Mail Archives: djgpp/1997/08/03/11:31:47
From: | (M. Adnan Ali)
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Newsgroups: | comp.os.msdos.djgpp
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Subject: | Re: A useful class I made for producing formulas
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Date: | 31 Jul 1997 08:13:31 GMT
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Organization: | University of Western Ontario, London, Ont. Canada
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Lines: | 43
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Message-ID: | <5rphfb$orc@falcon.ccs.uwo.ca>
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References: | <01bc9ae9$7bc81960$32f282c1 AT damien>
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NNTP-Posting-Host: | pineapple.apmaths.uwo.ca
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To: | djgpp AT delorie DOT com
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DJ-Gateway: | from newsgroup comp.os.msdos.djgpp
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In article <01bc9ae9$7bc81960$32f282c1 AT damien>,
Richard Birch <richardbirch AT dial DOT pipex DOT com> wrote:
>Anyone interested in a class that gives you a formula when you give it a
>set of results. e.g. give it x=1 when y=1, x=2 when y=4, x=3 when y=9, the
>class will give you the formula y=x^2.
there is an enormous body of mathematical software to do exactly what you
propose, just do a web-search for curve fitting.
to be useful, you should make obvious which algorithm you use to produce
your fitted function.
I was pretty proud of myself when i discovered a parametric equation
describing such curves 6 years ago, back in highschool. it took almost a
year before i discovered lagrange came up with the same a few hundred years
ago. more importantly, mine are completely useless for orders above 8,
mostly useless above 4, since the curves would "go crazy", that is, have
extreme derivatives unless the data was _very_ nice.
>That was a VERY simple example - it
>will work given *any* real numbers, and produces formulas up to the order
>of 50. It uses Shawn Hargreaves' ALLEGRO for graphics manipulation so it
>needs that to compile. It produces the formula using simultaneous
>equations.
>Other functions are:
>
>- drawing the graph of the formula on the screen or to a bitmap
>- setting the scale, axis etc to your needs
>- giving a y result given an x by running x through the formula
>
>If *anyone* is interested, e-mail me and I'll reply attaching the source
>code (one 16KB header). I'm quite proud of this as this is the only code of
>this nature I know of, and would be pleased to receive ideas for
>improvement.
>
b-splines are among the most useful algorithms for such applications.
ability to use higher dimensions are always welcome.
good luck & have fun,
adnan.
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