Symmetry
10-15
When figures can be reflected or rotated and the result is
the original figure, these figures have symmetry.Study these examples.The word has reflection
symmetry.The number has rotational
(180°) symmetry and point
symmetry.The figure has reflection,
rotational, and point
symmetry.Reflection Symmetry Rotational Symmetry Point SymmetryTypes of SymmetryA figure has reflection
symmetry if a line, called a
line of symmetry, can be
drawn through the figure
so that the part of the
figure on one side of the
line is the mirror image of
the part on the other side.A figure has rotational
symmetry if the figure
coincides with itself when
rotated in either direction
n°, where nis less than a
full turn (n360°), about
a fixed point.A figure has point
symmetry if there is a
central point so that the
part of the figure on one
side of the central point is
the reflection of the part
on the other side.
180°-rotational symmetry
is also point symmetry.horizontal
line of
symmetryvertical
line of
symmetryvertical, horizontal,
and diagonal
lines of symmetrydiagonal
line of
symmetryT T OO I96I
72 °( -turn)
rotational symmetry1
572 ° 72 °72 ° 72 °72 °120 °( -turn)
rotational symmetry1
3120 °120 ° 120 °8206-2_358-359 10/7/07 11:59 AM Page 358