Final answer:
Without the specific system of linear equations, we cannot verify the truth of the statements about the ordered pair (2, 3). To check, one would substitute '2' for 'x' and '3' for 'y' into the given equations.
Step-by-step explanation:
To determine the truth of the statements about the ordered pair (2, 3) in relation to a system of linear equations, we need to substitute the values into the given equations and check for their validity. We do not, however, have the specific system of equations in the question, so we cannot directly evaluate the statements. To approach a similar question effectively, you would typically substitute '2' for 'x' and '3' for 'y' in each of the equations given in the system to see if they create true statements. If both equations are satisfied with these values, then the ordered pair is indeed a solution to the system.
Without the exact system, the statements cannot be verified; thus, no conclusion can be made about whether the ordered pair is a solution to the system, or whether it satisfies the first or second equation.