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The set X is called the domain of the function.
For each element x in X, the corresponding element y in Y is called the image of x. The set of all images of the elements of the domain is called the range of the function.
Let X and Y be two nonempty sets of real numbers. A function from X into Y is a rule or a correspondence that associates with each element of X a unique element of Y.
M: Mother Function
Joe
Samantha
Anna
Ian
Chelsea
George
Laura
Julie
Hilary
Barbara
Sue
Students Mothers
M: Mother function
Domain of M = {Joe, Samantha, Anna, Ian, Chelsea, George}
Range of M = {Laura, Julie, Hilary, Barbara}
In function notation we writeM(Anna) = JulieM(George) = BarbaraM(x)=Hilary indicates that x = Chelsea
The mother function M written as ordered pairs
M = {(Joe, Laura), (Samantha, Laura),
(Anna, Julie), (Ian, Julie), (Chelsea, Hillary),
(George, Barbara) }
For the function f below , evaluate f at the indicated values and find the domain and range of f
1
2
3
4
5
6
7
10
11
12
13
14
15
16
f(1) f(2)
f(3) f(4)
f(5) f(6)
f(7)
Domain of f
Range of f
Graphical Displays of Functions
Another way to depict a function whose ordered pairs are made up of numbers, is to display the ordered pairs via a graph on the coordinate plane, with the first elements of the ordered pairs graphed along the horizontal axis, and the second elements graphed along the vertical axis.
Functions defined by Rules
Let f be function, defined on the set of natural numbers, consisting of ordered pairs where the second element of the ordered pair is the square of the first element.
Some of the ordered pairs in f are
(1,1) (2,4), (3,9), (4,16),…….
f is best defined by the rule f(x) = x²
Function Notation f(x)
Functions defined on infinite sets are denoted by algebraic rules.
Examples of functions defined on all real numbers R.
f(x) = x²; g(x) = 2x - 1; h(x) = x³
The symbol f(x) represents the real number in the range of the function f corresponding to the domain value x.
The ordered pair (x,f(x)) belongs to the function f.
Evaluating functions
)5(
)0(
)3(
12)(
f
f
f
xxf
)3(
)7(
)1(3
15)(
g
g
gx
xg
)5(
)1(
)0(
4)(
h
h
h
xxh
Graph of a function
The graph of the function f(x) is the set of points (x,y) in the xy-plane that satisfy the relation y = f(x).
Example: The graph of the function
f(x) = 2x – 1 is the graph of the equation
y = 2x – 1, which is a line.
3210-1-2-3
5
4
3
2
1
0
-1x
y
x
y
Domain and Range from the Graph of a function
Domain = {x / or }
Range = {y / or }
13 x 31 x
21 y 53 y
4
0
-4(0, -3)
(2, 3)
(4, 0)(10, 0)
(1, 0)
x
y
Determine the domain, range, and intercepts of the following graph.
Theorem Vertical Line Test
A set of points in the xy - plane is the graph of a function if and only if a vertical line intersects the graph in at most one point.
Even functions
A function f is an even function if
for all values of x in the domain of f.
Example: is even because
)()( xfxf
13)( 2 xxf
)(131)(3)( 22 xfxxxf
Odd functions
A function f is an odd function if
for all values of x in the domain of f.
Example: is odd because
)()( xfxf
xxxf 35)(
)()5(5)(5)( 333 xfxxxxxxxf
Graphs of Even and Odd functions
The graph of an even function is symmetric with respect to the x-axis.
The graph of an odd function is symmetric with respect to the origin.
Increasing and Decreasing Functions
• A function f is increasing on an open interval I if, for any choice of x1 and x2 in I, with x1 < x2 we have f(x1)<f(x2).
• A function f is decreasing on an open interval I if, for any choice of x1 and x2 in I, with x1 < x2 we have f(x1)>f(x2).
• A function f is constant on an open interval I if, for all choices of x, the values f(x) are equal.
Local Maximum, Local Minimum
• A function f has a local maximum at c if there is an open interval I containing c so that, for all x = c in I, f(x) < f(c). We call f(c) a local maximum of f.
• A function f has a local minimum at c if there is an open interval I containing c so that, for all x = c in I, f(x) > f(c). We call f(c) a local minimum of f.
Determine where the following graph is increasing, decreasing and constant. Find local maxima and minima.