Pr ob lem
10.1
Topic 10: Dilations
for use before
Kaleidoscopes, Hubcaps, and Mirrors
Investigation 1
A dilation is a transformation of a figure that changes its size but not its
shape. The
scale factor of a dilation determines the extent of the change in
size. A dilation is an enlargement when the scale factor is greater than 1. It
is a reduction a the scale factor is less than 1. When you dilate a figure, you
are either shrinking or enlarging an original figure toward or farther from
another point called the
center of dilation.
The graph shows the dilation of
AOB
to
A’OB’
with the center of
dilation at the origin. The naming of a point like
A’
(ay–prime) signals
that
A’
is the new position of
A
after the transformation.
A. Is
A’OB
’ an enlargement or a reduction of
AOB
?
B. 1. How many times greater is
OA’
than
OA
?
2. How many times greater is
OB’
than
OB
?
3. How many times greater is
A’B’
than
AB
?
4. The scale factor in a dilation measures the comparative size of
linear measures in a figure before and after dilation. What is the
scale factor of this dilation?
5. When you are examining a dilation, what is the least information
you need in order to determine the scale factor?
C. How did the center of dilation change position in the dilation of
AOB
?
D. Draw
LOM
with vertices
L
(0, 4),
O
(0, 0), and
M
(2, 0). Then draw
L’OM’
as a dilation of
LOM
with the center of dilation at (0, 0) and
a scale factor of 1.5.
DD
D
D
DD
2A
B
A?
B?
4
y
O
2
4
x
DD
Pr ob lem
10.2
The graph shows the dilation of figure
KLMN
to
K
?
L
?
M
?
N
? with the center of dilation at
C
(2, 2)
and a scale factor of .
A. Is
K
?
L
?
M
?
N
? an enlargement or a reduction of
KLMN
?
B. 1. What is the ratio of side
K
?
L
? to side
KL
?
2. What is the ratio of the length of
? to the length of
?
3. What does the fact that
and
? lie on the same line suggest
about a strategy for drawing the dilation of a polygon when you
know the scale factor?
C. Make a copy of
KLMN
and draw a reduction with the center of
dilation at (2, 2) and a scale factor of .
Exercises
Identify each as an enlargement or reduction. Name the location of the
center of dilation and give the scale factor.
1.
2.
3.
4.
For a dilation centered at the origin you can
find the location of points on the dilated
image by multiplying the coordinates on the
original image by the scale factor. Use this
technique to draw the dilation of the
quadrilateral. Use a scale factor of
and a center of dilation at (0, 0).
5. a. Draw
ABC
with vertices at (?5, ?1), (1, 3),
and (1, ?1).
b. Dilate
ABC
with a scale factor of and a
center of dilation at (1, 3).
1
D2
D
3
2
?2
2
2
4
y
x
O
R
?
S
?
T
?
R
S
T
2
2
y
x
K
ML
?
L
K
?
24
2
y
O
x
C
C
?
AB
A
?
B
?
3
4
CN
CN
CN
CN
1
4
24
2
4
y
L
?
M
?
x
C
KN
LM
K
?
N
?
?5
5
?5
5
y
x
Topic 10: Dilations
Guided Instruction
Mathematical Goals
• Identify and describe the dilation of a figure on the coordinate plane.
• Apply a dilation to a rectangle, square, or right triangle.
Vocabulary
•
dilation
•
scale factor
•
center of dilation
Materials
•
Labsheet 10ACE
Exercise 4
At a Glance
A dilation is the enlargement or reduction of a figure. The size of the figure
changes but the shape does not, so the original figure and the dilation are
similar.
In a dilation, there are two conditions that determine the location of the
vertices of the dilation. The first is the scale factor. The scale factor
determines if the dilation is larger or smaller than the original. It also
determines how much larger or smaller the dilation will be. The second
condition is the center of rotation. The center of dilation can be any point
on the coordinate plane that is inside, on, or outside the original figure. The
center of dilation determines the location of the dilation in reference to the
original figure.
After Problem 10.1
•
The scale factor in the dilation is 2. What is the scale factor if you start
with the larger triangle and reduce it to the smaller one?
After Problem 10.2
•
How does the center of dilation in this problem differ from the one in
the first problem?
(The first one is located at (0, 0) and this one is at
(2,2).)
You will find additional work on dilations in the grade 7 unit
Stretching
and Shrinking.
(
1
2
)
PACING
1 day
Assignment Guide for Topic 10
Core
1–5
Answers to Topic 10
Problem 10.1
A. 1.
enlargement
B. 1.
2 times
2.
2 times
3.
2 times
4.
2
5.
The ratio of any linear measurement in the
original figure to the corresponding
measurement in the dilated image.
C.
It did not change position.
D.
Problem 10.2
A. 1.
reduction
B. 1.
1:4
2.
1:4
3.
Draw a line from the center of dilation
through a vertex on the polygon. Draw a
line segment in that line with one endpoint
at the center of dilation and with a length
that corresponds to the scale factor. Repeat
for the remaining vertices in the original
polygon. Connect the dilated vertices to
form the dilation of the original polygon.
C.
Exercises
1.
Enlargement, (0, 0), scale factor of 2
2.
Reduction, (–1, –2), scale factor of
3.
Enlargement, (0, 0), scale factor of 1.5
4.
5. a
.
b.
?4 ?2
O
2
?2
2
4
y
x
AC
A
?
C
?
B
? 4 ? 2
O
2
? 2
2
4
y
x
B
AC
? 6 ? 4 ? 2
2
46
? 4
? 6
? 2
2
4
6
y
x
O
1
3
?2
O
2
46
? 2
2
4
6
y
x
KN
L
L
?
K
?
M
?
N
?
M
2
L
L
?
OMM
?4
Name
Date
Class
Labsheet 10ACE Exercise 4
Topic 10
4.
?5
?5
5
5
y
x
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