CPM Homework Help : CALC Problem 5-132

For each part below, what can you conclude (if anything) about $f(x)$ if you know the given information below? (Note: Each part is separate.)

$f^\prime(−2) = 0$ and $f^{\prime\prime}(−2) > 0$ .
Hint 1(a):
This is a justification about whether $f(x)$ has a local max or a local min at $x = −2$ . But which one?
Hint 2(a):
2nd Derivative Test.
$f^\prime(x) < 0$ when $x > 3$ , $f^\prime(x) > 0$ when $x < 3$ , and $f^\prime(3) = 0$ .
Hint 1(b):
This is a justification about whether $f(x)$ has a local max or a local min at $x = 3$ . But which one?
Hint 2(b):
$1$ st Derivative Test.
$f^{\prime\prime}(3) > 0$
Hint 1(c):
Complete the sentence: At $x = 3$ , the $2$ nd derivative is positive so $f(3)$ is ____________________________
Hint 2(c):
Two words.
$f^{\prime\prime}(3) < 0$
Hint (d):
Refer to hint in part (c).
$f^{\prime\prime}(3) = 0$
Answer (e):
There might be a point of inflection on $f(x)$ at $x = 3$ . But we do not know for sure. There are two ways to find out:
1. You could check the $2$ nd-derivative to the left of $x = 3$ . If it changes signs then $f(3)$ is a POI, if not then it's not.
2. You could evaluate the $3$ rd-derivative at $x = 3$ . If it is NOT zero, then $f(3)$ is a POI. If is is zero, then this method is inconclusive.
Since we are not given any extra information, we can only say that $f(3)$ is a CANDIDATE for a point of inflection.
$f(x)$ is continuous at $x = 3$ , but not differentiable there.
Hint (f):
Examples of points of NON-differentiability include: cusps, endpoints, jumps, holes and vertical tangents.
Which of the above attributes still possess continuity?
$f(x)$ is defined and continuous everywhere, and has just one critical point at $x = 2$ , which is a local maximum.
Hint (g):
Condition 1: Either $f^\prime(2) = 0$ or $f^\prime(2)$ does not exist.
Condition 2: Refer to hints in part (a) or part (b).
$f^{\prime\prime}(3)$ does not exist and $f^{\prime\prime}(x) < 0$ for $x < 3$ and $f^{\prime\prime}(x) > 0$ for $x > 3$ .
Hint (h):
Refer to hint in part (e).