If the tangent at the point `(at^(2),at^(3))` on the curve `ay^(2)=x^(3)` meets the curve again at

If the tangent at the point (a,b) on the curve x^(3)+y^(3)=a^(3)+b^(3) meets the curve again at the point (p,q) then show that bp+aq+ab=0

If the tangent at (x_(0),y_(0)) to the curve x^(3)+y^(3)=a^(3) meet the curve again at (x_(1)y_(1)) prove that (x_(1))/(x_(0))+(y_(1))/(y_(0))=-1

The area of the triangle formed by the tangent and the normal at the points (a,a) on the curve y^2=x^3/(2a-x) and the line x=2a is

Tangent at a point P_(1) (other than (0,0) on the curve y=x^(3) meets the curve again at P_(2) . The tangent at P_(2) meets the cure again at P_(3) and so on. Shwo that the abseissae of P_(1),P_(2)':..... P_(n) form a G.P. also find the ratio {area (DeltaP_(1)P_(2)P_(3))//"area" (DeltaP_(2)P_(3)P_(4))

At the point (2,3) on the curve y = x^(3) - 2x + 1 , the gradient of the curve increases

IF the tangent at a point on the curve x^(2//3)+y^(2//3)=a^(2//3) intersects the coordinate axes in A and B then show that the length AB is a constant.

At the point (2, 5) on the curve y=x^3-2x+1 the gradient of the curve is increasing