How do you find $int cot^2x*secxdx$ ?

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How do you find $int cot^2x*secxdx$ ?

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Answer 1 · 2015-12-01T04:24:27

Notice that $cot^2(x)sec(x) = cot(x)csc(x)$ and perform a simple substitution to find that
$intcot^2(x)sec(x)dx = -csc(x) + C$

Explanation:

When an easy substitution does not immediately jump out when looking at an integral, often one can manipulate the integrand into a more convenient form.

In this case:

$intcot^2(x)sec(x)dx = int(cos^2(x))/(sin^2(x))1/cos(x)dx$
$= intcos(x)/sin(x)1/sin(x)dx$
$= intcot(x)csc(x)dx$

We could go directly to the answer from here, as we know that $csc(x)$ is the antiderivative of $-csc(x)cot(x)$ but let's do the substitution just to see how it works out.

Let $u = csc(x) => du = -csc(x)cot(x)dx$

$=> intcot(x)csc(x)dx = int-du$
$= -intdu$
$= -u+C$
$= -csc(x) + C$

Thus $intcot^2(x)sec(x)dx = -csc(x)+C$

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How do you find $int cot^2x*secxdx$ ?

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