How do you integrate $\int \frac{x^{3}}{{(x^{2} + 2)}^{3}}$ $int x^3/(x^2+2)^3$ by integration by parts method?

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How do you integrate $\int \frac{x^{3}}{{(x^{2} + 2)}^{3}}$ $int x^3/(x^2+2)^3$ by integration by parts method?

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Answer 1 · 2017-01-23T02:47:12

Integration by parts is: $\int u d v = u v - \int v d u$ $intudv=uv-intvdu$
choose $u$ $u$ so that $d v$ $dv$ can be integrated by variable substitution.

Explanation:

let $u = x^{2} and d v = \frac{x}{{(x^{2} + 2)}^{3}} d x$ $u=x^2 and dv=(x)/(x^2+2)^3dx$ , because this will allow:

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

to be integrated by letting $t = x^{2} + 2$ $t = x^2+2$ , then $d t = 2 x d x$ $dt = 2xdx$ or $\frac{d t}{2} = x d x$ $dt/2 = xdx$

This makes the integral become:

$v = \frac{1}{2} \int t^{- 3} d t$ $v = 1/2intt^-3dt$

$v = - \frac{1}{4} t^{- 2}$ $v = -1/4t^-2$

Reversing the substitution:

$v = - \frac{1}{4 {(x^{2} + 2)}^{2}}$ $v=-1/(4(x^2+2)^2$

and $d u = 2 x d x$ $du=2xdx$

$\int \frac{x^{3}}{{(x^{2} + 2)}^{3}} d x = (x^{2}) (- \frac{1}{4 {(x^{2} + 2)}^{2}}) - \int - \frac{1}{{(x^{2} + 2)}^{2}} (2 x) d x$ $intx^3/(x^2+2)^3dx = (x^2)(-1/(4(x^2+2)^2)) - int-1/(x^2+2)^2(2x)dx$

$\int \frac{x^{3}}{{(x^{2} + 2)}^{3}} d x = - \frac{x^{2}}{4 {(x^{2} + 2)}^{2}} + \frac{1}{4} \int \frac{2 x}{{(x^{2} + 2)}^{2}} d x$ $intx^3/(x^2+2)^3dx = -x^2/(4(x^2+2)^2) + 1/4int(2x)/(x^2+2)^2dx$

The last integral is the same sort of variable substitution:

$\int \frac{x^{3}}{{(x^{2} + 2)}^{3}} d x = - \frac{x^{2}}{4 {(x^{2} + 2)}^{2}} - \frac{1}{4 (x^{2} + 2)} + C$ $intx^3/(x^2+2)^3dx = -x^2/(4(x^2+2)^2) - 1/(4(x^2+2)) + C$

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How do you integrate $\int \frac{x^{3}}{{(x^{2} + 2)}^{3}}$ $int x^3/(x^2+2)^3$ by integration by parts method?

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Explanation:

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How do you integrate ∫x3(x2+2)3int x^3/(x^2+2)^3 by integration by parts method?

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How do you integrate $\int \frac{x^{3}}{{(x^{2} + 2)}^{3}}$ $int x^3/(x^2+2)^3$ by integration by parts method?