[tex]\large\mathcal{DIRECTION:}[/tex]
Analyze the properties and complete the inequality.
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[tex]\large\mathcal{ANSWER:}[/tex]
[tex]\begin{gathered}\begin{gathered}\scriptsize\begin{gathered}\begin{array}{|c|c|c|} \hline \tt \sf{Boundary line}& \tt \sf{Shaded region} & \tt \sf{Inequality} \\ \hline \tt \sf{Solid} & \tt \sf{below} & \tt \sf\red {y≤x+2} \\ \hline \tt \sf{Dashed} & \tt \sf{Above} & \tt\sf\red{y>x-3} \\ \hline \tt \sf{Solid} & \tt \sf{above}& \tt \sf\red{y≥x+4} \ \\ \hline \end{array}\end{gathered}\end{gathered} \end{gathered}[/tex]
The graph of a linear inequality in two variables is the graph of all solutions of the inequality.
The boundary line, otherwise known as plane divider, of the inequality divides the coordinate plane into two half-planes.
A shaded region which contains the points that are solutions of the inequality, and an unshaded region which contains the points that are not.
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