tinkerer Posted November 23, 2018 Share Posted November 23, 2018 Is there any way to pre-determine whether a series exists which will satisfy the requirement of fulfilling a given chosen function? For example, given Sin 3X - Cot 5X / Csc X , does an infinite series exist which satisfies it? How does one know? Perhaps my question is naively foolish; I studied LaPlace Transforms, Test Ratio Tests, etc., but never truly understood. Link to comment Share on other sites More sharing options...
wtf Posted November 23, 2018 Share Posted November 23, 2018 (edited) https://math.stackexchange.com/questions/588/what-functions-can-be-represented-as-power-series Quote A function can be represented as a power series if and only if it is complex differentiable in an open set. This follows from the general form of Taylor's theorem for complex functions. Quote Being real differentiable--even infinitely many times--is not enough, as the function \(e^{\frac{-1}{x^2}}\) on the real line (equal to 0 at 0) is \(C^\infty\) yet does not equal its power series expansion since all its derivatives at zero vanish. The reason is that the complexified version of the function is not even continuous at the origin. Edited November 23, 2018 by wtf 1 Link to comment Share on other sites More sharing options...
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