The abscissa of the point on the curve `ay^2 = x^3`, the normal at which cuts off equal intercepts from the coordinate axes is

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

The abscissa of a point on the curve xy=(a+x)^(2), the normal which cuts off numerically equal intercepts from the coordinate axes,is -(1)/(sqrt(2)) (b) sqrt(2)a( c) (a)/(sqrt(2))(d)-sqrt(2)a

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 co–ordinates.

The point on the curve y^(2) = 4ax at which the normal makes equal intercepts on the coordinate axes is

Find the point on the curve 9y^(2)=x^(3), where the normal to the curve makes equal intercepts on the axes.

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

Slope of a line which cuts off intercepts of equal lengths on the axes is

If (a,b) be the point on the curve 9y ^(2)=x ^(3) where normal to the curve make equal intercepts with the axis, then the value of (a+b) is: