Let and then is equal to
Determine the value of
Step 1: Check if the function is odd or even
Since the limit of integral is given from , We will check if the given function is odd or even.
We know that the function is odd when , and the function is even when .
We have,
Now replace we get,
Therefore, the given function is odd and its value under the given integral will become equal to zero, i,e
We know that the value of , hence the correct option is (A)