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Starting from a basic knowledge of mathematics and mechanics gained in standard foundation classes, Theory of Lift: Introductory Computational Aerodynamics in MATLAB/Octave takes the reader conceptually through from the fundamental mechanics of lift to the stage of actually being able to make practical calculations and predictions of the coefficient of lift for realistic wing profile and planform geometries.
The classical framework and methods of aerodynamics are covered in detail and the reader is shown how they may be used to develop simple yet powerful MATLAB or Octave programs that accurately predict and visualise the dynamics of real wing shapes, using lumped vortex, panel, and vortex lattice methods.
This book contains all the mathematical development and formulae required in standard incompressible aerodynamics as well as dozens of small but complete working programs which can be put to use immediately using either the popular MATLAB or free Octave computional modelling packages.
Key features:
Theory of Lift: Introductory Computational Aerodynamics in MATLAB/Octave is an introductory text for graduate and senior undergraduate students on aeronautical and aerospace engineering courses and also forms a valuable reference for engineers and designers.
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Contents
Cover
Series Page
Title Page
Copyright
Dedication
Preface
Acknowledgements
Series Preface
Part One: Plane Ideal Aerodynamics
Chapter 1: Preliminary Notions
1.1 Aerodynamic Force and Moment
1.2 Aircraft Geometry
1.3 Velocity
1.4 Properties of Air
1.5 Dimensional Theory
1.6 Example: NACA Report No. 502
1.7 Exercises
1.8 Further Reading
References
Chapter 2: Plane Ideal Flow
2.1 Material Properties: The Perfect Fluid
2.2 Conservation of Mass
2.3 The Continuity Equation
2.4 Mechanics: The Euler Equations
2.5 Consequences of the Governing Equations
2.6 The Complex Velocity
2.7 The Complex Potential
2.8 Exercises
2.9 Further Reading
References
Chapter 3: Circulation and Lift
3.1 Powers of z
3.2 Multiplication by a Complex Constant
3.3 Linear Combinations of Complex Velocities
3.4 Transforming the Whole Velocity Field
3.5 Circulation and Outflow
3.6 More on the Scalar Potential and Stream Function
3.7 Lift
3.8 Exercises
3.9 Further Reading
References
Chapter 4: Conformal Mapping
4.1 Composition of Analytic Functions
4.2 Mapping with Powers of ζ
4.3 Joukowsky's Transformation
4.4 Exercises
4.5 Further Reading
References
Chapter 5: Flat Plate Aerodynamics
5.1 Plane Ideal Flow over a Thin Flat Plate
5.2 Application of Thin Aerofoil Theory to the Flat Plate
5.3 Aerodynamic Moment
5.4 Exercises
5.5 Further Reading
References
Chapter 6: Thin Wing Sections
6.1 Thin Aerofoil Analysis
6.2 Thin Aerofoil Aerodynamics
6.3 Analytical Evaluation of Thin Aerofoil Integrals
6.4 Numerical Thin Aerofoil Theory
6.5 Exercises
6.6 Further Reading
References
Chapter 7: Lumped Vortex Elements
7.1 The Thin Flat Plate at Arbitrary Incidence, Again
7.2 Using Two Lumped Vortices along the Chord
7.3 Generalization to Multiple Lumped Vortex Panels
7.4 General Considerations on Discrete Singularity Methods
7.5 Lumped Vortex Elements for Thin Aerofoils
7.6 Disconnected Aerofoils
7.7 Exercises
7.8 Further Reading
References
Chapter 8: Panel Methods for Plane Flow
8.1 Development of the CUSSSP Program
8.2 Exercises
8.3 Further Reading
8.4 Conclusion to Part I: The Origin of Lift
References
Part Two: Three-Dimensional Ideal Aerodynamics
Chapter 9: FiniteWings and Three-Dimensional Flow
9.1 Wings of Finite Span
9.2 Three-Dimensional Flow
9.3 Vector Notation and Identities
9.4 The Equations Governing Three-Dimensional Flow
9.5 Circulation
9.6 Exercises
9.7 Further Reading
References
Chapter 10: Vorticity and Vortices
10.1 Streamlines, Stream Tubes, and Stream Filaments
10.2 Vortex Lines, Vortex Tubes, and Vortex Filaments
10.3 Helmholtz's Theorems
10.4 Line Vortices
10.5 Segmented Vortex Filaments
10.6 Exercises
10.7 Further Reading
References
Chapter 11: Lifting Line Theory
11.1 Basic Assumptions of Lifting Line Theory
11.2 The Lifting Line, Horseshoe Vortices, and the Wake
11.3 The Effect of Downwash
11.4 The Lifting Line Equation
11.5 The Elliptic Lift Loading
11.6 Lift–Incidence Relation
11.7 Realizing the Elliptic Lift Loading
11.8 Exercises
11.9 Further Reading
References
Chapter 12: Nonelliptic Lift Loading
12.1 Solving the Lifting Line Equation
12.2 Numerical Convergence
12.3 Symmetric Spanwise Loading
12.4 Exercises
References
Chapter 13: Lumped Horseshoe Elements
13.1 A Single Horseshoe Vortex
13.2 Multiple Horseshoes along the Span
13.3 An Improved Discrete Horseshoe Model
13.4 Implementing Horseshoe Vortices in Octave
13.5 Exercises
13.6 Further Reading
References
Chapter 14: The Vortex Lattice Method
14.1 Meshing the Mean Lifting Surface of a Wing
14.2 A Vortex Lattice Method
14.3 Examples of Vortex Lattice Calculations
14.4 Exercises
14.5 Further Reading
References
Part Three: Nonideal Flow in Aerodynamics
Chapter 15: Viscous Flow
15.1 Cauchy's First Law of Continuum Mechanics
15.2 Rheological Constitutive Equations
15.3 The Navier–Stokes Equations
15.4 The No-Slip Condition and the Viscous Boundary Layer
15.5 Unidirectional Flows
15.6 A Suddenly Sliding Plate
15.7 Exercises
15.8 Further Reading
References
Chapter 16: Boundary Layer Equations
16.1 The Boundary Layer over a Flat Plate
16.2 Momentum Integral Equation
16.3 Local Boundary Layer Parameters
16.4 Exercises
16.5 Further Reading
References
Chapter 17: Laminar Boundary Layers
17.1 Boundary Layer Profile Curvature
17.2 Pohlhausen's Quartic Profiles
17.3 Thwaites's Method for Laminar Boundary Layers
17.4 Exercises
17.5 Further Reading
References
Chapter 18: Compressibility
18.1 Steady-State Conservation of Mass
18.2 Longitudinal Variation of Stream Tube Section
18.3 Perfect Gas Thermodynamics
18.4 Exercises
18.5 Further Reading
References
Chapter 19: Linearized Compressible Flow
19.1 The Nonlinearity of the Equation for the Potential
19.2 Small Disturbances to the Free-Stream
19.3 The Uniform Free-Stream
19.4 The Disturbance Potential
19.5 Prandtl–Glauert Transformation
19.6 Application of the Prandtl–Glauert Rule
19.7 Sweep
19.8 Exercises
19.9 Further Reading
References
Appendix A: Notes on Octave Programming
A.1 Introduction
A.2 Vectorization
A.3 Generating Arrays
A.4 Indexing
A.5 Just-in-Time Compilation
A.6 Further Reading
References
Glossary
Nomenclature
Index
This edition first published 2012
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Library of Congress Cataloging-in-Publication Data
McBain, G. D. (Geordie G.)
Theory of lift: introductory computational aerodynamics with MATLAB®/
OCTAVE / G.D. McBain.
p. cm.
Includes bibliographical references and index.
ISBN 978-1-119-95228-2 (hardback)
1. Lift (Aerodynamics)–Mathematical models. 2. Aerodynamics–Data
processing. 3. MATLAB. I. Title.
TL574.L5M33 2012
629.132'33028553–dc23
2012004735
A catalogue record for this book is available from the British Library.
Print ISBN: 9781119952282
In memory of Dr Jonathan Harris
Preface
I found while teaching the course in introductory aerodynamics at The University of Sydney to third-year undergraduate aeronautical engineering students that I was frequently referring to my shelf of classic texts (Glauert, 1926; Lamb, 1932; Prandtl and Tietjens, 1957; Abbott and von Doenhoff, 1959; Batchelor, 1967; Milne-Thomson, 1973; Ashley and Landahl, 1985; Katz and Plotkin, 2001; Moran, 2003), to the extent and effect that the university's Engineering Library's several copies of each of these were constantly out in use by some of the students and therefore unavailable to the rest. Thus it was that I began to collect together a précis of the relevant passages. This immediately necessitated a standardization of nomenclature, which unconsciously evolved into an organization of the elements into something that began to resemble a supporting theoretical framework for the course, something which had begun to cohere. The lectures began to rely on this background, by relegating to it much of the rigour and drudgery of detail in derivation so that they were more freed up to range over appeals to intuition, evocative illustration, and imprecise image and analogy. This combined approach was found to work well. Naturally some students took quickly to the printed notes and only attended the lectures to ask questions, which was a good course for them, as they were usually rapid learners; but the majority used the printed notes more as had been originally intended: these students continued to take the lectures as their main access to the subject, availing themselves of the carefully typeset equations to avoid having to squint at and transcribe so many squiggles and Greek letters on the blackboard.
As the years went by, the course increasingly made use of the proliferation of excellent computing facilities. Since all students had ready access to what were, despite really being only off-the-shelf desktop machines, more powerful digital computers than Abbott and von Doenhoff (1959) could have dreamed of, and since very good interactive software environments for matrix computation had become freely available, it was natural to exploit this. Other introductory textbooks had appeared discussing computational methods (generally in FORTRAN) as successors to the classical approaches (in some cases at the expense of the latter), but the initial approach at Sydney was more first to use computers to speed up those more laborious numerical parts of aerodynamics as already practised and only then, with the time thus saved, to begin to assay such extensions of the old methods as had only become feasible with automatic matrix computation. Then, following this path, it became apparent that the new and old methods had more in common than had been thought. To take a single example, the complex velocity, despite the ultimate simplicity of plane ideal flow in this form, had been dropped from the textbooks of the 1980s, but modern computer languages work as easily with complex variables as real. The concision of the complex-variable panel method presented in Chapter 8 is testament to this. It should be noted that the neglect of the one-to-one analogy between the Cauchy–Riemann equations and the equations of continuity and irrotationality to make way for monolithic FORTRAN programs was not universal, having retained its rightful central place in the French language textbooks (Darrozes and Francedil;ois, 1982; Bousquet, 1990; Paraschivoiu 1998.
This history is getting very close to giving an idea of this book: an introductory synthesis of theoretical aerodynamics, in a classical spirit, but done as perhaps classical aerodynamics might have been had modern matrix computation techniques and systems been available.
Thus, a few words on what this book is and isn't: it is not a compendium of results, but an introduction to methods and methodologies; and it is not the script to a course of lectures, but an accompanying almost self-contained reference.
It does make many references to the literature, but this is rarely to delegate detail or derivation but more partly out of respect to the authors that went before and moreover out of the firm belief that no twenty-first-century aerodynamicist reading Glauert (1926), Milne-Thomson (1973), the nine chapters of Abbott and von Doenhoff (1959) or anything written by Ludwig Prandtl will be wasting their time—if not amidst the flurry of the third year of an undergraduate degree, subsequently. That is, there is rarely any need to follow any of these pointers, rather the reader is invited to at their later leisure.
An exception to this policy of referencing applies to experimental evidence adduced either in validation of the theoretical models presented or to circumscribe their limits. These references do invoke authoritative results from outside. This book is avowedly theoretical, but aerodynamics is neither primarily theoretical nor primarily experimental, it is engineering and requires both theoretical and experimental wings to bear it aloft. At Sydney, a coextensive course on practical experimental aerodynamical measurement in wind tunnels was given simultaneously with the theoretical course from which this text arose.
While numerous quantitative results for lift, pitching moment, and skin-friction coefficients and similar quantities will be found throughout, these are only incidental: a numerical method necessarily results in numerical output, and comparison with these forms one of the easiest ways of verifying the correctness of an implementation or subsequent modification. Some of the results might have indicative value, but all are derived from models simple enough to fit into an introductory course; judgement on when models are applicable can only follow validation of these results, necessarily involving rigorous comparison with experiment, and very often depending on the details of the particular physical application. Where remarks of some generality on the limits of applicability of the methods discussed can be made, they are, but validation remains unfortunately and notoriously difficult to teach from a textbook; though an exhortation as to its paramount importance in computational aerodynamics is not out of place here—a modeller's every second thought should be of validation.
And, as noted above, while it is as discursive as an introduction should be and a compendium should not be, it is very far from being the transcript of a lecture course. It was and is envisaged as accompanying a lecture course, either as delivered simultaneously, or perhaps following, even years after, a remembered course, when a trained and practising engineer realizes that there are aspects of the theoretical underpinnings that aren't as well understood as they might be, or that they are curious to see how to set about implementing some simple aerodynamical models in the now so readily available interactive matrix computation systems.
Neither does it pretend to teach the design of lifting surfaces. Kuethe and Chow (1998) gave their book Foundations of Aerodynamics the subtitle ‘Bases of Aerodynamic Design’, which was perhaps reasonable, but more and more design involves conflicting requirements and becomes multidisciplinary and specific to domains that are difficult to foresee at this remove. Given the number of constraints almost any practical project is subject to, it is almost always the case that the designer is pushed onto the corners of limits rather than having the luxury of optimizing within an open subset of the parameter space. This often means operating further from ideal conditions and involving secondary effects, which cannot be adequately treated in an introduction. Another aspect to the application of the theory of lift to design problems is that the ideas originally conceived for wings of aircraft have applications far beyond them, from the blades of wind turbines to Dyson's Air MultiplierTM fans, and it seems unfair to favour one area of application with coverage at the expense of the rest, including of course those not yet thought of.
One of the organizing principles of this book is the combination, for each of the fundamental problems addressed, of
Actually in most instances this is a recombination, since the subsequent approaches grew up amidst a knowledge of the history and are by no means such independent alternatives as one might think from some presentations of the subject. We would argue that even if no-one were ever to use Glauert's expansion for the lifting line theory again, for example (though we expect this eventuality remains a good few years off yet), learning it is of more use than merely as an aid to understanding the aerodynamical literature of the twentieth century; on contemporary reinspection, it also turns out to be an example of an orthogonal collocation technique for solving the integral equation, and so in fact when we increase the accuracy of our modern panel methods not merely by spatial refinement but also increase of order, we see that the old and the new are related after all. Our hope is that this uncovering of forgotten relationships will serve to demythologize both the sometimes seemingly arcane old ways and more importantly the contemporary computational methods which can too easily be, and which too often are, trusted blindly as black boxes while a knowledge of the classical foundations of the theory is deemed a luxury.
However, such an organizing principle, which might be suitable for a comprehensive treatise of the type that our subject is perhaps overdue in its current state of development—which one hesitates to call maturity but possibly emergence from infancy—is here always subjugated to the pedagogical imperative. This is a textbook and a broad introduction, and in many cases is much more selective than comprehensive.
It does differ from other introductions though. An endeavour has been made to take each element of the theory that has been presented far enough to enable the student to actually use it to compute some quantity of practical engineering interest, even if the methods thus arrived at are either not exactly in the same form as would be used in practice or if they are only expected to be applied here to somewhat simplified cases. This has been preferred to passive descriptions of, say finite-volume Euler or Reynolds-averaged Navier–Stokes solvers, which while undeniably important in contemporary practical aerodynamics certainly cannot be implemented in an undergraduate course. We firmly believe that engineers understand best by doing, and are persuaded therefore that better users of the state-of-the-art codes will ultimately be bred from students conversant with the mechanics of some small programs than from those whose first introduction to computational aerodynamics is by way of a black box.
As to the interdependence of the sections of the book, the core consists of the plane ideal theory of lift in Chapters 2–6, optionally extended by Chapters 7 and 8 on discrete singularity methods. This core is then modified to take into account three factors: three-dimensionality (Chapters 9–14), viscosity (Chapters 15–17), and compressibility (Chapters 18–19). Although in practice these departures from ideality do interact, here in this introduction only first-order corrections are attempted and so these any of these three modules can be taken in any order after the core. The chapters of each should be taken in sequence but within each, the later chapters may be omitted. Chapters 13 and 14 on three-dimensional discrete vortex methods presuppose mastery of the two-dimensional methods in Chapters 7 and 8.
A note on the included computer programs
A note should be made here on the programs developed and presented in the text. These are not intended to be production programs! They stand in relation to such as the chalkings on a classroom blackboard stand to the real analysis or design calculations of a working engineer: introduced intermediate quantities are not always defined, physical units of measurement are omitted, side-cases are ignored, and checks are entirely absent. These snippets are purely offered as educational illustrations of some of the key methods of computational aerodynamics. To that end, they are necessarily clear and brief rather than robust, general, or even efficient. No effort has been put into such essential aspects of software engineering as modularity, data encapsulation and abstraction, input validation, exception handling, unit testing, integration testing, or even documentation beyond the surrounding discussion in the text which they serve. They do do what they are supposed to, with the inputs given, but very close behind that primary goal of basic functionality have been brevity and clarity, since it is believed that these virtues will best facilitate the conveying of the essential ideas embodied.
To write real aerodynamical computer programs— i.e. those to be saved and used at a later date, perhaps by other than their author, perhaps by users who will not read let alone analyse the source code, and perhaps even for some definite practical end—one requires not just an understanding of the physics, which is what this book was written to provide an introduction to, but also good grounding in numerical analysis and software engineering. The former is touched on here, as there is often some true analogy between the refinement of a numerical approximation and its closer approach to the underlying physics, but the latter is completely neglected as sadly out of scope. Those who hope to write computer programs which will be relied upon (this being perhaps the most significant criterion of merit) must not necessarily themselves master The Art of Computer Programming (Knuth, 1968, 1969, 1973, 2011) but at least gain an appreciation of software engineering and most often also engage and collaborate with those with more skills in that area. Real programs today, and this will be even more the case in the future, are, as aircraft have been for many decades, composite machines of many subassemblies and subsystems created and put together by many people at different times and separate locations; even the little programs here provide a simple example of this last point in that whereas those listed by Kuethe and Chow (1998), Katz and Plotkin (2001), and Moran (2003) all contained the complete code for solving systems of linear equations, here we are able to avail ourselves of the standard operations provided for this. Whereas William Henson and John Stringfellow might have constructed just about all of their Model of 1848 by hand or at least in their own workshops (Davy 1931), only hobbyists would consider doing this for any aircraft today.
Foremost, we trust that the little snippets served here will be more easily digested than the slabs of FORTRAN to be found in the previous generation of textbooks on aerodynamics. They might serve as points of departure or suggestions, or, without harm, left as mere illustrations of discussions of physics. Those continuing into research into computational aerodynamics will not be served far past their first steps with these training programs, but the hope is that having learned to read, use, and modify these, it will be found easier to use and adapt real programs and to craft the next generation of them.
My first debt is to my teachers, in particular the late Dr Jonathan Harris. I am also very grateful to Professors Douglass Auld and Steven Armfield for first inviting me to give the introductory aerodynamical course at Sydney, and then allowing me such scope in adapting the curriculum to make use of contemporary computational systems.
This book was developed by the author entirely using free software, that is, not so much software distributed free of charge, but software distributed along with its source code under licences such as the Free Software Foundation's General Public Licence. The programs used, besides GNU Octave, include , GNU Emacs, GNU Make, Asymptote, and matplotlib. The author is deeply appreciative of the skill and time that their several authors, distributed around the world, have put into them, and equally appreciative of the power and elegance of these programs, which now form a most useful part of the common intellectual patrimony of the aeronautical engineering profession.
My last debt is to my readers, beyond the students of aerodynamics at Sydney such as Sujee Mampitiyarachchi, David Wilson, Christopher Chapman, and Thomas Chubb. Here I can only thank the earliest of these, João Henriques, Andreas Puhl, and Pierre-Yves Lagrée, for bringing errors, inconsistencies, ambiguities, and obfuscations to my attention—I have endeavoured to fix these and more, but apologize for the multitude that undoubtedly remain.
G. D. McBainDulwich Hill, New South Wales
References
Abbott, I.H. and von Doenhoff, A.E. (1959) Theory of Wing Sections. New York: Dover.
Ashley, H. and Landahl, M. (1985) Aerodynamics of Wings and Bodies. New York: Dover.
Batchelor, G.K. (1967) An Introduction to Fluid Dynamics. Cambridge: Cambridge University Press.
Bousquet, J. (1990) Aérodynamique: Méthode des singularités. Toulouse: Cépaduès.
Darrozes, J.S. and François, C. (1982) Mécanique des Fluides Incompressibles, Lecture Notes in Physics, vol. 163, New York: Springer.
Davy, M.J.B. (1931) Henson and Stringfellow, Their Work in Aeronautics. Board of Education Science Museum. London: His Majesty's Stationery Office.
Glauert, H. (1926) The Elements of Aerofoil and Airscrew Theory. Cambridge: Cambridge University Press.
Katz, J. and Plotkin, A. (2001) Low-Speed Aerodynamics, 2nd edn. Cambridge: Cambridge University Press.
Knuth, D.E. (1968) Fundamental Algorithms. The Art of Computer Programming, vol. 1. Boston: Addison-Wesley.
Knuth, D.E. (1969) Seminumerical Algorithms, The Art of Computer Programming, vol. 2. Boston: Addison-Wesley.
Knuth, D.E. (1973) Searching and Sorting. The Art of Computer Programming, vol. 3. Boston: Addison-Wesley.
Knuth, D.E. (2011) Combinatorial Algorithms. The Art of Computer Programming, vol. 4A. Boston: Addison-Wesley.
Kuethe, A.M. and Chow, C.Y. (1998) Foundations of Aerodynamics, 5th edn. Chichester: John Wiley & Sons, Ltd.
Lamb, H. (1932) Hydrodynamics, 6th edn. Cambridge: Cambridge University Press.
Milne-Thomson, L.M. (1973) Theoretical Aerodynamics, 4th edn. New York: Dover.
Moran, J. (2003) An Introduction to Theoretical and Computational Aerodynamics. New York: Dover.
Paraschivoiu, I. (1998) Aérodynamique Subsonique. éditions de l'école de Montréal.
Prandtl, L. and Tietjens, O.G. (1957) Applied Hydro-and Aeromechanics. New York: Dover.
Series Preface
The field of aerospace is wide ranging and multi-disciplinary, covering a large variety of products, disciplines and domains, not merely in engineering but in many related supporting activities. These combine to enable the aerospace industry to produce exciting and technologically advanced vehicles. The wealth of knowledge and experience that has been gained by expert practitioners in the various aerospace fields needs to be passed onto others working in the industry, including those just entering from University.
The Aerospace Series aims to be a practical and topical series of books aimed at engineering professionals, operators, users and allied professions such as commercial and legal executives in the aerospace industry, and also engineers in academia. The range of topics is intended to be wide ranging, covering design and development, manufacture, operation and support of aircraft as well as topics such as infrastructure operations and developments in research and technology. The intention is to provide a source of relevant information that will be of interest and benefit to all those people working in aerospace.
Aerodynamics is the key science that enables the aerospace industry world-wide –without the ability to generate lift from airflow passing over wings, helicopter rotors and other lifting surfaces, it would not be possible to fly heavier-than-air vehicles, or use wind turbines to generate electricity. Much of the development of today's highly efficient aircraft is due to the ability to accurately model aerodynamic flows and thus design high-performance wings. Although there are many readily available sophisticated CFD codes, a thorough understanding of the fundamental aerodynamics that they are based upon is vital for engineers to comprehend and also verify the results that are obtained from them.
This book, Theory of Lift: Introductory Computational Aerodynamics in MATLAB®/Octave, provides an important addition to the Wiley Aerospace Series. Aimed at undergraduates and engineers new to the field, it provides a comprehensive grounding to the fundamentals of theoretical aerodynamics, illustrated using modern matrix based computational techniques. A notable feature of the book is how each element of theory is taken far enough so that students can use it to compute quantities of practical interest using the accompanying computer codes.
Peter Belobaba, Jonathan Cooper, Roy Langton and Allan Seabridge
Part One
Plane Ideal Aerodynamics
Chapter 1
Preliminary Notions
An aircraft in flight is subject to several forces: gravity causes the weight force; the propulsion provides a thrust, and the air the aerodynamic forceA.1
The central problem of aerodynamics is the prediction of the aerodynamic force; as important is its line of action, or equivalently its moment.
The motion of the aircraft through the air forces the air to move, setting up aerodynamic stresses. In turn, by Newton's Third Law of Motion, the stress in the air is transmitted back across the surface of the aircraft. The stresses include pressure stresses and viscous stresses. The aggregates of the stresses on the surface are the aerodynamic force and moment.
Newton's equations of motion are unchanged if the frame of reference is replaced with one moving at a constant relative velocity; that is, the aerodynamic force can be computed or measured equally well by an observer in the aircraft in steady flight as by an observer on the ground. In the aeroplane's frame of reference, it's stationary and the air moves at a velocity −.
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