2.6 Families of Functions 1.Translations 2.Stretches, Shrinks and Reflections.
2.6.1 Translations and Reflections
Transcript of 2.6.1 Translations and Reflections
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Translations and Reflections
The student is able to (I can):
• Identify and draw translations
• Identify and draw reflections
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transformation transformation transformation transformation – a change in the position, size, or shape of a
figure.
preimage preimage preimage preimage – the original figure.
image image image image – the figure after the transformation.
isometry isometry isometry isometry – a transformation that only changes the position of
the figure.
A
B C
A´
B´ C´
We use primes (´) to
label the image.
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We use “arrow notation” to describe a transformation. This
process is called mappingmappingmappingmapping.
A is mapped to A´
B is mapped to B´
C is mapped to C´
ΔABC is mapped to ΔA´B´C´
B
A
C
B´
A´
C´
( )A A′→
( )B B′→
( )C C′→
( Δ Δ )ABC A B C′ ′ ′→
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translation translation translation translation – a transformation where all the points of a figure
are moved the same distance in the same direction.
It is an isometry.
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Examples What are the coordinates of the translated
points?
1. L(-1, 6) 5 units to the right and 4
units down.
2. R(0, 8) 2 units to the left and 5 units
up.
3. Y(7, -3) 4 units to the left and 3 units
down.
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Examples What are the coordinates of the translated
points?
1. L(-1, 6) 5 units to the right and 4
units down.
LLLL´́́́(4, 2)(4, 2)(4, 2)(4, 2)
2. R(0, 8) 2 units to the left and 5 units
up.
RRRR´́́́((((----2, 13)2, 13)2, 13)2, 13)
3. Y(7, -3) 4 units to the left and 3 units
down.
YYYY´́́́(3, (3, (3, (3, ----6)6)6)6)
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vector vector vector vector – a quantity that has both length and direction.
The vector lists the horizontal and vertical change from
the initial point to the final point. (Notice the angle brackets
instead of parentheses.)
Example: Translate U(7, 2) along
U´(7 – 2, 2 + 4)
U´(5, 6)
,x y
2,4−
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Examples: Translate the figure with the given vertices along
the given vector.
1. U(-3, -1), T(1, 5), A(6, -3);
2. T(-2, -4), A(-3, 0), M(1, 0), U(2, -4);
3. T(-3, -1), C(5, -3), U(-2, -2);
4,4
2,4−
1, 3−
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Examples: Translate the figure with the given vertices along
the given vector.
1. U(-3, -1), T(1, 5), A(6, -3);
UUUU´́́́(1, 3), (1, 3), (1, 3), (1, 3), TTTT´́́́(5, 9), (5, 9), (5, 9), (5, 9), AAAA´́́́(10, 1)(10, 1)(10, 1)(10, 1)
2. T(-2, -4), A(-3, 0), M(1, 0), U(2, -4);
TTTT´́́́((((----4, 0), 4, 0), 4, 0), 4, 0), AAAA´́́́((((----5, 4), 5, 4), 5, 4), 5, 4), MMMM´́́́((((----1, 4), 1, 4), 1, 4), 1, 4), UUUU´́́́(0, 0)(0, 0)(0, 0)(0, 0)
3. T(-3, -1), C(5, -3), U(-2, -2);
TTTT´́́́((((----2, 2, 2, 2, ----4), 4), 4), 4), CCCC´́́́((((6, 6, 6, 6, ----6), 6), 6), 6), UUUU´́́́((((----1, 1, 1, 1, ----5)5)5)5)
4,4
2,4−
1, 3−
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reflection reflection reflection reflection – a transformation across a line; each point and its
image are the same distance from the line.
• P´(x, –y)
P´(–x, y)
• P´(y, x)
Across the x-axis
Across the y-axis
Across the line y=x
( , ) ( , )P x y P x y′→ −
( , ) ( , )P x y P x y′→ −
( , ) ( , )P x y P y x′→
x
y
0
P(x, y)•
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Examples Reflect the given vertices across the line.
1. L(-2, 0), H(-1, 4), S(3, 2); y-axis
2. M(-3, 3), A(2, 3), T(2, -1), H(-3, -1); y = x
x
y
•
•
•
L
H
S
• •
• •
M A
TH
y = x
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Examples Reflect the given vertices across the line.
1. L(-2, 0), H(-1, 4), S(3, 2); y-axis
2. M(-3, 3), A(2, 3), T(2, -1), H(-3, -1); y = x
x
y
•
•
•
L
H
S
•
•
•
HHHH´́́́
LLLL´́́́
SSSS´́́́
• •
• •
M A
TH
y = x • •
• •
MMMM´́́́
AAAA´́́́TTTT´́́́
HHHH´́́́
L´(2, 0)
H´(1, 4)
S´(-3, 2)
M´(3, -3)
A´(3, 2)
T´(-1, 2)
H´(-1, -3)
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3. Reflect the points
G(-1, 5), E(0, 3), O(2, -4)
a. Across the y-axis:
b. Across the x-axis:
c. Across the line y=x:
( , ) ( , )x y x y→ −
( , ) ( , )x y x y→ −
( , ) ( , )x y y x→
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3. Reflect the points
G(-1, 5), E(0, 3), O(2, -4)
a. Across the y-axis:
G´(1, 5), E´(0, 3), O´(-2, -4)
b. Across the x-axis:
G´(-1, -5), E´(0, -3), O´(2, 4)
c. Across the line y=x:
G´(5, -1), E´(3, 0), O´(-4, 2)
( , ) ( , )x y x y→ −
( , ) ( , )x y x y→ −
( , ) ( , )x y y x→