A differential equation [math]\frac{dy}{dx}=[/math] [i]f[/i]([i]x,y[/i]) is said to be homogeneous if [i]f[/i]([i]x,y[/i]) = [i]g[/i]([i]y/x[/i]).[br]This GeoGebra applet solves shows how to solve a homogeneous DE. It also provides visualization of solution on the slope field of the DE.[br][br]Use Refresh button several times to[br]1. Ascertain the equation is homogeneous. Do not proceed further unless the check box for homogeneous function is automatically checked off.[br]2. Generate graph of a solution of the DE on the slope field in Graphic View 2.[br]3. Use slider to show the solution step by step if the DE is indeed homogeneous.[br][br]It is clear that it may not be possible to obtain algebraic solution of a homogeneous DE.[br][br]For more on simple differential equation check my online book [br]"Flipped Classroom Calculus of Single Variable"[br]https://versal.com/learn/vh45au/