Observe the graph :

The function $\"\"$ has a relative maximum at $\"\"$ and relative minimum at $\"\"$ .

It is also appears that $\"\"$ and $\"\"$ , so the conjecture that this function has no absolute extrema.

Support numerically :

Construct the table of values.

Choose $\"\"$ -values on either side of the estimated $\"\"$ -value for each extremum, as well as one very large and one very small value for $\"\"$ .

\ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \

$\"\"$	$\"\"$
$\"\"$	$\"\"$
$\"\"$	$\"\"$
$\"\"$	$\"\"$
$\"\"$	$\"\"$
$\"\"$	$\"\"$
$\"\"$	$\"\"$
$\"\"$	$\"\"$
$\"\"$	$\"\"$

Observe the table :

Because $\"\"$ and $\"\"$ , there is a relative minimum in the interval $\"\"$ . The approximate value of this relative minimum is $\"\"$ .

Because $\"\"$ and $\"\"$ , there is a relative maximum in the interval $\"\"$ .

The approximate value of this relative maximum is $\"\"$ .

$\"\"$ and $\"\"$ , which supports the conjecture that the function has no absolute extrema.

The relative maximum is $\"\"$ and relative minimum is at $\"\"$ .