Talk:Annihilator method

Latest comment: 8 years ago by 136.2.1.170 in topic Annihilator origin

Difference between Annihilator method and undetermined coefficients

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Two methods are not identical. Annihilator method systematically determines which function rather than "guess" in undetermined coefficients, and it helps on several occasions. For example, y+2y'-3=ex, by using undetermined coefficients, often people will come up with yp=ex as first guess but by annihilator method, we can see that the equation reduces to (D+3)(D-1)2 which obviously shows that yp=xex. This method should be promoted more than the "undetermined coefficients" because I looked up "undetermined coefficients" on the book before and it took me a long time to solve ODEs but the annihilator method systematically determines the solution and make the whole solving process much quicker. Revenge king (talk) 02:32, 3 December 2008 (UTC)Reply

New Information

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From the examples given in the page about the method of undetermined coefficients, it seems that these two methods are not identical. I have split off the appropriate example from that article and moved it here, since it seemed unrelated to the other two examples given. However, I still don't know exactly how these two methods are related to each other, so if anyone else knows anything about that, please contribute. Also, this article needs to be cleaned up a lot. Rundquist 00:42, 24 June 2007 (UTC)Reply

Annihilator origin

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It is not clear in the example whence the annhilator comes. It simply states that "the simplest anhilator ... is A(D) = D2 + k2". It would be more helpful to explain how this was determined. — Preceding unsigned comment added by 136.2.1.170 (talk) 19:59, 5 October 2016 (UTC)Reply