How do you use substitution to integrate x/sqrt(x+4) dx?

2 Answers
Aritra G. ยท Jim H
Jul 29, 2015

The process is outlined below.

Explanation:

We are to evaluate, int x/(x + 4)^(1/2)*dx.

We shall accomplish this by substitution.

Let, (x + 4) = t
implies dx = dt (By simple differentiation).

Thus, the integral becomes,

int x/(x +4)^(1/2)*dx = int (t - 4)/t^(1/2)*dt

= int t^(1/2)*dt - int 4t^(-1/2)*dt

=2/3 t^(3/2) - 8t^(1/2) + C, where C is the integration constant.

In terms of x, the integral may be now written as,

int x/(x + 4)^(1/2)*dx =2/3 (x + 4)^(3/2) - 8(x + 4)^(1/2) + C.

Luke Phillips
Aug 15, 2017

int x/(sqrt(x+4)) "d"x = 2/3 (x+4)sqrt(x+4) - 8 sqrt(x+4) + C

Explanation:

int x/(sqrt(x+4)) "d"x = int (x+4-4)/(sqrt(x+4)) "d"x,
int x/(sqrt(x+4)) "d"x = int (x+4)/((x+4)^(1/2))-4/((x+4)^(1/2)) "d"x,
int x/(sqrt(x+4)) "d"x = int (x+4)^(1/2)-4(x+4)^(-1/2) "d"x,
int x/(sqrt(x+4)) "d"x = 2/3(x+4)^(3/2)-8(x+4)^(1/2) + C

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