The inequalities are $\"\"$ .

Graph the all of five constraints.

Draw the coordinate plane.

The inequality $\"\"$ .

Graph the line $\"\"$ .

Since the inequality symbol is $\"\"$ the boundary is included the solution set.

Graph the boundary of the inequality $\"\"$ with solid line.

To determine which half plane to be shaded use a test point in either half- plane.

A simple choice is $\"\"$ . Substitute $\"\"$ in original inequality.

$\"\"$

The statement is false.

Since the statement is false, shade the region does not contain point $\"\"$ .

Similarly graph the other inequalities.

The inequality $\"\"$ .

Test point $\"\"$

$\"\"$

Since the statement is true, shade the region contain point $\"\"$ .

The inequality $\"\"$ .

Test point $\"\"$

$\"\"$

Since the statement is true, shade the region contain point $\"\"$ .

The inequality $\"\"$ .

Test point $\"\"$

$\"\"$

Since the statement is true, shade the region contain point $\"\"$ .

The inequality $\"\"$ .

Test point $\"\"$

$\"\"$ .

Since the statement is true, shade the region contain point $\"\"$ .

Graph:

$\"\"$

The feasible area looks like in the graph.

$\"\"$

To find minimum value we need to use corner point theorem.

From the graph the corner points are $\"\"$ .

The function $\"\"$ $\"\"$ .

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The minimum value of $\"\"$ is $\"image\"$ and it occurs at $\"image\"$ .

The minimum value is $\"image\"$ at $\"image\"$ .