What are the extrema of $f (x) = x^{3} - 2 x + 5$ $f(x)=x^3-2x+5$ on #[-2,2]?

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Answer 1 · 2016-02-04T12:53:04

Minimum: $f (- 2) = 1$ $f(-2)=1$
Maximum: $f (+ 2) = 9$ $f(+2)=9$

Steps:

Evaluate the endpoints of the given Domain

$f (- 2) = {(- 2)}^{3} - 2 (- 2) + 5 = - 8 + 4 + 5 = 1$ $f(-2)=(-2)^3-2(-2)+5 = -8+4+5=color(red)(1)$
$f (+ 2) = 2^{3} - 2 (2) + 5 = 8 - 4 + 5 = 9$ $f(+2)=2^3-2(2)+5 =8-4+5 = color(red)(9)$
Evaluate the function at any critical points within the Domain.

To do this find the point(s) within the Domain where $f'(x)=0$
$f'(x)=3x^2-2=0$
$rarrx^2=2/3$
$rarr x=sqrt(2/3)" or "x=-sqrt(2/3)$
$f(sqrt(2/3))~~color(red)(3.9)$ (and, no, I didn't figure this out by hand)
$f(-sqrt(2/3))~color(red)(~6.1)$

Minimum of ${color(red)(1, 9, 3.9, 6.1)} =1$ at $x=-2$
Maximum of ${color(red)(1,9,3.9,6.1)}=9$ at $x=+2$

Here is the graph for verification purposes:
graph{x^3-2x+5 [-6.084, 6.4, 1.095, 7.335]}

What are the extrema of f(x)=x^3-2x+5 f(x)=x3−2x+5f(x)=x^3-2x+5 on #[-2,2]?