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Question

Match List I with the List II and select the correct answer using the code given below the lists :

Consider a differentiable function f satisfying the relation f(xy+1)=f(x)f(y1) for all x,yR and f(0)=2, f(0)=1.

List I List II(A)If f(x)dx=2f(x)p+C where C is constant of integration,(P)1then the value of p is(B)The value of d10dx10(f(x2)) at x=0 is(Q)2(C)The number of solutions of the equation f(x)=x2 is(R)3(D)The value of limx0f(x)f(x2)sinx is(S)4

Which of the following is a CORRECT combination?

A
(A)(R), (B)(Q)
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B
(A)(S), (B)(P)
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C
(A)(P), (B)(S)
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D
(A)(Q), (B)(P)
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Solution

The correct option is B (A)(S), (B)(P)
f(xy+1)=f(x)f(y1)
Put x=0
f(1y)=1f(y1)
Let y1=u
Then, f(u)=1f(u)
or f(u)f(u)=1
Only possible f(x) is f(x)=ekx
Also, f(0)=1 and f(0)=2
f(x)=kekx
f(0)=k=2
Hence, f(x)=e2x

(A)
e2xdx=12e2x+C
p=4

(B)
d10dx10(f(x2))=d10dx10(ex)=ex
At x=0,
d10dx10(f(x2))=e0=1

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