Integration problem

Hi Paul, I understand you need to integrate the equation but you did not present to us the variable of integration. Assuming your variable is x then other symbol like p, A_o, L, and E are constants. Am I right? If so, is this your equation?
$\displaystyle \epsilon = \int \dfrac{pE^{-1}}{A_o \left( \dfrac{1 - x}{2L} \right)} \, dx$
 

Assuming my interpretations are correct, here is how to integrate it:
$\displaystyle \epsilon = \int \dfrac{pE^{-1}}{A_o \left( \dfrac{1 - x}{2L} \right)} \, dx$

$\displaystyle \epsilon = \dfrac{2pL}{EA_o}\int \dfrac{dx}{1 - x}$

$\displaystyle \epsilon = -\dfrac{2pL}{EA_o}\ln (1 - x) + C$

The other way that I looked at your equation is this:
$\displaystyle \epsilon = \int \dfrac{pE^{-1}}{A_o \left(1 - \dfrac{x}{2L} \right)} \, dx$

$\displaystyle \epsilon = \dfrac{p}{EA_o}\int \dfrac{dx}{\dfrac{2L - x}{2L}}$

$\displaystyle \epsilon = \dfrac{2pL}{EA_o}\int \dfrac{dx}{2L - x}$

$\displaystyle \epsilon = -\dfrac{2pL}{EA_o}\ln (2L - x) + C$