 Welcome to the session. I am Deepika here. Let's discuss the question which says find the area enclosed between the parabola y square is equal to 4ax and the line y is equal to mx. Now we know that the area of the region enclosed between the curves y is equal to fx and y is equal to gx where is greater than or equal to gx in closed interval a, b. This is equal to a and x is equal to b is gx. Take the hulk of this key idea to solve the above question. So let's start the solution parabola y square is equal to 4ax and the line y is equal to mx. Equation of the parabola let us give this as equation one line of intersection of these two curves. So the parabola y square is equal to 4ax y is equal to mx. This information we will draw the rough sketch of the area to be found out intersection of these two curves are 0, 0 then coordinate of c y square is equal to 4 a solution is clear to you. Bye