The number of parabolas that can be drawn if two ends of the latus rectum are given

If the normals of the parabola y^(2)=4x drawn at the end points of its latus rectum are tangents to the circle (x-3)^(2)(y+2)^(2)=r^(2) then the value of r^(2) is

If the normals of the parabola y^(2)=4x drawn at the end points of its latus rectum are tangents to the circle (x-3)^(2)+(y+2)^(2)=r^(2) , then the value of r^(4) is equal to

Let A be the vertex and L the length of the latus rectum of the parabola,y^(2)-2y-4x-7=0 The equation of the parabola with A as vertex 2L the length of the latus rectum and the axis at right angles to that of the given curve is:

Find the area of the triangle formed by the lines joining the vertex of the parabola x^2 = - 36y to the ends of the latus rectum.

Equation of parabola ,having (4,-8) and (4,8) as ends of its latus-rectum , is

Find the area of the triangle formed by the lines joining the vertex of the parabola y^(2) = 16x to the ends of the latus rectum.

The triangle formed by the tangents to a parabola y^(2)=4ax at the ends of the latus rectum and the double ordinate through the focus is

‘O’ is the vertex of the parabola y^(2) = 4ax & L is the upper end of the latus rectum. If LH is drawn perpendicular to OL meeting OX in H, prove that the length of the double ordinate through H is 4asqrt5 .

'O' is the vertex of the parabola y^(2)=4ax&L is the upper end of the latus rectum.If LH is drawn perpendicular to OL meeting OX in H, prove that the length of the double ordinate through H is 4a sqrt(5).

The point of intersection of the two tangents at the ends of the latus rectum of the parabola (y+3)^(2)=8(x-2)