1.7 What if it is Rotated? Pg. 28 Rigid Transformations:
Rotations 1.7 What if it is Rotated?_ Rigid Transformations:
Rotations Today you will learn more about reflections and learn
about two new types of transformations: rotations. 1.34 TWO
REFLECTIONS WITH NONPARALLEL LINES After the previous lesson, your
teammate asks, What if the lines of reflection are not parallel? Is
the result still a translation? Find EFG and lines v and w below.
a. First visualize the result when EFG is reflected over v to form
and then is reflected over w to form Do you think it will be
another translation? b. Draw the resulting reflections below. Is
the final image a translation of the original triangle? If not,
describe the result. turned c. Amanda noticed that when the
reflecting lines are not parallel, the original shape is rotated,
or turned, to get the new image. For example, the diagram at right
shows the result when an ice cream cone is rotated about a point.
In part (a), the center of rotation is at point P, the point of
intersection of the lines of reflection. Use a piece of tracing
paper to test that can be obtained by rotating about point P. To do
this, apply pressure on P so that the tracing paper can rotate
about this point. Then turn your tracing paper until rests atop
Geogebra Rotations 1.35 ROTATIONS ON A GRID Consider what you know
about rotation, a motion that turns a shape about a point. Does it
make any difference if a rotation is clockwise ( ) versus
counterclockwise ( )? If so, when does it matter? Are there any
circumstances when it does not matter? And are there any situations
when the rotated image lies exactly on the original shape?
Investigate these questions as you rotate the shapes below about
the given point below. Use tracing paper if needed. Be prepared to
share your answers to the questions posed above. 1.36 ROTATION
SYMMETRY In problem 1.48, you learned that many shapes have
reflection symmetry. These shapes remain unaffected when they are
reflected across a line of symmetry. However, some shapes remain
unchanged when rotated about a point. a. Examine the shape at
right. Can this shape be rotated so that its image has the same
position and orientation as the original shape? Trace this shape on
tracing paper and test your conclusion. If it is possible, where is
the point of rotation? b. Jessica claims that she can rotate all
shapes in such a way that they will not change. How does she do it?
She rotates it a full circle of 360 c. Since all shapes can be
rotated in a full circle without change, that is not a very special
quality. However, the shape in part (a) above was special because
it could be rotated less than a full circle and still remain
unchanged. A shape with this quality is said to have rotation
symmetry. But what shapes have rotation symmetry? Examine the
shapes below and identify those that have rotation symmetry.
