Let p be the point (1,0) and Q a point on the locurs `y^(2)=8x` the locus of mid point of PQ is

Let O be the origin and A be a point on the curve y^(2)=4 x . Then the locus of the midpoint of O A is

Let O be the vertex and Q be any point on the parabola x^(2)=8y if the point p divides the line segement OQ internally in the ratio 1:3 then the locus of P is

If y_(1) and y_(2) are the ordinates of two points P and Q on the parabola y^(2)=4 a x and y_(3) is the ordinate of the point of intersection of the tangents at P and Q then, y_(1), y_(3) and y_(2) are in

If a point (alpha, beta) lies on the circle x^(2)+y^(2)=1 , then the locus of the point, (3 alpha+2, beta) is

PM is perpendicular from a point on a rectangular hyperbola to its asymptotes , them the locus of the mid - point of PM is :

Locus of the point of intersection of normals to the parabola y^(2)=4 a x at the end points of its focal chord is

A line intersects y-axis and x-axis at the points P and Q respectively. If (2, 5) is the mid point of PQ then find the co ordinates of P and Q.

The locus of the mid points of the line joining the focus and any point on the parabola y^(2)=4ax is a parabola with equation of directrix as