The normals from (P, 0) are drawn to the para bolo `y^(2) = 8x-`, one of them is the axis. If the remaining two normals are perpendicular nnd the value or P.

Three normals are drawn from the point (a,0) to the parabola y^2=x . One normal is the X-axis . If other two normals are perpendicular to each other , then the value of 4a is

If three distinct normals are drawn from (2k, 0) to the parabola y^2 = 4x such that one of them is x-axis and other two are perpendicular, then k =

If three distinct normals are drawn from (2k, 0) to the parabola y^2 = 4x such that one of them is x-axis and other two are perpendicular, then k =

The normal at P(8, 8) to the parabola y^(2) = 8x cuts it again at Q then PQ =

Three normal are drawn to the curve y^(2)=x from a point (c, 0) . Out of three, one is always the x-axis. If two other normal are perpendicular to each other, then ‘c’ is:

If the normal P(8,8) to the parabola y^(2) = 8x cuts It again at Q then find the length PQ

If three distinct normals can be drawn to the parabola y^(2)-2y=4x-9 from the point (2a, 0) then range of values of a is

From a the point P(h, k) three normals are drawn to the parabola x^2=8y and m_1m_2" and "m_3 are the slopes of three normals, if the two normals from P are such that they make complementary angles with the axis then the directrix of the locus of point P (conic) is :

The area of triangle formed by tangent and normal at (8, 8) on the parabola y^(2)=8x and the axis of the parabola is

Three normals are drawn from the point (7, 14) to the parabola x^2-8x-16 y=0 . Find the coordinates of the feet of the normals.