Solve the following differential equation:3extany dx+(2−ex)sec2y dy=0,given that when x=0, y=4π˙
Form the differential equation of the family of hyperbola having foci on x-axis and center at the origin.
Find a particular solution of the differential equation dydx+ycotx=1(x=0)4xcosecx(x=0), given that y=0when x=2π
Show that the general solution of the differential equation dxdy+x2+x+1y2+y+1=0 is given by (x+y+1)=A(1−x−y−2xy) where A is a parameter
The differential equations , find the particular solution satisfying the given condition:2xy+y2−2x2dxdy=0;y=2when x = 1