The value of the integral is :
- A
- B
- C
- D
The value of the integral is :
Correct answer:C
Standard Method
Given:
Find: The value of the integral and the correct option.
Use the property
Here,
So, replacing by ,
Since
we get
Now,
Therefore,
Adding the two forms of ,
Hence,
Therefore, the value of the integral is and the correct option is C.
Symmetry Property
Given:
Find: The integral value.
Since the limits satisfy
and the integrand is of the complementary form
replacing by changes to , so the transformed integrand becomes the complementary part. Hence,
with
Therefore,
Thus, the correct option is C.
Using the symmetry property with the wrong transformed limit expression. The correct substitution is because the sum of limits is , not . Always compute first.
Failing to convert into . Without this identity, the complementary form of the integrand is missed. Use the co-function identity carefully.
Adding the two integrands incorrectly. After transformation, the sum becomes
where . Do not try to add numerators or denominators separately in an invalid way.
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