The parametric equation of a parabola is `x=t^2+1, y=2t+1`. The cartesian equation of its directrix is

Write the parametric equations of the circle. x^2+y^2=9

Show that the equation of the parabola with vertex (2,5) and the equation of the directrix x=1 is (y-5)^2=-4(x-2)

If x=t^(2) and y=2t then equation of the normal at t=1 is

x-2 = t^2, y = 2t are the parametric equations of the parabola-

The point (2,2) lies on the parabola (x-3)^2=4a(y-1) find the focus and the equation of the directrix.

The equation of the parabola with focus at (-6,0) and the line x+2=0 as directrix is

The equation of the parabola with its vertex at (1, 1) and focus at (3, 1) is

Thte parametric form of the equation of circle 4x ^(2) + 4y^(2) =9 is