Fluid MechanicsAcademic Press, 2010 M01 20 - 904 páginas Fluid mechanics, the study of how fluids behave and interact under various forces and in various applied situations—whether in the liquid or gaseous state or both—is introduced and comprehensively covered in this widely adopted text. Fluid Mechanics, Fourth Edition is the leading advanced general text on fluid mechanics.
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Página xxi
... expressed fluid mechanics in the clearest way I have ever seen, and Professor Martin D. Kruskal, whose use of mathematics to solve difficult physical problems was developed to a high art form and reminds me of a Vivaldi trumpet xxi ...
... expressed fluid mechanics in the clearest way I have ever seen, and Professor Martin D. Kruskal, whose use of mathematics to solve difficult physical problems was developed to a high art form and reminds me of a Vivaldi trumpet xxi ...
Página 2
... expressed in terms of the units of four basic variables, namely, length, mass, time, and temperature. In this book the international system of units (Syst`eme international d' unit ́es) and commonly referred to as SI units, will be used ...
... expressed in terms of the units of four basic variables, namely, length, mass, time, and temperature. In this book the international system of units (Syst`eme international d' unit ́es) and commonly referred to as SI units, will be used ...
Página 10
... expressed by Pascal's law, which states that all points in a resting fluid medium (and connected by the same fluid) are at the same pressure if they are at the same depth. For example, the pressure at points F and G in Figure 1.7 are ...
... expressed by Pascal's law, which states that all points in a resting fluid medium (and connected by the same fluid) are at the same pressure if they are at the same depth. For example, the pressure at points F and G in Figure 1.7 are ...
Página 20
... expressed in terms of the concept ofpotential temperature, which is generally denoted by θ. Suppose the pressure and temperature of a fluid particle at a certain height are p and T. Now if we take the particle adiabatically to a ...
... expressed in terms of the concept ofpotential temperature, which is generally denoted by θ. Suppose the pressure and temperature of a fluid particle at a certain height are p and T. Now if we take the particle adiabatically to a ...
Página 32
... expressed as a matrix product. Rewrite equation (2.12) as τmn = CTmiτijCjn, which, with adjacent dummy indices, represents the matrix product τ = CT• τ• C. This says that the tensor τ in the rotated frame is found by multiplying C by ...
... expressed as a matrix product. Rewrite equation (2.12) as τmn = CTmiτijCjn, which, with adjacent dummy indices, represents the matrix product τ = CT• τ• C. This says that the tensor τ in the rotated frame is found by multiplying C by ...
Contenido
1 | |
25 | |
53 | |
81 | |
139 | |
Irrotational Flow | 165 |
Gravity Waves | 213 |
Dynamic Similarity | 279 |
Turbulence | 537 |
Geophysical Fluid Dynamics | 603 |
Aerodynamics | 679 |
Compressible Flow | 713 |
Introduction to Biofluid
Mechanics | 765 |
Some Properties of
Common Fluids | 841 |
Curvilinear Coordinates | 845 |
Founders of
Modern Fluid Dynamics | 851 |
Laminar Flow | 295 |
Boundary Layers and Related
Topics | 339 |
Computational Fluid
Dynamics | 411 |
Instability | 467 |
Visual Resources | 855 |
Index | 857 |
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Términos y frases comunes
approximation assumed atmosphere average becomes blood body boundary conditions boundary layer called Chapter circulation components Consider constant continuity coordinates cylinder decreases defined density depends derivative determined developed direction discussed distribution drag dynamics effects element energy equal equation example expressed field Figure finite flow fluid follows force function given gives gravity heat horizontal important increases initial instability integral irrotational length limit linear mass mean Mechanics method momentum motion moving normal Note obtain particle plane plate positive potential pressure problem propagation region relation represents requires result Reynolds number rotation scale shear shock shown shows side similarity solution speed steady streamlines stress surface surface tension temperature tensor theory tube turbulent unit variables vector velocity viscous volume vortex vorticity wall wave written zero