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Pressure Fundamentals of Pressure Sensor Technology
[Article release time: 2015-08-28]
November 1, 1998By: Robert E. Bicking

To begin our investigation of pressure sensors, we first must consider

the physics on which the technology is based.

Basic Physics of Pressure Sensing


  Static Pressure. Pressure, P, is defined as force, F, per unit area, A:

   P = F/A (1)

The measurement of pressure is generally associated with fluids, either
liquids or gases. A container filled with a liquid (see Figure 1) has a
pressure (due to the weight of the liquid) at a point in the liquid of:

   P = deltaF / deltaA = hw (2)

where:

h = distance from the surface to the point
= weight of the liquid (most liquids are nearly incompressible)

figure


Figure 1. The pressure at any given point in a confined liquid is determined
by the weight of the liquid and the distance from the point to the surface.

The weight per unit volume, V, is given by:

   w = mg/V (3)

where:

= mass
g = gravitational acceleration

Note that this relation can be used to determine the height of the column
of liquid in a tank by measuring the pressure.

The density, rho, is given by:

   rho = m/V (4)

Thus, the density of a liquid determines the pressure, P, exerted for
a given height. Mercury is 13.6 3 denser than water, so would exert a pressure
13.6 3 that of water for a column of the same height. It should be noted
that the pressure due to the height of a column of liquid is in addition
to the atmospheric pressure acting on the surface of the liquid. The height
of a column of liquid is:

   h = P/rhog (5)

Archimedes's principle states that "A body wholly or partially submerged
in a liquid is buoyed up by a force equal to the weight of the liquid displaced."
Given a block of material submerged in a container of liquid (see Figure
2) with area A and length L, the downward pressure exerted on the top face
is:

   PD = hrhog (6)

figure


Figure 2. Archimedes' principle states that an object submerged in a
confined liquid will be buoyed up by the weight of the liquid it displaces.

and the upward pressure exerted on the bottom face is:

   PU = (h + L) rhog (7)

giving a resultant pressure of:

   PU - PD = Lrhog (8)

and the force is equal to the volume of the block multiplied by the weight
of the liquid displaced.


figure


Figure 3. The pressure transmitted to a confined liquid is normal to
the liquid's surface, as can be observed by breaching one of the walls of
the container.

A liquid exhibits nearly no shear stress, which leads to some interesting
results. Pressure is transmitted to the inside of a container normal to
the surfaces, a fact that can be most easily proved by punching a hole in
a container of water and observing the stream as it exits the hole (see
Figure 3). This is important in the construction of dams, given
that they must resist the force of water. This pressure is called thestatic
pressure.

Pascal's law states that an increase in pressure at any point in a liquid
results in a like increase at every other point in the liquid. This principle
is used in hydraulic systems such as jacks and automobile brakes and is
the fluidic equivalent of the principle of the lever, which allows large
forces to be generated easily by trading large movement of a small piston
for small movement of a large piston (see Figure 4).


figure


Figure 4. Pascal's law states that an increase in pressure at any point
in a liquid causes a corresponding increase at every other point in the
liquid.

  Pressure in Moving Fluids. The pressure in a moving fluid exerted
parallel to the flow direction is called the impact pressure, PI. This is
due to the kinetic energy of the fluid:

   PI = rhoVO²/2 (9)

where:

rho = fluid density
VO  = fluid velocity

Bernoulli's theorem states that for horizontal flow the following relation
holds:

   PS = PO + PI (10)

where:

PS = stagnation (or total) pressure
PO  = static pressure

This relationship is useful for determining the flow velocity in a variety
of applications. Rearranging the equation gives:

   equation (11)

figure


Figure 5. A Pitot tube assembly can be used to measure the velocity of
a moving fluid.

Fluid flow velocity may be measured with the Pitot tube assembly shown
in Figure 5. The tube facing the flow measures total pressure and the tube
normal to the flow measures static pressure. This approach is used in HVAC
applications and in aircraft to measure flow velocity.

  Gases. Gases differ from liquids in two respects: they are very
compressible, and they completely fill any closed vessel in which they are


figure


Figure 6. The compressibility of gases is illustrated by nonlinear atmosphere
pressure as a function of altitude.

placed. The nonlinear air pressure variation with altitude shown in Figure
6 is an example of the effect of the compressibility of gases.

  Dynamic Effects. Static pressure is measured under steady-state
or equilibrium conditions, but most real-life applications deal with dynamic
or changing pressure. For example, the measurement of blood pressure usually
gives the two steady-state values of systolic and diastolic pressure. There
is much additional information in the shape of the blood pressure signal,
however, which is the reason for the monitors used in critical-care situations.

To measure changing pressures, the frequency response of the sensor must
be considered. As a rough approximation, the sensorfrequency response should
be 5-10 × the highest frequency component in the pressure signal. The
frequency response is defined as the highest frequency that the sensor will
measure without distortion or attenuation. Sometimes the response time is
given instead. For a first-order system, they are related as follows:

   FB = 1/2pitau (12)

where:

FB  = frequency where the response is reduced by 50%
tau = time constant where the output rises to 63% of its final value following a step input change

Another issue is the remote measurement of pressure where a liquid coupling
medium is used. Care must be taken to purge all air because its compressibility
will corrupt the waveform.

Types of Pressure Measurements

Absolute pressure is measured relative to a perfect vacuum. An
example is atmospheric pressure. A common unit of measure is pounds per
square inch absolute (psia).

Differential pressure is the difference in pressure between two
points of measurement. This is commonly measured in units of pounds per
square inch differential (psid).

Gauge pressure is measured relative to ambient pressure. Blood
pressure is one example. Common measurement units are pressure per square
inch gauge (psig). Intake manifold vacuum in an automobile engine is an
example of a vacuum gauge measurement (vacuum is negative gauge pressure).


figure


Figure 7. The same sensor can be used for all three types of pressure
measurement; only the references differ.

The three types of measurements are shown in Figure 7. Note that the
same sensor may be used for all three types; only the reference is different.
Differential pressures may be measured anywhere in the range—above, below,
and around atmospheric pressure.

Pressure Units

As previously noted, pressure is force per unit area and historically
a great variety of units have been used, depending on their suitability
for the application. For example, blood pressure is usually measured in
mmHg because mercury manometers were used originally. Atmospheric pressure
is usually expressed in in.Hg for the same reason. Other units used for
atmospheric pressure are bar and atm. The following conversion factors should
help in dealing with the various units:

1 psi = 51.714 mmHg
  = 2.0359 in.Hg
  = 27.680 in.H2O
  = 6.8946 kPa
1 bar = 14.504 psi
1 atm.  = 14.696 psi

Example: Convert 200 mmHg to psi:

200 mmHg ? 1 psi/51.714 mmHg = 3.867 psi


figure


Figure 8. The typical pressure sensor has three functional blocks.

A check that the answer is correct is to verify that it is in the desired
units and that mmHg cancels.

Pressure Sensing

Pressure is sensed by mechanical elements such as plates, shells, and
tubes that are designed and constructed to deflect when pressure is applied.
This is the basic mechanism converting pressure to physical movement. Next,
this movement must be transduced to obtain an electrical or other output.


figure


Figure 9. The basic pressure sensing element can be configured as a C-shaped
Bourdon tube (A); a helical Bourdon tube (B); flat diaphragm (C); a convoluted
diaphragm (D); a capsule (E); or a set of bellows (F).

Finally, signal conditioning may be needed, depending on the type of sensor
and the application. Figure 8 illustrates the three functional
blocks.

Sensing Elements

The main types of sensing elements are Bourdon tubes, diaphragms, capsules,
and bellows (see Figure 9). The Bourdon tube is a sealed tube that
deflects in response to applied pressure. All except diaphragms provide
a fairly large displacement that is useful in mechanical gauges and for
electrical sensors that require a significant movement.

  Mechanical Pressure Gauges. In mechanical gauges, the motion created
by the sensing element is read directly by a dial or pointer. These devices
are typically seen in low-performance applications, including blood pressure
measurement and automotive pressure gauges. The mechanical approach used
to couple the sensing element to the readout can introduce repeatability


figure


Figure 10. Temperature has an effect on the offset of a pressure sensor.

errors, which will be discussed later. The mechanical mass of the gauges
also limits the frequency response and makes these sensors suitable only
for slowly changing measurements.

  Electromechanical
  Pressure Sensors
. Electromechanical pressure
sensors convert the applied pressure to an electrical signal. A wide variety
of materials and technologies has been used in these devices, resulting
in performance vs. cost tradeoffs and suitability for applications. The
electrical output signal also provides a variety of choices for various
applications.

  Sensor Effects. A pressure sensor may be modeled as:

   VOUT = kO + k1P (13)

where:

kO  = offset
k1 = pressure sensitivity in V/pressure unit

figure


Figure 11. The sensitivity of a pressure sensor is also affected by temperature.

A sensor will typically exhibit temperature coefficients of offset
(also called null shift) and sensitivity (see Figures 10 and 11).

Linearity refers to deviations from the ideal straight line described
by Equation (13). One way to measure linearity is to use the least squares
method, which gives a best fit straight line (see Figure 12).


figure


Figure 12. The least squares method can be used to measure a pressure
sensor's linearity.

Repeatability refers to the sensor's ability to produce the same
output with consecutive applications of the same pressure (see Figure 13).

Hysteresis refers to the ability of the sensor to give the same
output when the same increasing and then decreasing pressures are applied
consecutively (see Figure 14).

Temperature hysteresis refers to the ability of the sensor to
give the same output at a given temperature before and after a temperature
cycle. Repeatability and hysteresis effects are not easily compensated and


figure


Figure 13. Repeatability refers to the ability of a pressure sensor to
provide the same output with successive applications of the same pressure.

are indicators of the basic stability of the device.

Gauge factor is a measure of the sensitivity of a sensor. It is
defined as the ratio of the change in an electrical transduction parameter
over the full range of pressure to the value of that parameter at zero pressure.

Thus, the gauge factor of a resistive sensor is:

   deltaR/R (14)

where:

R = base resistance
delta = resistance change with full-scale pressure, for example

figure


Figure 14. Hysteresis is a sensor's ability to give the same output at
a given temperature before and after a temperature cycle.

Pressure Sensor Technologies

  Potentiometric Pressure Sensors. Potentiometric pressure sensors


figure


Figure 15. Potentiometric pressure sensors use a Bourdon tube, capsule,
or bellows to drive a wiper arm on a resistive element. Such sensors tend
to be inexpensive, but subject to repeatability and hysteresis errors.

use a Bourdon tube, capsule, or bellows to drive a wiper arm on a resistive
element. For reliable operation the wiper must bear on the element with
some force, which leads to repeatability and hysteresis errors. These devices
are very low cost, however, and are used in low-performance applications
such as dashboard oil pressure gauges. An example is shown in Figure 15.

  Inductive Pressure Sensors. Several configurations based on varying
inductance or inductive coupling are used in pressure sensors. They all
require AC excitation of the coil(s) and, if a DC output is desired, subsequent
demodulation and filtering. The linear variable differential transformer


figure


Figure 16. An LVDT pressure sensor, one configuration of inductive devices,
drives a moving core that varies the inductive coupling between the transformer
primary and secondary.

(LVDT) types have a fairly low frequency response due to the necessity of
driving the moving core of the differential transformer (see Figure 16).
The LVDT uses the moving core to vary the inductive coupling between the
transformer primary and secondary.

  Capacitive Pressure Sensors. Capacitive pressure sensors typically
use a thin diaphragm as one plate of a capacitor. Applied pressure causes
the diaphragm to deflect and the capacitance to change. This change may
or may not be linear and is typically on the order of several picofarads
out of a total capacitance of 50-100 pF. The change in capacitance may
be used to control the frequency of an oscillator or to vary the coupling
of an AC signal through a network. The electronics for signal conditioning
should be located close to the sensing element to prevent errors due to
stray capacitance.

The capacitance of two parallel plates is given by:

   C = µA/d (15)

where:

µ = dielectric constant of the material
between the plates
= area of the plates
d = spacing between the plates

figure


Figure 17. The basic capacitive pressure sensor consists of two plates
with a vacuum between them.

If the dielectric constant of the material between the plates isn't kept
constant, errors may result. Capacitive absolute pressure sensors with a
vacuum between the plates are ideal in this respect. Because the capacitance
of this sensor depends only on physical parameters, sensors with good performance
can be constructed using materials with low coefficients of thermal expansion.
Since the device has to be fairly large to obtain a usable signal, frequency
response may be a problem in some applications. Also, low-pressure capacitive
sensors exhibit acceleration and vibration sensitivity due to the necessity
for a large, thin diaphragm. A basic capacitive sensor is shown in Figure
17 and a more complex differential pressure capsule is shown in
Figure 18.

  Piezoelectric Pressure Sensors. Piezoelectric elements are bi-directional
transducers capable of converting stress into an electric potential and
vice versa. They consist of metallized quartz or ceramic materials. One
important factor to remember is that this is a dynamic effect, providing
an output only when the input is changing. This means that these sensors
can be used only for varying pressures. The piezoelectric element has a


figure


Figure 18. A more complex capacitive pressure sensor can be built to
detect differential pressure.

high-impedance output and care must be taken to avoid loading the output
by the interface electronics. Some piezoelectric pressure sensors include
an internal amplifier to provide an easy electrical interface (see Figure
19).

  Strain Gauge Pressure Sensors. Strain gauge sensors originally
used a metal diaphragm with strain gauges bonded to it. A strain gauge measures
the strain in a material subjected to applied stress. Consider a strip of
metallic material (see Figure 20) with electrical resistance given
by:

   RO = rhoL/WT (16)

where:

rho = resistivity
L, W, T  = length, width, thickness



figure


Figure 19. Piezoelectric sensors convert stress into an electric potential
and vice versa. Sensors based on this technology are used to measure varying
pressures.


figure


Figure 20. Strain gauge pressure sensors measure the strain in a material
that is subjected to applied stress.

Metallic strain gauges depend only on dimensional changes to produce
a change in resistance. A stress applied to the strip causes it to become
slightly longer, narrower, and thinner, resulting in a resistance of:

   R = rho(L + deltaL) / (W - deltaW)(T - deltaT), or

   R approx. RO(1 + 3delta)
(17)

As might be expected, the signal due to deformation of the material is
small, on the order of 0.1% of the base resistance.


figure


Figure 21. A silicon bar can be bonded to a diaphragm to yield a strain
gauge sensor with a relatively high output.

Semiconductor strain gauges are widely used, both bonded and integrated
into a silicon diaphragm, because the response to applied stress is an order
of magnitude larger than for a metallic strain gauge. When the crystal lattice
structure of silicon is deformed by applied stress, the resistance changes.
This is called the piezoresistive effect. Following are some of the types
of strain gauges used in pressure sensors.


photo


Photo 1. IC processing is used to form the piezoresistors on the surface
of a silicon wafer to fabricate an integrated piezoresistive pressure sensor.

Deposited strain gauge.Metallic strain gauges can be formed on
a diaphragm by means of thin film deposition. This construction minimizes
the effects of repeatability and hysteresis that bonded strain gauges exhibit.
These sensors exhibit the relatively low output of metallic strain gauges.

Bonded semiconductor strain gauge. A silicon bar may be bonded
to a diaphragm to form a sensor with relatively high output. Making the
diaphragm from a chemically inert material allows this sensor to interface
with a wide variety of media (see Figure 21).

  Piezoresistive Integrated Semiconductor. IC processing is used
to form the piezoresistors on the surface of a silicon wafer (see Photo
1). There are four piezoresistors within the diaphragm area on
the sensor. Two are subjected to tangential stress and two to radial stress
when the diaphragm is deflected.


figure


Figure 22. Piezoresistive integrated semiconductor pressure sensors incorporate
four piezoresistors in the diaphragm. When the diaphragm is deflected, two
resistors are subjected to tangential stress and two to radial stress. The
four are connected to a four-element bridge.

They are connected in a four-element bridge
configuration (see Figure 22) and provide the following output:

   VOUT/VCC = deltaR / R (18)

where:

VCC  = supply voltage
R = base resistance of the piezoresistor
deltaR = change with applied pressure and is typically ~2.5% of the full R

figure


Figure 23. The back of a wafer is etched out to form the diaphragm of
a piezoresistive pressure sensor.

Etching of the back of the wafer is used to form the diaphragm (see Figure
23). The high output of the bonded strain gauge is combined with the low
hysteresis of the deposited strain gauge in this design, due to the integrated
construction and the nearly perfect elasticity of single-crystal silicon.
The cost of the sensing element is low since a large number of devices fit
on a silicon wafer. Typical die size is 0.1 in. square with a 50 mil square


figure


Figure 24. Piezoresistive pressure sensors can be configured to provide
absolute, differential, or gauge pressure readings, depending on the reference.
The diaphragm is shown here as it deflects under applied differential pressures.

diaphragm. The circuitry needed for amplification, temperature compensation,
and calibration may also be included on the same IC. Various pressure ranges
are accommodated by varying the diaphragm thickness and, for very low pressures,


photo


Photo 2. This totally integrated silicon pressure sensor measures 0.52
in. long by 0.44 in. wide by 0.75 in. high, including the port.

by varying the diaphragm diameter. This device can be used to construct
absolute, differential, and gauge pressure sensors, depending on the reference
(see Figure 24).

Because the sensing element is so small (see Photo 2), the package
can have a great deal of mounting and port interface flexibility. Also,
the small size means that it has a wide frequency response and may be used
for dynamic pressure measurements without concern about errors. Mechanical
vibration and acceleration have a negligible effect.

  Using a Flow Sensor to Measure Pressure. A recently developed


photo


Photo 3. The recently developed microbridge mass airflow sensor consists
of a thin thermally isolated bridge structure suspended over a cavity in
the silicon IC. The chip is 67 mil square.

micromachined flow sensor (see Photo 3) represents a new approach to low-pressure
measurement in applications where a small flow across the sensing element
may be tolerated. The sensor consists of a thin film thermally isolated
bridge structure suspended over a cavity in the silicon IC.

Because of its small size and excellent thermal resistance, only a few
milliwatts of power are required to achieve high air flow sensitivity. By
calibrating the device with a flow restriction for a specified pressure
drop, a sensor capable of measuring pressures of a few inches of water results.
This is ideal for airflow measurement in HVAC applications, for example.

The sensor operates on the principle of heat transfer due to mass airflow
directed across the surface of the sensing element (see Figure 25).


figure


Figure 25. A silicon bar can be bonded to a diaphragm to yield a strain
gauge sensor with a relatively high output.

Output voltage varies in proportion to the mass air (or other gas flow) through
the inlet and outlet ports of the package (see Photo 4). The sensor


photo


Photo 4. The output voltage of the microbridge mass air flow sensor varies
in proportion to the mass flow of air or other gas through the inlet and
outlet ports of the package. The packaged sensor is 1.20 in. wide by 1.24
in. long by 0.61 in. high.

has a unique silicon chip based on recent advances in microstructure technology.
It consists of a thin film, thermally isolated, bridge structure containing
a heater and temperature-sensing elements. The bridge structure provides
a sensitive and fast response to the flow of air over the chip. Dual sensing
elements flanking a central heating element indicate direction as well as
rate of flow. A specially designed housing precisely directs and controls
the airflow across the sensing microstructure. Highly effective thermal
isolation for the heater and sensing resistors is attained by the etched
cavity air space beneath the flow sensor bridge. The small size and thermal
isolation of the microbridge mass airflow sensor are responsible for the
remarkably fast response and high sensitivity to flows.

  Pressure Switches. Pressure switches, combining a diaphragm or
other pressure measuring means with a precision snap switch, can provide
precise single-point pressure sensing. Alternatively, simple electronic
switches may be combined with electrical sensors to construct a pressure
switch with an adjustable set point and hysteresis.

  Electrical Interfacing. Care must be taken with the output from
a pressure sensor to avoid corrupting the signal by noise or 60 Hz AC pickup.
If the signal must be run some distance to the interface circuitry, twisted
and/or shielded wire should be considered. A decoupling capacitor located
at the sensor and connected from the supply to ground will also filter noise,
as will a capacitor from output to ground.

For long runs, a current output sensor should be considered. These devices
have a 2-wire interface and modulate the supply current in response to applied
pressure. Obviously, wire resistance has no effect and noise must change
the loop current, not simply impress a voltage on the signal. The industry
standard interface is:

   PL = 4 mA (19)
   PH = 20 mA (20)

where:

PL = low pressure range limit
PH  = high pressure range limit

Calibration


figure


Figure 26. Dead-weight testers, used to calibrate pressure sensors, incorporate
calibrated weights that exert force on a piston which in turn acts on a
fluid to produce a test pressure. Oil-type testers like the one shown here
are commonly used for high pressures; pneumatic air bearing devices are
the usual choice for lower pressures.

With this approach, runs of 1000 ft or more are possible.

Manufacturers of pressure sensors have elaborate calibration facilities
to verify the accuracy of their production test equipment. These include
dead weight testers and temperature-controlled servo-rebalance testers using
Bourdon tubes made from high-stability quartz.

  Dead-Weight Tester. A dead-weight tester uses calibrated weights
that exert force on a piston which then acts on a fluid to produce a test
pressure. For high pressures (>500 psi), oil is typically used (see Figure
26); for lower pressures, pneumatic air bearing testers are available
and are much more convenient as well as less messy to use.

  Manometer. A mercury manometer is a simple pressure standard and
may be used for gauge, differential, and absolute measurements with a suitable
reference. It is useful mainly for lower pressure work because the height


figure


Figure 27. The mercury manometer, another calibration option for pressure
sensors, can be used on gauge, differential, and absolute sensors with a
suitable reference. The difference between column heights gives the pressure
reading. Manometers are used mainly to calibrate sensors designed to measure
in the lower pressure ranges.

of the column of mercury will otherwise become unwieldy. The difference
in column heights gives the pressure reading (see Figure 27).

  Low-Cost Calibration.Many of the higher performance commercially
available pressure sensors are furnished with individual test data. A sensor
with excellent repeatability and hysteresis makes an excellent low-cost
in-house pressure calibration reference when combined with a pneumatic pressure
regulator and a source of air pressure (see Figure 28).

Selection Considerations

Selection of a pressure sensor involves consideration of the medium for
compatibility with the materials used in the sensor, the type (gauge, absolute,
differential) of measurement, the range, the type of electrical output,
and the accuracy required. Manufacturer's specifications usually apply to


figure


Figure 28. A sensor with excellent repeatability and hysteresis can be
combined with a pneumatic pressure regulator and a source of air pressure
to yield an inexpensive in-house pressure calibration reference.

a particular temperature range. If the range of operation in a given application
is smaller, for example, the errors should ratio down. Total error can be
computed by adding the individual errors (worst-case) or by computing the
geometric sum or root sum of the squares (RSS). The latter is more realistic
since it treats them as independent errors that typically vary randomly.
Following is a comparison of the two methods.

Given the following error terms:

  • Linearity = 1% F.S.
  • Null calibration = 1% F.S.
  • Sensitivity calibration = 1% F.S. Temperature errors are sometimes
    given as coefficients per ºC referenced to 25ºC. Simply multiply
    the coefficient by the temperature range of the application to obtain the
    total error.
  • Temperature error = 0.5% F.S.
  • Repeatability and hysteresis = 0.1% F.S.
   equation (21)

Worst case error is equal to the sum of all the maximum errors:

   Worst case error = 1 + 1 + 1 + 0.5 + 0.1 = 3.6% (22)


Applications


  Industrial. Fluid level in a tank: A gauge pressure sensor
located to measure the pressure at the bottom of a tank can be used for
a remote indication of fluid level using the relation:

   h = P/rhog (23)

Fluid flow: An orifice plate placed in a pipe section creates
a pressure drop. This approach is widely used to measure flow because the
pressure drop may be kept small in comparison to some other types of flowmeters
and because it is impervious to clogging, which may otherwise be a problem
when measuring flow of a viscous medium or one containing particulate matter.
The relation is:

   equation (24)

In some cases, differential pressures of only a few inches of water are
measured in the presence of common-mode pressures of thousands of pounds
per square inch. These pressure sensors are built with elaborate mechanisms
to prevent damage due to the high common-mode pressures and also frequently
have remotely controllable pressure ranging.

  Automotive. A wide variety of pressure applications exist in the
modern electronically controlled auto. Among the most important are:

Manifold absolute pressure (MAP). Many engine control systems
use the speed-density approach to intake air mass flow rate measurement.
The mass flow rate must be known so that the optimum amount of fuel can
be injected. MAP is used in conjunction with intake air temperature to compute
the air density. This requires a 15 psia range or higher (for supercharged
or turbocharged engines). It is also desirable to include an altitude correction
in the control system, and this requires measurement of barometric absolute
pressure (BAP). Some systems use a separate sensor, but it is more common
for the MAP sensor to do double duty since it reads atmospheric pressure
for two conditions. One, before the engine begins cranking and two, whenever
the throttle is wide open.

Engine oil pressure. Engine lubrication requires pressures of
10-15 psig. The oil pump is sized to achieve this pressure at idle and
the pressure increases with engine speed. A potentiometric gauge or pressure
switch is used for this function since precision isn't required.

Evaporative purge system leak detection. To reduce emissions,
modern fuel systems are not vented to the atmosphere. This means that fumes
resulting from temperature-induced pressure changes in the fuel tank are
captured in a carbon canister and later recycled through the engine. Government
regulations require that leaks in this system be detected by the onboard
diagnostics system. One approach is to pressurize the system and measure
pressure decay over a fixed time interval. A 1 psig sensor is used for this
function.

Tire pressure. Recent development of the "run-flat"
tire has prompted development of a remote tire pressure measurement system.
The reason is that a flat tire of this type is difficult to detect visually
and the distance over which it can be used without any pressure is limited.


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