Find the abscissa of the point on the curve `x^(3)=ay^(2)`, the normal at which cuts off equal intecepts from the coordinate axes.

Find the abscissa of the point on the curve xy=(c+x)^(2) , the normal at which cuts off numerically equal intercepts from the axes of coordinates.

The abscissa of the point on the curve sqrt(x y)=a+x the tangent at which cuts off equal intercepts from the coordinate axes is (b) a//sqrt(2) (c) -asqrt(2) (d) asqrt(2)

The points on the curve 9y^(2) = x^(3) , where the normal to the curve makes equal intercepts with the axes are

Find the points on the curve y = x^(3) at which the slope of the tangent is equal to the y-coordinate of the point.

Show that the lenght of the portion of the tangent to the curve x^(2/3)+y^(2/3)=a^(2/3) at any point of it, intercept between the coordinate axes is contant.

The coordinates of the point(s) on the graph of the function f(x)=(x^3)/3-(5x^2)/2+7x-4 , where the tangent drawn cuts off intercepts from the coordinate axes which are equal in magnitude but opposite in sign, are (a) (2,8/3) (b) (3,7/2) (c) (1,5/6) (d) none of these

Find the point on the curve y=x^(3) where the slop of the tangent is equal to x-coordinate of the point.

Find the coordinates of the point on the curve y=x/(1+x^2) where the tengent to the curve has the greatest slope .

The normal at the point (1,1) on the curve 2y + x^(2) = 3 is

The sum of the intercepts cut off from the coordinate axes by a variable line is 14 units . Find the locus of the point which divides internally the portion of the line intercepted between the coordinate axes in the ratio 3:4 .