Finite Mathematics for Business, Economics, Life Sciences, and Social Sciences, Global Edition - Raymond Barnett, Michael Ziegler, Karl Byleen, Christopher Stocker

Finite Mathematics for Business, Economics, Life Sciences, and Social Sciences, Global Edition

Buch | Softcover
716 Seiten
2019 | 14th edition
Pearson Education Limited (Verlag)
978-1-292-26420-2 (ISBN)
95,95 inkl. MwSt
Finite Mathematics for Business, Economics, Life Sciences, and Social Sciences, 14th Edition offers more built-in guidance than any other text for this course — with special emphasis on applications and prerequisite skills — and a host of student-friendly features to help students catch up or learn on their own.

About our authors Raymond A. Barnett, a native of California, received his B.A. in mathematical statistics from the University of California at Berkeley and his M.A. in mathematics from the University of Southern California. He has been a member of the Merritt College Mathematics Department, and was chairman of the department for 4 years. Raymond Barnett has authored or co-authored 18 textbooks in mathematics, most of which are still in use. In addition to international English editions, a number of books have been translated into Spanish. The late Michael R. Ziegler received his B.S. from Shippensburg State College and his M.S. and Ph.D. from the University of Delaware. After completing postdoctoral work at the University of Kentucky, he was appointed to the faculty of Marquette University where he held the rank of Professor in the Department of Mathematics, Statistics and Computer Science. Dr. Ziegler published over a dozen research articles in complex analysis and co-authored 11 undergraduate mathematics textbooks with Raymond A. Barnett, and more recently, Karl E. Byleen. Karl E. Byleen received his B.S., M.A. and Ph.D. degrees in mathematics from the University of Nebraska. He is currently an Associate Professor in the Department of Mathematics, Statistics and Computer Science of Marquette University. He has published a dozen research articles on the algebraic theory of semigroups. Christopher J. Stocker received his B.S. in mathematics and computer science from St. John's University in Minnesota and his M.A. and Ph.D. degrees in mathematics from the University of Illinois in Urbana-Champaign.  He is currently an Adjunct Assistant Professor in the Department of Mathematics, Statistics, and Computer Science of Marquette University.  He has published 8 research articles in the areas of graph theory and combinatorics.

I. A LIBRARY OF ELEMENTARY FUNCTIONS

1. Linear Equations and Graphs

1.1 Linear Equations and Inequalities
1.2 Graphs and Lines
1.3 Linear Regression
Chapter 1 Summary and Review
Review Exercises


2. Functions and Graphs

2.1 Functions
2.2 Elementary Functions: Graphs and Transformations
2.3 Quadratic Functions
2.4 Polynomial and Rational Functions
2.5 Exponential Functions
2.6 Logarithmic Functions
Chapter 2 Summary and Review
Review Exercises



II. FINITE MATHEMATICS

3. Mathematics of Finance

3.1 Simple Interest
3.2 Compound and Continuous Compound Interest
3.3 Future Value of an Annuity; Sinking Funds
3.4 Present Value of an Annuity; Amortization
Chapter 3 Summary and Review
Review Exercises


4. Systems of Linear Equations; Matrices

4.1 Review: Systems of Linear Equations in Two Variables
4.2 Systems of Linear Equations and Augmented Matrices
4.3 Gauss - Jordan Elimination
4.4 Matrices: Basic Operations
4.5 Inverse of a Square Matrix
4.6 Matrix Equations and Systems of Linear Equations
4.7 Leontief Input - Output Analysis
Chapter 4 Summary and Review
Review Exercises


5. Linear Inequalities and Linear Programming

5.1 Linear Inequalities in Two Variables
5.2 Systems of Linear Inequalities in Two Variables
5.3 Linear Programming in Two Dimensions: A Geometric Approach
Chapter 5 Summary and Review
Review Exercises


6. Linear Programming: The Simplex Method

6.1 The Table Method: An Introduction to the Simplex Method
6.2 The Simplex Method: Maximization with Problem Constraints of the Form ≤
6.3 The Dual Problem: Minimization with Problem Constraints of the Form ≥
6.4 Maximization and Minimization with Mixed Problem Constraints
Chapter 6 Summary and Review
Review Exercises


7. Logic, Sets, and Counting

7.1 Logic
7.2 Sets
7.3 Basic Counting Principles
7.4 Permutations and Combinations
Chapter 7 Summary and Review
Review Exercises


8. Probability

8.1 Sample Spaces, Events, and Probability
8.2 Union, Intersection, and Complement of Events; Odds
8.3 Conditional Probability, Intersection, and Independence
8.4 Bayes' Formula
8.5 Random Variable, Probability Distribution, and Expected Value
Chapter 8 Summary and Review
Review Exercises


9. Markov Chains

9.1 Properties of Markov Chains
9.2 Regular Markov Chains
9.3 Absorbing Markov Chains
Chapter 9 Summary and Review
Review Exercises


10. Data Description and Probability Distributions

10.1 Graphing Data
10.2 Measures of Central Tendency
10.3 Measures of Dispersion
10.4 Bernoulli Trials and Binomial Distributions
10.5 Normal Distributions
Chapter 10 Summary and Review
Review Exercises


11. Games and Decisions (online at goo.gl/6VBjkQ)

11.1 Strictly Determined Games
11.2 Mixed-Strategy Games
11.3 Linear Programming and 2 x 2 Games: A Geometric Approach
11.4 Linear Programming and m x n Games: Simplex Method and the Dual Problem
Chapter 11 Summary and Review
Review Exercises



Appendix A: Basic Algebra Review

A.1 Real Numbers
A.2 Operations on Polynomials
A.3 Factoring Polynomials
A.4 Operations on Rational Expressions
A.5 Integer Exponents and Scientific Notation
A.6 Rational Exponents and Radicals
A.7 Quadratic Equations

Appendix B: Special Topics (online at goo.gl/mjbXrG)

B.1 Sequences, Series, and Summation Notation
B.2 Arithmetic and Geometric Sequences
B.3 Binomial Theorem

Appendix C: Area under the Standard Normal Curve Answers Index Index of Applications

Erscheinungsdatum
Verlagsort Harlow
Sprache englisch
Maße 216 x 274 mm
Gewicht 1220 g
Themenwelt Mathematik / Informatik Mathematik Angewandte Mathematik
Mathematik / Informatik Mathematik Geometrie / Topologie
ISBN-10 1-292-26420-9 / 1292264209
ISBN-13 978-1-292-26420-2 / 9781292264202
Zustand Neuware
Haben Sie eine Frage zum Produkt?
Mehr entdecken
aus dem Bereich
Anwendungen und Theorie von Funktionen, Distributionen und Tensoren

von Michael Karbach

Buch | Softcover (2023)
De Gruyter Oldenbourg (Verlag)
69,95
Elastostatik

von Dietmar Gross; Werner Hauger; Jörg Schröder …

Buch | Softcover (2024)
Springer Vieweg (Verlag)
33,36