Translate the line segment with endpoints (0, 0) and (5, 4) up 3 units and left 2 units. What are the new endpoints?(1 point)The new endpoint for (0, 0) is: ().The new endpoint for (5, 4) is: ().

The new endpoint for (0, 0) is: (-2, 3).
The new endpoint for (5, 4) is: (3, 7).

A line contains the points (−4, 2) and (−4, 6) . The line is translated 3 units to the right and 2 units down. What are the new points on the translated line?(1 point)
The new point for (−4, 2) is: ().
The new point for (−4, 6) is: ().

The new point for (-4, 2) is: (-1, 0).
The new point for (-4, 6) is: (-1, 4).

A line segment is translated 3 units down and 1 unit to the left. One of the endpoints after the translation is (5, 8) . What was this point before the translation?(1 point) ()

To find the original point before the translation, we need to reverse the translation by moving 3 units up and 1 unit to the right.

So, the original point before the translation is: (6, 11).

Reflect the point (13, 8) across the y -axis. What is the result?(1 point)

To reflect a point across the y-axis, we keep the x-coordinate the same and change the sign of the y-coordinate.

So, the result of reflecting the point (13, 8) across the y-axis is: (-13, 8).

Reflect the endpoint of a line segment (−5, 10) across the x -axis. What is the result?(1 point)

To reflect a point across the x-axis, we keep the y-coordinate the same and change the sign of the x-coordinate.

So, the result of reflecting the point (-5, 10) across the x-axis is: (-5, -10).