Which ordered pair is NOT a solution to the inequality in the graph?
(0, 0)
(0, 2)
(-2, -4)
(-3, 4)
Which ordered pair is NOT a solution to the inequality in the graph?
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To determine which ordered pair is NOT a solution to the inequality represented in the graph, we need to identify whether each point lies within the shaded region of the graph (the solution set).
1. (0, 0): Check if this point satisfies the inequality. If it’s within the shaded area, it’s a solution.
2. (0, 2): Repeat the check for this point.
3. (-2, -4): Again, check if this point lies within the shaded region.
4. (-3, 4): Lastly, see if this point is included in the shaded area.
The point that does NOT satisfy the inequality will be the one that lies outside this shaded region.
Based on typical inequalities, generally, if the graph shows a line with a dashed line indicating “greater than” or “less than,” points on or above/below the line are solutions.
After checking each point, you will find that (-2, -4) or (-3, 4) could be outside the indicated area.
If you can reveal more specifics of the graph (like the inequality type), we can confirm which point is definitely NOT a solution.
Please confirm the graph details or check the points in the shaded region to identify the correct answer! For more help, don’t hesitate to check extended services.