Work more effectively and check solutions as you go along with the text! This Student Solutions Manual that is designed to accompany Anton's Calculus: Late Transcendentals, Single and Multivariable, 8th edition provides students with detailed solutions to odd-numbered exercises from the text.
Designed for the undergraduate Calculus I-II-III sequence, the eighth edition continues to evolve to fulfill the needs of a changing market by providing flexible solutions to teaching and learning needs of all kinds. The new edition retains the strengths of earlier editions such as Anton's trademark clarity of exposition, sound mathematics, excellent exercises and examples, and appropriate level. Anton also incorporates new ideas that have withstood the objective scrutiny of many skilled and thoughtful instructors and their students.
Table of Contents
Chapter One: Functions.
Chapter Two: Limits and Continuity.
Chapter Three: The Derivative.
Chapter Four: The Derivative in Graphing and Applications.
Chapter Five: Integration.
Chapter Six: Applications of the Definite Integral in Geometry, Science and Engineering.
Chapter Seven: Exponential, Logarithmic, and Inverse Trigonometric Functions.
Chapter Eight: Principles of Integral Evaluation.
Chapter Nine: Mathematical Modeling with Differential Equations.
Chapter Ten: Infinite Series.
Chapter Eleven: Analytic Geometry in Calculus.
Chapter Twelve: Three Dimensional Space; Vectors.
Chapter Thirteen: Vector-Valued Functions.
Chapter Fourteen: Partial Derivatives.
Chapter Fifteen: Multiple Integrals.
Chapter Sixteen: Topics in Vector Calculus.
Appendix A: Trigonometry Review.
Appendix B: Solving Polynomial Equations.
Appendix C: Selected Proofs.