What are the absolute extrema of $f(x)=(x^4) / (e^x) in[0,oo]$ ?

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What are the absolute extrema of $f(x)=(x^4) / (e^x) in[0,oo]$ ?

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Answer 1 · 2016-02-05T00:51:49

The minimum is $0$ at $x=0$ , and the maximum is $4^4/e^4$ at $x=4$

Explanation:

Note first that, on $[0,oo)$ , $f$ is never negative.

Furthermore, $f(0)=0$ so that must be the minimum.

$f'(x) = (x^3(4-x))/e^x$ which is positive on $(0,4)$ and negative on $(4,oo)$ .

We conclude that $f(4)$ is a relative maximum. Since the function has no other critical points in the domain, this relative maximum is also the absolute maximum.

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What are the absolute extrema of $f(x)=(x^4) / (e^x) in[0,oo]$ ?

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