The solution of the differential equation `x cos((y)/(x))(dy)/(dx)=y cos((y)/(x))+x` is

Find the particular solution of the differential equation x cos((y)/(x))(dy)/(dx)=y cos((y)/(x))+x given that when x=1,y=(pi)/(4)

Solution of the differential equation cos^(2)(x-y)(dy)/(dx)=1

If sin (y/x) = log_e |x| | (alpha)/2 is the solution of the differential equation x cos (y/x) (dy)/(dx) = y cos (y/x) x and y(1) = (pi)/3 , then alpha^2 is equal to

solution of the differential equation (dx)/(x)=(dy)/(y)

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

The solution of the differential equation (dy)/(dx)=cos(x-y) is

The solution of differential equation x sec((y)/(x))(y dx + x dy)="y cosec"((y)/(x))(x dy - y dx) is

Solution of the differential equation (dy)/(dx)=(x-y)/(x+y) is

The solution of differential equation x(dy)/(dx)=y is :

The solution of the differential equation (dy)/(dx)+(sin2y)/(x)=x^(3)cos^(2)y