Problem
5.1
Topic 5: Reflections in the Coordinate Plane
for use after
Shapes and Designs
(
Investigation 4)
A
reflection
is a transformation that flips an image over a line called the
line of reflection
. If you hold your open hand against the edge of a mirror so
that your thumb is facing in your direction, every detail of your real hand
appears as a reflected image in the mirror. The edge of the mirror is the line
of reflection.
A. The reflection of two points across the line
y
3 is
shown. Point
G’
(gee-prime) is the reflection of point
G
.
Point
H’
is the reflection of point
H
.
1. What is the shortest distance from
G
to the line of
reflection?
2. Compare your answer to the distance from
G’
to the
line of reflection.
3. Does the same comparison hold true for
H
and
H’
?
4. Write a rule for reflecting a point across a line.
B. The reflection of a triangle across the line
x
4 is shown below.
1. Fold the graph all the way over along the line
x
4
.
What are you
looking at?
2. What do you notice when you compare the distance from vertex
B
to
the line for
x
3 with the distance from vertex
B’
to the same line?
3. Make the same type of comparison for the remaining vertices.
4. How can you expand the rule you wrote in Problem A to cover the
reflection of a polygon across a line?
5
5
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B
B
?
C
C
?
DD
?
x
? 4
O
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G
G
?
H
?
H
O
5
Exercises
1. Copy the figure on graph paper and graph its image after
a reflection across the line for
x
= 3.
2. Evie was asked to draw three different reflections
of figure A. Only one of her reflections is correct.
a. Which figure is the reflection?
b. What is the line of reflection?
3. Two of the pairs of letters represent a reflection.
a. Which pair does not represent a reflection?
b. Can any letter be flipped across a line of reflection?
c. Flip your printed name over a line of reflection.
4. Tiara reflected the figure at the right and Deena
translated it. Their new figures ended up in exactly the
same location. Draw Tiara’s reflected figure.
5. Ron and Leah wanted to show a reflection over a line by
tracing a flat shape then flipping it over the line and
tracing it again. Whose reflection will be more difficult to
draw?
lines of reflection
Ron
Leah
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4
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A
B
D
C
O
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Topic 5: Reflections in the Coordinate
Plane
Guided Instruction
Mathematical Goals
• Identify reflections used to move a polygon from one location to another
in the coordinate plane.
• Explain how reflections affect the location of a polygon in the coordinate
plane.
Vocabulary
•
reflection
•
line of reflection
Materials
•
Labsheet
5ACE Exercises
At a Glance
PACING
1 day
Once students understand the reflection of a point across a line, as
presented in the first problem, the notion of reflecting a figure across a line
by reflecting vertices and then connecting them should come fairly easily.
Some students may have the mistaken impression that a line of reflection
has to pass through at least one line of an original and reflected image so
that the two images are touching. Problem B and Exercise 2 provide
examples of reflections in which this is not the case.
The main emphasis in the lesson is the reflection of a geometric figure
across a horizontal or vertical line in the coordinate plane. Although this
lesson restricts itself to the first quadrant, you should use your judgment
with regard to presenting examples of reflections across the
x
- and
y
-axis. If
you do so, remind students to find reflected points simply by counting units
between points and the line of reflection.
After Problem 5.1 A ask:
•
How do you think you could reflect a line segment across a line of
reflection?
(Reflect the endpoints of the line segment and connect the
two reflected points.)
After Problem 5.1 B ask:
•
Does the line of reflection have to be touching a figure and its reflected
image?
(No)
•
How far away from a line of reflection can a figure and its reflected
image be?
(There is no mathematical limit.)
•
What is the procedure for drawing the reflection of a triangle across a
line that runs through the triangle?
(It is the same procedure as for a
line of reflection exterior to the triangle: reflect the vertices across the
line, then connect the reflected vertices.)
You will find additional work on transformations in the grade 8 unit
Kaleidoscopes, Hubcaps, and Mirrors.
ACE Assignment Guide
for Topic 5
Core
1–5
Answers to Topic 5
Problem 5.1
A. 1.
2 units
2.
G
’ is also 2 units from the line of
reflection.
3.
Yes
4.
Answers may vary. Sample: To reflect a
point across a line, plot a point on the
opposite side of the line that is the same
distance from the line as the original point.
B. 1.
You would only see one triangle because
the one triangle would be perfectly
positioned over the other on.
2.
The two distances are the same.
3.
Points
C
and
C’
are the same distance from
the line, as are points
D
and
D’
.
4.
Answers may vary. Sample: To reflect a
polygon across a line, for each vertex plot a
point on the opposite side of the line that is
the same distance from the line as the
original vertex. Connect the plotted points
to form the reflected polygon.
Exercises
1.
2. a.
C
b.
y
? 5
3. a.
(2)
b.
yes
c.
Check students’ work.
4.
Answers may vary. Sample:
5.
It will be more difficult for Leah because
Ron’s line of reflection is right up against a
side of the rectangle, but Leah does not have
that guidance, so the triangle could swivel
when it is flipped and the vertices of the
flipped image will not lie opposite the vertices
of the original figure.
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Name
Date
Class
Labsheet 5ACE Exercises
Topic 5
1.
4.
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B
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C
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