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Transcript
Chapter 23. Gauss’ Law
23.1. What is Physics?
23.2. Flux
23.3. Flux of an Electric Field
23.4. Gauss' Law
23.5. Gauss' Law and Coulomb's Law
23.6. A Charged Isolated Conductor
23.7. Applying Gauss' Law: Cylindrical Symmetry
23.8. Applying Gauss' Law: Planar Symmetry
23.9. Applying Gauss' Law: Spherical Symmetry
What is Physics?
• Gaussian surface is a hypothetical
(any imaginary shape) closed
surface enclosing the charge
distribution.
• Gauss' law relates the electric
fields at points on a (closed)
Gaussian surface to the net
charge enclosed by that surface.
Gaussian surface
Let us divide the surface
into small squares of area
ΔA, each square being small
enough to permit us to
neglect any curvature and
to consider the individual
square to be flat. We
represent each such
element of area with an
area vector
• Magnitude is the area ΔA.
• Direstion is perpendicular
to the Gaussian surface and
directed away from the
interior of the surface.
Flux
The rate of volume flow through the loop is :
Flux of an Electric Field
• The electric field for a surface is
• The electric field for a gaussian
surface is
The electric flux Φ through a
Gaussian surface is proportional to
the net number of electric field lines
passing through that surface.
SI Unit of Electric Flux: N·m2/C
Problem 1
The drawing shows an edge-on view of two
planar surfaces that intersect and are
mutually perpendicular. Surface 1 has an area
of 1.7 m2, while surface 2 has an area of 3.2
m2. The electric field E in the drawing is
uniform and has a magnitude of 250 N/C. Find
the electric flux through (a) surface 1 and (b)
surface 2.
Sample Problem 2
Figure 23-4 shows a Gaussian surface in the form of
a cylinder of radius R immersed in a uniform electric
field E , with the cylinder axis parallel to the field.
What is the flux Φ of the electric field through this
closed surface?
Sample Problem 3
A nonuniform electric field given by
pierces the Gaussian cube shown in Fig. (E is in
newtons per coulomb and x is in meters.) What is the
electric flux through the right face, the left face,
the top face, and the Gaussian surface?
Gauss’ Law
For a point charge:
q
1
E  k 2 ,k 
r
4 0
1
q
q
q
E


2
2
4 0 r
(4 r ) 0 A 0
Gauss’ Law
For charge distribution Q:
The electric flux through a Gaussian surface
times by ε0 ( the permittivity of free space)
is equal to the net charge Q enclosed :
•The net charge qenc is the algebraic sum
of all the enclosed charges.
•Charge outside the surface, no matter how
large or how close it may be, is not included
in the term qenc.
Check Your Understanding
The drawing shows an arrangement of three charges. In
parts (a) and (b) different Gaussian surfaces are
shown. Through which surface, if either, does the
greater electric flux pass?
Sample Problem
Figure 23-7 shows five charged lumps of plastic and an
electrically neutral coin. The cross section of a
Gaussian surface S is indicated. What is the net
electric flux through the surface if q1=q4=3.1 nC,
q2=q5=-5.9 nC, and q3=-3.1 nC?
A Charged Isolated Conductor
• If an excess charge is placed on an
isolated conductor, that amount of
charge will move entirely to the surface
of the conductor. None of the excess
charge will be found within the body of
the conductor.
• For an Isolated Conductor with a Cavity,
There is no net charge on the cavity
walls; all the excess charge remains on
the outer surface of the conductor
The External Electric Field of a Conductor
If σ is the charge per unit area,
according to Gauss' law,
Sample Problem
Figure 23-11a shows a cross section of a spherical
metal shell of inner radius R. A point charge of q is
located at a distance R/2 from the center of the
shell. If the shell is electrically neutral, what are the
(induced) charges on its inner and outer surfaces?
Are those charges uniformly distributed? What is
the field pattern inside and outside the shell?
Applying Gauss' Law: Cylindrical
Symmetry
Figure 23-12 shows a section of
an infinitely long cylindrical
plastic rod with a uniform
positive linear charge density λ.
Applying Gauss' Law: Planar Symmetry
Figure 23-15 shows a portion
of a thin, infinite,
nonconducting sheet with a
uniform (positive) surface
charge density σ
Applying Gauss' Law: Spherical Symmetry
• A shell of uniform charge attracts
or repels a charged particle that is
outside the shell as if all the shell's
charge were concentrated at the
center of the shell.
• If a charged particle is located
inside a shell of uniform charge,
there is no electrostatic force on
the particle from the shell.
Any spherically symmetric charge distribution with
the volume charge density ρ
•For r>R, the charge produces an
electric field on the Gaussian
surface as if the charge were a
point charge located at the center,
•For r<R, the electric field is
Checkpoint
The figure shows two large, parallel, nonconducting
sheets with identical (positive) uniform surface charge
densities, and a sphere with a uniform (positive) volume
charge density. Rank the four numbered points
according to the magnitude of the net electric field
there, greatest first.
Conceptual Questions
(1) Two charges, +q and –q, are inside a Gaussian surface. Since the
net charge inside the Gaussian surface is zero, Gauss’ law states
that the electric flux through the surface is also zero; that is
Φ=0. Does the fact that Φ =0 imply that the electric field E at
any point on the Gaussian surface is also zero? Justify your
answer.
(2) The drawing shows three charges, labeled q1, q2, and q3. A
Gaussian surface is drawn around q1 and q2. (a) Which charges
determine the electric flux through the Gaussian surface? (b)
Which charges produce the electric field at the point P? Justify
your answers.
(3) A charge +q is placed inside a spherical Gaussian
surface. The charge is not located at the center of
the sphere. (a) Can Gauss’ law tell us exactly where
the charge is located inside the sphere? Justify your
answer. (b) Can Gauss’ law tell us about the magnitude
of the electric flux through the Gaussian surface?
Why?