Lesson 13-10 for exercise sets. &KDSWHU
3UDFWLFH $FWLYLWLHV
Graph each point and its image.
1.P(1, 8) 2.B(0, 0) 3.M(2, 1)
left 6 units, up 4 units right 3 units, down 1 unit reflect over the y-axis
Graph each transformation of DEF. Give the coordinates of the
vertices of the original figure and its image.
4.translate left 6 units 5.translate right 2 units and
up 3 units
6.reflect over the y-axis 7.reflect over the x-axis
8.Discuss and Write How can you identify the coordinates of an
image reflected over the x- or y-axis without graphing? Give
examples to support your answer.
Polygons can also be transformed on a coordinate plane.
To transform a polygon, first transform the vertices.
Then connect the images of the vertices to form the image of the polygon.
Translate ABC5 units to the right and 5 units down.
Each vertex is moved 5 units to the right and
5 units down.
Give the coordinates of the vertices of the original
figure and its image.
Original: A(4,4), B(4, 1), C(2,1)
Image: A′(1, 1), B′(1, 4), C′(3, 4)
1
0
y
x
^143
1
2
3
4
1
2
3
4
4 3 2 1
A
BC
B‘ C‘
5 units
right 5 units
down
A‘
2
Identify the transformation as a translation or a reflection.
Then describe how the figure was transformed.
J(1, 2) J′(1, 2)
K(3, 2) K′(3, 2)
L(3,1) L′(3,1)
M(1,1) M′(1,1)
This transformation is a reflection.
Rectangle JKLMwas reflected over the y-axis
to form rectangle J′K′L′M′.
2
Think
(x, y) (1 • x, y)
(x, y) 0
y
x
^1423
1
2
3
4
1
2
3
4
4 3 2 1
JK
L‘ M‘ ML
K‘ J‘
0
y
x
^1423
1
2
3
4
1
2
3
4
4 3 2 1
E (1,4)
F
( 1 , 3 )
D
( 3 , 2 )