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

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

A curve is represented parametrically by the equations x=t+e^(at) and y=-t+e^(at) when t in R and a > 0. If the curve touches the axis of x at the point A, then the coordinates of the point A are

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

Show that the function y=f(x) defined by the parametric equations x=e^(t)sint,y=e^(t).cos(t), satisfies the relation y''(x+y)^(2)=2(xy'-y)

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

A curve is represented parametrically by the equations x = e^t cos t and y = e^t sin t where t is a parameter. Then The relation between the parameter 't' and the angle alpha between the tangent to the given curve andthe x-axis is given by, 't' equals

A curve is represented paramtrically by the equations x=e^(t)cost and y=e^(t)sint where t is a parameter. Then The value of (d^(2)y)/(dx^(2)) at the point where t=0 is

A function is represented parametrically by the equations x=(1+t)/(t^3);\ \ y=3/(2t^2)+2/t then (dy)/(dx)-x((dy)/(dx))^3 has the value equal to (a) 2 (b) 0 (c) -1 (d) -2

The slope of the tangent to the curve x=t^(2)+3t-8, y=2t^(2)-2t-5 at the point (2,-1) is …………