What general statement can you use to determine the ordered pairs of the vertices of a figure if it is reflected across the y-axis?

A.If a figure is reflected across the y-axis, the x-coordinates of the vertices in the reflection will be the same as those in the original figure and the y-coordinates of the vertices in the reflection will be the opposite of those in the original figure.
B.If a figure is reflected across the y-axis, the x-coordinates of the vertices in the reflection will be the opposite of those in the original figure and the y-coordinates of the vertices in the reflection will be the same as those in the original figure.
C.If a figure is reflected across the y-axis, the x-coordinates of the vertices in the reflection will be the opposite of those in the original figure and the y-coordinates of the vertices in the reflection will also be the opposite as those in the original figure.

I'm responding a whole year later to tell you that it's B

what is it tho

A. If a figure is reflected across the y-axis, the x-coordinates of the vertices in the reflection will be the same as those in the original figure and the y-coordinates of the vertices in the reflection will be the opposite of those in the original figure. So basically, everything gets turned upside down like my sleep schedule during a full moon!

The correct answer is B. If a figure is reflected across the y-axis, the x-coordinates of the vertices in the reflection will be the opposite of those in the original figure, and the y-coordinates of the vertices in the reflection will be the same as those in the original figure.

To determine the ordered pairs of the vertices of a figure that is reflected across the y-axis, you need to understand the concept of reflection. Reflection is a transformation in which every point of the original figure is mapped to a corresponding point on the opposite side of the axis of reflection.

When a figure is reflected across the y-axis, the x-coordinate of each point is negated (changed in sign), while the y-coordinate remains the same. This means that if a point in the original figure has coordinates (x, y), its corresponding point in the reflection will have coordinates (-x, y). Thus, the x-coordinates of the vertices in the reflection will be the opposite (negated) of those in the original figure, and the y-coordinates will be the same as those in the original figure.

Therefore, the correct general statement to determine the ordered pairs of the vertices of a figure reflected across the y-axis is: "If a figure is reflected across the y-axis, the x-coordinates of the vertices in the reflection will be the opposite of those in the original figure, and the y-coordinates of the vertices in the reflection will be the same as those in the original figure."