If the tangent to `y^2=4ax` at the point `(at^2,2at)`, where `|t|gt1` is a normal to `x^2-y^2=a^2` at the point `(asectheta, a tan theta)`, then

The equation of normal to the curve x^2/a^2-y^2/b^2=1 at the point (a sec theta, b tan theta) is

If the tangents to the parabola y^2=4ax at the points (x_1,y_1) and ( (x_2,y_2) meet at the point (x_3,y_3) then

The normal to parabola y^(2) =4ax from the point (5a, -2a) are

If the tangent to the curve y^(2)=ax^(2)+b at the point (2,3) is y=4x-5, then (a,b)=

If the tangent drawn at point (t^(2),2t) on the parabola y^(2)=4x is the same as the normal drawn at point (sqrt(5)cos theta,2sin theta) on the ellipse 4x^(2)+5y^(2)=20 ,then theta=cos^(-1)(-(1)/(sqrt(5)))( b) theta=cos^(-1)((1)/(sqrt(5)))t=-(2)/(sqrt(5))(d)t=-(1)/(sqrt(5))

Find the equation of the tangent and normal to the parabola y^2=4a x at the point (a t^2,\ 2a t) .

Show that the area formed by the normals to y^2=4ax at the points t_1,t_2,t_3 is

For the curve x=t^(2)-1, y=t^(2)-t , the tangent is parallel to X-axis at the point where

The normals to the parabola y^(2)=4ax from the point (5a,2a) is/are