Show that the parametric point `(2+t^(2),2t+1)` represents a parabola. Show that its vertex is (2,1).

The parametric representation (2+t^(2),2t+1) represents

Prove that the parametric co-ordinates of a point (2+t^(2),2t+1) represents a parabola. Also prove that the co-ordinates of its vertex is (2,1).

Show that the curve whose parametric coordinates are x=t^(2)+t+l,y=t^(2)-t+1 represents a parabola.

Show that the curve whose parametric coordinates are x=t^(2)+t+l,y=t^(2)-t+1 represents a parabola.

Show that the curve whose parametric coordinates are x=t^(2)+t+l,y=t^(2)-t+1 represents a parabola.

If the locus of the point (4t^(2)-1,8t-2) represents a parabola then the equation of latus rectum is

If the locus of the point (4t^(2)-1,8t-2) represents a parabola then the equation of latusrectum is

Show that the normal at a point (at^2_1, 2at_1) on the parabola y^2 = 4ax cuts the curve again at the point whose parameter t_2 = -t_1 - 2/t_1 .

Show that the normal at a point (at^2_1, 2at_1) on the parabola y^2 = 4ax cuts the curve again at the point whose parameter t_2 = -t_1 - 2/t_1 .