The sum of all local minimum values of the function as defined below is:
- A
- B
- C
- D
The sum of all local minimum values of the function as defined below is:
Correct answer:D
Standard Method
Given: The piecewise function is
Find: The sum of all local minimum values of .
For ,
This is a decreasing linear function, so this part has no local minimum.
For ,
Now split at :
which is decreasing, and
which is increasing. Hence, there is a local minimum at with value
Checking the quadratic piece and final sum
For ,
This is an upward-opening quadratic, so its vertex gives a local minimum. The vertex lies at
Then
Use graph shape directly
The middle part is a V-shaped graph, so its minimum occurs at the vertex . The right part is an upward-opening parabola, so its minimum occurs at the midpoint of roots and , namely . Therefore, the local minimum values are
Their sum is
Therefore, the correct option is D. The solution states option A, but the working gives , which matches option D.
Treating the answer key key as final without checking the solution working is incorrect here because the shown calculation gives , not . Always match the final answer to the actual derivation.
Ignoring the absolute value in is wrong because the expression changes form on the intervals and . Split at before deciding where the minimum occurs.
Missing the local minimum of the quadratic piece is a conceptual error because is an upward-opening parabola. Check its vertex at the midpoint of the roots instead of only checking interval endpoints.
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