Solve the equation `e^xdx+e^y(y+1)dy=0`

The solution of the differential equation e^(x)dx+e^(y)dy=0 is

The solution of the differential equation e^(x)dx+e^(y)dy=0 is

Solve the equation (dy)/(dx)+(1)/(x)=(e^(y))/(x^(2))

The equation of the curve passing through ((pi)/(6),0) and satisfying the differential equation (e^y+1)cos xdx+e^ysin xdy=0 , is

Find the general solution of the equation (1+e^(y//x)) dy + e^(y//x) (1-(y)/(x)) dx = 0 .

Solve the differential equation e^(x) tan y dx + (1-e^(x))sec^(2) y dy = 0

The general solution of the equation (e^(y)+1)cos xdx+e^(y)sin xdx=0 is

Solve the differential equation : y e^(x//y)dx=(x e^(x//y)+y^(2))dy(y != 0) .

Solve the differential equation (dy)/(dx)+1=e^(x+y)