You're reading from Mathematics for Game Programming and Computer Graphics

Product type Book

Published in Nov 2022

Publisher Packt

ISBN-13 9781801077330

Pages 444 pages

Edition 1st Edition

Languages

Concepts

Game Optimization

Author (1):

Penny de Byl

Table of Contents (26) Chapters

Preface

1. Part 1 – Essential Tools

2. Chapter 1: Hello Graphics Window: You’re On Your Way

3. Chapter 2: Let’s Start Drawing

4. Chapter 3: Line Plotting Pixel by Pixel

5. Chapter 4: Graphics and Game Engine Components

6. Chapter 5: Let’s Light It Up!

7. Chapter 6: Updating and Drawing the Graphics Environment

8. Chapter 7: Interactions with the Keyboard and Mouse for Dynamic Graphics Programs

9. Part 2 – Essential Trigonometry

10. Chapter 8: Reviewing Our Knowledge of Triangles

11. Chapter 9: Practicing Vector Essentials

12. Chapter 10: Getting Acquainted with Lines, Rays, and Normals

13. Chapter 11: Manipulating the Light and Texture of Triangles

14. Part 3 – Essential Transformations

15. Chapter 12: Mastering Affine Transformations

16. Chapter 13: Understanding the Importance of Matrices

17. Chapter 14: Working with Coordinate Spaces

18. Chapter 15: Navigating the View Space

19. Chapter 16: Rotating with Quaternions

20. Part 4 – Essential Rendering Techniques

21. Chapter 17: Vertex and Fragment Shading

22. Chapter 18: Customizing the Render Pipeline

23. Chapter 19: Rendering Visual Realism Like a Pro

24. Index

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Introducing quaternions

The minimum number of values needed to represent rotations in 3D space is three. The most intuitive and long-applied method for defining rotations, as we’ve seen, is to use these values as the three angles of rotation around the x axis, the y axis, and the z axis. The values of these angles can range from 0 to 360 degrees or 0 to 2 PI radians.

Any object in 3D space can be rotated around these axes that represent either the world axes or the object’s own local access system. Formally, the angles around the world axes are called fixed angles, while the angles around an object’s local axis system are called Euler angles. However, often both sets of angles are referred to as Euler angles. We covered the mathematics to apply rotations around these three axes in Chapter 15, Navigating the View Space, in addition to investigating when these calculations break down and cause gimbal lock.

Quaternions were devised in 1843 by Irish mathematician...