Gauss' law (electrostatics): Difference between revisions

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Take the origin of a [[spherical polar coordinates|spherical polar coordinate]] system in the center of symmetry of the charge distribution&mdash;the position of the point charge, or the center of the spherical shell, respectively. Because of symmetry, '''E''' has a radial component only (parallel to the unit vector '''e'''<sub>''r''</sub>). Moreover, this component does not depend on the polar angles,
Take the origin of a [[spherical polar coordinates|spherical polar coordinate]] system in the center of symmetry of the charge distribution&mdash;the position of the point charge, or the center of the spherical shell, respectively. Because of symmetry, '''E''' has a radial component only (parallel to the unit vector '''e'''<sub>''r''</sub>). Moreover, this component does not depend on the polar angles,
:<math>
:<math>
\mathbf{E} = E_r(r), \quad E_\theta = E_\phi = 0.
\mathbf{E} = \Big( E_r(r), \quad E_\theta =0, \quad E_\phi = 0 \Big).
</math>
</math>
Take a sphere of radius ''r'' as the closed-surface to integrate over (in case we are considering a spherical shell ''r'' is larger than the radius of the spherical shell); the surface element is  
Take the surface of a sphere of radius ''r'' to integrate over (in the case that we are considering a spherical shell ''r'' must be larger than the radius of the spherical shell); the [[Spherical polar coordinates#Infinitesimal surface and volume element|surface element]] is  
:<math>
:<math>
d\mathbf{S} =  r^2\, \sin\theta \, d\theta\, d\phi \, \mathbf{e}_r\quad \hbox{and}\quad
d\mathbf{S} =  r^2\, \sin\theta \, d\theta\, d\phi \, \mathbf{e}_r\quad \hbox{and}\quad
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Then,
Then,
:<math>
:<math>
k Q_\mathrm{tot} = E_r(r)\, r^2 \iint_{\mathrm{surface}\atop\mathrm{of\, sphere}}  \sin\theta \, d\theta\, d\phi \quad\Rightarrow\quad E_r(r) = \frac{k Q_\mathrm{tot}}{4\pi r^2 },
\begin{align}
k Q_\mathrm{tot} &= E_r(r)\, r^2 \iint_{\mathrm{surface}\atop\mathrm{of\, sphere}}  \sin\theta \, d\theta\, d\phi = E_r(r)\, r^2 \int_{0}^{\pi}\int_{0}^{2\pi}  \sin\theta \, d\theta\, d\phi = E_r(r)\, r^2\,4\pi\\
&\Longrightarrow\, E_r(r) = \frac{k Q_\mathrm{tot}}{4\pi r^2 },
\end{align}
</math>
</math>
where ''r'' is the distance of the field point to the origin. In the case of a point charge we have proved here [[Coulomb's law]] from Gauss' law. In the case of a charged spherical shell, we find that the electric field is such that it seems that the total charge on the shell is concentrated in the center of the shell and that Coulomb's law applies to the charge concentrated in the center.  
where ''r'' is the distance of the field-point to the origin. In the case of a point charge we have proved here [[Coulomb's law]] from Gauss' law. In the case of a charged spherical shell, we find that the electric field outside the shell is such that it seems that the total charge on the shell is concentrated in the center of the shellCoulomb's law applies to the charge seemingly concentrated in the center of the shell.
 
==Note==
==Note==
Gauss' law is an integral form of one of the four [[Maxwell's equations]] and as such is a common point of departure for development of electrostatic theory. From it [[Coulomb's law]] can be derived. Conversely, one can take Coulomb's law as point of departure and derive Gauss' law from it. If one does this, one finds that the [[inverse-square law|inverse-square distance]] dependence arising in Coulomb's law exactly cancels the dependence on length squared of a surface. In other words, the magnitude of the enveloping surface is arbitrary. Given ''Q''<sub>tot</sub>, it is irrelevant for Gauss' law how tightly or loosely the surface envelops this charge.  
Gauss' law is an integral form of one of the four [[Maxwell's equations]] and as such is a common point of departure for development of electrostatic theory. From it [[Coulomb's law]] can be derived. Conversely, one can take Coulomb's law as point of departure and derive Gauss' law from it. If one does this, one finds that the [[inverse-square law|inverse-square distance]] dependence arising in Coulomb's law exactly cancels the dependence on length squared of a surface. In other words, the magnitude of the enveloping surface is arbitrary. Given ''Q''<sub>tot</sub>, it is irrelevant for Gauss' law how tightly or loosely the surface envelops this charge.  

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In physics, more specifically in electrostatics, Gauss' law is a theorem concerning a surface integral of an electric field. In vacuum Gauss' law takes the form:

Here dS is an vector with length dS, the area of an infinitesimal surface element on the closed surface, and direction perpendicular to the surface element dS, pointing outward. The vector E is the electric field at the position dS, the dot indicates a dot product between the vectors E and dS. The double integral is over a closed surface that envelops a total electric charge Qtot, which may be the sum over one or more point charges, or an integral over a charge distribution. If the closed surface does not envelop any charge then the integral is zero. The constant ε0 is the electric constant.

The law is called after the German mathematician Carl Friedrich Gauss.[1]

Application to spherical symmetric charge distribution

Gauss' law is a convenient way to computing electric fields in the case of spherical-symmetric charge distributions. For instance, a point charge is a spherical-symmetric charge distribution. Another example is a charged, conducting, spherical shell, the charge distribution being homogeneously distributed over the shell.

Take the origin of a spherical polar coordinate system in the center of symmetry of the charge distribution—the position of the point charge, or the center of the spherical shell, respectively. Because of symmetry, E has a radial component only (parallel to the unit vector er). Moreover, this component does not depend on the polar angles,

Take the surface of a sphere of radius r to integrate over (in the case that we are considering a spherical shell r must be larger than the radius of the spherical shell); the surface element is

Then,

where r is the distance of the field-point to the origin. In the case of a point charge we have proved here Coulomb's law from Gauss' law. In the case of a charged spherical shell, we find that the electric field outside the shell is such that it seems that the total charge on the shell is concentrated in the center of the shell. Coulomb's law applies to the charge seemingly concentrated in the center of the shell.

Note

Gauss' law is an integral form of one of the four Maxwell's equations and as such is a common point of departure for development of electrostatic theory. From it Coulomb's law can be derived. Conversely, one can take Coulomb's law as point of departure and derive Gauss' law from it. If one does this, one finds that the inverse-square distance dependence arising in Coulomb's law exactly cancels the dependence on length squared of a surface. In other words, the magnitude of the enveloping surface is arbitrary. Given Qtot, it is irrelevant for Gauss' law how tightly or loosely the surface envelops this charge.

Reference

  1. C. F. Gauss, Allgemeine Lehrsätze in Beziehung auf die im verkehrtem Verhältnisse des Quadrats der Entfernung wirkenden Anziehungs und Abstossungskräfte [General theorems regarding the attractive and repulsive forces that act with inverse ratios of the square of the distance]. Carl Friedrich Gauss, Werke, Königlichen Gesellschaft der Wissenschaften zu Göttingen, Göttingen (1867) Vol. 5, pp. 195-242. This work was first published in: Resultate aus den Beobachtungen des magnetischen Vereins im Jahre 1839 [Results from the observations of the magnetic Society in the year 1839], pp. 1-51. On line