Let and be the number of points at which the function is not differentiable and not continuous, respectively. Then is equal to
- A
- B
- C
- D
Let and be the number of points at which the function is not differentiable and not continuous, respectively. Then is equal to
Correct answer:C
the solution unavailable
Given: .
Find: The value of , where is the number of points where is not differentiable and is the number of points where is not continuous.
Working could not be extracted from the solution. Using the given answer information, the correct option is C. Therefore, .
Assuming the maximum of continuous functions can be discontinuous. This is wrong because the maximum of finitely many continuous functions is always continuous. Therefore, take .
Checking only the endpoints and and ignoring switching points between the curves. Non-differentiability occurs where the dominating power changes, so compare the odd powers across intervals.
Treating all intersections of as distinct for every pair. This is wrong because many powers intersect at the same common points, so count unique points only.
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