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Question
f(x) and f’(x) are differentiable at x = c. Which of the following is the condition for f(x) to have a local minimum at x = c, if f’(c) = 0
f(x) and f’(x) are differentiable at x = c. Which of the following is the condition for f(x) to have a local minimum at x = c, if f’(c) = 0
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Solution
The correct option is A f”(c) > 0
We saw that the slope of the tangents just before a local minimum is negative and just after local minimum, it is positive. Also, at maximum and minimum f’(x) will be zero. So, we have f’(c-h) <0
& f’(c+h) >0
Now, we know that f”(x) is the rate of change of f’(x). Around x =c, the value of f’(x) increases. That is, before x = c, it is negative, at x = c, it is zero and after x = c, it is positive. Since the value of f’(x) increases, we can say that the rate of change of f’(x), f”(x), will be positive at x = c
Or f”(c) >0
=> option a is correct
f”(c) > 0
We saw that the slope of the tangents just before a local minimum is negative and just after local minimum, it is positive. Also, at maximum and minimum f’(x) will be zero. So, we have f’(c-h) <0
& f’(c+h) >0
Now, we know that f”(x) is the rate of change of f’(x). Around x =c, the value of f’(x) increases. That is, before x = c, it is negative, at x = c, it is zero and after x = c, it is positive. Since the value of f’(x) increases, we can say that the rate of change of f’(x), f”(x), will be positive at x = c
Or f”(c) >0
=> option a is correct
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