The Sullivan/Struve/Mazzarella Algebra Series was written to motivate students to "do the math" outside of the classroom through a design and organization that models what you do inside the classroom. The left-to-right annotations in the examples provide a teacher's voice through every step of the problem-solving process. The Sullivan exercise sets, which begin with Quick Checks to reinforce each example, present problem types of every possible derivation with a gradual increase in difficulty level. The new "Do the Math" Workbook acts as a companion to the text and to MyMathLab(R) by providing short warm-up exercises, guided practice examples, and additional "Do the Math" practice exercises for every section of the text. Operations on Real Numbers and Algebraic Expressions; Equations and Inequalities in One Variable; Introduction to Graphing and Equations of Lines; Systems of Linear Equations and Inequalities; Exponents and Polynomials; Factoring Polynomials; Rational Expresssions and Equations; Graphs, Relations, and Functions; Radicals and Rational Exponents; Quadratic Equations and Functions; Exponential and Logarithmic Functions; Conics; Sequences, Series, and the Binomial Theorem For all readers interested in beginning and intermediate algebra.
"Develops algebraic concepts through finding and creating spatial and number patterns"--Page 4.
Prentice Hall Algebra Two with Trigonometry
The book employs Kaufmann and Schwitters' straightforward, three-step approach to problem solving--which guides students in learning a skill, practicing the skill to solve equations, and then using the equations to solve applications ...
Kaufmann and Schwitters have built this text's reputation on clear and concise exposition, numerous examples, and plentiful problem sets.
Test Items and Chapter Tests for Kaufmann's Intermediate Algebra: Functions, Graphs, and Applications
Instructor's Solutions Manual for Kaufmann/Schwitters' Intermediate Algebra, Sixth Edition
College Algebra
This text's reputation is built on clear and concise exposition, numerous examples and plentiful problem sets.
Contains complete, worked-out solutions for odd problems.
Three nickels e . n nickels f . ( n − 2 ) nickels Ans . 5 ( 3 ) or 15 cents Ans . 5n cents Ans . 5 ( n − 2 ) cents 11. In a collection of coins there are four more dimes than quarters . If x represents the number of quarters ...