Consider the family of curves represented by the equation
` (x - h)^(2) + (y - k)^(2) = r^(2) ` where h and k are arbitrary constants .
Degree of ` (dy)/(dx) ` is -

Consider the family of curves represented by the equation (x - h)^(2) + (y - k)^(2) = r^(2) where h and k are arbitrary constants . The differential equation of the above family is of curves -

Consider the family of curves represented by the equation (x - h)^(2) + (y - k)^(2) = r^(2) where h and k are arbitrary constants . The differential equation of the above family is of order-

From the differential equation of the family of circles (x -a)^(2) + (y - a)^(2) - a^(2) , where a is an arbitrary constant .

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 solution of differential equation x^(2)(x dy + y dx) = (xy - 1)^(2) dx is (where c is an arbitrary constant)

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

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

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

The differential equation whose solution is (y - b)^(2) = 4 k (x - a) (where b,a,k are constants ) is of

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