Locate all maximum points, minimum points and points of inflexion of y=x^4 .
y’ = 0 at x = 0. Also y” = 0 at x = 0 and so the second-derivative test is of no help in determining the position of maximum and minimum points. We return to examine y’ on both sides of x = 0. To the left of x = 0, y’ < 0; to the right y’ > 0 and so x = 0 is a minimum point. Figure 12.12 illustrates this. Note that at the point x = 0, the second derivative y” is zero. However, y” is positive both to the left and to the right of x = 0; thus x = 0 is not a point of inflexion.