Let one end of focal chord of parabola `y^2 = 8x` is `(1/2, -2)`, then equation of tangent at other end of this focal chord is

If the point ( at^2,2at ) be the extremity of a focal chord of parabola y^2=4ax then show that the length of the focal chord is a(t+1/t)^2 .

If (2,-8) is at an end of a focal chord of the parabola y^2=32 x , then find the other end of the chord.

If (2,-8) is at an end of a focal chord of the parabola y^2=32 x , then find the other end of the chord.

The focal chord of the parabola y^2=a x is 2x-y-8=0 . Then find the equation of the directrix.

If the length of focal chord of y^2=4a x is l , then find the angle between the axis of the parabola and the focal chord.

If the length of focal chord of y^2=4a x is l , then find the angle between the axis of the parabola and the focal chord.

The angle between the lines joining the vertex to the ends of a focal chord of a parabola is 90^0 . Statement 2: The angle between the tangents at the extremities of a focal chord is 90^0 .

PSQ is a focal chord of the parabola y^2=8x. If\ S P=6, then write SQ.

If the line y=3x+c touches the parabola y^2=12 x at point P , then find the equation of the tangent at point Q where P Q is a focal chord.

If the line y=3x+c touches the parabola y^2=12 x at point P , then find the equation of the tangent at point Q where P Q is a focal chord.