\"\"

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The graph of the inequality \"\" is the shaded region and boundary of the inequality is \"\". To graph the boundary,First find the minimum point of the graph.

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Since absolute value function can not be negative, the minimum point of the

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graph is where \"\".

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\"\"

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The original function is \"\" 

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Set original function \"\"

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 \"\"           

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\"\"                       

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\"\"                                      (Subtract: \"\")

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\"\"                        (Add 3 to each side)

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\"\"                                            (Simplify) \"\"

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Next make at table, fill out the table with values for x > 3 and  x < 3. 

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\ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \
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f(x) = |x–1|–2

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x

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 f(x)

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1

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0 \ \

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2

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1 \ \

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4 \ \

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1

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5 \ \

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 2

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\ \
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\"\"

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To draw inequality \"\" follow the steps.

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1.   Draw a coordinate plane.

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2.  Plot the points.

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3.  Since inequality \"\" symbol is \"\", the boundary is included in the solution set. Graph the boundary of the inequality \"\" with a dark line.

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4.  To determine which half-plane to be shaded use a test point in either half-plane. A simple choice is \"\".

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Substitute x = 0 and y = 0 in original inequality \"\".

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\"\"

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The statement is true.

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4.  Since the statement is true, shade the region that contains point \"\".

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\"absolute

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\"\"

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Inequality \"\" graph is

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\"absolute