Measurement and Control Basics 3rd Edition (complete book)
.pdfChapter 9 – Flow Measurement |
245 |
L
Flow |
D |
(P1, v1 ) |
(P , v |
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Figure 9-1. Flow in a pipe
sure at the outlet is P2. The total force at the input is F1 = P1A, and the total force at the output is F2 = P2A.
The energy (work) required to move the fluid through the distance L is force times distance:
(F1 – F2)L = P1AL – P2AL
= (P1 – P2)AL
Since AL is the volume of the pipe, the work is given by the following:
Work = Energy = (P1 – P2) (Volume) |
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Work = ∆ P x V |
(9-14) |
The complete energy equation for a flow system must include all possible energy terms, including “internal energy” changes (the energy stored in each molecule of the fluid). This energy includes molecular kinetic energy, molecular rotational energy, potential energy binding forces between molecules, and so on. This internal energy is significant only in laminar flow, where high frictional forces can raise the temperature of the fluid. However, in process control we generally encounter turbulent flow, so we can ignore internal energy in most cases.
Assuming that the flow in Figure 9-1 is steady, let’s find the energy relationship for flow in a uniform pipe. We have just shown that the work (energy) done in moving a fluid through a section of pipe is as follows:
Energy = ∆ PV |
(9-15) |
246 Measurement and Control Basics
This energy is spent giving the fluid a velocity of v. We can express this energy of the moving fluid in terms of its kinetic energy (KE) as follows:
KE = |
mv2 |
(9-16) |
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2 |
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Since the two energies are the same,
∆ PV= |
mv2 |
(9-17) |
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2 |
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However, by definition, mass m is equal to volume V time’s density ρ , so we can replace mass in the equation with Vxρ to obtain the following:
∆ PV= |
V ρ v2 |
(9-18) |
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2 |
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If we cancel the volume term from both sides of the equation, we obtain
∆ P= |
ρ v2 |
(9-19) |
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2 |
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Then, solving for velocity and taking the square root of both sides of the equation, we obtain the general equation for the velocity of any fluid in a pipe:
v = |
2∆ P |
(9-20) |
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ρ |
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This velocity is expressed in terms of the pressure differential and density of the fluid.
Volumetric flow is defined as the volume of fluid that passes a given point in a pipe per unit of time. This is expressed as follows:
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Q = Av |
(9-21) |
where |
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Q |
= |
the volumetric flow |
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A |
= the cross-sectional area of the flow carrier (e.g., pipe) |
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v |
= |
the fluid’s velocity |
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We can also define mass flow rate (W) as the mass or weight flowing per unit time. Typical units are pounds per hour. This is related to the volumetric flow by the following:
Chapter 9 – Flow Measurement |
247 |
W = ρ Q |
(9-22) |
where
W |
= the mass flow rate |
ρ= the density
Q |
= the volumetric flow rate |
Reynolds Number
The basic equations of flow assume that the velocity of flow is uniform across a given cross section. In practice, flow velocities at any cross section approach zero in the boundary layer adjacent to the pipe wall and vary across the diameter. This flow velocity profile has a significant effect on the relationship between flow velocity and the development of pressure difference in a flowmeter. In 1883, the English scientist Sir Osborne Reynolds presented a paper before the Royal Society that proposed a single dimensionless ratio, now known as the Reynolds number, as a criterion for describing this phenomenon. This number Re, is expressed as follows:
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R |
= |
vDρ |
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(9-23) |
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e |
µ |
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where |
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v |
= the flow velocity |
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D |
= the inside diameter of the pipe |
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ρ= the fluid density
µ= fluid viscosity
The Reynolds number expresses the ratio of internal forces to viscous forces. At a very low Reynolds number, viscous forces predominate and inertial forces have little effect. Pressure difference approaches direct proportionality to average flow velocity as well as to viscosity. A Reynolds number is a pure, dimensionless number, so its value will be the same in any consistent set of units. The following equations are used in the United States to more conveniently calculate the Reynolds number for liquid and gas flow through a process pipe:
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= |
3160Qgpm SG |
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Re |
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(Liquid) |
(9-24) |
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µD |
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or |
Re |
= |
50.6Qgpm ρ |
(Liquid) |
(9-25) |
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µD |
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248 Measurement and Control Basics
EXAMPLE 9-2
Problem: Water at 60°F is pumped through a pipe with a 1-in. inside diameter at a flow velocity of 2.0 ft/s. Find the volumetric flow and the mass flow. The density (ρ ) of water is 62.4 lb/ft3 at 60°F.
Solution: The flow velocity is given as 2.0 ft/s, so the volumetric flow can be found as follows:
Q = Av
The area of the pipe is given by the following:
A = π d 2
4
so that
A = π (1in.x1 ft /12in.)2 = 0.0055 ft 2 4
The volumetric flow is as follows:
Q = Av
Q = (0.0055 ft2) (2 ft/s) (60 s/min)
Q = 0.654 ft3/min
The mass flow rate is found using Equation 9-22:
W = ρ Q
W = (62.4lb / ft3 )(0.654 ft3 / min)
W = 40.8lb / min
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R |
= |
379Qacfm ρ |
(Gas) |
(9-26) |
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µD |
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e |
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where |
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ρ |
= density in pounds per cubic foot |
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D |
= the pipe inside diameter, is in inches |
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Chapter 9 – Flow Measurement |
249 |
EXAMPLE 9-3
Problem: An incompressible fluid is flowing through a process pipe with an inside diameter of 12 inches under a pressure head of 16 in. Calculate the fluid velocity and volumetric flow rate.
Solution: The fluid velocity is found as follows:
v = 2gh
where g = 32.2 ft/s2 and h = (16 in.) (1 ft/12 in.) = 1.33 ft.
Thus,
v = 2(32 ft/sec2)(1.33 ft) = 9.23 ft/s
The volumetric flow rate is obtained as follows:
Q = Av
Q = r[(1 ft)2/4] (9.23 ft/s)
Q = 7.25 ft3/s
As shown in Figure 9-2, three flow profile types are encountered in process pipes: laminar, transitional, and turbulent flow. At high Reynolds numbers, inertial forces predominate, and viscous drag effects become negligible. At low Reynolds numbers, flow is laminar and may be regarded as a group of concentric shells. Moreover, each shell reacts in the manner as viscous shear on adjacent shells; the velocity profile across a diameter is substantially parabolic. At high Reynolds numbers flow is turbulent, and eddies form between the boundary layer and the body of the flowing fluid and then propagate through the stream pattern. A very complex, random pattern of velocities develops in all directions. This turbulent, mixing action tends to produce a uniform average axial velocity across the stream.
Flow is in the laminar region when the Reynolds number is less than 2,000, while flow is generally turbulent if the Reynolds numbers are greater than 4,000. Transitional flow occurs in the range of 2,000 to 4,000. Since the Reynolds number only reflects fluid effects and disregards factors such as pipe bends, pipe fittings, and pipe roughness, the boundaries of laminar, transitional, and turbulent flow are estimates suggested for practical control applications.
250 Measurement and Control Basics
Flow
a) Laminar Flow
Flow
b) Transitional Flow
Flow
c) Turbulent Flow
Figure 9-2. Flow profile types
In the equation for the Reynolds number for liquid flow, the velocity, v, generally varies in a ten-to-one range; the specific gravity generally ranges from 0.8 to 1.2; and the pipe diameter is constant. However, for some liquids, the viscosity can vary from less than one to thousands of centipoises. So, in most liquid flow applications viscosity has the most effect on the Reynolds number. While the value of viscosity can be well defined for a given liquid under fixed operating conditions, relatively small changes in temperature can cause order-of-magnitude changes in viscosity. These changes can determine whether the flow is laminar, transitional, or turbulent.
Example 9-4 illustrates a typical Reynolds number calculation to determine flow type.
In the equation for the Reynolds number for gas flow, the velocity, v, generally varies in a ten-to-one range, the density generally varies over a range of less than two to one, and the pipe diameter is constant. However, the viscosity is small and virtually constant in most process applications. So, flow and density have the most effect on the Reynolds number in most gas flow applications. Since the flow and density are well established in most applications and the viscosity is low, gas flow is turbulent in properly designed process piping systems.
252 Measurement and Control Basics
Flow-Measuring Techniques
This section discusses the most common types of flow-detection devices encountered in process control. The techniques used to measure flow fall into four general classes: differential pressure, velocity, volumetric, and mass.
Differential-pressure flowmeters measure flow by inferring the flow rate from the drop in differential pressure (dP) across an obstruction in the process pipe. Some of the common dP flowmeters are orifice plates, venturi tubes, flow nozzles, wedge flow meters, pitot tubes, and annubars.
With velocity devices, the flow rate is determined by measuring the velocity of the flow and multiplying the result by the area through which the fluid flows. Typical examples of velocity devices include turbine, vortex shedding, magnetic, and Doppler ultrasonic flowmeters.
Volumetric or positive-displacement (PD) flowmeters measure flow by measuring volume directly. Positive-displacement flowmeters use hightolerance machined parts to physically trap precisely known quantities of fluid as they rotate. Common devices include rotary-vane, oval-gear, and nutating-disk flowmeters.
Mass flowmeters measure the mass of the fluid directly. An example is the Coriolis mass flowmeter.
Differential-Pressure Flowmeters
One of the most common methods for measuring the flow of liquids in process pipes is to introduce a restriction in the pipe and then measure the resulting differential pressure (∆ P) drop across the restriction. This restriction causes an increase in flow velocity at the restriction and a corresponding pressure drop across the restriction. The relationship between the pressure drop and the rate of flow is given by the following equation:
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Q = K ∆ P |
(9-27) |
where |
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Q |
= the volumetric flow rate |
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K |
= |
a constant for the pipe and liquid type |
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∆ P |
= |
the differential pressure drop across the restriction |
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The constant depends on numerous factors, including the type of liquid, the size of the process pipe, and the temperature of the liquid, among others. The configuration of the restriction that is used will also change the
Chapter 9 – Flow Measurement |
253 |
constant in Equation 9-27. As this equation shows, the flow is linearly dependent not on the pressure drop but rather on the square root. For example, if the pressure drop across the restriction increases by a factor of two when the flow is increased, the flow only increases by a factor of 1.41, the square root of two. An example will illustrate this concept.
EXAMPLE 9-6
Problem: A liquid is flowing past a restriction in a process pipe that has a volumetric flow of 2 ft3 /sec. This causes a pressure drop of 1 in. of water column across the restriction. Calculate the volumetric flow if the pressure drop across the restriction increases to 4-inH2 O, that is, four times greater.
Solution: First, we calculate the constant K in Equation 9-27 using the original flow, Q1, and the original pressure drop, ∆ P1, as follows:
K = |
Q |
= |
2 ft3 |
/ s |
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1 |
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∆ P1 |
(1in.)1/ 2 |
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K = (2 ft3 /(s)(in.1/ 2 )
Then, we can calculate the second volumetric flow using Equation 9-27 and the value calculated for the constant K:
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Q2 = K ∆ P2 |
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Q2 |
= |
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2 ft3 |
∆ P2 |
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(s)(in.1/ 2 ) |
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Q2 |
= |
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2 ft3 |
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4in. |
(s)(in.1/ 2 ) |
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Q |
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= (4 ft3 / s) |
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In the following sections, we will first discuss the four common restric- tion-type differential-pressure flow-measuring devices: orifice plates, venturi tubes, flow nozzles, and wedge flow elements. Then, we will turn to pitot tubes and annubar flow differential-pressure flowmeasuring devices.
254 Measurement and Control Basics
Orifice Plate
The orifice plate is the most common type of restriction used in process control applications to measure flow. The principle behind the orifice plate is simple. The plate is inserted in a process line, and then the differential pressure (∆ P = Phigh – Plow) developed across the orifice plate is measured to determine the flow rate (see Figure 9-3). To maintain a steady flow through the orifice plate, the velocity must increase as it passes through the orifice. This increase in velocity, or kinetic energy, comes about at the expense of pressure, or potential energy.
High Pressure port |
Phigh |
Plow |
Low Pressure port |
Orifice plate
Flow |
Phigh
Pressure loss
P
Plow
Figure 9-3. Pressure drop across an orifice plate
The pressure profile across the orifice plate in Figure 9-3 shows a decrease in pressure as the flow velocity increases through the restriction. The lowest pressure occurs where the velocity is the highest. Then, farther downstream as the fluid expands back into a larger area, velocity decreases and pressure correspondingly increases. The pressure downstream of the orifice plate never returns completely to the pressure that existed upstream because the restriction created friction and turbulence that caused energy loss.
The differential pressure across the orifice plate is a measure of the flow velocity. The greater the flow, the larger the differential pressure across the orifice plate.
Figure 9-4 shows the three most common types of orifice plates: concentric, eccentric, and segmental. The concentric orifice plate (Figure 9-4a) is the most widely used type. The eccentric orifice plate (Figure 9-4b) is