Electric Field and Electric Potential: Difference between revisions

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==Examples==
==Examples==


===Example 1===
===EXAMPLE 1===


The electric field is uniform in this region and
The electric field is uniform in this region and
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C is at < 2, 0, 0> m. What is ΔV along a path from B to
C is at < 2, 0, 0> m. What is ΔV along a path from B to
C?
C?
[[File:Pic1.jpg]]
===Solution===
In this problem, we are given the electric field and asked to find the change in potential between those two points. The formula that we must apply here is <math>\Delta V = \int_i^f \vec{E} • d\vec{s}}</math>, where the initial point is B and the final point is C, making the distance <2,0,0> m - <2,2,0> m = <0,-2,0> m.
The change in potential therefore is the dot product of the electric field and the change in distance:
<0,-300,0> N/C • <0,-2,0> m = 600 V
===EXAMPLE 2===


==Connectedness==
==Connectedness==

Revision as of 16:14, 25 November 2016

Claimed by Terrence Connors

The Main Idea

In physics, many phenomena that we observe are interrelated in some capacity. In the study of electricity and magnetism, several important physical quantities that play a crucial role in understanding physical interactions are derived from one another. Electric Field is a concept that is discussed early in most Electricity and Magnetism curricula, but it has enormous impact once we discover that it tells us information about Electric Potential, and from that, Potential Energy. This helps physicists to understand both the mechanics of a system, and the quantized nature of a system.

A Mathematical Model

We know that the electric force, given by Coulomb's Law, is [math]\displaystyle{ {\vec{F}=q\vec{E}} }[/math]. We also know that electric field and electric force are closely related, the electric field being equal to the electric force divided by the amount of charge [math]\displaystyle{ {\vec{E}=\frac{\vec{F}}{q}} }[/math].

If we think back to the study of conservation of energy, we know that the change in potential energy of a system is work, which is a force being applied over a distance. Since force and distance are vectors, integrating up over the distance of applied force, we obtain: [math]\displaystyle{ {\Delta U=\int_i^f {\vec{F} • \vec{ds}}} }[/math]. By analogy, we define the electric potential as the energy per coulomb, or potential energy divided by charge: [math]\displaystyle{ {\Delta V=\int_i^f {\vec{E} • \vec{ds}}} }[/math].

Observe both sets of equations: the two for Electric Field and Electric Force, and the two for Electric Potential and Potential Energy. We see that they are all related mathematically. If we integrate the electric force, that is, sum the contributions of force over a finite distance, we obtain the change in potential energy. Dividing by the charge, we obtain the potential difference or electric potential, which we see is simply the integral of the electric field applied over a distance.

A Computational Model

We can model how a system will change in electric potential and potential energy as we move, for example, through a uniform electric field in programs like VPython. One could visualize the electric field, electric force, and quantitatively determine the potential and potential energy as, for instance, a system as simple as a single particle moves through space.

Examples

EXAMPLE 1

The electric field is uniform in this region and equal to < 0, –300, 0> N/C. B is at < 2, 2, 0> m and C is at < 2, 0, 0> m. What is ΔV along a path from B to C? File:Pic1.jpg

Solution

In this problem, we are given the electric field and asked to find the change in potential between those two points. The formula that we must apply here is [math]\displaystyle{ \Delta V = \int_i^f \vec{E} • d\vec{s}} }[/math], where the initial point is B and the final point is C, making the distance <2,0,0> m - <2,2,0> m = <0,-2,0> m.

The change in potential therefore is the dot product of the electric field and the change in distance:

<0,-300,0> N/C • <0,-2,0> m = 600 V

EXAMPLE 2

Connectedness

  1. How is this topic connected to something that you are interested in?
  2. How is it connected to your major?
  3. Is there an interesting industrial application?

History

See also

Further reading

External links

References