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| <h2>IMPORTED REVISION FROM WIKISPACES</h2>
| | {{Interwiki |
| This is an imported revision from Wikispaces. The revision metadata is included below for reference:<br>
| | |en=2L 3s |
| : This revision was by author [[User:xenwolf|xenwolf]] and made on <tt>2016-11-07 03:26:32 UTC</tt>.<br>
| | |es= |
| : The original revision id was <tt>598651126</tt>.<br>
| | |de= |
| : The revision comment was: <tt></tt><br>
| | |ja=2L 3s |
| The revision contents are below, presented both in the original Wikispaces Wikitext format, and in HTML exactly as Wikispaces rendered it.<br>
| | }} |
| <h4>Original Wikitext content:</h4>
| | {{Infobox MOS |
| <div style="width:100%; max-height:400pt; overflow:auto; background-color:#f8f9fa; border: 1px solid #eaecf0; padding:0em"><pre style="margin:0px;border:none;background:none;word-wrap:break-word;white-space: pre-wrap ! important" class="old-revision-html">"Classic" [[pentatonic]]. Perhaps the most common scale in the world.
| | | Name = pentic |
| | | Periods = 1 |
| | | nLargeSteps = 2 |
| | | nSmallSteps = 3 |
| | | Equalized = 2 |
| | | Collapsed = 1 |
| | | Pattern = LsLss |
| | }} |
|
| |
|
| The [[meantone]] pentatonic scale, in which the generator approximates 4/3 but other intervals in the scale approximate 6/5 and 5/4, has by far the lowest harmonic entropy of all 5-note MOS scales, which explains the worldwide popularity of these scales and their very long history of use. It is also strictly [[Rothenberg propriety|proper]].
| | : ''For the 3/2-equivalent 2L 3s pattern, see [[2L 3s (3/2-equivalent)]].'' |
| ||||||||||||~ Generator ||~ Cents ||~ s ||~ L-s ||~ |L-2s| ||~ Scale steps ||~ Trichord ||~ Comments ||
| |
| || 2\5 || || || || || || 480 || 240 || 0 || 240 || 1 1 1 1 1 || 1 1 ||= ||
| |
| || || || || || || 11\27 || 488.89 || 222.22 || 44.44 || 177.78 || 6 5 5 6 5 || 6 5 ||= Slendro (insofar as it resembles a MOS)
| |
| would be in this region ||
| |
| || || || || || 9\22 || || 490.91 || 218.18 || 54.545 || 163.64 || 5 4 4 5 4 || 5 4 ||= ||
| |
| || || || || || || 16\39 || 492.31 || 215.38 || 61.54 || 153.85 || 9 7 7 9 7 || 9 7 ||= No-5's superpyth/dominant is around here ||
| |
| || || || || 7\17 || || || 494.12 || 211.76 || 70.59 || 141.18 || 4 3 3 4 3 || 4 3 ||= ||
| |
| || || || || || || 19\46 || 495.65 || 208.7 || 78.26 || 130.435 || 11 8 8 11 8 || 11 8 || ||
| |
| || || || || || 12\29 || || 496.55 || 206.9 || 82.76 || 124.14 || 7 5 5 7 5 || 7 5 ||= ||
| |
| || || || || || || 17\41 || 497.56 || 204.88 || 87.8 || 117.07 || 10 7 7 10 7 || 10 7 ||= Pythagorean pentatonic is around here ||
| |
| || || || 5\12 || || || || 500 || 200 || 100 || 100 || 3 2 2 3 2 || 3 2 ||= Familiar 12-equal pentatonic
| |
| (also optimum rank range: L/s=3/2) ||
| |
| || || || || || || || 502.305 || 195.39 || 111.53 || 83.86 || pi 2 pi 2 2 || pi 2 || ||
| |
| || || || || || || 18\43 || 502.33 || 195.35 || 111.63 || 83.72 || 11 7 7 11 7 || 11 7 || ||
| |
| || || || || || 13\31 || || 503.23 || 193.55 || 116.13 || 77.42 || 8 5 5 8 5 || 8 5 ||= Optimal meantone pentatonic
| |
| is around here ||
| |
| || || || || || || || 1200/(4-phi) || 192.43 || 118.93 || 73.50 || phi 1 1 phi 1 || phi 1 ||= Golden meantone ||
| |
| || || || || || || 21\50 || 504 || 192 || 120 || 72 || 13 8 8 13 8 || 13 8 ||= ||
| |
| || || || || 8\19 || || || 505.26 || 189.47 || 126.32 || 63.16 || 5 3 3 5 3 || 5 3 ||= ||
| |
| || || || || || || 19\45 || 506.67 || 186.67 || 133.33 || 53.33 || 12 7 7 12 7 || 12 7 || ||
| |
| || || || || || || || 507.18 || 185.64 || 135.9 || 49.74 || √3 1 √3 1 1 || √3 1 || ||
| |
| || || || || || 11\26 || || 507.69 || 184.615 || 138.46 || 46.15 || 7 4 4 7 4 || 7 4 || ||
| |
| || || || || || || 14\33 || 509.09 || 181.82 || 145.455 || 36.36 || 9 5 5 9 5 || 9 5 || ||
| |
| || || 3\7 || || || || || 514.29 || 171.43 || 171.43 || 0 || 2 1 1 2 1 || 2 1 ||= (Boundary of propriety: smaller
| |
| generators than this are strictly proper) ||
| |
| || || || || || || 13\30 || 520 || 160 || 200 || 40 || 9 4 4 9 4 || 9 4 || ||
| |
| ||< ||< ||< ||< ||< 10\23 ||< ||< 521.74 ||< 156.52 ||< 208.7 ||< 52.17 ||< 7 3 3 7 3 || 7 3 ||< ||
| |
| || || || || || || 17\39 || 523.08 || 153.84 || 215.385 || 61.54 || 12 5 5 12 5 || 12 5 || ||
| |
| || || || || 7\16 || || || 525 || 150 || 225 || 75 || 5 2 2 5 2 || 5 2 ||= 5-note subset of pelog (insofar as it
| |
| resembles a MOS) would be in this region ||
| |
| || || || || || || 18\41 || 526.83 || 146.34 || 234.15 || 87.8 || 13 5 5 13 5 || 13 5 || ||
| |
| || || || || || || || 600(25+√5)/31 || 145.7 || 235.75 || 90.05 || phi+1 1 1 phi+1 1 || phi+1 1 || ||
| |
| || || || || || 11\25 || || 528 || 144 || 240 || 96 || 8 3 3 8 3 || 8 3 || ||
| |
| || || || || || || || 528.88 || 142.24 || 244.405 || 102.17 || e 1 e 1 1 || e 1 ||= L/s = e ||
| |
| || || || || || || 15\34 || 529.41 || 141.18 || 247.06 || 105.88 || 11 4 4 11 4 || 11 4 || ||
| |
| || || || 4\9 || || || || 533.33 || 133.33 || 266.67 || 133.33 || 3 1 1 3 1 || 3 1 ||= L/s = 3 ||
| |
| || || || || || || || 535.36 || 129.26 || 276.835 || 147.57 || pi 1 pi 1 1 || pi 1 ||= <span style="display: block; text-align: center;">L/s = pi</span> ||
| |
| || || || || || || 13\29 || 537.93 || 124.14 || 289.655 || 165.52 || 10 3 3 10 3 || 10 3 || ||
| |
| || || || || || 9\20 || || 540 || 120 || 240 || 180 || 7 2 2 7 2 || 7 2 || ||
| |
| || || || || || || 14\31 || 541.935 || 116.13 || 309.68 || 193.55 || 11 3 3 11 3 || 11 3 || ||
| |
| || || || || 5\11 || || || 545.45 || 109.09 || 327.27 || 218.18 || 4 1 1 4 1 || 4 1 ||= L/s = 4 ||
| |
| || || || || || || 11\24 || 550 || 100 || 350 || 250 || 9 2 2 9 2 || 9 2 || ||
| |
| || || || || || 6\13 || || 553.85 || 92.31 || 369.23 || 276.92 || 5 1 1 5 1 || 5 1 || ||
| |
| || || || || || || 7\15 || 560 || 80 || 480 || 400 || 6 1 1 6 1 || 6 1 || ||
| |
| || 1\2 || || || || || || 600 || 0 || 600 || 600 || 1 0 0 1 0 || 1 0 ||= a degenerated pentatonic scale with only 2 different steps ||
| |
|
| |
|
| From a [[3-limit]] perspective, just make a chain of four 4/3's and octave-reduce, and you end up with pentatonic.
| | {{MOS intro}} This scale is the "classic" pentatonic scale, which is perhaps the most common scale in the world. |
| | |
| | The [[meantone]] pentatonic scale, in which the generator approximates 4/3 but other intervals in the scale approximate 6/5 and 5/4, has by far the lowest [[harmonic entropy]] of all 5-note MOS scales, which explains the worldwide popularity of these scales and their very long history of use. It is also strictly [[Rothenberg propriety|proper]]. |
| | |
| | == Names == |
| | The [[TAMNAMS]] system suggests the name '''pentic''', derived from an [[Wiktionary: pent #Etymology 2|informal clipping of "pentatonic"]] that is sometimes used to refer to this scale. |
| | |
| | == Scale properties == |
| | {{TAMNAMS use}} |
| | |
| | === Intervals === |
| | {{MOS intervals}} |
| | |
| | === Generator chain === |
| | {{MOS genchain}} |
| | |
| | === Modes === |
| | {{MOS mode degrees}} |
| | |
| | === Mode names === |
| | There are three sets of mode names: descriptive, modal (5 of the 7 heptatonic modes), and traditional Chinese. |
| | {{MOS modes |
| | | Table Headers= |
| | Descriptive $ |
| | Modal $ |
| | Chinese $ |
| | | Table Entries= |
| | Fifthless $ |
| | Phrygian $ |
| | Jué (角) $ |
| | Minor $ |
| | Aeolian $ |
| | Yǔ (羽) $ |
| | Thirdless Minor* $ |
| | Dorian $ |
| | Shāng (商) $ |
| | Thirdless Major* $ |
| | Mixolydian $ |
| | Zhǐ (徵) $ |
| | Major $ |
| | Ionian $ |
| | Gōng (宫) $ |
| | }} |
| | <nowiki />* Thirdless Minor/Major is also known as Suspended Minor/Major |
| | |
| | == Scales == |
| | === Scale list === |
| | * [[Archy5]] – 49edo tuning |
| | * [[Edson5]] – 29edo tuning |
| | * [[Pythagorean5]] – Pythagorean tuning |
| | * [[Meantone5]] – 31edo tuning |
|
| |
|
| From a [[5-limit]] perspective, the most interesting temperaments with this kind of pentatonic scale are [[meantone]] and [[Pelogic family|mavila]].
| | === Scale tree === |
| | {{MOS tuning spectrum |
| | | Depth = 6 |
| | | 6/5 = Slendro (insofar as it resembles a MOS) would<br />be in this region |
| | | 9/7 = No-5s [[superpyth]]/dominant is around here |
| | | 13/9 = Pythagorean pentatonic is around here |
| | | 3/2 = Familiar [[12edo|12-equal]] pentatonic |
| | | 8/5 = Optimal meantone pentatonic is around here |
| | | 5/2 = Five-note subset of [[pelog]] (insofar as it<br />resembles a MOS) would be in this region |
| | }} |
|
| |
|
| There is also the interesting 2.3.7 temperament that tempers out [[64_63|64/63]] ("no-fives [[dominant]]").</pre></div>
| | From a [[3-limit]] perspective, just make a chain of four 4/3's and octave-reduce, and you end up with pentatonic. |
| <h4>Original HTML content:</h4>
| |
| <div style="width:100%; max-height:400pt; overflow:auto; background-color:#f8f9fa; border: 1px solid #eaecf0; padding:0em"><pre style="margin:0px;border:none;background:none;word-wrap:break-word;width:200%;white-space: pre-wrap ! important" class="old-revision-html"><html><head><title>2L 3s</title></head><body>&quot;Classic&quot; <a class="wiki_link" href="/pentatonic">pentatonic</a>. Perhaps the most common scale in the world.<br />
| |
| <br />
| |
| The <a class="wiki_link" href="/meantone">meantone</a> pentatonic scale, in which the generator approximates 4/3 but other intervals in the scale approximate 6/5 and 5/4, has by far the lowest harmonic entropy of all 5-note MOS scales, which explains the worldwide popularity of these scales and their very long history of use. It is also strictly <a class="wiki_link" href="/Rothenberg%20propriety">proper</a>.<br />
| |
|
| |
|
| | From a [[5-limit]] perspective, the most interesting temperaments with this kind of pentatonic scale are [[meantone]] and [[mavila]]. |
|
| |
|
| <table class="wiki_table">
| | There is also the 2.3.7 temperament that tempers out [[64/63]] ([[archy]], "no-fives [[Meantone family#Dominant|dominant]]"). |
| <tr>
| |
| <th colspan="6">Generator<br />
| |
| </th>
| |
| <th>Cents<br />
| |
| </th>
| |
| <th>s<br />
| |
| </th>
| |
| <th>L-s<br />
| |
| </th>
| |
| <th>|L-2s|<br />
| |
| </th>
| |
| <th>Scale steps<br />
| |
| </th>
| |
| <th>Trichord<br />
| |
| </th>
| |
| <th>Comments<br />
| |
| </th>
| |
| </tr>
| |
| <tr>
| |
| <td>2\5<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>480<br />
| |
| </td>
| |
| <td>240<br />
| |
| </td>
| |
| <td>0<br />
| |
| </td>
| |
| <td>240<br />
| |
| </td>
| |
| <td>1 1 1 1 1<br />
| |
| </td>
| |
| <td>1 1<br />
| |
| </td>
| |
| <td style="text-align: center;"><br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>11\27<br />
| |
| </td>
| |
| <td>488.89<br />
| |
| </td>
| |
| <td>222.22<br />
| |
| </td>
| |
| <td>44.44<br />
| |
| </td>
| |
| <td>177.78<br />
| |
| </td>
| |
| <td>6 5 5 6 5<br />
| |
| </td>
| |
| <td>6 5<br />
| |
| </td>
| |
| <td style="text-align: center;">Slendro (insofar as it resembles a MOS)<br />
| |
| would be in this region<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>9\22<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>490.91<br />
| |
| </td>
| |
| <td>218.18<br />
| |
| </td>
| |
| <td>54.545<br />
| |
| </td>
| |
| <td>163.64<br />
| |
| </td>
| |
| <td>5 4 4 5 4<br />
| |
| </td>
| |
| <td>5 4<br />
| |
| </td>
| |
| <td style="text-align: center;"><br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>16\39<br />
| |
| </td>
| |
| <td>492.31<br />
| |
| </td>
| |
| <td>215.38<br />
| |
| </td>
| |
| <td>61.54<br />
| |
| </td>
| |
| <td>153.85<br />
| |
| </td>
| |
| <td>9 7 7 9 7<br />
| |
| </td>
| |
| <td>9 7<br />
| |
| </td>
| |
| <td style="text-align: center;">No-5's superpyth/dominant is around here<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>7\17<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>494.12<br />
| |
| </td>
| |
| <td>211.76<br />
| |
| </td>
| |
| <td>70.59<br />
| |
| </td>
| |
| <td>141.18<br />
| |
| </td>
| |
| <td>4 3 3 4 3<br />
| |
| </td>
| |
| <td>4 3<br />
| |
| </td>
| |
| <td style="text-align: center;"><br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>19\46<br />
| |
| </td>
| |
| <td>495.65<br />
| |
| </td>
| |
| <td>208.7<br />
| |
| </td>
| |
| <td>78.26<br />
| |
| </td>
| |
| <td>130.435<br />
| |
| </td>
| |
| <td>11 8 8 11 8<br />
| |
| </td>
| |
| <td>11 8<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>12\29<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>496.55<br />
| |
| </td>
| |
| <td>206.9<br />
| |
| </td>
| |
| <td>82.76<br />
| |
| </td>
| |
| <td>124.14<br />
| |
| </td>
| |
| <td>7 5 5 7 5<br />
| |
| </td>
| |
| <td>7 5<br />
| |
| </td>
| |
| <td style="text-align: center;"><br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>17\41<br />
| |
| </td>
| |
| <td>497.56<br />
| |
| </td>
| |
| <td>204.88<br />
| |
| </td>
| |
| <td>87.8<br />
| |
| </td>
| |
| <td>117.07<br />
| |
| </td>
| |
| <td>10 7 7 10 7<br />
| |
| </td>
| |
| <td>10 7<br />
| |
| </td>
| |
| <td style="text-align: center;">Pythagorean pentatonic is around here<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>5\12<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>500<br />
| |
| </td>
| |
| <td>200<br />
| |
| </td>
| |
| <td>100<br />
| |
| </td>
| |
| <td>100<br />
| |
| </td>
| |
| <td>3 2 2 3 2<br />
| |
| </td>
| |
| <td>3 2<br />
| |
| </td>
| |
| <td style="text-align: center;">Familiar 12-equal pentatonic<br />
| |
| (also optimum rank range: L/s=3/2)<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>502.305<br />
| |
| </td>
| |
| <td>195.39<br />
| |
| </td>
| |
| <td>111.53<br />
| |
| </td>
| |
| <td>83.86<br />
| |
| </td>
| |
| <td>pi 2 pi 2 2<br />
| |
| </td>
| |
| <td>pi 2<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>18\43<br />
| |
| </td>
| |
| <td>502.33<br />
| |
| </td>
| |
| <td>195.35<br />
| |
| </td>
| |
| <td>111.63<br />
| |
| </td>
| |
| <td>83.72<br />
| |
| </td>
| |
| <td>11 7 7 11 7<br />
| |
| </td>
| |
| <td>11 7<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>13\31<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>503.23<br />
| |
| </td>
| |
| <td>193.55<br />
| |
| </td>
| |
| <td>116.13<br />
| |
| </td>
| |
| <td>77.42<br />
| |
| </td>
| |
| <td>8 5 5 8 5<br />
| |
| </td>
| |
| <td>8 5<br />
| |
| </td>
| |
| <td style="text-align: center;">Optimal meantone pentatonic<br />
| |
| is around here<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>1200/(4-phi)<br />
| |
| </td>
| |
| <td>192.43<br />
| |
| </td>
| |
| <td>118.93<br />
| |
| </td>
| |
| <td>73.50<br />
| |
| </td>
| |
| <td>phi 1 1 phi 1<br />
| |
| </td>
| |
| <td>phi 1<br />
| |
| </td>
| |
| <td style="text-align: center;">Golden meantone<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>21\50<br />
| |
| </td>
| |
| <td>504<br />
| |
| </td>
| |
| <td>192<br />
| |
| </td>
| |
| <td>120<br />
| |
| </td>
| |
| <td>72<br />
| |
| </td>
| |
| <td>13 8 8 13 8<br />
| |
| </td>
| |
| <td>13 8<br />
| |
| </td>
| |
| <td style="text-align: center;"><br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>8\19<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>505.26<br />
| |
| </td>
| |
| <td>189.47<br />
| |
| </td>
| |
| <td>126.32<br />
| |
| </td>
| |
| <td>63.16<br />
| |
| </td>
| |
| <td>5 3 3 5 3<br />
| |
| </td>
| |
| <td>5 3<br />
| |
| </td>
| |
| <td style="text-align: center;"><br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>19\45<br />
| |
| </td>
| |
| <td>506.67<br />
| |
| </td>
| |
| <td>186.67<br />
| |
| </td>
| |
| <td>133.33<br />
| |
| </td>
| |
| <td>53.33<br />
| |
| </td>
| |
| <td>12 7 7 12 7<br />
| |
| </td>
| |
| <td>12 7<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>507.18<br />
| |
| </td>
| |
| <td>185.64<br />
| |
| </td>
| |
| <td>135.9<br />
| |
| </td>
| |
| <td>49.74<br />
| |
| </td>
| |
| <td>√3 1 √3 1 1<br />
| |
| </td>
| |
| <td>√3 1<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>11\26<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>507.69<br />
| |
| </td>
| |
| <td>184.615<br />
| |
| </td>
| |
| <td>138.46<br />
| |
| </td>
| |
| <td>46.15<br />
| |
| </td>
| |
| <td>7 4 4 7 4<br />
| |
| </td>
| |
| <td>7 4<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>14\33<br />
| |
| </td>
| |
| <td>509.09<br />
| |
| </td>
| |
| <td>181.82<br />
| |
| </td>
| |
| <td>145.455<br />
| |
| </td>
| |
| <td>36.36<br />
| |
| </td>
| |
| <td>9 5 5 9 5<br />
| |
| </td>
| |
| <td>9 5<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td>3\7<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>514.29<br />
| |
| </td>
| |
| <td>171.43<br />
| |
| </td>
| |
| <td>171.43<br />
| |
| </td>
| |
| <td>0<br />
| |
| </td>
| |
| <td>2 1 1 2 1<br />
| |
| </td>
| |
| <td>2 1<br />
| |
| </td>
| |
| <td style="text-align: center;">(Boundary of propriety: smaller<br />
| |
| generators than this are strictly proper)<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>13\30<br />
| |
| </td>
| |
| <td>520<br />
| |
| </td>
| |
| <td>160<br />
| |
| </td>
| |
| <td>200<br />
| |
| </td>
| |
| <td>40<br />
| |
| </td>
| |
| <td>9 4 4 9 4<br />
| |
| </td>
| |
| <td>9 4<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td style="text-align: left;"><br />
| |
| </td>
| |
| <td style="text-align: left;"><br />
| |
| </td>
| |
| <td style="text-align: left;"><br />
| |
| </td>
| |
| <td style="text-align: left;"><br />
| |
| </td>
| |
| <td style="text-align: left;">10\23<br />
| |
| </td>
| |
| <td style="text-align: left;"><br />
| |
| </td>
| |
| <td style="text-align: left;">521.74<br />
| |
| </td>
| |
| <td style="text-align: left;">156.52<br />
| |
| </td>
| |
| <td style="text-align: left;">208.7<br />
| |
| </td>
| |
| <td style="text-align: left;">52.17<br />
| |
| </td>
| |
| <td style="text-align: left;">7 3 3 7 3<br />
| |
| </td>
| |
| <td>7 3<br />
| |
| </td>
| |
| <td style="text-align: left;"><br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>17\39<br />
| |
| </td>
| |
| <td>523.08<br />
| |
| </td>
| |
| <td>153.84<br />
| |
| </td>
| |
| <td>215.385<br />
| |
| </td>
| |
| <td>61.54<br />
| |
| </td>
| |
| <td>12 5 5 12 5<br />
| |
| </td>
| |
| <td>12 5<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>7\16<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>525<br />
| |
| </td>
| |
| <td>150<br />
| |
| </td>
| |
| <td>225<br />
| |
| </td>
| |
| <td>75<br />
| |
| </td>
| |
| <td>5 2 2 5 2<br />
| |
| </td>
| |
| <td>5 2<br />
| |
| </td>
| |
| <td style="text-align: center;">5-note subset of pelog (insofar as it<br />
| |
| resembles a MOS) would be in this region<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>18\41<br />
| |
| </td>
| |
| <td>526.83<br />
| |
| </td>
| |
| <td>146.34<br />
| |
| </td>
| |
| <td>234.15<br />
| |
| </td>
| |
| <td>87.8<br />
| |
| </td>
| |
| <td>13 5 5 13 5<br />
| |
| </td>
| |
| <td>13 5<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>600(25+√5)/31<br />
| |
| </td>
| |
| <td>145.7<br />
| |
| </td>
| |
| <td>235.75<br />
| |
| </td>
| |
| <td>90.05<br />
| |
| </td>
| |
| <td>phi+1 1 1 phi+1 1<br />
| |
| </td>
| |
| <td>phi+1 1<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>11\25<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>528<br />
| |
| </td>
| |
| <td>144<br />
| |
| </td>
| |
| <td>240<br />
| |
| </td>
| |
| <td>96<br />
| |
| </td>
| |
| <td>8 3 3 8 3<br />
| |
| </td>
| |
| <td>8 3<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>528.88<br />
| |
| </td>
| |
| <td>142.24<br />
| |
| </td>
| |
| <td>244.405<br />
| |
| </td>
| |
| <td>102.17<br />
| |
| </td>
| |
| <td>e 1 e 1 1<br />
| |
| </td>
| |
| <td>e 1<br />
| |
| </td>
| |
| <td style="text-align: center;">L/s = e<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>15\34<br />
| |
| </td>
| |
| <td>529.41<br />
| |
| </td>
| |
| <td>141.18<br />
| |
| </td>
| |
| <td>247.06<br />
| |
| </td>
| |
| <td>105.88<br />
| |
| </td>
| |
| <td>11 4 4 11 4<br />
| |
| </td>
| |
| <td>11 4<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>4\9<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>533.33<br />
| |
| </td>
| |
| <td>133.33<br />
| |
| </td>
| |
| <td>266.67<br />
| |
| </td>
| |
| <td>133.33<br />
| |
| </td>
| |
| <td>3 1 1 3 1<br />
| |
| </td>
| |
| <td>3 1<br />
| |
| </td>
| |
| <td style="text-align: center;">L/s = 3<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>535.36<br />
| |
| </td>
| |
| <td>129.26<br />
| |
| </td>
| |
| <td>276.835<br />
| |
| </td>
| |
| <td>147.57<br />
| |
| </td>
| |
| <td>pi 1 pi 1 1<br />
| |
| </td>
| |
| <td>pi 1<br />
| |
| </td>
| |
| <td style="text-align: center;"><span style="display: block; text-align: center;">L/s = pi</span><br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>13\29<br />
| |
| </td>
| |
| <td>537.93<br />
| |
| </td>
| |
| <td>124.14<br />
| |
| </td>
| |
| <td>289.655<br />
| |
| </td>
| |
| <td>165.52<br />
| |
| </td>
| |
| <td>10 3 3 10 3<br />
| |
| </td>
| |
| <td>10 3<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>9\20<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>540<br />
| |
| </td>
| |
| <td>120<br />
| |
| </td>
| |
| <td>240<br />
| |
| </td>
| |
| <td>180<br />
| |
| </td>
| |
| <td>7 2 2 7 2<br />
| |
| </td>
| |
| <td>7 2<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>14\31<br />
| |
| </td>
| |
| <td>541.935<br />
| |
| </td>
| |
| <td>116.13<br />
| |
| </td>
| |
| <td>309.68<br />
| |
| </td>
| |
| <td>193.55<br />
| |
| </td>
| |
| <td>11 3 3 11 3<br />
| |
| </td>
| |
| <td>11 3<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>5\11<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>545.45<br />
| |
| </td>
| |
| <td>109.09<br />
| |
| </td>
| |
| <td>327.27<br />
| |
| </td>
| |
| <td>218.18<br />
| |
| </td>
| |
| <td>4 1 1 4 1<br />
| |
| </td>
| |
| <td>4 1<br />
| |
| </td>
| |
| <td style="text-align: center;">L/s = 4<br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>11\24<br />
| |
| </td>
| |
| <td>550<br />
| |
| </td>
| |
| <td>100<br />
| |
| </td>
| |
| <td>350<br />
| |
| </td>
| |
| <td>250<br />
| |
| </td>
| |
| <td>9 2 2 9 2<br />
| |
| </td>
| |
| <td>9 2<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>6\13<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>553.85<br />
| |
| </td>
| |
| <td>92.31<br />
| |
| </td>
| |
| <td>369.23<br />
| |
| </td>
| |
| <td>276.92<br />
| |
| </td>
| |
| <td>5 1 1 5 1<br />
| |
| </td>
| |
| <td>5 1<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>7\15<br />
| |
| </td>
| |
| <td>560<br />
| |
| </td>
| |
| <td>80<br />
| |
| </td>
| |
| <td>480<br />
| |
| </td>
| |
| <td>400<br />
| |
| </td>
| |
| <td>6 1 1 6 1<br />
| |
| </td>
| |
| <td>6 1<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| </tr>
| |
| <tr>
| |
| <td>1\2<br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td><br />
| |
| </td>
| |
| <td>600<br />
| |
| </td>
| |
| <td>0<br />
| |
| </td>
| |
| <td>600<br />
| |
| </td>
| |
| <td>600<br />
| |
| </td>
| |
| <td>1 0 0 1 0<br />
| |
| </td>
| |
| <td>1 0<br />
| |
| </td>
| |
| <td style="text-align: center;">a degenerated pentatonic scale with only 2 different steps<br />
| |
| </td>
| |
| </tr>
| |
| </table>
| |
|
| |
|
| <br />
| | [[Category:Pentic]] |
| From a <a class="wiki_link" href="/3-limit">3-limit</a> perspective, just make a chain of four 4/3's and octave-reduce, and you end up with pentatonic.<br />
| | [[Category:5-tone scales]] |
| <br />
| |
| From a <a class="wiki_link" href="/5-limit">5-limit</a> perspective, the most interesting temperaments with this kind of pentatonic scale are <a class="wiki_link" href="/meantone">meantone</a> and <a class="wiki_link" href="/Pelogic%20family">mavila</a>.<br />
| |
| <br />
| |
| There is also the interesting 2.3.7 temperament that tempers out <a class="wiki_link" href="/64_63">64/63</a> (&quot;no-fives <a class="wiki_link" href="/dominant">dominant</a>&quot;).</body></html></pre></div>
| |