How do you differentiate $f(x)=xe^(2x)-x$ using the product rule?

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How do you differentiate $f(x)=xe^(2x)-x$ using the product rule?

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Answer 1 · 2016-02-24T14:38:35

$f'(x) = e^(2x)(2x + 1 ) - 1$

Explanation:

using the $color(blue) " Product rule "$

If f(x) = g(x).h(x) then f'(x) = g(x).h'(x) + h(x).g'(x)

and $d/dx(e^x) = e^x$

the $color(blue)" chain rule " "is also used here "$

$d/dx[f(g(x))] = f'(g(x)). g'(x)$

hence : $f'(x) =[ x d/dx(e^(2x)) + e^(2x) d/dx(x)] - 1$

$=[ xe^(2x) d/dx(2x) + e^(2x).1 ] -1$

$=[ 2xe^(2x) + e^(2x) ] - 1 = e^(2x)(2x + 1) - 1$

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How do you differentiate $f(x)=xe^(2x)-x$ using the product rule?

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