Using Capacitors to Measure Fluid Level

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Measuring the level of a fluid is useful for a variety of applications, and the technology for the techniques employed in the acquisition of this measurement has progressed far beyond the use of sight glasses and mechanical floats. In fact, a widely used method to measure the amount of fuel in a gas tank is with a device that floats on top of the fuel combined with a sensor, the fuel gauge sending unit, that translates the angle of the float to the amount of fluid in the tank. With this method, the gauge tends to change position with the angle of the car as well as the angle of the float relative to the fluid, so a lot of the time the gauge position can be misleading. A more modern technique of measuring fluid level involves capacitors, and this article will detail the concepts and mathematics behind the relationship with fluid height.


Structure of a Capacitor

For more details, see capacitor.

A parallel plate capacitor with conductive plates of area [math]\displaystyle{ A }[/math] separated by a dielectric with a gap distance of [math]\displaystyle{ d }[/math].

A capacitor consists of two conductors, e.g. conducting plates, separated by some kind of insulator. The insulator--a dielectric--within the gap between the two conductors can be air, plastic, glass, etc. Additionally, the conductors have to be connected to some sort of power supply in order to acquire a buildup of charge on the surface of the conductors.

The magnitude of the electric field within a capacitor is [math]\displaystyle{ \left| \vec{E}_{capacitor} \right| = \frac{Q/A}{\epsilon_{0}} }[/math], where the gap is only occupied by free space. [math]\displaystyle{ Q }[/math] is the charge on a plate and [math]\displaystyle{ A }[/math] is the area of a plate. Additionally, [math]\displaystyle{ \epsilon_{0} }[/math] is the permittivity of free space as detailed here.

Relating Capacitance to Fluid Level

With a dielectric involved, we apply the equation [math]\displaystyle{ \vec{E}_{dielectric} = \frac{\vec{E}_{applied}}{K} }[/math], where [math]\displaystyle{ K }[/math] is the dielectric constant of the material, and get [math]\displaystyle{ \left| \vec{E}_{dielectric} \right| = \frac{Q/A}{K\epsilon_{0}} }[/math]. The capacitance, [math]\displaystyle{ C=\frac{Q}{V} }[/math] (where [math]\displaystyle{ V }[/math] is the voltage) or [math]\displaystyle{ C=\frac{\epsilon_0 A K}{d} }[/math], therefore changes with a varying dielectric constant.

When multiple materials are between the gap, for instance water and air, the overall capacitance would be [math]\displaystyle{ C=\epsilon_0 A (d_{water}+d_{air})(\frac{K_{water}}{d_{water}}+\frac{K_{air}}{d_{air}}) }[/math], where [math]\displaystyle{ d=d_{water}+d_{air} }[/math] and [math]\displaystyle{ K_{air} \approx 1 }[/math]. Thus, correlating capacitance to known levels of water results in a calibration for a sensor using this technique, and the amount of water can be back calculated from the overall capacitance. With more than two dielectrics, the equation can be expanded to include these materials.

A Computational Model

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A Python simulation depicting how varying the amount of dielectric within the gap of a capacitor (with two oppositely charged conducting plates) changes the corresponding electric field between the gap. Notice how more of a dielectric with a high dielectric constant reduces the electric field, which in turn increases the capacitance.

For a simple simulation depicting how changing the amount of dielectric within the gap of a capacitor changes the corresponding electric field, please check out the VPython simulation. The charge on the capacitor as well as the dielectric constants for both dielectrics can be adjusted to visualize how the changes affect the electric field. Notice that the scale factor for the electric field is computed in such a way that the maximum length of the arrow is always the distance between the two plates, so adjusting constants proportionally may result in similar looking arrows (although the electric field will be different). Additionally, you can try changing the color on one of the dielectrics to better visualize the allocation of both within the gap of the capacitor.

A decrease in electric field yields an increase in capacitance, so we can imagine how these two are related. With water and air surrounded by plastic, determining the water level is as simple as measuring the capacitance and solving for the amount of water. In practical applications, these sensors would have to be calibrated and an additional temperature sensor would be needed, because the dielectric constant changes with temperature. Short Description of Topic

The Main Idea

State, in your own words, the main idea for this topic Electric Field of Capacitor

A Mathematical Model

What are the mathematical equations that allow us to model this topic. For example [math]\displaystyle{ {\frac{d\vec{p}}{dt}}_{system} = \vec{F}_{net} }[/math] where p is the momentum of the system and F is the net force from the surroundings.

A Computational Model

How do we visualize or predict using this topic. Consider embedding some vpython code here Teach hands-on with GlowScript

Examples

For an example, I will extract the scenario from a YouTube video here.

Connectedness

Connection to Personal Interest: Water Level Sensing

How is this topic connected to something that you are interested in?
My father owns horses and in order to make sure they have water, he needed to walk far to check the troughs containing water. Instead, with assistance of videos part I and part II (although these sensors work off of resistance, the data transferring portion really helped), we were able to construct a capacitative water level sensor that transmitted the information to us in the house, without requiring long treks to monitor the water. Thus, the interest stemmed from a determination to do less work.

Connection to Major: Engineering Applications

How is it connected to your major (electrical engineering)?
Capacitors and electrical engineering inadvertently go hand-in-hand. Whether developing filters, storing data, or making these kinds of sensors, there is a wide array of applications.

Connection to Industry: Fuel Gauge Level Sensing

Is there an interesting industrial application?
The concept of capacitative fluid level sensing is the same for any fluid, and fuel is no outlier. In newer aircraft, the fuel level is measured using this technique and relayed to the pilot in the cockpit.

History

Put this idea in historical context. Give the reader the Who, What, When, Where, and Why.

See also

Further reading

External links

References

  1. Falstaff.bucknell.edu, a long overview of capacitors
  2. Hyperphysics.phy-astr.gsu.edu, describing capacitance
  3. Hyperphysics.phy-astr.gsu.edu, capacitance of a parallel plate capacitor
  4. Nist.gov, an article describing the relationship of temperature to dielectric constant of water