Number of Nodes along Axis of Basin given Natural Free Oscillating Period of Basin Solution

STEP 0: Pre-Calculation Summary
Formula Used
Number of Nodes along the Axis of a Basin = (2*Length of the Basin)/(Natural Free Oscillating Period of a Basin*sqrt([g]*Water Depth))
N = (2*lB)/(Tn*sqrt([g]*D))
This formula uses 1 Constants, 1 Functions, 4 Variables
Constants Used
[g] - Gravitational acceleration on Earth Value Taken As 9.80665
Functions Used
sqrt - A square root function is a function that takes a non-negative number as an input and returns the square root of the given input number., sqrt(Number)
Variables Used
Number of Nodes along the Axis of a Basin - Number of Nodes along the Axis of a Basin refers to the count of specific points situated along central axis of basin, where basin axis represents the line of lowest elevation on the basin's surface.
Length of the Basin - (Measured in Meter) - Length of the Basin is the longest dimension of a basin parallel to its principal drainage channel.
Natural Free Oscillating Period of a Basin - (Measured in Second) - Natural Free Oscillating Period of a Basin referred to as the natural period or resonant period, is the time it takes for a wave to travel from one end of the basin to the other and back again.
Water Depth - (Measured in Meter) - Water Depth between the surface and the seafloor as measured at mean lower low water.
STEP 1: Convert Input(s) to Base Unit
Length of the Basin: 38.782 Meter --> 38.782 Meter No Conversion Required
Natural Free Oscillating Period of a Basin: 5.5 Second --> 5.5 Second No Conversion Required
Water Depth: 12 Meter --> 12 Meter No Conversion Required
STEP 2: Evaluate Formula
Substituting Input Values in Formula
N = (2*lB)/(Tn*sqrt([g]*D)) --> (2*38.782)/(5.5*sqrt([g]*12))
Evaluating ... ...
N = 1.30000956404503
STEP 3: Convert Result to Output's Unit
1.30000956404503 --> No Conversion Required
FINAL ANSWER
1.30000956404503 1.30001 <-- Number of Nodes along the Axis of a Basin
(Calculation completed in 00.006 seconds)

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Coorg Institute of Technology (CIT), Coorg
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Open Rectangular Basin and Seiches Calculators

Natural Free Oscillating Period of Basin for Open Rectangular Basin
​ LaTeX ​ Go Natural Free Oscillating Period of a Basin = 4*Length of the Basin/((1+(2*Number of Nodes along the Axis of a Basin))*sqrt([g]*Water Depth))
Number of Nodes along Axis of Basin for Open Rectangular Basin
​ LaTeX ​ Go Number of Nodes along the Axis of a Basin = ((4*Length of the Basin/(Natural Free Oscillating Period of a Basin*sqrt([g]*Water Depth)))-1)/2
Length of Basin for Open Rectangular Basin
​ LaTeX ​ Go Length of the Basin = Natural Free Oscillating Period of a Basin*(1+(2*Number of Nodes along the Axis of a Basin))*sqrt([g]*Water Depth)/4
Water Depth for Open Rectangular Basin
​ LaTeX ​ Go Water Depth = ((4*Length of the Basin/(Natural Free Oscillating Period of a Basin*(1+2*(Number of Nodes along the Axis of a Basin))))^2)/[g]

Number of Nodes along Axis of Basin given Natural Free Oscillating Period of Basin Formula

​LaTeX ​Go
Number of Nodes along the Axis of a Basin = (2*Length of the Basin)/(Natural Free Oscillating Period of a Basin*sqrt([g]*Water Depth))
N = (2*lB)/(Tn*sqrt([g]*D))

What is Seiches?

Seiches are standing waves or oscillations of the free surface of a body of water in a closed or semiclosed basin. These oscillations are of relatively long period, extending from minutes in harbors and bays to over 10 hr in the Great Lakes. Any external perturbation to the lake or embayment can force an oscillation. In harbors, the forcing can be the result of short waves and wave groups at the harbor entrance. Examples include 30- to 400-sec wave-forced oscillations in the Los Angeles-Long Beach harbor (Seabergh 1985).

How to Calculate Number of Nodes along Axis of Basin given Natural Free Oscillating Period of Basin?

Number of Nodes along Axis of Basin given Natural Free Oscillating Period of Basin calculator uses Number of Nodes along the Axis of a Basin = (2*Length of the Basin)/(Natural Free Oscillating Period of a Basin*sqrt([g]*Water Depth)) to calculate the Number of Nodes along the Axis of a Basin, The Number of Nodes along Axis of Basin given Natural Free Oscillating Period of Basin formula is defined as the nodes (locations of no vertical deflection) are located at interior points and antinodes (locations of maximum deflection) are located on the boundaries of the basin. Number of Nodes along the Axis of a Basin is denoted by N symbol.

How to calculate Number of Nodes along Axis of Basin given Natural Free Oscillating Period of Basin using this online calculator? To use this online calculator for Number of Nodes along Axis of Basin given Natural Free Oscillating Period of Basin, enter Length of the Basin (lB), Natural Free Oscillating Period of a Basin (Tn) & Water Depth (D) and hit the calculate button. Here is how the Number of Nodes along Axis of Basin given Natural Free Oscillating Period of Basin calculation can be explained with given input values -> 1.30001 = (2*38.782)/(5.5*sqrt([g]*12)).

FAQ

What is Number of Nodes along Axis of Basin given Natural Free Oscillating Period of Basin?
The Number of Nodes along Axis of Basin given Natural Free Oscillating Period of Basin formula is defined as the nodes (locations of no vertical deflection) are located at interior points and antinodes (locations of maximum deflection) are located on the boundaries of the basin and is represented as N = (2*lB)/(Tn*sqrt([g]*D)) or Number of Nodes along the Axis of a Basin = (2*Length of the Basin)/(Natural Free Oscillating Period of a Basin*sqrt([g]*Water Depth)). Length of the Basin is the longest dimension of a basin parallel to its principal drainage channel, Natural Free Oscillating Period of a Basin referred to as the natural period or resonant period, is the time it takes for a wave to travel from one end of the basin to the other and back again & Water Depth between the surface and the seafloor as measured at mean lower low water.
How to calculate Number of Nodes along Axis of Basin given Natural Free Oscillating Period of Basin?
The Number of Nodes along Axis of Basin given Natural Free Oscillating Period of Basin formula is defined as the nodes (locations of no vertical deflection) are located at interior points and antinodes (locations of maximum deflection) are located on the boundaries of the basin is calculated using Number of Nodes along the Axis of a Basin = (2*Length of the Basin)/(Natural Free Oscillating Period of a Basin*sqrt([g]*Water Depth)). To calculate Number of Nodes along Axis of Basin given Natural Free Oscillating Period of Basin, you need Length of the Basin (lB), Natural Free Oscillating Period of a Basin (Tn) & Water Depth (D). With our tool, you need to enter the respective value for Length of the Basin, Natural Free Oscillating Period of a Basin & Water Depth 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 Number of Nodes along the Axis of a Basin?
In this formula, Number of Nodes along the Axis of a Basin uses Length of the Basin, Natural Free Oscillating Period of a Basin & Water Depth. We can use 1 other way(s) to calculate the same, which is/are as follows -
  • Number of Nodes along the Axis of a Basin = ((4*Length of the Basin/(Natural Free Oscillating Period of a Basin*sqrt([g]*Water Depth)))-1)/2
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