Question

Question #31e26

Answer 1

`intarctan(sqrt(x))dx=(x+1)arctan(sqrt(x))-sqrt(x)+C`

Explanation:

It is difficult to work with the `sqrt(x)` as the argument of `arctan`, so we begin by making a substitution.

Let `t = sqrt(x) => dt = 1/(2sqrt(x))dx`. Then

`intarctan(sqrt(x))dx = int(2sqrt(x)arctan(sqrt(x)))/(2sqrt(x))dx`

`=int2tarctan(t)dt`

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Next, we will apply integration by parts. To apply the formula `intudv = uv-intvdu`, we let

`u = arctan(t)` and `dv = 2tdt`
`=> du = 1/(1+t^2)dt` and `v = t^2`

Applying the formula, this gives

`int2tarctan(t)dt = t^2arctan(t)-intt^2/(1+t^2)dt`

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Focusing on the remaining integral, we have

`intt^2/(1+t^2)dt = int(1-1/(1+t^2))dt`

`=intdt - int1/(1+t^2)dt`

`=t - arctan(t) + C`

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Putting this all together, we get our final result:

`intarctan(sqrt(x))dx = int2tarctan(t)dt`

`= t^2arctan(t)-intt^2/(1+t^2)dt`

`=t^2arctan(t) - t+arctan(t) + C`

`=(t^2+1)arctan(t) - t + C`

`=(x+1)arctan(sqrt(x))-sqrt(x)+C`