FormulaDen.com

Physics Chemistry Math Chemical Engineering Civil Electrical Electronics Electronics and Instrumentation Materials Science Mechanical Production Engineering Financial Health

Mean Depth in Stokes' Second Approximation to Wave Speed if there is no Mass Transport Formula

GoMean Depth given Second Type of Mean Fluid Speed Formula

GoMean Depth given Ursell Number Formula

Fx Copy

LaTeX Copy

Coastal Mean Depth of a fluid flow is a measure of the average depth of the fluid in a channel, pipe, or other conduit through which the fluid is flowing. Check FAQs

d = \frac{V rate}{v}

d - Coastal Mean Depth?V_rate - Rate of Volume Flow?v - Wave Speed?

Mean Depth in Stokes' Second Approximation to Wave Speed if there is no Mass Transport Example

With values

With units

Only example

Here is how the Mean Depth in Stokes' Second Approximation to Wave Speed if there is no Mass Transport equation looks like with Values.

Here is how the Mean Depth in Stokes' Second Approximation to Wave Speed if there is no Mass Transport equation looks like with Units.

Here is how the Mean Depth in Stokes' Second Approximation to Wave Speed if there is no Mass Transport equation looks like.

10 = \frac{500}{50}

10m = \frac{500m³/s}{50m/s}

10 = \frac{500}{50}

Tip: Use pencil ( Pencil

) icon above to edit Input Values and Units.

Calculate

Recalculate

Solution

Copy

Reset

You are here -

Home » Category

Engineering » Category

Civil » Category

Coastal and Ocean Engineering » fx Mean Depth in Stokes' Second Approximation to Wave Speed if there is no Mass Transport

Mean Depth in Stokes' Second Approximation to Wave Speed if there is no Mass Transport Solution

Follow our step by step solution on how to calculate Mean Depth in Stokes' Second Approximation to Wave Speed if there is no Mass Transport?

FIRST Step Consider the formula

d = \frac{V rate}{v}

Next Step Substitute values of Variables

∴

d = \frac{500m³/s}{50m/s}

Next Step Prepare to Evaluate

∴

d = \frac{500}{50}

LAST Step Evaluate

∴

d = 10m

Mean Depth in Stokes' Second Approximation to Wave Speed if there is no Mass Transport Formula Elements

Variables

Coastal Mean Depth

Coastal Mean Depth of a fluid flow is a measure of the average depth of the fluid in a channel, pipe, or other conduit through which the fluid is flowing.

Symbol: d

Measurement: LengthUnit: m

Note: Value can be positive or negative.

Formulas to find Coastal Mean Depth

Rate of Volume Flow

Rate of Volume Flow is the volume of fluid that passes per unit of time.

Symbol: V_rate

Measurement: Volumetric Flow RateUnit: m³/s

Note: Value should be greater than 0.

Formulas to find Rate of Volume Flow

Wave Speed

Wave Speed is the rate at which a wave travels through a medium, measured in distance per unit time.

Symbol: v

Measurement: SpeedUnit: m/s

Note: Value can be positive or negative.

Formulas to find Wave Speed

Other Formulas to find Coastal Mean Depth

Go Mean Depth given Second Type of Mean Fluid Speed

d = \frac{V rate}{C f - U h}

Go Mean Depth given Ursell Number

d = {(\frac{H w \cdot {λ o}^{2}}{U})}^{\frac{1}{3}}

Other formulas in Non Linear Wave Theory category

Go Wave Height given Ursell Number

H w = \frac{U \cdot d^{3}}{{λ o}^{2}}

Go First Type of Mean Fluid Speed

U h = C f - v

Go Second Type of Mean Fluid Speed

U h = C f - (\frac{V rate}{d})

Go Wave Speed given First Type of Mean Fluid Speed

v = C f - U h

How to Evaluate Mean Depth in Stokes' Second Approximation to Wave Speed if there is no Mass Transport?

Mean Depth in Stokes' Second Approximation to Wave Speed if there is no Mass Transport evaluator uses Coastal Mean Depth = Rate of Volume Flow/Wave Speed to evaluate the Coastal Mean Depth, The Mean Depth in Stokes' Second Approximation to Wave Speed if there is no Mass Transport refers to the average depth of the fluid in which waves propagate, and it plays a crucial role in determining the wave speed. This approximation assumes that the wave amplitude is small compared to the wavelength and that the fluid motion is irrotational and inviscid. Coastal Mean Depth is denoted by d symbol.

How to evaluate Mean Depth in Stokes' Second Approximation to Wave Speed if there is no Mass Transport using this online evaluator? To use this online evaluator for Mean Depth in Stokes' Second Approximation to Wave Speed if there is no Mass Transport, enter Rate of Volume Flow (V_rate) & Wave Speed (v) and hit the calculate button.

FAQs on Mean Depth in Stokes' Second Approximation to Wave Speed if there is no Mass Transport

What is the formula to find Mean Depth in Stokes' Second Approximation to Wave Speed if there is no Mass Transport?

The formula of Mean Depth in Stokes' Second Approximation to Wave Speed if there is no Mass Transport is expressed as Coastal Mean Depth = Rate of Volume Flow/Wave Speed. Here is an example- 10 = 500/50.

How to calculate Mean Depth in Stokes' Second Approximation to Wave Speed if there is no Mass Transport?

With Rate of Volume Flow (V_rate) & Wave Speed (v) we can find Mean Depth in Stokes' Second Approximation to Wave Speed if there is no Mass Transport using the formula - Coastal Mean Depth = Rate of Volume Flow/Wave Speed.

What are the other ways to Calculate Coastal Mean Depth?

Here are the different ways to Calculate Coastal Mean Depth-

Coastal Mean Depth=Rate of Volume Flow/(Fluid Stream Velocity-Mean Horizontal Fluid Velocity)
Coastal Mean Depth=((Wave Height for Surface Gravity Waves*Deep-Water Wavelength^2)/Ursell Number)^(1/3)

Can the Mean Depth in Stokes' Second Approximation to Wave Speed if there is no Mass Transport be negative?

Yes, the Mean Depth in Stokes' Second Approximation to Wave Speed if there is no Mass Transport, measured in Length can be negative.

Which unit is used to measure Mean Depth in Stokes' Second Approximation to Wave Speed if there is no Mass Transport?

Mean Depth in Stokes' Second Approximation to Wave Speed if there is no Mass Transport is usually measured using the Meter[m] for Length. Millimeter[m], Kilometer[m], Decimeter[m] are the few other units in which Mean Depth in Stokes' Second Approximation to Wave Speed if there is no Mass Transport can be measured.

Let Others Know

✖

Facebook

Twitter

Copied!

: Value
: Unit