Loose Leaf Version for College Algebra: Graphs & Models
1st Edition
0077430840
·
9780077430849
© 2012 | Published: January 28, 2011
Three components contribute to a theme sustained throughout the Coburn-Herdlick Series: that of laying a firm foundation, building a solid framework, and providing strong connections. In the Graphs and Models texts, the authors combine their depth of…
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College Algebra: Graphs & Models Chapter R: A Review of Basic Concepts and Skills
Chapter R: A Review of Basic Concepts and Skills R.1: Algebraic Expressions and the Properties of Real Numbers R.2: Exponents, Scientific Notation, and a Review of Polynomials R.3: Factoring Polynomials and Solving Polynomial Equations by Factoring R.4: Rational Expressions and Equations R.5: Radicals, Rational Exponents, and Radical Equations Chapter 1: Functions and Graphs 1.1: Rectangular Coordinates, Graphing Circles and Other Relations1.2: Functions, Function Notation, and the Graph of a Function 1.3: Linear Equations and Rates of Change1.4: Linear Functions, Special Forms, and More on Rates of Change1.5: Solving Equations and Inequalities Graphically; Formulas and Problem Solving1.6: Linear Models and Real Data Chapter 2: Relations, More on Functions 2.1: Analyzing the Graph of a Function 2.2: The Toolbox Functions and Transformations 2.3: Absolute Value Functions, Equations, and Inequalities 2.4: Rational and Radical Functions; More on the Domain 2.5: Piecewise-Defined Functions 2.6: Variation: The Toolbox Functions in Action Chapter 3: Quadratic Functions and Operations on Functions 3.1: Complex Numbers 3.2: Solving Quadratic Equations and Inequalities 3.3: Quadratic Functions and Applications 3.4: Quadratic Models; More on Rates of Change 3.5: The Algebra of Functions 3.6: Composition of Functions and the Difference Quotient Chapter 4: Polynomial and Rational Functions 4.1: Synthetic Division; the Remainder and Factor Theorems 4.2: The Zeros of Polynomial Functions 4.3: Graphing Polynomial Functions 4.4: Graphing Rational Functions 4.5: Additional Insights into Rational Functions Chapter 5: Exponential and Logarithmic Functions 5.1: One-to-One and Inverse Functions 5.2: Exponential Functions 5.3: Logarithms and Logarithmic Functions 5.4: Properties of Logarithms 5.5: Solving Exponential/Logarithmic Equations 5.6: Applications from Business, Finance, and Science 5.7: Exponential, Logarithmic, and Logistic Equation Models Chapter 6: Systems of Equations and Inequalities 6.1: Linear Systems in Two Variables with Applications 6.2: Linear Systems in Three Variables with Applications 6.3: Nonlinear Systems of Equations and Inequalities 6.4: Systems of Inequalities and Linear Programming Chapter 7: Matrices and Matrix Applications 7.1: Solving Linear Systems Using Matrices and Row Operations 7.2: The Algebra of Matrices 7.3: Solving Linear Systems Using Matrix Equations 7.4: Applications of Matrices and Determinants: Cramer’s rule, Partial Fractions, and More Chapter 8: Analytic Geometry and the Conic Sections 8.1: A Brief Introduction to Analytic Geometry 8.2: The Circle and the Ellipse 8.3: The Hyperbola 8.4: The Analytic Parabola Chapter 9: Additional Topics in Algebra 9.1: Sequences and Series 9.2: Arithmetic Sequences 9.3: Geometric Sequences 9.4: Mathematical Induction 9.5: Counting Techniques 9.6: Introduction to Probability 9.7: The Binomial Theorem Appendices The Language, Notation, and Numbers of Mathematics Geometry Review with Unit Conversions More on Synthetic Division More on Matrices Deriving the Equation of a Conic Proof Positive - A Selection of Proofs from College Algebra
R.1: Algebraic Expressions and the Properties of Real Numbers R.2: Exponents, Scientific Notation, and a Review of Polynomials R.3: Factoring Polynomials and Solving Polynomial Equations by Factoring R.4: Rational Expressions and Equations R.5: Radicals, Rational Exponents, and Radical Equations Chapter 1: Functions and Graphs 1.1: Rectangular Coordinates, Graphing Circles and Other Relations1.2: Functions, Function Notation, and the Graph of a Function 1.3: Linear Equations and Rates of Change1.4: Linear Functions, Special Forms, and More on Rates of Change1.5: Solving Equations and Inequalities Graphically; Formulas and Problem Solving1.6: Linear Models and Real Data Chapter 2: Relations, More on Functions 2.1: Analyzing the Graph of a Function 2.2: The Toolbox Functions and Transformations 2.3: Absolute Value Functions, Equations, and Inequalities 2.4: Rational and Radical Functions; More on the Domain 2.5: Piecewise-Defined Functions 2.6: Variation: The Toolbox Functions in Action Chapter 3: Quadratic Functions and Operations on Functions 3.1: Complex Numbers 3.2: Solving Quadratic Equations and Inequalities 3.3: Quadratic Functions and Applications 3.4: Quadratic Models; More on Rates of Change 3.5: The Algebra of Functions 3.6: Composition of Functions and the Difference Quotient Chapter 4: Polynomial and Rational Functions 4.1: Synthetic Division; the Remainder and Factor Theorems 4.2: The Zeros of Polynomial Functions 4.3: Graphing Polynomial Functions 4.4: Graphing Rational Functions 4.5: Additional Insights into Rational Functions Chapter 5: Exponential and Logarithmic Functions 5.1: One-to-One and Inverse Functions 5.2: Exponential Functions 5.3: Logarithms and Logarithmic Functions 5.4: Properties of Logarithms 5.5: Solving Exponential/Logarithmic Equations 5.6: Applications from Business, Finance, and Science 5.7: Exponential, Logarithmic, and Logistic Equation Models Chapter 6: Systems of Equations and Inequalities 6.1: Linear Systems in Two Variables with Applications 6.2: Linear Systems in Three Variables with Applications 6.3: Nonlinear Systems of Equations and Inequalities 6.4: Systems of Inequalities and Linear Programming Chapter 7: Matrices and Matrix Applications 7.1: Solving Linear Systems Using Matrices and Row Operations 7.2: The Algebra of Matrices 7.3: Solving Linear Systems Using Matrix Equations 7.4: Applications of Matrices and Determinants: Cramer’s rule, Partial Fractions, and More Chapter 8: Analytic Geometry and the Conic Sections 8.1: A Brief Introduction to Analytic Geometry 8.2: The Circle and the Ellipse 8.3: The Hyperbola 8.4: The Analytic Parabola Chapter 9: Additional Topics in Algebra 9.1: Sequences and Series 9.2: Arithmetic Sequences 9.3: Geometric Sequences 9.4: Mathematical Induction 9.5: Counting Techniques 9.6: Introduction to Probability 9.7: The Binomial Theorem Appendices The Language, Notation, and Numbers of Mathematics Geometry Review with Unit Conversions More on Synthetic Division More on Matrices Deriving the Equation of a Conic Proof Positive - A Selection of Proofs from College Algebra
R.3: Factoring Polynomials and Solving Polynomial Equations by Factoring R.4: Rational Expressions and Equations R.5: Radicals, Rational Exponents, and Radical Equations Chapter 1: Functions and Graphs 1.1: Rectangular Coordinates, Graphing Circles and Other Relations1.2: Functions, Function Notation, and the Graph of a Function 1.3: Linear Equations and Rates of Change1.4: Linear Functions, Special Forms, and More on Rates of Change1.5: Solving Equations and Inequalities Graphically; Formulas and Problem Solving1.6: Linear Models and Real Data Chapter 2: Relations, More on Functions 2.1: Analyzing the Graph of a Function 2.2: The Toolbox Functions and Transformations 2.3: Absolute Value Functions, Equations, and Inequalities 2.4: Rational and Radical Functions; More on the Domain 2.5: Piecewise-Defined Functions 2.6: Variation: The Toolbox Functions in Action Chapter 3: Quadratic Functions and Operations on Functions 3.1: Complex Numbers 3.2: Solving Quadratic Equations and Inequalities 3.3: Quadratic Functions and Applications 3.4: Quadratic Models; More on Rates of Change 3.5: The Algebra of Functions 3.6: Composition of Functions and the Difference Quotient Chapter 4: Polynomial and Rational Functions 4.1: Synthetic Division; the Remainder and Factor Theorems 4.2: The Zeros of Polynomial Functions 4.3: Graphing Polynomial Functions 4.4: Graphing Rational Functions 4.5: Additional Insights into Rational Functions Chapter 5: Exponential and Logarithmic Functions 5.1: One-to-One and Inverse Functions 5.2: Exponential Functions 5.3: Logarithms and Logarithmic Functions 5.4: Properties of Logarithms 5.5: Solving Exponential/Logarithmic Equations 5.6: Applications from Business, Finance, and Science 5.7: Exponential, Logarithmic, and Logistic Equation Models Chapter 6: Systems of Equations and Inequalities 6.1: Linear Systems in Two Variables with Applications 6.2: Linear Systems in Three Variables with Applications 6.3: Nonlinear Systems of Equations and Inequalities 6.4: Systems of Inequalities and Linear Programming Chapter 7: Matrices and Matrix Applications 7.1: Solving Linear Systems Using Matrices and Row Operations 7.2: The Algebra of Matrices 7.3: Solving Linear Systems Using Matrix Equations 7.4: Applications of Matrices and Determinants: Cramer’s rule, Partial Fractions, and More Chapter 8: Analytic Geometry and the Conic Sections 8.1: A Brief Introduction to Analytic Geometry 8.2: The Circle and the Ellipse 8.3: The Hyperbola 8.4: The Analytic Parabola Chapter 9: Additional Topics in Algebra 9.1: Sequences and Series 9.2: Arithmetic Sequences 9.3: Geometric Sequences 9.4: Mathematical Induction 9.5: Counting Techniques 9.6: Introduction to Probability 9.7: The Binomial Theorem Appendices The Language, Notation, and Numbers of Mathematics Geometry Review with Unit Conversions More on Synthetic Division More on Matrices Deriving the Equation of a Conic Proof Positive - A Selection of Proofs from College Algebra
R.5: Radicals, Rational Exponents, and Radical Equations Chapter 1: Functions and Graphs 1.1: Rectangular Coordinates, Graphing Circles and Other Relations1.2: Functions, Function Notation, and the Graph of a Function 1.3: Linear Equations and Rates of Change1.4: Linear Functions, Special Forms, and More on Rates of Change1.5: Solving Equations and Inequalities Graphically; Formulas and Problem Solving1.6: Linear Models and Real Data Chapter 2: Relations, More on Functions 2.1: Analyzing the Graph of a Function 2.2: The Toolbox Functions and Transformations 2.3: Absolute Value Functions, Equations, and Inequalities 2.4: Rational and Radical Functions; More on the Domain 2.5: Piecewise-Defined Functions 2.6: Variation: The Toolbox Functions in Action Chapter 3: Quadratic Functions and Operations on Functions 3.1: Complex Numbers 3.2: Solving Quadratic Equations and Inequalities 3.3: Quadratic Functions and Applications 3.4: Quadratic Models; More on Rates of Change 3.5: The Algebra of Functions 3.6: Composition of Functions and the Difference Quotient Chapter 4: Polynomial and Rational Functions 4.1: Synthetic Division; the Remainder and Factor Theorems 4.2: The Zeros of Polynomial Functions 4.3: Graphing Polynomial Functions 4.4: Graphing Rational Functions 4.5: Additional Insights into Rational Functions Chapter 5: Exponential and Logarithmic Functions 5.1: One-to-One and Inverse Functions 5.2: Exponential Functions 5.3: Logarithms and Logarithmic Functions 5.4: Properties of Logarithms 5.5: Solving Exponential/Logarithmic Equations 5.6: Applications from Business, Finance, and Science 5.7: Exponential, Logarithmic, and Logistic Equation Models Chapter 6: Systems of Equations and Inequalities 6.1: Linear Systems in Two Variables with Applications 6.2: Linear Systems in Three Variables with Applications 6.3: Nonlinear Systems of Equations and Inequalities 6.4: Systems of Inequalities and Linear Programming Chapter 7: Matrices and Matrix Applications 7.1: Solving Linear Systems Using Matrices and Row Operations 7.2: The Algebra of Matrices 7.3: Solving Linear Systems Using Matrix Equations 7.4: Applications of Matrices and Determinants: Cramer’s rule, Partial Fractions, and More Chapter 8: Analytic Geometry and the Conic Sections 8.1: A Brief Introduction to Analytic Geometry 8.2: The Circle and the Ellipse 8.3: The Hyperbola 8.4: The Analytic Parabola Chapter 9: Additional Topics in Algebra 9.1: Sequences and Series 9.2: Arithmetic Sequences 9.3: Geometric Sequences 9.4: Mathematical Induction 9.5: Counting Techniques 9.6: Introduction to Probability 9.7: The Binomial Theorem Appendices The Language, Notation, and Numbers of Mathematics Geometry Review with Unit Conversions More on Synthetic Division More on Matrices Deriving the Equation of a Conic Proof Positive - A Selection of Proofs from College Algebra
1.1: Rectangular Coordinates, Graphing Circles and Other Relations1.2: Functions, Function Notation, and the Graph of a Function 1.3: Linear Equations and Rates of Change1.4: Linear Functions, Special Forms, and More on Rates of Change1.5: Solving Equations and Inequalities Graphically; Formulas and Problem Solving1.6: Linear Models and Real Data Chapter 2: Relations, More on Functions 2.1: Analyzing the Graph of a Function 2.2: The Toolbox Functions and Transformations 2.3: Absolute Value Functions, Equations, and Inequalities 2.4: Rational and Radical Functions; More on the Domain 2.5: Piecewise-Defined Functions 2.6: Variation: The Toolbox Functions in Action Chapter 3: Quadratic Functions and Operations on Functions 3.1: Complex Numbers 3.2: Solving Quadratic Equations and Inequalities 3.3: Quadratic Functions and Applications 3.4: Quadratic Models; More on Rates of Change 3.5: The Algebra of Functions 3.6: Composition of Functions and the Difference Quotient Chapter 4: Polynomial and Rational Functions 4.1: Synthetic Division; the Remainder and Factor Theorems 4.2: The Zeros of Polynomial Functions 4.3: Graphing Polynomial Functions 4.4: Graphing Rational Functions 4.5: Additional Insights into Rational Functions Chapter 5: Exponential and Logarithmic Functions 5.1: One-to-One and Inverse Functions 5.2: Exponential Functions 5.3: Logarithms and Logarithmic Functions 5.4: Properties of Logarithms 5.5: Solving Exponential/Logarithmic Equations 5.6: Applications from Business, Finance, and Science 5.7: Exponential, Logarithmic, and Logistic Equation Models Chapter 6: Systems of Equations and Inequalities 6.1: Linear Systems in Two Variables with Applications 6.2: Linear Systems in Three Variables with Applications 6.3: Nonlinear Systems of Equations and Inequalities 6.4: Systems of Inequalities and Linear Programming Chapter 7: Matrices and Matrix Applications 7.1: Solving Linear Systems Using Matrices and Row Operations 7.2: The Algebra of Matrices 7.3: Solving Linear Systems Using Matrix Equations 7.4: Applications of Matrices and Determinants: Cramer’s rule, Partial Fractions, and More Chapter 8: Analytic Geometry and the Conic Sections 8.1: A Brief Introduction to Analytic Geometry 8.2: The Circle and the Ellipse 8.3: The Hyperbola 8.4: The Analytic Parabola Chapter 9: Additional Topics in Algebra 9.1: Sequences and Series 9.2: Arithmetic Sequences 9.3: Geometric Sequences 9.4: Mathematical Induction 9.5: Counting Techniques 9.6: Introduction to Probability 9.7: The Binomial Theorem Appendices The Language, Notation, and Numbers of Mathematics Geometry Review with Unit Conversions More on Synthetic Division More on Matrices Deriving the Equation of a Conic Proof Positive - A Selection of Proofs from College Algebra
1.3: Linear Equations and Rates of Change1.4: Linear Functions, Special Forms, and More on Rates of Change1.5: Solving Equations and Inequalities Graphically; Formulas and Problem Solving1.6: Linear Models and Real Data Chapter 2: Relations, More on Functions 2.1: Analyzing the Graph of a Function 2.2: The Toolbox Functions and Transformations 2.3: Absolute Value Functions, Equations, and Inequalities 2.4: Rational and Radical Functions; More on the Domain 2.5: Piecewise-Defined Functions 2.6: Variation: The Toolbox Functions in Action Chapter 3: Quadratic Functions and Operations on Functions 3.1: Complex Numbers 3.2: Solving Quadratic Equations and Inequalities 3.3: Quadratic Functions and Applications 3.4: Quadratic Models; More on Rates of Change 3.5: The Algebra of Functions 3.6: Composition of Functions and the Difference Quotient Chapter 4: Polynomial and Rational Functions 4.1: Synthetic Division; the Remainder and Factor Theorems 4.2: The Zeros of Polynomial Functions 4.3: Graphing Polynomial Functions 4.4: Graphing Rational Functions 4.5: Additional Insights into Rational Functions Chapter 5: Exponential and Logarithmic Functions 5.1: One-to-One and Inverse Functions 5.2: Exponential Functions 5.3: Logarithms and Logarithmic Functions 5.4: Properties of Logarithms 5.5: Solving Exponential/Logarithmic Equations 5.6: Applications from Business, Finance, and Science 5.7: Exponential, Logarithmic, and Logistic Equation Models Chapter 6: Systems of Equations and Inequalities 6.1: Linear Systems in Two Variables with Applications 6.2: Linear Systems in Three Variables with Applications 6.3: Nonlinear Systems of Equations and Inequalities 6.4: Systems of Inequalities and Linear Programming Chapter 7: Matrices and Matrix Applications 7.1: Solving Linear Systems Using Matrices and Row Operations 7.2: The Algebra of Matrices 7.3: Solving Linear Systems Using Matrix Equations 7.4: Applications of Matrices and Determinants: Cramer’s rule, Partial Fractions, and More Chapter 8: Analytic Geometry and the Conic Sections 8.1: A Brief Introduction to Analytic Geometry 8.2: The Circle and the Ellipse 8.3: The Hyperbola 8.4: The Analytic Parabola Chapter 9: Additional Topics in Algebra 9.1: Sequences and Series 9.2: Arithmetic Sequences 9.3: Geometric Sequences 9.4: Mathematical Induction 9.5: Counting Techniques 9.6: Introduction to Probability 9.7: The Binomial Theorem Appendices The Language, Notation, and Numbers of Mathematics Geometry Review with Unit Conversions More on Synthetic Division More on Matrices Deriving the Equation of a Conic Proof Positive - A Selection of Proofs from College Algebra
1.5: Solving Equations and Inequalities Graphically; Formulas and Problem Solving1.6: Linear Models and Real Data Chapter 2: Relations, More on Functions 2.1: Analyzing the Graph of a Function 2.2: The Toolbox Functions and Transformations 2.3: Absolute Value Functions, Equations, and Inequalities 2.4: Rational and Radical Functions; More on the Domain 2.5: Piecewise-Defined Functions 2.6: Variation: The Toolbox Functions in Action Chapter 3: Quadratic Functions and Operations on Functions 3.1: Complex Numbers 3.2: Solving Quadratic Equations and Inequalities 3.3: Quadratic Functions and Applications 3.4: Quadratic Models; More on Rates of Change 3.5: The Algebra of Functions 3.6: Composition of Functions and the Difference Quotient Chapter 4: Polynomial and Rational Functions 4.1: Synthetic Division; the Remainder and Factor Theorems 4.2: The Zeros of Polynomial Functions 4.3: Graphing Polynomial Functions 4.4: Graphing Rational Functions 4.5: Additional Insights into Rational Functions Chapter 5: Exponential and Logarithmic Functions 5.1: One-to-One and Inverse Functions 5.2: Exponential Functions 5.3: Logarithms and Logarithmic Functions 5.4: Properties of Logarithms 5.5: Solving Exponential/Logarithmic Equations 5.6: Applications from Business, Finance, and Science 5.7: Exponential, Logarithmic, and Logistic Equation Models Chapter 6: Systems of Equations and Inequalities 6.1: Linear Systems in Two Variables with Applications 6.2: Linear Systems in Three Variables with Applications 6.3: Nonlinear Systems of Equations and Inequalities 6.4: Systems of Inequalities and Linear Programming Chapter 7: Matrices and Matrix Applications 7.1: Solving Linear Systems Using Matrices and Row Operations 7.2: The Algebra of Matrices 7.3: Solving Linear Systems Using Matrix Equations 7.4: Applications of Matrices and Determinants: Cramer’s rule, Partial Fractions, and More Chapter 8: Analytic Geometry and the Conic Sections 8.1: A Brief Introduction to Analytic Geometry 8.2: The Circle and the Ellipse 8.3: The Hyperbola 8.4: The Analytic Parabola Chapter 9: Additional Topics in Algebra 9.1: Sequences and Series 9.2: Arithmetic Sequences 9.3: Geometric Sequences 9.4: Mathematical Induction 9.5: Counting Techniques 9.6: Introduction to Probability 9.7: The Binomial Theorem Appendices The Language, Notation, and Numbers of Mathematics Geometry Review with Unit Conversions More on Synthetic Division More on Matrices Deriving the Equation of a Conic Proof Positive - A Selection of Proofs from College Algebra
Chapter 2: Relations, More on Functions 2.1: Analyzing the Graph of a Function 2.2: The Toolbox Functions and Transformations 2.3: Absolute Value Functions, Equations, and Inequalities 2.4: Rational and Radical Functions; More on the Domain 2.5: Piecewise-Defined Functions 2.6: Variation: The Toolbox Functions in Action Chapter 3: Quadratic Functions and Operations on Functions 3.1: Complex Numbers 3.2: Solving Quadratic Equations and Inequalities 3.3: Quadratic Functions and Applications 3.4: Quadratic Models; More on Rates of Change 3.5: The Algebra of Functions 3.6: Composition of Functions and the Difference Quotient Chapter 4: Polynomial and Rational Functions 4.1: Synthetic Division; the Remainder and Factor Theorems 4.2: The Zeros of Polynomial Functions 4.3: Graphing Polynomial Functions 4.4: Graphing Rational Functions 4.5: Additional Insights into Rational Functions Chapter 5: Exponential and Logarithmic Functions 5.1: One-to-One and Inverse Functions 5.2: Exponential Functions 5.3: Logarithms and Logarithmic Functions 5.4: Properties of Logarithms 5.5: Solving Exponential/Logarithmic Equations 5.6: Applications from Business, Finance, and Science 5.7: Exponential, Logarithmic, and Logistic Equation Models Chapter 6: Systems of Equations and Inequalities 6.1: Linear Systems in Two Variables with Applications 6.2: Linear Systems in Three Variables with Applications 6.3: Nonlinear Systems of Equations and Inequalities 6.4: Systems of Inequalities and Linear Programming Chapter 7: Matrices and Matrix Applications 7.1: Solving Linear Systems Using Matrices and Row Operations 7.2: The Algebra of Matrices 7.3: Solving Linear Systems Using Matrix Equations 7.4: Applications of Matrices and Determinants: Cramer’s rule, Partial Fractions, and More Chapter 8: Analytic Geometry and the Conic Sections 8.1: A Brief Introduction to Analytic Geometry 8.2: The Circle and the Ellipse 8.3: The Hyperbola 8.4: The Analytic Parabola Chapter 9: Additional Topics in Algebra 9.1: Sequences and Series 9.2: Arithmetic Sequences 9.3: Geometric Sequences 9.4: Mathematical Induction 9.5: Counting Techniques 9.6: Introduction to Probability 9.7: The Binomial Theorem Appendices The Language, Notation, and Numbers of Mathematics Geometry Review with Unit Conversions More on Synthetic Division More on Matrices Deriving the Equation of a Conic Proof Positive - A Selection of Proofs from College Algebra
2.2: The Toolbox Functions and Transformations 2.3: Absolute Value Functions, Equations, and Inequalities 2.4: Rational and Radical Functions; More on the Domain 2.5: Piecewise-Defined Functions 2.6: Variation: The Toolbox Functions in Action Chapter 3: Quadratic Functions and Operations on Functions 3.1: Complex Numbers 3.2: Solving Quadratic Equations and Inequalities 3.3: Quadratic Functions and Applications 3.4: Quadratic Models; More on Rates of Change 3.5: The Algebra of Functions 3.6: Composition of Functions and the Difference Quotient Chapter 4: Polynomial and Rational Functions 4.1: Synthetic Division; the Remainder and Factor Theorems 4.2: The Zeros of Polynomial Functions 4.3: Graphing Polynomial Functions 4.4: Graphing Rational Functions 4.5: Additional Insights into Rational Functions Chapter 5: Exponential and Logarithmic Functions 5.1: One-to-One and Inverse Functions 5.2: Exponential Functions 5.3: Logarithms and Logarithmic Functions 5.4: Properties of Logarithms 5.5: Solving Exponential/Logarithmic Equations 5.6: Applications from Business, Finance, and Science 5.7: Exponential, Logarithmic, and Logistic Equation Models Chapter 6: Systems of Equations and Inequalities 6.1: Linear Systems in Two Variables with Applications 6.2: Linear Systems in Three Variables with Applications 6.3: Nonlinear Systems of Equations and Inequalities 6.4: Systems of Inequalities and Linear Programming Chapter 7: Matrices and Matrix Applications 7.1: Solving Linear Systems Using Matrices and Row Operations 7.2: The Algebra of Matrices 7.3: Solving Linear Systems Using Matrix Equations 7.4: Applications of Matrices and Determinants: Cramer’s rule, Partial Fractions, and More Chapter 8: Analytic Geometry and the Conic Sections 8.1: A Brief Introduction to Analytic Geometry 8.2: The Circle and the Ellipse 8.3: The Hyperbola 8.4: The Analytic Parabola Chapter 9: Additional Topics in Algebra 9.1: Sequences and Series 9.2: Arithmetic Sequences 9.3: Geometric Sequences 9.4: Mathematical Induction 9.5: Counting Techniques 9.6: Introduction to Probability 9.7: The Binomial Theorem Appendices The Language, Notation, and Numbers of Mathematics Geometry Review with Unit Conversions More on Synthetic Division More on Matrices Deriving the Equation of a Conic Proof Positive - A Selection of Proofs from College Algebra
2.4: Rational and Radical Functions; More on the Domain 2.5: Piecewise-Defined Functions 2.6: Variation: The Toolbox Functions in Action Chapter 3: Quadratic Functions and Operations on Functions 3.1: Complex Numbers 3.2: Solving Quadratic Equations and Inequalities 3.3: Quadratic Functions and Applications 3.4: Quadratic Models; More on Rates of Change 3.5: The Algebra of Functions 3.6: Composition of Functions and the Difference Quotient Chapter 4: Polynomial and Rational Functions 4.1: Synthetic Division; the Remainder and Factor Theorems 4.2: The Zeros of Polynomial Functions 4.3: Graphing Polynomial Functions 4.4: Graphing Rational Functions 4.5: Additional Insights into Rational Functions Chapter 5: Exponential and Logarithmic Functions 5.1: One-to-One and Inverse Functions 5.2: Exponential Functions 5.3: Logarithms and Logarithmic Functions 5.4: Properties of Logarithms 5.5: Solving Exponential/Logarithmic Equations 5.6: Applications from Business, Finance, and Science 5.7: Exponential, Logarithmic, and Logistic Equation Models Chapter 6: Systems of Equations and Inequalities 6.1: Linear Systems in Two Variables with Applications 6.2: Linear Systems in Three Variables with Applications 6.3: Nonlinear Systems of Equations and Inequalities 6.4: Systems of Inequalities and Linear Programming Chapter 7: Matrices and Matrix Applications 7.1: Solving Linear Systems Using Matrices and Row Operations 7.2: The Algebra of Matrices 7.3: Solving Linear Systems Using Matrix Equations 7.4: Applications of Matrices and Determinants: Cramer’s rule, Partial Fractions, and More Chapter 8: Analytic Geometry and the Conic Sections 8.1: A Brief Introduction to Analytic Geometry 8.2: The Circle and the Ellipse 8.3: The Hyperbola 8.4: The Analytic Parabola Chapter 9: Additional Topics in Algebra 9.1: Sequences and Series 9.2: Arithmetic Sequences 9.3: Geometric Sequences 9.4: Mathematical Induction 9.5: Counting Techniques 9.6: Introduction to Probability 9.7: The Binomial Theorem Appendices The Language, Notation, and Numbers of Mathematics Geometry Review with Unit Conversions More on Synthetic Division More on Matrices Deriving the Equation of a Conic Proof Positive - A Selection of Proofs from College Algebra
2.6: Variation: The Toolbox Functions in Action Chapter 3: Quadratic Functions and Operations on Functions 3.1: Complex Numbers 3.2: Solving Quadratic Equations and Inequalities 3.3: Quadratic Functions and Applications 3.4: Quadratic Models; More on Rates of Change 3.5: The Algebra of Functions 3.6: Composition of Functions and the Difference Quotient Chapter 4: Polynomial and Rational Functions 4.1: Synthetic Division; the Remainder and Factor Theorems 4.2: The Zeros of Polynomial Functions 4.3: Graphing Polynomial Functions 4.4: Graphing Rational Functions 4.5: Additional Insights into Rational Functions Chapter 5: Exponential and Logarithmic Functions 5.1: One-to-One and Inverse Functions 5.2: Exponential Functions 5.3: Logarithms and Logarithmic Functions 5.4: Properties of Logarithms 5.5: Solving Exponential/Logarithmic Equations 5.6: Applications from Business, Finance, and Science 5.7: Exponential, Logarithmic, and Logistic Equation Models Chapter 6: Systems of Equations and Inequalities 6.1: Linear Systems in Two Variables with Applications 6.2: Linear Systems in Three Variables with Applications 6.3: Nonlinear Systems of Equations and Inequalities 6.4: Systems of Inequalities and Linear Programming Chapter 7: Matrices and Matrix Applications 7.1: Solving Linear Systems Using Matrices and Row Operations 7.2: The Algebra of Matrices 7.3: Solving Linear Systems Using Matrix Equations 7.4: Applications of Matrices and Determinants: Cramer’s rule, Partial Fractions, and More Chapter 8: Analytic Geometry and the Conic Sections 8.1: A Brief Introduction to Analytic Geometry 8.2: The Circle and the Ellipse 8.3: The Hyperbola 8.4: The Analytic Parabola Chapter 9: Additional Topics in Algebra 9.1: Sequences and Series 9.2: Arithmetic Sequences 9.3: Geometric Sequences 9.4: Mathematical Induction 9.5: Counting Techniques 9.6: Introduction to Probability 9.7: The Binomial Theorem Appendices The Language, Notation, and Numbers of Mathematics Geometry Review with Unit Conversions More on Synthetic Division More on Matrices Deriving the Equation of a Conic Proof Positive - A Selection of Proofs from College Algebra
3.1: Complex Numbers 3.2: Solving Quadratic Equations and Inequalities 3.3: Quadratic Functions and Applications 3.4: Quadratic Models; More on Rates of Change 3.5: The Algebra of Functions 3.6: Composition of Functions and the Difference Quotient Chapter 4: Polynomial and Rational Functions 4.1: Synthetic Division; the Remainder and Factor Theorems 4.2: The Zeros of Polynomial Functions 4.3: Graphing Polynomial Functions 4.4: Graphing Rational Functions 4.5: Additional Insights into Rational Functions Chapter 5: Exponential and Logarithmic Functions 5.1: One-to-One and Inverse Functions 5.2: Exponential Functions 5.3: Logarithms and Logarithmic Functions 5.4: Properties of Logarithms 5.5: Solving Exponential/Logarithmic Equations 5.6: Applications from Business, Finance, and Science 5.7: Exponential, Logarithmic, and Logistic Equation Models Chapter 6: Systems of Equations and Inequalities 6.1: Linear Systems in Two Variables with Applications 6.2: Linear Systems in Three Variables with Applications 6.3: Nonlinear Systems of Equations and Inequalities 6.4: Systems of Inequalities and Linear Programming Chapter 7: Matrices and Matrix Applications 7.1: Solving Linear Systems Using Matrices and Row Operations 7.2: The Algebra of Matrices 7.3: Solving Linear Systems Using Matrix Equations 7.4: Applications of Matrices and Determinants: Cramer’s rule, Partial Fractions, and More Chapter 8: Analytic Geometry and the Conic Sections 8.1: A Brief Introduction to Analytic Geometry 8.2: The Circle and the Ellipse 8.3: The Hyperbola 8.4: The Analytic Parabola Chapter 9: Additional Topics in Algebra 9.1: Sequences and Series 9.2: Arithmetic Sequences 9.3: Geometric Sequences 9.4: Mathematical Induction 9.5: Counting Techniques 9.6: Introduction to Probability 9.7: The Binomial Theorem Appendices The Language, Notation, and Numbers of Mathematics Geometry Review with Unit Conversions More on Synthetic Division More on Matrices Deriving the Equation of a Conic Proof Positive - A Selection of Proofs from College Algebra
3.3: Quadratic Functions and Applications 3.4: Quadratic Models; More on Rates of Change 3.5: The Algebra of Functions 3.6: Composition of Functions and the Difference Quotient Chapter 4: Polynomial and Rational Functions 4.1: Synthetic Division; the Remainder and Factor Theorems 4.2: The Zeros of Polynomial Functions 4.3: Graphing Polynomial Functions 4.4: Graphing Rational Functions 4.5: Additional Insights into Rational Functions Chapter 5: Exponential and Logarithmic Functions 5.1: One-to-One and Inverse Functions 5.2: Exponential Functions 5.3: Logarithms and Logarithmic Functions 5.4: Properties of Logarithms 5.5: Solving Exponential/Logarithmic Equations 5.6: Applications from Business, Finance, and Science 5.7: Exponential, Logarithmic, and Logistic Equation Models Chapter 6: Systems of Equations and Inequalities 6.1: Linear Systems in Two Variables with Applications 6.2: Linear Systems in Three Variables with Applications 6.3: Nonlinear Systems of Equations and Inequalities 6.4: Systems of Inequalities and Linear Programming Chapter 7: Matrices and Matrix Applications 7.1: Solving Linear Systems Using Matrices and Row Operations 7.2: The Algebra of Matrices 7.3: Solving Linear Systems Using Matrix Equations 7.4: Applications of Matrices and Determinants: Cramer’s rule, Partial Fractions, and More Chapter 8: Analytic Geometry and the Conic Sections 8.1: A Brief Introduction to Analytic Geometry 8.2: The Circle and the Ellipse 8.3: The Hyperbola 8.4: The Analytic Parabola Chapter 9: Additional Topics in Algebra 9.1: Sequences and Series 9.2: Arithmetic Sequences 9.3: Geometric Sequences 9.4: Mathematical Induction 9.5: Counting Techniques 9.6: Introduction to Probability 9.7: The Binomial Theorem Appendices The Language, Notation, and Numbers of Mathematics Geometry Review with Unit Conversions More on Synthetic Division More on Matrices Deriving the Equation of a Conic Proof Positive - A Selection of Proofs from College Algebra
3.5: The Algebra of Functions 3.6: Composition of Functions and the Difference Quotient Chapter 4: Polynomial and Rational Functions 4.1: Synthetic Division; the Remainder and Factor Theorems 4.2: The Zeros of Polynomial Functions 4.3: Graphing Polynomial Functions 4.4: Graphing Rational Functions 4.5: Additional Insights into Rational Functions Chapter 5: Exponential and Logarithmic Functions 5.1: One-to-One and Inverse Functions 5.2: Exponential Functions 5.3: Logarithms and Logarithmic Functions 5.4: Properties of Logarithms 5.5: Solving Exponential/Logarithmic Equations 5.6: Applications from Business, Finance, and Science 5.7: Exponential, Logarithmic, and Logistic Equation Models Chapter 6: Systems of Equations and Inequalities 6.1: Linear Systems in Two Variables with Applications 6.2: Linear Systems in Three Variables with Applications 6.3: Nonlinear Systems of Equations and Inequalities 6.4: Systems of Inequalities and Linear Programming Chapter 7: Matrices and Matrix Applications 7.1: Solving Linear Systems Using Matrices and Row Operations 7.2: The Algebra of Matrices 7.3: Solving Linear Systems Using Matrix Equations 7.4: Applications of Matrices and Determinants: Cramer’s rule, Partial Fractions, and More Chapter 8: Analytic Geometry and the Conic Sections 8.1: A Brief Introduction to Analytic Geometry 8.2: The Circle and the Ellipse 8.3: The Hyperbola 8.4: The Analytic Parabola Chapter 9: Additional Topics in Algebra 9.1: Sequences and Series 9.2: Arithmetic Sequences 9.3: Geometric Sequences 9.4: Mathematical Induction 9.5: Counting Techniques 9.6: Introduction to Probability 9.7: The Binomial Theorem Appendices The Language, Notation, and Numbers of Mathematics Geometry Review with Unit Conversions More on Synthetic Division More on Matrices Deriving the Equation of a Conic Proof Positive - A Selection of Proofs from College Algebra
Chapter 4: Polynomial and Rational Functions 4.1: Synthetic Division; the Remainder and Factor Theorems 4.2: The Zeros of Polynomial Functions 4.3: Graphing Polynomial Functions 4.4: Graphing Rational Functions 4.5: Additional Insights into Rational Functions Chapter 5: Exponential and Logarithmic Functions 5.1: One-to-One and Inverse Functions 5.2: Exponential Functions 5.3: Logarithms and Logarithmic Functions 5.4: Properties of Logarithms 5.5: Solving Exponential/Logarithmic Equations 5.6: Applications from Business, Finance, and Science 5.7: Exponential, Logarithmic, and Logistic Equation Models Chapter 6: Systems of Equations and Inequalities 6.1: Linear Systems in Two Variables with Applications 6.2: Linear Systems in Three Variables with Applications 6.3: Nonlinear Systems of Equations and Inequalities 6.4: Systems of Inequalities and Linear Programming Chapter 7: Matrices and Matrix Applications 7.1: Solving Linear Systems Using Matrices and Row Operations 7.2: The Algebra of Matrices 7.3: Solving Linear Systems Using Matrix Equations 7.4: Applications of Matrices and Determinants: Cramer’s rule, Partial Fractions, and More Chapter 8: Analytic Geometry and the Conic Sections 8.1: A Brief Introduction to Analytic Geometry 8.2: The Circle and the Ellipse 8.3: The Hyperbola 8.4: The Analytic Parabola Chapter 9: Additional Topics in Algebra 9.1: Sequences and Series 9.2: Arithmetic Sequences 9.3: Geometric Sequences 9.4: Mathematical Induction 9.5: Counting Techniques 9.6: Introduction to Probability 9.7: The Binomial Theorem Appendices The Language, Notation, and Numbers of Mathematics Geometry Review with Unit Conversions More on Synthetic Division More on Matrices Deriving the Equation of a Conic Proof Positive - A Selection of Proofs from College Algebra
4.2: The Zeros of Polynomial Functions 4.3: Graphing Polynomial Functions 4.4: Graphing Rational Functions 4.5: Additional Insights into Rational Functions Chapter 5: Exponential and Logarithmic Functions 5.1: One-to-One and Inverse Functions 5.2: Exponential Functions 5.3: Logarithms and Logarithmic Functions 5.4: Properties of Logarithms 5.5: Solving Exponential/Logarithmic Equations 5.6: Applications from Business, Finance, and Science 5.7: Exponential, Logarithmic, and Logistic Equation Models Chapter 6: Systems of Equations and Inequalities 6.1: Linear Systems in Two Variables with Applications 6.2: Linear Systems in Three Variables with Applications 6.3: Nonlinear Systems of Equations and Inequalities 6.4: Systems of Inequalities and Linear Programming Chapter 7: Matrices and Matrix Applications 7.1: Solving Linear Systems Using Matrices and Row Operations 7.2: The Algebra of Matrices 7.3: Solving Linear Systems Using Matrix Equations 7.4: Applications of Matrices and Determinants: Cramer’s rule, Partial Fractions, and More Chapter 8: Analytic Geometry and the Conic Sections 8.1: A Brief Introduction to Analytic Geometry 8.2: The Circle and the Ellipse 8.3: The Hyperbola 8.4: The Analytic Parabola Chapter 9: Additional Topics in Algebra 9.1: Sequences and Series 9.2: Arithmetic Sequences 9.3: Geometric Sequences 9.4: Mathematical Induction 9.5: Counting Techniques 9.6: Introduction to Probability 9.7: The Binomial Theorem Appendices The Language, Notation, and Numbers of Mathematics Geometry Review with Unit Conversions More on Synthetic Division More on Matrices Deriving the Equation of a Conic Proof Positive - A Selection of Proofs from College Algebra
4.4: Graphing Rational Functions 4.5: Additional Insights into Rational Functions Chapter 5: Exponential and Logarithmic Functions 5.1: One-to-One and Inverse Functions 5.2: Exponential Functions 5.3: Logarithms and Logarithmic Functions 5.4: Properties of Logarithms 5.5: Solving Exponential/Logarithmic Equations 5.6: Applications from Business, Finance, and Science 5.7: Exponential, Logarithmic, and Logistic Equation Models Chapter 6: Systems of Equations and Inequalities 6.1: Linear Systems in Two Variables with Applications 6.2: Linear Systems in Three Variables with Applications 6.3: Nonlinear Systems of Equations and Inequalities 6.4: Systems of Inequalities and Linear Programming Chapter 7: Matrices and Matrix Applications 7.1: Solving Linear Systems Using Matrices and Row Operations 7.2: The Algebra of Matrices 7.3: Solving Linear Systems Using Matrix Equations 7.4: Applications of Matrices and Determinants: Cramer’s rule, Partial Fractions, and More Chapter 8: Analytic Geometry and the Conic Sections 8.1: A Brief Introduction to Analytic Geometry 8.2: The Circle and the Ellipse 8.3: The Hyperbola 8.4: The Analytic Parabola Chapter 9: Additional Topics in Algebra 9.1: Sequences and Series 9.2: Arithmetic Sequences 9.3: Geometric Sequences 9.4: Mathematical Induction 9.5: Counting Techniques 9.6: Introduction to Probability 9.7: The Binomial Theorem Appendices The Language, Notation, and Numbers of Mathematics Geometry Review with Unit Conversions More on Synthetic Division More on Matrices Deriving the Equation of a Conic Proof Positive - A Selection of Proofs from College Algebra
Chapter 5: Exponential and Logarithmic Functions 5.1: One-to-One and Inverse Functions 5.2: Exponential Functions 5.3: Logarithms and Logarithmic Functions 5.4: Properties of Logarithms 5.5: Solving Exponential/Logarithmic Equations 5.6: Applications from Business, Finance, and Science 5.7: Exponential, Logarithmic, and Logistic Equation Models Chapter 6: Systems of Equations and Inequalities 6.1: Linear Systems in Two Variables with Applications 6.2: Linear Systems in Three Variables with Applications 6.3: Nonlinear Systems of Equations and Inequalities 6.4: Systems of Inequalities and Linear Programming Chapter 7: Matrices and Matrix Applications 7.1: Solving Linear Systems Using Matrices and Row Operations 7.2: The Algebra of Matrices 7.3: Solving Linear Systems Using Matrix Equations 7.4: Applications of Matrices and Determinants: Cramer’s rule, Partial Fractions, and More Chapter 8: Analytic Geometry and the Conic Sections 8.1: A Brief Introduction to Analytic Geometry 8.2: The Circle and the Ellipse 8.3: The Hyperbola 8.4: The Analytic Parabola Chapter 9: Additional Topics in Algebra 9.1: Sequences and Series 9.2: Arithmetic Sequences 9.3: Geometric Sequences 9.4: Mathematical Induction 9.5: Counting Techniques 9.6: Introduction to Probability 9.7: The Binomial Theorem Appendices The Language, Notation, and Numbers of Mathematics Geometry Review with Unit Conversions More on Synthetic Division More on Matrices Deriving the Equation of a Conic Proof Positive - A Selection of Proofs from College Algebra
5.2: Exponential Functions 5.3: Logarithms and Logarithmic Functions 5.4: Properties of Logarithms 5.5: Solving Exponential/Logarithmic Equations 5.6: Applications from Business, Finance, and Science 5.7: Exponential, Logarithmic, and Logistic Equation Models Chapter 6: Systems of Equations and Inequalities 6.1: Linear Systems in Two Variables with Applications 6.2: Linear Systems in Three Variables with Applications 6.3: Nonlinear Systems of Equations and Inequalities 6.4: Systems of Inequalities and Linear Programming Chapter 7: Matrices and Matrix Applications 7.1: Solving Linear Systems Using Matrices and Row Operations 7.2: The Algebra of Matrices 7.3: Solving Linear Systems Using Matrix Equations 7.4: Applications of Matrices and Determinants: Cramer’s rule, Partial Fractions, and More Chapter 8: Analytic Geometry and the Conic Sections 8.1: A Brief Introduction to Analytic Geometry 8.2: The Circle and the Ellipse 8.3: The Hyperbola 8.4: The Analytic Parabola Chapter 9: Additional Topics in Algebra 9.1: Sequences and Series 9.2: Arithmetic Sequences 9.3: Geometric Sequences 9.4: Mathematical Induction 9.5: Counting Techniques 9.6: Introduction to Probability 9.7: The Binomial Theorem Appendices The Language, Notation, and Numbers of Mathematics Geometry Review with Unit Conversions More on Synthetic Division More on Matrices Deriving the Equation of a Conic Proof Positive - A Selection of Proofs from College Algebra
5.4: Properties of Logarithms 5.5: Solving Exponential/Logarithmic Equations 5.6: Applications from Business, Finance, and Science 5.7: Exponential, Logarithmic, and Logistic Equation Models Chapter 6: Systems of Equations and Inequalities 6.1: Linear Systems in Two Variables with Applications 6.2: Linear Systems in Three Variables with Applications 6.3: Nonlinear Systems of Equations and Inequalities 6.4: Systems of Inequalities and Linear Programming Chapter 7: Matrices and Matrix Applications 7.1: Solving Linear Systems Using Matrices and Row Operations 7.2: The Algebra of Matrices 7.3: Solving Linear Systems Using Matrix Equations 7.4: Applications of Matrices and Determinants: Cramer’s rule, Partial Fractions, and More Chapter 8: Analytic Geometry and the Conic Sections 8.1: A Brief Introduction to Analytic Geometry 8.2: The Circle and the Ellipse 8.3: The Hyperbola 8.4: The Analytic Parabola Chapter 9: Additional Topics in Algebra 9.1: Sequences and Series 9.2: Arithmetic Sequences 9.3: Geometric Sequences 9.4: Mathematical Induction 9.5: Counting Techniques 9.6: Introduction to Probability 9.7: The Binomial Theorem Appendices The Language, Notation, and Numbers of Mathematics Geometry Review with Unit Conversions More on Synthetic Division More on Matrices Deriving the Equation of a Conic Proof Positive - A Selection of Proofs from College Algebra
5.6: Applications from Business, Finance, and Science 5.7: Exponential, Logarithmic, and Logistic Equation Models Chapter 6: Systems of Equations and Inequalities 6.1: Linear Systems in Two Variables with Applications 6.2: Linear Systems in Three Variables with Applications 6.3: Nonlinear Systems of Equations and Inequalities 6.4: Systems of Inequalities and Linear Programming Chapter 7: Matrices and Matrix Applications 7.1: Solving Linear Systems Using Matrices and Row Operations 7.2: The Algebra of Matrices 7.3: Solving Linear Systems Using Matrix Equations 7.4: Applications of Matrices and Determinants: Cramer’s rule, Partial Fractions, and More Chapter 8: Analytic Geometry and the Conic Sections 8.1: A Brief Introduction to Analytic Geometry 8.2: The Circle and the Ellipse 8.3: The Hyperbola 8.4: The Analytic Parabola Chapter 9: Additional Topics in Algebra 9.1: Sequences and Series 9.2: Arithmetic Sequences 9.3: Geometric Sequences 9.4: Mathematical Induction 9.5: Counting Techniques 9.6: Introduction to Probability 9.7: The Binomial Theorem Appendices The Language, Notation, and Numbers of Mathematics Geometry Review with Unit Conversions More on Synthetic Division More on Matrices Deriving the Equation of a Conic Proof Positive - A Selection of Proofs from College Algebra
Chapter 6: Systems of Equations and Inequalities 6.1: Linear Systems in Two Variables with Applications 6.2: Linear Systems in Three Variables with Applications 6.3: Nonlinear Systems of Equations and Inequalities 6.4: Systems of Inequalities and Linear Programming Chapter 7: Matrices and Matrix Applications 7.1: Solving Linear Systems Using Matrices and Row Operations 7.2: The Algebra of Matrices 7.3: Solving Linear Systems Using Matrix Equations 7.4: Applications of Matrices and Determinants: Cramer’s rule, Partial Fractions, and More Chapter 8: Analytic Geometry and the Conic Sections 8.1: A Brief Introduction to Analytic Geometry 8.2: The Circle and the Ellipse 8.3: The Hyperbola 8.4: The Analytic Parabola Chapter 9: Additional Topics in Algebra 9.1: Sequences and Series 9.2: Arithmetic Sequences 9.3: Geometric Sequences 9.4: Mathematical Induction 9.5: Counting Techniques 9.6: Introduction to Probability 9.7: The Binomial Theorem Appendices The Language, Notation, and Numbers of Mathematics Geometry Review with Unit Conversions More on Synthetic Division More on Matrices Deriving the Equation of a Conic Proof Positive - A Selection of Proofs from College Algebra
6.2: Linear Systems in Three Variables with Applications 6.3: Nonlinear Systems of Equations and Inequalities 6.4: Systems of Inequalities and Linear Programming Chapter 7: Matrices and Matrix Applications 7.1: Solving Linear Systems Using Matrices and Row Operations 7.2: The Algebra of Matrices 7.3: Solving Linear Systems Using Matrix Equations 7.4: Applications of Matrices and Determinants: Cramer’s rule, Partial Fractions, and More Chapter 8: Analytic Geometry and the Conic Sections 8.1: A Brief Introduction to Analytic Geometry 8.2: The Circle and the Ellipse 8.3: The Hyperbola 8.4: The Analytic Parabola Chapter 9: Additional Topics in Algebra 9.1: Sequences and Series 9.2: Arithmetic Sequences 9.3: Geometric Sequences 9.4: Mathematical Induction 9.5: Counting Techniques 9.6: Introduction to Probability 9.7: The Binomial Theorem Appendices The Language, Notation, and Numbers of Mathematics Geometry Review with Unit Conversions More on Synthetic Division More on Matrices Deriving the Equation of a Conic Proof Positive - A Selection of Proofs from College Algebra
6.4: Systems of Inequalities and Linear Programming Chapter 7: Matrices and Matrix Applications 7.1: Solving Linear Systems Using Matrices and Row Operations 7.2: The Algebra of Matrices 7.3: Solving Linear Systems Using Matrix Equations 7.4: Applications of Matrices and Determinants: Cramer’s rule, Partial Fractions, and More Chapter 8: Analytic Geometry and the Conic Sections 8.1: A Brief Introduction to Analytic Geometry 8.2: The Circle and the Ellipse 8.3: The Hyperbola 8.4: The Analytic Parabola Chapter 9: Additional Topics in Algebra 9.1: Sequences and Series 9.2: Arithmetic Sequences 9.3: Geometric Sequences 9.4: Mathematical Induction 9.5: Counting Techniques 9.6: Introduction to Probability 9.7: The Binomial Theorem Appendices The Language, Notation, and Numbers of Mathematics Geometry Review with Unit Conversions More on Synthetic Division More on Matrices Deriving the Equation of a Conic Proof Positive - A Selection of Proofs from College Algebra
7.1: Solving Linear Systems Using Matrices and Row Operations 7.2: The Algebra of Matrices 7.3: Solving Linear Systems Using Matrix Equations 7.4: Applications of Matrices and Determinants: Cramer’s rule, Partial Fractions, and More Chapter 8: Analytic Geometry and the Conic Sections 8.1: A Brief Introduction to Analytic Geometry 8.2: The Circle and the Ellipse 8.3: The Hyperbola 8.4: The Analytic Parabola Chapter 9: Additional Topics in Algebra 9.1: Sequences and Series 9.2: Arithmetic Sequences 9.3: Geometric Sequences 9.4: Mathematical Induction 9.5: Counting Techniques 9.6: Introduction to Probability 9.7: The Binomial Theorem Appendices The Language, Notation, and Numbers of Mathematics Geometry Review with Unit Conversions More on Synthetic Division More on Matrices Deriving the Equation of a Conic Proof Positive - A Selection of Proofs from College Algebra
7.3: Solving Linear Systems Using Matrix Equations 7.4: Applications of Matrices and Determinants: Cramer’s rule, Partial Fractions, and More Chapter 8: Analytic Geometry and the Conic Sections 8.1: A Brief Introduction to Analytic Geometry 8.2: The Circle and the Ellipse 8.3: The Hyperbola 8.4: The Analytic Parabola Chapter 9: Additional Topics in Algebra 9.1: Sequences and Series 9.2: Arithmetic Sequences 9.3: Geometric Sequences 9.4: Mathematical Induction 9.5: Counting Techniques 9.6: Introduction to Probability 9.7: The Binomial Theorem Appendices The Language, Notation, and Numbers of Mathematics Geometry Review with Unit Conversions More on Synthetic Division More on Matrices Deriving the Equation of a Conic Proof Positive - A Selection of Proofs from College Algebra
Chapter 8: Analytic Geometry and the Conic Sections 8.1: A Brief Introduction to Analytic Geometry 8.2: The Circle and the Ellipse 8.3: The Hyperbola 8.4: The Analytic Parabola Chapter 9: Additional Topics in Algebra 9.1: Sequences and Series 9.2: Arithmetic Sequences 9.3: Geometric Sequences 9.4: Mathematical Induction 9.5: Counting Techniques 9.6: Introduction to Probability 9.7: The Binomial Theorem Appendices The Language, Notation, and Numbers of Mathematics Geometry Review with Unit Conversions More on Synthetic Division More on Matrices Deriving the Equation of a Conic Proof Positive - A Selection of Proofs from College Algebra
8.2: The Circle and the Ellipse 8.3: The Hyperbola 8.4: The Analytic Parabola Chapter 9: Additional Topics in Algebra 9.1: Sequences and Series 9.2: Arithmetic Sequences 9.3: Geometric Sequences 9.4: Mathematical Induction 9.5: Counting Techniques 9.6: Introduction to Probability 9.7: The Binomial Theorem Appendices The Language, Notation, and Numbers of Mathematics Geometry Review with Unit Conversions More on Synthetic Division More on Matrices Deriving the Equation of a Conic Proof Positive - A Selection of Proofs from College Algebra
8.4: The Analytic Parabola Chapter 9: Additional Topics in Algebra 9.1: Sequences and Series 9.2: Arithmetic Sequences 9.3: Geometric Sequences 9.4: Mathematical Induction 9.5: Counting Techniques 9.6: Introduction to Probability 9.7: The Binomial Theorem Appendices The Language, Notation, and Numbers of Mathematics Geometry Review with Unit Conversions More on Synthetic Division More on Matrices Deriving the Equation of a Conic Proof Positive - A Selection of Proofs from College Algebra
9.1: Sequences and Series 9.2: Arithmetic Sequences 9.3: Geometric Sequences 9.4: Mathematical Induction 9.5: Counting Techniques 9.6: Introduction to Probability 9.7: The Binomial Theorem Appendices The Language, Notation, and Numbers of Mathematics Geometry Review with Unit Conversions More on Synthetic Division More on Matrices Deriving the Equation of a Conic Proof Positive - A Selection of Proofs from College Algebra
9.3: Geometric Sequences 9.4: Mathematical Induction 9.5: Counting Techniques 9.6: Introduction to Probability 9.7: The Binomial Theorem Appendices The Language, Notation, and Numbers of Mathematics Geometry Review with Unit Conversions More on Synthetic Division More on Matrices Deriving the Equation of a Conic Proof Positive - A Selection of Proofs from College Algebra
9.5: Counting Techniques 9.6: Introduction to Probability 9.7: The Binomial Theorem Appendices The Language, Notation, and Numbers of Mathematics Geometry Review with Unit Conversions More on Synthetic Division More on Matrices Deriving the Equation of a Conic Proof Positive - A Selection of Proofs from College Algebra
9.7: The Binomial Theorem Appendices The Language, Notation, and Numbers of Mathematics Geometry Review with Unit Conversions More on Synthetic Division More on Matrices Deriving the Equation of a Conic Proof Positive - A Selection of Proofs from College Algebra
The Language, Notation, and Numbers of Mathematics Geometry Review with Unit Conversions More on Synthetic Division More on Matrices Deriving the Equation of a Conic Proof Positive - A Selection of Proofs from College Algebra
More on Synthetic Division More on Matrices Deriving the Equation of a Conic Proof Positive - A Selection of Proofs from College Algebra
Deriving the Equation of a Conic Proof Positive - A Selection of Proofs from College Algebra
Three components contribute to a theme sustained throughout the Coburn-Herdlick Series: that of laying a firm foundation, building a solid framework, and providing strong connections. In the Graphs and Models texts, the authors combine their depth of experience with the conversational style and the wealth of applications that the Coburn-Herdlick texts have become known for. By combining a graphical approach to problem solving with algebraic methods, students learn how to relate their mathematical knowledge to the outside world. The authors use technology to solve the more true-to life equations, to engage more applications, and to explore the more substantial questions involving graphical behavior. Benefiting from the feedback of hundreds of instructors and students across the country, College Algebra: Graphs & Models emphasizes connections in order to improve the level of student engagement in mathematics and increase their chances of success in college algebra.
The launch of the Coburn/Herdlick Graphs and Models series provides a significant leap forward in terms of online course management with McGraw-Hill’s new homework platform, Connect Math Hosted by ALEKS Corp. Math instructors served as digital contributors to choose the problems that will be available, authoring each algorithm and providing stepped out solutions that go into great detail and are focused on areas where students commonly make mistakes. From there, the ALEKS Corporation reviewed each algorithm to ensure accuracy. A unifying theme throughout the entire process was the involvement of the authors. Through each step, they provided feedback and guidance to the digital contributors to ensure that the content being developed digitally closely matched the textbook. The result is an online homework platform that provides superior content and feedback, allowing students to effectively learn the material being taught.
The launch of the Coburn/Herdlick Graphs and Models series provides a significant leap forward in terms of online course management with McGraw-Hill’s new homework platform, Connect Math Hosted by ALEKS Corp. Math instructors served as digital contributors to choose the problems that will be available, authoring each algorithm and providing stepped out solutions that go into great detail and are focused on areas where students commonly make mistakes. From there, the ALEKS Corporation reviewed each algorithm to ensure accuracy. A unifying theme throughout the entire process was the involvement of the authors. Through each step, they provided feedback and guidance to the digital contributors to ensure that the content being developed digitally closely matched the textbook. The result is an online homework platform that provides superior content and feedback, allowing students to effectively learn the material being taught.