17 equal temperament
Musical tuning system with 17 pitches equally-spaced on a logarithmic scale
From Wikipedia, the free encyclopedia
In music, 17 equal temperament is the tempered scale derived by dividing the octave into 17 equal steps (equal frequency ratios). Each step represents a frequency ratio of , or 70.6 cents.
![{\displaystyle {\sqrt[{17}]{2}}}](http://wikimedia.org/api/rest_v1/media/math/render/svg/67f418e515d63fe5822da099a097b2c3c92a36d8)
17-ET is the tuning of the regular diatonic tuning in which the tempered perfect fifth is equal to 705.88 cents, as shown in Figure 1 (look for the label "17-TET").
History and use
Alexander J. Ellis refers to a tuning of seventeen tones based on perfect fourths and fifths as the Arabic scale.[2] In the thirteenth century, Middle-Eastern musician Safi al-Din Urmawi developed a theoretical system of seventeen tones to describe Arabic and Persian music, although the tones were not equally spaced. This 17-tone system remained the primary theoretical system until the development of the quarter tone scale.[citation needed]
Notation
Easley Blackwood Jr. created a notation system where sharps and flats raised/lowered 2 steps, identical to ups and downs notation for 17-EDO. ((10*7) mod 17 = 2.) This yields the chromatic scale:
- C, Dâ, Câ¯, D, Eâ, Dâ¯, E, F, Gâ, Fâ¯, G, Aâ, Gâ¯, A, Bâ, Aâ¯, B, C
Quarter tone sharps and flats can also be used, yielding the following chromatic scale:
- C, C
/Dâ, Câ¯/D
, D, D/Eâ, Dâ¯/E, E, F, F/Gâ, Fâ¯/G, G, G/Aâ, Gâ¯/A, A, A/Bâ, Aâ¯/B, B, C
Interval size
Below are some intervals in 17 EDO compared to just.
| 17 EDO | |
| just | |
| 12 EDO |
interval name size
(steps)size
(cents)midi
audiojust
ratiojust
(cents)midi
audioerror octave 17 1200 2:1 1200 0 minor seventh 14 988.23 16:9 996.09 â7.77 harmonic seventh 14 988.23 7:4 968.83 +19.41 perfect fifth 10 705.88 3:2 701.96 +3.93 septimal tritone 8 564.71 7:5 582.51 â17.81 tridecimal narrow tritone 8 564.71 18:13 563.38 +1.32 undecimal super-fourth 8 564.71 11:8 551.32 +13.39 perfect fourth 7 494.12 4:3 498.04 â3.93 septimal major third 6 423.53 9:7 435.08 â11.55 undecimal major third 6 423.53 14:11 417.51 +6.02 major third 5 352.94 5:4 386.31 â33.37 tridecimal neutral third 5 352.94 16:13 359.47 â6.53 undecimal neutral third 5 352.94 11:9 347.41 +5.53 minor third 4 282.35 6:5 315.64 â33.29 tridecimal minor third 4 282.35 13:11 289.21 â6.86 septimal minor third 4 282.35 7:6 266.87 +15.48 septimal whole tone 3 211.76 8:7 231.17 â19.41 greater whole tone 3 211.76 9:8 203.91 +7.85 lesser whole tone 3 211.76 10:9 182.40 +29.36 neutral second, lesser undecimal 2 141.18 12:11 150.64 â9.46 greater tridecimal â â¯2â¯/ 3 â -tone 2 141.18 13:12 138.57 +2.60 lesser tridecimal â â¯2â¯/ 3 â -tone 2 141.18 14:13 128.30 +12.88 septimal diatonic semitone 2 141.18 15:14 119.44 +21.73 diatonic semitone 2 141.18 16:15 111.73 +29.45 septimal chromatic semitone 1 70.59 21:20 84.47 â13.88 chromatic semitone 1 70.59 25:24 70.67 â0.08
Relation to 34 EDO
17 EDO is a subset of 34 EDO, equivalent to every other step in the 34 EDO scale.