}) to 12edo (700{{C}}). The other extension is [[meanpop]], which maps 11/9 to -15 fifths (C–F𝄫) and 11/8 to -13 fifths (C–G𝄫), tempering out [[385/384]] and [[540/539]]. Tunings of meanpop range from 19edo (694.7{{C}}) to 31edo (696.8{{C}}).
 === Other septimal extensions ===
-There are some alternative mappings of the 7-limit meantone, including flattone, dominant and sharptone.
+There are some alternative mappings of the 7-limit meantone, including flattone and dominant.
 ==== Flattone ====
 {{Main| Flattone }}
-Flattone is an alternative extension of meantone, which represents 7/4 as a diminished seventh rather than an augmented sixth. The fifth interval is adjusted narrower, nine of which give 8/7 and thirteen of which give 10/7 with octave reduction. Alternatively, stacking three minor thirds results in a diminished seventh that is close to 7/4.
+Flattone is an alternative extension of meantone, which represents 7/4 as a diminished seventh rather than an augmented sixth. The fifth interval is adjusted narrower, nine of which give 8/7 and thirteen of which give 10/7 with octave reduction. Alternatively, stacking three minor thirds results in a diminished seventh that is close to 7/4. While less accurate than septimal meantone, flattone extends much more easily to the [[11-limit|11-]] and [[13-limit|13-]][[limit]]s, with [[11/8]] being an augmented fourth (+6 fifths, C–F♯) and [[13/8]] being a minor sixth (-4 fifths, C–A♭).
 ==== Dominant ====
 {{Main| Dominant (temperament) }}
-Dominant is an alternative extension of meantone, which represents 7/4 as a minor seventh rather than an augmented sixth. This equates 6/5 with 7/6 and 5/4 with 9/7, tempering out [[36/35]] (septimal quarter tone) and [[64/63]] (Archytas' comma).
+Dominant is an alternative extension of meantone, which represents 7/4 as a minor seventh rather than an augmented sixth. This equates 6/5 with 7/6 and 5/4 with 9/7, tempering out [[36/35]] (septimal quarter tone) and [[64/63]] (Archytas' comma). Dominant was named because the [[dominant seventh chord]] of the [[5L 2s|diatonic]] scale represents [[4:5:6:7]] in it.
 == Intervals ==
-{{main|Meantone intervals}}
+{{Main| Meantone intervals }}
 In the following tables, odd harmonics 1–15 are labeled in '''bold'''.
-<div><div style="display: inline-grid; margin-right: 25px;">
+<div style="display: inline-grid; margin-right: 25px;">
-{| class="wikitable sortable center-1 right-2"
+{| class="wikitable sortable center-1 center-2 right-3"
+|+ style="font-size: 105%;" | Intervals fifthward
 |-
-! &#35;
+! #
+! class="unsortable" | Category
 ! Cents*
 ! class="unsortable" | Approximate ratios
 |-
 | 0
+| P1
 | 0.0
 | '''1/1'''
 |-
 | 1
+| P5
 | 696.7
 | '''3/2'''
 |-
 | 2
+| M2
 | 193.3
 | '''9/8''', 10/9, 28/25
 |-
 | 3
+| M6
 | 890.0
-| 5/3, 42/25
+| 5/3
 |-
 | 4
+| M3
 | 386.6
 | '''5/4'''
 |-
 | 5
+| M7
 | 1083.3
 | '''15/8''', 28/15
 |-
 | 6
+| A4
 | 579.9
 | 7/5, 25/18
 |-
 | 7
+| A1
 | 76.6
-| 21/20, 25/24
+| 21/20, 25/24, 28/27
 |-
 | 8
+| A5
 | 773.2
 | 14/9, 25/16
 |-
 | 9
+| A2
 | 269.9
 | 7/6
 |-
 | 10
+| A6
 | 966.6
 | '''7/4'''
 |-
 | 11
+| A3
 | 463.2
 | 21/16
 |-
 | 12
+| A7
 | 1159.9
 | 35/18, 49/25, 63/32
@@ Line 116: / Line 131: @@
 </div>
 <div style="display: inline-grid; margin-right: 25px;">
-{| class="wikitable sortable center-1 right-2"
+{| class="wikitable sortable center-1 center-2 right-3"
+|+ style="font-size: 105%;" | Intervals fourthward
 |-
-! &#35;
+! #
+! class="unsortable" | Category
 ! Cents*
 ! class="unsortable" | Approximate ratios
 |-
 | 0
+| P1
 | 0.0
 | '''1/1'''
 |-
 | −1
+| P4
 | 503.3
 | 4/3
 |-
 | −2
+| m7
 | 1006.7
 | 9/5, 16/9, 25/14
 |-
 | −3
+| m3
 | 310.0
-| 6/5, 25/21
+| 6/5
 |-
 | −4
+| m6
 | 813.4
 | 8/5
 |-
 | −5
+| m2
 | 116.7
 | 15/14, 16/15
 |-
 | −6
+| d5
 | 620.1
 | 10/7, 36/25
 |-
 | −7
+| d8
 | 1123.4
-| 40/21, 48/25
+| 27/14, 40/21, 48/25
 |-
 | −8
+| d4
 | 426.8
 | 9/7, 32/25
 |-
 | −9
+| d7
 | 930.1
 | 12/7
 |-
 | −10
+| d3
 | 233.4
 | 8/7
 |-
 | −11
+| d6
 | 736.8
 | 32/21
 |-
 | −12
+| d2
 | 40.1
 | 36/35, 50/49, 64/63
 |}
 </div>
-<nowiki/>* In [[CWE]] septimal meantone
+<nowiki/>* In 7-limit [[CWE]] tuning, octave reduced
-== Chords ==
+== Chords and harmony ==
-Meantone induces [[didymic chords]], the [[essentially tempered chord]]s and associated progressions which are not found in other temperaments. Notably, the roots of the common chord progression vi-ii-V-I make up such a tetrad. Moreover, the dominant seventh chord and the half-diminished seventh chord can be seen as essentially tempered by septimal meantone.
+Meantone induces [[didymic chords]], the [[essentially tempered chord]]s and associated progressions which are not found in other temperaments. Notably, the roots of the common chord progression vi–ii–V–I make up such a tetrad. Moreover, the dominant seventh chord and the half-diminished seventh chord can be seen as essentially tempered by septimal meantone.
 == Scales ==
 {{Main| Meantone scales }}
-; EDO tunings
+; Edo tunings
 * [[Meantone5]] – pentic scale in 31edo
 * [[Meantone7]] – diatonic scale in 31edo
 * [[Meantone12]] – chromatic scale in 31edo
-; Eigenmonzo (unchanged-interval) tunings
+; Unchanged-interval (eigenmonzo) tunings
 * [[Meanwoo12]] – chromatic scale in 5/4.7-eigenmonzo tuning
 * [[Meanwoo19]] – enharmonic scale in 5/4.7-eigenmonzo tuning
@@ Line 196: / Line 226: @@
 == Tunings ==
-Common meantone tunings can be classified into [[Eigenmonzo|eigenmonzo (unchanged-interval)]] tunings, edo tunings, prime-optimized tunings and others. In eigenmonzo tunings such as the [[quarter-comma meantone]], a certain interval is tuned pure and certain others are equally off. Edo tunings like [[31edo]] have rational size relationship between steps, and happen to send an additional comma to unison. Prime-optimized tunings are optimized for all intervals. For a more complete list, see the table below. These different tunings are referred to as "temperaments" in traditional terms.
+Common meantone tunings can be classified into [[eigenmonzo|eigenmonzo (unchanged-interval)]] tunings, edo tunings, norm-based tunings and others. In eigenmonzo tunings such as the [[quarter-comma meantone]], a certain interval is tuned pure and certain others are equally off. Edo tunings like [[31edo]] have rational size relationship between steps, and happen to send an additional comma to unison. Norm-based tunings are optimized for all intervals. For a more complete list, see the table below. These different tunings are referred to as "temperaments" in traditional terms.
 ; Notable eigenmonzo (unchanged-interval) tunings
-* [[1/2-comma meantone]] &ndash; with eigenmonzo [[10/9]]
+* [[1/2-comma meantone]] – with eigenmonzo [[10/9]]
-* [[1/3-comma meantone]] &ndash; with eigenmonzo [[5/3]]
+* [[1/3-comma meantone]] – with eigenmonzo [[5/3]]
-* [[2/7-comma meantone]] &ndash; with eigenmonzo [[25/24]]
+* [[2/7-comma meantone]] – with eigenmonzo [[25/24]]
-* [[Quarter-comma meantone|1/4-comma meantone]] &ndash; with eigenmonzo [[5/4]]
+* [[Quarter-comma meantone|1/4-comma meantone]] – with eigenmonzo [[5/4]]
-* [[1/5-comma meantone]] &ndash; with eigenmonzo [[15/8]]
+* [[1/5-comma meantone]] – with eigenmonzo [[15/8]]
-* [[1/6-comma meantone]] &ndash; with eigenmonzo [[45/32]]
+* [[1/6-comma meantone]] – with eigenmonzo [[45/32]]
 * [[Ratwolf|Ratwolf tuning]]
@@ Line 213: / Line 243: @@
 * [[Lucy tuning]]
 * Equal beating tunings
+* 5-limit [[DKW theory|DKW]]: ~2 = 1200.000{{c}}, ~3/2 = 696.353{{c}}
-=== Prime-optimized tunings ===
+=== Norm-based tunings ===
 {| class="wikitable mw-collapsible mw-collapsed"
-|+ style="font-size: 105%; white-space: nowrap;" | 5-limit Prime-Optimized Tunings
+|+ style="font-size: 105%; white-space: nowrap;" | 5-limit norm-based tunings
 |-
 ! rowspan="2" |
-! colspan="2" | Euclidean
+! colspan="3" | Euclidean
 |-
-! Unskewed
+! Constrained
-! Skewed
+! Constrained & skewed
+! Destretched
 |-
 ! Equilateral
-| CEE: ~3/2 = 696.895¢<br>(4/17-comma)
+| CEE: ~3/2 = 696.8947{{c}}<br>(4/17 comma)
-| CSEE: ~3/2 = 696.453¢<br>(11/43-comma)
+| CSEE: ~3/2 = 696.4534{{c}}<br>(11/43 comma)
+| POEE: ~3/2 = 695.2311{{c}}
 |-
 ! Tenney
-| CTE: ~3/2 = 697.214¢
+| CTE: ~3/2 = 697.2143{{c}}
-| CWE: ~3/2 = 696.651¢
+| CWE: ~3/2 = 696.6512{{c}}
+| POTE: ~3/2 = 696.2387{{c}}
 |-
 ! Benedetti, <br>Wilson
-| CBE: ~3/2 = 697.374¢<br>(36/169-comma)
+| CBE: ~3/2 = 697.3738{{c}}<br>(36/169 comma)
-| CSBE: ~3/2 = 696.787¢<br>(31/129-comma)
+| CSBE: ~3/2 = 696.7868{{c}}<br>(31/129 comma)
+| POBE: ~3/2 = 696.2984{{c}}
 |}
 {| class="wikitable mw-collapsible mw-collapsed"
-|+ style="font-size: 105%; white-space: nowrap;" | 7-limit Prime-Optimized Tunings
+|+ style="font-size: 105%; white-space: nowrap;" | 7-limit norm-based tunings
 |-
 ! rowspan="2" |
-! colspan="2" | Euclidean
+! colspan="3" | Euclidean
 |-
-! Unskewed
+! Constrained
-! Skewed
+! Constrained & skewed
+! Destretched
 |-
 ! Equilateral
-| CEE: ~3/2 = 696.884¢
+| CEE: ~3/2 = 696.8843{{c}}
-| CSEE: ~3/2 = 696.725¢
+| CSEE: ~3/2 = 696.7248{{c}}
+| POEE: ~3/2 = 696.4375{{c}}
 |-
 ! Tenney
-| CTE: ~3/2 = 696.952¢
+| CTE: ~3/2 = 696.9521{{c}}
-| CWE: ~3/2 = 696.656¢
+| CWE: ~3/2 = 696.6562{{c}}
+| POTE: ~3/2 = 696.4949{{c}}
 |-
 ! Benedetti, <br>Wilson
-| CBE: ~3/2 = 697.015¢
+| CBE: ~3/2 = 697.0147{{c}}
-| CSBE: ~3/2 = 696.631¢
+| CSBE: ~3/2 = 696.6306{{c}}
+| POBE: ~3/2 = 696.4596{{c}}
+|}
+=== Target tunings ===
+{| class="wikitable center-all mw-collapsible mw-collapsed"
+|+ style="white-space: nowrap;" | Target tunings
+|-
+! rowspan="2" | Target
+! colspan="2" | Minimax
+! colspan="2" | Least squares
+|-
+! Generator
+! Eigenmonzo*
+! Generator
+! Eigenmonzo*
+|-
+| 5-odd-limit
+| ~3/2 = 696.578{{c}}<br>(1/4 comma)
+| 5/4
+| ~3/2 = 696.165{{c}}<br>(7/26 comma)
+| {{Monzo| -13 -2 7 }}
+|-
+| 7-odd-limit
+| ~3/2 = 696.578{{c}}
+| 5/4
+| ~3/2 = 696.648{{c}}
+| {{Monzo| -55 -11 1 25 }}
+|-
+| 9-odd-limit
+| ~3/2 = 696.578{{c}}
+| 5/4
+| ~3/2 = 696.436{{c}}
+| {{Monzo| 19 9 -1 -11 }}
 |}
@@ Line 264: / Line 335: @@
 {| class="wikitable center-all left-4"
 |-
-! Edo<br />Generator
+! Edo<br>generator
-! [[Eigenmonzo|Eigenmonzo<br />(Unchanged-interval)]]*
+! [[Eigenmonzo|Unchanged interval<br>(eigenmonzo)]]*
-! Generator<br />(¢)
+! Generator<br>(¢)
 ! Comments
 |-
@@ Line 272: / Line 343: @@
 | [[27/20]]
 | 680.449
-| Full comma (syntonic comma; from here onwards "comma" without an adjective refers to syntonic comma)
+| Full comma (syntonic comma; from here onwards ''comma'' without an adjective refers to syntonic comma)
 |-
 | '''[[7edo|4\7]]'''
@@ Line 292: / Line 363: @@
 | [[9/5]]
 | 691.202
-| [[1/2-comma meantone|1/2 comma]], tunings flatter than this do not fit the original sense of meantone, since their whole tones are no longer between 9/8 and 10/9, a.k.a. lower bound of 9-odd-limit diamond tradeoff
+| [[1/2-comma meantone|1/2-comma]], tunings flatter than this do not fit the original sense of meantone, since their whole tones are no longer between 9/8 and 10/9, a.k.a. lower bound of 9-odd-limit diamond tradeoff
 |-
 | [[59edo|34\59]]
@@ Line 312: / Line 383: @@
 | [[27/25]]
 | 693.352
-| [[2/5-comma meantone|2/5 comma]]
+| [[2/5-comma meantone|2/5-comma]]
 |-
 |
@@ Line 360: / Line 431: @@
 |-
 |
-| {{nowrap|''f''<sup>4</sup> &minus; 2''f'' &minus; 2 {{=}} 0}}
+| {{nowrap| ''f''<sup>4</sup> − 2''f'' − 2 {{=}} 0 }}
 | 695.630
-| 1–3–5 equal-beating tuning, Wilson's "metameantone" ([[DR]] 4:5:6), virtually 5/17 comma
+| 1–3–5 equal-beating tuning, Wilson's "metameantone" ([[DR]] 4:5:6), virtually 5/17-comma
 |-
 | [[69edo|40\69]]
@@ Line 372: / Line 443: @@
 | [[25/24]]
 | 695.810
-| [[2/7-comma meantone|2/7 comma]], virtually also [[DR]] 10:12:15
+| [[2/7-comma meantone|2/7-comma]], virtually also [[DR]] 10:12:15
 |-
 |
@@ Line 380: / Line 451: @@
 |-
 |
-|
+| 3125/2304
 | 695.981
-| [[5/18-comma meantone|5/18 comma]]
+| [[5/18-comma meantone|5/18-comma]]
 |-
 |
@@ Line 397: / Line 468: @@
 | [[15/14]]
 | 696.111
 |
 |-
 |
 | [[78125/73728]]
 | 696.165
-| [[7/26-comma meantone|7/26 comma]], [[5-odd-limit]] least squares
+| [[7/26-comma meantone|7/26-comma]], 5-odd-limit least squares
 |-
-| {{nowrap|(8 &minus; φ)\11}}
+| {{nowrap| (8 − φ)\11 }}
 |
 | 696.214
@@ Line 428: / Line 499: @@
 | 696.319
 |
-|-
-|
-| [[19/16]]
-| 696.340
-| As AAAA1
-|-
-|
-| [[17/16]]
-| 696.344
-| As AAA7
 |-
 |
@@ Line 443: / Line 504: @@
 | 696.399
 |
-|-
-|
-| {{Monzo| 19 9 -1 -11 }}
-| 696.436
-| 9-odd-limit least squares
 |-
 |
@@ Line 463: / Line 519: @@
 | 696.626
 |
-|-
-|
-| {{monzo| -55 -11 1 25 }}
-| 696.648
-| [[7-odd-limit]] least squares
 |-
 | [[31edo|18\31]]
@@ Line 485: / Line 536: @@
 |-
 |
-| [[1875/1024]]
+| 1875/1024
 | 696.895
-| [[4/17-comma meantone|4/17 comma]]; 2.3.5 [[CEE]] tuning
+| [[4/17-comma meantone|4/17-comma]]; 5-limit [[CEE]] tuning
 |-
 |
@@ Line 507: / Line 558: @@
 | [[75/64]]
 | 697.176
-| [[2/9-comma meantone|2/9 comma]]
+| [[2/9-comma meantone|2/9-comma]]
 |-
 |
-| {{nowrap|''f''<sup>4</sup> + 2''f'' &minus; 8 {{=}} 0}}
+| {{nowrap|''f''<sup>4</sup> + 2''f'' − 8 {{=}} 0}}
 | 697.278
-| 1–3–5 equal-beating tuning ([[DR]] 3:4:5), virtually 5/23 comma
+| 1–3–5 equal-beating tuning ([[DR]] 3:4:5), virtually 5/23-comma
 |-
 | [[74edo|43\74]]
@@ Line 525: / Line 576: @@
 |-
 |
-|
+| 1125/1024
 | 697.347
-| [[3/14-comma meantone|3/14 comma]]
+| [[3/14-comma meantone|3/14-comma]]
 |-
-| {{nowrap|(√(10) &minus; 2)\2}}
+| {{nowrap|(√(10) − 2)\2}}
 |
 | 697.367
@@ Line 542: / Line 593: @@
 | [[15/8]]
 | 697.654
-| [[1/5-comma meantone|1/5 comma]]
+| [[1/5-comma meantone|1/5-comma]]
 |-
 | [[43edo|25\43]]
@@ Line 592: / Line 643: @@
 | [[45/32]]
 | 698.371
-| [[1/6-comma meantone|1/6 comma]]
+| [[1/6-comma meantone|1/6-comma]]
 |-
 | [[67edo|39\67]]
@@ Line 600: / Line 651: @@
 |-
 |
-|
+| {{monzo|-23 9 4}}
 | 698.514
-| [[4/25-comma meantone|4/25 comma]]
+| [[4/25-comma meantone|4/25-comma]]
 |-
 |
@@ Line 617: / Line 668: @@
 | [[135/128]]
 | 698.883
-| [[1/7-comma meantone|1/7 comma]]
+| [[1/7-comma meantone|1/7-comma]]
 |-
 | [[91edo|53\91]]
@@ Line 647: / Line 698: @@
 |
 | '''700.000'''
-| '''Upper bound of 7- and 9-odd-limit diamond monotone''', 1/12 Pythagorean comma, virtually [[1/11-comma meantone]] (the difference is too small to appear in the digits provided here)
+| '''Upper bound of 7- and 9-odd-limit diamond monotone''', 1/12 Pythagorean comma, virtually [[1/11-comma meantone|1/11-comma]]†
-|-
-|
-| [[17/9]]
-| 700.209
-| As M7
 |-
 |
@@ Line 669: / Line 715: @@
 | '''Upper bound of 5-odd-limit diamond monotone'''
 |}
-<nowiki />* Besides the octave
+<nowiki/>* Besides the octave
+† The difference is too small to appear in the digits provided here
 === Formula for ''n''-comma meantone ===
 The [[generator]] ''g'' of ''n''-comma meantone, where ''n'' is a fraction (like 1/5, 2/9, etc.), can be found by
-<math>\displaystyle g = g_J - ng_c</math>
+$$ g = g_J - ng_c $$
 where {{nowrap|''g''<sub>''J''</sub> {{=}} 701.955001}} cents is the size of the just perfect fifth, and ''g''<sub>c</sub> = 21.506290 cents is the size of the syntonic comma.
@@ Line 680: / Line 728: @@
 Conversely, ''n'' can be found by
-<math>\displaystyle n = (g_J - g)/g_c</math>
+$$ n = (g_J - g)/g_c $$
-=== Other tunings ===
-* [[DKW theory|DKW]] (2.3.5): ~2 = 1\1, ~3/2 = 696.353
 == Music ==
@@ Line 689: / Line 734: @@
 == See also ==
-* [[Angel]] &ndash; fifth-equivalent or 5/1-equivalent meantone
+* [[Angel]] – fifth-equivalent or 5/1-equivalent meantone
 == External links ==

Meantone: Difference between revisions