What is the integral of #int (x)/(x+1)^3 dx#?

1 Answer
Jim H
Feb 4, 2016

#(-1)/(x+1) + 1/(2(x+1)^2)+C = (-2x-1)/(2(x+1)^2)+C#

Explanation:

#int (x)/(x+1)^3 dx = int (x+1-1)/(x+1)^3 dx#

# = int ((x+1)/(x+1)^3 - 1/(x+1)^3)dx#

# = int ((x+1)^-2 - (x+1)^-3)dx#

Let #u= x+1# if you want to include those steps.

# = (-1)/(x+1) + 1/(2(x+1)^2)+C#

Do the algebra to get a single ration if you wish.

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