This college level trigonometry text may be different than most other trigonometry textbooks. In this book, the reader is expected to do more than read the book but is expected to study the material in the book by working out examples rather than just reading about them. So the book is not just about mathematical content (although it does contain important topics in trigonometry needed for further study in mathematics), but it is also about the process of learning and doing mathematics and is designed not to be just casually read but rather to be engaged. Recognizing that actively studying a mathematics book is often not easy, several features of the textbook have been designed to help students become more engaged as they study the material. Some of the features are: Beginning activities in each section that engage students with the material to be introduced, focus questions that help students stay focused on what is important in the section, progress checks that are short exercises or activities that replace the standard examples in most textbooks, a section summary, and appendices with answers for the progress checks and selected exercises.
This text was written for the three-credit trigonometry course at Grand Valley State University (MTH 123 – Trigonometry). This text begins with a circular function approach to trigonometry and transitions to the study of triangle trigonometry, vectors, trigonometric identities, and complex numbers.
Important Features of the Textbook
This book is meant to be used and studied by students and the important features of the textbook were designed with that in mind. Please see the Note to Students on page (v) for a description of these features.
Content and Organization
The first two chapters of the textbook emphasize the development of the cosine and sine functions and how they can be used to model periodic phenomena. The other four trigonometric functions are studied in Section 1.6 and Section 2.4. Triangles and vectors are studied in Chapter 3, trigonometric identities and equations are studied in Chapter 4, and finally, using trigonometry to better understand complex numbers is in Chapter 5. Following is a more detailed description of the sections within each chapter.
Author(s): Ted Sundstrom, Steven Schlicker
Edition: 1
Publisher: Grand Valley State University
Year: 2019
Language: English
Commentary: Updated January 2, 2019 | Latest version can be downloaded from: https://scholarworks.gvsu.edu/books/12/
Pages: 440
City: Allendale
Tags: Trigonometry; Trigonometric Functions; Triangles and Vectors; Trigonometric Identities and Equations; Complex Numbers and Polar Coordinates
Note to Students
Preface
The Trigonometric Functions
The Unit Circle
The Cosine and Sine Functions
Arcs, Angles, and Calculators
Velocity and Angular Velocity
Common Arcs and Reference Arcs
Other Trigonometric Functions
Graphs of the Trigonometric Functions
Graphs of the Cosine and Sine Functions
Graphs of Sinusoidal Functions
Applications and Modeling with Sinusoidal Functions
Graphs of the Other Trigonometric Functions
Inverse Trignometric Functions
Solving Trigonmetric Equations
Triangles and Vectors
Trigonometric Functions of Angles
Right Triangles
Triangles that Are Not Right Triangles
Applications of Triangle Trigonometry
Vectors from a Geometric Point of View
Vectors from an Algebraic Point of View
Trigonometric Identities and Equations
Trigonometric Identities
Trigonometric Equations
Sum and Difference Identities
Double and Half Angle Identities
Sum and Product Identities
Complex Numbers and Polar Coordinates
The Complex Number System
The Trigonometric Form of a Complex Number
DeMoivre's Theorem and Powers of Complex Numbers
The Polar Coordinate System
Answers for the Progress Checks
Answers and Hints for Selected Exercises
Some Geometric Facts about Triangles and Parallelograms
Index
