1  20
Next
Number of results to display per page
 Bennett, Jeffrey O., author.
 7th edition.  NY, NY : Pearson, [2019]
 Description
 Book — xviii, P13, 711, C2, A33, I13 pages ; 29 cm
 Summary

 Thinking critically
 Approaches to problem solving
 Numbers in the real world
 Managing money
 Statistical reasoning
 Putting statistics to work
 Probability : living with the odds
 Exponential astonishment
 Modeling our world
 Modeling with geometry
 Mathematics and the arts
 Mathematics and politics.
 Online
Science Library (Li and Ma)
Science Library (Li and Ma)  Status 

Stacks  
QA39.3 .B46 2019  Unknown 
2. Basic technical mathematics [2018]
 Washington, Allyn J.
 Eleventh edition.  [Boston] : Pearson, [2018]
 Description
 Book — 1 volume (various pagings) : illustrations (some color) ; 29 cm
 Summary

 1 Basic Algebraic Operations 1.1 Numbers 1.2 Fundamental Operations of Algebra 1.3 Calculators and Approximate Numbers 1.4 Exponents and Unit Conversions 1.5 Scientific Notation 1.6 Roots and Radicals 1.7 Addition and Subtraction of Algebraic Expressions 1.8 Multiplication of Algebraic Expressions 1.9 Division of Algebraic Expressions 1.10 Solving Equations 1.11 Formulas and Literal Equations 1.12 Applied Word Problems
 2 Geometry 2.1 Lines and Angles 2.2 Triangles 2.3 Quadrilaterals 2.4 Circles 2.5 Measurement of Irregular Areas 2.6 Solid Geometric Figures
 3 Functions and Graphs 3.1 Introduction to Functions 3.2 More about Functions 3.3 Rectangular Coordinates 3.4 The Graph of a Function 3.5 Graphs on the Graphing Calculator 3.6 Graphs of Functions Defined by Tables of Data
 4 The Trigonometric Functions 4.1 Angles 4.2 Defining the Trigonometric Functions 4.3 Values of the Trigonometric Functions 4.4 The Right Triangle 4.5 Applications of Right Triangles
 5 Systems of Linear Equations Determinants 5.1 Linear Equations and Graphs of Linear Functions 5.2 Systems of Equations and Graphical Solutions 5.3 Solving Systems of Two Linear Equations in Two Unknowns Algebraically 5.4 Solving Systems of Two Linear Equations in Two Unknowns by Determinants 5.5 Solving Systems of Three Linear Equations in Three Unknowns Algebraically 5.6 Solving Systems of Three Linear Equations in Three Unknowns by Determinants
 6 Factoring and Fractions 6.1 Factoring: Greatest Common Factor and Difference of Squares 6.2 Factoring Trinomials 6.3 The Sum and Difference of Cubes 6.4 Equivalent Fractions 6.5 Multiplication and Division of Fractions 6.6 Addition and Subtraction of Fractions 6.7 Equations Involving Fractions
 7 Quadratic Equations 7.1 Quadratic Equations Solution by Factoring 7.2 Completing the Square 7.3 The Quadratic Formula 7.4 The Graph of the Quadratic Function
 8 Trigonometric Functions of Any Angle 8.1 Signs of the Trigonometric Functions 8.2 Trigonometric Functions of Any Angle 8.3 Radians 8.4 Applications of Radian Measure
 9 Vectors and Oblique Triangles 9.1 Introduction to Vectors 9.2 Components of Vectors 9.3 Vector Addition by Components 9.4 Applications of Vectors 9.5 Oblique Triangles, the Law of Sines 9.6 The Law of Cosines
 10 Graphs of the Trigonometric Functions 10.1 Graphs of y = a sin x and y = a cos x 10.2 Graphs of y = a sin bx and y = a cos bx 10.3 Graphs of y = a sin (bx + c) and y = a cos (bx + c) 10.4 Graphs of y = tan x, y = cot x, y = sec x, y = csc x 10.5 Applications of the Trigonometric Graphs 10.6 Composite Trigonometric Curves
 11 Exponents and Radicals 11.1 Simplifying Expressions with Integer Exponents 11.2 Fractional Exponents 11.3 Simplest Radical Form 11.4 Addition and Subtraction of Radicals 11.5 Multiplication and Division of Radicals
 12 Complex Numbers 12.1 Basic Definitions 12.2 Basic Operations with Complex Numbers 12.3 Graphical Representation of Complex Numbers 12.4 Polar Form of a Complex Number 12.5 Exponential Form of a Complex Number 12.6 Products, Quotients, Powers, and Roots of Complex Numbers 12.7 An Application to Alternatingcurrent (ac) Circuits
 13 Exponential and Logarithmic Functions 13.1 Exponential Functions 13.2 Logarithmic Functions 13.3 Properties of Logarithms 13.4 Logarithms to the Base
 10 13.5 Natural Logarithms 13.6 Exponential and Logarithmic Equations 13.7 Graphs on Logarithmic and Semilogarithmic Paper
 14 Additional Types of Equations and Systems of Equations 14.1 Graphical Solution of Systems of Equations 14.2 Algebraic Solution of Systems of Equations 14.3 Equations in Quadratic Form 14.4 Equations with Radicals
 15 Equations of Higher Degree 15.1 The Remainder and Factor Theorems Synthetic Division 15.2 The Roots of an Equation 15.3 Rational and Irrational Roots
 16 Matrices Systems of Linear Equations 16.1 Matrices: Definitions and Basic Operations 16.2 Multiplication of Matrices 16.3 Finding the Inverse of a Matrix 16.4 Matrices and Linear Equations 16.5 Gaussian Elimination 16.6 Higherorder Determinants
 17 Inequalities 17.1 Properties of Inequalities 17.2 Solving Linear Inequalities 17.3 Solving Nonlinear Inequalities 17.4 Inequalities Involving Absolute Values 17.5 Graphical Solution of Inequalities with Two Variables 17.6 Linear Programming
 18 Variation 18.1 Ratio and Proportion 18.2 Variation
 19 Sequences and the Binomial Theorem 19.1 Arithmetic Sequences 19.2 Geometric Sequences 19.3 Infinite Geometric Series 19.4 The Binomial Theorem
 20 Additional Topics in Trigonometry 20.1 Fundamental Trigonometric Identities 20.2 The Sum and Difference Formulas 20.3 DoubleAngle Formulas 20.4 HalfAngle Formulas 20.5 Solving Trigonometric Equations 20.6 The Inverse Trigonometric Functions
 21 Plane Analytic Geometry 21.1 Basic Definitions 21.2 The Straight Line 21.3 The Circle 21.4 The Parabola 21.5 The Ellipse 21.6 The Hyperbola 21.7 Translation of Axes 21.8 The Seconddegree Equation 21.9 Rotation of Axes 21.10 Polar Coordinates 21.11 Curves in Polar Coordinates
 22 Introduction to Statistics 22.1 Graphical Displays of Data 22.2 Measures of Central Tendency 22.3 Standard Deviation 22.4 Normal Distributions 22.5 Statistical Process Control 22.6 Linear Regression 22.7 Nonlinear Regression Appendix A Solving Word Problems Appendix B Units of Measurement.
 (source: Nielsen Book Data)
(source: Nielsen Book Data)
 Online
Science Library (Li and Ma)
Science Library (Li and Ma)  Status 

Stacks  
QA39.3 .W365 2018  Unknown 
 Washington, Allyn J.
 Eleventh edition.  Boston : Pearson, [2018]
 Description
 Book — 1 volume (various pagings) : color illustrations ; 29 cm
 Summary

 1 Basic Algebraic Operations 1.1 Numbers 1.2 Fundamental Operations of Algebra 1.3 Calculators and Approximate Numbers 1.4 Exponents and Unit Conversions 1.5 Scientific Notation 1.6 Roots and Radicals 1.7 Addition and Subtraction of Algebraic Expressions 1.8 Multiplication of Algebraic Expressions 1.9 Division of Algebraic Expressions 1.10 Solving Equations 1.11 Formulas and Literal Equations 1.12 Applied Word Problems
 2 Geometry 2.1 Lines and Angles 2.2 Triangles 2.3 Quadrilaterals 2.4 Circles 2.5 Measurement of Irregular Areas 2.6 Solid Geometric Figures
 3 Functions and Graphs 3.1 Introduction to Functions 3.2 More about Functions 3.3 Rectangular Coordinates 3.4 The Graph of a Function 3.5 Graphs on the Graphing Calculator 3.6 Graphs of Functions Defined by Tables of Data
 4 The Trigonometric Functions 4.1 Angles 4.2 Defining the Trigonometric Functions 4.3 Values of the Trigonometric Functions 4.4 The Right Triangle 4.5 Applications of Right Triangles
 5 Systems of Linear Equations Determinants 5.1 Linear Equations and Graphs of Linear Functions 5.2 Systems of Equations and Graphical Solutions 5.3 Solving Systems of Two Linear Equations in Two Unknowns Algebraically 5.4 Solving Systems of Two Linear Equations in Two Unknowns by Determinants 5.5 Solving Systems of Three Linear Equations in Three Unknowns Algebraically 5.6 Solving Systems of Three Linear Equations in Three Unknowns by Determinants
 6 Factoring and Fractions 6.1 Factoring: Greatest Common Factor and Difference of Squares 6.2 Factoring Trinomials 6.3 The Sum and Difference of Cubes 6.4 Equivalent Fractions 6.5 Multiplication and Division of Fractions 6.6 Addition and Subtraction of Fractions 6.7 Equations Involving Fractions
 7 Quadratic Equations 7.1 Quadratic Equations Solution by Factoring 7.2 Completing the Square 7.3 The Quadratic Formula 7.4 The Graph of the Quadratic Function
 8 Trigonometric Functions of Any Angle 8.1 Signs of the Trigonometric Functions 8.2 Trigonometric Functions of Any Angle 8.3 Radians 8.4 Applications of Radian Measure
 9 Vectors and Oblique Triangles 9.1 Introduction to Vectors 9.2 Components of Vectors 9.3 Vector Addition by Components 9.4 Applications of Vectors 9.5 Oblique Triangles, the Law of Sines 9.6 The Law of Cosines
 10 Graphs of the Trigonometric Functions 10.1 Graphs of y = a sin x and y = a cos x 10.2 Graphs of y = a sin bx and y = a cos bx 10.3 Graphs of y = a sin (bx + c) and y = a cos (bx + c) 10.4 Graphs of y = tan x, y = cot x, y = sec x, y = csc x 10.5 Applications of the Trigonometric Graphs 10.6 Composite Trigonometric Curves
 11 Exponents and Radicals 11.1 Simplifying Expressions with Integer Exponents 11.2 Fractional Exponents 11.3 Simplest Radical Form 11.4 Addition and Subtraction of Radicals 11.5 Multiplication and Division of Radicals
 12 Complex Numbers 12.1 Basic Definitions 12.2 Basic Operations with Complex Numbers 12.3 Graphical Representation of Complex Numbers 12.4 Polar Form of a Complex Number 12.5 Exponential Form of a Complex Number 12.6 Products, Quotients, Powers, and Roots of Complex Numbers 12.7 An Application to Alternatingcurrent (ac) Circuits
 13 Exponential and Logarithmic Functions 13.1 Exponential Functions 13.2 Logarithmic Functions 13.3 Properties of Logarithms 13.4 Logarithms to the Base
 10 13.5 Natural Logarithms 13.6 Exponential and Logarithmic Equations 13.7 Graphs on Logarithmic and Semilogarithmic Paper
 14 Additional Types of Equations and Systems of Equations 14.1 Graphical Solution of Systems of Equations 14.2 Algebraic Solution of Systems of Equations 14.3 Equations in Quadratic Form 14.4 Equations with Radicals
 15 Equations of Higher Degree 15.1 The Remainder and Factor Theorems Synthetic Division 15.2 The Roots of an Equation 15.3 Rational and Irrational Roots
 16 Matrices Systems of Linear Equations 16.1 Matrices: Definitions and Basic Operations 16.2 Multiplication of Matrices 16.3 Finding the Inverse of a Matrix 16.4 Matrices and Linear Equations 16.5 Gaussian Elimination 16.6 Higherorder Determinants
 17 Inequalities 17.1 Properties of Inequalities 17.2 Solving Linear Inequalities 17.3 Solving Nonlinear Inequalities 17.4 Inequalities Involving Absolute Values 17.5 Graphical Solution of Inequalities with Two Variables 17.6 Linear Programming
 18 Variation 18.1 Ratio and Proportion 18.2 Variation
 19 Sequences and the Binomial Theorem 19.1 Arithmetic Sequences 19.2 Geometric Sequences 19.3 Infinite Geometric Series 19.4 The Binomial Theorem
 20 Additional Topics in Trigonometry 20.1 Fundamental Trigonometric Identities 20.2 The Sum and Difference Formulas 20.3 DoubleAngle Formulas 20.4 HalfAngle Formulas 20.5 Solving Trigonometric Equations 20.6 The Inverse Trigonometric Functions
 21 Plane Analytic Geometry 21.1 Basic Definitions 21.2 The Straight Line 21.3 The Circle 21.4 The Parabola 21.5 The Ellipse 21.6 The Hyperbola 21.7 Translation of Axes 21.8 The Seconddegree Equation 21.9 Rotation of Axes 21.10 Polar Coordinates 21.11 Curves in Polar Coordinates
 22 Introduction to Statistics 22.1 Graphical Displays of Data 22.2 Measures of Central Tendency 22.3 Standard Deviation 22.4 Normal Distributions 22.5 Statistical Process Control 22.6 Linear Regression 22.7 Nonlinear Regression
 23 The Derivative 23.1 Limits 23.2 The Slope of a Tangent to a Curve 23.3 The Derivative 23.4 The Derivative as an Instantaneous Rate of Change 23.5 Derivatives of Polynomials 23.6 Derivatives of Products and Quotients of Functions 23.7 The Derivative of a Power of a Function 23.8 Differentiation of Implicit Functions 23.9 Higher Derivatives
 24 Applications of the Derivative 24.1 Tangents and Normals 24.2 Newton's Method for Solving Equations 24.3 Curvilinear Motion 24.4 Related Rates 24.5 Using Derivatives in Curve Sketching 24.6 More on Curve Sketching 24.7 Applied Maximum and Minimum Problems 24.8 Differentials and Linear Approximations
 25 Integration 25.1 Antiderivatives 25.2 The Indefinite Integral 25.3 The Area Under a Curve 25.4 The Definite Integral 25.5 Numerical Integration: The Trapezoidal Rule 25.6 Simpson's Rule
 26 Applications of Integration 26.1 Applications of the Indefinite Integral 26.2 Areas by Integration 26.3 Volumes by Integration 26.4 Centroids 26.5 Moments of Inertia 26.6 Other Applications
 27 Differentiation of Transcendental Functions 27.1 Derivatives of the Sine and Cosine Functions 27.2 Derivatives of the Other Trigonometric Functions 27.3 Derivatives of the Inverse Trigonometric Functions 27.4 Applications 27.5 Derivative of the Logarithmic Function 27.6 Derivative of the Exponential Function 27.7 L'Hospital's Rule 27.8 Applications
 28 Methods of Integration 28.1 The Power Rule for Integration 28.2 The Basic Logarithmic Form 28.3 The Exponential Form 28.4 Basic Trigonometric Forms 28.5 Other Trigonometric Forms 28.6 Inverse Trigonometric Forms 28.7 Integration by Parts 28.8 Integration by Trigonometric Substitution 28.9 Integration by Partial Fractions: Nonrepeated Linear Factors 28.10 Integration by Partial Fractions: Other Cases 28.11 Integration by Use of Tables
 29 Partial Derivatives and Double Integrals 29.1 Functions of Two Variables 29.2 Curves and Surfaces in Three Dimensions 29.3 Partial Derivatives 29.4 Double Integrals
 30 Expansion of Functions in Series 30.1 Infinite Series 30.2 Maclaurin Series 30.3 Operations with Series 30.4 Computations by Use of Series Expansions 30.5 Taylor Series 30.6 Introduction to Fourier Series 30.7 More About Fourier Series
 31 Differential Equations 31.1 Solutions of Differential Equations 31.2 Separation of Variables 31.3 Integrating Combinations 31.4 The Linear Differential Equation of the First Order 31.5 Numerical Solutions of Firstorder Equations 31.6 Elementary Applications 31.7 Higherorder Homogeneous Equations 31.8 Auxiliary Equation with Repeated or Complex Roots 31.9 Solutions of Nonhomogeneous Equations 31.10 Applications of Higherorder Equations 31.11 Laplace Transforms 31.12 Solving Differential Equations by Laplace Transforms Appendix A Solving Word Problems Appendix B Units of Measurement Appendix C Newton's Method Appendix D A Table of Integrals.
 (source: Nielsen Book Data)
(source: Nielsen Book Data)
 Online
Science Library (Li and Ma)
Science Library (Li and Ma)  Status 

Stacks  
QA37.3 .W38 2018  Unknown 
4. Excursions in modern mathematics [2018]
 Tannenbaum, Peter, 1946 author.
 9th edition.  [Upper Saddle, NJ] : Pearson, [2018]
 Description
 Book — xviii, 570 pages : color illustrations ; 29 cm
 Summary

 1 The Mathematics of Elections 1.1 The Basic Elements of an Election 1.2 The Plurality Method 1.3 The Borda Count Method 1.4 The PluralitywithElimination Method 1.5 The Method of Pairwise Comparisons 1.6 Fairness Criteria and Arrow's Impossibility Theorem
 2 The Mathematics of Power 2.1 An Introduction to Weighted Voting 2.2 Banzhaf Power 2.3 ShapleyShubik Power 2.4 Subsets and Permutations
 3 The Mathematics of Sharing 3.1 FairDivision Games 3.2 The DividerChooser Method 3.3 The LoneDivider Method 3.4 The LoneChooser Method 3.5 The Method of Sealed Bids 3.6 The Method of Markers
 4 The Mathematics of Apportionment 4.1 Apportionment Problems and Apportionment Methods 4.2 Hamilton's Method 4.3 Jefferson's Method 4.4 Adams's and Webster's Methods 4.5 The HuntingtonHill Method 4.6 The Quota Rule and Apportionment Paradoxes
 5 The Mathematics of Getting Around 5.1 StreetRouting Problems 5.2 An Introduction to Graphs 5.3 Euler's Theorems and Fleury's Algorithm 5.4 Eulerizing and SemiEulerizing Graphs
 6 The Mathematics of Touring 6.1 What Is a Traveling Salesman Problem? 6.2 Hamilton Paths and Circuits 6.3 The BruteForce Algorithm 6.4 The NearestNeighbor and Repetitive NearestNeighbor Algorithms 6.5 The CheapestLink Algorithm
 7 The Mathematics of Networks 7.1 Networks and Trees 7.2 Spanning Trees, MSTs, and MaxSTs 7.3 Kruskal's Algorithm
 8 The Mathematics of Scheduling 8.1 An Introduction to Scheduling 8.2 Directed Graphs 8.3 PriorityList Scheduling 8.4 The DecreasingTime Algorithm 8.5 Critical Paths and the CriticalPath Algorithm
 9 Population Growth Models 9.1 Sequences and Population Sequences 9.2 The Linear Growth Model 9.3 The Exponential Growth Model 9.4 The Logistic Growth Model
 10 Financial Mathematics 10.1 Percentages 10.2 Simple Interest 10.3 Compound Interest 10.4 Retirement Savings 10.5 Consumer Debt
 11 The Mathematics of Symmetry 11.1 Rigid Motions 11.2 Reflections 11.3 Rotations 11.4 Translations 11.5 Glide Reflections 11.6 Symmetries and Symmetry Types 11.7 Patterns
 12 Fractal Geometry 12.1 The Koch Snowflake and SelfSimilarity 12.2 The Sierpinski Gasket and the Chaos Game 12.3 The Twisted Sierpinski Gasket 12.4 The Mandelbrot Set
 13 Fibonacci Numbers and the Golden Ratio 13.1 Fibonacci Numbers 13.2 The Golden Ratio 13.3 Gnomons 13.4 Spiral Growth in Nature
 14 Censuses, Surveys, Polls, and Studies 14.1 Enumeration 14.2 Measurement 14.3 Cause and Effect
 15 Graphs, Charts, and Numbers 15.1 Graphs and Charts 15.2 Means, Medians, and Percentiles 15.3 Ranges and Standard Deviations
 16 Probabilities, Odds, and Expectations 16.1 Sample Spaces and Events 16.2 The Multiplication Rule, Permutations, and Combinations 16.3 Probabilities and Odds 16.4 Expectations 16.5 Measuring Risk
 17 The Mathematics of Normality 17.1 Approximately Normal Data Sets 17.2 Normal Curves and Normal Distributions 17.3 Modeling Approximately Normal Distributions 17.4 Normality in Random Events Answers to Selected Exercises Index Photo Credits.
 (source: Nielsen Book Data)
(source: Nielsen Book Data)
 Online
Science Library (Li and Ma)
Science Library (Li and Ma)  Status 

Stacks  
QA36 .T35 2018  Unknown 
5. Finite mathematics [2018]
 Waner, Stefan, 1949 author.
 Seventh edition.  Boston, MA : Cengage Learning, [2018]
 Description
 Book — 1 volume (various pagings) : illustrations (some color) ; 27 cm
 Summary

 0. PRECALCULUS REVIEW. Real Numbers. Exponents and Radicals. Multiplying and Factoring Algebraic Equations. Rational Expressions. Solving Polynomial Equations. Solving Miscellaneous Equations. The Coordinate Plane. Logarithms.
 1. FUNCTIONS AND APPLICATIONS. Functions from the Numerical, Algebraic, and Graphical Viewpoints. Functions and Models. Linear Functions and Models. Linear Regression.
 2. THE MATHEMATICS OF FINANCE. Simple Interest. Compound Interest. Annuities, Loans, and Bonds.
 3. SYSTEMS OF LINEAR EQUATIONS AND MATRICES. Systems of Two Equations in Two Unknowns. Using Matrices to Solve Systems of Equations. Applications of Systems of Linear Equations.
 4. MATRIX ALGEBRA AND APPLICATIONS. Matrix Addition and Scalar Multiplication. Matrix Multiplication. Matrix Inversion. Game Theory. InputOutput Models.
 5. LINEAR PROGRAMMING. Graphing Linear Inequalities. Solving Linear Programming Problems Graphically. The Simplex Method: Solving Standard Maximization Problems. The Simplex Method: Solving General Linear Programming Problems. The Simplex Method and Duality.
 6. SETS AND COUNTING. Sets and Set Operations. Cardinality. The Addition and Multiplication Principles. Permutations and Combinations.
 7. PROBABILITY. Sample Spaces and Events. Relative Frequency. Probability and Probability Models. Probability and Counting Techniques. Conditional Probability and Independence. Bayes' Theorem and Applications. Markov Systems.
 8. RANDOM VARIABLES AND STATISTICS. Random Variables and Distributions. Bernoulli Trials and Binomial Random Variables. Measures of Central Tendency. Measures of Dispersion. Normal Distributions.
 (source: Nielsen Book Data)
(source: Nielsen Book Data)
 Online
Science Library (Li and Ma)
Science Library (Li and Ma)  Status 

Stacks  
QA37.3 .W36 2018  Unknown 
6. Finite mathematics & its applications [2018]
 Goldstein, Larry Joel.
 Twelfth edition / Larry J. Goldstein, Goldstein Educational Technologies, David I. Schneider, University of Maryland, Martha J. Siegel, Towson State University, Steven M. Hair, Pennsylvania State University.  Ny, NY : Pearson, [2018]
 Description
 Book — 1 volume (various pagings) ; 28 cm
 Online
Science Library (Li and Ma)
Science Library (Li and Ma)  Status 

Stacks  
QA39.3 .G65 2018  Unknown 
7. Finite mathematics and applied calculus [2018]
 Waner, Stefan, 1949 author.
 Seventh edition.  Boston, MA : Cengage Learning, [2018]
 Description
 Book — 1 volume (various pagings) ; 26 cm
 Summary

 0. PRECALCULUS REVIEW. Real Numbers. Exponents and Radicals. Multiplying and Factoring Algebraic Equations. Rational Expressions. Solving Polynomial Equations. Solving Miscellaneous Equations. The Coordinate Plane. Logarithms.
 1. FUNCTIONS AND APPLICATIONS. Functions from the Numerical, Algebraic, and Graphical Viewpoints. Functions and Models. Linear Functions and Models. Linear Regression.
 2. NONLINEAR FUNCTIONS AND MODELS. Quadratic Functions and Models. Exponential Functions and Models. Logarithmic Functions and Models. Logistic Functions and Models.
 3. THE MATHEMATICS OF FINANCE. Simple Interest. Compound Interest. Annuities, Loans, and Bonds.
 4. SYSTEMS OF LINEAR EQUATIONS AND MATRICES. Systems of Two Equations in Two Unknowns. Using Matrices to Solve Systems of Equations. Applications of Systems of Linear Equations.
 5. MATRIX ALGEBRA AND APPLICATIONS. Matrix Addition and Scalar Multiplication. Matrix Multiplication. Matrix Inversion. Game Theory. InputOutput Models.
 6. LINEAR PROGRAMMING. Graphing Linear Inequalities. Solving Linear Programming Problems Graphically. The Simplex Method: Solving Standard Maximization Problems. The Simplex Method: Solving General Linear Programming Problems. The Simplex Method and Duality.
 7. SETS AND COUNTING. Sets and Set Operations. Cardinality. The Addition and Multiplication Principles. Permutations and Combinations.
 8. PROBABILITY. Sample Spaces and Events. Relative Frequency. Probability and Probability Models. Probability and Counting Techniques. Conditional Probability and Independence. Bayes" Theorem and Applications. Markov Systems.
 9. RANDOM VARIABLES AND STATISTICS. Random Variables and Distributions. Bernoulli Trials and Binomial Random Variables. Measures of Central Tendency. Measures of Dispersion. Normal Distributions.
 10. INTRODUCTION TO THE DERIVATIVE. Limits: Numerical and Graphical Approaches. Limits and Continuity. Limits: Algebraic Approach. Average Rate of Change. Derivatives: Numerical and Graphical Viewpoints. Derivatives: Algebraic Viewpoint.
 11. TECHNIQUES OF DIFFERENTIATION. Derivatives of Powers, Sums, and Constant Multiples. A First Application: Marginal Analysis. The Product and Quotient Rules. The Chain Rule. Derivatives of Logarithmic and Exponential Functions. Implicit Differentiation.
 12. APPLICATIONS OF THE DERIVATIVE. Maxima and Minima. Applications of Maxima and Minima. Higher Order Derivatives: Acceleration and Concavity. Analyzing Graphs. Related Rates. Elasticity.
 13. THE INTEGRAL. The Indefinite Integral. Substitution. The Definite Integral: Numerical and Graphical Approaches. The Definite Integral: Algebraic Approach and the Fundamental Theorem of Calculus.
 14. FURTHER INTEGRATION TECHNIQUES AND APPLICATIONS OF THE INTEGRAL. Integration by Parts. Area Between Two Curves and Applications. Averages and Moving Averages. Applications to Business and Economics: Consumers" and Producers" Surplus and Continuous Income Streams. Improper Integrals and Applications. Differential Equations and Applications.
 15. FUNCTIONS OF SEVERAL VARIABLES. Functions of Several Variables from the Numerical, Algebraic, and Graphical Viewpoints. Partial Derivatives. Maxima and Minima. Constrained Maxima and Minima and Applications. Double Integrals and Applications.
 16. TRIGONOMETRIC MODELS. Trigonometric Functions, Models, and Regression. Derivatives of Trigonometric Functions and Applications. Integrals of Trigonometric Functions and Applications.
 (source: Nielsen Book Data)
(source: Nielsen Book Data)
 Online
Science Library (Li and Ma)
Science Library (Li and Ma)  Status 

Stacks  
QA37.3 .W37 2018  Unknown 
8. Mathematics all around [2018]
 Pirnot, Thomas L.
 6th edition / Thomas L. Pirnot, Kutztown University of Pennsylvania ; in collaboration with Margaret H. Moore, University of Southern Maine.  Boston : Pearson Education, Inc., [2018]
 Description
 Book — 1 volume (various pagings) : illustrations (some color) ; 29 cm
 Summary

 Preface
 Chapter 1 Problem Solving: Strategies and Principles 1.1 Problem Solving 1.2 Inductive and Deductive Reasoning 1.3 Estimation
 Chapter 2 Set Theory: Using Mathematics to Classify Objects 2.1 The Language of Sets 2.2 Comparing Sets 2.3 Set Operations 2.4 Survey Problems 2.5 Looking Deeper: Infinite Sets
 Chapter 3 Logic: The Study of What's True or False or Somewhere in Between 3.1 Statements, Connectives, and Quantifiers 3.2 Truth Tables 3.3 The Conditional and Biconditional 3.4 Verifying Arguments 3.5 Using Euler Diagrams to Verify Syllogisms 3.6 Looking Deeper: Fuzzy Logic
 Chapter 4 Graph Theory (Networks): The Mathematics of Relationships 4.1 Graphs, Puzzles, and Map Coloring 4.2 The Traveling Salesperson Problem 4.3 Directed Graphs 4.4 Looking Deeper: Scheduling Projects Using PERT
 Chapter 5 Numeration Systems: Does It Matter How We Name Numbers? 5.1 The Evolution of Numeration Systems 5.2 Place Value Systems 5.3 Calculating in Other Bases 5.4 Looking Deeper: Modular Systems
 Chapter 6 Number Theory and the Real Number System: Understanding the Numbers All Around Us 6.1 Number Theory 6.2 The Integers 6.3 The Rational Numbers 6.4 The Real Number System 6.5 Exponents and Scientific Notation 6.6 Looking Deeper: Sequences
 Chapter 7 Algebraic Models: How Do We Approximate Reality? 7.1 Linear Equations 7.2 Modeling with Linear Equations 7.3 Modeling with Quadratic Equations 7.4 Exponential Equations and Growth 7.5 Proportions and Variation 7.6 Modeling with Systems of Linear Equations and Inequalities 7.7 Looking Deeper: Dynamical Systems
 Chapter 8 Consumer Mathematics: The Mathematics of Everyday Life 8.1 Percents, Taxes, and Inflation 8.2 Interest 8.3 Consumer Loans 8.4 Annuities 8.5 Amortized Loans 8.6 Looking Deeper: Annual Percentage Rate
 Chapter 9 Geometry: Ancient and Modern Mathematics Embrace 9.1 Lines, Angles, and Circles 9.2 Polygons 9.3 Perimeter and Area 9.4 Volume and Surface Area 9.5 The Metric System and Dimensional Analysis 9.6 Geometric Symmetry and Tessellations 9.7 Looking Deeper: Fractals
 Chapter 10 Apportionment: How Do We Measure Fairness? 10.1 Understanding Apportionment 10.2 The HuntingtonHill Apportionment Principle 10.3 Other Paradoxes and Apportionment Methods 10.4 Looking Deeper: Fair Division
 Chapter 11 Voting: using Mathematics to make Choices 11.1 Voting Methods 11.2 Defects in Voting Methods 11.3 Weighted Voting Systems 11.4 Looking Deeper: The ShapleyShubik Index
 Chapter 12 Counting: Just How many Are There? 12.1 Introduction to Counting Methods 12.2 The Fundamental Counting Principle 12.3 Permutations and Combinations 12.4 Looking Deeper: Counting and Gambling
 Chapter 13 Probability: What Are the Chances? 13.1 The Basics of Probability Theory 13.2 Complements and Unions of Events 13.3 Conditional Probability and Intersections of Events 13.4 Expected Value 13.5 Looking Deeper: Binomial Experiments
 Chapter 14 Descriptive Statistics: Making Sense of the Data 14.1 Organizing and Visualizing Data 14.2 Measures of Central Tendency 14.3 Measures of Dispersion 14.4 The Normal Distribution 14.5 Looking Deeper: Linear Correlation
 Appendix A Answers to Quiz Yourself Problems Answers to Exercises Credits Index.
 (source: Nielsen Book Data)
(source: Nielsen Book Data)
 Online
Science Library (Li and Ma)
Science Library (Li and Ma)  Status 

Stacks  
QA39.3 .P57 2018  Unknown 
9. Mathematics of planet Earth : a primer [2018]
 Calderhead, Ben, author.
 London ; Hackensack, NJ : World Scientific Publishing Europe Ltd., [2018]
 Description
 Book — xx, 350 pages ; 24 cm.
 Online
Science Library (Li and Ma)
Science Library (Li and Ma)  Status 

Stacks  
QA37.3 .C35 2018  Unknown 
 Crauder, Bruce, author.
 3rd edition.  New York, NY : W.H. Freeman and Company, [2018]
 Description
 Book — 1 volume (various pagings) : illustrations (chiefly color) ; 29 cm
 Summary

 Chapter 1: Critical Thinking.
 Chapter 2: Analysis of Growth.
 Chapter 3: Linear and Exponential Change: Comparing Growth Rates.
 Chapter 4: Personal Finance.
 Chapter 5: Introduction to Probability.
 Chapter 6: Statistics.
 Chapter 7: Graph Theory.
 Chapter 8: Voting and Social Choice.
 Chapter 9: Geometry.
 (source: Nielsen Book Data)
(source: Nielsen Book Data)
 Online
Science Library (Li and Ma)
Science Library (Li and Ma)  Status 

Stacks  
QA43 .Q36 2018  Unknown 
11. Discrete mathematics and applications [2017]
 Ferland, Kevin K., 1969 author.
 Second edition.  Boca Raton, FL : CRC Press, Taylor & Francis Group, [2017]
 Description
 Book — xxviii, 916 pages ; 27 cm.
 Summary

 I Proofs Logic and Sets Statement Forms and Logical Equivalences Set Notation Quantifiers Set Operations and Identities Valid Arguments Basic Proof Writing Direct Demonstration General Demonstration (Part 1) General Demonstration (Part 2) Indirect Arguments Splitting into Cases Elementary Number Theory Divisors WellOrdering, Division, and Codes Euclid's Algorithm and Lemma Rational and Irrational Numbers Modular Arithmetic and Encryption Indexed by Integers Sequences, Indexing, and Recursion Sigma Notation Mathematical Induction, An Introduction Induction and Summations Strong Induction The Binomial Theorem Relations General Relations Special Relations on Sets Basics of Functions Special Functions General Set Constructions Cardinality II Combinatorics Basic Counting The Multiplication Principle Permutations and Combinations Addition and Subtraction Probability Applications of Combinations Correcting for Overcounting More Counting InclusionExclusion Multinomial Coecients Generating Functions Counting Orbits Combinatorial Arguments Basic Graph Theory Motivation and Introduction Special Graphs Matrices Isomorphisms Invariants Directed Graphs and Markov Chains Graph Properties Connectivity Euler Circuits Hamiltonian Cycles Planar Graphs Chromatic Number Trees and Algorithms Trees Search Trees Weighted Trees Analysis of Algorithms (Part 1) Analysis of Algorithms (Part 2) A Assumed Properties of Z and R B Pseudocode C Answers to Selected Exercises.
 (source: Nielsen Book Data)
(source: Nielsen Book Data)
 Online
Science Library (Li and Ma)
Science Library (Li and Ma)  Status 

Stacks  
QA39.3 .F47 2017  Unknown 
12. Introduction to experimental mathematics [2017]
 Eilers, Søren, author.
 Cambridge, United Kingdom ; New York, NY : Cambridge University Press, 2017.
 Description
 Book — xv, 303 pages ; 27 cm
 Summary

 1. Experimental method
 2. Basic programming in Maple
 3. Iteration and recursion
 4. Visualization
 5. Symbolic inversion
 6. Pseudorandomness
 7. Time, memory and precision
 8. Applications of linear algebra and graph theory.
 (source: Nielsen Book Data)
(source: Nielsen Book Data)
 Online
Science Library (Li and Ma)
Science Library (Li and Ma)  Status 

Stacks  
QA9 .E45 2017  Unknown 
13. A survey of mathematics with applications [2017]
 Angel, Allen R., 1942 author.
 10th edition.  Boston : Pearson, [2017]
 Description
 Book — 1 volume (various pagings) : illustrations (chiefly color) ; 29 cm
 Summary

 1. Critical Thinking Skills 1.1 Inductive and Deductive Reasoning 1.2 Estimation 1.3 Problem Solving
 2. Sets 2.1 Set Concepts 2.2 Subsets 2.3 Venn Diagrams and Set Operations 2.4 Venn Diagrams with Three Sets and Verification of Equality of Sets 2.5 Applications of Sets 2.6 Infinite Sets
 3. Logic 3.1 Statements and Logical Connectives 3.2 Truth Tables for Negation, Conjunction, and Disjunction 3.3 Truth Tables for the Conditional and Biconditional 3.4 Equivalent Statements 3.5 Symbolic Arguments 3.6 Euler Diagrams and Syllogistic Arguments 3.7 Switching Circuits
 4. Systems of Numeration 4.1 Additive, Multiplicative, and Ciphered Systems of Numeration 4.2 PlaceValue or PositionalValue Numeration Systems 4.3 Other Bases 4.4 Computation in Other Bases 4.5 Early Computational Methods
 5. Number Theory and the Real Number System 5.1 Number Theory 5.2 The Integers 5.3 The Rational Numbers 5.4 The Irrational Numbers 5.5 Real Numbers and Their Properties 5.6 Rules of Exponents and Scientific Notation 5.7 Arithmetic and Geometric Sequences 5.8 Fibonacci Sequence
 6. Algebra, Graphs, and Functions 6.1 Order of Operations and Solving Equations 6.2 Formulas 6.3 Applications of Algebra 6.4 Variation 6.5 Linear Inequalities 6.6 Graphing Linear Equations 6.7 Solving Systems of Linear Equations 6.8 Linear Inequalities and Systems of Linear Inequalities 6.9 Solving Quadratic Equations by Using Factoring and by Using the Quadratic Formula 6.10 Functions and Their Graphs
 7. The Metric System 7.1 Basic Terms and Conversions Within the Metric System 7.2 Length, Area, and Volume 7.3 Mass and Temperature 7.4 Dimensional Analysis and Conversions to and from the Metric System
 8. Geometry 8.1 Points, Lines, Planes, and Angles 8.2 Polygons 8.3 Perimeter and Area 8.4 Volume and Surface Area 8.5 Transformational Geometry, Symmetry, and Tessellations 8.6 Topology 8.7 NonEuclidean Geometry and Fractal Geometry
 9. Mathematical Systems 9.1 Groups 9.2 Finite Mathematical Systems 9.3 Modular Arithmetic 9.4 Matrices
 10. Consumer Mathematics 10.1 Percent 10.2 Personal Loans and Simple Interest 10.3 Compound Interest 10.4 Installment Buying 10.5 Buying a House with a Mortgage 10.6 Ordinary Annuities, Sinking Funds, and Retirement Investments
 11. Probability 11.1 Empirical and Theoretical Probabilities 11.2 Odds 11.3 Expected Value (Expectation) 11.4 Tree Diagrams 11.5 OR and AND Problems 11.6 Conditional Probability 11.7 The Counting Principle and Permutations 11.8 Combinations 11.9 Solving Probability Problems by Using Combinations 11.10 Binomial Probability Formula
 12. Statistics 12.1 Sampling Techniques and Misuses of Statistics 12.2 Frequency Distributions and Statistical Graphs 12.3 Measures of Central Tendency 12.4 Measures of Dispersion 12.5 The Normal Curve 12.6 Linear Correlation and Regression
 13. Graph Theory 13.1 Graphs, Paths, and Circuits 13.2 Euler Paths and Euler Circuits 13.3 Hamilton Paths and Hamilton Circuits 13.4 Trees
 14. Voting and Apportionment 14.1 Voting Methods 14.2 Flaws of the Voting Methods 14.3 Apportionment Methods 14.4 Flaws of the Apportionment Methods
 ANSWERS Credits Index of Applications Index.
 (source: Nielsen Book Data)
(source: Nielsen Book Data)
 Online
Science Library (Li and Ma)
Science Library (Li and Ma)  Status 

Stacks  
QA39.3 .A54 2017  Unknown 
14. A course in analysis [2016  ]
 Jacob, Niels.
 New Jersey : World Scientific, [2016]
 Description
 Book — volumes : illustrations ; 26 cm
 Summary

 Introductory Calculus: Numbers  Revision The Absolute Value, Inequalities and Intervals Mathematical Induction Functions and Mappings Functions and Mappings Continued Derivatives Derivatives Continued The Derivative as a Tool to Investigate Functions The Exponential and Logarithmic Functions Trigonometric Functions and Their Inverses Investigating Functions Integrating Functions Rules for Integration Analysis in One Dimension: Problems with the Real Line Sequences and their Limits A First Encounter with Series The Completeness of the Real Numbers Convergence Criteria for Series, badic Fractions Point Sets in Continuous Functions Differentiation Applications of the Derivative Convex Functions and some Norms on n Uniform Convergence and Interchanging Limits The Riemann Integral The Fundamental Theorem of Calculus A First Encounter with Differential Equations Improper Integrals and the GAMMAFunction Power Series and Taylor Series Infinite Products and the Gauss Integral More on the GAMMAFunction Selected Topics on Functions of a Real Variable.
 (source: Nielsen Book Data)
(source: Nielsen Book Data)
 Online
Science Library (Li and Ma)
Science Library (Li and Ma)  Status 

Stacks


QA300 .J27 2016 V.1  Unknown 
QA300 .J27 2016 V.2  Unknown 
QA300 .J27 2016 V.3  Unknown 
QA300 .J27 2016 V.4  Unknown 
15. Finite mathematics [2016]
 Lial, Margaret L. author.
 Eleventh edition.  Boston : Pearson, [2016]
 Description
 Book — 1 volume (various pagings) : color illustrations ; 27 cm
 Summary

 R. Algebra Reference R1 Polynomials R2 Factoring R3 Rational Expressions R4 Equations R5 Inequalities R6 Exponents R7 Radicals
 1. Linear Functions 11 Slopes and Equations of Lines 12 Linear Functions and Applications 13 The Least Squares Line Chapter Review Extended Application: Using Extrapolation to Predict Life Expectancy
 2. Systems of Linear Equations and Matrices 21 Solution of Linear Systems by the Echelon Method 22 Solution of Linear Systems by the GaussJordan Method 23 Addition and Subtraction of Matrices 24 Multiplication of Matrices 25 Matrix Inverses 26 InputOutput Models Chapter Review Extended Application: Contagion
 3. Linear Programming: The Graphical Method 31 Graphing Linear Inequalities 32 Solving Linear Programming Problems Graphically 33 Applications of Linear Programming Chapter Review Extended Application: Sensitivity Analysis
 4. Linear Programming: The Simplex Method 41 Slack Variables and the Pivot 42 Maximization Problems 43 Minimization Problems Duality 44 Nonstandard Problems Chapter Review Extended Application: Using Integer Programming in the StockCutting Problem
 5. Mathematics of Finance 51 Simple and Compound Interest 52 Future Value of an Annuity 53 Present Value of an Annuity Amortization Chapter Review Extended Application: Time, Money, and Polynomials
 6. Logic 61 Statements 62 Truth Tables and Equivalent Statements 63 The Conditional and Circuits 64 More on the Conditional 65 Analyzing Arguments and Proofs 66 Analyzing Arguments with Quantifiers Chapter Review Extended Application: Logic Puzzles
 7. Sets and Probability 71 Sets 72 Applications of Venn Diagrams 73 Introduction to Probability 74 Basic Concepts of Probability 75 Conditional Probability Independent Events 76 Bayes' Theorem Chapter Review Extended Application: Medical Diagnosis
 8. Counting Principles: Further Probability Topics 81 The Multiplication Principle Permutations 82 Combinations 83 Probability Applications of Counting Principles 84 Binomial Probability 85 Probability Distributions Expected Value Chapter Review Extended Application: Optimal Inventory for a Service Truck
 9. Statistics 91 Frequency Distributions Measures of Central Tendency 92 Measures of Variation 93 The Normal Distribution 94 Normal Approximation to the Binomial Distribution Chapter Review Extended Application: Statistics in the Law  The Castaneda Decision
 10. Markov Chains 101 Basic Properties of Markov Chains 102 Regular Markov Chains 103 Absorbing Markov Chains Chapter Review Extended Application: A Markov Chain Model for Teacher Retention
 11. Game Theory 11.1 Strictly Determined Games 11.2 Mixed Strategies 11.3 Game Theory and Linear Programming Chapter Review Extended Application: The Prisoner's Dilemma  NonZeroSum Games in Economics Table Area Under a Normal Curve Answers to Selected Exercises Photo Acknowledgements Index.
 (source: Nielsen Book Data)
(source: Nielsen Book Data)
 Online
Science Library (Li and Ma)
Science Library (Li and Ma)  Status 

Stacks  
QA37.3 .L53 2016  Unknown 
16. Finite mathematics : models and applications [2016]
 Morris, Carla C., author.
 Hoboken, New Jersey : John Wiley & Sons, Inc., [2016]
 Description
 Book — xvi, 518 pages : illustrations ; 26 cm
 Summary

 Preface ix About the Authors xi
 1 Linear Equations and Mathematical Concepts
 1 1.1 Solving Linear Equations
 2 1.2 Equations of Lines and Their Graphs
 7 1.3 Solving Systems of Linear Equations
 15 1.4 The Numbers
 and e
 21 1.5 Exponential and Logarithmic Functions
 24 1.6 Variation
 32 1.7 Unit Conversions and Dimensional Analysis
 38
 2 Mathematics of Finance
 47 2.1 Simple and Compound Interest
 47 2.2 Ordinary Annuity
 55 2.3 Amortization
 59 2.4 Arithmetic and Geometric Sequences
 63
 3 Matrix Algebra
 71 3.1 Matrices
 72 3.2 Matrix Notation, Arithmetic, and Augmented Matrices
 78 3.3 Gauss Jordan Elimination
 89 3.4 Matrix Inversion and Input Output Analysis
 100
 4 Linear Programming Geometric Solutions
 116 Introduction
 116 4.1 Graphing Linear Inequalities
 117 4.2 Graphing Systems of Linear Inequalities
 121 4.3 Geometric Solutions to Linear Programs
 125
 5 Linear Programming Simplex Method
 136 5.1 The Standard Maximization Problem (SMP)
 137 5.2 Tableaus and Pivot Operations
 142 5.3 Optimal Solutions and the Simplex Method
 149 5.4 Dual Programs
 161 5.5 NonSMP Linear Programs
 167
 6 Linear Programming Application Models
 182
 7 Set and Probability Relationships
 203 7.1 Sets
 204 7.2 Venn Diagrams
 210 7.3 Tree Diagrams
 216 7.4 Combinatorics
 221 7.5 Mathematical Probability
 231 7.6 Bayes Rule and Decision Trees
 245
 8 Random Variables and Probability Distributions
 259 8.1 Random Variables
 259 8.2 Bernoulli Trials and the Binomial Distribution
 265 8.3 The Hypergeometric Distribution
 273 8.4 The Poisson Distribution
 279
 9 Markov Chains
 285 9.1 Transition Matrices and Diagrams
 286 9.2 Transitions
 291 9.3 Regular Markov Chains
 295 9.4 Absorbing Markov Chains
 304
 10 Mathematical Statistics
 314 10.1 Graphical Descriptions of Data
 315 10.2 Measures of Central Tendency and Dispersion
 323 10.3 The Uniform Distribution
 331 10.4 The Normal Distribution
 334 10.5 Normal Distribution Applications
 348 10.6 Developing and Conducting a Survey
 363
 11 Enrichment in Finite Mathematics
 371 11.1 Game Theory
 372 11.2 Applications in Finance and Economics
 385 11.3 Applications in Social and Life Sciences
 394 11.4 Monte Carlo Method
 403 11.5 Dynamic Programming
 422 Answers to Odd Numbered Exercises
 439 Using Technology
 502 Glossary
 506 Index 513.
 (source: Nielsen Book Data)
(source: Nielsen Book Data)
 Online
Science Library (Li and Ma)
Science Library (Li and Ma)  Status 

Stacks  
QA39.3 .M68 2016  Unknown 
17. Mathematical ideas [2016]
 Miller, Charles D. (Charles David), 19421986, author.
 Thirteenth edition.  Boston : Pearson, [2016]
 Description
 Book — 1 volume (various pagings) : illustrations (chiefly color) ; 29 cm
 Summary

 Preface Acknowledgments About the Authors
 1. The Art of Problem Solving 1.1 Solving Problems by Inductive Reasoning 1.2 An Application of Inductive Reasoning: Number Patterns 1.3 Strategies for Problem Solving 1.4 Numeracy in Today's World
 Chapter 1 Summary
 Chapter 1 Test
 2. The Basic Concepts of Set Theory 2.1 Symbols and Terminology 2.2 Venn Diagrams and Subsets 2.3 Set Operations 2.4 Surveys and Cardinal Numbers
 Chapter 2 Summary
 Chapter 2 Test
 3. Introduction to Logic 3.1 Statements and Quantifiers 3.2 Truth Tables and Equivalent Statements 3.3 The Conditional and Circuits 3.4 The Conditional and Related Statements 3.5 Analyzing Arguments with Euler Diagrams 3.6 Analyzing Arguments with Truth Tables
 Chapter 3 Summary
 Chapter 3 Test
 4. Numeration Systems 4.1 Historical Numeration Systems 4.2 More Historical Numeration Systems 4.3 Arithmetic in the HinduArabic System 4.4 Conversion between Number Bases
 Chapter 4 Summary
 Chapter 4 Test
 5. Number Theory 5.1 Prime and Composite Numbers 5.2 Large Prime Numbers 5.3 Selected Topics from Number Theory 5.4 Greatest Common Factor and Least Common Multiple 5.5 The Fibonacci Sequence and the Golden Ratio 5.6 Magic Squares (online)
 Chapter 5 Summary
 Chapter 5 Test
 6. The Real Numbers and Their Representations 6.1 Real Numbers, Order, and Absolute Value 6.2 Operations, Properties, and Applications of Real Numbers 6.3 Rational Numbers and Decimal Representation 6.4 Irrational Numbers and Decimal Representation 6.5 Applications of Decimals and Percents
 Chapter 6 Summary
 Chapter 6 Test
 7. The Basic Concepts of Algebra 7.1 Linear Equations 7.2 Applications of Linear Equations 7.3 Ratio, Proportion, and Variation 7.4 Linear Inequalities 7.5 Properties of Exponents and Scientific Notation 7.6 Polynomials and Factoring 7.7 Quadratic Equations and Applications
 Chapter 7 Summary
 Chapter 7 Test
 8. Graphs, Functions, and Systems of Equations and Inequalities 8.1 The Rectangular Coordinate System and Circles 8.2 Lines, Slope, and Average Rate of Change 8.3 Equations of Lines 8.4 Linear Functions, Graphs, and Models 8.5 Quadratic Functions, Graphs, and Models 8.6 Exponential and Logarithmic Functions, Graphs, and Models 8.7 Systems of Linear Equations 8.8 Applications of Linear Systems 8.9 Linear Inequalities, Systems, and Linear Programming
 Chapter 8 Summary
 Chapter 8 Test
 9. Geometry 9.1 Points, Lines, Planes, and Angles 9.2 Curves, Polygons, Circles, and Geometric Constructions 9.3 The Geometry of Triangles: Congruence, Similarity, and the Pythagorean Theorem 9.4 Perimeter, Area, and Circumference 9.5 Volume and Surface Area 9.6 Transformational Geometry 9.7 NonEuclidean Geometry and Topology 9.8 Chaos and Fractal Geometry
 Chapter 9 Summary
 Chapter 9 Test
 10. Counting Methods 10.1 Counting by Systematic Listing 10.2 Using the Fundamental Counting Principle 10.3 Using Permutations and Combinations 10.4 Using Pascal's Triangle 10.5 Counting Problems Involving "Not" and "Or"
 Chapter 10 Summary
 Chapter 10 Test
 11. Probability 11.1 Basic Concepts 11.2 Events Involving "Not" and "Or" 11.3 Conditional Probability and Events Involving "And" 11.4 Binomial Probability 11.5 Expected Value and Simulation
 Chapter 11 Summary
 Chapter 11 Test
 12. Statistics 12.1 Visual Displays of Data 12.2 Measures of Central Tendency 12.3 Measures of Dispersion 12.4 Measures of Position 12.5 The Normal Distribution
 Chapter 12 Summary
 Chapter 12 Test
 13. Personal Financial Management 13.1 The Time Value of Money 13.2 Consumer Credit 13.3 Truth in Lending 13.4 The Costs and Advantages of Home Ownership 13.5 Financial Investments
 Chapter 13 Summary
 Chapter 13 Test
 14. Graph Theory 14.1 Basic Concepts 14.2 Euler Circuits and Route Planning 14.3 Hamilton Circuits and Algorithms 14.4 Trees and Minimum Spanning Trees
 Chapter 14 Summary
 Chapter 14 Test
 15. Voting and Apportionment 15.1 The Possibilities of Voting 15.2 The Impossibilities of Voting 15.3 The Possibilities of Apportionment 15.4 The Impossibilities of Apportionment
 Chapter 15 Summary
 Chapter 15 Test Answers to Selected Exercises Credits Index of Applications Index NOTE: Trigonometry module and Metrics module available in MyMathLab or online at www.pearsonhighered.com/mathstatsresources.
 (source: Nielsen Book Data)
(source: Nielsen Book Data)
 Online
Science Library (Li and Ma)
Science Library (Li and Ma)  Status 

Stacks  
QA39.3 .M55 2016  Unknown 
18. Pathways to college mathematics [2016]
 Blitzer, Robert, author.
 Boston : Pearson, [2016]
 Description
 Book — 1 volume (various pagings) : illustrations (chiefly color) ; 28 cm
 Summary

 Preface Supplements List Acknowledgments To the Student About the Author
 1. Numerical Pathways 1.1 Number Theory: Prime and Composite Numbers 1.2 The Integers Order of Operations 1.3 The Rational Numbers 1.4 The Irrational Numbers 1.5 Real Numbers and Their Properties 1.6 Exponents and Scientific Notation 1.7 Arithmetic and Geometric Sequences Chapter Summary, Review, and Test
 Chapter 1 Test
 2. Algebraic Pathways: Equations and Inequalities 2.1 Algebraic Expressions and Formulas 2.2 Linear Equations in One Variable 2.3 Applications of Linear Equations 2.4 Ratios, Rates and Proportions 2.5 Modeling Using Variation 2.6 Linear Inequalities in One Variable Chapter Summary, Review, and Test
 Chapter 2 Test
 3. Algebraic Pathways: Graphs, Functions, Linear Functions, and Linear Systems 3.1 Graphing and Functions 3.2 Linear Functions and Their Graphs 3.3 The PointSlope Form of the Equation of a Line Scatter Plots and Regression Lines 3.4 Systems of Linear Equations in Two Variables 3.5 Linear Inequalities in Two Variables Chapter Summary, Review, and Test
 Chapter 3 Test
 4. Algebraic Pathways: Polynomials, Quadratic Equations, and Quadratic Functions 4.1 Operations with Polynomials Polynomial Functions 4.2 Factoring Polynomials 4.3 Solving Quadratic Equations by Factoring 4.4 Solving Quadratic Equations by the Square Root Property and the Quadratic Formula 4.5 Quadratic Functions and Their Graphs Chapter Summary, Review, and Test
 Chapter 4 Test
 5. Geometric Pathways: Measurement 5.1 Measuring Length The Metric System 5.2 Measuring Area and Volume 5.3 Measuring Weight and Temperature Chapter Summary, Review, and Test
 Chapter 5 Test
 6. Geometric Pathways 6.1 Points, Lines, Planes, and Angles 6.2 Triangles 6.3 Polygons, Perimeter, and Tessellations 6.4 Area and Circumference 6.5 Volume Chapter Summary, Review, and Test
 Chapter 6 Test
 7. Pathways to Probability: Counting Methods and Probability Theory 7.1 The Fundamental Counting Principle 7.2 Permutations 7.3 Combinations 7.4 Fundamentals of Probability 7.5 Probability with the Fundamental Counting Principle, Permutations, and Combinations 7.6 Events Involving Not and Or Odds 7.7 Events Involving And Conditional Probability Chapter Summary, Review, and Test
 Chapter 7 Test
 8. Statistical Pathways 8.1 Sampling, Frequency Distributions, and Graphs 8.2 Measures of Central Tendency 8.3 Measures of Dispersion 8.4 The Normal Distribution Chapter Summary, Review, and Test
 Chapter 8 Test Appendices A. Basics of Percent B. Applications of Percent C. Bar, Line, and Circle Graphs D. Sets, Venn Diagrams, and Set Operations Answers to Selected Exercises Subject Index Index of Applications Credits.
 (source: Nielsen Book Data)
(source: Nielsen Book Data)
 Online
Science Library (Li and Ma)
Science Library (Li and Ma)  Status 

Stacks  
QA39.3 .B586 2016  Unknown 
 Gaze, Eric.
 Boston : Pearson, c2016.
 Description
 Book — 596 p. : ill. ; 28 cm.
 Summary

The Print Reference is a printed black and white bound representation of the eText.
(source: Nielsen Book Data)
 Online
Science Library (Li and Ma)
Science Library (Li and Ma)  Status 

Stacks  
QA39.3 .G39 2016  Unknown 
20. Basic college mathematics [2015]
 Miller, Julie, 1962 author.
 Third edition.  New York, NY : McGrawHill Education, [2015]
 Description
 Book — various pagings : color illustrations ; 28 cm
 Summary

 1 Whole Numbers 1.1 Introduction to Whole Numbers 1.2 Addition of Whole Numbers and Perimeter 1.3 Subtraction of Whole Numbers 1.4 Rounding and Estimating 1.5 Multiplication of Whole Numbers and Area 1.6 Division of Whole Numbers PRE: Operations on Whole Numbers 1.7 Exponents, Square Roots, and the Order of Operation 1.8 Problem Solving Strategies Group Activity: Becoming a Successful Student
 2 Fractions and Mixed Numbers: Multiplication and Division 2.1 Introduction to Fractions and Mixed Numbers 2.2 Prime Numbers and Factorizations 2.3 Simplifying Fractions to Lowest Terms 2.4 Multiplication of Fractions and Applications 2.5 Division of Fractions and Applications PRE: Multiplication and Division of Fractions 2.6 Multiplication and Division of Mixed Numbers Group Activity: Cooking for Company
 3 Fractions and Mixed Numbers: Addition and Subtraction 3.1 Addition and Subtraction of Like Fractions 3.2 Least Common Multiple 3.3 Addition and Subtraction of Unlike Fractions 3.4 Addition and Subtractions of Mixed Numbers PRE: Operations on Fractions and Mixed Numbers 3.5 Order of Operations and Applications of Fractions and Mixed Numbers Group Activity: Card Games with Fractions
 4 Decimals 4.1 Decimal Notation and Rounding 4.2 Addition and Subtraction of Decimals 4.3 Multiplication of Decimals 4.4 Division of Decimals PRE: Operations on Decimals 4.5 Fractions as Decimals 4.6 Order of Operations and Applications of Decimals Group Activity: Purchasing from a Catalog
 5 Ratio and Proportion 5.1 Ratios 5.2 Rates and Unit Cost 5.3 Proportions PRE: Operations on Fractions versus Solving Proportions 5.4 Applications of Proportions and Similar Figures Group Activity: Investigating Probability
 6 Percents 6.1 Percents and Their Fraction and Decimal Forms 6.2 Fractions and Decimals and Their Percent Forms 6.3 Percent Proportions and Applications 6.4 Percent Equations and Applications PRE: Percents 6.5 Applications Involving Sales Tax, Commission, Discount, and Markup 6.6 Percent Increase and Decrease 6.7 Simple and Compound Interest Group Activity: Credit Card Investment
 7 Measurement 7.1 Converting US Customary Units of Length 7.2 Converting US Customary Units of Time, Weight, and Capacity 7.3 Metric Units of Length 7.4 Metric Units of Mass and Capactiy and Medical Applications PRE: US Customary and Metric Conversions 7.5 Converting Between US Customary and Metric Units Group Activity: Remodeling the Classroom
 8 Geometry 8.1 Lines and Angles 8.2 Triangles and the Pythagorean Theorem 8.3 Quadrilaterals, Perimeter, and Area 8.4 Circles, Circumference, and Area PRE: Area, Perimeter, and Circumference 8.5 Volume Group Activity: Constructing a Golden Rectangle
 9 Introduction to Statistics 9.1 Tables, Bar Graphs, Pictographs, and Lines Graphs 9.2 Frequency Distributions and Histograms 9.3 Circle Graphs 9.4 Mean, Median, and Mode 9.5 Introduction to Probability Group Activity: Creating a Statistical Report
 10 Real Numbers 10.1 Real Numbers and the Real Number Line 10.2 Addition of Real Numbers 10.3 Subtraction of Real Numbers PRE: Addition and Subtraction of Real Numbers 10.4 Multiplication and Division of Real Numbers PRE: Operations on Real Numbers 10.5 Order of Operations Group Activity: Checking Weather Predictions
 11 Solving Equations 11.1 Properties of Real Numbers 11.2 Simplifying Expressions 11.3 Addition and Subtraction Properties of Equality 11.4 Multiplication and Division Properties of Equality 11.5 Solving Equations with Multiple Steps PRE: Equations versus Expressions 11.6 Applications and Problem Solving Group Activity: Deciphering a Coded Message Additional Topics Appendix A.1 Energy and Power A.2 Scientific Notation A.3 Rectangular Coordinate System.
 (source: Nielsen Book Data)
(source: Nielsen Book Data)
 Online
Science Library (Li and Ma)
Science Library (Li and Ma)  Status 

Stacks  
QA37.3 .M55 2015  Unknown 