When reflecting a right triangle over a line that is not an axis, how can you make sure you have found the correct coordinates for the new image?(1 point)

Question

When reflecting a right triangle over a line that is not an axis, how can you make sure you have found the correct coordinates for the new image?(1 point)
Responses

Both the x
- and y
-coordinates will change to their opposites.
Both the x - and y -coordinates will change to their opposites.

Every x
-coordinate will change to its opposite.
Every x -coordinate will change to its opposite.

Every y
-coordinate will change to its opposite.
Every y -coordinate will change to its opposite.

Every point on the new image will be the same distance from the line of reflection as the original triangle.
Every point on the new image will be the same distance from the line of reflection as the original triangle.
Remaining Attempts : 3

GPT-4o mini · Answer

The correct response is: **Every point on the new image will be the same distance from the line of reflection as the original triangle.** This statement accurately reflects the geometric principle that when an object is reflected over a line, each point on the object is mapped to a point on the opposite side of the line such that the distance to the line is preserved.