The point of intersection of the curve whose parametrix equations are `x=t^(2)+1, y=2t" and " x=2s, y=2/s,` is given by

Find the equation of curve whose parametric equations are x=2t-3,y=4t^(2)-1 is

The Cartesian equation of the curve whose parametric equations are x=t^(2)+2t+3 " and " y=t+1 " is a parabola "(C)" then the equation of the directrix of the curve 'C' is.(where t is a parameter)

The Cartesian equation of the directrix of the parabola whose parametrix equations are x=2t+1, y=t^(2)+2 , is

The Cartesian equation of the curve whose parametric equations are x=t^(2) +2t+3 and y=t+1 is a parabola (C) then the equation of the directrix of the curve 'C' is.(where t is a parameter)

The Length of Latus rectum of the parabola whose parametric equation is , x=t^(2)+t+1 , y=t^(2)-t+1 where t in R

The length of latusrectum of the parabola whose parametric equation is x=t^(2)+t+1 , y=t^(2)-t+1 where t in R

The length of latusrectum of the parabola whose parametric equation is x=t^(2)+t+1 , y=t^(2)-t+1 where t in R

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

The distance between the lines x=1-4t, y=2+t, z=3+2t" and "x=1+s, y=4-2s, z=-1+s is

Find the equations of the tangent and the normal to the curve x=a t^2,\ \ y=2a t at t=1 .