How do you integrate $int 1/(x^2+6x+9)$ using substitution?

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How do you integrate $int 1/(x^2+6x+9)$ using substitution?

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Answer 1 · 2016-12-26T10:00:39

Substitute $u=x+3$ to get $intu^-2dx$ and thence $-1/(x+3)+C$

Explanation:

The denominator is a perfect square, namely $(x+3)^2$ which greatly simplifies the process. Notice that the denominator is a parabola with its vertex at $(-3,0)$ , so the $x$ -axis is a tangent at that point. Consequently the graph of $1/(x^2+6x+9)$ is just the graph of $1/x^2$ transformed by a shift to the left by $3$ .

If the denominator had not been a perfect square, the substitution would have led either to something like $1/((x-a)(x-b))$ or something like $1/((x-b)^2+a^2)$ , taking you into the realm of logarithms and arctangents.

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How do you integrate $int 1/(x^2+6x+9)$ using substitution?

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How do you integrate int 1/(x^2+6x+9)int 1/(x^2+6x+9) using substitution?

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How do you integrate $int 1/(x^2+6x+9)$ using substitution?