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Nikita Skrebets · Answer 1 · 2023-09-13T01:01:06+0000

Our integral can be writen as

$(-5)/(2)\int ^0_(-\infty)(2dx)/(2x-5)$

By defining the variabl u as

$\begin{gathered} u=2x-5 \\ we\text{ have that} \\ du=2dx \end{gathered}$

then our integral can be rewriten as

$(-5)/(2)\int ^0_(-\infty)(du)/(u)=(-5)/(2)\ln (u)|^0_(-\infty)$

By evaluating the last result, we have

$(-5)/(2)\int ^0_(-\infty)(du)/(u)=(-5)/(2)(\ln (0)-\ln (-\infty))$

However, logarithm of zero and logarithm of minus infinity are undefined. So, the intergral is divergent