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Bwobbones · Answer 1 · 2018-06-25T18:23:02+0000

By the ratio test, the series will converge if the following limit is less than 1.

$\displaystyle\lim_(n\to\infty)\left|((x^(n+1))/((n+1)!))/((x^n)/(n!))\right|$

You have

$\displaystyle\lim_(n\to\infty)\left|((x^(n+1))/((n+1)!))/((x^n)/(n!))\right|=|x|\lim_(n\to\infty)\frac1{n+1}=0<1$

so indeed the series converges.

Furthermore, recalling that

$e^x=\displaystyle\sum_(n=0)^\infty(x^n)/(n!)$

it follows that the given series is equivalent to

$\displaystyle\sum_(n=1)^\infty(2^n)/(n!)=\sum_(n=0)^\infty(2^n)/(n!)-(2^0)/(0!)=e^2-1$

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