This is an Opt In Archive . We would like to hear from you if you want your posts included. For the contact address see About this archive. All posts are copyright (c).
Contents Hide Contents S 76000 6050 6100 6150 6200 6250 6300 6350 6400 6450 6500 6550 6600 6650 6700 6750 6800 6850 6900 6950
6550 - 6575 -
Message: 6575 Date: Thu, 27 Feb 2003 11:13:33 Subject: gd search mk. 4 (was Re: A Property of MOS/DE Scales) From: Carl Lumma >> Anybody else interested in reviving this thread? >> >> Relevant messages... >> >> Yahoo groups: /tuning/message/41371 * >> Yahoo groups: /tuning/message/41383 * >> >> Yahoo groups: /tuning-math/message/5132 * >> Yahoo groups: /tuning-math/message/5136 * >> >> -Carl > >yes, i am very interested!! My interest regards a systematic search for scales with between 5 and 10 notes, in which a single pattern of scale degrees yields more than one consonant m-ad in a majority of modes, where the m-ads are approximated at least as well as the 5-limit in 12-tET (unweighted RMS). How would one begin such a search? At the outermost level, would we step through m? If so, I suggest 2 <= m <= 6. Within a given m, we need to identify promising commas. Probably cents/(n*d) is a good metric for that... Beyond that, how do we set things up? Should we limit ourselves to linear temperaments? What's the method for finding which chords/scale pattern will be involved given a set of commas and the commatic/chromatic designations? Does this method work when three or four different m-ads appear on the scale pattern (rather than just two)? I'm willing to turn English into Java or Scheme... -Carl
Message: 6577 Date: Fri, 28 Feb 2003 19:24:03 Subject: Re: gd search mk. 4 From: Carl Lumma >> Probably cents/(n*d) is a good metric for that... > >why do you want cents to be high? Whoops, that should be 1/(n*d)cents. -C.
Message: 6578 Date: Sat, 1 Mar 2003 09:13:45 Subject: Re: [tuning] Re: Some magic meantones From: monz hi Gene, i've shifted this thread over to here so as not to bother the regular tuning list members. as usual, i sense intuitively that the explanation you've provided for me below has some real insight buried in it somewhere ... but it's so cryptic that i have no idea what you're saying. can you please explain the numbers in brackets? how do "we see that ... 7/26[-comma meantone] is marginal for minor triads and really stinks for major triads"? based on my understanding of Woolhouse's work, i thought this was an "optimal" meantone. ...? (i apologize for being stupid, as the cause of it is simply my lack of reading and following your many posts here. thanks.) -monz ----- Original Message ----- From: <gwsmith@xxxxx.xxx> To: <tuning@xxxxxxxxxxx.xxx> Sent: Friday, February 28, 2003 3:56 PM Subject: [tuning] Re: Some magic meantones > --- In tuning@xxxxxxxxxxx.xxxx "monz" <monz@a...> wrote: > > > > i don't know if 3/14-comma is "magic", but it and > > 7/26-comma are the only fraction-of-a-comma meantones > > in my list that you left out of yours ... was that > > simply an oversight, or are those two not "magic"? > > "Magic" is a relative term. We have > > 3/14-comma brat = 15/4 major [15/4, -10/9, -6/15] > minor [5/2, 3/10, 4/3] > > 7/26-comma brat = -15/4 major [-15/4, 10/21, -14/15] > minor [-5/2, 7/10, -4/7] > > 4/15-comma brat = -9/2 major [-9/2, 5/12, -8/15] > minor [-3, -2/3, -1/2] > > Note that if any one of the three, q-comma, major ratios, > minor ratios, is exact, the other two are approximate. > > We see 4/15-comma is good for minor triads and marginal > for major ones, 3/14-comma is pretty good for minor triads > and fairly awful for major triads, and 7/26 is marginal for > minor triads and really stinks for major triads.
Message: 6581 Date: Sat, 01 Mar 2003 01:59:02 Subject: Re: gd search mk. 4 From: Carl Lumma >> Whoops, that should be 1/(n*d)cents. >> >> -C. > >why do you want cents to be low? I want the simpler ratios in a given size range to fare best. I guess I should figure out if we want the scores to be periodic as the interval size changes. The mean complexity of smaller ratios is higher than that of larger ratios (for ratios in lowest terms). We'll have to adjust for that if we do want scores to be comparable in different size ranges. I count the number of ratios n/d in lowest terms, 1 < n/d < 2, n > d, for... (n*d <= 100) = 21 (n*d <= 1000) = 210 (n*d <= 10000) = 2111 (n*d <= 100000) = 21069 For n*d <= 3000, there are 633 such ratios. They are in this spreadsheet... http://lumma.org/stuff/thinger.xls * ...Excel's chart Wizard again completely confounds me. I just want to see how (n*d)cents changes with respect to cents. Will go to bed instead. -Carl
Message: 6582 Date: Sat, 1 Mar 2003 21:51:07 Subject: Re: [tuning] Re: Some magic meantones From: monz hi paul, thanks. i've been following the thread enough to surmise that those numbers had something to do with beat ratios, but i'm still very unclear as to what the numbers are actually representing, as Gene posted them without any kind of label. for example, >> 4/15-comma brat = -9/2 major [-9/2, 5/12, -8/15] >> minor [-3, -2/3, -1/2] >> >> ... We see 4/15-comma is good for minor triads >> and marginal for major ones OK, so i can see that the numbers for minor are both smaller and less complex than those for major. but what *exactly* does "minor [-3, -2/3, -1/2]" *signify*? can i please get a real explanation of that? and what's the "-9/2"? Gene and/or paul or anyone else: since my question about 2/7-comma meantone the other day, i've gotten very intrigued by it, and have been doing a lot of research into it. can we please use that as an example? thanks. -monz > From: <wallyesterpaulrus@xxxxx.xxx> > To: <tuning-math@xxxxxxxxxxx.xxx> > Sent: Saturday, March 01, 2003 1:01 PM > Subject: [tuning-math] [tuning] Re: Some magic meantones > > > monz, gene is talking about the *beat rate ratios* in the close- > voiced root-position triads, since bob brought that up. getting > different beatings into rhythmic synchrony with one another was *not* > one of woolhouse's criteria. > > --- In tuning-math@xxxxxxxxxxx.xxxx "monz" <monz@a...> wrote: > > hi Gene, > > > > > > i've shifted this thread over to here so as > > not to bother the regular tuning list members. > > > > as usual, i sense intuitively that the explanation > > you've provided for me below has some real insight > > buried in it somewhere ... but it's so cryptic > > that i have no idea what you're saying. > > > > can you please explain the numbers in brackets? > > > > how do "we see that ... 7/26[-comma meantone] > > is marginal for minor triads and really stinks > > for major triads"? based on my understanding of > > Woolhouse's work, i thought this was an "optimal" > > meantone. ...? > > > > (i apologize for being stupid, as the cause of > > it is simply my lack of reading and following your > > many posts here. thanks.) > > > > > > -monz > > > > > > ----- Original Message ----- > > From: <gwsmith@s...> > > To: <tuning@xxxxxxxxxxx.xxx> > > Sent: Friday, February 28, 2003 3:56 PM > > Subject: [tuning] Re: Some magic meantones > > > > > > > --- In tuning@xxxxxxxxxxx.xxxx "monz" <monz@a...> wrote: > > > > > > > > i don't know if 3/14-comma is "magic", but it and > > > > 7/26-comma are the only fraction-of-a-comma meantones > > > > in my list that you left out of yours ... was that > > > > simply an oversight, or are those two not "magic"? > > > > > > "Magic" is a relative term. We have > > > > > > 3/14-comma brat = 15/4 major [15/4, -10/9, -6/15] > > > minor [5/2, 3/10, 4/3] > > > > > > 7/26-comma brat = -15/4 major [-15/4, 10/21, -14/15] > > > minor [-5/2, 7/10, -4/7] > > > > > > 4/15-comma brat = -9/2 major [-9/2, 5/12, -8/15] > > > minor [-3, -2/3, -1/2] > > > > > > Note that if any one of the three, q-comma, major ratios, > > > minor ratios, is exact, the other two are approximate. > > > > > > We see 4/15-comma is good for minor triads and marginal > > > for major ones, 3/14-comma is pretty good for minor triads > > > and fairly awful for major triads, and 7/26 is marginal for > > > minor triads and really stinks for major triads.
Message: 6584 Date: Sun, 02 Mar 2003 08:56:26 Subject: Re: Brats, beats, and 2/7-comma meantone From: Carl Lumma >This got bounced as email by Yahoo, on the grounds that I don't have >an account. Does anyone know how to cure that? You have to send from the address that you're subscribed under. -Carl
Message: 6585 Date: Sun, 02 Mar 2003 09:01:23 Subject: Re: Brats, beats, and 2/7-comma meantone From: Carl Lumma >The ratios are, for a closed position major *or* minor triad: So what happens as one inverts and re-voices these chords? >The synchronized beating of minor triads in 2/7-comma meantone is >striking. All the beats happen at the same rate? Does that also mean they'll happen at the same *time* (wouldn't this depend on phase)? Bob says he's empirically verified that beat *ratios* of 2/1 or 3/2 are pleasant. Is the same true for 1/1? Is 1/1 what is traditionally called "equal beating"? -Carl
Message: 6586 Date: Mon, 03 Mar 2003 08:58:04 Subject: Re: Brats, beats, and 2/7-comma meantone From: Carl Lumma >I sent it from my primary email addess. How do I change the one I am >subscribed under? Go to Sign In - * and click 'e-mail prefs' and make sure the address is listed there. Then click 'edit my groups' and assign that address to the affected groups. -Carl
Message: 6590 Date: Wed, 5 Mar 2003 12:21:35 Subject: need definition of "brat" From: monz Gene or whomever, can i please get a good, complete definition (with examples) of "brat", for the Tuning Dictionary? thanks. i've decided to create a page about Wendell well-temperaments. this is the incipient version: 404 Not Found * Search for http://sonic-arts.org/dict/wendell.htm in Wayback Machine ... i'm having trouble following much of the thread, but i hope to be able to expand this into a nice comprehensive page about this interesting category of tunings. -monz
Message: 6591 Date: Wed, 5 Mar 2003 10:37:51 Subject: Re: An RI version of Wendell Well From: manuel.op.de.coul@xxxxxxxxxxx.xxx Gene wrote: >320*(-27*r+18*r^2+40)/r/(2187*r^4-5184*r^3-7728*r+5760+5216*r^2) ^ ^ two divisions? I was wondering about the result of r = q. So it wasn't as hairy as I thought! >It is a rational intonation version of Robert's temperament. Where 1/1 = A. Manuel
Message: 6594 Date: Wed, 5 Mar 2003 12:18:27 Subject: Re: An RI version of Wendell Well From: manuel.op.de.coul@xxxxxxxxxxx.xxx Gene wrote: >Blame Maple. Can it be written out as a polynomial? Then I could find the result for r = q myself. >How do I evaluate these? Brute force? I find it a little easier to use the beat rate quotient of 3/2 and 5/4 which is 0 and ~1/5 (say 1/m) for 6 tempered fifths. What would be the m nearest to an integer for 5 tempered fifths in any order, or 7? Is Robert's order the best order for 6 tempered fifths? (I suppose so). Manuel
Message: 6595 Date: Wed, 05 Mar 2003 20:57:20 Subject: Re: need definition of "brat" From: Carl Lumma >Why not a page about the more general concept of well temperaments >with synchronized beating? Unless that's what you meant... Yes; I for one have no idea why I the Maj3rd/Min3rd ratio should be so important, how to parse the Scala output Paul and Manuel have been posting, how Paul's approach compares to Bob's/Gene's, etc. -Carl
Message: 6598 Date: Wed, 5 Mar 2003 18:19:53 Subject: Re: An RI version of Wendell Well From: manuel.op.de.coul@xxxxxxxxxxx.xxx >Maple thinks these associate left to right; that is, >A/B/C = (A/B)/C = A/(B*C) Ok, when I solve for q=r I get r=1.99780788361. >> Is Robert's order the best order for 6 tempered fifths? >> (I suppose so). >It's hardly clear. You tell me how to decide. Yeah, that was a vague question, never mind. Manuel
Message: 6599 Date: Wed, 5 Mar 2003 18:38:33 Subject: Re: 114 temperaments in the big parade From: manuel.op.de.coul@xxxxxxxxxxx.xxx Gene wrote: >Here are the temperaments I spoke of. I give the scale degrees, the >circle of fifths, the major thirds and the brats, in that order. Note >that the brats are all exact! Impressive. Do rational scales also exist with exact beat ratios P5/M3 of 0 and 1/5? Manuel
6000 6050 6100 6150 6200 6250 6300 6350 6400 6450 6500 6550 6600 6650 6700 6750 6800 6850 6900 6950
6550 - 6575 -