To determine which two ordered pairs are solutions to the system of linear inequalities, you need to have the specific inequalities provided. However, since you have not provided the inequalities, I cannot directly assess which points satisfy them.

I can guide you through the process of checking if the ordered pairs are solutions:

1. Identify the inequalities: Write down the inequalities in the system.
2. Test the ordered pairs: For each ordered pair (x, y), substitute the values into the inequalities and determine if they satisfy each inequality.

For example, if the inequalities were:

1. \(y < 2x + 1\)
2. \(y > -x - 2\)

You would check each point as follows:

• For (1, 3):
  • Substitute into the inequalities to see if they hold true.
• For (5, 0):
  • Do the same.
• For (0, -2):
  • Check against the inequalities.
• For (6, -2):
  • Likewise.

After checking each point, you would select the pairs that satisfy all inequalities in the system.

If you provide the specific linear inequalities, I can help you check which ordered pairs are solutions.