The line `x + y = 1` meets the lines represented by the equation `y^3--6xy^2 + 11x^2y-6x^3=0` at the points, P, Q and R. If O is the origin, then `(OP)^2 + (OQ)^2 + (OR)^2` is equal to

The line x+y=1 meets the lines represented by equation y^2-6cy^2+11x^2y-6z^3=0 at the points P,Q,R. If O is the origin, then (OP)^2+(OQ)^2+(OR)^2 is equal to

The line x+y=1 meets the lines represented by the equation y^(3)-xy^(2)-14x^(2)y+24x^(3)=0 at the points A,B,C.If O is the point of intersection of the lines represented by the given equation then OA^(2)+OB^(2)+OC^(2)=

The equation of one of the lines represented by the equation pq(x^2-y^2)+(p^2-q^2)xy=0 , is

The equation of one of the lines represented by the equation pq(x^2-y^2)+(p^2-q^2)xy=0 , is

Distance between the pair of lines represented by the equation x^(2)-6xy+9y^(2)+3x-9y-4=0 , is

Distance between the pair of lines represented by the equation x^(2)-6xy+9y^(2)+3x-9y-4=0 , is

Find the separate equation of lines represented by the equation by the equation x^2-6xy+8y^2=0

Find the separate equation of lines represented by the equation by the equation x^2-6xy+8y^2=0