How do you differentiate $f (x) = {(1 + cos 3 x)}^{2}$ $f(x)=(1+cos3x)^2$ ?

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How do you differentiate $f (x) = {(1 + cos 3 x)}^{2}$ $f(x)=(1+cos3x)^2$ ?

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Answer 1 · 2016-11-17T10:18:30

$f'(x)=-6sin3x(1+cos3x)$

Explanation:

The function $f(x)$ is composed of two functions $x^2$ and $1+ cos3x$
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Differentiation this function is determined by applying chain rule.
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Let $u(x)=x^2" " and " "v(x)=1+cos3x$
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$f(x)=u@v(x)$
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$color(blue)(f'(x) = u'(v(x))xxv'(x))$
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Let us compute $u'(v(x))$
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$u'(x)=2x$
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then
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$color(blue)(u'(v(x))=2(v(x))=2(1+cos3x))$
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Let us compute $v'(x)$
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$v'(x)=(1)' + (cos3x)'$
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$v'(x)=0+(-3sin3x)$
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$color(blue)(v'(x)=-3sin3x)$
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Therefore,
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$color(blue)(f'(x) = u'(v(x))xxv'(x))$
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$f'(x)=2(1+cos3x) xx (-3sin3x)$
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Hence, $" "f'(x)=-6sin3x(1+cos3x)$

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How do you differentiate $f (x) = {(1 + cos 3 x)}^{2}$ $f(x)=(1+cos3x)^2$ ?

1 Answer

Explanation:

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How do you differentiate f(x)=(1+cos3x)^2f(x)=(1+cos3x)2f(x)=(1+cos3x)^2?

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How do you differentiate $f (x) = {(1 + cos 3 x)}^{2}$ $f(x)=(1+cos3x)^2$ ?