The coordinates of the point on the curve `x^(3)=y(x-a)^(2)` where the ordinate is minimum is

If (u,v) are the coordinates of the point on the curve x^(3) =y (x-4)^(2) where the ordinate is minimum then uv is equal to

Find the coordinates of the point on the curve y=x^(2)3x+2 where the tangent is perpendicular to the straight line y=x

The coordinates of the point on the curve (x^(2)+1)(y-3)=x where a tangent to the greatest slope are given by

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

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

Find the coordinates of the point on the curve y=x^2 – 3x + 2 where the tangent is perpendicular to the straight line y = x

The coordinates of the point on the curve (x^(2)+ 1) (y-3)=x where a tangent to the curve has the greatest slope are given by

Find the co-ordinates of the point on curve y=(x^(2)-1)/(x^(2)+1),(x>0) where the gradient of the tangent to the curve is maximum.

Find the coordinates of the point on the curve, y= (x^(2)-1)/(x^(2) + 1) (x gt 0) where the gradient of the tangent to the curve is maximum

The co-ordinates of the point of the curve y=x-(4)/(x) , where the tangent is parallel to the line y=2x is