From the differential equation representing the family of
curves y = A cos (x + b) , where A and B are parameters .

Form the differential equation representing the family of curves y = a sin ( x + b) , where a, b are arbitrary constants.

Find the differential equation representing the family of curves y= ae^(bx+5) where a and b are arbitrary constants.

Form the differential equation representing the family of curves y = mx where, m is arbitrary constant.

The differential equation representing the family of curves y^2=2c(x+sqrt(c)), where c is a positive parameter, is of (A) order 1 (B) order 2 (C) degree 3 (D) degree 4

The differential equation of the family of curves y^(2)=4a(x+a) is -

Form the differential equation representing the family of curves given by (x - a)^(2) + 2y^(2) = a^(2) , where a is an arbitrary constant.

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

The order and degree of the differential equation representing the family of curves y^(2)=2k(x+sqrt(k)) are respectively -

The differential equation of the family of curves y=e^(2x)(acosx+bsinx) , where a and b are arbitrary constants, is given by

The differentiable equation of the family of curves y=A(x+B)^(2) after eliminating A and B is -