If the normal at `(at_(1)^(2),2at_(1)) "to" y^(2)=4ax` intesect the parabola at `(at_(2)^(2),2at_(2)) "then" t_(1)+t_(2)+(k)/(t_(1))=0 (t_(1) ne 0)`, find k.

If the normal at (at_(1)^(2), 2at_(1))" to " y^(2) =4ax intersect the parabola at (at_(2)^(2), 2at_(2)) , prove that, t_(1)+t_(2)+(2)/(t_1)=0(t_(1) ne 0)

If the normals at P(t_(1))andQ(t_(2)) on the parabola meet on the same parabola, then (A) t_(1)t_(2)=-1 (B) t_(2)=-t_(1)-(2)/(t_(1)) (C) t_(1)t_(2)=1 (D) t_(1)t_(2)=2

The distance between the points (at_1^(2) , 2at_(1)) and (at_(2)^(2) ,2at_(2)) is

If the normal to the parabola y^2=4a x at point t_1 cuts the parabola again at point t_2 , then prove that t_2^2 geq8.

If the extremities of a focal chord of the parabola y^(2) = 4ax be (at_(1)^(2) , 2at_(1)) and (at_(2)^(2) ,2at_(2)) , show that t_(1)t_(2) = - 1

Find the area of the triangle with verrtices (at_(1)^(2),2at_(1)),(at_(2)^(2),2at_(2))and(at_(3)^(2),2at_(3))

The point of intersection of the tangents to the parabola y^(2)=4ax at the points t_(1) and t_(2) is -

If the time taken by a particle moving at constant acceleration to travel equal distances along a straight line are t_(1), t_(2), t_(3) respectively prove that (1)/(t_(1))-(1)/(t_(2))+(1)/(t_(3))=(3)/(t_(1)+t_(2)+t_(3)) .

The coordinates of the vertices of a triangle are [at_(1)t_(2),a(t_(1)+t_(2))],[at_(2),t_(3),a(t_(2)+t_(3))] and [at_(3)t_(1),t_(3)+t_(1))] . Find the coordinates of the ortocentre of the triangle.

If the extremitied of a focal chord of the parabola y^2=4ax be (at_1^2,2at_1) and (at_2^2,2at_2) ,show that t_1t_2=-1