20edo
← 19edo | 20edo | 21edo → |
20 equal divisions of the octave (abbreviated 20edo or 20ed2), also called 20-tone equal temperament (20tet) or 20 equal temperament (20et) when viewed under a regular temperament perspective, is the tuning system that divides the octave into 20 equal parts of exactly 60 ¢ each. Each step represents a frequency ratio of 21/20, or the 20th root of 2.
Theory
20edo contains smaller EDOs: 2, 4, 5, and 10 and is part of the 5n family of equal divisions of the octave. It fairly approximates the harmonics 7 (from 5edo), 11, 13 & 15 (from 10edo), 19 & 27 (from 4edo), 29 and 31; as well as the other harmonics more loosely (though to some people, still functionally) approximated. Thus, 20-EDO does a reasonably convincing approximation of harmonics 4:7:11:13:15. As 7, 11, & 15 are all flat by approximately 10 cents, their flatness cancels out when combined in composite ratios, making an 11:14:15 chord (0-7-9 steps) and its utonal inversion particularly precise. Using 9/20 as the generator and treating these as the primary major and minor triads produces Balzano nonatonic and undecatonic scales, which is probably the clearest arrangement for the black/white keys on a 20 tone keyboard. Treating the generator as 11\20 creates the same scale, but the primary triads are now 13:16:19 (0-6-11 steps) and its inversion instead. The 11\20 generator is a near-optimal tuning for both Mavericks temperament (which has a ~19/13 generator) and Score temperament (which has a ~16/11 generator).
Alternately, 20edo can be used as a tuning of the blackwood temperament, combining minor and major thirds to generate a highly symmetrical decatonic scale where every note is root to a major or minor triad and 7-limit tetrad that are heavily tempered, but in a useful way, as you can easily modulate to anywhere in the small cycle of 5ths, and build extended chords that use every note in the scale without clashing. Either of these works better than trying to force 20 into a diatonic framework.
20edo also possesses a 6L 1s scale generated using the narrow major second of 3\20 that is probably best interpreted as the sharp extreme of tetracot temperament and a 3L 5s generated by 7/20 that functions as the flat end of squares.
Odd harmonics
Harmonic | 3 | 5 | 7 | 9 | 11 | 13 | 15 | 17 | 19 | 21 | 23 | |
---|---|---|---|---|---|---|---|---|---|---|---|---|
Error | Absolute (¢) | +18.0 | -26.3 | -8.8 | -23.9 | -11.3 | -0.5 | -8.3 | +15.0 | +2.5 | +9.2 | -28.3 |
Relative (%) | +30.1 | -43.9 | -14.7 | -39.9 | -18.9 | -0.9 | -13.8 | +25.1 | +4.1 | +15.4 | -47.1 | |
Steps (reduced) |
32 (12) |
46 (6) |
56 (16) |
63 (3) |
69 (9) |
74 (14) |
78 (18) |
82 (2) |
85 (5) |
88 (8) |
90 (10) |
Intervals
Like 15edo, every note has many names. D is also C# and Eb. The major 3rd is also a perfect 4th and a dim 5th.
Degree | Cents | Approximate Ratios | Ups and Downs Notation | Balzano Notation | Archeotonic notation | Nearest Harmonic | ||
---|---|---|---|---|---|---|---|---|
0 | 0 | 1/1 | unison | P1 | D | 1 | D | 1 |
1 | 60 | 29/28 | up unison, upminor 2nd | ^1, ^m2 | ^D, ^Eb | 1#/2b | D# | 33 |
2 | 120 | 15/14, 14/13 | dup unison, mid 2nd | ^^1, ~2 | ^^D, vvE | 2 | Eb | 69 |
3 | 180 | 10/9 | downmajor 2nd | vM2 | vE | 2#/3b | E | 71 |
4 | 240 | 8/7, 15/13 | major 2nd, minor 3rd | M2, m3 | E, F | 3 | E# | 37 |
5 | 300 | 13/11, 19/16 | upminor 3rd | ^m3 | ^F | 3#/4b | Fb | 19 |
6 | 360 | 16/13, 5/4 | mid 3rd | ~3 | ^^F, vvF# | 4 | F | 79 |
7 | 420 | 14/11, 51/40 | downmajor 3rd | vM3 | vF# | 4# | F# | 41 |
8 | 480 | 25/19, 4/3 | major 3rd, perfect fourth | M3, P4 | F#, G | 5b | Gb | 21 |
9 | 540 | 15/11, 11/8 | up-fourth | ^4 | ^G | 5 | G | 11 |
10 | 600 | 7/5 | mid fourth, mid fifth | ~4, ~5 | ^^G, vvA | 5#/6b | G#/Ab | 91 |
11 | 660 | 22/15, 16/11 | down-fifth | v5 | vA | 6 | A | 47 |
12 | 720 | 38/25, 3/2 | fifth | P5, m6 | A | 6#/7b | A# | 97 |
13 | 780 | 11/7, 25/16 | upfifth, upminor 6th | ^5, ^m6 | ^A, ^Bb | 7 | Bb | 25 |
14 | 840 | 13/8, 8/5 | mid 6th | ~6 | ^^A, vvB | 7#/8b | B | 13 |
15 | 900 | 22/13, 32/19 | downmajor 6th | vM6 | vB | 8 | B# | 27 |
16 | 960 | 7/4, 26/15 | major 6th, minor 7th | M6, m7 | B, C | 8#/9b | Cb | 7 |
17 | 1020 | 9/5 | upminor 7th | ^m7 | ^C | 9 | C | 115 |
18 | 1080 | 28/15, 15/8, 13/7 | mid 7th | ~7 | ^^C, vvD | 9# | C# | 15 |
19 | 1140 | 56/29 | downmajor 7th | vM7 | vD | 1b | Db | 31 |
20 | 1200 | 2/1 | octave | P8 | D | 1 | D | 2 |
Selected 19-limit just intervals
Interval, complement | Error (abs, ¢) |
---|---|
16/13 13/8 | 0.5276 |
15/14 28/15 | 0.5571 |
10/9 9/5 | 2.4037 |
19/16 32/19 | 2.4869 |
14/11 11/7 | 2.4920 |
19/13 26/19 | 3.0146 |
15/11 22/15 | 3.0492 |
15/13 26/15 | 7.7410 |
16/15 15/8 | 8.2687 |
14/13 13/7 | 8.2982 |
8/7 7/4 | 8.8259 |
13/11 22/13 | 10.7902 |
11/8 16/11 | 11.3179 |
11/9 18/11 | 12.5920 |
11/10 20/11 | 14.9957 |
17/16 32/17 | 15.0445 |
9/7 14/9 | 15.0840 |
6/5 5/3 | 15.6412 |
7/5 10/7 | 17.4878 |
3/2 4/3 | 18.0449 |
13/12 24/13 | 18.5726 |
9/8 16/9 | 23.9100 |
5/4 8/5 | 26.3137 |
7/6 12/7 | 26.8709 |
12/11 11/6 | 29.36294 |
Chord names
20edo chords can be named using ups and downs. Alterations are always enclosed in parentheses, additions never are. An up, down or mid immediately after the chord root affects the 3rd, 6th, 7th, and/or the 11th (every other note of a stacked-3rds chord 6-1-3-5-7-9-11-13).
- 0-4-12 = D E A = Dsus2 = "D sus 2", or D F A = Dm = "D minor"
- 0-5-12 = D ^F A = D^m = "D upminor"
- 0-6-12 = D ^^F A = D~ = "D mid"
- 0-7-12 = D vF# A = Dv = "D down" or "D downmajor"
- 0-8-12 = D G A = Dsus4, or D F# A = D = "D" or "D major"
- 0-4-12-16 = D F A C = Dm7 = "D minor seven", or D F A B = Dm6 = "D minor six"
- 0-5-12-16 = D ^F A C = D^m,7 = "D upminor add-seven", or D ^F A B = D^m,6 = "D upminor add-six"
- 0-6-12-16 = D ^^F A C = D~,7 = "D mid add-seven", or D ^^F A B = D~,6 = "D mid add-six"
- 0-7-12-16 = D vF# A C = Dv,7 = "D down add-seven", or D vF# A B = Dv,6 = "D down add-six"
- 0-8-12-16 = D F# A C = D7 = "D seven", or D F# A B = D6 = "D six"
- 0-7-12-19 = D vF# A vC# = DvM7 = "D downmajor seven"
- 0-5-12-17 = D ^F A ^C = D^m7 = "D upminor-seven", or D ^F A ^B = D^m6 = "D upminor-six"
For a more complete list, see Ups and Downs Notation - Chords and Chord Progressions. Because many intervals have several names, many chords do too.
Modes
20 tone equal modes:
3 1 3 1 3 1 3 1 3 1 | Blackwood Major Decatonic (bi-equal decatonic, according to the MOS naming scheme) |
1 3 1 3 1 3 1 3 1 3 | Blackwood Minor Decatonic (also bi-equal decatonic) |
2 1 1 2 1 1 2 1 1 2 1 1 | Blackwood Major Pentadecatonic (also tri-equal pentadecatonic) |
1 1 2 1 1 2 1 1 2 1 1 2 | Blackwood Diminished Pentadecatonic (also tri-equal pentadecatonic) |
1 2 1 1 2 1 1 2 1 1 2 1 | Blackwood Minor Pentadecatonic (also tri-equal pentadecatonic) |
2 3 2 2 2 3 2 2 2 | Balzano Nine-tone (fair mavila, score9) [1] |
2 2 2 2 1 2 2 2 2 2 1 | Balzano Eleven-tone, Agmon Diatonic DS4, score11 |
2 2 2 3 2 2 2 3 2 | Balzano Nine-tone inverse (also fair mavila, score9) |
1 2 2 2 2 2 1 2 2 2 2 | Balzano Eleven-tone inverse (also score11) |
2 3 2 3 2 3 2 3 | Octatonic (diminished, according to the MOS naming scheme) |
3 2 3 2 3 2 3 2 | Diminished |
2 2 1 2 2 1 2 2 1 2 2 1 | Dodecatonic |
2 1 2 2 1 2 2 1 2 2 1 2 | Diminished |
1 2 2 1 2 2 1 2 2 1 2 2 | Diminished |
4 3 1 4 3 4 1 | Twenty-tone "Major" |
4 1 3 4 1 4 3 | Twenty-tone "Minor" |
2 2 1 2 1 2 2 1 2 2 2 1 | Twelve-tone Chromatic |
2 2 2 2 1 2 2 2 2 1 2 | Zweifel Major |
2 1 2 2 2 2 2 1 2 2 2 | Zweifel Natural Minor |
3 3 3 3 3 3 2 | Major quasi-equal Heptatonic (archaeotonic or Grumpy heptatonic) |
3 2 3 3 3 3 3 | Minor quasi-equal Heptatonic (also archaeotonic) |
2 2 1 2 1 2 1 2 1 2 1 2 1 | Major quasi-equal Triskaidecatonic (Grumpy triskaidecatonic) |
2 1 2 1 2 1 2 1 2 1 2 1 2 | Minor quasi-equal Triskaidecatonic A |
1 2 1 2 1 2 1 2 1 2 1 2 2 | Minor quasi-equal Triskaidecatonic B |
2 1 2 1 2 1 2 1 2 1 2 2 1 | Minor quasi-equal Triskaidecatonic C |
3 2 2 2 2 3 2 2 2 | Rothenberg Generalized Diatonic (also balzano or score9) |
3 4 1 4 3 3 2 | Stearns Major |
7 2 7 2 2 | score5 pentic, classic pentatonic |
5 2 2 5 2 2 2 | score7 (mavila, anti-diatonic) |
Regular temperament properties
Uniform maps
Min. size | Max. size | Wart notation | Map |
---|---|---|---|
19.5000 | 19.5119 | 20bccddeeeeffff | ⟨20 31 45 55 67 72] |
19.5119 | 19.5923 | 20bccddeeffff | ⟨20 31 45 55 68 72] |
19.5923 | 19.5958 | 20bccddeeff | ⟨20 31 45 55 68 73] |
19.5958 | 19.7695 | 20bddeeff | ⟨20 31 46 55 68 73] |
19.7695 | 19.8009 | 20beeff | ⟨20 31 46 56 68 73] |
19.8009 | 19.8625 | 20bff | ⟨20 31 46 56 69 73] |
19.8625 | 19.8743 | 20b | ⟨20 31 46 56 69 74] |
19.8743 | 20.0265 | 20 | ⟨20 32 46 56 69 74] |
20.0265 | 20.0900 | 20c | ⟨20 32 47 56 69 74] |
20.0900 | 20.1257 | 20ce | ⟨20 32 47 56 70 74] |
20.1257 | 20.1327 | 20cde | ⟨20 32 47 57 70 74] |
20.1327 | 20.3791 | 20cdef | ⟨20 32 47 57 70 75] |
20.3791 | 20.4030 | 20cdeeef | ⟨20 32 47 57 71 75] |
20.4030 | 20.4571 | 20cdeeefff | ⟨20 32 47 57 71 76] |
20.4571 | 20.4819 | 20cccdeeefff | ⟨20 32 48 57 71 76] |
20.4819 | 20.5000 | 20cccdddeeefff | ⟨20 32 48 58 71 76] |
Commas
20 EDO tempers out the following commas. (Note: This assumes the val ⟨20 32 46 56 69 74].)
Prime Limit |
Ratio[1] | Monzo | Cents | Color name | Name(s) |
---|---|---|---|---|---|
3 | 256/243 | [8 -5⟩ | 90.22 | Sawa | Limma, Pythagorean Minor 2nd |
5 | 16875/16384 | [-14 3 4⟩ | 51.12 | Laquadyo | Negri Comma, Double Augmentation Diesis |
5 | (16 digits) | [-25 7 6⟩ | 31.57 | Lala-tribiyo | Ampersand, Ampersand's Comma |
5 | 2048/2025 |
[11 -4 -2⟩ |
19.55 | Sagugu | Diaschisma |
7 | 525/512 | [-9 1 2 1⟩ | 43.41 | Lazoyoyo | Avicennma, Avicenna's Enharmonic Diesis |
7 | 49/48 | [-4 -1 0 2⟩ | 35.70 | Zozo | Slendro Diesis |
7 | 50/49 | [1 0 2 -2⟩ | 34.98 | Biruyo | Tritonic Diesis, Jubilisma |
7 | 686/675 | [1 -3 -2 3⟩ | 27.99 | Trizo-agugu | Senga |
7 | 64/63 | [6 -2 0 -1⟩ | 27.26 | Ru | Septimal Comma, Archytas' Comma, Leipziger Komma |
7 | (18 digits) | [-10 7 8 -7⟩ | 22.41 | Lasepru-aquadbiyo | Blackjackisma |
7 | 1029/1024 | [-10 1 0 3⟩ | 8.43 | Latrizo | Gamelisma |
7 | 225/224 | [-5 2 2 -1⟩ | 7.71 | Ruyoyo | Septimal Kleisma, Marvel Comma |
7 | 16875/16807 | [0 3 4 -5⟩ | 6.99 | Quinru-aquadyo | Mirkwai |
7 | (24 digits) | [11 -10 -10 10⟩ | 5.57 | Saquinbizogu | Linus |
7 | 2401/2400 | [-5 -1 -2 4⟩ | 0.72 | Bizozogu | Breedsma |
11 | 121/120 | [-3 -1 -1 0 2⟩ | 14.37 | Lologu | Biyatisma |
13 | 91/90 | [-1 -2 -1 1 0 1⟩ | 19.13 | Thozogu | Superleap |
13 | 676/675 | [2 -3 -2 0 0 2⟩ | 2.56 | Bithogu | Parizeksma |
- ↑ Ratios longer than 10 digits are presented by placeholders with informative hints
Instruments
- Like other members of the 5EDO family, 20-EDO lends itself well to guitar (and other fretted string instruments), on account of the fact that five of its flat 4ths (at 480 cents) exactly spans two octaves (480*5=2400), meaning the open strings can be uniformly tuned in 4ths. This allows for greater uniformity in chord and scale fingering patterns than in 12-TET, making it exceptionally easy to learn. For instance, the fingering for an "E" chord would be 0-4-4-2-0-0 (low to high), an "A" chord would be 0-0-4-4-2-0, and a "D" chord would be 2-0-0-4-4-2.
- Lumatone mapping for 20edo
Books
External image: http://ronsword.com/images/20_tet_Coversm.jpg [dead link]
- WARNING: MediaWiki doesn't have very good support for external images.
- Furthermore, since external images can break, we recommend that you replace the above with a local copy of the image.
"Icosaphonic Scales for Guitar" - Theory / Scale book with above modes and more by Ron Sword [dead link]
Music
- See also: Category:20edo tracks
- Vivid vibe (2022)
- Composition for unconventional tempered clavier (2013)
- 5 compositions for violin and clavier in 20-EDO (2016)
- Composition for cello and clavier in 20-tone equal temperament (2017)
- 5 compositions for violin and clavier in 20-tone equal temperament (2017)
- T w e n t y / T w e n t y (2019) – synthwave, blackwood[10] in 20edo tuning
- "Elements - Wood" from Elements (2019–2020) – tetracot in 20edo tuning
- Decade (2020) – synthwave
- Horrible Night Of Horror (2023)
- Madeira Preta (2023) – blackwood[10] in 20edo
- We Call It Sharing Breath (2004) – SoundClick | play
- Flooded Floodlights (2022)
- Chacony & Fugue (2017)
- Canon on Twinkle Twinkle Little Star (2023–2024)
- Etude in 20-tone equal tuning – midi file play
- Spinning the Web (2017)
- Ivari na taniravi (2020)
- Drifting (2020)
- "Serenity" from Edolian (2020)
- Tomorrow (2020)
- from Lastlands OST (2020–2021)
- "Enterprise", from Human Astronomy (2010)
- Ultraviolet (2021) – Bandcamp | SoundCloud
- A Paradigm Shift (2013)
- 20 edo Electric Guitar Improvisation (2014)
- Göbekli Tepe (2014) – for solo guitar
- The Walrus and the Carpenter (2014)
- Underwater Spontaniety (2017) – lo-fi ambient
- God's Favorite Tuning (2017) – xen-pop
- You Lied, and I'm not Mentioning your Name (2017) – xen-pop
- Galloping Nightmares (2024) - synth metal