If the tangent at a point P, with parameter t, on the curve `x=4t^(2)+3,y=8t^(3)-1,t in RR`, meets the curve again at a point Q, then the coordinates of Q are

If the tangent at (1,1) on y^2=x(2-x)^2 meets the curve again at P , then find coordinates of P .

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

If a line is tangent to one point and normal at another point on the curve x=4t^2+3,y=8t^3-1, then slope of such a line is

Show that the tangent to the curve 3x y^2-2x^2y=1a t(1,1) meets the curve again at the point (-(16)/5,-1/(20))dot

A curve is represented by the equations x=sec^2ta n dy=cott , where t is a parameter. If the tangent at the point P on the curve where t=pi/4 meets the curve again at the point Q , then |P Q| is equal to (5sqrt(3))/2 (b) (5sqrt(5))/2 (c) (2sqrt(5))/3 (d) (3sqrt(5))/2

The curve x=1-3t^(2), y=t-3t^(3) is symmetrical with respect to -

The gradient of normal at t = 2 of the curve x=t^(2)-3,y=2t+1 is -