all characteristics
true
No, that statement is not true. Reflectional symmetry refers to a design that is identical on both sides of a central line, meaning it can be folded along that line and the two halves will match. The quality of maintaining characteristics when rotated about a point describes rotational symmetry, not reflectional symmetry.
Actually, reflectional symmetry refers to a design's ability to be divided into two identical halves that are mirror images of each other along a line of symmetry. It does not involve rotation; instead, it is about flipping the design over the line. For a shape to exhibit reflectional symmetry, one side must be a mirror image of the other side.
t
No. Objects can have reflective symmetry but no rotational symmetry.
Axial symmetry.
False
All characteristics
Reflectional symmetry
True APEX
Reflectional symmetry
False.
true
Actually, reflectional symmetry refers to a design's ability to be divided into two identical halves that are mirror images of each other along a line of symmetry. It does not involve rotation; instead, it is about flipping the design over the line. For a shape to exhibit reflectional symmetry, one side must be a mirror image of the other side.
t
false
true
No. Objects can have reflective symmetry but no rotational symmetry.