At what point on the curve `x^(3) - 8a^(2) y= 0` the slope of the normal is `-2//3` ?

The normal to the curve x^(2)+2xy-3y^(2)=0, at (1,1)

The normal to the curve x^2 +2xy-3 y^2 = 0 at (1, 1)

Let P be any point on the curve x^(2//3)+y^(2//3)=a^(2//3). Then the length of the segment of the tangent between the coordinate axes in of length

At what points on the curve y=2/3(x^3) + 1/2(x^2) , tangents make equal angles with the co-ordinate axes ?

The abscisssa of the points of the curve y=x^3 in the interval [-2,2], where the slope of the tangents can be obtained by mean value theorem for the interval [-2,2] , are

Co-ordinates of a point on the curve y=x log s at which at normal is parallel to the line 2x-2y=3 are

The point of the curve y^(2)=2(x-3) at which the normal is parallel to the line y-2x+1=0 is