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| <h2>IMPORTED REVISION FROM WIKISPACES</h2>
| | '''Peppermint 24''' is a [[scale]] first documented by [[Margo Schulter]] on the Yahoo tuning forum: [https://yahootuninggroupsultimatebackup.github.io/tuning/topicId_38440.html#38440 M. Schulter (7/3/2002 3:51:43 AM)] |
| This is an imported revision from Wikispaces. The revision metadata is included below for reference:<br>
| |
| : This revision was by author [[User:genewardsmith|genewardsmith]] and made on <tt>2011-11-22 21:13:42 UTC</tt>.<br>
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| : The original revision id was <tt>278347106</tt>.<br>
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| : The revision comment was: <tt></tt><br>
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| The revision contents are below, presented both in the original Wikispaces Wikitext format, and in HTML exactly as Wikispaces rendered it.<br>
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| <h4>Original Wikitext content:</h4>
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| <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">=Peppermint 24=
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| [[http://launch.groups.yahoo.com/group/tuning/message/40057|Original article]] by Margo Schulter, on the Yahoo tuning forum, is quoted below. In addition to what it says, it may be noted that the Wilson/Pepper fifth it mentions, of size approximately 704.096 cents, has a precise value of (67 + √5)/118 octaves, which is (40200 + 600 √5)/59 cents. | | ==Concept== |
| | Peppermint 24 aims to map [[superparticular]] and other ratios within [[wikipedia:Harry_Partch|Harry Partch's]] larger [[17-limit]] set, to two conventional piano keyboards. |
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| =Margo Schulter's article=
| | It takes as its basis a [[Regular_Temperaments|regular temperament]] mentioned in [[Erv_Wilson|Ervin Wilson]]'s Scale Tree and described on the Tuning List by [[Keenan Pepper]], with a fifth of about 704.096 [[Cent|cents]], and a precise ratio of [[wikipedia:Golden_ratio|Phi]], the Golden Section (~1.618) between the larger chromatic semitone (e.g. C-C#) at about 128.669 cents and the smaller diatonic semitone (e.g. C#-D) at about 79.522 cents. Said fifth has a precise value of (67 + √5)/118 octaves, which is (40200 + 600 √5)/59 cents. |
| An interesting feature of tuning systems, as implemented on keyboards (conventional or alternative), is the [[keyboard mappings|mapping]] of pure or tempered ratios to positions on the keyboard layout.
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| | |
| Here I shall explore the mapping of approximate ratios, and especially of superparticular and other ratios within [[http://en.wikipedia.org/wiki/Harry_Partch|Harry Partch's]] larger 17-limit set, in the tuning system and keyboard arrangement I call Peppermint 24.
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| | |
| Peppermint 24 takes as its basis a [[Regular Temperaments|regular temperament]] mentioned in [[Erv Wilson|Ervin Wilson]]'s Scale Tree and described on the Tuning List by [[Keenan Pepper]], with a fifth of about 704.096 cents, and a precise ratio of [[http://en.wikipedia.org/wiki/Golden_ratio|Phi]], the Golden Section (~1.618) between the larger chromatic semitone (e.g. C-C#) at about 128.669 cents and the smaller diatonic semitone (e.g. C#-D) at about 79.522 cents.
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| In Peppermint 24, two regular 12-note chains of this temperament are placed at a distance of approximately 58.680 cents, so as to yield some pure ratios of 6:7 (~266.871 cents). | | In Peppermint 24, two regular 12-note chains of this temperament are placed at a distance of approximately 58.680 cents, so as to yield some pure ratios of 6:7 (~266.871 cents). |
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| | ==Keyboard arrangement == |
| Here is a 24-note keyboard arrangement, with an asterisk (*) showing a note on the upper keyboard: | | Here is a 24-note keyboard arrangement, with an asterisk (*) showing a note on the upper keyboard: |
| [[code]]
| | |
| | <pre> |
| 187.349 346.393 683.253 891.445 1050.488 | | 187.349 346.393 683.253 891.445 1050.488 |
| C#* Eb* F#* G#* Bb* | | C#* Eb* F#* G#* Bb* |
| Line 31: |
Line 22: |
| C D E F G A B C | | C D E F G A B C |
| 0 208.191 416.382 495.904 704.096 912.287 1120.478 1200 | | 0 208.191 416.382 495.904 704.096 912.287 1120.478 1200 |
| | </pre> |
|
| |
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| | == Intervals == |
|
| |
|
| [[code]]
| | === Single chain === |
| | Offset two of these by 58.680 cents. |
| | <pre> |
| | 128.669 |
| | 208.191 |
| | 287.713 |
| | 416.382 |
| | 495.904 |
| | 624.574 |
| | 704.096 |
| | 832.765 |
| | 912.287 |
| | 991.809 |
| | 1120.478 |
| | 1200.000 |
| | </pre> |
|
| |
|
| In the following catalogue of some ratio equivalents and mappings, I will focus on intervals no further from just than 8:9 or 9:16, which vary from their pure sizes by about 4.282 cents (twice the tempering of the fifth, at about 2.141 cents wide of 2:3).
| | === Combined (both chains) === |
| | <pre> |
| | 58.680 |
| | 128.669 |
| | 187.349 |
| | 208.191 |
| | 266.871 |
| | 287.713 |
| | 346.393 |
| | 416.382 |
| | 475.062 |
| | 495.904 |
| | 554.584 |
| | 624.574 |
| | 683.253 |
| | 704.096 |
| | 762.775 |
| | 832.765 |
| | 891.445 |
| | 912.287 |
| | 970.967 |
| | 991.809 |
| | 1050.488 |
| | 1120.478 |
| | 1179.157 |
| | 1200.000 |
| | </pre> |
| | |
| | ==Catalogue of ratio equivalents== |
| | What follows is a catalogue of some ratio equivalents and mappings no further from just than 8:9 or 9:16, which vary from their pure sizes by about 4.282 cents (twice the tempering of the fifth, at about 2.141 cents wide of 2:3). |
|
| |
|
| Octave numbers appear in a MIDI-style notation, with C4 as middle C; just ratios and tempered equivalents are given values in cents, shown in parentheses, with tempered variations in cents also shown. | | Octave numbers appear in a MIDI-style notation, with C4 as middle C; just ratios and tempered equivalents are given values in cents, shown in parentheses, with tempered variations in cents also shown. |
|
| |
|
| To describe the 58.68-cent interval between the two keyboards, whose addition or subtraction plays a role in obtaining or approximating many ratios, I shall the term "quasi-diesis," or QD for short. This "artificial" diesis-like interval is actually somewhat larger than the natural diesis in the regular Wilson/Pepper temperament at about 49.15 cents (12 tempered fifths less 7 pure octaves). | | To describe the 58.68-cent interval between the two keyboards, whose addition or subtraction plays a role in obtaining or approximating many ratios, the term "quasi-diesis" or "QD" is used. This "artificial" diesis-like interval is actually somewhat larger than the natural diesis in the regular Wilson/Pepper temperament at about 49.15 cents (12 tempered fifths less 7 pure octaves). |
| | |
| As this partial catalogue might suggest, many ratios of 2-3-7-9-11-13 are represented quite accurately, with 14:17:21 and related ratios also closely approximated.
| |
| | |
| | |
| **1. Multiplex (n:1) and [[superparticular]] (n+1:n) intervals**
| |
| | |
| 1:2 (1200) -- This is the usual octave (e.g. F3-F4), at a pure 1:2.
| |
| | |
| 2:3 (701.96) -- This is the usual fifth (e.g. F3-C4, 704.10, +2.14).
| |
| | |
| 3:4 (498.04) -- Usual fourth (e.g. C4-F4, 495.90, -2.14).
| |
| | |
| 6:7 (266.87) -- Major second + QD (e.g. D4-E*4), at a pure 6:7.
| |
| | |
| 7:8 (231.17) -- Minor third - QD (e.g. C*4-Eb4, 229.03, -2.14)
| |
| | |
| 8:9 (203.91) -- Usual major second (e.g. C4-D4, 208.19, +4.28)
| |
| | |
| 11:12 (150.64) -- Major second - QD (e.g. C*4-D4, 149.51, -1.13)
| |
| | |
| 12:13 (138.57) -- Minor second + QD (e.g. E4-F*4, 138.20, -0.37)
| |
| | |
| 13:14 (128.30) -- Usual apotome (e.g. C4-C#4, 128.67, +0.37)
| |
| | |
| 17:18 (98.95) -- Diminished third - QD (e.g. G#*4-Bb4, 100.36, -1.41)
| |
| | |
| 21:22 (80.54) -- Usual minor second (e.g. E4-F4, 79.52, -1.02)
| |
|
| |
|
| 24:25 (70.67) -- Apotome - QD (e.g. E*4-Eb4, 69.99, -0.68)
| | Many ratios of 2-3-7-9-11-13 are represented quite accurately, with 14:17:21 and related ratios also closely approximated. |
|
| |
|
| 27:28 (62.96) -- QD (e.g. E4-E*4, 58.68, -4.28)
| | ===Multiplex (n:1) and [[superparticular]] (n+1:n) intervals=== |
|
| |
|
| | * 1:2 (1200) -- This is the usual octave (e.g. F3-F4), at a pure 1:2. |
| | * 2:3 (701.96) -- This is the usual fifth (e.g. F3-C4, 704.10, +2.14). |
| | * 3:4 (498.04) -- Usual fourth (e.g. C4-F4, 495.90, -2.14). |
| | * 6:7 (266.87) -- Major second + QD (e.g. D4-E*4), at a pure 6:7. |
| | * 7:8 (231.17) -- Minor third - QD (e.g. C*4-Eb4, 229.03, -2.14) |
| | * 8:9 (203.91) -- Usual major second (e.g. C4-D4, 208.19, +4.28) |
| | * 11:12 (150.64) -- Major second - QD (e.g. C*4-D4, 149.51, -1.13) |
| | * 12:13 (138.57) -- Minor second + QD (e.g. E4-F*4, 138.20, -0.37) |
| | * 13:14 (128.30) -- Usual apotome (e.g. C4-C#4, 128.67, +0.37) |
| | * 17:18 (98.95) -- Diminished third - QD (e.g. G#*4-Bb4, 100.36, -1.41) |
| | * 21:22 (80.54) -- Usual minor second (e.g. E4-F4, 79.52, -1.02) |
| | * 24:25 (70.67) -- Apotome - QD (e.g. E*4-Eb4, 69.99, -0.68) |
| | * 27:28 (62.96) -- QD (e.g. E4-E*4, 58.68, -4.28) |
|
| |
|
| **2. Other ratios -- many within 17-odd limit**
| | ===Other ratios=== |
| | Many of these fall within the [[17-odd-limit]]. |
|
| |
|
| 4:7 (968.83) -- Major sixth + QD (e.g. G3-E*4, 970.97, +2.14) | | * 4:7 (968.83) -- Major sixth + QD (e.g. G3-E*4, 970.97, +2.14) |
| | * 7:9 (435.08) -- Fourth - QD (e.g. G*4-C5, 437.22, +2.14) |
| | * 7:12 (933.13) -- Minor seventh - QD (e.g. G*3-F4), at a pure 7:12. |
| | * 9:14 (764.92) -- Fifth + QD (e.g. G4-D*5, 762.78, -2.14) |
| | * 9:16 (996.09) -- Usual minor seventh (e.g. G4-F4, 991.81, -4.28) |
| | * 6:11 (1049.36) -- Minor seventh + QD (e.g. G3-F*4, 1050.49, +1.13) |
| | * 7:11 (782.49) -- Usual minor sixth (e.g. A3-F4, 783.62, +1.13) |
| | * 8:11 (551.32) -- Fourth + QD (e.g. G3-C*4, 554.58, +3.27) |
| | * 9:11 (347.41) -- Minor third + QD (e.g. G3-Bb*3, 346.39, -1.02) |
| | * 8:13 (840.53) -- Minor sixth + QD (e.g. G3-Eb*3, 842.30, +1.77) |
| | * 9:13 (636.62) -- Diminished fifth + QD (e.g. A3-Eb*4, 634.11, -2.51) |
| | * 11:13 (289.21) -- Usual minor third (e.g. D3-F3, 287.71, -1.50) |
| | * 11:14 (417.51) -- Usual major third (e.g. D3-F#3, 416.38, -1.13) |
| | * 11:16 (648.68) -- Fifth - QD (e.g. F*3-C4, 645.42, -3.27) |
| | * 11:18 (852.59) -- Major sixth - QD (e.g. G*4-E5, 853.61, +1.02) |
| | * 11:21 (1119.46) -- Usual major seventh (e.g. F3-E4, 1120.48, +1.02) |
| | * 12:17 (603.00) -- Augmented third + QD (e.g. Eb4-G#*4, 603.73, +0.73) |
| | * 13:16 (359.47) -- Major third - QD (e.g. C*4-E4, 357.70, -1.77) |
| | * 13:18 (563.38) -- Augmented fourth - QD (e.g. C*4-F#4, 565.89, +2.51) |
| | * 13:21 (830.25) -- Usual augmented fifth (e.g. C4-G#4, 832.76, +2.51) |
| | * 13:22 (910.79) -- Usual major sixth (e.g. G3-E4, 912.29, +1.50) |
| | * 13:23 (987.75) -- Usual minor seventh (e.g. D4-C5, 991.81, +4.06) |
| | * 13:24 (1061.43) -- Major seventh - QD (e.g. F*3-E4), 1061.80, +0.37) |
| | * 14:17 (336.13) -- Usual augmented second (e.g. F4-G#4, 336.86, +0.73) |
| | * 14:27 (1137.04) -- Octave - QD (e.g. F*4-F5, 1141.32, +4.28) |
| | * 15:17 (216.69) -- Diminished third + QD (e.g. C#4-Eb*4, 217.72, +1.04) |
| | * 16:21 (470.71) -- Major third + QD (e.g. C4-E*4, 475.06, +4.28) |
| | * 16:23 (628.27) -- Usual augmented fourth (e.g. C4-F#4, 624.57, -3.70) |
| | * 18:23 (424.36) -- Diminished fourth + QD (e.g. B4-Eb*5, 425.91, +1.55) |
| | * 16:25 (772.63) -- Diminished fourth + QD (e.g. F#4-Bb*4, 774.09, +1.46) |
| | * 17:20 (281.36) -- Augmented second - QD (e.g. F*4-G#4, 278.18, -3.18) |
| | * 17:21 (365.83) -- Usual diminished fourth (e.g. F#4-Bb4, 367.24, +1.41) |
| | * 17:28 (863.87) -- Usual diminished seventh (e.g. F#4-Eb4, 863.14, -0.73) |
| | * 21:34 (834.17) -- Usual augmented fifth (e.g. F3-C#4, 832.76, +1.41) |
| | * 28:51 (1038.08) -- Usual augmented sixth (e.g. Eb3-C#4, 1040.96, +2.87) |
| | * 21:23 (157.49) -- Usual diminished third (e.g. C#4-Eb4, 159.04, +1.55) |
| | * 21:26 (369.75) -- Usual diminished fourth (e.g. C#4-F4, 367.24, -1.51) |
| | * 23:27 (277.59) -- Augmented second - QD (e.g. Eb*4-F#4, 278.18, +0.59) |
| | * 26:33 (412.75) -- Usual major third (e.g. F4-A4, 416.38, +3.63) |
| | * 28:33 (284.45) -- Usual minor third (e.g. E4-G4, 287.71, +3.27) |
| | * 33:56 (915.55) -- Usual major sixth (e.g. G4-E5, 912.29, -3.27) |
|
| |
|
| 7:9 (435.08) -- Fourth - QD (e.g. G*4-C5, 437.22, +2.14)
| | == Subsets == |
| | === Diatonic and related scales === |
| | C Major |
| | * 208.191 |
| | * 416.382 |
| | * 495.904 |
| | * 704.096 |
| | * 912.287 |
| | * 1120.478 |
| | * 1200.000 |
|
| |
|
| 7:12 (933.13) -- Minor seventh - QD (e.g. G*3-F4), at a pure 7:12.
| | === Salt and pepper scale and its subsets === |
| | Salt and pepper{{idiosyncratic}} |
|
| |
|
| 9:14 (764.92) -- Fifth + QD (e.g. G4-D*5, 762.78, -2.14)
| | ''A 12-tone subset of Peppermint-24 designed by [[Budjarn Lambeth]] to concentrate the most frequently used intervals on just one keyboard.'' |
| | * 128.669 |
| | * 187.349 |
| | * 208.191 |
| | * 266.871 |
| | * 287.713 |
| | * 495.904 |
| | * 704.096 |
| | * 832.765 |
| | * 891.445 |
| | * 970.967 |
| | * 1050.488 |
| | * 1200.000 |
|
| |
|
| 9:16 (996.09) -- Usual minor seventh (e.g. G4-F4, 991.81, -4.28)
| | <small> |
| | Evacuated planet{{idiosyncratic}} (approximated from [[66afdo|66]][[afdo]]) |
| | * 128.669 |
| | * 495.904 |
| | * 704.096 |
| | * 1050.488 |
| | * 1200.000 |
|
| |
|
| 6:11 (1049.36) -- Minor seventh + QD (e.g. G3-F*4, 1050.49, +1.13)
| | Flattened pseudo-[[equiheptatonic]] |
| | * 128.669 |
| | * 266.871 |
| | * 495.904 |
| | * 704.096 |
| | * 832.765 |
| | * 1050.488 |
| | * 1200.000 |
|
| |
|
| 7:11 (782.49) -- Usual minor sixth (e.g. A3-F4, 783.62, +1.13)
| | Geode{{idiosyncratic}} (approximated from [[6afdo]]) |
| | * 266.871 |
| | * 495.904 |
| | * 704.096 |
| | * 1050.488 |
| | * 1200.000 |
|
| |
|
| 8:11 (551.32) -- Fourth + QD (e.g. G3-C*4, 554.58, +3.27)
| | Minor hexatonic (approximated from [[12edo]]) |
| | * 187.349 |
| | * 287.713 |
| | * 495.904 |
| | * 704.096 |
| | * 970.967 |
| | * 1200.000 |
|
| |
|
| 9:11 (347.41) -- Minor third + QD (e.g. G3-Bb*3, 346.39, -1.02)
| | Pepperbass{{idiosyncratic}} (original/default tuning) |
|
| |
|
| 8:13 (840.53) -- Minor sixth + QD (e.g. G3-Eb*3, 842.30, +1.77)
| | (''works well with jungle- or trap-style sub bass'') |
| | * 208.191 |
| | * 704.096 |
| | * 891.445 |
| | * 1050.488 |
| | * 1200.000 |
|
| |
|
| 9:13 (636.62) -- Diminished fifth + QD (e.g. A3-Eb*4, 634.11, -2.51)
| | Pseudo-[[6afdo]] |
| | * 266.871 |
| | * 495.904 |
| | * 704.096 |
| | * 891.445 |
| | * 1050.488 |
| | * 1200.000 |
|
| |
|
| 11:13 (289.21) -- Usual minor third (e.g. D3-F3, 287.71, -1.50)
| | Pseudo-akebono I (approximated from [[12edo]]) |
| | * 208.191 |
| | * 287.713 |
| | * 704.096 |
| | * 891.445 |
| | * 1200.000 |
|
| |
|
| 11:14 (417.51) -- Usual major third (e.g. D3-F#3, 416.38, -1.13)
| | Pseudo-akebono II (approximated from [[12edo]]) |
| | * 128.669 |
| | * 495.904 |
| | * 704.096 |
| | * 832.765 |
| | * 1200.000 |
|
| |
|
| 11:16 (648.68) -- Fifth - QD (e.g. F*3-C4, 645.42, -3.27)
| | Pseudo-[[equipentatonic]] |
| | * 266.871 |
| | * 495.904 |
| | * 704.096 |
| | * 970.967 |
| | * 1200.000 |
|
| |
|
| 11:18 (852.59) -- Major sixth - QD (e.g. G*4-E5, 853.61, +1.02)
| | Pseudo-hirajoshi (approximated from [[12edo]]) |
| | * 208.191 |
| | * 287.713 |
| | * 704.096 |
| | * 832.765 |
| | * 1200.000 |
|
| |
|
| 11:21 (1119.46) -- Usual major seventh (e.g. F3-E4, 1120.48, +1.02)
| | Sharpened pseudo-[[pelog]] |
| | * 128.669 |
| | * 287.713 |
| | * 704.096 |
| | * 832.765 |
| | * 1200.000 |
| | </small> |
|
| |
|
| 12:17 (603.00) -- Augmented third + QD (e.g. Eb4-G#*4, 603.73, +0.73)
| | === Ketchup and mustard scale and its subsets === |
| | Ketchup and mustard{{idiosyncratic}} |
|
| |
|
| 13:16 (359.47) -- Major third - QD (e.g. C*4-E4, 357.70, -1.77)
| | ''A 12-tone subset of Peppermint-24 designed by [[Budjarn Lambeth]] to map intervals which sound nice with an inharmonic [[gamelan]]-like timbre to a 12-key keyboard (e.g. [https://scaleworkshop.plainsound.org/scale/h2qwnm0-l this timbre in Scale Workshop]).'' |
| | * 58.680 |
| | * 128.669 |
| | * 187.349 |
| | * 266.871 |
| | * 475.062 |
| | * 683.253 |
| | * 762.775 |
| | * 832.765 |
| | * 912.287 |
| | * 970.967 |
| | * 1050.488 |
| | * 1200.000 |
|
| |
|
| 13:18 (563.38) -- Augmented fourth - QD (e.g. C*4-F#4, 565.89, +2.51)
| | <small> |
| | Inharmonic geode{{idiosyncratic}} |
| | * 266.871 |
| | * 475.062 |
| | * 683.253 |
| | * 1050.488 |
| | * 1200.000 |
|
| |
|
| 13:21 (830.25) -- Usual augmented fifth (e.g. C4-G#4, 832.76, +2.51)
| | Inharmonic minor hexatonic |
| | * 187.349 |
| | * 266.871 |
| | * 475.062 |
| | * 683.253 |
| | * 970.967 |
| | * 1200.000 |
|
| |
|
| 13:22 (910.79) -- Usual major sixth (e.g. G3-E4, 912.29, +1.50)
| | Inharmonic pepperbass{{idiosyncratic}} |
| | * 187.349 |
| | * 683.253 |
| | * 762.775 |
| | * 1050.488 |
| | * 1200.000 |
|
| |
|
| 13:23 (987.75) -- Usual minor seventh (e.g. D4-C5, 991.81, +4.06)
| | Inharmonic pseudo-[[6afdo]] |
| | * 266.871 |
| | * 475.062 |
| | * 683.253 |
| | * 832.765 |
| | * 1050.488 |
| | * 1200.000 |
|
| |
|
| 13:24 (1061.43) -- Major seventh - QD (e.g. F*3-E4), 1061.80, +0.37)
| | Inharmonic pseudo-akebono I |
| | * 187.349 |
| | * 266.871 |
| | * 683.253 |
| | * 912.287 |
| | * 1200.000 |
|
| |
|
| 14:17 (336.13) -- Usual augmented second (e.g. F4-G#4, 336.86, +0.73)
| | Inharmonic pseudo-akebono II |
| | * 58.680 |
| | * 475.062 |
| | * 683.253 |
| | * 762.775 |
| | * 1200.000 |
|
| |
|
| 14:27 (1137.04) -- Octave - QD (e.g. F*4-F5, 1141.32, +4.28)
| | Inharmonic pseudo-[[equipentatonic]] |
| | * 266.871 |
| | * 475.062 |
| | * 704.096 |
| | * 970.967 |
| | * 1200.000 |
|
| |
|
| 15:17 (216.69) -- Diminished third + QD (e.g. C#4-Eb*4, 217.72, +1.04)
| | Inharmonic pseudo-hirajoshi |
| | * 187.349 |
| | * 266.871 |
| | * 683.253 |
| | * 832.765 |
| | * 1200.000 |
|
| |
|
| 16:21 (470.71) -- Major third + QD (e.g. C4-E*4, 475.06, +4.28)
| | Unsharpened pseudo-[[pelog]] |
| | * 128.669 |
| | * 266.871 |
| | * 683.253 |
| | * 762.775 |
| | * 1200.000 |
| | </small> |
|
| |
|
| 16:23 (628.27) -- Usual augmented fourth (e.g. C4-F#4, 624.57, -3.70)
| | === Miscellaneous === |
| | Undecimal picardy hexatonic{{idiosyncratic}} (original/default tuning) |
| | * 58.680 |
| | * 266.871 |
| | * 346.393 |
| | * 704.096 |
| | * 970.967 |
| | * 1200.000 |
|
| |
|
| 18:23 (424.36) -- Diminished fourth + QD (e.g. B4-Eb*5, 425.91, +1.55)
| | Unflattened pseudo-[[equiheptatonic]] |
| | * 187.349 |
| | * 346.393 |
| | * 495.904 |
| | * 704.096 |
| | * 832.765 |
| | * 1050.488 |
| | * 1200.000 |
|
| |
|
| 16:25 (772.63) -- Diminished fourth + QD (e.g. F#4-Bb*4, 774.09, +1.46)
| | == Instruments == |
| | === Lumatone === |
| | * [[:File:Peppermint-C62.ltn]] & [[:File:MillerPeppermintLumatone.jpeg]] — [[Herman Miller]]'s [[Lumatone]] mapping for peppermint-24. |
|
| |
|
| 17:20 (281.36) -- Augmented second - QD (e.g. F*4-G#4, 278.18, -3.18)
| | == Music == |
|
| |
|
| 17:21 (365.83) -- Usual diminished fourth (e.g. F#4-Bb4, 367.24, +1.41)
| | === Modern Renderings === |
| | ; {{W|John Bull (composer)|John Bull}} |
| | * [https://www.youtube.com/watch?v=Ku32F-zEtmU ''Fantasia «Ut Re Mi Fa Sol La»''] (late 1500s/early 1600s, from ''Fitzwilliam Virginal Book Vol.1 No.51'') – rendered by Claudi Meneghin (2020) in a 24 note per octave well-tempered tuning system that uses both [[golden meantone]] fifths and peppermint fifths (tuning specification in video description). |
|
| |
|
| 17:28 (863.87) -- Usual diminished seventh (e.g. F#4-Eb4, 863.14, -0.73)
| | ; [[wikipedia:Wolfgang Amadeus Mozart|Wolfgang Amadeus Mozart]] |
| | * [https://www.youtube.com/watch?v=eRzdbzJah20 ''Mozart's Gigue KV 574, Arranged for Fortepiano (PEPPERMINT)''] (rendered in the 12 note subset by [[Claudi Meneghin]], 2025) |
| | * [https://www.youtube.com/watch?v=2-4oaNq7jwo ''2025-05-24 CHACONNE «LES REGRETS» - PEPPERMINT''] (rendered in a 46EDO-related subset by [[Claudi Meneghin]], (2025) ([https://www.youtube.com/shorts/I8NbVZFsIh0 short version]) |
|
| |
|
| 21:34 (834.17) -- Usual augmented fifth (e.g. F3-C#4, 832.76, +1.41)
| | === 21st Century === |
| | ; [[Budjarn Lambeth]] |
| | * [https://www.youtube.com/watch?v=g6e3zYlbsWc ''Microtonal Jungle-Inspired Track in the "Salt and Pepper Scale"''] (2025) |
|
| |
|
| 28:51 (1038.08) -- Usual augmented sixth (e.g. Eb3-C#4, 1040.96, +2.87)
| | ; [[Claudi Meneghin]] |
| | | * [https://www.youtube.com/watch?v=5vPvI6MXWFM ''ST LOUIS FUGUE (Fugue on St Louis Blues), for Baroque Ensemble - (Microtonal, PEPPERMINT)''] (2025) |
| 21:23 (157.49) -- Usual diminished third (e.g. C#4-Eb4, 159.04, +1.55)
| | * [https://www.youtube.com/watch?v=iZlvKLg4CoM ''PEPPERMINT FUGUE in 5 parts «Les Regrets»''] (2025) |
| | |
| 21:26 (369.75) -- Usual diminished fourth (e.g. C#4-F4, 367.24, -1.51)
| |
| | |
| 23:27 (277.59) -- Augmented second - QD (e.g. Eb*4-F#4, 278.18, +0.59)
| |
| | |
| 26:33 (412.75) -- Usual major third (e.g. F4-A4, 416.38, +3.63)
| |
| | |
| 28:33 (284.45) -- Usual minor third (e.g. E4-G4, 287.71, +3.27)
| |
| | |
| 33:56 (915.55) -- Usual major sixth (e.g. G4-E5, 912.29, -3.27)</pre></div>
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| <h4>Original HTML content:</h4>
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| <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>Peppermint-24</title></head><body><!-- ws:start:WikiTextHeadingRule:1:&lt;h1&gt; --><h1 id="toc0"><a name="Peppermint 24"></a><!-- ws:end:WikiTextHeadingRule:1 -->Peppermint 24</h1>
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| <br />
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| <a class="wiki_link_ext" href="http://launch.groups.yahoo.com/group/tuning/message/40057" rel="nofollow">Original article</a> by Margo Schulter, on the Yahoo tuning forum, is quoted below. In addition to what it says, it may be noted that the Wilson/Pepper fifth it mentions, of size approximately 704.096 cents, has a precise value of (67 + √5)/118 octaves, which is (40200 + 600 √5)/59 cents.<br />
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| <br />
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| <!-- ws:start:WikiTextHeadingRule:3:&lt;h1&gt; --><h1 id="toc1"><a name="Margo Schulter's article"></a><!-- ws:end:WikiTextHeadingRule:3 -->Margo Schulter's article</h1>
| |
| An interesting feature of tuning systems, as implemented on keyboards (conventional or alternative), is the <a class="wiki_link" href="/keyboard%20mappings">mapping</a> of pure or tempered ratios to positions on the keyboard layout.<br />
| |
| <br />
| |
| Here I shall explore the mapping of approximate ratios, and especially of superparticular and other ratios within <a class="wiki_link_ext" href="http://en.wikipedia.org/wiki/Harry_Partch" rel="nofollow">Harry Partch's</a> larger 17-limit set, in the tuning system and keyboard arrangement I call Peppermint 24.<br />
| |
| <br />
| |
| Peppermint 24 takes as its basis a <a class="wiki_link" href="/Regular%20Temperaments">regular temperament</a> mentioned in <a class="wiki_link" href="/Erv%20Wilson">Ervin Wilson</a>'s Scale Tree and described on the Tuning List by <a class="wiki_link" href="/Keenan%20Pepper">Keenan Pepper</a>, with a fifth of about 704.096 cents, and a precise ratio of <a class="wiki_link_ext" href="http://en.wikipedia.org/wiki/Golden_ratio" rel="nofollow">Phi</a>, the Golden Section (~1.618) between the larger chromatic semitone (e.g. C-C#) at about 128.669 cents and the smaller diatonic semitone (e.g. C#-D) at about 79.522 cents.<br />
| |
| <br />
| |
| In Peppermint 24, two regular 12-note chains of this temperament are placed at a distance of approximately 58.680 cents, so as to yield some pure ratios of 6:7 (~266.871 cents).<br />
| |
| <br />
| |
| Here is a 24-note keyboard arrangement, with an asterisk (*) showing a note on the upper keyboard:<br />
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| <!-- ws:start:WikiTextCodeRule:0:
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| &lt;pre class=&quot;text&quot;&gt; 187.349 346.393 683.253 891.445 1050.488&lt;br/&gt; C#* Eb* F#* G#* Bb*&lt;br/&gt; C* D* E* F* G* A* B* C*&lt;br/&gt;58.680 266.871 475.062 554.584 762.775 970.967 1179.158 1258.680&lt;br/&gt; 7/6&lt;br/&gt;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;&amp;#45;-&lt;br/&gt; 128.669 287.713 624.574 832.765 991.809&lt;br/&gt; C# Eb F# G# Bb&lt;br/&gt; C D E F G A B C&lt;br/&gt; 0 208.191 416.382 495.904 704.096 912.287 1120.478 1200&lt;br/&gt;&lt;br/&gt;&lt;/pre&gt;
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| * GeSHi (C) 2004 - 2007 Nigel McNie, 2007 - 2008 Benny Baumann
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| * (http://qbnz.com/highlighter/ and http://geshi.org/)
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| </style><pre class="text"> 187.349 346.393 683.253 891.445 1050.488
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| C#* Eb* F#* G#* Bb*
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| C* D* E* F* G* A* B* C*
| |
| 58.680 266.871 475.062 554.584 762.775 970.967 1179.158 1258.680
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| 7/6
| |
| -------------------------------------------------------------------------
| |
| 128.669 287.713 624.574 832.765 991.809
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| C# Eb F# G# Bb
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| C D E F G A B C
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| 0 208.191 416.382 495.904 704.096 912.287 1120.478 1200
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| &nbsp;
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| &nbsp;</pre>
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|
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| <!-- ws:end:WikiTextCodeRule:0 --><br />
| | [[Category:24-tone scales]] |
| In the following catalogue of some ratio equivalents and mappings, I will focus on intervals no further from just than 8:9 or 9:16, which vary from their pure sizes by about 4.282 cents (twice the tempering of the fifth, at about 2.141 cents wide of 2:3).<br />
| | [[Category:Tempered scales]] |
| <br />
| | [[Category:Todo:clarify]] |
| Octave numbers appear in a MIDI-style notation, with C4 as middle C; just ratios and tempered equivalents are given values in cents, shown in parentheses, with tempered variations in cents also shown.<br />
| |
| <br />
| |
| To describe the 58.68-cent interval between the two keyboards, whose addition or subtraction plays a role in obtaining or approximating many ratios, I shall the term &quot;quasi-diesis,&quot; or QD for short. This &quot;artificial&quot; diesis-like interval is actually somewhat larger than the natural diesis in the regular Wilson/Pepper temperament at about 49.15 cents (12 tempered fifths less 7 pure octaves).<br />
| |
| <br />
| |
| As this partial catalogue might suggest, many ratios of 2-3-7-9-11-13 are represented quite accurately, with 14:17:21 and related ratios also closely approximated.<br />
| |
| <br />
| |
| <br />
| |
| <strong>1. Multiplex (n:1) and <a class="wiki_link" href="/superparticular">superparticular</a> (n+1:n) intervals</strong><br />
| |
| <br />
| |
| 1:2 (1200) -- This is the usual octave (e.g. F3-F4), at a pure 1:2.<br />
| |
| <br />
| |
| 2:3 (701.96) -- This is the usual fifth (e.g. F3-C4, 704.10, +2.14).<br />
| |
| <br />
| |
| 3:4 (498.04) -- Usual fourth (e.g. C4-F4, 495.90, -2.14).<br />
| |
| <br />
| |
| 6:7 (266.87) -- Major second + QD (e.g. D4-E*4), at a pure 6:7.<br />
| |
| <br />
| |
| 7:8 (231.17) -- Minor third - QD (e.g. C*4-Eb4, 229.03, -2.14)<br />
| |
| <br />
| |
| 8:9 (203.91) -- Usual major second (e.g. C4-D4, 208.19, +4.28)<br />
| |
| <br />
| |
| 11:12 (150.64) -- Major second - QD (e.g. C*4-D4, 149.51, -1.13)<br />
| |
| <br />
| |
| 12:13 (138.57) -- Minor second + QD (e.g. E4-F*4, 138.20, -0.37)<br />
| |
| <br />
| |
| 13:14 (128.30) -- Usual apotome (e.g. C4-C#4, 128.67, +0.37)<br />
| |
| <br />
| |
| 17:18 (98.95) -- Diminished third - QD (e.g. G#*4-Bb4, 100.36, -1.41)<br />
| |
| <br />
| |
| 21:22 (80.54) -- Usual minor second (e.g. E4-F4, 79.52, -1.02)<br />
| |
| <br />
| |
| 24:25 (70.67) -- Apotome - QD (e.g. E*4-Eb4, 69.99, -0.68)<br /> | |
| <br />
| |
| 27:28 (62.96) -- QD (e.g. E4-E*4, 58.68, -4.28)<br />
| |
| <br />
| |
| <br />
| |
| <strong>2. Other ratios -- many within 17-odd limit</strong><br />
| |
| <br />
| |
| 4:7 (968.83) -- Major sixth + QD (e.g. G3-E*4, 970.97, +2.14)<br />
| |
| <br />
| |
| 7:9 (435.08) -- Fourth - QD (e.g. G*4-C5, 437.22, +2.14)<br />
| |
| <br />
| |
| 7:12 (933.13) -- Minor seventh - QD (e.g. G*3-F4), at a pure 7:12.<br />
| |
| <br />
| |
| 9:14 (764.92) -- Fifth + QD (e.g. G4-D*5, 762.78, -2.14)<br />
| |
| <br />
| |
| 9:16 (996.09) -- Usual minor seventh (e.g. G4-F4, 991.81, -4.28)<br />
| |
| <br />
| |
| 6:11 (1049.36) -- Minor seventh + QD (e.g. G3-F*4, 1050.49, +1.13)<br />
| |
| <br />
| |
| 7:11 (782.49) -- Usual minor sixth (e.g. A3-F4, 783.62, +1.13)<br />
| |
| <br />
| |
| 8:11 (551.32) -- Fourth + QD (e.g. G3-C*4, 554.58, +3.27)<br />
| |
| <br />
| |
| 9:11 (347.41) -- Minor third + QD (e.g. G3-Bb*3, 346.39, -1.02)<br />
| |
| <br />
| |
| 8:13 (840.53) -- Minor sixth + QD (e.g. G3-Eb*3, 842.30, +1.77)<br />
| |
| <br />
| |
| 9:13 (636.62) -- Diminished fifth + QD (e.g. A3-Eb*4, 634.11, -2.51)<br />
| |
| <br />
| |
| 11:13 (289.21) -- Usual minor third (e.g. D3-F3, 287.71, -1.50)<br />
| |
| <br />
| |
| 11:14 (417.51) -- Usual major third (e.g. D3-F#3, 416.38, -1.13)<br />
| |
| <br />
| |
| 11:16 (648.68) -- Fifth - QD (e.g. F*3-C4, 645.42, -3.27)<br />
| |
| <br />
| |
| 11:18 (852.59) -- Major sixth - QD (e.g. G*4-E5, 853.61, +1.02)<br />
| |
| <br />
| |
| 11:21 (1119.46) -- Usual major seventh (e.g. F3-E4, 1120.48, +1.02)<br />
| |
| <br />
| |
| 12:17 (603.00) -- Augmented third + QD (e.g. Eb4-G#*4, 603.73, +0.73)<br />
| |
| <br />
| |
| 13:16 (359.47) -- Major third - QD (e.g. C*4-E4, 357.70, -1.77)<br />
| |
| <br />
| |
| 13:18 (563.38) -- Augmented fourth - QD (e.g. C*4-F#4, 565.89, +2.51)<br />
| |
| <br />
| |
| 13:21 (830.25) -- Usual augmented fifth (e.g. C4-G#4, 832.76, +2.51)<br />
| |
| <br />
| |
| 13:22 (910.79) -- Usual major sixth (e.g. G3-E4, 912.29, +1.50)<br />
| |
| <br />
| |
| 13:23 (987.75) -- Usual minor seventh (e.g. D4-C5, 991.81, +4.06)<br />
| |
| <br />
| |
| 13:24 (1061.43) -- Major seventh - QD (e.g. F*3-E4), 1061.80, +0.37)<br />
| |
| <br />
| |
| 14:17 (336.13) -- Usual augmented second (e.g. F4-G#4, 336.86, +0.73)<br />
| |
| <br />
| |
| 14:27 (1137.04) -- Octave - QD (e.g. F*4-F5, 1141.32, +4.28)<br />
| |
| <br />
| |
| 15:17 (216.69) -- Diminished third + QD (e.g. C#4-Eb*4, 217.72, +1.04)<br />
| |
| <br />
| |
| 16:21 (470.71) -- Major third + QD (e.g. C4-E*4, 475.06, +4.28)<br />
| |
| <br />
| |
| 16:23 (628.27) -- Usual augmented fourth (e.g. C4-F#4, 624.57, -3.70)<br />
| |
| <br />
| |
| 18:23 (424.36) -- Diminished fourth + QD (e.g. B4-Eb*5, 425.91, +1.55)<br />
| |
| <br />
| |
| 16:25 (772.63) -- Diminished fourth + QD (e.g. F#4-Bb*4, 774.09, +1.46)<br />
| |
| <br />
| |
| 17:20 (281.36) -- Augmented second - QD (e.g. F*4-G#4, 278.18, -3.18)<br />
| |
| <br />
| |
| 17:21 (365.83) -- Usual diminished fourth (e.g. F#4-Bb4, 367.24, +1.41)<br />
| |
| <br />
| |
| 17:28 (863.87) -- Usual diminished seventh (e.g. F#4-Eb4, 863.14, -0.73)<br />
| |
| <br />
| |
| 21:34 (834.17) -- Usual augmented fifth (e.g. F3-C#4, 832.76, +1.41)<br />
| |
| <br />
| |
| 28:51 (1038.08) -- Usual augmented sixth (e.g. Eb3-C#4, 1040.96, +2.87)<br />
| |
| <br />
| |
| 21:23 (157.49) -- Usual diminished third (e.g. C#4-Eb4, 159.04, +1.55)<br />
| |
| <br />
| |
| 21:26 (369.75) -- Usual diminished fourth (e.g. C#4-F4, 367.24, -1.51)<br />
| |
| <br />
| |
| 23:27 (277.59) -- Augmented second - QD (e.g. Eb*4-F#4, 278.18, +0.59)<br />
| |
| <br />
| |
| 26:33 (412.75) -- Usual major third (e.g. F4-A4, 416.38, +3.63)<br />
| |
| <br />
| |
| 28:33 (284.45) -- Usual minor third (e.g. E4-G4, 287.71, +3.27)<br />
| |
| <br />
| |
| 33:56 (915.55) -- Usual major sixth (e.g. G4-E5, 912.29, -3.27)</body></html></pre></div>
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