Show that the differential equation `x cos ((y)/(x))(dy)/(dx) = y cos ((y)/(x)) + x` is homogeneous and solve it.

Solve the following differential equation x cos((y)/(x))(dy)/(dx) = y cos ((y)/(x)) + x, x!= 0 .

Solve the differential equation x(dy)/(dx) - y + x cos ((y)/(x)) = 0

Solve the differential equation (dy)/(dx) + (y)/(x) =2 x^(3)

Solve the differential equation x log x (dy)/(dx)+y=(2)/(x) log x .

Solve the differential equation ydx + (x - ye^(y) )dy=0

Solve the differential equation x(dy)/(dx)+2y=xlogx .

Solve the differential equation 2y dx + 2x log ((y)/(x))dy - 4xdy = 0

Show that the differential equation [x sin^(2)((y)/(x)) - y]dx+x dy = 0 is homogeneous. Find the particular solution of this differential equation, given that y = (pi)/(4) when x = 1.

Solve the differential equation 2(dy)/(dx)=y/x+(y^(2))/(x^(2))