. A function defined by a power series with a radius of
Chapter 10, Problem 51E(choose chapter or problem)
Problem 51E
. A function defined by a power series with a radius of convergence R > 0 has a Taylor series that converges to the function at every point of ( -R, R). Show this by showing that the Taylor series generated by is the series itself.
An immediate consequence of this is that series like
and
obtained by multiplying Taylor series by powers of x, as well as series obtained by integration and differentiation of convergent power series, are themselves the Taylor series generated by the functions they represent.
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