Preface 

xiii  

Linear Functions, Equations, and Inequalities 


1  (88) 

Real Numbers and the Rectangular Coordinate System 


2  (10) 



The Rectangular Coordinate System 







Distance and Midpoint Formulas 



Introduction to Relations and Functions 


12  (10) 

SetBuilder Notation and Interval Notation 



Relations, Domain, and Range 









Reviewing Basic Concepts (Sections 1.1 and 1.2) 


22  (1) 


23  (13) 

Basic Concepts about Linear Functions 





SlopeIntercept Form of the Equation of a Line 



Equations of Lines and Linear Models 


36  (15) 

PointSlope Form of the Equation of a Line 



Standard Form of the Equation of a Line 



Parallel and Perpendicular Lines 



Linear Models and Regression 



Reviewing Basic Concepts (Sections 1.3 and 1.4) 


50  (1) 

Linear Equations and Inequalities 


51  (15) 



Graphical Approaches to Solving Linear Equations 



Identities and Contradictions 



Solving Linear Inequalities 



Graphical Approaches to Solving Linear Inequalities 





Applications of Linear Functions 


66  (23) 

ProblemSolving Strategies 



Applications of Linear Equations 









Reviewing Basic Concepts (Sections 1.5 and 1.6) 


78  (1) 


79  (3) 


82  (5) 


87  (1) 

Project Predicting Heights and Weights of Athletes 


88  (1) 

Analysis of Graphs of Functions 


89  (84) 

Graphs of Basic Functions and Relations; Symmetry 


90  (13) 



Increasing and Decreasing Functions 





The Squaring Function and Symmetry with Respect to the yAxis 



The Cubing Function and Symmetry with Respect to the Origin 



The Square Root and Cube Root Functions 



The Absolute Value Function 



The Relation x = y2 and Symmetry with Respect to the xAxis 





Vertical and Horizontal Shifts of Graphs 


103  (10) 





Combinations of Vertical and Horizontal Shifts 



Effects of Shifts on Domain and Range 



Horizontal Shifts Applied to Equations for Modeling 



Stretching, Shrinking, and Reflecting Graphs 


113  (14) 





Horizontal Stretching and Shrinking 



Reflecting across an Axis 



Combining Transformations of Graphs 



Reviewing Basic Concepts (Sections 2.12.3) 


125  (2) 

Absolute Value Functions: Graphs, Equations, Inequalities, and Applications 


127  (11) 



Properties of Absolute Value 



Equations and Inequalities Involving Absolute Value 



An Application Involving Absolute Value 



PiecewiseDefined Functions 


138  (11) 

Graphing PiecewiseDefined Functions 



The Greatest Integer Function 



Applications of PiecewiseDefined Functions 



Operations and Composition 


149  (24) 







Applications of Operations and Composition 



Reviewing Basic Concepts (Sections 2.42.6) 


162  (1) 


163  (3) 


166  (3) 


169  (2) 

Project Modeling the Movement of a Cold Front 


171  (2) 


173  (97) 


174  (7) 



Operations with Complex Numbers 



Quadratic Functions and Graphs 


181  (13) 



Graphs of Quadratic Functions 







Applications and Quadratic Models 



Quadratic Equations and Inequalities 


194  (14) 





Quadratic Formula and the Discriminant 



Solving Quadratic Equations 



Solving Quadratic Inequalities 



Formulas Involving Quadratics 





Reviewing Basic Concepts (Sections 3.13.3) 


208  (1) 

Further Applications of Quadratic Functions and Models 


208  (10) 

Applications of Quadratic Functions 





HigherDegree Polynomial Functions and Graphs 


218  (13) 









xIntercepts (Real Zeros) 





Curve Fitting and Polynomial Models 



Reviewing Basic Concepts (Sections 3.4 and 3.5) 


231  (1) 

Topics in the Theory of Polynomial Functions (I) 


231  (9) 

Intermediate Value Theorem 



Division of Polynomials and Synthetic Division 



Remainder and Factor Theorems 



Topics in the Theory of Polynomial Functions (II) 


240  (11) 

Complex Zeros and the Fundamental Theorem of Algebra 











Polynomial Equations and Inequalities; Further Applications and Models 


251  (19) 

Polynomial Equations and Inequalities 





Applications and Polynomial Models 



Reviewing Basic Concepts (Sections 3.63.8) 


259  (1) 


260  (3) 


263  (4) 


267  (1) 

Project Creating a Social Security Polynomial 


268  (2) 

Rational, Power, and Root Functions 


270  (68) 

Rational Functions and Graphs 


271  (6) 



The Rational Function Defined by f(x) = 1/x2 



More on Graphs of Rational Functions 


277  (14) 

Vertical and Horizontal Asymptotes 







Graphs with Points of Discontinuity 



Rational Equations, Inequalities, Applications, and Models 


291  (15) 

Solving Rational Equations and Inequalities 



Applications and Models of Rational Functions 





Combined and Joint Variation 



Reviewing Basic Concepts (Sections 4.14.3) 


305  (1) 

Functions Defined by Powers and Roots 


306  (12) 



Modeling Using Power Functions 



Graphs of f(x) = nax+b Graphing Circles and Horizontal Parabolas Using Root Functions 



Equations, Inequalities, and Applications Involving Root Functions 


318  (20) 

Equations and Inequalities 



An Application of Root Functions 



Reviewing Basic Concepts (Sections 4.4 and 4.5) 


328  (1) 


329  (2) 


331  (4) 


335  (1) 

Project How Rugged Is Your Coastline? 


336  (2) 

Inverse, Exponential, and Logarithmic Functions 


338  (79) 


339  (11) 





Inverse Functions and Their Graphs 



Equations of Inverse Functions 



An Application of Inverse Functions 




350  (13) 



Graphs of Exponential Functions 



Exponential Equations (Type 1) 





The Number e and Continuous Compounding 



Anapplication of Exponential Fucntion 



Logarithms and Their properties 


363  (11) 











Reviewing Basic Concepts (Section 5.15.3) 


373  (1) 


374  (10) 

Graphs of Logarithmic Functions 



Applying Earlier Work to Logarithmic Fucntions 





Exponential and Logarithmic Equations and Inequalities 


384  (10) 

Exponential Equations and Inequalitiees (Type 2) 



Logarithmic Equation and Inequalities 



Equations and Inequalities InvolvingBoth Exponentials and Logarithms 



Formulas Involing Exponentials and Logarithms 



Reviewing Basic Concepts (Sections 5.4 and 5.5) 


393  (1) 

Further applications and Modeling with Exponential and logarithmic Functions 


394  (23) 

Physical Science Applications 





Biological and Medical Appications 



Modeling Data with Exponential and Logarithmic Fucntions 




408  (3) 

Chapter 5 Review Exercises 


411  (3) 


414  (1) 

Chapter 5 Project Modeling Motor Vehicle Sales inthe United States (with a lesson about the careless use of mathematica models) 


415  (2) 


417  (49) 


418  (14) 



Equations and Graphs of Circles 



Equations and Graphs of Parabolas 



Translations of Parabolas 



An Application of Parabolas 




432  (13) 

Equations and Graphs of Ellipses 





An Applications of Ellipses 



Equations and Graphs of Hyperbolas 



Tanslations of hyperbolas 



Reviewing Basic Concepts (Sections 6.1 and 6.2) 


445  (1) 

Summary of the Conic Sections 


445  (9) 



Identifying Conic Sections 






454  (12) 

Graphs of Parametric Equations and Their Rectangular Equivalents 



Alternative Forms of Parametric Equations 



An Application of Parametric Equations 



Reviewing Basic Concepts (Sections 6.3 and 6.4) 


458  (1) 


459  (2) 


461  (2) 


463  (1) 

Project Modeling the Path of a Bouncing Ball 


464  (2) 

Systems of Equations and Inequalities; Matrices 


466  (99) 


467  (13) 













Solution of Linear Systems in Three Variables 


480  (8) 



Analytic Solution of Systems in Three Variables 





Curve Fitting Using a System 



Solution of Linear Systems by Row Transformations 


488  (12) 

Matrix Row Transformations 





Reduced Row Echelon Method 





An Application of Matrices 



Reviewing Basic Concepts (Sections 7.17.3) 


499  (1) 

Matrix Properties and Operations 


500  (13) 







Determinants and Cramer's Rule 


513  (11) 

Determinants of 2 X 2 Matrices 



Determinants of Larger Matrices 



Derivation of Cramer's Rule 



Using Cramer's Rule to Solve Systems 



Solution of Linear Systems by Matrix Inverses 


524  (13) 



Multiplicative Inverses of Square Matrices 



Using Determinants to Find Inverses 



Solving Linear Systems Using Inverse Matrices 



Curve Fitting Using a System 



Reviewing Basic Concepts (Sections 7.47.6) 


536  (1) 

Systems of Inequalities and Linear Programming 


537  (10) 

Solving Linear Inequalities 



Solving Systems of Inequalities 






547  (18) 

Decomposition of Rational Expressions 







Distinct Linear and Quadratic Factors 



Repeated Quadratic Factors 



Reviewing Basic Concepts (Sections 7.7 and 7.8) 


554  (1) 


554  (3) 


557  (4) 


561  (1) 

Project Finding a Polynomial Whose Graph Passes through Any Number of Given Points 


562  (3) 

Trigonometric Functions and Applications 


565  (111) 


566  (16) 





Standard Position and Coterminal Angles 





Arc Lengths and Areas of Sectors 






582  (11) 

Trigonometric (Circular) Functions 



Using a Calculator to Find Function Values 



Exact Function Values for π/4, π/6 and π/3 



Reviewing Basic Concepts (Sections 8.1 and 8.2) 


592  (1) 

Graphs of the Sine and Cosine Functions 


593  (17) 



Graph of the Sine Function 



Graph of the Cosine Function 



Graphing Techniques, Amplitude, and Period 





Determining a Trigonometric Model Using Curve Fitting 



Graphs of the Other Circular Functions 


610  (12) 

Graphs of the Cosecant and Secant Functions 



Graphs of the Tangent and Cotangent Functions 





Reviewing Basic Concepts (Sections 8.3 and 8.4) 


621  (1) 

Functions of Angles and Fundamental Identities 


622  (13) 







Signs and Ranges of Function Values 







An Application of Trigonometric Functions 



Evaluating Trigonometric Functions 


635  (13) 

Definitions of the Trigonometric Functions 



Trigonometric Function Values of Special Angles 







Special Angles as Reference Angles 



Finding Function Values with a Calculator 





Applications of Right Triangles 


648  (12) 





Angles of Elevation or Depression 





Further Applications of Trigonometric Functions 




660  (16) 



Damped Oscillatory Motion 



Reviewing Basic Concepts (Sections 8.58.8) 


663  (1) 


664  (4) 


668  (5) 


673  (1) 

Project Modeling Sunset Times 


674  (2) 

Trigonometric Identities and Equations 


676  (67) 


677  (10) 



Using the Fundamental Identities 





Sum and Difference Identities 


687  (9) 

Cosine Sum and Difference Identities 



Sine and Tangent Sum and Difference Identities 



Reviewing Basic Concepts (Sections 9.1 and 9.2) 


696  (1) 


696  (12) 



ProducttoSum and SumtoProduct Identities 





The Inverse Circular Functions 


708  (13) 

Review of Inverse Functions 









Remaining Inverse Trigonometric Functions 





Reviewing Basic Concepts (Sections 9.3 and 9.4) 


721  (1) 

Trigonometric Equations and Inequalities (I) 


721  (7) 

Equations Solvable by Linear Methods 



Equations Solvable by Factoring 



Equations Solvable by the Quadratic Formula 



Using Trigonometric Identities to Solve Equations 



Trigonometric Equations and Inequalities (II) 


728  (15) 

Equations and Inequalities Involving MultipleNumber Identities 



Equations and Inequalities Involving HalfNumber Identities 



An Application of Trigonometric Equations 



Reviewing Basic Concepts (Sections 9.5 and 9.6) 


734  (1) 


735  (2) 


737  (3) 


740  (1) 

Project Modeling a Damped Pendulum 


741  (2) 

Applications of Trigonometry; Vectors 


743  (81) 


744  (14) 

Congruency and Oblique Triangles 



Derivation of the Law of Sines 



Applications of Triangles 





The Law of Cosines and Area Formulas 


758  (10) 

Derivation of the Law of Cosines 



Applications of Triangles 





Vectors and Their Applications 


768  (14) 



Algebraic Interpretation of Vectors 





Dot Product and the Angle between Vectors 





Reviewing Basic Concepts (Sections 10.110.3) 


781  (1) 

Trigonometric (Polar) Form of Complex Numbers 


782  (9) 

The Complex Plane and Vector Representation 



Trigonometric (Polar) Form 



Products of Complex Numbers in Trigonometric Form 



Quotients of Complex Numbers in Trigonometric Form 



Powers and Roots of Complex Numbers 


791  (6) 

Powers of Complex Numbers (De Moivre's Theorem) 





Reviewing Basic Concepts (Sections 10.4 and 10.5) 


797  (1) 

Polar Equations and Graphs 


797  (11) 



Graphs of Polar Equations 



Classifying Polar Equations 





More Parametric Equations 


808  (16) 

Parametric Equations with Trigonometric Functions 





Applications of Parametric Equations 



Reviewing Basic Concepts (Sections 10.6 and 10.7) 


815  (1) 


815  (3) 


818  (3) 


821  (1) 

Project When Is a Circle Really a Polygon? 


822  (2) 

Further Topics in Algebra 


824  (72) 


825  (10) 



Series and Summation Notation 





Arithmetic Sequences and Series 


835  (8) 





Geometric Sequences and Series 


843  (11) 





Infinite Geometric Series 





Reviewing Basic Concepts (Sections 11.111.3) 


853  (1) 


854  (7) 

A Binomial Expansion Pattern 











rth Term of a Binomial Expansion 




861  (6) 

Proof by Mathematical Induction 





Generalized Principle of Mathematical Induction 



Proof of the Binomial Theorem 



Reviewing Basic Concepts (Sections 11.4 and 11.5) 


867  (1) 


867  (9) 

Fundamental Principle of Counting 







Distinguishing between Permutations and Combinations 




876  (20) 



Complements and Venn Diagrams 









Reviewing Basic Concepts (Sections 11.6 and 11.7) 


885  (1) 


886  (4) 


890  (2) 


892  (1) 

Project Using Experimental Probabilities to Simulate Family Makeup 


893  (3) 

Limits, Derivatives, and Definite Integrals 


896  (49) 

An Introduction to Limits 


897  (8) 



Finding Limits of Various Types of Functions 





Techniques for Calculating Limits 


905  (6) 



Limits Involving Trigonometric Functions 



OneSided Limits; Limits Involving Infinity 


911  (10) 

Right and LeftHand Limits 







Reviewing Basic Concepts (Sections 12.112.3) 


920  (1) 

Tangent Lines and Derivatives 


921  (8) 

The Tangent Line as a Limit of Secant Lines 





Interpretation of the Derivative as a Rate of Change 



Marginal Concept in Economics 



Area and the Definite Integral 


929  (16) 





Reviewing Basic Concepts (Sections 12.4 and 12.5) 


936  (1) 


937  (2) 


939  (2) 


941  (2) 

Project Instantaneous Rate of Change 


943  (2) 

R Reference: Basic Algebraic Concepts 


945  (37) 

Review of Exponents and Polynomials 


946  (6) 



Terminology for Polynomials 



Adding and Subtracting Polynomials 





Review of Factoring Factoring 


952  (7) 

Out the Greatest Common Factor 







Factoring Special Products 



Factoring by Substitution 



Review of Rational Expressions 


959  (8) 

Domain of a Rational Expression 



Lowest Terms of a Rational Expression 



Multiplying and Dividing Rational Expressions 



Adding and Subtracting Rational Expressions 





Review of Negative and Rational Exponents 


967  (6) 

Negative Exponents and the Quotient Rule 






973  (9) 









Rationalizing Denominators 




981  (1) 
Appendix A: Geometry Formulas 

982  (2) 
Appendix B: Deciding Which Model Best Fits a Set of Data 

984  (5) 
Appendix C: Vectors in Space 

989  (6) 
Appendix D: Polar Form of Conic Sections 

995  (4) 
Appendix E: Rotation of Axes 

999  
Answers to Selected Exercises 

1  (1) 
Index of Applications 

1  (5) 
Index 

6  