Question

How do you integrate `8x(x²+1)³ dx`?

Answer 1

`(x^2+1)^4+C`.

Explanation:

Let `I=int8x(x^2+1)^3dx`

We use the Method of Substn.

We subst. `(x^2+1)=y," so that, "2xdx=dy`. Hence,

`I=4inty^3dy=4*y^4/4=y^4=(x^2+1)^4+C`.

Alternatively, without substn., we can find `I`.

Using `(a+b)^3=a^3+b^3+3ab(a+b)`, we expand `(x^2+1)^3`.

`:. I=int{8x(x^6+1+3*x^2*1(x^2+1)}dx`

`=8int(x^7+x+3x^5+3x^3)dx`

`=8{x^8/8+x^2/2+3*x^6/6+3*x^4/4}`

`=x^8+4x^2+4x^6+6x^4=x^8+4x^6+6x^4+4x^2+K`.

On the first hand, these two Answers may look different, but,

bearing in mind the binomial expansion of

`(p+1)^4=p^4+4p^3+6p^2+4p+1`, we find that,

`I=x^8+4x^6+6x^4+4x^2+K`,

`=x^8+4x^6+6x^4+4x^2+1+C'`, where, `C'=K-1`

`I=(x^2+1)^4+C', C'=K-1`

Enjoy Maths.!