The family of curves `y = e^(a sinx) ` where a is an arbitrary constant , is represented by the differential equation

Family of curves y=Ax+A^(3) is represented by the differential equation of degree

The elimination of the arbitrary constant k from the equation y=(x+k)e^-x gives the differential equation

The elimination of the arbitrary constant k from the equation y=(x+k)e^(-x) gives the differential equation

The differential equation of the family of curves y=e^x(Acosx+Bsinx), where A and B are arbitrary constants is

The differential equation of the family of curves v=A/r+B , where A and B are arbitrary constants, is

Form the differential equation having y=(sin^(-1)x)^2+Acos^(-1)x+B ,where A and B are arbitrary constants, as its general solution.

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

The differential equation of the family of curves represented by the equation x^2y=a. is

Find the differential equation corresponding to y=cx+c-c^(3) , where c is arbitrary constant.