If `PQ` is a focal chord of a parabola `y^(2)=4x` if `P((1)/(9),(2)/(3))`, then slope of the normal at Q is

PSQ is a focal chord of the parabola y^(2)=16x . If P=(1,4) then (SP)/(SQ)=

If P(-3, 2) is one end of the focal chord PQ of the parabola y^(2) + 4x + 4y = 0 , then the slope of the normal at Q is

P(-3,2) is one end of focal chord PQ of the parabola y^(2)+4x+4y=0. Then the slope of the normal at Q is

If P(2,1) is one end of focal chord PQ of the parabola x^(2)+2y-2x-2=0 then the slope of the normal at Q is

If PQ is the focal chord of parabola y=x^(2)-2x+3 such that P-=(2,3) , then find slope of tangent at Q.

If P(2, 1) is one end of focal chord PQ of the parabola x^(2)+2y- 2x-2=0 then the slope of the normal at Q is

If PQ is the focal chord of the parabola y^(2)=-x and P is (-4, 2) , then the ordinate of the point of intersection of the tangents at P and Q is

If PQ is a focal chord of parabola y^(2) = 4ax whose vertex is A , then product of slopes of AP and AQ is