Question

Which statement accurately describes how to reflect point A (3, −1) over the y-axis?

Question 6 options:

Construct a line from A parallel to the x-axis, determine the distance from A to the x-axis along this parallel line, find a new point on the other side of the x-axis that is equidistant from the x-axis.


Construct a line from A perpendicular to the y-axis, determine the distance from A to the y-axis along this perpendicular line, find a new point on the other side of the y-axis that is equidistant from the y-axis.


Construct a line from A perpendicular to the x-axis, determine the distance from A to the x-axis along this perpendicular line, find a new point on the other side of the x-axis that is equidistant from the x-axis.


Construct a line from A parallel to the y-axis, determine the distance from A to the y-axis along this parallel line, find a new point on the other side of the y-axis that is equidistant from the y-axis as A is.

Answer 1

The statement that accurately describes how to reflect point A (3, -1) over the y-axis is:

Construct a line from A perpendicular to the y-axis, determine the distance from A to the y-axis along this perpendicular line, find a new point on the other side of the y-axis that is equidistant from the y-axis.

When reflecting a point over the y-axis, you draw a perpendicular line from the point to the y-axis. Then, you determine the distance from the point to the y-axis along this perpendicular line. Finally, you locate a new point on the other side of the y-axis that is equidistant from the y-axis as the original point A.

Answer 2

The third option correctly describes how to reflect point A (3, −1) over the y-axis:

Construct a line from A perpendicular to the x-axis, determine the distance from A to the x-axis along this perpendicular line, find a new point on the other side of the x-axis that is equidistant from the x-axis.

Step-by-step explanation: