What is the integral of $\frac{x^{3}}{x^{2} + 1}$ $x^3/(x^2+1)$ ?

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What is the integral of $\frac{x^{3}}{x^{2} + 1}$ $x^3/(x^2+1)$ ?

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Answer 1 · 2016-06-24T17:11:40

$\frac{x^{2} - ln (x^{2} + 1)}{2} + C$ $(x^2-ln(x^2+1))/2+C$

Explanation:

We have the integral:

$\int \frac{x^{3}}{x^{2} + 1} d x$ $intx^3/(x^2+1)dx$

We will use substitution: let $u = x^{2} + 1$ $u=x^2+1$ , implying that $d u = 2 x d x$ $du=2xdx$ .

Rearrange the integral, including making $2 x d x$ $2xdx$ present:

$\int \frac{x^{3}}{x^{2} + 1} d x = \int \frac{x^{2} \cdot x}{x^{2} + 1} d x = \frac{1}{2} \int \frac{x^{2} \cdot 2 x}{x^{2} + 1} d x$ $intx^3/(x^2+1)dx=int(x^2*x)/(x^2+1)dx=1/2int(x^2*2x)/(x^2+1)dx$

Make the following substitutions into the integral:

${(x^2+1=u),(x^2=u-1),(2xdx=du):}$

We obtain:

$1/2int(x^2*2x)/(x^2+1)dx=1/2int(u-1)/udu$

Splitting the integral up through subtraction:

$1/2int(u-1)/udu=1/2int1du-1/2int1/udu$

These are common integrals:

$=1/2u-1/2ln(absu)+C$

Since $u=x^2+1$ :

$=1/2(x^2+1)-1/2ln(abs(x^2+1))+C$

The absolute value bars are not needed since $x^2+1>0$ for all Real values of $x$ . Also note that $1/2(x^2+1)=1/2x^2+1/2$ , so the $1/2$ gets absorbed into the constant of integration $C$ :

$=1/2x^2-1/2ln(x^2+1)+C$

$=(x^2-ln(x^2+1))/2+C$

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What is the integral of $\frac{x^{3}}{x^{2} + 1}$ $x^3/(x^2+1)$ ?

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