How do you integrate $int e^-xcosx$ by parts from $[0,2]$ ?

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How do you integrate $int e^-xcosx$ by parts from $[0,2]$ ?

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Answer 1 · 2018-03-25T18:21:59

$int_0^2e^-xcosxdx=1/2(e^-xsinx-e^-xcosx)|_0^2=1/2(e^-2sin2-e^-2cos2+1)$

Explanation:

Let's pick $u, dv$ and solve for $v, du:$

$u=e^-x$

$du=-e^-xdx$

$dv=cosxdx$

$v=sinx$

Thus, we apply $intudv=uv-intvdu$ :

$inte^-xcosxdx=e^-xsinx+inte^-xsinxdx$

This didn't yield anything solvable, let's integrate by parts once more, for $inte^-xsinxdx$ :

$u=e^-x$

$du=-e^-xdx$

$dv=sinxdx$

$v=-cosx$

Applying the integration by parts formula, we get

$inte^-xsinxdx=-e^-xcosx-inte^-xcosxdx$

There's nothing here we can solve, but note how our original integral showed up again.

Now, we said

$inte^-xcosxdx=e^-xsinx+inte^-xsinxdx$

So, let's plug in what we got for $inte^-xsinxdx$ in:

$inte^-xcosxdx=e^-xsinx-e^-xcosx-inte^-xcosxdx$

Solve for $inte^-xcosxdx:$

$2inte^-xcosxdx=e^-xsinx-e^-xcosx$

$inte^-xcosxdx=1/2(e^-xsinx-e^-xcosx)$

Note I have not put in a constant of integration because we're going to be taking a definite integral:

$int_0^2e^-xcosxdx=1/2(e^-xsinx-e^-xcosx)|_0^2=1/2(e^-2sin2-e^-2cos2+1)$

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How do you integrate $int e^-xcosx$ by parts from $[0,2]$ ?

1 Answer

Explanation:

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How do you integrate int e^-xcosxint e^-xcosx by parts from [0,2][0,2]?

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How do you integrate $int e^-xcosx$ by parts from $[0,2]$ ?