The normal to curve `xy=4` at the point `(1, 4)` meets curve again at :

The equation of the tangent to the curve y=a+bx+cx^(2) where it meets the y-axis is 2x+y=3 if the normal to the curve at the same point meets the curve again at a point whose abscissa is,(5)/(2), then find a,b and c

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 to the rectangular hyperbola xy=4 at the point t_(1), meets the curve again at the point t_(2) Then the value of t_(1)^(2)t_(2) is

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 normal to the rectangular hyperbola xy = 4 at the point (2t, (2)/(t_(1))) meets the curve again at (2t_(2), (2)/(t_(2))) , then

The normal to the parabola y^(2)=8ax at the point (2, 4) meets the parabola again at the point

If the normal at point 't' of the curve xy = c^(2) meets the curve again at point 't'_(1) , then prove that t^(3)* t_(1) =- 1 .

The normal drawn on the curve xy=12 at point (3t,(4)/(t)) cut the curve again at a point having parameter point t, then prove that t_(1)=-(16)/(9t^(3))

The normal to the curve x^(2)=4y passing (1, 2) is :

Find the equation of the normal to the curve x^(3)+y^(3)=8xy at the point where it meets the curve y^(2)=4x other than the origin.