Chapter 23

Chapter 23 Algebra of Functions FYHS-Kulai, Chtan 2011

What will be taught ? 1. Some simple notations 2. Simple graphs you must known 3. Relation and function 4. Domain and range 5. Composite function 6. Inverse function FYHS-Kulai, Chtan 2011

FYHS-Kulai, Chtan 2011

什么意思？ FYHS-Kulai, Chtan 2011

Some basic graphs you must bear in mind ! FYHS-Kulai, Chtan 2011

Relation and Function FYHS-Kulai, Chtan 2011

Ordered pair notation rule domain FYHS-Kulai, Chtan 2011

Mapping notation f Y X x f(x) Domain Range FYHS-Kulai, Chtan 2011

1 a 2 b c 1-1 function FYHS-Kulai, Chtan 2011

1 a 2 b 3 onto function FYHS-Kulai, Chtan 2011

1 a 2 b 3 c 1-1 and onto function FYHS-Kulai, Chtan 2011

1 a 2 b Many to 1 function FYHS-Kulai, Chtan 2011

1 a 2 b Not a function FYHS-Kulai, Chtan 2011

Domain and Range of a Function FYHS-Kulai, Chtan 2011

The domain of a function is the complete set of possible values of the independent variable in the function. In plain English, this definition means: The domain of a function is the set of all possible x values which will make the function "work" and will output real y-values. When finding the domain, remember: •The denominator (bottom) of a fraction cannot be zero •The values under a square root sign must be positive FYHS-Kulai, Chtan 2011

e.g.1 The function y = √(x + 4) has the following graph. Note! FYHS-Kulai, Chtan 2011

The range of a function is the complete set of all possible resulting values of the dependent variable of a function, after we have substituted the values in the domain. In plain English, the definition means: The range of a function is the possible y values of a function that result when we substitute all the possible x-values into the function. When finding the range, remember: •Substitute different x-values into the expression for y to see what is happening •Make sure you look for minimum and maximum values of y •Draw a sketch! FYHS-Kulai, Chtan 2011

e.g.2 Let's return to the example above, y = √(x + 4). We notice that there are only positive y-values. There is no value of x that we can find such that we will get a negative value of y. We say that the range for this function is y ≥ 0 FYHS-Kulai, Chtan 2011

e.g.3 The curve of y = sin x shows the range to be betweeen −1 and 1. FYHS-Kulai, Chtan 2011

e.g.4 Find the domain and range of y=tan x. FYHS-Kulai, Chtan 2011

Minor test 2 Sketch the graph . State its range. 2. Sketch the graph . What is the domain and range of this curve. FYHS-Kulai, Chtan 2011

Implied domain or maximal domain Let see the following 3 functions : 𝒈 h FYHS-Kulai, Chtan 2011

g and h are called restrictions of f since their domain are subsets of the domain of f . FYHS-Kulai, Chtan 2011

h(x) g(x) f(x) 4 1 x x x 2 1 0 0 0 Half curve Full curve Three points FYHS-Kulai, Chtan 2011

Codomain What can go into a function is called the Domain. What may possibly come out of a function is called the Codomain. What actually comes out of a function is called the Range. FYHS-Kulai, Chtan 2011

Let see a simple example : x 2x+1 1 B A 2 1 3 Range or image 4 2 5 3 6 7 4 8 9 Domain 10 Codomain FYHS-Kulai, Chtan 2011

Odd and Even functions Odd function e.g. Even function e.g. FYHS-Kulai, Chtan 2011

The graphs of even functions are symmetrical about y-axis. Even functions are many to one functions. Most functions are neither even nor odd. FYHS-Kulai, Chtan 2011

The elementary operations of arithmetic FYHS-Kulai, Chtan 2011

The domain of is : FYHS-Kulai, Chtan 2011

Monotone increasing and monotone decreasing FYHS-Kulai, Chtan 2011

Composite functions FYHS-Kulai, Chtan 2011

f g X Y Z a 1 # b 2 % c 3 * d 4 This is gof, the composition of f and g. For example gof(c)=# FYHS-Kulai, Chtan 2011

The fundamental condition for the existence of composite functions : FYHS-Kulai, Chtan 2011

e.g.5 Given , FYHS-Kulai, Chtan 2011

e.g.6 Given that . Find FYHS-Kulai, Chtan 2011

e.g.7 If function f and g are defined as follows : and FYHS-Kulai, Chtan 2011

Inverse functions FYHS-Kulai, Chtan 2011

f a 1 b 2 3 c a 1 b 2 c 3 FYHS-Kulai, Chtan 2011

Do all one-to-one functions have inverses? Yes. If f is one-to-one, then the flipping operation results in a graph that passes the vertical line test, and so is the graph of a function. A little thought will convince you that this function undoes what the function f did-in other words, that the new function is the inverse of f. FYHS-Kulai, Chtan 2011

Graphing the Inverse of a One-to-One Function If f is a 1-1 function, then it has an inverse f-1. If f is not 1-1, then it does not have an inverse. The domain of f-1 is the same as the range of f; the range of f-1 is the same as the domain of f. To obtain the graph of f-1 from that of f, flip the graph of f about the line y = x, so that the x-axis is superimposed on the old y-axis and vice-versa. The graph obtained is then the graph of f-1. Points on the graph of f-1 are obtained from corresponding points on the graph of f by switching the x- and y-coordinates. FYHS-Kulai, Chtan 2011

Exponential functions and Logarithmic functions y y (0,1) (0,1) x x 0 0 FYHS-Kulai, Chtan 2011

y (0,1) x 0 FYHS-Kulai, Chtan 2011

Chapter 23

Chapter 23

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Chapter 23

CHAPTER 23

Chapter 23

Chapter 23

Chapter 23

Chapter 23

Chapter 23

Chapter 23

Chapter 23

Chapter 23

Chapter 23

Chapter 23

Chapter 23

Chapter 23

Chapter 23

Chapter 23

Chapter 23

Chapter 23

Chapter 23