It is (-3, 5).
What is the value of x, to the nearest degree? 1 point Captionless Image
It can be but in general a reflection in a line produces a 'mirror image'
It will have moved 180 degrees and it will be up side down
Reflections are congruence transformations where the figure is reflected over the x-axis, y-axis, or over a line.
The answer will depend on the original coordinates of A: these have not been provided so neither has an answer.
What is the value of x, to the nearest degree? 1 point Captionless Image
It is (-3, 5).
It can be but in general a reflection in a line produces a 'mirror image'
To rotate a shape using reflection, you would typically mirror the shape across a line (such as the x-axis, y-axis, or a custom line). The reflection operation then creates the rotated shape as a mirror image of the original shape.
In transformations a reflection across the x axis produces a mirror image
It is reflection in the line y = x.
A line which is the reflection of the original in y = x.
To determine the image of triangle LMN after a translation of 5 units to the left and a reflection over the line y = x, first, translate each vertex of the triangle 5 units left. For example, if point L is at (x, y), it will move to (x - 5, y). Then, reflect the new coordinates over the line y = x, which involves swapping the x and y coordinates for each vertex. The final coordinates will represent the new position of triangle LMN after both transformations.
To find the reflection of point P(-1, 6) across the line y = x, you swap the x and y coordinates of the point. Therefore, the reflection of P(-1, 6) is P'(6, -1).
a reflection across the line y=x
Each reflection produces a mirror image.=================================Answer #2:With the initial point at (0, 0) ... the origin of coordinates ...-- the first reflection, across x = -3, moves the point to (-6, 0), and-- the second reflection, around y = -3, moves it to (-6, -6) .
A reflection in a graph occurs when a shape or figure is flipped over a specified line, creating a mirror image. Common lines of reflection include the x-axis, y-axis, or any line defined by a specific equation. This transformation maintains the shape and size of the figure but alters its orientation. For example, reflecting a point across the y-axis changes its x-coordinate to its negative while keeping the y-coordinate the same.