Let be a function defined by and If then the least value of is equal to:
- A
- B
- C
- D
Let be a function defined by and If then the least value of is equal to:
Correct answer:A
Standard Method
Given: ,
and
Find: The least value of if and .
From the given function, the solution uses the identity
Hence the limits of integration are complementary about .
Using the symmetry of under the transformation , the solution gives
Therefore,
So,
Comparing with , we get
Now,
Therefore, the least value of is , so the correct option is A.
Assuming that and are equal because both integrals have the same limits. This is wrong because the integrand of contains the extra factor . Use the symmetry carefully to relate to , not directly to .
Not using the identity . This is wrong because the symmetry argument depends on complementary limits. First establish this relation from the given function, then apply the substitution.
Taking from . This reverses the comparison. Match with correctly to get and .
Get unlimited AI-adaptive practice, mastery tracking, and an AI tutor that explains every step — free to start.