Strouhal number
| Physical key figure | |||||||
|---|---|---|---|---|---|---|---|
| Surname | Strouhal number | ||||||
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| dimension | dimensionless | ||||||
| definition | |||||||
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| Named after | Vincent Strouhal | ||||||
| scope of application | oscillating currents | ||||||
The Strouhal number is a dimensionless number used in fluid mechanics . In the case of unsteady flow processes, it can be used to determine the shedding frequency of eddies , as can be observed, for example, in a Karman vortex street . It is named after the Czech physicist Vincent Strouhal (1850–1922), who first used it in 1878.
Definition and values
The Strouhal number is defined as:
With
- Vortex shedding frequency
- Size of the flow around the obstacle, e.g. B. diameter of a cylinder
- Flow velocity .
The diagram shows the dependence of the Strouhal number on the Reynolds number for a cylinder with a flow around it. For most practical applications, the approximation applies:
With this the frequency of the vortex shedding can be calculated:
Examples
If the wind blows around a cable with a diameter of 0.01 m at a speed of 20 m / s, one hears the singing of the wires , also called aeolian tones , with a frequency of 0.21 · 20 m / s: 0.01 m = 420 Hz.
Air bombs strike from a height of 2000 m at a speed of approx. 200 m / s. With a diameter of a few decimeters, they produce a high-pitched whistling tone, the pitch of which is additionally modulated by the Doppler effect .