For all twice differentiable functions f: R → R, with f(0) = f(1) = f'(0) = 0,

Option 1 - f''(x) ≠ 0, at every point x ∈ (0,1)

Option 2 - f''(x) = 0, for some x ∈ (0,1)

Option 3 - f''(0) = 0

Option 4 - f''(x) = 0, at every point x ∈ (0,1)

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Raj Pandey | Contributor-Level 9

5 months ago

Correct Option - 1

Detailed Solution:

Applying Rolle's theorem in for function f (x), there exists c such that f' (c) = 0, c ∈ (0,1).
Again applying Rolle's theorem in [0, c] for function f' (x), there exists c? such that f' (c? ) = 0, c? ∈ (0, c).
Option A is correct.

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