Wave Period for Vertical Component of Local Fluid Velocity Calculator

✖Vertical Component of Velocity refers to the speed at which water moves vertically within the coastal zone. It's a crucial parameter in understanding various coastal processes.ⓘ Vertical Component of Velocity [V_v]			+10% -10%
✖Wavelength of Wave refers to the distance between consecutive corresponding points of the same phase on the wave, such as two adjacent crests, troughs, or zero crossings.ⓘ Wavelength of Wave [λ]			+10% -10%
✖Water Depth for Fluid Velocity is the depth as measured from the water level to the bottom of the considered water body.ⓘ Water Depth for Fluid Velocity [d]			+10% -10%
✖Height of the Wave is the difference between the elevations of a crest and a neighboring trough.ⓘ Height of the Wave [H_w]			+10% -10%
✖Distance above the Bottom refers to the vertical measurement from the lowest point of a given surface (such as the bottom of waterbody) to a specified point above it.ⓘ Distance above the Bottom [D_Z+d]			+10% -10%
✖Phase Angle refers to the time lag between the maximum amplitude of a forcing function, such as waves or currents, and the response of the system, such as water level or sediment transport.ⓘ Phase Angle [θ]			+10% -10%

✖Wave Period refers to the time it takes for two successive wave crests (or troughs) to pass through a given point.ⓘ Wave Period for Vertical Component of Local Fluid Velocity [T_p]

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Wave Period for Vertical Component of Local Fluid Velocity Solution

STEP 0: Pre-Calculation Summary

Formula Used

Wave Period = Vertical Component of Velocity*2*Wavelength of Wave*cosh(2*pi*Water Depth for Fluid Velocity/Wavelength of Wave)/(Height of the Wave*[g]*sinh(2*pi*(Distance above the Bottom)/Wavelength of Wave)*sin(Phase Angle))
T_p = V_v*2*λ*cosh(2*pi*d/λ)/(H_w*[g]*sinh(2*pi*(D_Z+d)/λ)*sin(θ))
This formula uses 2 Constants, 3 Functions, 7 Variables

Constants Used

[g] - Gravitational acceleration on Earth Value Taken As 9.80665
pi - Archimedes' constant Value Taken As 3.14159265358979323846264338327950288

Functions Used

sin - Sine is a trigonometric function that describes the ratio of the length of the opposite side of a right triangle to the length of the hypotenuse., sin(Angle)
sinh - The hyperbolic sine function, also known as the sinh function, is a mathematical function that is defined as the hyperbolic analogue of the sine function., sinh(Number)
cosh - The hyperbolic cosine function is a mathematical function that is defined as the ratio of the sum of the exponential functions of x and negative x to 2., cosh(Number)

Variables Used

Wave Period - (Measured in Second) - Wave Period refers to the time it takes for two successive wave crests (or troughs) to pass through a given point.
Vertical Component of Velocity - (Measured in Meter per Second) - Vertical Component of Velocity refers to the speed at which water moves vertically within the coastal zone. It's a crucial parameter in understanding various coastal processes.
Wavelength of Wave - (Measured in Meter) - Wavelength of Wave refers to the distance between consecutive corresponding points of the same phase on the wave, such as two adjacent crests, troughs, or zero crossings.
Water Depth for Fluid Velocity - (Measured in Meter) - Water Depth for Fluid Velocity is the depth as measured from the water level to the bottom of the considered water body.
Height of the Wave - (Measured in Meter) - Height of the Wave is the difference between the elevations of a crest and a neighboring trough.
Distance above the Bottom - (Measured in Meter) - Distance above the Bottom refers to the vertical measurement from the lowest point of a given surface (such as the bottom of waterbody) to a specified point above it.
Phase Angle - (Measured in Radian) - Phase Angle refers to the time lag between the maximum amplitude of a forcing function, such as waves or currents, and the response of the system, such as water level or sediment transport.

STEP 1: Convert Input(s) to Base Unit

Vertical Component of Velocity: 2.911 Meter per Second --> 2.911 Meter per Second No Conversion Required
Wavelength of Wave: 32 Meter --> 32 Meter No Conversion Required
Water Depth for Fluid Velocity: 17 Meter --> 17 Meter No Conversion Required
Height of the Wave: 14 Meter --> 14 Meter No Conversion Required
Distance above the Bottom: 2 Meter --> 2 Meter No Conversion Required
Phase Angle: 30 Degree --> 0.5235987755982 Radian (Check conversion here)

STEP 2: Evaluate Formula

Substituting Input Values in Formula

T_p = V_v*2*λ*cosh(2*pi*d/λ)/(H_w*[g]*sinh(2*pi*(D_Z+d)/λ)*sin(θ)) --> 2.911*2*32*cosh(2*pi*17/32)/(14*[g]*sinh(2*pi*(2)/32)*sin(0.5235987755982))

Evaluating ... ...

T_p = 94.9741215994846

STEP 3: Convert Result to Output's Unit

94.9741215994846 Second --> No Conversion Required

FINAL ANSWER

94.9741215994846 ≈ 94.97412 Second <-- Wave Period

(Calculation completed in 00.004 seconds)

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Home » Engineering » Civil » Coastal and Ocean Engineering » Water Wave Mechanics » Local Fluid and Mass Transport Velocity » Local Fluid Velocity » Wave Period for Vertical Component of Local Fluid Velocity

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Created by Mithila Muthamma PA

Coorg Institute of Technology (CIT), Coorg

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< Local Fluid Velocity Calculators

Local Fluid Particle Acceleration of Vertical Component of Fluid Velocity

LaTeX Go Local Fluid Particle Acceleration in Y Direction = -([g]*pi*Height of the Wave/Wavelength of Wave)*((sinh(2*pi*(Distance above the Bottom)/Wavelength of Wave))/(cosh(2*pi*Water Depth for Fluid Velocity/Wavelength of Wave)))*cos(Phase Angle)

Local Fluid Particle Acceleration of Horizontal Component

LaTeX Go Local Fluid Particle Acceleration in X Direction = ([g]*pi*Height of the Wave/Wavelength of Wave)*((cosh(2*pi*(Distance above the Bottom)/Wavelength of Wave))/(cosh(2*pi*Water Depth for Fluid Velocity/Wavelength of Wave)))*sin(Phase Angle)

Horizontal Component of Local Fluid Velocity

LaTeX Go Horizontal Component of Velocity = (Height of the Wave*[g]*Wave Period/(2*Wavelength of Wave))*((cosh((2*pi*Distance above the Bottom)/Wavelength of Wave))/(cosh((2*pi*Water Depth for Fluid Velocity)/Wavelength of Wave)))*cos(Phase Angle)

Vertical Component of Local Fluid Velocity

LaTeX Go Vertical Component of Velocity = (Height of the Wave*[g]*Wave Period/(2*Wavelength of Wave))*((sinh(2*pi*(Distance above the Bottom)/Wavelength of Wave))/(cosh(2*pi*Water Depth for Fluid Velocity/Wavelength of Wave)))*sin(Phase Angle)

Wave Period for Vertical Component of Local Fluid Velocity Formula

LaTeX Go

How Does Depth Affect Wavelength?

The change from deep to shallow water waves occurs when the depth of the water, d, becomes less than one half of the wavelength of the wave, λ. The speed of deep-water waves depends on the wavelength of the waves. We say that deep-water waves show dispersion. A wave with a longer wavelength travels at higher speed.

How to Calculate Wave Period for Vertical Component of Local Fluid Velocity?

Wave Period for Vertical Component of Local Fluid Velocity calculator uses Wave Period = Vertical Component of Velocity*2*Wavelength of Wave*cosh(2*pi*Water Depth for Fluid Velocity/Wavelength of Wave)/(Height of the Wave*[g]*sinh(2*pi*(Distance above the Bottom)/Wavelength of Wave)*sin(Phase Angle)) to calculate the Wave Period, The Wave Period for Vertical Component of Local Fluid Velocity formula is defined as the time it takes for a wave to complete one full cycle of oscillation, specifically focusing on the vertical movement of water particles within the wave. Wave Period is denoted by T_p symbol.

How to calculate Wave Period for Vertical Component of Local Fluid Velocity using this online calculator? To use this online calculator for Wave Period for Vertical Component of Local Fluid Velocity, enter Vertical Component of Velocity (V_v), Wavelength of Wave (λ), Water Depth for Fluid Velocity (d), Height of the Wave (H_w), Distance above the Bottom (D_Z+d) & Phase Angle (θ) and hit the calculate button. Here is how the Wave Period for Vertical Component of Local Fluid Velocity calculation can be explained with given input values -> 94.97412 = 2.911*2*32*cosh(2*pi*17/32)/(14*[g]*sinh(2*pi*(2)/32)*sin(0.5235987755982)).

FAQ

What is Wave Period for Vertical Component of Local Fluid Velocity?

The Wave Period for Vertical Component of Local Fluid Velocity formula is defined as the time it takes for a wave to complete one full cycle of oscillation, specifically focusing on the vertical movement of water particles within the wave and is represented as T_p = V_v*2*λ*cosh(2*pi*d/λ)/(H_w*[g]*sinh(2*pi*(D_Z+d)/λ)*sin(θ)) or Wave Period = Vertical Component of Velocity*2*Wavelength of Wave*cosh(2*pi*Water Depth for Fluid Velocity/Wavelength of Wave)/(Height of the Wave*[g]*sinh(2*pi*(Distance above the Bottom)/Wavelength of Wave)*sin(Phase Angle)). Vertical Component of Velocity refers to the speed at which water moves vertically within the coastal zone. It's a crucial parameter in understanding various coastal processes, Wavelength of Wave refers to the distance between consecutive corresponding points of the same phase on the wave, such as two adjacent crests, troughs, or zero crossings, Water Depth for Fluid Velocity is the depth as measured from the water level to the bottom of the considered water body, Height of the Wave is the difference between the elevations of a crest and a neighboring trough, Distance above the Bottom refers to the vertical measurement from the lowest point of a given surface (such as the bottom of waterbody) to a specified point above it & Phase Angle refers to the time lag between the maximum amplitude of a forcing function, such as waves or currents, and the response of the system, such as water level or sediment transport.

How to calculate Wave Period for Vertical Component of Local Fluid Velocity?

The Wave Period for Vertical Component of Local Fluid Velocity formula is defined as the time it takes for a wave to complete one full cycle of oscillation, specifically focusing on the vertical movement of water particles within the wave is calculated using Wave Period = Vertical Component of Velocity*2*Wavelength of Wave*cosh(2*pi*Water Depth for Fluid Velocity/Wavelength of Wave)/(Height of the Wave*[g]*sinh(2*pi*(Distance above the Bottom)/Wavelength of Wave)*sin(Phase Angle)). To calculate Wave Period for Vertical Component of Local Fluid Velocity, you need Vertical Component of Velocity (V_v), Wavelength of Wave (λ), Water Depth for Fluid Velocity (d), Height of the Wave (H_w), Distance above the Bottom (D_Z+d) & Phase Angle (θ). With our tool, you need to enter the respective value for Vertical Component of Velocity, Wavelength of Wave, Water Depth for Fluid Velocity, Height of the Wave, Distance above the Bottom & Phase Angle and hit the calculate button. You can also select the units (if any) for Input(s) and the Output as well.

How many ways are there to calculate Wave Period?

In this formula, Wave Period uses Vertical Component of Velocity, Wavelength of Wave, Water Depth for Fluid Velocity, Height of the Wave, Distance above the Bottom & Phase Angle. We can use 1 other way(s) to calculate the same, which is/are as follows -

Wave Period = Horizontal Component of Velocity*2*Wavelength of Wave*cosh(2*pi*Water Depth for Fluid Velocity/Wavelength of Wave)/(Height of the Wave*[g]*cosh(2*pi*(Distance above the Bottom)/Wavelength of Wave)*cos(Phase Angle))

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