Final answer:
The ordered pair (0, -8) cannot be confirmed to satisfy the system of equations given due to typographical errors. To test for satisfaction, substitute the values into both equations and see if the resulting statements are true.
Step-by-step explanation:
Does the ordered pair (0,-8) satisfy the following system of equations? To determine this, we need to check if the pair makes each equation true. Unfortunately, the system of equations provided seems to be incomplete or slightly incorrect, as there are typographical errors that make it unsolvable as it stands.
Generally, to check if an ordered pair satisfies a system of equations, you will substitute the x-value and the y-value from the pair into both equations and see if the equations balance. If the pair satisfies both equations, then it is a solution to the system. For example, if we have the system:
And we want to check if the pair (0, -8) satisfies it, we substitute x with 0 and y with -8 in both equations and check if we obtain true statements:
- 3(0) + (-8) = 4 → 0 - 8 = 4 which is not true.
- 5(0) - 2(-8) = 6 → 0 + 16 = 6 which is also not true.
Therefore, (0, -8) does not satisfy this example system of equations.
Without accurate equations in your original question, we cannot accurately determine if (0,-8) satisfies the system you're referring to. Please provide the correct equations for a precise verification.