When a line is reflected over the Y-axis, the x-coordinates of all points on the line change sign, while the y-coordinates remain the same. For example, a point (x, y) would become (-x, y) after reflection. This transformation effectively flips the line horizontally, maintaining its slope but altering its position in the Cartesian plane.
me no no
When a point is reflected over the y-axis, the x-coordinate changes its sign while the y-coordinate remains the same. For example, if a point has the coordinates (x, y), after reflection over the y-axis, its new coordinates will be (-x, y). This transformation effectively mirrors the point across the y-axis.
A maximum!A maximum!A maximum!A maximum!
It indicates a line such that a shape can be reflected over than line such that the image is similar to the original.
h,c
It is the axis of reflection.
Reflections are congruence transformations where the figure is reflected over the x-axis, y-axis, or over a line.
It will be where it was, to start with.
The point (5,3) is reflected to (-5, 3)
me no no
.
i think -6,3
You change the value of y to -y. ex: (4,5) reflected over the x-axis is (4,-5)
-1,3
ok is me my name is shaker ok
Axial reflection is a type of transformation in geometry where a figure is reflected over an axis. The axis of reflection is a line that remains fixed while the rest of the figure is mirrored across it. This transformation preserves the size and shape of the figure.
imagine there is a grid and you look at it and look at the cordentise and then you find the answer that you were looking for