This **pipe velocity calculator** allows you to compute the pipe velocity which is the speed in which a certain flow rate goes through a pipe at a certain diameter. You can read more on this subject and discover the transformations used below the form.

## How does this pipe velocity calculator work?

This is a useful tool to use whenever you need to calculate one of the components in the pipe velocity equation. All you need to do is input two of the three values, for example diameter and flow rate to retrieve the third, in this case velocity. For your convenience there are plenty of measurement units you can choose from and there is no need to respect the same unit for both values because the *pipe velocity calculator* will do all the necessary transformations.

What is special about this tool is that not only it offers you the third component of the equation but also shows you what that value means in the other units available. For instance, if you calculate flow rate you will receive your answer in m^{3}/s, m^{3}/h, in^{3}/s, in^{3}/g, ft^{3}/s and ft^{3}/h.

## Example calculation

Let’s take a case in which the velocity is searched based on flow rate of 15 m^{3}/s and diameter of 0.5 m:

The velocity value for the above pipe velocity equation is 76.36 m/s. This is equal to:

■ 62229 m/h

■ 0.7303 km/s

■ 2229 km/h

■ 0317 ft/s

■ 9023 ft/s

## Equations and transformations used:

### Flow rate = ¼ * π * diameter^{2} * velocity

1 m^{3}/h = 0.78 m^{3}/s

1 in^{3}/s= 0.236 m^{3}/s

1 in^{3}/h= 4.5519622878e-9 m^{3}/s

1 ft^{3}/s= 0.028316847 m^{3}/s

1 ft^{3}/h= 0.8333 m^{3}/s

### Diameter = square root out of (4 * flow rate) / (π * velocity)

1 mm= 0.001 m

1 cm= 0.01 m

1 in= 0.0254 m

1 ft= 0.3048 m

### Velocity = 4 * flow rate / π * diameter^{2}

1 m/h= 0.78 m/s

1 km/s = 1000 m/s

1 km/h= 0.27777777778 m/s

1 in/s= 0.025 4 m/s

1 in/h= 0.5556 m/s

1 ft/s= 0.304 8 m/s

1 ft/h= 0.667 m/s

## What is pipe velocity?

This represents the speed of a fluid in the pipe and what needs to be taken in consideration is that this speed is not uniform across the section area so usually a mean is calculated to offer a continuity result or a steady flow. A practical application of this concept is the water flow in pipes.

28 Mar, 2015 | 0 comments
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