How do you integrate ∫(x^3ex^2)/(x^2 +1)^2dx?

∫(x^3e^(x^2))/(x^2 +1)^2dx ?

2 Answers
maganbhai P.
Jul 12, 2018

int(x^3e^(x^2))/(x^2+1)^2dx=e^(x^2)/(2(x^2+1))+c

Explanation:

Here,

I=int(x^3e^(x^2))/(x^2+1)^2dx

=int(x^2e^(x^2))/(x^2+1)^2*xdx

Subst . color(violet)(x^2=u=>2xdx=du=>xdx=1/2du

So,

I=int(ue^u)/(u+1)^2*1/2du

=1/2int((u+1-1)e^u)/(u+1)^2du

=1/2int{((u+1))/(u+1)^2-1/(u+1)^2}e^udu

=1/2{color(blue)(int1/(u+1)e^udu)-color(red) (int1/(u+1)^2e^udu)}

Using Integration by parts: in the first integral

I=1/2{color(blue)([1/(u+1)inte^u-int(-1)/(u+1)^2e^udu])- color(red)(int1/(u+1)^2e^udu)}

I=1/2{color(brown)(1/(u+1)e^u+color(blue) (int(1)/(u+1)^2e^udu)-color(red)(int1/(u+1)^2e^udu)}

I=1/2 *color(brown)(1/(u+1)e^u)+c

Subst. back color(violet)( u=x^2 we get

I=1/2(1/(x^2+1))e^(x^2)+c

Hence ,

I=e^(x^2)/(2(x^2+1))+c
.....................................................................................

Note: Change in the question is as below.

x^3ex^2tox^3e^(x^2)

Narad T.
Jul 12, 2018

The answer is =(e^(x^2))/(2(x^2+1))+C

Explanation:

Perform the substitution

u=x^2, =>, du=2xdx

The integral is

I=int(x^3e^(x^2)dx)/(x^2+1)^2

=1/2int(ue^udu)/(u+1)^2

Perform an integration by parts

intwv'dx=wv-intw'vdx

w=ue^u, =>, w'=ue^u +e^u=e^u(u+1)

v'=1/(u+1)^2, =>, v=-1/(u+1)

Therefore,

I=-1/2(ue^u)/(u+1)+1/2inte^udu

=e^u/2-(ue^u)/(2(u+1))

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

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

=(e^(x^2))/(2(x^2+1))+C

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