Topic: Eight of everything
3 scales
| File | Description | Notes | Period (ยข) |
|---|---|---|---|
| diff19-9-4 | Scale derived from (19,9,4) Type Q cyclic difference set, 19edo | 10 | 1200.0 |
| diff31-h8 | (31, 15, 7) type H8 cyclic difference set, 31edo | 16 | 1200.0 |
| diff31-q | (31, 15, 7) type Q cyclic difference set, 31edo | 16 | 1200.0 |
Thread (3 messages)
From: genewardsmith (2012-02-16) Subject: Eight of everything To go with the Type Q (19, 9, 4) cyclic difference set scale, which has five of everything, below there's a Type Q (31, 15, 7) scale, which has eight of everything. By that I mean it has eight subminor thirds, eight minor thirds, eight major thirds, eight fourths, eight 11/8s etc. A natural for two-part harmony. There's also a Type H8 cyclic difference set, whose definition is a little more complicated; the Type Qs are just the quadratic residues. I'm not sure why Golomb rulers are in the Scala directgory and not Type Q difference sets, which seem more interesting. ! diff31-q.scl ! (31, 15, 7) type Q cyclic difference set, 31edo 16 ! 38.70968 77.41935 154.83871 193.54839 270.96774 309.67742 348.38710 387.09677 541.93548 619.35484 696.77419 735.48387 774.19355 967.74194 1083.87097 1200.00000 ! diff31-h8.scl ! (31, 15, 7) type H8 cyclic difference set, 31edo 16 ! 38.70968 77.41935 116.12903 154.83871 232.25806 309.67742 464.51613 580.64516 619.35484 658.06452 890.32258 929.03226 1045.16129 1122.58065 1161.29032 1200.00000 ! diff19-9-4.scl ! Scale derived from (19,9,4) Type Q cyclic difference set, 19edo 10 ! 63.15789 252.63158 315.78947 378.94737 442.10526 568.42105 694.73684 1010.52632 1073.68421 1200.00000
From: Chris Vaisvil (2012-02-16) Subject: Re: [tuning] Eight of everything I got them - thank you! On Wed, Feb 15, 2012 at 11:25 PM, genewardsmith <genewardsmith@... > wrote: > ** > > > To go with the Type Q (19, 9, 4) cyclic difference set scale, which has > five of everything, below there's a Type Q (31, 15, 7) scale, which has > eight of everything. By that I mean it has eight subminor thirds, eight > minor thirds, eight major thirds, eight fourths, eight 11/8s etc. A natural > for two-part harmony. There's also a Type H8 cyclic difference set, whose > definition is a little more complicated; the Type Qs are just the quadratic > residues. I'm not sure why Golomb rulers are in the Scala directgory and > not Type Q difference sets, which seem more interesting. > > ! diff31-q.scl > ! > (31, 15, 7) type Q cyclic difference set, 31edo > 16 > ! > 38.70968 > 77.41935 > 154.83871 > 193.54839 > 270.96774 > 309.67742 > 348.38710 > 387.09677 > 541.93548 > 619.35484 > 696.77419 > 735.48387 > 774.19355 > 967.74194 > 1083.87097 > 1200.00000 > > ! diff31-h8.scl > ! > (31, 15, 7) type H8 cyclic difference set, 31edo > 16 > ! > 38.70968 > 77.41935 > 116.12903 > 154.83871 > 232.25806 > 309.67742 > 464.51613 > 580.64516 > 619.35484 > 658.06452 > 890.32258 > 929.03226 > 1045.16129 > 1122.58065 > 1161.29032 > 1200.00000 > > ! diff19-9-4.scl > ! > Scale derived from (19,9,4) Type Q cyclic difference set, 19edo > 10 > ! > 63.15789 > 252.63158 > 315.78947 > 378.94737 > 442.10526 > 568.42105 > 694.73684 > 1010.52632 > 1073.68421 > 1200.00000 > > >
From: Ryan Avella (2012-02-19) Subject: Re: Eight of everything --- In [email protected], "genewardsmith" <genewardsmith@...> wrote: > > To go with the Type Q (19, 9, 4) cyclic difference set scale, which has five of everything, below there's a Type Q (31, 15, 7) scale, which has eight of everything. By that I mean it has eight subminor thirds, eight minor thirds, eight major thirds, eight fourths, eight 11/8s etc. A natural for two-part harmony. There's also a Type H8 cyclic difference set, whose definition is a little more complicated; the Type Qs are just the quadratic residues. I'm not sure why Golomb rulers are in the Scala directgory and not Type Q difference sets, which seem more interesting. So trivially, since these scales have 8 of everything, they can't be rank-2 MOS. What is the minimum number of generators required to make one of these scales? Ryan