Maximum Velocity at Axis of Cylindrical Element given Mean Velocity of Flow Calculator

✖The Mean Velocity refers to the average speed at which fluid flows through a given cross-sectional area of a pipe or channel.ⓘ Mean Velocity [V_mean]

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✖The Maximum Velocity refers to the highest speed at which fluid can flow through a system without causing damage or inefficiency.ⓘ Maximum Velocity at Axis of Cylindrical Element given Mean Velocity of Flow [V_max]

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Formula

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Maximum Velocity at Axis of Cylindrical Element given Mean Velocity of Flow

Formula

V max = 2 \cdot V mean

Example

20.2 m/s = 2 \cdot 10.1 m/s

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Maximum Velocity at Axis of Cylindrical Element given Mean Velocity of Flow Solution

STEP 0: Pre-Calculation Summary

Formula Used

Maximum Velocity = 2*Mean Velocity
V_max = 2*V_mean
This formula uses 2 Variables

Variables Used

Maximum Velocity - (Measured in Meter per Second) - The Maximum Velocity refers to the highest speed at which fluid can flow through a system without causing damage or inefficiency.
Mean Velocity - (Measured in Meter per Second) - The Mean Velocity refers to the average speed at which fluid flows through a given cross-sectional area of a pipe or channel.

STEP 1: Convert Input(s) to Base Unit

Mean Velocity: 10.1 Meter per Second --> 10.1 Meter per Second No Conversion Required

STEP 2: Evaluate Formula

Substituting Input Values in Formula

V_max = 2*V_mean --> 2*10.1

Evaluating ... ...

V_max = 20.2

STEP 3: Convert Result to Output's Unit

20.2 Meter per Second --> No Conversion Required

FINAL ANSWER

20.2 Meter per Second <-- Maximum Velocity

(Calculation completed in 00.004 seconds)

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Created by Rithik Agrawal

National Institute of Technology Karnataka (NITK), Surathkal

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National Institute of Technology (NIT), Warangal

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< Steady Laminar Flow in Circular Pipes Calculators

Shear Stress at any Cylindrical Element given Head Loss

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Distance of Element from Center Line given Head Loss

Go Radial Distance = 2*Shear Stress*Length of Pipe/(Head Loss due to Friction*Specific Weight of Liquid)

Distance of Element from Center line given Shear Stress at any Cylindrical Element

Go Radial Distance = 2*Shear Stress/Pressure Gradient

Shear Stress at any Cylindrical Element

Go Shear Stress = Pressure Gradient*Radial Distance/2

Maximum Velocity at Axis of Cylindrical Element given Mean Velocity of Flow Formula

Maximum Velocity = 2*Mean Velocity
V_max = 2*V_mean

What is Average Velocity ?

The average velocity of an object is its total displacement divided by the total time taken. In other words, it is the rate at which an object changes its position from one place to another. Average velocity is a vector quantity.

How to Calculate Maximum Velocity at Axis of Cylindrical Element given Mean Velocity of Flow?

Maximum Velocity at Axis of Cylindrical Element given Mean Velocity of Flow calculator uses Maximum Velocity = 2*Mean Velocity to calculate the Maximum Velocity, The Maximum Velocity at axis of Cylindrical Element given Mean Velocity of Flow formula is defined as the laminar flow through a circular pipe, the velocity profile is parabolic, and the maximum velocity at the center of the pipe is twice the mean velocity. Maximum Velocity is denoted by V_max symbol.

How to calculate Maximum Velocity at Axis of Cylindrical Element given Mean Velocity of Flow using this online calculator? To use this online calculator for Maximum Velocity at Axis of Cylindrical Element given Mean Velocity of Flow, enter Mean Velocity (V_mean) and hit the calculate button. Here is how the Maximum Velocity at Axis of Cylindrical Element given Mean Velocity of Flow calculation can be explained with given input values -> 20.2 = 2*10.1.

FAQ

What is Maximum Velocity at Axis of Cylindrical Element given Mean Velocity of Flow?

The Maximum Velocity at axis of Cylindrical Element given Mean Velocity of Flow formula is defined as the laminar flow through a circular pipe, the velocity profile is parabolic, and the maximum velocity at the center of the pipe is twice the mean velocity and is represented as V_max = 2*V_mean or Maximum Velocity = 2*Mean Velocity. The Mean Velocity refers to the average speed at which fluid flows through a given cross-sectional area of a pipe or channel.

How to calculate Maximum Velocity at Axis of Cylindrical Element given Mean Velocity of Flow?

The Maximum Velocity at axis of Cylindrical Element given Mean Velocity of Flow formula is defined as the laminar flow through a circular pipe, the velocity profile is parabolic, and the maximum velocity at the center of the pipe is twice the mean velocity is calculated using Maximum Velocity = 2*Mean Velocity. To calculate Maximum Velocity at Axis of Cylindrical Element given Mean Velocity of Flow, you need Mean Velocity (V_mean). With our tool, you need to enter the respective value for Mean Velocity 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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