Statement I The differential equation of all non-vertical lines in a plane is `(d^(2)x)/(dy^(2))=0.`
Satement II The general equation of all non-vertical lines in a plane is ax+by=1, where `b!=0.`

Statement I The order of differential equation of all conics whose centre lies at origin is , 2. Statement II The order of differential equation is same as number of arbitary unknowns in the given curve.

The order and degree of the differential equation of all tangent lines to the parabola x^(2)=4y is

The general solution of the differential equation (y dx - x dy)/(y ) = 0 is

Statement I Differential equation corresponding to all lines, ax+by+c=0 has the order 3. Statement II Gereral solution of a differential equation of nth order contains n independent arbitaray constanis.

The differential equation of all non-vectical lines in a plane is given by (i) (d^(2)y)/(dx^(2))=0 (ii) (d^(2)x)/(dy^(2))=0 (iii) (d^(2)x)/(dy^(2))=0and (d^(2)y)/(dx^(2))=0 (iv) All of these

Find the equation of all lines having slope 2 and being tangent to the curve y+(2)/(x-3)=0 .

The general solution of the differential equation e^(x) dy + (y e^(x) + 2x)dx = 0 is

Find the equation of the image of the plane x-2y+2z-3=0 in plane x+y+z-1=0.

Find the general solution of the differential equation (dy)/(dx) = (1 + y^(2))/(1 + x^(2)) .