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Question

If sin-1x1+xdx=Axtan-1x+Bx+C, where C is a constant of integration, then the ordered pair (A(x),B(x)) can be:


A

x+1,-x

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B

x-1,-x

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C

x+1,x

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D

x-1,x

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Solution

The correct option is A

x+1,-x


Explanation for the correct option:

Step 1: Simplify sin-1x1+xdx.

Let x=tan2θ, so dx=2tanθ·sec2θdθ. By substituting the value of x, we get

sin-1x1+xdx=sin-1tan2θ1+tan2θ2tanθ·sec2θdθ=sin-1tan2θsec2θ2tanθ·sec2θdθ=sin-1tanθsecθ2tanθ·sec2θdθ=sin-1(sinθ)2tanθ·sec2θdθ=2sin-1(sinθ)sinθcosθ·1cos2θdθ=2θsinθcos3θdθ

Step 2: Apply integration by parts

We know that uvdx=uvdx-u'vdxdx

So,

2θsinθcos3θdθ=2θsinθcos3θdθ-1sinθcos3θdθ ….. 1

Let cosθ=u, so du=-sinθdθ. Now,

sinθcos3θdθ=-duu3=--12u2=12cos2θ

Now, 1 can be written as

2θ12cos2θ-12cos2θdθ=θ1cos2θ-1cos2θdθ=θsec2θ-sec2θdθ=θsec2θ-tanθ+C=tan-1x1+x-x+CAsx=tan2θandsec2θ=1+tan2θ.....2

Step 3: Find (A(x),B(x)).

By comparing 2, with the equation given in question, we get

Therefore, Ax=1+xandBx=-x.

So, (A(x),B(x))=x+1,-x

Hence, option A is correct.


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