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

From the differential equation corresponding to y^(2) a (b-x) (b + x) by eliminating the parameters a and b .

Solve the differential equation (x)dy = ( 1 + y^(2))dx .

Show that the differential equation x (yy_(2) + y_(1)^(2)) = yy_(1) is formed by eliminating a, b and c from the relation ax^(2) + by^(2) + c = 0 . Justify why the eliminate is of the second order although the given relation involves three constants a, b and c .

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 the differential equation y^(2)dx- x^(2)dy = 0 is

Find y(x) from the differential equation (dy)/(dx)-x^2y = 0 ,

The differential equation whose solution is (x - alpha)^(2) + (y - beta)^(2) = a^(2) [ for all alpha " and " beta where a is constant ] of is -

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

Form the differential equation of the family of hyperbolas b^(2) x^(2) - a^(2) y^(2) = a^(2) b^(2) by eliminating constants a and b .