 Hello and welcome to the session. My name is Asha and I am going to help you with the following question that says, find the derivative of the following functions and it is to be understood that A, B, C, D, P, Q, R and S affects non-zero constants and M and N are integers. 12th one is A x plus B raised to the power n. So, let us start with the solution and let us denote the given function by y. So, y is equal to A x plus B raised to the power n. Now we have to find its derivative that is dy upon dx. So, we have d upon dx of A x plus B raised to the power n. So, this is equal to n into A x plus B raised to the power n minus 1 into derivative of A x plus B. Since derivative of a function x raised to the power n with respect to x is n into x raised to the power n minus 1. So, here applying this formula and then finding the derivative of the function A x plus B. This is further equal to n into A x plus B raised to the power n minus 1 and derivative of A x plus B is A since derivative of A x is A into 1 and derivative of B which is a constant with respect to x is 0. So, this further implies A into A x plus B raised to the power n minus 1. Thus, on differentiating the given function its derivative is n A into A x plus B raised to the power n minus 1. This completes the session. Bye and take care.