 Hi and welcome to the session I am Deepika here. Let's discuss the question. Differentiate the following with respect to x e raised to power x cube. So let's start the solution. Here we will use a chain rule. So let y is equal to e raised to power t where t is equal to x cube. Therefore dy by dt is equal to e raised to power t because dy dx of e raised to power x is e raised to power x and dt over dx is equal to 3x square. Now dy by dx is equal to dy by dt into dt over dx. Now dy by dt is e raised to power t into dt over dx is 3x square. Substitute the value of t here we get e raised to power x cube into 3x square. Hence the derivative of the above function is 3x square into e raised to power x cube. So this is our answer for the above question. I hope the solution is clear to you. Bye and take care.