Be sure to keep in mind that intervals (such as a domain ...
16-week Lesson 22 (8-week Lesson 18)
Domain and Range of a Transformation
When a function is transformed, its domain and/or range will change. If
only the inputs are transformed, then only the domain will change. If only
the outputs are transformed, then only the range will change. If both the
inputs and outputs are transformed, then both the domain and range will
change.
Remember that the domain represents the set of inputs for a function,
and the range represents the set of outputs.
Example 1: Let ? = ?(? ) be a function with domain ? = [?6, 5] and
range ? = [0, 14]. Find the domain ? and range ? for each of the
following functions. Keep in mind order of operation and the order of
your intervals.
1
a. ? = ?3?(? )
b. ? = ? (2 ?)
Changes INside the parentheses change the INputs and we do the
INverse; remember that the Domain is the set of inputs
Changes OUTside the parentheses change the OUTputs and we do
exactly what we see; remember that the Range is the set of outputs
inputs
inputs, ?3(outputs)
1
2
, outputs
Since the outputs of this function are
not being changed with the
1
transformation ? = ? ( ?), that means
2
the range is also not being changed. So
the range will remain ? = [0, 14].
Since the inputs of this function are not
being changed with the transformation
? = ?3?(?), that means the domain is
also not being changed. So the domain
will still be ? = [?6, 5].
Range: [?3(0), ?3(14)]
6
5
2
2
Domain: [? 1 , 1 ]
Range: [0, ?42]
Domain: [?12, 10]
??????: [??, ?]
?????: [???, ?]
??????: [???, ??]
?????: [?, ??]
1
16-week Lesson 22 (8-week Lesson 18)
Domain and Range of a Transformation
Be sure to keep in mind that intervals (such as a domain or range),
just like number lines, always go in order from smallest to largest as
you go from left to right. On Example 1a, the range is listed as
[???, ?] because ??? is smaller than ?.
?¡Þ
¡Þ
?=0
? = ?42
Be sure to re-arrange intervals as needed so they are in the correct
order.
Example 2: Let ? = ?(? ) be a function with domain ? = [?6, 5] and
range ? = [0, 14]. Find the domain ? and range ? for each of the
following functions. Keep in mind order of operation and the order of
your intervals.
a. ? = ?(? + 3) ? 2
b. ? = ? (? ? 4) + 1
b.
Example 3: Let ? = ?(? ) be a function with domain ? = [?6, 5] and
range ? = [0, 14]. Find the domain ? and range ? for each of the
following functions. Keep in mind order of operation and the order of
your intervals.
1
a. ? = 2 ?(?? )
b.
b. ? = ??(3? )
2
16-week Lesson 22 (8-week Lesson 18)
Domain and Range of a Transformation
Example 4: Let ? = ?(? ) be a function with domain ? = [?6, 5] and
range ? = [0, 14]. Find the domain ? and range ? for each of the
following functions. Keep in mind order of operation and the order of
your intervals.
2
3
a. ? = 3 ?(? ) ? 1
b. ? = ?? (? 2 ?)
Example 5: Let ? = ?(? ) be a function with domain ? = [0, ¡Þ) and
range ? = (?¡Þ, 0]. Find the domain ? and range ? for each of the
following functions. Keep in mind order of operation and the order of
your intervals.
1
a. ? = 2 ?(?? ) + 3
b. ? = ??(2? ) ? 2
inputs 1
?1
inputs
, 2 (outputs) + 3
0
2
¡Þ
Domain: [?1 , ?1)
1
, ?1(outputs) ? 2
0 ¡Þ
Domain: [2 , 2 )
1
Range: (2 (?¡Þ) + 3, 2 (0) + 3]
Range: (?1(?¡Þ) ? 2, ?1(0) ? 2]
Domain: [0, ?¡Þ)
Range: (?¡Þ, 3]
Domain: [0, ¡Þ)
Range: (¡Þ, ?2]
??????: (?¡Þ, ?]
?????: (?¡Þ, ?]
??????: [?, ¡Þ)
?????: [??, ¡Þ)
3
16-week Lesson 22 (8-week Lesson 18)
Domain and Range of a Transformation
Example 6: Let ? = ?(? ) be a function with domain ? = [0, ¡Þ) and
range ? = (?¡Þ, 0]. Find the domain ? and range ? for each of the
following functions. Keep in mind order of operation and the order of
your intervals.
2
1
a. ? = 3 ?(? ? 4) ? 1
b. ? = ?3? (? 3 ?)
Example 7: Let ? = ?(? ) be a function with domain ? = [?9, 0] and
range ? = (?¡Þ, ¡Þ). Find the domain ? and range ? for each of the
following functions. Keep in mind order of operation and the order of
your intervals.
a. ? = ?(? ? 4) + 1
b. ? = ??(3? )
b. a
inputs
inputs + 4, outputs + 1
, ?1(outputs)
3
9 0
Domain: [?9 + 4, 0 + 4]
Domain: [? 3 , 3]
Range: (?¡Þ + 1, ¡Þ + 1)
Range: (?1(?¡Þ), ?1(¡Þ))
Domain: [?5, 4]
Range: (?¡Þ, ¡Þ)
Domain: [?3, 0]
Range: (¡Þ, ?¡Þ)
??????: [??, ?]
?????(?¡Þ, ¡Þ)
??????: [??, ?]
?????: (?¡Þ, ¡Þ)
4
16-week Lesson 22 (8-week Lesson 18)
Domain and Range of a Transformation
Example 8: Let ? = ?(? ) be a function with domain ? = (?¡Þ, ¡Þ) and
range ? = [?5, 4]. Find the domain ? and range ? for each of the
following functions. Keep in mind order of operation and the order of
your intervals.
1
a. ? = 2 ?(?? ) + 3
b. ? = ?5? (2? ) ? 2
Once again, keep in mind that the domain of a function is the set of inputs,
while the range of a function is the set of outputs. So any changes to the
inputs of a function are made to the domain, and any changes to the
outputs of a function are made to the range.
Answers to Examples:
1a. ?: [?6, 5], ?: [?42, 0] ; 1b. ?: [?12, 10], ?: [0, 14] ;
2a. ?: [?9, 2], ?: [?2, 12] ; 2b. : [?2, 9], ?: [1, 15] ;
5
3a. : [?5, 6], ?: [0, 7] ; 3b. ?: [?2, 3] , ?: [?14, 0] ;
25
10
4a. : [?6, 5], ?: [?1, 3 ] ; 4b. ?: [? 3 , 4] , ?: [?14, 0] ;
5a. ?: (?¡Þ, 0], ?: (?¡Þ, 3] ; 5b. ?: [0, ¡Þ), ?: [?2, ¡Þ) ;
6a. ?: [4, ¡Þ), ?: (?¡Þ, ?1] ; 6b. ?: (?¡Þ, 0], ?: [0, ¡Þ) ;
7a. ?: [?5, 4], ?: (?¡Þ, ¡Þ) ; 7b. ?: [?3, 0], ?: (?¡Þ, ¡Þ) ;
1
8a. ?: (?¡Þ, ¡Þ), ?: [ , 5] ; 8b. ?: (?¡Þ, ¡Þ), ?: [?22, 23] ;
2
5
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