Let be a positive function and and Then the value of is equal to _____
- A
- B
- C
- D
Let be a positive function and and Then the value of is equal to _____
Correct answer:A
Standard Method
Given:
Find: The value of .
From the solution, the conclusion stated is that the correct option is A and hence .
Solution Working
Given:
Find: The value of .
The solution proceeds by considering substitutions for both integrals.
For , it takes
and writes
It then tracks the limits:
Using this, the extracted working states
For , the working takes
with
It evaluates the endpoint values as
The working then appeals to symmetry and states
and hence
Therefore,
So the correct option is A.
Note: The intermediate derivation in the provided the solution is not fully rigorous and contains inconsistencies, but its final conclusion explicitly gives option A, so the extracted answer is .
Shortcut from the solution
Given: The same integrals and . Find: .
The second approach in the solution tests the constant function
Then
and
So
Thus the correct option is A.
Why this shortcut works in the extracted solution: the working uses this test to match the constant ratio claimed by the main solution and identify the correct option.
Assuming a substitution is complete without transforming the differential correctly. In , replacing only the inside expression and ignoring the derivative structure can produce an invalid integral. Always check how and every multiplicative factor transform together.
Using symmetry too loosely for . Although the expression is symmetric about , that does not mean the integral can be rewritten arbitrarily. First split the interval carefully, then map each subinterval with a valid substitution.
Trusting endpoint substitution alone for . Since and both give the same transformed value, one may incorrectly conclude the integral is zero. That is wrong because a many-to-one substitution requires interval splitting or monotonic pieces.
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