3 x^2 − 18x + 24 = 03(x ² − 6x + 8) = 03(x − 4)(x − 2) = 0x = 2, 4Plug x = 2 and x = 4 into the original equation to find the y-coordinates of the critical points.
When x = 2, y = 10When x = 4, y = 6Thus, we have critical points at (2, 10) and (4, 6).
In our third step, the second derivative indicates any points of inflection.
= 6x − 18This equals zero at x = 3.
Next, plug x = 3 into the original equation to find the y-coordinates of the point of inflection, which is at
(3, 8). Plug the critical values into the second derivative to determine whether each is a maximum or a
minimum.
6(2) − 18 = −6This is negative, so the curve has a maximum at (2, 10), and the curve is concave down there.
6(4) − 18 = 6This is positive, so the curve has a minimum at (4, 6), and the curve is concave up there.
It’s graph-plotting time.