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Heat transfer. 1, Conduction / Michel Ledoux, Abdelkhalak El Hami.

By: Ledoux, Michel [author.]

Contributor(s): El Hami, Abdelkhalak [author.]

Language: English Publisher: London, United Kingdom : Hoboken, NJ : ISTE, Ltd. ; Wiley, 2021Description: 1 online resourceContent type: text Media type: computer Carrier type: online resourceISBN: 9781786305169 ; 9781119818236; 1119818230Other title: ConductionSubject(s): Heat -- TransmissionGenre/Form: Electronic books.DDC classification: 536/.2 LOC classification: TJ260Online resources: Full text is available at Wiley Online Library Click here to view

Contents:

Table of Contents Preface ix Introduction xiii Chapter 1. The Problem of Thermal Conduction: General Comments 1 1.1. The fundamental problem of thermal conduction 1 1.2. Definitions 2 1.2.1. Temperature, isothermal surface and gradient 2 1.2.2. Flow and density of flow 4 1.3. Relation to thermodynamics 5 1.3.1. Calorimetry 5 1.3.2. The first principle 6 1.3.3. The second principle 6 Chapter 2. The Physics of Conduction 9 2.1. Introduction 9 2.2. Fourier’s law 9 2.2.1. Experiment 9 2.2.2. Temperature profile 12 2.2.3. General expression of the Fourier law 14 2.3. Heat equation 16 2.3.1. General problem 16 2.3.2. Mono-dimensional plane problem 18 2.3.3. Case of the axisymmetric system 24 2.3.4. Case of the spherical system 25 2.4. Resolution of a problem 26 2.5. Examples of application 29 2.5.1. Problems involving spherical symmetry 40 Chapter 3. Conduction in a Stationary Regime 53 3.1. Thermal resistance 53 3.1.1. Thermal resistance: plane geometry 53 3.1.2. Thermal resistance: axisymmetric geometry. The case of a cylindrical wall 62 3.1.3. Thermal resistance to convection 65 3.1.4. Critical radius 67 3.2. Examples of the application of thermal resistance in plane geometry 69 3.3. Examples of the application of the thermal resistance in cylindrical geometry 85 3.4. Problem of the critical diameter 92 3.5. Problem with the heat balance 99 Chapter 4. Quasi-stationary Model 103 4.1. We can perform a simplified calculation, adopting the following hypotheses 103 4.2. Method: instantaneous thermal balance 104 4.3. Resolution 106 4.4. Applications for plane systems 107 4.5. Applications for axisymmetric systems 152 Chapter 5. Non-stationary Conduction 183 5.1. Single-dimensional problem 183 5.1.1. Temperature imposed at the interface at instant t = 0 184 5.2. Non-stationary conduction with constant flow density 190 5.3. Temperature imposed on the wall: sinusoidal variation 193 5.4. Problem with two walls stuck together 200 5.5. Application examples 204 5.5.1. Simple applications 204 5.5.2. Some scenes from daily life 213 Chapter 6. Fin Theory: Notions and Examples 237 6.1. Notions regarding the theory of fins 237 6.1.1. Principle of fins 237 6.1.2. Elementary fin theory 238 6.1.3. Parallelepiped fin 242 6.2. Examples of application 249 Appendices 263 Appendix 1. Heat Equation of a Three-dimensional System 265 Appendix 2. Heat Equation: Writing in the Main Coordinate Systems 273 Appendix 3. One-dimensional Heat Equation 283 Appendix 4. Conduction of the Heat in a Non-stationary Regime: Solutions to Classic Problems 291 Appendix 5. Table of erf (x), erfc (x) and ierfc (x) Functions 295 Appendix 6. Complementary Information Regarding Fins 297 Appendix 7. The Laplace Transform 301 Appendix 8. Reminders Regarding Hyperbolic Functions 309 References 313 Index 315

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Item type	Current location	Home library	Call number	Status	Date due	Barcode	Item holds
EBOOK	COLLEGE LIBRARY	COLLEGE LIBRARY	536.2 L4994 2021 (Browse shelf)	Available		CL-53045

Total holds: 0

Includes bibliographical references and index.

Table of Contents
Preface ix

Introduction xiii

Chapter 1. The Problem of Thermal Conduction: General Comments 1

1.1. The fundamental problem of thermal conduction 1

1.2. Definitions 2

1.2.1. Temperature, isothermal surface and gradient 2

1.2.2. Flow and density of flow 4

1.3. Relation to thermodynamics 5

1.3.1. Calorimetry 5

1.3.2. The first principle 6

1.3.3. The second principle 6

Chapter 2. The Physics of Conduction 9

2.1. Introduction 9

2.2. Fourier’s law 9

2.2.1. Experiment 9

2.2.2. Temperature profile 12

2.2.3. General expression of the Fourier law 14

2.3. Heat equation 16

2.3.1. General problem 16

2.3.2. Mono-dimensional plane problem 18

2.3.3. Case of the axisymmetric system 24

2.3.4. Case of the spherical system 25

2.4. Resolution of a problem 26

2.5. Examples of application 29

2.5.1. Problems involving spherical symmetry 40

Chapter 3. Conduction in a Stationary Regime 53

3.1. Thermal resistance 53

3.1.1. Thermal resistance: plane geometry 53

3.1.2. Thermal resistance: axisymmetric geometry. The case of a cylindrical wall 62

3.1.3. Thermal resistance to convection 65

3.1.4. Critical radius 67

3.2. Examples of the application of thermal resistance in plane geometry 69

3.3. Examples of the application of the thermal resistance in cylindrical geometry 85

3.4. Problem of the critical diameter 92

3.5. Problem with the heat balance 99

Chapter 4. Quasi-stationary Model 103

4.1. We can perform a simplified calculation, adopting the following hypotheses 103

4.2. Method: instantaneous thermal balance 104

4.3. Resolution 106

4.4. Applications for plane systems 107

4.5. Applications for axisymmetric systems 152

Chapter 5. Non-stationary Conduction 183

5.1. Single-dimensional problem 183

5.1.1. Temperature imposed at the interface at instant t = 0 184

5.2. Non-stationary conduction with constant flow density 190

5.3. Temperature imposed on the wall: sinusoidal variation 193

5.4. Problem with two walls stuck together 200

5.5. Application examples 204

5.5.1. Simple applications 204

5.5.2. Some scenes from daily life 213

Chapter 6. Fin Theory: Notions and Examples 237

6.1. Notions regarding the theory of fins 237

6.1.1. Principle of fins 237

6.1.2. Elementary fin theory 238

6.1.3. Parallelepiped fin 242

6.2. Examples of application 249

Appendices 263

Appendix 1. Heat Equation of a Three-dimensional System 265

Appendix 2. Heat Equation: Writing in the Main Coordinate Systems 273

Appendix 3. One-dimensional Heat Equation 283

Appendix 4. Conduction of the Heat in a Non-stationary Regime: Solutions to Classic Problems 291

Appendix 5. Table of erf (x), erfc (x) and ierfc (x) Functions 295

Appendix 6. Complementary Information Regarding Fins 297

Appendix 7. The Laplace Transform 301

Appendix 8. Reminders Regarding Hyperbolic Functions 309

References 313

Index 315

About the Author
Michel Ledoux was Professor and Vice-President at the University of Rouen, France. He was also Director of the UMR CNRS CORIA, then Regional Delegate for Research and Technology in Upper Normandy, France. Specializing in fluid mechanics and transfers, he has worked in the fields of reactive boundary layers and spraying. Currently retired, he is an adviser to the Conservatoire National des Arts et Métiers in Normandy, collaborating with the Institute of Industrial Engineering Techniques (ITII) in Vernon, France.

Abdelkhalak El Hami is Full Professor of Universities at INSA-RouenNormandie, France. He is the author/co-author of several books and is responsible for the Chair of mechanics at the Conservatoire National des Arts et Métiers in Normandy, as well as for several European pedagogical projects. He is a specialist in problems of optimization and reliability in multi-physical systems.

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