Introduction to Mathematical Physics/Continuous approximation/Momentum conservation

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We assume here that external forces are described by $f$ and that internal strains are described by tensor $τ_{i j}$ .

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This integral equation corresponds to the applying of Newton's law of motion\index{momentum} over the elementary fluid volume as shown by figure figconsp.

Momentum conservation law corresponds to the application of Newton's law of motion to an elementary fluid volume.} Template:IMP/label

Partial differential equation associated to this integral equation is:

Template:IMP/eq

Using continuity equation yields to:

Template:IMP/eq

Template:IMP/rem Later on, fluid momentum is simply designated by $p$ .

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