Fluid at a constant flow rate passes through a long, straight, cylindrical pipe that has an axisymmetric convergent section at the end.
Which one of the following options correctly represents the velocity field in the converging section in cylindrical \( (r, \theta, z) \) coordinates?
Which one of the following options correctly represents the velocity field in the converging section in cylindrical \( (r, \theta, z) \) coordinates?
Show Hint
- Two-dimensional function of \( r \) and \( z \)
- One-dimensional function of \( r \)
- Two-dimensional function of \( r \) and \( \theta \)
- One-dimensional function of \( z \)
The Correct Option is A
Solution and Explanation
Since the pipe is axisymmetric, the flow is not a function of \( \theta \), and therefore the velocity field will be a function of the radial distance \( r \) and the axial position \( z \) alone.
The governing equation for this type of flow is often reduced to a two-dimensional form that describes the variation of velocity in terms of \( r \) and \( z \). Hence, the velocity field in the converging section of the pipe will be described as a two-dimensional function of \( r \) and \( z \).
Thus, the correct answer is (A) Two-dimensional function of \( r \) and \( z \).
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