If the normals any point to the parabola `x^(2)=4y` cuts the line y = 2 in points whose abscissar are in A.P., them the slopes of the tangents at the 3 conormal points are in

If the normals from any point to the parabola y^(2)=4x cut the line x=2 at points whose ordinates are in AP then prove that the slopes of tangents at the co-normal points are in G.P.

The tangent to the parabola y^(2)=4(x-1) at (5,4) meets the line x+y=3 at the point

The point of intersection of normals to the parabola y^(2)=4x at the points whose ordinmes are 4 and 6 is

If any tangent to the parabola x^(2)=4y intersects the hyperbola xy=2 at two points P and Q , then the mid point of the line segment PQ lies on a parabola with axs along

If any tangent to the parabola x^(2) = 4y intersects the hyperbola xy = 2 at two points P and Q, then the mid point of line segment PQ lies on a parabola with axis along:

The slope of the tangent line to the curve x+y=xy at the point (2,2) is

If the common tangents to the parabola,x^(2)=4y and the circle,x^(2)+y^(2)=4 intersectat the point P, then the distance of P from theorigin,is.