If f:(-1,1) arrow R be a differentiable function with f(0)=-1 and f prime(0)=1. Let g(x)=[f(2 f(x)+2)]2. Then, g prime(0) is equal to

Question

If f:(-1,1) arrow R be a differentiable function with f(0)=-1 and f prime(0)=1. Let g(x)=[f(2 f(x)+2)]2. Then, g prime(0) is equal to (A) 4 (B) -4 (C) 0 (D) -2

Tardigrade Admin · Accepted Answer

Given, g(x)=[f(2 f(x)+2]2. ∴ g prime(x)=2 f(2 f(x)+2) ⋅ f prime(2 f(x)+2) ⋅ 2 f prime(x) =4 f(2 f(x)+2) f prime(2 f(x)+2) f prime(x) g prime(0)=4 f(2 f(0)+2) f prime(2 f(0)+2) f prime(0) =4 f(0) f prime(0) f prime(0) =-4 ∴ g prime(0)=4 f(0) f prime(0) f prime(0)=-4

Q. If $f : (- 1, 1) \to R$ be a differentiable function with $f (0) = - 1$ and $f^{'} (0) = 1$ . Let $g (x) = [f (2 f (x) + 2)]^{2}$ . Then, $g^{'} (0)$ is equal to

4

$- 4$

0

$- 2$

Q. If f:(−1,1)→R be a differentiable function with f(0)=−1 and f′(0)=1. Let g(x)=[f(2f(x)+2)]2. Then, g′(0) is equal to

4

−4

0

−2

Given, g(x)=[f(2f(x)+2]2 ∴g′(x)=2f(2f(x)+2)⋅f′(2f(x)+2)⋅2f′(x) =4f(2f(x)+2)f′(2f(x)+2)f′(x) g′(0)=4f(2f(0)+2)f′(2f(0)+2)f′(0) =4f(0)f′(0)f′(0) =−4 ∴g′(0)=4f(0)f′(0)f′(0)=−4

Q. If $f : (- 1, 1) \to R$ be a differentiable function with $f (0) = - 1$ and $f^{'} (0) = 1$ . Let $g (x) = [f (2 f (x) + 2)]^{2}$ . Then, $g^{'} (0)$ is equal to

$- 4$

$- 2$