Question

To provide you with the solution set represented in a specific graph, I would need to see the graph or have a description of it. The solution set can vary based on the type of graph (e.g., linear, quadratic, inequalities, etc.), the regions shaded (if any), and any specific features indicated in the graph, such as intersection points, lines, curves, etc.

If you can describe the graph, the equations involved, or the context of the problem, I'd be happy to help you determine the solution set!

Based on your description, it sounds like you are referring to a graph on a number line or x-axis that ranges from \(-5\) to \(5\) and has a point (dot) at the coordinates \((0, 5)\). However, it's a bit unclear what the dot represents.

To clarify and provide an accurate solution set, we need to consider a few possibilities:

1. **If the dot at \(0\) (on the x-axis) is a solid dot**, it typically means that \(0\) is included in the solution set. For example, if the graph represents the inequality or function \(y \leq 5\), then the solution set could include all \(x\) values from \(-5\) to \(5\).

2. **If the dot at \(0\) is an open dot**, it generally signifies that \(0\) is not included in the solution set. In such a case, if the graph represented some inequality or condition like \(x > 0\), the solution set would consist of values greater than \(0\) but less than or equal to \(5\).

3. **If the graph includes shading or indications of regions**, it could imply further conditions on the values of \(x\).

### Summary:
- If \(y \leq 5\) and \(x\) is from \(-5\) to \(5\), the solution set could be \([-5, 5]\).
- If \(x > 0\) and \(x\) is restricted to the range up to \(5\) (with an open dot), the solution set could be \( (0, 5] \).

Please provide more details on the nature of the dot, any shading, or specific inequalities being represented, so that I can help you identify the exact solution set!

Thank you for the clarification! If the graph has a dot at \(0\) to \(5\) without shading and considering that there's no additional context provided, here’s how we can interpret it:

1. **Assuming the dot represents a point:**
- If it's a solid dot (or a filled circle), this usually signifies that the value at \(x = 0\) is included in the solution set.
- If it's an open dot (or a hollow circle), it implies that the value at \(x = 0\) is **not** included in the solution set.

2. **Range of x values:**
- Given that you're suggesting the range is from \(-5\) to \(5\), it sounds like the x-values are being limited to this range.

### Possible Interpretation:

- **If the dot is solid at (0, 5):**
- The solution set could be all values of \(x\) from \(-5\) to \(5\) including \(0\), which can be represented as:
\[
[-5, 5]
\]

- **If the dot is open at (0, 5):**
- The solution set would include all \(x\) values between \(-5\) and \(5\), but **not** include \(0\), which can be represented as:
\[
[-5, 0) \cup (0, 5]
\]

In conclusion, the exact solution set depends on whether the dot is solid or open and how the context of the problem is represented. If you can clarify those aspects, I can provide a more definitive answer!

The product of \(72\) and \(75\) is calculated as follows:

\[
72 \times 75 = 5400
\]

So, \(72 \times 75 = 5400\).