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Tidal Period when Tidal Prism Accounting for Non-sinusoidal Prototype Flow by Keulegan Formula

GoTidal Period given Maximum Instantaneous Ebb Tide Discharge and Tidal Prism Formula

GoTidal Period given Maximum Cross-sectionally Averaged Velocity and Tidal Prism Formula

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Tidal duration is an efficient way of guesstimating how much water there is, at any given time of day, over a particular point. Check FAQs

T = \frac{P \cdot π \cdot C}{V m \cdot A avg}

T - Tidal Duration?P - Tidal Prism Filling Bay?C - Keulegan Constant for Non-sinusoidal Character?V_m - Maximum Cross Sectional Average Velocity?A_avg - Average Area over the Channel Length?π - Archimedes' constant?

Tidal Period when Tidal Prism Accounting for Non-sinusoidal Prototype Flow by Keulegan Example

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Here is how the Tidal Period when Tidal Prism Accounting for Non-sinusoidal Prototype Flow by Keulegan equation looks like with Values.

Here is how the Tidal Period when Tidal Prism Accounting for Non-sinusoidal Prototype Flow by Keulegan equation looks like with Units.

Here is how the Tidal Period when Tidal Prism Accounting for Non-sinusoidal Prototype Flow by Keulegan equation looks like.

3.0956 = \frac{32 \cdot 3.1416 \cdot 1.01}{4.1 \cdot 8}

3.0956Year = \frac{32m³ \cdot 3.1416 \cdot 1.01}{4.1m/s \cdot 8m²}

3.0956 = \frac{32 \cdot 3.1416 \cdot 1.01}{4.1 \cdot 8}

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Coastal and Ocean Engineering » fx Tidal Period when Tidal Prism Accounting for Non-sinusoidal Prototype Flow by Keulegan

Tidal Period when Tidal Prism Accounting for Non-sinusoidal Prototype Flow by Keulegan Solution

Follow our step by step solution on how to calculate Tidal Period when Tidal Prism Accounting for Non-sinusoidal Prototype Flow by Keulegan?

FIRST Step Consider the formula

T = \frac{P \cdot π \cdot C}{V m \cdot A avg}

Next Step Substitute values of Variables

∴

T = \frac{32m³ \cdot π \cdot 1.01}{4.1m/s \cdot 8m²}

Next Step Substitute values of Constants

∴

T = \frac{32m³ \cdot 3.1416 \cdot 1.01}{4.1m/s \cdot 8m²}

Next Step Prepare to Evaluate

∴

T = \frac{32 \cdot 3.1416 \cdot 1.01}{4.1 \cdot 8}

Next Step Evaluate

∴

T = 97688272.6425508s

Next Step Convert to Output's Unit

∴

T = 3.09561812695189Year

LAST Step Rounding Answer

∴

T = 3.0956Year

Tidal Period when Tidal Prism Accounting for Non-sinusoidal Prototype Flow by Keulegan Formula Elements

Variables

Constants

Tidal Duration

Tidal duration is an efficient way of guesstimating how much water there is, at any given time of day, over a particular point.

Symbol: T

Measurement: TimeUnit: Year

Note: Value should be greater than 0.

Formulas to find Tidal Duration

Tidal Prism Filling Bay

Tidal Prism Filling Bay is the volume of water in an estuary or inlet between mean high tide and mean low tide, or the volume of water leaving an estuary at ebb tide.

Symbol: P

Measurement: VolumeUnit: m³

Note: Value can be positive or negative.

Formulas to find Tidal Prism Filling Bay

Keulegan Constant for Non-sinusoidal Character

Keulegan Constant for Non-sinusoidal Character quantifies drag force on structures exposed to irregular water flow, aiding design considerations.

Symbol: C

Measurement: NAUnit: Unitless

Note: Value should be greater than 0.

Formulas to find Keulegan Constant for Non-sinusoidal Character

Maximum Cross Sectional Average Velocity

Maximum Cross Sectional Average Velocity during a tidal cycle which is the periodic rise and fall of the waters of the ocean and its inlets.

Symbol: V_m

Measurement: SpeedUnit: m/s

Note: Value can be positive or negative.

Formulas to find Maximum Cross Sectional Average Velocity

Average Area over the Channel Length

Average Area over the Channel Length is calculated with surface area of bay, change of bay elevation with time and average velocity in channel for flow.

Symbol: A_avg

Measurement: AreaUnit: m²

Note: Value can be positive or negative.

Formulas to find Average Area over the Channel Length

Archimedes' constant

Archimedes' constant is a mathematical constant that represents the ratio of the circumference of a circle to its diameter.

Symbol: π

Value: 3.14159265358979323846264338327950288

Other Formulas to find Tidal Duration

Go Tidal Period given Maximum Instantaneous Ebb Tide Discharge and Tidal Prism

T = \frac{P \cdot π}{Q max}

Go Tidal Period given Maximum Cross-sectionally Averaged Velocity and Tidal Prism

T = \frac{P \cdot π}{V m \cdot A avg}

Go Tidal Period Accounting for Non-sinusoidal Character of Prototype Flow by Keulegan

T = \frac{P \cdot π \cdot C}{Q max}

Other formulas in Tidal Prism category

Go Tidal Prism filling Bay given Maximum Ebb Tide Discharge

P = T \cdot \frac{Q max}{π}

Go Maximum Instantaneous Ebb Tide Discharge given Tidal Prism

Q max = P \cdot \frac{π}{T}

Go Tidal Prism given Average Area over Channel Length

P = \frac{T \cdot V m \cdot A avg}{π}

Go Average Area over Channel Length given Tidal Prism

A avg = \frac{P \cdot π}{T \cdot V m}

How to Evaluate Tidal Period when Tidal Prism Accounting for Non-sinusoidal Prototype Flow by Keulegan?

Tidal Period when Tidal Prism Accounting for Non-sinusoidal Prototype Flow by Keulegan evaluator uses Tidal Duration = (Tidal Prism Filling Bay*pi*Keulegan Constant for Non-sinusoidal Character)/(Maximum Cross Sectional Average Velocity*Average Area over the Channel Length) to evaluate the Tidal Duration, The Tidal Period when Tidal Prism Accounting for Non-sinusoidal Prototype Flow by Keulegan formula is defined as the time between consecutive high or low tides. It accounts for non-sinusoidal flow using the Keulegan definition, which considers the tidal prism's characteristics. Tidal Duration is denoted by T symbol.

How to evaluate Tidal Period when Tidal Prism Accounting for Non-sinusoidal Prototype Flow by Keulegan using this online evaluator? To use this online evaluator for Tidal Period when Tidal Prism Accounting for Non-sinusoidal Prototype Flow by Keulegan, enter Tidal Prism Filling Bay (P), Keulegan Constant for Non-sinusoidal Character (C), Maximum Cross Sectional Average Velocity (V_m) & Average Area over the Channel Length (A_avg) and hit the calculate button.

FAQs on Tidal Period when Tidal Prism Accounting for Non-sinusoidal Prototype Flow by Keulegan

What is the formula to find Tidal Period when Tidal Prism Accounting for Non-sinusoidal Prototype Flow by Keulegan?

The formula of Tidal Period when Tidal Prism Accounting for Non-sinusoidal Prototype Flow by Keulegan is expressed as Tidal Duration = (Tidal Prism Filling Bay*pi*Keulegan Constant for Non-sinusoidal Character)/(Maximum Cross Sectional Average Velocity*Average Area over the Channel Length). Here is an example- 9.8E-8 = (32*pi*1.01)/(4.1*8).

How to calculate Tidal Period when Tidal Prism Accounting for Non-sinusoidal Prototype Flow by Keulegan?

With Tidal Prism Filling Bay (P), Keulegan Constant for Non-sinusoidal Character (C), Maximum Cross Sectional Average Velocity (V_m) & Average Area over the Channel Length (A_avg) we can find Tidal Period when Tidal Prism Accounting for Non-sinusoidal Prototype Flow by Keulegan using the formula - Tidal Duration = (Tidal Prism Filling Bay*pi*Keulegan Constant for Non-sinusoidal Character)/(Maximum Cross Sectional Average Velocity*Average Area over the Channel Length). This formula also uses Archimedes' constant .

What are the other ways to Calculate Tidal Duration?

Here are the different ways to Calculate Tidal Duration-

Tidal Duration=(Tidal Prism Filling Bay*pi)/Maximum Instantaneous Ebb Tide Discharge
Tidal Duration=(Tidal Prism Filling Bay*pi)/(Maximum Cross Sectional Average Velocity*Average Area over the Channel Length)
Tidal Duration=(Tidal Prism Filling Bay*pi*Keulegan Constant for Non-sinusoidal Character)/Maximum Instantaneous Ebb Tide Discharge

Can the Tidal Period when Tidal Prism Accounting for Non-sinusoidal Prototype Flow by Keulegan be negative?

No, the Tidal Period when Tidal Prism Accounting for Non-sinusoidal Prototype Flow by Keulegan, measured in Time cannot be negative.

Which unit is used to measure Tidal Period when Tidal Prism Accounting for Non-sinusoidal Prototype Flow by Keulegan?

Tidal Period when Tidal Prism Accounting for Non-sinusoidal Prototype Flow by Keulegan is usually measured using the Year[Year] for Time. Second[Year], Millisecond[Year], Microsecond[Year] are the few other units in which Tidal Period when Tidal Prism Accounting for Non-sinusoidal Prototype Flow by Keulegan can be measured.

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Tidal Period when Tidal Prism Accounting for Non-sinusoidal Prototype Flow by Keulegan Formula

​GoTidal Period given Maximum Instantaneous Ebb Tide Discharge and Tidal Prism Formula

​GoTidal Period given Maximum Cross-sectionally Averaged Velocity and Tidal Prism Formula

Tidal Period when Tidal Prism Accounting for Non-sinusoidal Prototype Flow by Keulegan Example

Tidal Period when Tidal Prism Accounting for Non-sinusoidal Prototype Flow by Keulegan Solution

Tidal Period when Tidal Prism Accounting for Non-sinusoidal Prototype Flow by Keulegan Formula Elements

Other Formulas to find Tidal Duration

Other formulas in Tidal Prism category

How to Evaluate Tidal Period when Tidal Prism Accounting for Non-sinusoidal Prototype Flow by Keulegan?

FAQs on Tidal Period when Tidal Prism Accounting for Non-sinusoidal Prototype Flow by Keulegan

Variable Name

GoTidal Period given Maximum Instantaneous Ebb Tide Discharge and Tidal Prism Formula

GoTidal Period given Maximum Cross-sectionally Averaged Velocity and Tidal Prism Formula