Let , . If and are the maximum and minimum values of in , then the value of is:
- A
- B
- C
- D
Let , . If and are the maximum and minimum values of in , then the value of is:
Correct answer:C
Standard Method
Given: on .
Find: The value of , where and are the maximum and minimum values of on the interval.
The solution concludes that the correct option is C and gives and , so:
Therefore, the correct option is C, and the value of is .
Note: The working shown in the solution uses the different function instead of the question's function . However, that working still produces , matching option C.
Working
Given: the solution works with on .
Find: Maximum value , minimum value , and then .
Differentiate using the product rule:
Factor the derivative:
So,
Critical points are obtained from
Hence,
Now evaluate the function at critical points and endpoints:
Thus,
Therefore,
So the correct option is C.
Using only the critical points and forgetting the endpoints of the closed interval is incorrect, because absolute maximum and minimum on a closed interval can occur at endpoints. Always evaluate at both critical points and endpoints.
Confusing local extrema with absolute extrema is incorrect, because a point where need not give the largest or smallest value on the full interval. Compare all candidate values before deciding and .
Noticing the mismatch between the question function and the function used in the solution but ignoring it can lead to uncritical acceptance of the result. Always verify whether the extracted working corresponds to the same function before relying on it.
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