| 11. | Not all flows are critical, so what about Froude numbers not equal to one?
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| 12. | Froude numbers below one are considered subcritical and Froude numbers above one are considered supercritical.
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| 13. | Froude numbers below one are considered subcritical and Froude numbers above one are considered supercritical.
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| 14. | Consequently, this depth corresponds to a Froude Number ( F _ n ) of 1.
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| 15. | Here Fr is the dimensionless Froude number, and relates inertial to gravitational forces in the upstream flow.
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| 16. | Finally, gravity is not responsible for the flow, so the Froude number can also be disregarded.
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| 17. | Related to the critical flow demarcation between subcritical flow and supercritical flow ( see also Froude number ).
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| 18. | When the Froude number falls into this range, the jump forms steadily and at the same location.
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| 19. | If the Froude number is greater than 1, the flow is supercritical and the reach is steep.
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| 20. | In addition, when using a space suit, there are very apparent differences in the Froude number.
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