How do you evaluate $int 1/(x-3)dx$ from 1 to 4?

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How do you evaluate $int 1/(x-3)dx$ from 1 to 4?

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Answer 1 · 2016-03-26T05:01:17

$-ln2$

Explanation:

If we let $u=x-3$ , then $du=dx$ .

This transforms the integral as follows:

$int_1^4 1/(x-3)dx=int_-2^1 1/udu$

The transformation of the bounds on the definite integral occurs since we switched variables (from $x$ to $u$ ). To find the values they switch to, plug in $1$ and $4$ into $u=x-3$ .

We see that $int1/udu=lnabsu+C$ , so we can evaluate the integral:

$=[lnabsu]_-2^1=lnabs1-lnabs(-2)=0-ln2=-ln2$

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How do you evaluate $int 1/(x-3)dx$ from 1 to 4?

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