Section 4.3 Equipping Your Function Toolkit · PDF fileusing what we call "mapping notation" y...
Transcript of Section 4.3 Equipping Your Function Toolkit · PDF fileusing what we call "mapping notation" y...
![Page 1: Section 4.3 Equipping Your Function Toolkit · PDF fileusing what we call "mapping notation" y = x2 6 y = x2 (x, y) NOTICE: Each yvalue had 6](https://reader031.fdocuments.us/reader031/viewer/2022030415/5aa1a6607f8b9aa0108c25b8/html5/thumbnails/1.jpg)
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Section 4.3Equipping Your Function Toolkit
![Page 2: Section 4.3 Equipping Your Function Toolkit · PDF fileusing what we call "mapping notation" y = x2 6 y = x2 (x, y) NOTICE: Each yvalue had 6](https://reader031.fdocuments.us/reader031/viewer/2022030415/5aa1a6607f8b9aa0108c25b8/html5/thumbnails/2.jpg)
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Transformations
Transformations are a form of math where we are comparing two different graphs to see how they have moved. There are 4 different types of transformations that we will be talking about in this unit.
In order to compare graphs, we must first graph our equations.
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Create a table of values (using the same values as seen below) and graph each of the following.1. y = x2
2. y = -x2
3. y = x2 + 3
4. y = x2 - 6
5. y = 2x2
Compare each graph to the y=x2 graph• y = -x2 ---> what changed?• y = x2 + 3 ---> what changed?• y = x2 - 6 ---> what changed?
How to find the "y" in the table of values:Example:
Using y = x2
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y = x2 the "comparison graph"y = - x2 the "transformation"
![Page 5: Section 4.3 Equipping Your Function Toolkit · PDF fileusing what we call "mapping notation" y = x2 6 y = x2 (x, y) NOTICE: Each yvalue had 6](https://reader031.fdocuments.us/reader031/viewer/2022030415/5aa1a6607f8b9aa0108c25b8/html5/thumbnails/5.jpg)
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How do the 2 graphs compare?
We can describe how the 2 graphs compare verbally....
And we can describe how the 2 graphs compare mathematically, using what we call "mapping notation"
y = x2 y = x2
(x, y)
NOTICE:
Each yvalue was multiplied by a "negative"
![Page 6: Section 4.3 Equipping Your Function Toolkit · PDF fileusing what we call "mapping notation" y = x2 6 y = x2 (x, y) NOTICE: Each yvalue had 6](https://reader031.fdocuments.us/reader031/viewer/2022030415/5aa1a6607f8b9aa0108c25b8/html5/thumbnails/6.jpg)
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y = x2 the "comparison graph"
y = x2 + 3 the "transformation"
![Page 7: Section 4.3 Equipping Your Function Toolkit · PDF fileusing what we call "mapping notation" y = x2 6 y = x2 (x, y) NOTICE: Each yvalue had 6](https://reader031.fdocuments.us/reader031/viewer/2022030415/5aa1a6607f8b9aa0108c25b8/html5/thumbnails/7.jpg)
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How do the 2 graphs compare?
We can describe how the 2 graphs compare verbally....
And we can describe how the 2 graphs compare mathematically, using what we call "mapping notation"
y = x2 + 3 y = x2
(x, y)
NOTICE:
Each yvalue had 3 added to it.
![Page 8: Section 4.3 Equipping Your Function Toolkit · PDF fileusing what we call "mapping notation" y = x2 6 y = x2 (x, y) NOTICE: Each yvalue had 6](https://reader031.fdocuments.us/reader031/viewer/2022030415/5aa1a6607f8b9aa0108c25b8/html5/thumbnails/8.jpg)
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y = x2 the "comparison graph"
y = x2 - 6 the "transformation"
![Page 9: Section 4.3 Equipping Your Function Toolkit · PDF fileusing what we call "mapping notation" y = x2 6 y = x2 (x, y) NOTICE: Each yvalue had 6](https://reader031.fdocuments.us/reader031/viewer/2022030415/5aa1a6607f8b9aa0108c25b8/html5/thumbnails/9.jpg)
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How do the 2 graphs compare?
We can describe how the 2 graphs compare verbally....
And we can describe how the 2 graphs compare mathematically, using what we call "mapping notation"
y = x2 6 y = x2
(x, y)
NOTICE:
Each yvalue had 6 subtracted from it.
![Page 10: Section 4.3 Equipping Your Function Toolkit · PDF fileusing what we call "mapping notation" y = x2 6 y = x2 (x, y) NOTICE: Each yvalue had 6](https://reader031.fdocuments.us/reader031/viewer/2022030415/5aa1a6607f8b9aa0108c25b8/html5/thumbnails/10.jpg)
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y = x2 the "comparison graph"
y = 2x2 the "transformation"
![Page 11: Section 4.3 Equipping Your Function Toolkit · PDF fileusing what we call "mapping notation" y = x2 6 y = x2 (x, y) NOTICE: Each yvalue had 6](https://reader031.fdocuments.us/reader031/viewer/2022030415/5aa1a6607f8b9aa0108c25b8/html5/thumbnails/11.jpg)
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How do the 2 graphs compare?
We can describe how the 2 graphs compare verbally....
And we can describe how the 2 graphs compare mathematically, using what we call "mapping notation"
y = 2x2 y = x2
(x, y)
NOTICE:
Each yvalue doubled.
![Page 12: Section 4.3 Equipping Your Function Toolkit · PDF fileusing what we call "mapping notation" y = x2 6 y = x2 (x, y) NOTICE: Each yvalue had 6](https://reader031.fdocuments.us/reader031/viewer/2022030415/5aa1a6607f8b9aa0108c25b8/html5/thumbnails/12.jpg)
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y = x2 the "comparison graph"
y = (x + 7)2 the "transformation"
![Page 13: Section 4.3 Equipping Your Function Toolkit · PDF fileusing what we call "mapping notation" y = x2 6 y = x2 (x, y) NOTICE: Each yvalue had 6](https://reader031.fdocuments.us/reader031/viewer/2022030415/5aa1a6607f8b9aa0108c25b8/html5/thumbnails/13.jpg)
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How do the 2 graphs compare?
We can describe how the 2 graphs compare verbally....
And we can describe how the 2 graphs compare mathematically, using what we call "mapping notation"
y = (x + 7)2 y = x2
(x, y)
![Page 14: Section 4.3 Equipping Your Function Toolkit · PDF fileusing what we call "mapping notation" y = x2 6 y = x2 (x, y) NOTICE: Each yvalue had 6](https://reader031.fdocuments.us/reader031/viewer/2022030415/5aa1a6607f8b9aa0108c25b8/html5/thumbnails/14.jpg)
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Copy and complete the following table:
SF Ref (yes/no) VS VT HT Mapping Notation
y=(x + 3)2
y = (x 2)2
y = (x 5)2
y = (x + 6)2
y = (x 4)2
y = (x 5)2
Copy & Complete the following table: