If two parabolas `y^(2)-4a(x-k)` and `x^(2)=4a(y-k)` have only one common point P, then the equation of normal to `y^(2)=4a(x-k)` at P is

Similar Questions

Explore conceptually related problems

If two parabolas y^(2)=4a(x-k) and x^(2)=4a(y-k) have only one common point P, then the coordinates of P are

If the parabols y^(2) = 4kx (k gt 0) and y^(2) = 4 (x-1) do not have a common normal other than the axis of parabola, then k in

End points of the Latusrectum of the parabola (x-h)^(2)=4a(y-k) is

The two parabolas y^(2)=4x and x^(2)=4y intersect at a point P whose abscissae is not zero such that

The two parabolas y^(2) =4x and x^(2)=4y intersect at a point p whose abscissa is not zero such that

The two parabolas y^(2)=4x" and "x^(2)=4y intersect at a point P, whose abscissas is not zero, such that

If the two parabolas y^2 = 4x and y^2 = (x-k) have a common normal other than x-axis, then value of k can be (A) 1 (B) 2 (C) 3 (D) 4

If line x-2y-1=0 intersects parabola y^(2)=4x at P and Q, then find the point of intersection of normals at P and Q.