If f(x) is invertible and twice differentiable function satisfying f′(x)=f(x)∫0f−1(t)dt,∀x∈R and f′(0)=1, then f′(1) can be
A
e
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B
e2
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C
1e
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D
√e
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Solution
The correct option is D√e f′(x)=f(x)∫0f−1(t)dt Differentiating both sides, we get f′′(x)=f−1(f(x)).f′(x) ⇒f′′(x)=xf′(x)⇒∫f′′(x)f′(x)dx=∫xdx ⇒ln|f′(x)|=x22+c f′(0)=1⇒c=0 ∴ln|f′(x)|=x22 ⇒|f′(x)|=ex2/2 ⇒|f′(1)|=e1/2=√e