Radius of the parametric equation represented by `x=2a((1-t^2)/(1+t^2)),y=(4at)/(1+t^2)` is

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

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

If sinx=(2t)/(1+t^2) , tany=(2t)/(1-t^2) , find (dy)/(dx) .

The equation y^(2)-x^(2)+2x-1=0 , represents

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

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

For the real parameter t , the locus of the complex number z = (1-t^2)+isqrt(1+t^2) in the complex plane is

The equation x =1/2 (t+ (1)/(t)), y = 1/2 (t - 1/t), t ne 0 represents

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