dy Explain how to find the general solution of the differential equation dx - = 4(0.6y - 0.4). dy In order to find the general solution of the differential equation dx = 4(0.6y - 0.4): O A. Find the values of x where - dx - =0. O B. Construct a phase line. O C. Find the values of y where - =0 O D. Separate the variables, so that y and the differential dy are on one side of the equation, and x and the differential dx are on the other side. Then differentiate both sides. O E. Separate the variables, so that y and the differential dy are on one side of the equation, and x and the differential dx are on the other side. Then integrate both sides