The curve described parametrically by :
`x=t^2+t+1,y=t^2-t+1` represents

The point of intersection of the curves whose parametric equations are x=t^2+1,y=2t and x=2s,y=2/s is given by :

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

The parametric equation of the parabola are x=t^(2)+1,y=2t+1 The cartesian equation of the directrix is

If t is a parameter, then x=a(t+(1)/(t)) , y=b(t-(1)/(t)) represents

The curve represents by x=2(cos t+sin t) and y=5(cos t-sin t) is

The graph represented by the equations x=sin ^(2) t y=2 cos t is

x=sin t, y= cos 2t.

The slope of the tangent to the curve x=3t^(2)+1,y=t^(3)-1 at x=1 is