What would be the new ordered pairs of reflecting the figure formed by (-1, 5), (-2, 2), (3, 2), and (2, 5)?
To reflect a figure over a line, we need to mirror each point across that line. In this case, let's say the line of reflection is the x-axis.
To reflect a point across the x-axis, we need to keep the x-coordinate the same and change the sign of the y-coordinate. For example, the point (1, 3) reflects to (1, -3) when mirrored across the x-axis.
Now let's apply this concept to each point and find their reflections across the x-axis:
1. For the point (-1, 5), the x-coordinate remains the same, and we change the sign of the y-coordinate. So, it reflects to (-1, -5).
2. For the point (-2, 2), the x-coordinate remains the same, and we change the sign of the y-coordinate. So, it reflects to (-2, -2).
3. For the point (3, 2), the x-coordinate remains the same, and we change the sign of the y-coordinate. So, it reflects to (3, -2).
4. For the point (2, 5), the x-coordinate remains the same, and we change the sign of the y-coordinate. So, it reflects to (2, -5).
Therefore, the new ordered pairs when reflecting the figure formed by (-1, 5), (-2, 2), (3, 2), and (2, 5) across the x-axis would be:
(-1, -5), (-2, -2), (3, -2), and (2, -5).