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The Taylor polynomial of degree 100 for the function f about x=3 is given by \[p(x)= (x-3)^2 - ((x-3)^4)/2! +... + [(-1)^n+1] [(x-3)^n2]/n! +... - ((x-3)^100)/50!]/ What is the …

The Taylor polynomial of degree 100 for the function f about x=3 is given by \[p(x)= (x-3)^2 - ((x-3)^4)/2! +... + [(-1)^n+1] [(x-3)^n2]/n! +... - ((x-3)^100)/50!]/ What is the …
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The Taylor polynomial of degree 100 for the function f about x=3 is given by

\[p(x)= (x-3)^2 - ((x-3)^4)/2! +... + [(-1)^n+1] [(x-3)^n2]/n! +... - ((x-3)^100)/50!]/
What is the value of f^30 (3)?

User Isklenar
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1 Answer

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By the definition of the Taylor Series, the coefficient of (x - 3)^30 is f^(30)(3) / 30!.

On the other hand, looking at the given series, it is (-1)^(15+1) / 15! (letting n = 15).

Hence, f^(30)(3) / 30! = (-1)^(15+1) / 15!
==> f^(30)(3) = 30!/15!.
User Verbanicm
by
8.4k points
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