MyMathLab
1 total work
Developmental Mathematics with Applications and Visualization
by Gary Rockswold and Terry Krieger
Published 22 April 2014
The Rockswold/Krieger algebra series fosters conceptual understanding by using relevant applications and visualization to show students why math matters. It answers the common question, "When will I ever use this?" Rockswold teaches students the math in context, rather than including the applications at the end of the presentation. By seamlessly integrating meaningful applications that include real data and supporting visuals (graphs, tables, charts, colors, and diagrams), students are able to see how math impacts their lives as they learn the concepts. The authors believe this approach deepens conceptual understanding and better prepares students for future math courses and life. The new All-in-One Developmental Mathematics program offers everything needed to teach Prealgebra, Beginning Algebra, and Intermediate Algebra in one easy-to-use solution. The program includes a complete MyMathLab course with full eText (one Integrated Course Sequence MyMathLab code for all three courses!) and two print-on-demand options: Complete All-in-One textbook with all chapters, or customized text with selected chapters, in an A la Carte formatWorksheets with all chapters or customized with selected chapters Instructors can set it up in two easy steps: 1.) Create the MyMathLab course, and 2.) Choose the print option! KEY TOPICS: Whole Numbers; Integers; Algebraic Expressions and Linear Equations; Fractions; Decimals; Ratios, Proportions, and Measurement; Percents; Geometry; Linear Equations and Inequalities; Graphing Equations; Systems of Linear Equations in Two Variables; Polynomials and Exponents; Factoring Polynomials and Solving Equations; Rational Expressions; Introduction to Functions; Systems of Linear Equations; Radical Expressions and Functions; Quadratic Functions and Equations; Exponential and Logarithmic Functions; Conic Sections; Sequences and Series MARKET: For all readers interested in prealgebra, beginning algebra, and intermediate algebra.