How do you integrate $int (4x+3) / (x - 1)^2dx$ using partial fractions?

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How do you integrate $int (4x+3) / (x - 1)^2dx$ using partial fractions?

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Answer 1 · 2017-05-22T06:35:34

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Explanation:

$int (4(x-1)+4+3)/(x-1)^2 dx$

By substituting $x$ in $4x$ with the denominator, the fraction is split into partial fractions. Include a $+4$ so the original fraction isn't changed.

$int (4cancel(x-1))/(x-1)^cancel2 +7/(x-1)^2dx$

Split the integrals to make it easier.

$=int 4/(x-1) dx + int 7/(x-1)^2 dx$

$=4 int 1/(x-1)dx + 7int(x-1)^-2dx$

$4 int 1/(x-1)dx = 4ln|x-1| + c_1$ Integration of inverse functions.
$7 int(x-1)^-2dx = 7*-1*(x-1)^-1 + c_2$ Using reverse chain rule.

Therefore,

$=4 int 1/(x-1)dx + 7int(x-1)^-2dx$

$=4ln|x-1| - 7(x-1)^-1 +c_3$

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How do you integrate $int (4x+3) / (x - 1)^2dx$ using partial fractions?

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How do you integrate int (4x+3) / (x - 1)^2dxint (4x+3) / (x - 1)^2dx using partial fractions?

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How do you integrate $int (4x+3) / (x - 1)^2dx$ using partial fractions?