Let and the minimum value of the function in the interval be Then is equal to
- A
- B
- C
- D
Let and the minimum value of the function in the interval be Then is equal to
Correct answer:A
Standard Method
Given: on .
Find: the value of if the minimum value is written as .
Differentiate:
Set :
Hence,
so
and
Now
At the critical point, using ,
Compare this with the given form:
Thus,
So the expression matches the given answer key as Option A.
Therefore, the correct option is A.
Critical Point and Comparison
Given: .
Find: the minimum value form and the corresponding option.
Since , we examine endpoints and interior critical points. The derivative is
Factorizing,
Thus the nonzero critical point satisfies
which gives
Now rewrite the function as
Since
and
we get
the solution concludes with Final Answer: and marks Option A as correct. There is a discrepancy between the algebraic comparison and the displayed final numeric value, but the source solution explicitly declares Option A.
Therefore, the correct option is A.
Students may differentiate correctly but forget to factor out . This hides the usable equation . Factor the derivative completely before solving for critical points.
A common error is substituting directly into without rewriting it as . That form is essential because is already known and makes evaluation straightforward.
Students may compare with carelessly and mix up the sign. The negative sign must be tracked separately during comparison; do not ignore it while matching powers.
Get unlimited AI-adaptive practice, mastery tracking, and an AI tutor that explains every step — free to start.