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Question

Let f:RR and g:RR be two non-constant differentiable functions. If
f(x)=(e(f(x)g(x)))g(x) for all xR, and f(1)=g(2)=1, then which of the following statement(s) is (are) TRUE?

A
f(2)<1loge2
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B
f(2)>1loge2
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C
g(1)>1loge2
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D
g(1)<1loge2
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Solution

The correct option is C g(1)>1loge2
Given:
f(x)=(e(f(x)g(x)))g(x)
ef(x)f(x)=eg(x)g(x)
Integrating w.r.t. x, we get
ef(x)=eg(x)+C

Putting x=1, we get
1e=1eg(1)+Ce1eg(1)=C(i)
Putting x=2, we get
1ef(2)=1e+Cef(2)e1=C(ii)

Subtracting (ii) from (i), we get
eg(1)ef(2)+2e1=0eg(1)+ef(2)=2e1

As exponential function is always positive, so
ef(2)<2e1; eg(1)<2e1
Taking log, we get
f(2)<loge21; g(1)<loge21

Therefore,
f(2)>1loge2g(1)>1loge2

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