Maiarutselvan V
PSG College of Technology (PSGCT), Coimbatore
Maiarutselvan V has created this Calculator and 300+ more calculators!
Sai Venkata Phanindra Chary Arendra
Vallurupalli Nageswara Rao Vignana Jyothi Institute of Engineering and Technology (VNRVJIET), Hyderabad
Sai Venkata Phanindra Chary Arendra has verified this Calculator and 100+ more calculators!

11 Other formulas that you can solve using the same Inputs

Angular Displacement if initial angular velocity, angular acceleration and time are given
Angular Displacement=(Angular Velocity*Time Taken to Travel)+((Angular Acceleration*(Time Taken to Travel)^2)/2) GO
Angular Displacement of body when initial and final angular velocity and angular acceleration are given
Angular Displacement=((Final Angular Velocity)^2-(Angular Velocity)^2)/(2*Angular Acceleration) GO
Angular Displacement if initial angular velocity, final angular velocity and time are given
Angular Displacement=((Angular Velocity+Final Angular Velocity)*Time Taken to Travel)/2 GO
Final Angular Velocity if initial angular velocity, angular acceleration and time is given
Final Angular Velocity=Angular Velocity+(Angular Acceleration*Time Taken to Travel) GO
Lateral Surface Area of a Conical Frustum
Lateral Surface Area=pi*(Radius 1+Radius 2)*sqrt((Radius 1-Radius 2)^2+Height^2) GO
Volume of a Conical Frustum
Volume=(1/3)*pi*Height*(Radius 1^2+Radius 2^2+(Radius 1*Radius 2)) GO
Angular Momentum
Angular Momentum=Moment of Inertia*Angular Velocity GO
Moment of inertia of a circular disc about an axis through its center and perpendicular to its plane
Moment of Inertia=(Mass*(Radius 1^2))/2 GO
Moment of inertia of a circular ring about an axis through its center and perpendicular to its plane
Moment of Inertia=Mass*(Radius 1^2) GO
Area of a Torus
Area=pi^2*(Radius 2^2-Radius 1^2) GO
Top Surface Area of a Conical Frustum
Top Surface Area=pi*(Radius 1)^2 GO

Depth of parabola formed at the free surface of water Formula

depth of parabola=((Angular Velocity^2)*(Radius 1^2))/(2*9.81)
Z=((ω^2)*(r1^2))/(2*9.81)
More formulas
Rate of flow or discharge GO
Resultant velocity for two velocity components GO
Angular velocity considering the depth of parabola GO
Height or depth of paraboloid for volume of air GO
Total pressure force on top of the cylinder GO
Total pressure force at the bottom of the cylinder GO

What is vortex flow?

It is defined as the flow of fluid along the curved path or the flow of a rotating mass of fluid. It is of two types, forced and free vortex flow.

How to maintain a forced vortex flow?

To maintain a forced vortex flow, it required a continuous supply of energy or external torque. All fluid particles rotate at the constant angular velocity ω as a solid body. Therefore, a flow of forced vortex is called a solid body rotation.

How to Calculate Depth of parabola formed at the free surface of water?

Depth of parabola formed at the free surface of water calculator uses depth of parabola=((Angular Velocity^2)*(Radius 1^2))/(2*9.81) to calculate the depth of parabola, The Depth of parabola formed at the free surface of water is defined from the equation of forced vortex flow considering the angular velocity and tank radius. depth of parabola and is denoted by Z symbol.

How to calculate Depth of parabola formed at the free surface of water using this online calculator? To use this online calculator for Depth of parabola formed at the free surface of water, enter Angular Velocity (ω) and Radius 1 (r1) and hit the calculate button. Here is how the Depth of parabola formed at the free surface of water calculation can be explained with given input values -> 2466.871 = ((20^2)*(11^2))/(2*9.81).

FAQ

What is Depth of parabola formed at the free surface of water?
The Depth of parabola formed at the free surface of water is defined from the equation of forced vortex flow considering the angular velocity and tank radius and is represented as Z=((ω^2)*(r1^2))/(2*9.81) or depth of parabola=((Angular Velocity^2)*(Radius 1^2))/(2*9.81). The angular velocity 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 and Radius 1 is a radial line from the focus to any point of a curve.
How to calculate Depth of parabola formed at the free surface of water?
The Depth of parabola formed at the free surface of water is defined from the equation of forced vortex flow considering the angular velocity and tank radius is calculated using depth of parabola=((Angular Velocity^2)*(Radius 1^2))/(2*9.81). To calculate Depth of parabola formed at the free surface of water, you need Angular Velocity (ω) and Radius 1 (r1). With our tool, you need to enter the respective value for Angular Velocity and Radius 1 and hit the calculate button. You can also select the units (if any) for Input(s) and the Output as well.
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