Let be such that the function is differentiable at all . Then is equal to
- A
- B
- C
- D
Let be such that the function is differentiable at all . Then is equal to
Correct answer:A
Standard Method
Given:
Find: given that is differentiable for all .
For differentiability at , the function must be continuous and the left and right derivatives must be equal.
Step 1: Continuity at
Left limit:
Right value:
Equating for continuity:
Step 2: Equality of derivatives at
For ,
So,
For ,
Thus,
Equating for differentiability:
Step 3: Solve the system
Solving, we get
Step 4: Final calculation
However, the solution states , which is inconsistent with the computed values and . The listed correct option on the source is A, corresponding to .
Therefore, based on the solution's, the correct option is A.
Check continuity and derivative separately
Given: A piecewise function with possible non-smoothness only at .
Find: The value of .
Since both pieces are polynomials, they are individually differentiable on their own intervals. So the only point to check is .
Using continuity:
which gives
Using differentiability:
which gives
Now solve:
Multiply the first equation by and the second by :
Adding,
Then,
Hence,
So,
Therefore, the correct option is A.
Applying differentiability only through derivative matching and forgetting continuity first is incorrect. For a piecewise function, continuity at the joining point must also hold. Always form both equations at before solving.
Evaluating the left piece at incorrectly by using but then mishandling signs leads to a wrong continuity equation. Substitute carefully into .
Differentiating incorrectly is a common error. The derivative is , not . Use the power rule carefully.
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