how can a regular hexagon be folded to show that it has reflectional symmetry? fold the hexagon along a line from a vertex to the midpoint of an opposite side. fold the hexagon along a line connecting the two midpoints of adjacent sides. fold the hexagon along a line that bisects two vertex angles. fold the hexagon along a line that creates a right angle at a vertex.

Folding a regular hexagon along a line that bisects two vertex angles (these angles will be opposite each other) will display reflectional symmetry.

Another option is to fold it along a line that connects the midpoints of opposite sides.

Any shape that can be separated into two matching segments by a single line has reflectional symmetry.

Answer Link

AFOKE88 AFOKE88 · Answer 2 · 2022-03-03T11:30:43+01:00

The way in which a regular hexagon be folded to show that it has reflectional symmetry is; C: fold the hexagon along a line that bisects two vertex angles.

How to carry out Reflectional Symmetry?

Reflectional Symmetry occurs when a line is drawn to divide a shape in halves so that each half is a reflection of the other.

Now, for a hexagon, this reflectional symmetry can be achieved by folding the hexagon along a line that bisects two vertex angles.

Read more about reflectional symmetry at; https://brainly.com/question/16956844