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phase speed of water wave

Input interpretation

phase speed of water wave
phase speed of water wave

Equation

v = sqrt((g tanh(d k))/k) | k = (2 π)/λ |  v | wave propagation speed λ | wavelength d | depth of water g | gravitational acceleration k | wavenumber
v = sqrt((g tanh(d k))/k) | k = (2 π)/λ | v | wave propagation speed λ | wavelength d | depth of water g | gravitational acceleration k | wavenumber

Input values

wavelength | 1 meter depth of water | 2 meters gravitational acceleration | 9.81 m/s^2 (meters per second squared)
wavelength | 1 meter depth of water | 2 meters gravitational acceleration | 9.81 m/s^2 (meters per second squared)

Result

wave propagation speed | 125 cm/s (centimeters per second) = 2.795 mph (miles per hour) = 4.498 km/h (kilometers per hour) = 4.099 ft/s (feet per second) = 1.25 m/s (meters per second)
wave propagation speed | 125 cm/s (centimeters per second) = 2.795 mph (miles per hour) = 4.498 km/h (kilometers per hour) = 4.099 ft/s (feet per second) = 1.25 m/s (meters per second)