I'm sorry, but I cannot view images or graphs. However, I can help you understand how to interpret inequalities on a graph.
If you have a graph with shading and boundary lines, the solution set will be based on the regions that are shaded.
- If the line is dashed, it means the inequality does not include that boundary (e.g., \( x < 3 \) or \( x > 5 \)).
- If the line is solid, it means the inequality includes that boundary (e.g., \( x \leq 3 \) or \( x \geq 5 \)).
Look for the shaded areas:
- If the shaded area is to the left of a certain \( x \)-value, the inequality might be \( x < \text{value} \).
- If the shaded area is to the right, it could be \( x > \text{value} \).
You might end up with solutions like \( x < a \) or \( x > b \).
Feel free to describe the graph or the inequalities, and I can help you further!
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