Book contents
- Frontmatter
- Contents
- Preface
- 1 Setting the Scene
- 2 Trigonometry, the Foundation of Coordinate Theory
- 3 The Vector Dot and Cross Products
- 4 Vector Preliminaries and Constructing a Basis
- 5 Converting Vector Coordinates Across Bases
- 6 Vector Rotation in Two and Three Dimensions
- 7 Rotation Sequences and the Fundamental Theorem
- 8 Coordinate Systems for Earth, and More Rotation Sequences
- 9 The Role of Quaternions in Rotation Theory
- 10 Time Dependence of Vehicle Attitude
- 11 Frame Dependence of the Time Derivative
- 12 Earth’s Orientation in Space, and Time on Earth
- 13 Orbital Mechanics
- 14 Rigid-Body Dynamics
- 15 Modelling the Motion and Attitude of a Vehicle
- 16 Concepts of Tensor Analysis
- Index
15 - Modelling the Motion and Attitude of a Vehicle
Published online by Cambridge University Press: 17 April 2025
Book contents
- Frontmatter
- Contents
- Preface
- 1 Setting the Scene
- 2 Trigonometry, the Foundation of Coordinate Theory
- 3 The Vector Dot and Cross Products
- 4 Vector Preliminaries and Constructing a Basis
- 5 Converting Vector Coordinates Across Bases
- 6 Vector Rotation in Two and Three Dimensions
- 7 Rotation Sequences and the Fundamental Theorem
- 8 Coordinate Systems for Earth, and More Rotation Sequences
- 9 The Role of Quaternions in Rotation Theory
- 10 Time Dependence of Vehicle Attitude
- 11 Frame Dependence of the Time Derivative
- 12 Earth’s Orientation in Space, and Time on Earth
- 13 Orbital Mechanics
- 14 Rigid-Body Dynamics
- 15 Modelling the Motion and Attitude of a Vehicle
- 16 Concepts of Tensor Analysis
- Index
Summary
Results of previous chapters come together here in the equations that model a vehicle’s position and attitude given a knowledge of, for example, its angular turn rates. These equations can seem perplexing at first glance, and so I derive them in careful steps, again making strong use of vectors and the frame dependence of the time derivative. I end with a detailed example of applying these equations to a spinning top.
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- Rotation Sequences and the Theory of Vectors and Coordinates , pp. 488 - 508Publisher: Cambridge University PressPrint publication year: 2025