Which symmetry allows a figure to have multiple lines where it can be reflected to produce the same figure?

Line symmetry, also known as reflectional symmetry, occurs when a figure can be divided by a line into two mirror-image halves. This means that for every point on one side of the line, there is a corresponding point on the other side at an equal distance from the line. The presence of multiple lines of symmetry indicates that the figure can be reflected across any of these lines and still appear unchanged.

For instance, a regular polygon, like a square or an equilateral triangle, can be reflected across more than one line that goes through its vertices or midpoints and produces the same figure. In contrast, point symmetry involves rotating a figure around a central point, while rotational symmetry involves turning a figure about a point by a certain angle and still producing the same appearance. Translational symmetry relates to moving a figure along a direction and repeating it. Thus, while these other types of symmetry have their unique characteristics, only line symmetry encompasses the ability to have multiple reflection lines that yield congruent figures.