Tangent at P(2,8) on the curve `y=x^(3)` meets the curve again at Q.
Find coordinates of Q.

Tangent at (2,8) on the curve y=x^(3) meets the curve again at Q.Find the coordinates of Q .

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

If the tangent at P(1,1) on the curve y^(2)=x(2-x)^(2) meets the curve again at A , then the points A is of the form ((3a)/(b),(a)/(2b)) , where a^(2)+b^(2) is

(i) Find the point on the curve 9y^(2)=x^(3) where normal to the curve has non zero x -intercept and both the x intercept and y- intercept are equal. (ii) If the tangent at (1,1) on y^(2)=x(2-x)^(2) meets the curve again at P, then find coordinates of P (iii) The normal to the curve 5x^(5) -10x^(3) +x+2y+6=0 at the point P(0,-3) is tangent to the curve at some other point (s). Find those point(s)?

The tangent at (t,t^(2)-t^(3)) on the curve y=x^(2)-x^(3) meets the curve again at Q, then abscissa of Q must be

If the tangent at (16,64) on the curve y^(2) = x^(3) meets the curve again at Q(u, v) then uv is equal to_____

Tangent at point on the curve y^(2)=x^(3) meets the curve again at point Q. Find (m_(op))/(moq), where O is origin.

The tangent to the curve y=x-x^(3) at a point P meets the curve again at Q. Prove that one point of trisection of PQ lies on the Y-axis. Find the locus of the other points of trisection.

If the tangent to the curve y=x^(3) at the point P(t,t^(3)) meets the curve again at Q , then the ordinate of the point which divides PQ internally in the ratio 1:2 is

The normal at the point (2,(1)/(2)) on the curve xy=1, meets the curve again at Q. If m is the slope of the curve at Q. then find |m|