Question

Can this be solved? `int ((sqrtx+1)/(2sqrtx))^4dx`

P.S. cause my teacher give us practice paper that include this question but the answer of it is solving for the integral `int (sqrtx+1)^4/(2sqrtx)dx` instead. I would like to learn more and see if the integral I ask can be solved or not. If it can be solved, I would like to know the steps. Thank you :)

Answer 1

`1/16(-1/x-8/sqrtx+6ln|x|+8sqrtx+x)+C.`

Explanation:

`I=int{(sqrtx+1)/(2sqrtx)}^4dx,`

`=1/2^4int{(sqrtx+1)/sqrtx}^4dx,`

`=1/16int(sqrtx/sqrtx+1/sqrtx)^4dx,`

`=1/16int(1+x^(-1/2))^4dx,`

`=1/16int{(x^(-1/2))^4+4(x^(-1/2))^3+6(x^(-1/2))^2+4(x^(-1/2))^1+1}dx,`

`=1/16int{x^(-2)+4x^(-3/2)+6x^(-1)+4x^(-1/2)+1}dx,`

Now, `intt^ndt=t^(n+1)/(n+1), n ne-1, &, intt^(-1)dt=ln|t|.`

`:. I=1/16(x^(-1)/-1+4*x^(-1/2)/(-1/2)+6ln|x|+4*x^(1/2)/(1/2)+x),`

`rArr I=1/16(-1/x-8/sqrtx+6ln|x|+8sqrtx+x)+C.`