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Subject: Re: Inverse of Polynomial Function Author: tnewton [ Next Thread | Previous Thread | Next Message | Previous Message ] Date Posted: 19:39:51 05/04/04 Tue In reply to: QUITTNER 's message, "Re: Inverse of Polynomial Function" on 10:22:18 04/23/04 Fri Yes, that's the definition of inverse, but it requires you to know the order of the function first in order to solve. I believe there may be some algorithm to find the reverse coefficients regardless of degree, and may require very deep recursion (related to the polynomial order); at least that's the direction I seem to keep finding myself heading. I've seen a process that finds the solution to the inverse function; it's a little tough to follow and I haven't been able to use it as a basis for determining the coefficients. Maybe if I figure this out I'll get my name in the history books... >>>>What I would really like to do is find the >coefficients of INV(f(x)) from the coefficients of >f(x) of an nth degree polynomial (1-variable).<<< > >>>> f(x)= SUM(ai * x^i) for i = 0..n) >>INV(f(x)) = ??? <<< >..... As I remember it, if y is a function of the sum >of various degrees of x, then the inverse is (simply - >oh yeah?) x as a function of y. That may be quite >difficult to find is many cases involving higher than >the 3rd degree of x. [ Next Thread | Previous Thread | Next Message | Previous Message ]

Replies:

[> [> [> Subject: Re: Inverse of Polynomial Function Author: QUITTNER [ Edit | View ] Date Posted: 10:42:17 05/06/04 Thu tnewton, unfortunately I can't help you with that. But maybe you'll come up with some useful solution(s). Good luck, and keep well! [ Post a Reply to This Message ]