How do you find the antiderivative of $int cos(pit)cos(sin(pit))dt$ ?

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How do you find the antiderivative of $int cos(pit)cos(sin(pit))dt$ ?

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Answer 1 · 2017-01-14T04:04:33

$1/pisin(sin(pit))+C$

Explanation:

Let's try to simplify the trig function within the trig function by letting $u$ be the inside function, that is, $u=sin(pit)$ . Differentiating this shows that $du=picos(pit)dt$ . (Recall to use the chain rule.)

We currently have $cos(pit)dt$ in the integral, so we need the factor of $pi$ .

$intcos(pit)cos(sin(pit))dt=1/piintcos(sin(pit))*picos(pit)dt$

Substituting in:

$=1/piintcos(u)du$

This is a common integral:

$=1/pisin(u)+C$

Substituting back in $u=sin(pit)$ :

$=1/pisin(sin(pit))+C$

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How do you find the antiderivative of $int cos(pit)cos(sin(pit))dt$ ?

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How do you find the antiderivative of int cos(pit)cos(sin(pit))dtint cos(pit)cos(sin(pit))dt?

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How do you find the antiderivative of $int cos(pit)cos(sin(pit))dt$ ?