Find the differential equation from the equation `(x-h)^(2)+(y-k)^(2)=a^(2)` by eliminating `h` and `k`.

The differential equation whose solution is (x-h)^(2)+(y-k)^(2)=a^(2) is (a is a constant )

From the differential equation corresponding to y^(2) - 2ay + x^(2) = a^(2) by eliminating a.

The differential equation by eliminating a,b from (x-a)^(2)+(y-b)^(2)=r^(2) is:

From a differential equation from the equation y=ae^(2x)+be^(-x) by eliminating the arbitrary constants.

Form the differential equation by eliminating a,b from (x-a)^(2) + (y -b)^(2) = r^(2)

The differential equation by eliminating a, b from (x-a)^(2) + (y-b)^(2) = r^(2) is

The differential equation whose solution is (x - h)^2 + (y-k)^2= a^2 ( a is given constatnt) 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 order-

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 -