the tangent drawn at any point `P` to the parabola `y^2= 4ax` meets the directrix at the point `K.` Then the angle which `KP` subtends at the focus is

Three normals drawn from a point (h k) to parabola y^2 = 4ax

A normal drawn at a point P on the parabola y^2 = 4ax meets the curve again at Q. The least distance of Q from the axis of the parabola, is

A normal drawn at a point P on the parabola y^2 = 4ax meets the curve again at Q. The least distance of Q from the axis of the parabola, is

If the tangents drawn from the point (0, 2) to the parabola y^2 = 4ax are inclined at angle (3pi)/4 , then the value of 'a' is

P & Q are the points of contact of the tangents drawn from the point T to the parabola y^(2) = 4ax . If PQ be the normal to the parabola at P, prove that TP is bisected by the directrix.

The tangent at a point P on the hyperbola (x^2)/(a^2)-(y^2)/(b^2)=1 meets one of the directrix at Fdot If P F subtends an angle theta at the corresponding focus, then theta= (a) pi/4 (b) pi/2 (c) (3pi)/4 (d) pi

The tangent at a point P on the hyperbola (x^2)/(a^2)-(y^2)/(b^2)=1 meets one of the directrix at Fdot If P F subtends an angle theta at the corresponding focus, then theta= pi/4 (b) pi/2 (c) (3pi)/4 (d) pi

Prove that the tangents drawn on the parabola y^(2)=4ax at points x = a intersect at right angle.

Foot of the directrix of the parabola y^(2) = 4ax is the point

The tangent and normal at P(t) , for all real positive t , to the parabola y^2= 4ax meet the axis of the parabola in T and G respectively, then the angle at which the tangent at P to the parabola is inclined to the tangent at P to the circle passing through the points P, T and G is