A line contains the points (6,−3) and (3, 1). When this line is reflected across the y-axis, what are the two new points?(1 point)
To reflect a point across the y-axis, we simply change the sign of the x-coordinate while keeping the y-coordinate the same.
For the first point (6, -3), the reflected point would have the x-coordinate flipped in sign to -6, while the y-coordinate remains the same: (-6, -3).
For the second point (3, 1), the reflected point would have the x-coordinate flipped in sign to -3, while the y-coordinate remains the same: (-3, 1).
So the two new points after reflecting across the y-axis are (-6, -3) and (-3, 1).
To reflect a point across the y-axis, we need to change the sign of the x-coordinate and keep the y-coordinate the same.
Given the two points (6, -3) and (3, 1), reflecting them across the y-axis would result in:
- The x-coordinate of the first point changes its sign, so it becomes (-6, -3).
- The x-coordinate of the second point changes its sign, so it becomes (-3, 1).
Therefore, the two new points after reflecting the line across the y-axis are (-6, -3) and (-3, 1).