Chapter P Prerequisites: Fundamental Concepts of Algebra 1 Copyright © 2014, 2010, 2007 Pearson Education, Inc. 1 P.1 Algebraic Expressions, Mathematical Models, and Real Numbers

Copyright © 2014, 2010, 2007 Pearson Education, Inc. 2 Evaluate algebraic expressions. Use mathematical models. Find the intersection of two sets. Find the union of two sets. Recognize subsets of the real numbers. Use inequality symbols. Evaluate absolute value. Use absolute value to express distance. Identify properties of real numbers. Simplify algebraic expressions. Objectives:

Copyright © 2014, 2010, 2007 Pearson Education, Inc. 3 Algebraic Expressions If a letter is used to represent various numbers, it is called a variable. A combination of variables and numbers using the operations of addition, subtraction, multiplication, or division, as well as powers or roots, is called an algebraic expression. Evaluating an algebraic expression means to find the value of the expression for a given value of the variable. The expression b n is called an exponential expression.

Copyright © 2014, 2010, 2007 Pearson Education, Inc. 4 Exponential Notation

Copyright © 2014, 2010, 2007 Pearson Education, Inc. 5 The Order of Operations Agreement

Copyright © 2014, 2010, 2007 Pearson Education, Inc. 6 Example: Evaluating an Algebraic Expression Evaluate 8 + 6(x – 3) 2 for x = 13. Solution: 8 + 6(x – 3) 2 = 8 + 6(13 – 3) 2 = (10) 2 = 8 + 6(100) = = 608

Copyright © 2014, 2010, 2007 Pearson Education, Inc. 7 Formulas and Mathematical Models An equation is formed when an equal sign is placed between two algebraic expressions. A formula is an equation that uses variables to express a relationship between two or more quantities. The process of finding formulas to describe real-world phenomena is called mathematical modeling. Such formulas, together with the meaning assigned to the variables, are called mathematical models.

Copyright © 2014, 2010, 2007 Pearson Education, Inc. 8 Example: Using a Mathematical Model The formula models the average cost of tuition and fees, T, for public U.S. colleges for the school year ending x years after Use the formula to project the average cost of tuition and fees at public U.S. colleges for the school year ending in x = years after 2000 = 2015 – 2000 = 15 We substitute 15 for x in the formula.

Copyright © 2014, 2010, 2007 Pearson Education, Inc. 9 Example: Using a Mathematical Model (continued) The formula indicates that for the school year ending in 2015, the average cost of tuition and fees at public U.S. colleges will be $9209.

Copyright © 2014, 2010, 2007 Pearson Education, Inc. 10 Sets A set is a collection of objects whose contents can be clearly determined. The objects in a set are called the elements of the set. We use braces, { }, to indicate that we are representing a set. {1, 2, 3, 4, 5,...} is an example of the roster method of representing a set. The three dots after the 5, called an ellipsis, indicates that there is no final element and that the listing goes on forever. If a set has no elements, it is called the empty set, or the null set, and is represented by the Greek letter phi,

Copyright © 2014, 2010, 2007 Pearson Education, Inc. 11 Set-Builder Notation In set-builder notation, the elements of the set are described but not listed. is read, “The set of all x such that x is a counting number less than 6”. The same set written using the roster method is {1, 2, 3, 4, 5}.

Copyright © 2014, 2010, 2007 Pearson Education, Inc. 12 Definition of the Intersection of Sets The intersection of sets A and B, written is the set of elements common to both set A and set B. This definition can be expressed in set-builder notation as follows:

Copyright © 2014, 2010, 2007 Pearson Education, Inc. 13 Example: Finding the Intersection of Two Sets Find the intersection: The elements common to {3, 4, 5, 6, 7} and {3, 7, 8, 9} are 3 and 7. Thus,

Copyright © 2014, 2010, 2007 Pearson Education, Inc. 14 Definition of the Union of Sets The union of sets A and B, written, is the set of elements that are members of set A or of set B or of both sets. This definition can be expressed in set-builder notation as follows: We can find the union of set A and set B by listing the elements of set A. Then we include any elements of set B that have not already been listed. Enclose all elements that are listed with braces. This shows that the union of two sets is also a set.

Copyright © 2014, 2010, 2007 Pearson Education, Inc. 15 Example: Finding the Union of Two Sets Find the union: To find the union of both sets, start by listing all elements from the first set, namely, 3, 4, 5, 6, and 7. Now list all elements from the second set that are not in the first set, namely, 8 and 9. The union is the set consisting of all these elements. Thus,

Copyright © 2014, 2010, 2007 Pearson Education, Inc. 16 The Set of Real Numbers The sets that make up the Real Numbers,, are: the set of Natural Numbers, the set of Whole Numbers, the set of Integers, the set of Rational Numbers, and the set of Irrational Numbers. Irrational numbers cannot be expressed as a quotient of integers.

Copyright © 2014, 2010, 2007 Pearson Education, Inc. 17 The Set of Real Numbers (continued) The set of real numbers is the set of numbers that are either rational or irrational:

Copyright © 2014, 2010, 2007 Pearson Education, Inc. 18 Example: Recognizing Subsets of the Real Numbers Consider the following set of numbers: List the numbers in the set that are natural numbers., is the only natural number in the set. List the numbers in the set that are whole numbers. The whole numbers in the set are 0 and.

Copyright © 2014, 2010, 2007 Pearson Education, Inc. 19 Example: Recognizing Subsets of the Real Numbers (continued) Consider the following set of numbers: List the numbers in the set that are integers. The numbers in the set that are integers are –9, 0, and

Copyright © 2014, 2010, 2007 Pearson Education, Inc. 20 Example: Recognizing Subsets of the Real Numbers Consider the following set of numbers: List the numbers in the set that are rational numbers. The numbers in the set that are rational numbers are and List the numbers in the set that are irrational numbers. The numbers in the set that are irrational numbers are and.

Copyright © 2014, 2010, 2007 Pearson Education, Inc. 21 The Real Number Line The real number line is a graph used to represent the set of real numbers. An arbitrary point, called the origin, is labeled 0. The distance from 0 to 1 is called the unit distance. Numbers to the right of the origin are positive and numbers to the left of the origin are negative. On the real number line, the real numbers increase from left to right.

Copyright © 2014, 2010, 2007 Pearson Education, Inc. 22 The Real Number Line (continued) We say that there is a one-to-one correspondence between all the real numbers and all points on a real number line: every real number corresponds to a point on the number line and every point on the number line corresponds to a real number.

Copyright © 2014, 2010, 2007 Pearson Education, Inc. 23 Inequality Symbols The following symbols are called inequality symbols. These symbols always point to the lesser of the two real numbers when the inequality statement is true. means that a is less than b means that a is less than or equal to b means that a is greater than b means that a is greater than or equal to b When we compare the size of real numbers we say that we are ordering the real numbers.

Copyright © 2014, 2010, 2007 Pearson Education, Inc. 24 Absolute Value The absolute value of a real number a, denoted, is the distance from 0 to a on the number line. The distance is always taken to be nonnegative. Definition of absolute value

Copyright © 2014, 2010, 2007 Pearson Education, Inc. 25 Example: Evaluating Absolute Value Rewrite the expression without absolute value bars: answer: Rewrite the expression without absolute value bars: answer:

Copyright © 2014, 2010, 2007 Pearson Education, Inc. 26 Properties of Absolute Value

Copyright © 2014, 2010, 2007 Pearson Education, Inc. 27 Distance between Points on a Real Number Line If a and b are any two points on a real number line, then the distance between a and b is given by or

Copyright © 2014, 2010, 2007 Pearson Education, Inc. 28 Example: Distance between Two Points on a Number Line Find the distance between –4 and 5 on the real number line. Because the distance between –4 and 5 on the real number line is given by, the distance between –4 and 5 is

Copyright © 2014, 2010, 2007 Pearson Education, Inc. 29 Properties of the Real Numbers The Commutative Property of Addition a + b = b + a The Commutative Property of Multiplication ab = ba The Associative Property of Addition (a + b) + c = a + (b + c) The Associative Property of Multiplication (ab)c = a(bc)

Copyright © 2014, 2010, 2007 Pearson Education, Inc. 30 Properties of the Real Numbers (continued) The Distributive Property of Multiplication over Addition a(b + c) = ab + ac The Identity Property of Addition a + 0 = a The Identity Property of Multiplication

Copyright © 2014, 2010, 2007 Pearson Education, Inc. 31 Properties of the Real Numbers (continued) The Inverse Property of Addition The Inverse Property of Multiplication

Copyright © 2014, 2010, 2007 Pearson Education, Inc. 32 Definitions of Subtraction and Division

Copyright © 2014, 2010, 2007 Pearson Education, Inc. 33 Simplifying Algebraic Expressions To simplify an algebraic expression we combine like terms. Like terms are terms that have exactly the same variable factors. An algebraic expression is simplified when parentheses have been removed and like terms have been combined.

Copyright © 2014, 2010, 2007 Pearson Education, Inc. 34 Example: Simplifying an Algebraic Expression Simplify:

Copyright © 2014, 2010, 2007 Pearson Education, Inc. 35 Properties of Negatives