Let y = f(x) be defined parametrically as `y = t^(2) + t|t|, x = 2t - |t|, t in R`. Then, at x = find f(x) and discuss continuity.

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

t in R parametric equation of parabola are x=at^2 and y = 2at .

Find (dy)/(dx) , if x= a t^(2), y= 2 a t

At any two points of the curve represented parametrically by x=a (2 cos t- cos 2t);y = a (2 sin t - sin 2t) the tangents are parallel to the axis of x corresponding to the values of the parameter t differing from each other by :

A curve is represented parametrically by the equations x=e^(t)cost andy=e^(t) sin t, where t is a parameter. Then, If F(t)=int(x+y)dt, then the value of F((pi)/(2))-F(0) is

The vertex of the parabola whose parametric equation is x=t^2-t+1,y=t^2+t+1; t in R , is

If x and y are connected parametrically by the equations without eliminating the parameter, find (dy)/(dx) x=sin t, y= cos 2t

If x and y are connected parametrically by the equations without eliminating the parameter, find (dy)/(dx) x=a (cos t + log "tan" (t)/(2)),y= a sin t