Topic: More on miracles
2 scales
| File | Description | Notes | Period (ยข) |
|---|---|---|---|
| 16-miracle | 16 out of 53 within 5/3 miracle scale | 16 | 884.4 |
| 16-miracle-oct | 21 out of 72 within 2/1 miracle scale, from 16-of-53 within 5/3 | 21 | 1200.0 |
Thread (4 messages)
From: [email protected] (2001-09-18) Subject: More on miracles As I posted over on tuning-math, the "miracle" phenomenon is the second of a class of similar such miracles, the first of which is the meantone, and the third of which has a generator of around 35.4 cents. The miracle generator lies between 16/15 at 111.7 cents and 15/14 at 119.4 cents, analogously to the way the meantone lies between 10/9 and 9/8. Scales constructed by iterating the miracle generator are therefore analogous to scales constructed by iterating the meantone; however what is actually done in that case is to take advantage of the fact that the numerator of 9/8 is a square, so that 9/8 = (3/2)^2 2^(-1), and then iterate the 3/2 within the 2. If we were to proceed in an analogous manner with the miracle generator, we would take advantage of the fact that the numerator of 16/15 is a square, and factor it as 16/15 = (4/3)^2 (5/3)^(-1); we would then look for a miracle fourth in analogy to the meantone fifth to iterate within 5/3, producing mean semitone systems. To get the meantone fifth, we select a value for the meantone m of m=sqrt(5/4), which gives us pure thirds, and then take the fifth to be sqrt(2m). To get a miracle fourth, we can similarly select a value s for the mean semitone of sqrt(8/7) = 115.6 cents, giving us a miracle fourth of sqrt((5/3)s); however of more significance we can require instead that we have pure octaves, which we will obtain if we set s = (12/5)^(1/13) = 116.6 cents, very close to the 72-et value of 2^(7/72) = 116 2/3 cents, as well as to the value 116.7 attributed to Keenan and Secor on Joe Monzo's web page. This in turn leads to a miracle fourth of sqrt((5/3)s) = 500.5 cents which we can interate within a major sixth. The 72-et approximates 4/3 by 2^(30/72) and 5/3 by 2^(53/72); if we want MOS scales within 53 divisions of 5/3, we can look at the semiconvergents to 30/53, which give us 4/7, 5/9, 9/16, 13/23, and 17/30. If we look for instance at 16 steps out of 53, we get steps of size 5252522525252252 which repeat within an interval of repetition 5/3. If we prefer octaves, we can easily extend the pattern until we reach an octave, and repeat within that; in this way we would get 525252252525225252525, which has the slightly irregular feature of two steps of 5 in sequence. If we pick representative intervals approximated by these steps, we get 1-21/20-15/14-9/8-8/7-6/5-11/9-5/4-21/16-4/3-7/5-10/7-3/2-32/21- 14/9-18/11-5/3-7/4-16/9-15/8-40/21-(2) which gives us some idea of the resources of this scale, in either of its forms. If we compare it to Blackjack, we have instead 525252525252525252522; we have again 10 5's and 11 2's, but distributed differently. If anyone wants to try this out, the version within 5/3 is given by ! 16-miracle.scl ! 16 out of 53 within 5/3 miracle scale 16 ! 83.43006824 116.8020936 200.2321622 233.6041876 317.0342560 350.4062819 383.7783092 467.2083755 500.5804036 584.0104712 617.3824974 700.8125646 734.1845918 767.5566184 850.9866863 5/3 The version inside an octave is ! 16-miracle-oct.scl ! 21 out of 72 within 2/1 miracle scale, from 16-of-53 within 5/3 21 ! 83.33333333 116.6666667 200.0000000 233.3333333 316.6666667 350.0000000 383.3333333 466.6666667 500.0000000 583.3333333 616.6666667 700.0000000 733.3333333 766.6666667 850.0000000 883.3333333 966.6666667 1000.000000 1083.333333 1116.666666 2/1
From: [email protected] (2001-09-23) Subject: Re: More on miracles --- In tuning@y..., genewardsmith@j... wrote: http://groups.yahoo.com/group/tuning/message/28290 > As I posted over on tuning-math, the "miracle" phenomenon is the > second of a class of similar such miracles, the first of which is the > meantone, and the third of which has a generator of around 35.4 > cents. The miracle generator lies between 16/15 at 111.7 cents and > 15/14 at 119.4 cents, analogously to the way the meantone lies > between 10/9 and 9/8. Scales constructed by iterating the miracle > generator are therefore analogous to scales constructed by iterating the meantone Thank you, Gene, for bringing these discoveries over to this list... I guess we had discussed before the relationship of 31-tET, with, I believe, a generator of 116.129 cents or 1/3 comma meantone with the generator of the miracle family 116.667. 31-tET is, of course, also a fine scale for just harmonies, minor thirds in particular, so it was interesting to see how such a small variation of the "generator" could produce so many scales containing just intervals... I think I'm getting this right... ________ _______ _________ Joseph Pehrson
From: Paul Erlich (2001-09-24) Subject: Re: More on miracles --- In tuning@y..., jpehrson@r... wrote: > I guess we had discussed before the relationship of 31-tET, with, I > believe, a generator of 116.129 cents or 1/3 comma meantone 31-tET <-> 1/4-comma meantone 19-tET <-> 1/3-comma meantone > with the > generator of the miracle family 116.667. > > 31-tET is, of course, also a fine scale for just harmonies, minor > thirds in particular, Major thirds in particular?
From: [email protected] (2001-09-24) Subject: Re: More on miracles --- In tuning@y..., "Paul Erlich" <paul@s...> wrote: http://groups.yahoo.com/group/tuning/message/28531 > --- In tuning@y..., jpehrson@r... wrote: > > > I guess we had discussed before the relationship of 31-tET, with, I > > believe, a generator of 116.129 cents or 1/3 comma meantone > > 31-tET <-> 1/4-comma meantone > 19-tET <-> 1/3-comma meantone > > > with the > > generator of the miracle family 116.667. > > > > 31-tET is, of course, also a fine scale for just harmonies, minor > > thirds in particular, > > Major thirds in particular? Thanks, Paul... for correcting that slip.... _________ _______ _________ Joseph Pehrson