Question

Since I can't view images, I can't directly see the graph you are referring to. However, I can help you determine the correct solution set based on the inequalities provided.

1. **m≥10 or m≤9** means that m can be equal to 10 or greater or it can be equal to 9 or less. This would typically be represented by shading everything above and including 10, and everything below and including 9 on the number line.

2. **m>10 or m<9** means that m is greater than 10 or less than 9. This would show an open interval, where points above 10 and points below 9 are shaded, but not including the boundaries.

3. **m>10 and m<9** is impossible since a number cannot be greater than 10 and less than 9 at the same time. Therefore, this option cannot be true.

4. **m≥10 and m≤9** is also impossible for the same reason; a number cannot be both at once.

If the graph shown indicates values of m that are above or equal to 10 or below or equal to 9, the correct choice would be the first option: **m≥10 or m≤9**.

Please check the graph against these descriptions to identify the correct solution set.

Based on your description of the graph, where the region includes 9 and continues to the left (indicating \( m \leq 9 \)) and includes 10 and continues to the right (indicating \( m \geq 10 \)), the correct interpretation of the solution set would be that it includes values that are either less than or equal to 9 or greater than or equal to 10.

So, the correct answer is:

**m ≥ 10 or m ≤ 9**

This means that the solution encompasses values in those ranges as represented in the graph.