How do you integrate $(x)/(x+10) dx$ ?

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Answer 1 · 2016-05-21T23:59:50

You could use two ways - pure algebra or partial fractions - either of which give you $x-10lnabs(x+10)+C$ as the final answer.

Algebraic Approach

First, realize that we can rewrite the integral as:
$int(x+10-10)/(x+10)dx$

Now we can split it up into two fractions, like so:
$int(x+10)/(x+10)-10/(x+10)dx$
$=int1-10/(x+10)dx$

Using the sum rule for integrals, this further simplifies to:
$int1dx-int10/(x+10)dx$
$=int1dx-10int1/(x+10)dx$

Evaluating these is pretty straightforward now:
$x+C_1-10lnabs(x+10)+C_2$

Since $C_1+C_2$ is just another constant, we can lump them together in one general constant $C$ :
$intx/(x+10)dx = x-10lnabs(x+10)+C$

Partial Fractions Approach

Alternatively, if we want some practice with partial fractions or the teacher is forcing us to use this method, we can do it a little differently.

Since our original fraction $x/(x+10)$ has only linear factors, we know the partial fraction decomposition will be something like:
$A+B/(x+10)$

Setting it up, we have:
$x/(x+10)=A+B/(x+10)$

Multiplying through by $x+10$ gives us:
$x=A(x+10)+B$

If we let $x=-10$ , we can find the value of $B$ :
$x=A(x+10)+B$
$-10=A(-10+10)+B$
$-10=B$

Now we have:
$x=A(x+10)-10$

We can let $x$ equal anything now to find $A$ . For simplicity, let's have $x=0$ :
$0=A(0+10)-10$
$10=10A$
$A=1$

Therefore $x/(x+10)=1-10/(x+10)$ . Putting this back into the integral:
$int1-10/(x+10)dx$
$=x-10lnabs(x+10)+C->$ as we discovered previously

I would not suggest the partial fractions method unless you were required to use it.

How do you integrate (x)/(x+10) dx(x)/(x+10) dx?