Skip fretting system 90 5 17: Difference between revisions
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One can play in | One can play in [[90edo]] on an [[18edo]] [[guitar]], by tuning the strings 17\90- (226 and 2/3 [[cents]]- ) apart. The resulting system allows a player to reach any [[13-limit]] interval by crossing a maximum of only 4 frets. [[Octave]]s lie across six open strings and one fret, or on the same string 18 frets up (because 90 is divisible by 18). | ||
For string players, a drawback of this system is that harmonics 3, 7 and 13 all lie on the same string, so only one of them can be played at a time. (For keyboardists this is irrelevant, as all three notes can be played simultaneously.) | |||
The primes intervals lie in the following places: | The primes intervals lie in the following places: | ||
| Line 41: | Line 43: | ||
|86 steps = 31 % 16 | |86 steps = 31 % 16 | ||
|string 3 fret 7 | |string 3 fret 7 | ||
|}From these, the location of any compound interval can be added by vector-summing the string-fret positions of the interval's factors. See [[Skip fretting system 48 2 13]] for details on how that's done. | |} | ||
From these, the location of any compound interval can be added by vector-summing the string-fret positions of the interval's factors. See [[Skip fretting system 48 2 13]] for details on how that's done. | |||
[[Category:Skip fretting]] | |||
Latest revision as of 04:50, 27 April 2025
One can play in 90edo on an 18edo guitar, by tuning the strings 17\90- (226 and 2/3 cents- ) apart. The resulting system allows a player to reach any 13-limit interval by crossing a maximum of only 4 frets. Octaves lie across six open strings and one fret, or on the same string 18 frets up (because 90 is divisible by 18).
For string players, a drawback of this system is that harmonics 3, 7 and 13 all lie on the same string, so only one of them can be played at a time. (For keyboardists this is irrelevant, as all three notes can be played simultaneously.)
The primes intervals lie in the following places:
| note | fretboard position |
|---|---|
| 0 steps = 1 % 1 | string 0 fret 0 |
| 90 steps = 2 % 1 | string 5 fret 1 |
| 53 steps = 3 % 2 | string 4 fret - 3 |
| 29 steps = 5 % 4 | string 2 fret - 1 |
| 73 steps = 7 % 4 | string 4 fret 1 |
| 41 steps = 11 % 8 | string 3 fret - 2 |
| 63 steps = 13 % 8 | string 4 fret - 1 |
| 8 steps = 17 % 16 | string - 1 fret 5 |
| 22 steps = 19 % 16 | string 1 fret 1 |
| 47 steps = 23 % 16 | string 1 fret 6 |
| 77 steps = 29 % 16 | string 1 fret 12 |
| 86 steps = 31 % 16 | string 3 fret 7 |
From these, the location of any compound interval can be added by vector-summing the string-fret positions of the interval's factors. See Skip fretting system 48 2 13 for details on how that's done.