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№1 слайд![Functions and Their Graphs .](/documents_6/3d7ff4b35b6e78a589446131b1504738/img0.jpg)
Содержание слайда: Functions and Their Graphs
1.2 – Functions
№2 слайд![Vocab Function A set of](/documents_6/3d7ff4b35b6e78a589446131b1504738/img1.jpg)
Содержание слайда: Vocab
Function = A set of ordered pairs that has each input (x) giving exactly one output (y)
Ex: Function or not?
In a function, one input can’t give 2 different outputs!
№3 слайд![More Vocab x, y input, output](/documents_6/3d7ff4b35b6e78a589446131b1504738/img2.jpg)
Содержание слайда: More Vocab
(x, y) = (input, output)
f(x) is another way to write an output
Domain = the set of all inputs (x)
Range = the set of all outputs (y)
Ex: For the function f(x) = x – 3 , evaluate the following:
f(-3)
f(x+1)
№4 слайд![Ex For the function f x x ,](/documents_6/3d7ff4b35b6e78a589446131b1504738/img3.jpg)
Содержание слайда: Ex: For the function f(x) = 2 – x2 , evaluate the following:
Ex: For the function f(x) = 2 – x2 , evaluate the following:
f(x+1)
Ex: For the function f(x) = x2 + x , evaluate the following:
f(2x)
№5 слайд![Ex For the function f x x x ,](/documents_6/3d7ff4b35b6e78a589446131b1504738/img4.jpg)
Содержание слайда: Ex: For the function f(x) = x2 – 2x + 3, evaluate the following:
Ex: For the function f(x) = x2 – 2x + 3, evaluate the following:
f(x+h)
№6 слайд![Ex For the function f x x ,](/documents_6/3d7ff4b35b6e78a589446131b1504738/img5.jpg)
Содержание слайда: Ex: For the function f(x) = 2x2 – 3 , evaluate the following:
Ex: For the function f(x) = 2x2 – 3 , evaluate the following:
The difference quotient
№7 слайд![f x x . Find f x . x x x x](/documents_6/3d7ff4b35b6e78a589446131b1504738/img6.jpg)
Содержание слайда: f(x) = 5x + 6. Find f(x – 3).
5x – 3
5x + 3
5x – 9
5x – 15
№8 слайд![f x x x . Find f x . -x -x x](/documents_6/3d7ff4b35b6e78a589446131b1504738/img7.jpg)
Содержание слайда: f(x) = 2x – x2 . Find f(x + 1).
-x2 + 1
-x2 + 2x + 1
-x2 +4x + 3
-x2
№9 слайд![Ex The function below is a](/documents_6/3d7ff4b35b6e78a589446131b1504738/img8.jpg)
Содержание слайда: Ex: The function below is a piecewise function. Find f(0) and f(1).
Ex: The function below is a piecewise function. Find f(0) and f(1).
Since 0<1, use the top function for f(0).
f(0) = -3!
Since 1≥1, use the bottom function for f(1).
f(1) = -2!
№10 слайд![More Vocab y x means y is a](/documents_6/3d7ff4b35b6e78a589446131b1504738/img9.jpg)
Содержание слайда: More Vocab
y = x2 means y is a function of x
Y is not a function of x when a ± is in play
Ex: Which of these has y as a function of x?
x2 – y = 7
Solve for y first…
- y = 7 – x2
y = x2 – 7 … no ± means YES!
x2 + y2 = 2x
y2 = 2x – x2
y = … so NO!
№11 слайд![Finding Domain and Range The](/documents_6/3d7ff4b35b6e78a589446131b1504738/img10.jpg)
Содержание слайда: Finding Domain and Range
The domain (set of all x’s) is always assumed to be all real numbers unless some values cannot create outputs (y’s).
Ex: Find the domain of the following functions:
y = 2x – 3
Any x will produce a y, so the domain is xϵℝ (all reals)
y =
The square root can’t be negative, so the domain is x≥0
y =
The denominator can’t be 0, so 2x – 4 ≠0…
…x≠2
№12 слайд![Finding Domain and Range To](/documents_6/3d7ff4b35b6e78a589446131b1504738/img11.jpg)
Содержание слайда: Finding Domain and Range
To find range, graph the function and infer the range (set of all y’s).
Ex: Find the domain and range of the function
Graph the function first.
For the domain, we know from the equation given that x ≥ 3. Our graph confirms that.
For the range, the graph shows us
that there are no negative values
for y, and the values will continue
to increase as x increases.
Range: y ≥ 0
№13 слайд![What is the domain? x - x x -](/documents_6/3d7ff4b35b6e78a589446131b1504738/img12.jpg)
Содержание слайда: What is the domain?
xϵℝ
-2≤x≤2
x≥0
-2<x<2
№14 слайд![What is the domain? x x - x x](/documents_6/3d7ff4b35b6e78a589446131b1504738/img13.jpg)
Содержание слайда: What is the domain?
xϵℝ
x ≠ -2
x ≠ 3
x ≠ -2 and x ≠ 3
№15 слайд![What is the range? y y y lt -](/documents_6/3d7ff4b35b6e78a589446131b1504738/img14.jpg)
Содержание слайда: What is the range?
yϵℝ
y ≠ 5
y < -5
y ≥ -5
№16 слайд![Ch. Functions and Their](/documents_6/3d7ff4b35b6e78a589446131b1504738/img15.jpg)
Содержание слайда: Ch. 1 – Functions and Their Graphs
1.3 – More Functions
№17 слайд![Vertical Line Test Vertical](/documents_6/3d7ff4b35b6e78a589446131b1504738/img16.jpg)
Содержание слайда: Vertical Line Test
Vertical is up and down!
Vertical Line Test: If you can draw some vertical line on a graph and it goes through MORE THAN ONE point, the graph is NOT a function.
Ex: Are these graphs functions?
№18 слайд![Vocab As we read left to](/documents_6/3d7ff4b35b6e78a589446131b1504738/img17.jpg)
Содержание слайда: Vocab
As we read left to right, the function
to the right is…
…decreasing in the red region
Decreasing for x<-1, so we write to indicate that y decreases over that x interval
…constant in the blue region
Constant for -1≤x≤2, so we write
…increasing in the green region
Increasing for x>2, so we write
№19 слайд![Vocab When a function goes](/documents_6/3d7ff4b35b6e78a589446131b1504738/img18.jpg)
Содержание слайда: Vocab
When a function goes from increasing to decreasing (or visa versa), it will have a relative minimum or a relative maximum.
The graph below has a relative maximum at (-2, 2) and a relative minimum at (1, -2).
A graph can have any amount of
relative minima or maxima.
№20 слайд![Functions A function is even](/documents_6/3d7ff4b35b6e78a589446131b1504738/img19.jpg)
Содержание слайда: Functions
A function is even if it is symmetric about the y-axis
f(-x) = f(x)
A function is odd if it is symmetric about the origin
f(-x) = -f(x)
A graph symmetric about the x-axis is…
…not a function!
№21 слайд![The function y x is Even Odd](/documents_6/3d7ff4b35b6e78a589446131b1504738/img20.jpg)
Содержание слайда: The function y = 4x2 – 2 is…
Even
Odd
None of the above
Not a function
№22 слайд![The function y x is Even Odd](/documents_6/3d7ff4b35b6e78a589446131b1504738/img21.jpg)
Содержание слайда: The function y = 1/x is…
Even
Odd
None of the above
Not a function
№23 слайд![The function y x x is Even](/documents_6/3d7ff4b35b6e78a589446131b1504738/img22.jpg)
Содержание слайда: The function y = x3 – x is…
Even
Odd
None of the above
Not a function
№24 слайд![](/documents_6/3d7ff4b35b6e78a589446131b1504738/img23.jpg)