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

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 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.
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.

Respuesta :

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

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.

What is a translation?

A translation is represented by a change in the function graph, according to operations such as multiplication or sum/subtraction in it's definition.

A reflection over the y-axis is defined by the following rule:

(x,y) -> (-x,y).

Which is equivalent to plotting a line parallel to the y-axis = perpendicular to the x-axis, determining the distance from A to the y-axis along the line, and find a new point on the other side that is equidistant from the y-axis.

More can be learned about translation concepts at https://brainly.com/question/4521517

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