In Exercises 1–24, find an antiderivative for each function. Do as many as you can mentally. Check your answers by differentiation.

Solution Step 1 of 3We have to find the antiderivative of each of the given function (a)Since the derivative of is so,the antiderivative is obtained by taking integration of which is Hence antiderivative of is ________________Step 2 of 3(b)Since the derivative of is so,the antiderivative is obtained by taking integration of which is Hence antiderivative of is ________________