The point of inflection of the curve `y=(x-1)^(3)` is

The point of inflection of the curve y = x^(4) is at:

The point of inflexion for the curve y = x^(3) - 3x+1 is :

Find the coordinates of the point of inflection of the curve f(x) =e^(-x^(2))

If x_(0) is the x - coordinate of the point of inflection of a curve y=f(x) then (second derivative exists) ………….. .

The point of intersection of the curves y^(2) = 4x and the line y = x is

Find the intervals of concavity and the points of inflection of the function. y=12x^(2)-2x^(3)-x^(4)

Consider the curves y^(2) = x and x^(2) = y . (i) Find the points of intersection of these two curves. (ii) Find the area between these two curves.

Consider the curve y = x^(2) and the straight line y = 2x + 3 . (i) Find the points of intersection of the given curve and the straight line. (ii) Find the area of the region bounded by the given curve and the straight line.

Determine the intervals of concavity of the curve f(x)=(x-1)^(3)(x-5),x in R and , points of inflection if any