Introduction to functions
The output of the function is called the dependent variable. www.mathcentre.ac.uk. 2 c mathcentre 2009. Page 3
1.3 Introduction to Functions
One of the core concepts in College Algebra is the function. 14See the Internal Revenue Service's website http://www.irs.gov/pub/irs-pdf/i1040tt.pdf ...
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Aban 1 1391 AP Network Functions Virtualisation – Introductory White Paper ... at the following link: http://portal.etsi.org/NFV/NFV_White_Paper.pdf ...
Introduction to Relations and Functions
Bahman 13 1386 AP In this chapter we introduce the concept of a function. In general terms
Section 2.1 Introduction to Functions
Section 2.1 Introduction to Functions 73. Version: Fall 2007 A relation is a function if and only if each object in its domain is.
An Introduction to Functions
A function is a relation in which each input x (also called the domain) has ONLY ONE output y (also called the range). In simpler terms “x's DON'T repeat” in a
CHAPTER 7: INTRODUCTION TO FUNCTIONS Contents
We call the output variable the dependent variable and the input variable the independent variable. If the relation is a function then we say that the output.
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INTRODUCTION TO THE HASH FUNCTION AS A PERSONAL
However when a more complex message
[PDF] Introduction to functions - Mathcentre
This unit explains how to see whether a given rule describes a valid function and introduces some of the mathematical terms associated with functions In order
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2 fév 2008 · In this chapter we introduce the concept of a function In general terms a function defines how one variable depends on one or more other
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The student will investigate and analyze linear families and their characteristics both algebraically and graphically including determining whether a relation
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2 1 Introduction to Functions Our development of the function concept is a modern one but quite quick particularly in light of the fact that today's
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1 Functions In this Chapter we will cover various aspects of functions We will look at the definition of a function the domain and range of a function
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In this module we will study the concept of a function The formula A = ?r2 gives A as a function of r The formula V = ?r2h expresses V as a function of
[PDF] CHAPTER 7: INTRODUCTION TO FUNCTIONS Contents
CHAPTER 7: INTRODUCTION TO FUNCTIONS A function is a relation in which each input value is paired with exactly one unique output value The
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A function is a relation that assigns to each element in its domain exactly The birthday example from Example 3 43 helps us understand this definition
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Math 127: Functions Mary Radcliffe 1 Basics We begin this discussion of functions with the basic definitions needed to talk about functions Definition 1
Introduction to
Relations
and Functions4.1Introduction to Relations
4.2Introduction to Functions
4.3Graphs of Functions
4.4Variation
255In this chapterwe introduce the concept of a function. In general terms, a function defines how one variable depends on one or more other variables. The words in the puzzle are key terms found in this chapter.
Across
1. A type of variation such that
as one variable increases, the other increases.4. A type of variation such
that as one variable increases, the other variable decreases.5. A set of ordered pairs such
that for every element in the domain, there corresponds exactly one element in the range.7. A set of ordered pairs.
Down1. The set of first coordinates
of a set of ordered pairs.2. The shape of the graph of a
quadratic function.3. A function whose graph is a
horizontal line.6. A function whose graph is a
line that is not vertical or horizontal.7. The set of second
coordinates of a set of ordered pairs.14 2 3 5 6 7 IA 44miL2872X_ch04_255-308 9/26/06 02:15 PM Page 255CONFIRMING PAGES
256Chapter 4Introduction to Relations and Functions
1. Domain and Range of a Relation
In many naturally occurring phenomena, two variables may be linked by some type of relationship. For instance, an archeologist finds the bones of a woman at an excavation site. One of the bones is a femur. The femur is the large bone in the thigh attached to the knee and hip. Table 4-1 shows a correspondence between the length of a woman's femur and her height. Each data point from Table 4-1 may be represented as an ordered pair. In this case, the first value represents the length of a woman's femur and the second, the woman's height. The set of ordered pairs {(45.5, 65.5), (48.2, 68.0), (41.8, 62.2), (46.0, 66.0), (50.4, 70.0)} defines a relation between femur length and height.Finding the Domain and Range of a Relation
Find the domain and range of the relation linking the length of a woman' s femur to her height {(45.5, 65.5), (48.2, 68.0), (41.8, 62.2), (46.0, 66.0), (50.4, 70.0)}.Solution:
Domain: {45.5, 48.2, 41.8, 46.0, 50.4} Set of first coordinates Range: {65.5, 68.0, 62.2, 66.0, 70.0} Set of second coordinates1.Find the domain and range of the relation.
e10, 02, 1?8, 42, a12, 1b, 1?3, 42, 1?8, 02f
Skill Practice
Example 1
Table 4-1
Definition of a Relation in xand y
Any set of ordered pairs (x,y) is called a relation in xand y. Furthermore, • The set of first components in the ordered pairs is called the domain of the relation • The set of second components in the ordered pairs is called the range of the relationSkill Practice Answers
1.Domain
range50, 4, 16
e0, ?8, 12 , ?3f,
Length of Height
Femur (cm) (in.)Ordered Pair
xy45.5 65.5(45.5, 65.5)
48.2 68.0(48.2, 68.0)
41.8 62.2(41.8, 62.2)
46.0 66.0(46.0, 66.0)
50.4 70.0(50.4, 70.0)
Section 4.1Introduction to Relations
Concepts
1.Domain and Range of a
Relation
2.Applications InvolvingRelations
IA miL2872X_ch04_255-308 9/25/06 11:51 AM Page 256CONFIRMING PAGES
Section 4.1Introduction to Relations257
Finding the Domain and Range of a Relation
Find the domain and range of the relation
{(Alabama, 7), (California, 53), (Colorado, 7), (Florida, 25), (Kansas, 4)}Solution:
Domain: {Alabama, California, Colorado, Florida, Kansas}Range: {7, 53, 25, 4} (
Note:The element 7 is not listed twice.)
2.The table gives the longevity for four types of animals. Write the ordered
pairs ( x ,y) indicated by this relation, and state the domain and range. A relation may consist of a finite number of ordered pairs or an infinit e number of ordered pairs. Furthermore, a relation may be defined by several differ ent methods: by a list of ordered pairs, by a correspondence between the domainand range, by a graph, or by an equation.Skill Practice
Example 2
The x- and y-components that constitute the ordered pairs in a relation do not need to be numerical.For example,Table 4-2 depicts five states in the United States and the corresponding number of representatives in the House of R ep- resentatives as of July 2005.Table 4-2table 4-2
Number of
State Representatives
xyAlabama7
California53
Colorado7
Florida25
Kansas4
These data define a relation:
{(Alabama, 7), (California, 53), (Colorado, 7), (Florida, 25), (Kansas, 4)}Skill Practice Answers
2.{(Bear, 22.5), (Cat, 11), (Deer, 12.5),
(Dog, 11)}; domain: {Bear, Cat, Deer,Dog}, range: {22.5, 11, 12.5}
IAAnimal, Longevity (years),
xyBear22.5
Cat11Deer12.5
Dog11 miL2872X_ch04_255-308 9/25/06 11:51 AM Page 257CONFIRMING PAGES
258Chapter 4Introduction to Relations and Functions
• A relation may be defined by a graph (Figure 4-2). The corresponding ordered pairs are {(1,2),(?3,4), (1,?4), (3, 4)}. • A relation may be expressed by an equation such as The solutions to this equation define an infinite set of ordered pairs of the formThe solutions can also be repre-
sented by a graph in a rectangular coordinate system (Figure 4-3).51x, y2x?y
2 6.x?y 2Figure 4-2
y x (1, 2)(?3, 4) (1, 4) (3, 4)Finding the Domain and Range of a Relation
Find the domain and range of the relations:
Solution:
a.Domain: {3, 2,?7}Range: {
9}Example 3
Figure 4-3
y x 5 4 3 2 1 1 2 3 4 51?1?2?3?4?52345
x y 2 237?9xy
Figure 4-1
313?42xy
DomainRange4
• A relation may be defined as a set of ordered pairs. {(1, 2), (?3, 4), (1,?4), (3, 4)} • A relation may be defined by a correspondence (Figure 4-1).The corresponding ordered pairs are {(1, 2), (1,?4), (?3, 4), (3, 4)}. IA miL2872X_ch04_255-308 9/25/06 11:51 AM Page 258CONFIRMING PAGES
Section 4.1Introduction to Relations259
y x34?4?312
2?1 3 41234
1?2 8 55
8y x 2?5 4 8 150
16
45?4?5?3123
2 3 4 5 451?1?2y
x 3 2 145?4?5?3123
2 3 4 5 451?1?2y
x 3 2 1 b.The domain elements are the x-coordinates of the points, and the range elements are the y -coordinates.Domain: {
2,?1, 0, 1, 2}
Range: {
3, 0, 1}
c.The domain consists of an infinite number of x -values extending from8 to 8 (shown in
red). The range consists of all y-values from5 to 5 (shown in blue). Thus, the domain
and range must be expressed in set-builder notation or in interval notation.Domain:
Range:
d.The arrows on the curve indicate that the
graph extends infinitely far up and to the right and infinitely far down and to the right.Domain:
Range: is any real number} or
Find the domain and range of the relations.
3.4. 5.Skill Practice
1 ??, ?25yyor 30, ?25xx is a real number and x?06 x?y 25?y?56 or 3?5, 545yy is a real number and?8?x?86
or 3?8, 845xx is a real number and y xSkill Practice Answers
3.Domain {?5, 2, 4},
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