Find f'(x) if f(x) = (2/(x^1/3)) + 3 cos x + x^pi

asked May 28, 2020 53.3k views

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4 votes

The derivative of
is

$f'(x)=\left(2x^(-1/3)+3\cos x+x^\pi\right)'$

$f'(x)=\left(2x^(-1/3)\right)'+(3\cos x)'+\left(x^\pi\right)'$

By the power rule,

$f'(x)=-\frac23x^(-4/3)+(3\cos x)'+\pi x^(\pi-1)$

The derivative of
$\cos x$ is
$-\sin x$ :

$f'(x)=-\frac23x^(-4/3)-3\sin x+\pi x^(\pi-1)$

Hamedz answered May 31, 2020

5.4k points

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