p0502 - x , wherefore ( u ) = d dx ( u ) = 0 Integrating...

Info iconThis preview shows page 1. Sign up to view the full content.

View Full Document Right Arrow Icon
5.2. CHAPTER 5, PROBLEM 2 451 5.2 Chapter 5, Problem 2 Solution: In general, the mass-conservation, or continuity, equation is ∂ρ t + · ( ρ u )=0 Because the flow is steady, ∂ρ / t =0 . Also, since the flow is one-dimensional, the divergence simplifies to the ordinary derivative with respect to
Background image of page 1
This is the end of the preview. Sign up to access the rest of the document.

Unformatted text preview: x , wherefore ( u ) = d dx ( u ) = 0 Integrating over x and using the fact that = o and u = u o at x = x o , we find u = o u o = = o u o u Finally, substituting for u , the solution for the density is = o w x o x W 2...
View Full Document

This note was uploaded on 02/09/2012 for the course AME 309 taught by Professor Phares during the Spring '06 term at USC.

Ask a homework question - tutors are online