What is the taylor series of $xe^x$ ?

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What is the taylor series of $xe^x$ ?

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Answer 1 · 2017-04-26T19:14:11

$xe^x = x + x^2 + x^3/(2!)+x^4/(3!) + x^5/(4!) + ...$
$\ \ \ \ \ = sum_(n=0)^oo x^(n+1)/(n!)$

Explanation:

We can start with the well known Maclaurin series for $e^x$

$e^x = 1 + x + x^2/(2!)+x^3/(3!) + x^4/(4!) + ...$
$\ \ \ = sum_(n=0)^oo x^n/(n!)$

So then multiplying by $x$ we have:

$xe^x = x{1 + x + x^2/(2!)+x^3/(3!) + x^4/(4!) + ... }$
$\ \ \ \ \ = x + x^2 + x^3/(2!)+x^4/(3!) + x^5/(4!) + ...$
$\ \ \ \ \ = sum_(n=0)^oo x*x^n/(n!)$
$\ \ \ \ \ = sum_(n=0)^oo x^(n+1)/(n!)$

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What is the taylor series of $xe^x$ ?

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