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

If the tangent to the curve 4x^(3)=27y^(2) at the point (3,2) meets the curve again at the point (a,b) . Then |a|+|b| is equal to -

Show that normal to the parabols y^2=8x at the point (2,4) meets it again at (18.-12) . Find also the length of the normal chord.

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 parabola y^(2)=8x at the point (2, 4) meets the parabola again at eh point

The normal to the rectangular hyperbola xy = 4 at the point t_1 meets the curve again at the point t_2 Then

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

The equation of the normal to the curve y=e^(-2|x|) at the point where the curve cuts the line x = 1//2 is

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

The normal to a given curve at each point (x ,y) on the curve passes through the point (3,0)dot If the curve contains the point (3,4), find its equation.