Final answer:
To find two solutions to the inequality 4x - y <= 2 and y > -2, we can choose different values for x and y and plug them into the inequality to check if they satisfy the conditions. One solution is (0, 0). Another solution we can try is (1, -1), but it does not satisfy the inequality.
Step-by-step explanation:
To find two ordered pairs that satisfy the inequality 4x - y <= 2 and y > -2, we can choose any two values for x and y that satisfy the given conditions. Let's choose x = 0 and y = 0 as one solution. Plugging these values into the inequality, we get 4(0) - 0 <= 2, which is true. Therefore, the ordered pair (0, 0) is a solution.
Now, let's choose x = 1 and y = -1 as another solution. Substituting these values into the inequality, we have 4(1) - (-1) <= 2, which simplifies to 5 <= 2. This inequality is false, so (1, -1) is not a solution to the inequality.