Angular Velocity of Liquid in Rotating Cylinder at Constant Pressure when r is Equal to R Solution

STEP 0: Pre-Calculation Summary
Formula Used
Angular Velocity of Rotating Liquid = sqrt((4*[g]*(Distance of Free Surface from Bottom of Container-Height of Free Surface of Liquid without Rotation))/(Radius of Cylindrical Container^2))
ωLiquid = sqrt((4*[g]*(Zs-ho))/(R^2))
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
Angular Velocity of Rotating Liquid - (Measured in Radian per Second) - Angular Velocity of Rotating Liquid refers to how fast an object rotates or revolves relative to another point, i.e. how fast the angular position or orientation of an object changes with time.
Distance of Free Surface from Bottom of Container - (Measured in Meter) - Distance of Free Surface from Bottom of Container is defined as the distance between the top surface and bottom of container.
Height of Free Surface of Liquid without Rotation - (Measured in Meter) - Height of Free Surface of Liquid without Rotation is defined as the normal height of liquid when the container is not rotating about its axis.
Radius of Cylindrical Container - (Measured in Meter) - Radius of Cylindrical Container is defined as the radius of the container in which the liquid is kept and will show rotational motion.
STEP 1: Convert Input(s) to Base Unit
Distance of Free Surface from Bottom of Container: 3 Meter --> 3 Meter No Conversion Required
Height of Free Surface of Liquid without Rotation: 2.24 Meter --> 2.24 Meter No Conversion Required
Radius of Cylindrical Container: 0.8 Meter --> 0.8 Meter No Conversion Required
STEP 2: Evaluate Formula
Substituting Input Values in Formula
ωLiquid = sqrt((4*[g]*(Zs-ho))/(R^2)) --> sqrt((4*[g]*(3-2.24))/(0.8^2))
Evaluating ... ...
ωLiquid = 6.82507051245626
STEP 3: Convert Result to Output's Unit
6.82507051245626 Radian per Second --> No Conversion Required
FINAL ANSWER
6.82507051245626 6.825071 Radian per Second <-- Angular Velocity of Rotating Liquid
(Calculation completed in 00.009 seconds)

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Fluids in Rigid Body Motion Calculators

Pressure at Point in Rigid Body Motion of Liquid in Linearly Accelerating Tank
​ LaTeX ​ Go Pressure at any Point in Fluid = Initial Pressure-(Density of Fluid*Acceleration in X Direction*Location of Point from Origin in X Direction)-(Density of Fluid*([g]+Acceleration in Z Direction)*Location of Point from Origin in Z Direction)
Vertical Rise or Drop of Free Surface given Acceleration in X and Z Direction
​ LaTeX ​ Go Change in Z Coordinate of Liquid's Free Surface = -(Acceleration in X Direction/([g]+Acceleration in Z Direction))*(Location of Point 2 from Origin in X Direction-Location of Point 1 from Origin in X Direction)
Free Surface Isobars in Incompressible Fluid with Constant Acceleration
​ LaTeX ​ Go Z Coordinate of Free Surface at Constant Pressure = -(Acceleration in X Direction/([g]+Acceleration in Z Direction))*Location of Point from Origin in X Direction
Vertical Rise of Free Surface
​ LaTeX ​ Go Change in Z Coordinate of Liquid's Free Surface = Z Coordinate of Liquid Free Surface at Point 2-Z Coordinate of Liquid Free Surface at Point 1

Angular Velocity of Liquid in Rotating Cylinder at Constant Pressure when r is Equal to R Formula

​LaTeX ​Go
Angular Velocity of Rotating Liquid = sqrt((4*[g]*(Distance of Free Surface from Bottom of Container-Height of Free Surface of Liquid without Rotation))/(Radius of Cylindrical Container^2))
ωLiquid = sqrt((4*[g]*(Zs-ho))/(R^2))

What is Fluid Mechanics?

Fluid dynamics is “the branch of applied science that is concerned with the movement of liquids and gases”. It involves a wide range of applications such as calculating force & moments, determining the mass flow rate of petroleum through pipelines, predicting weather patterns, understanding nebulae in interstellar space, and modelling fission weapon detonation.

What is Hydrostatic Pressure?

Hydrostatic pressure is defined as “The pressure exerted by a fluid at equilibrium at any point of time due to the force of gravity”. Hydrostatic pressure is proportional to the depth measured from the surface as the weight of the fluid increases when a downward force is applied. The fluid pressure can be caused by gravity, acceleration or forces when in a closed container. Consider a layer of water from the top of the bottle. There is the pressure exerted by the layer of water acting on the sides of the bottle. As we move down from the top of the bottle to the bottom, the pressure exerted by the top layer on the bottom adds up. This phenomenon is responsible for more pressure at the bottom of the container.

How to Calculate Angular Velocity of Liquid in Rotating Cylinder at Constant Pressure when r is Equal to R?

Angular Velocity of Liquid in Rotating Cylinder at Constant Pressure when r is Equal to R calculator uses Angular Velocity of Rotating Liquid = sqrt((4*[g]*(Distance of Free Surface from Bottom of Container-Height of Free Surface of Liquid without Rotation))/(Radius of Cylindrical Container^2)) to calculate the Angular Velocity of Rotating Liquid, The Angular Velocity of Liquid in Rotating Cylinder at Constant Pressure when r is equal to R formula is defined as the function of height of the free surface of liquid without rotation, angular velocity, gravitational acceleration, radius of container in which the liquid is kept. During rigid-body motion of a liquid in a rotating cylinder, the surfaces of constant pressure are paraboloids of revolution. Pressure is a fundamental property, and it is hard to imagine a significant fluid flow problem that does not involve pressure. Angular Velocity of Rotating Liquid is denoted by ωLiquid symbol.

How to calculate Angular Velocity of Liquid in Rotating Cylinder at Constant Pressure when r is Equal to R using this online calculator? To use this online calculator for Angular Velocity of Liquid in Rotating Cylinder at Constant Pressure when r is Equal to R, enter Distance of Free Surface from Bottom of Container (Zs), Height of Free Surface of Liquid without Rotation (ho) & Radius of Cylindrical Container (R) and hit the calculate button. Here is how the Angular Velocity of Liquid in Rotating Cylinder at Constant Pressure when r is Equal to R calculation can be explained with given input values -> 6.825071 = sqrt((4*[g]*(3-2.24))/(0.8^2)).

FAQ

What is Angular Velocity of Liquid in Rotating Cylinder at Constant Pressure when r is Equal to R?
The Angular Velocity of Liquid in Rotating Cylinder at Constant Pressure when r is equal to R formula is defined as the function of height of the free surface of liquid without rotation, angular velocity, gravitational acceleration, radius of container in which the liquid is kept. During rigid-body motion of a liquid in a rotating cylinder, the surfaces of constant pressure are paraboloids of revolution. Pressure is a fundamental property, and it is hard to imagine a significant fluid flow problem that does not involve pressure and is represented as ωLiquid = sqrt((4*[g]*(Zs-ho))/(R^2)) or Angular Velocity of Rotating Liquid = sqrt((4*[g]*(Distance of Free Surface from Bottom of Container-Height of Free Surface of Liquid without Rotation))/(Radius of Cylindrical Container^2)). Distance of Free Surface from Bottom of Container is defined as the distance between the top surface and bottom of container, Height of Free Surface of Liquid without Rotation is defined as the normal height of liquid when the container is not rotating about its axis & Radius of Cylindrical Container is defined as the radius of the container in which the liquid is kept and will show rotational motion.
How to calculate Angular Velocity of Liquid in Rotating Cylinder at Constant Pressure when r is Equal to R?
The Angular Velocity of Liquid in Rotating Cylinder at Constant Pressure when r is equal to R formula is defined as the function of height of the free surface of liquid without rotation, angular velocity, gravitational acceleration, radius of container in which the liquid is kept. During rigid-body motion of a liquid in a rotating cylinder, the surfaces of constant pressure are paraboloids of revolution. Pressure is a fundamental property, and it is hard to imagine a significant fluid flow problem that does not involve pressure is calculated using Angular Velocity of Rotating Liquid = sqrt((4*[g]*(Distance of Free Surface from Bottom of Container-Height of Free Surface of Liquid without Rotation))/(Radius of Cylindrical Container^2)). To calculate Angular Velocity of Liquid in Rotating Cylinder at Constant Pressure when r is Equal to R, you need Distance of Free Surface from Bottom of Container (Zs), Height of Free Surface of Liquid without Rotation (ho) & Radius of Cylindrical Container (R). With our tool, you need to enter the respective value for Distance of Free Surface from Bottom of Container, Height of Free Surface of Liquid without Rotation & Radius of Cylindrical Container 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 Angular Velocity of Rotating Liquid?
In this formula, Angular Velocity of Rotating Liquid uses Distance of Free Surface from Bottom of Container, Height of Free Surface of Liquid without Rotation & Radius of Cylindrical Container. We can use 1 other way(s) to calculate the same, which is/are as follows -
  • Angular Velocity of Rotating Liquid = sqrt((4*[g]*(Height of Container-Height of Free Surface of Liquid without Rotation))/(Radius of Cylindrical Container^2))
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