How do you find the indefinite integral of int x/(x^2+1)?

1 Answer
Steve M
Dec 4, 2016

int x/(x^2+1) dx = lnsqrt(x^2+1) + C

Explanation:

With a little experience you may be able to see that the numerator is almost the derivative of the denominator, and we can use that:

int x/(x^2+1) dx = 1/2int (2x)/(x^2+1) dx
:. int x/(x^2+1) dx = 1/2ln|x^2+1| + C
:. int x/(x^2+1) dx = 1/2ln(x^2+1) + C (As x^2+1>0)
:. int x/(x^2+1) dx = lnsqrt(x^2+1) + C

If you can't spot that feature then we can use a substitution:

Let u=x^2+1, Then (du)/dx = 2x
So, "separating the variables" we get :

int ... du = int ... 2xdx => int ... xdx = 1/2int ... du =

And so substituting into the original integral:

int x/(x^2+1) dx = 1/2int 1/u du
:. int x/(x^2+1) dx = 1/2ln|u| + C
:. int x/(x^2+1) dx = 1/2ln|x^2+1| + C , as before

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