The differential equation of the family of curves `y=A(x+B)^2` after eliminating `A` and `B` is (A) `yy\'\'=y\'^2` (B) `2yy\'\'=y\'-y` (C) `2yy\'\'=y\'+y` (D) `2yy\'\'=y\'^2`

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

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

differentiation OF term F(xy) +Y.y(x.y)

Differentiation OF term F(xy) +Y.y(x.y)

The differential equation which represents the family of curves y=e^(Cx) is y_(1)=C^(2)y b.xy_(1)-In y=0 c.x In y=yy_(1) d.y In y=xy_(1)

The solution of the differential equation y'y'''=3(y'')^(2) is

The differential equation of all circle in the first quadrant touch the coordinate is (a) (x-y)^(2)(+y')^(2))=(x+yy')^(2) (b) (x-y)^(2)(+y')^(2))=(x+y')^(2) ( c ) (x-y)^(2)(+y')=(x+yy')^(2) (d) None of these

The differential equation of all circle in the first quadrant touch the coordinate is (a) (x-y)^(2)(1+y')^(2)=(x+yy')^(2) (b) (x-y)^(2)(1+y')^(2)=(x+y')^(2) ( c ) (x-y)^(2)(1+y')=(x+yy')^(2) (d) None of these