Functions PDF

Summary

This document explains functions, including domains, ranges, and various types of functions, such as constant functions, linear functions, and quadratic functions. It provides examples and exercises.

Full Transcript

Function
A function is a rule that assigns to each element in a set D exactly one
element, called f(x) , in a set E.
Domain of f(x) is the set of all the values of x that will make f(x) have
real values
The range of is the set of all possible values of f(x) as varies
throughout the domain.
x is independent variable
And y = f(x) is the dependent variable
the vertical line test
The vertical line test A curve in the xy-plane is the graph of some
function f if and only if no vertical line intersects the curve more
than once.

This curve cannot be the graph of y as a function of x. no vertical line
intersects the curve more than once.

This curve is the graph of a function
Example The graph of the equation x2 + y2 = 25
Sol is a circle of radius 5 centered at the origin and hence there are
vertical lines that cut the graph more than once.
This equation does not define y as a function of x

Example In each part of the accompanying figure, determine whether
the graph defines y as a function of x.

Yes Yes

No No
EXAMPLE 1 The graph of f(x) a function is shown in Figure.
(a) Find the values of f(1) and f(5).
(b) What are the domain and range of f(x) ?
Sol a) f (1) =3 and f(5)= -0.7 from the figure

b) The domain of is the closed interval [0 , 7].

Range is

Example 2 Sketch the graph and find the domain and range of each
function.

The domain of is the set of all real numbers R=(−∞, ∞).
The range is also R =(−∞, ∞).
The domain of is the set of all real numbers R

The range is =[0, ∞).

Elementary Functions

Examples

is a polynomial of degree 3, as 3 is the highest power of x in the
formula. This is called a cubic polynomial.

is a polynomial of degree 7, as 7 is the highest power of x.
We need to know only the highest power of x to find out the degree.
Which is a polynomial of degree 2, as 2 is the highest power of x.
This is called a quadratic.
Functions containing other operations, such as square roots, are not
polynomials.

is not a polynomial as it contains a square root.

is not a polynomial as it contains a ‘divide by x’.
a) Constant function

f(x) = c = constant

Domain is R (all real values)

Range is {c}

Example find the domain and the range of f(x) =2

Solution

Domain is R (all real values)

Range is {2}
Example find the domain and the range of f(x) =-10

Solution
Domain is R (all real values)

Range is {-10}

Example find the domain and the range of f(x) =20
Solution
Domain is R (all real values)

Range is {20}

b) linear function

f(x)=a x +c

Domain is R (all real values)

Range is R (all real values)

Example find the domain and the range of f(x) =2x + 1
Solution
Domain is R (all real values)
Range is R (all real values)
Example find the domain and the range of f(x) =5x + 10

Solution

Domain is R (all real values)

Range is R (all real values)

Example find the domain and the range of f(x) =-4x + 13
Solution
Domain is R (all real values)

Range is R (all real values)

c) Quadratic functions

f(x) = a0 +a1 x+ a2 x2
Domain is R (all real values)
Range is from the vertex to ∞ 𝟎𝒓 − ∞
Here are some examples of quadratic functions:
 Domain is R and the Range is = [0, ∞)

Domain is R and the Range is = (- ∞, 0]
To get the vertex of the quadratic functions
If n=2: y=a0+a1 x+ a2 x2
Vertex of the parabola : V(α=-a1/2 a2 , β=f (α ) )
Domain of f(x) = R
The range is [β, ∞) or (−∞ , 𝛃 ]
Where β is the max or min value of y
Example A parabola, which has vertex (3, -3), is sketched below. Find
the domain and range of this function.
Domain is R (all real values).
The range is all real y ≥ -3 =[−𝟑, ∞)
Example find the domain and range of f(x) = 3x - x2
Solution
To get the vertex
y=a0+a1 x+ a2 x2
a1 = 3 & a2= -1
Vertex of the parabola : V(α=-a1/2 a2 , β=f (α ) )
𝐚𝟏 −𝟏 ∗ 𝟑 𝟑
𝛂=− = =
𝟐𝐚𝟐 𝟐 ∗ (−𝟏) 𝟐

𝟑 𝟑 𝟐
𝛃 = 𝐟 (𝛂 ) = 𝟑 ∗ − ( ) = 𝟐. 𝟐𝟓
𝟐 𝟐
Domain is R (all real values).
Range is all real y where y ≤ 2.25 = =(−∞, 𝟐. 𝟐𝟓]

Example find the domain and range of f(x) = (x - 1)2 + 1
Sol
f(x) = (x - 1)2 + 1=x2-2x+2
If n=2: y=a0+a1 x+ a2 x2

Vertex of the parabola : V(α=-a1/2 a2 , β=f (α ) )
𝐚𝟏 −𝟏 ∗ −𝟐
𝛂=− = =𝟏
𝟐𝐚𝟐 𝟐 ∗ (𝟏)
𝛃 = 𝐟 (𝛂 ) = (𝟏)𝟐 − 𝟐 ∗ 𝟏 + 𝟐 = 𝟏
So the vertex at (1,1)

Domain is R (all real values).
Range is all real y where y ≥ 1 =[𝟏, ∞)

If n is odd like x3 , x5 , x9 , x15 , x19 , x33
Domain of f(x) = R
Range of f(x) = R
Example Find the domain and range of the following functions.
1) f(x) =x3+2x2 -3x+4
The domain = R & Range = R
2) f(x) =x7+2x5 +2x4 -3x+5
The domain = R & Range = R
3) f(x) =x5+2x4 -3x+7
The domain = R & Range = R