If fx is continuous and differentiable function and f 1n-0 for all n- 1 and n - I then

The correct option is B f(x)=0,f'(0)=0 Given f( 1 ) =f( 1 2 #160;) =f( 1 3 #160;) =...=lim _ n→∞ #160; f( 1 n #160;) #160; =0 As ...

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Proof of Rolle's Theorem

If fx is co...

Question

If $f (x)$ is continuous and differentiable function and $f (\frac{1}{n}) = 0$ for all $n \geq 1$ and $n ϵ I$ then

f (x) = 0, x ϵ (0, 1]

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f (x) = 0, f^{'} (0) = 0

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f (x) = 0 = f^{''} (0), x ϵ (0, 1]

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f (0) = 0

and

f^{'} (0)

need not zero

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\to

f (\frac{1}{n}) = 0 \forall n \leq 1, n ϵ I

\to

f (\frac{1}{n}) = 0 \forall n \leq 1, n ϵ I

∣ ∣ ∣ \begin{matrix} f^{'} (x) & f (x) f^{''} (x) & f^{'} (x) \end{matrix} ∣ ∣ ∣ = 0

f (x)

f^{'} (x) \neq 0

f (0) = 1

f^{'} (0) = 2

f (x)

f (x)

f (0) = 0, f (1) = 1, f^{'} (x) > 0 \forall x ϵ (0, 1)

\to

{lim}_{x \to 0} \frac{1}{x} [f (x) + f (\frac{x}{2}) + . . . + f (\frac{x}{100})]

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