Solving Integral: Different Answer with U-Substitution

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SUMMARY

The integral \(\int \frac{6}{x-6} dx\) can be solved using u-substitution, but the correct application yields different results due to a miscalculation. When substituting \(u = x - 6\), the differential \(du = dx\) leads to the integral \(\int \frac{6}{u} du\), which evaluates to \(6 \ln |u| + C\) or \(6 \ln |x - 6| + C\). The incorrect interpretation of the integral as \(\int \frac{1}{6u} du\) results in an erroneous answer of \(\frac{1}{6} \ln |x - 6| + C\).

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this integral can be solved without u-subsitution however, I get a different answer when I use u-sub.

[tex]\int \frac{6}{x-6} dx[/tex]

[tex]u=x-6[/tex]

[tex]du=dx[/tex]

[tex]\int \frac{1}{6u}=\frac{1}{6}ln(x-6)[/tex]

if U-sub wasnt used, then the answer would be 6ln(x-6)

what am I doing wrong in the subsitution?
 
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With the substitution, the integral is:

[tex]\int \frac{6}{u} du[/tex]

not

[tex]\int \frac{1}{6u} du[/tex]
 

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