electric fields 電場 (chap. 22) the coulomb’s law tells us how a charge interact with other...
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Electric fields 電場 (chap. 22)
• The Coulomb’s law tells us how a charge interact with other charged particles, but how does the charge “know” of the presence of the other particles, and even can tell weather the second particle is positively or negatively charged?
• The concept of electric field is introduced to explain this question.
The positive test charge does not see the negative charge, instead it “feels” the electric field at its location produced by the negative charge and responds to it.
The vector field at point P created by the charged object can be defined by the force acting on a tiny positive test charge q0:
The direction of the force defines the direction of the field.
Electric field lines:
• Michael Faraday introduced the idea of electric fields in the 19th century and thought of the space around a charged body as filled with lines of forces.
• it is useful tool to visualize the fields around charges.
• the direction of the field lines indicates the direction of the electric force acting on a positive test charge.
• the density of the lines is proportional to the magnitude of the field E.
The field strength is related to the number of lines that cross unit area perpendicular to the field.
Since the electrostatic force is
Then the electric field strength is:
+ -
field lines
What is the field produced by a group of charges?
From the superposition of electrostatic force, one can easily deduce the superposition law for the electric fields.
Electric dipole電偶極
• In nature, many molecules carry no net charge, but there are still finite electric fields around the molecules.
• it is because the charge are not uniformly distributed, the simplest form of charge distribution is a electric dipole, as shown in the figure.
• one can calculate the electric field along the z-axis as follows:
Rewrite the electric field in the following form:
Because we are usually interested in the case where z>>d, therefore we can use an approximation to simplify E:
Throw away higher order terms of d/z,
Or with p=qd (electric dipole moment),
Note
• the dipole electric field reduces as 1/r3, instead of 1/r of a single charge.
• although we only calculate the fields along z-axis, it turns out that this also applies to all direction.
• p is the basic property of an electric dipole, but not q or d. Only the product qd is important.
E
E
p
Electric field due to a line charge
• we now consider charges uniformly distributed on a ring, rather than just a few charges.
• again we use the superposition principle of electric fields, just as what we have done on electric dipoles.
• assume the ring has a linear charge density λ.
• then for a small line element ds, the charge is
So it produces a field at point P of:
Or rewrite as
• Here we only consider the field along z-axis, dEcosθ, because any fields perpendicular to z direction will be cancelled out at the end.
• since
Sum over all fields produced by other elements on the ring:
An infinite long line charge
204 r
dldE
tan and cos
RlR
r
dRdl 2sec
R
ddE
04
120
00
sinsin4
sin4
cos4
2
1
2
1
R
Rd
RE
For an infinite line,
2/21
RE
04
2
A point charge in an electric field
By the definition of electric field, a point charge will experience a force equal to:
The motion of a point charge can now be described by Newton’s law.
Robert A. Millikan, in 1909, made use of this equation to discover that charge is quantized and he was even able to find the value of fundamental charge e=1.6x10-19C.
The electric field between the plates are adjusted so that the oil drop doesn’t move:
Emgq
mgqE
/
He found that q=ne, always a multiple of a fundamental charge e.
mm66.0
2
1
2
12
2
xv
L
m
QEaty
m
QEa
maQEF
Dipole in an electric field
• The response of an electric dipole in an electric field is different from a charge in an electric field.
• Since a dipole has no net charge, so the net force acting on it must be zero.
• however, each charge in the dipole does experience forces from the field.
• the forces are equal in magnitude but opposite in direction, and so there is net torque
sinFd dF
sin
sin
pE
qEd
Or in vector form
Ep
p is the dipole moment 偶極矩
Therefore, a dipole in an uniform electric field experiences a torque that is proportional to the dipole moment, and does not depends on any detail of the dipole.
Ep
Potential energy
Under the effect of the field, the dipole will now oscillates back and forth, just like a pendulum under the effect of gravitation field.
The motion of the dipole of cause requires energy. The work done on dipole by the torque is dW
Similar to gravitation potential, we can define a electric potential energy of the dipole in an electric field :
In the vector form, the potential energy is simply a dot product of the dipole moment and the field.
The potential energy is the lowest when the angle = 0 (equilibrium position) and has the largest values when the angle = 180°.
If there is energy loss to the surroundings, the oscillation will die out gradually unless energy is pumped in continuously from the field (an oscillating field).
This is essentially the principle of a microwave oven.
• Water molecule has large dipole moment of 6.2x10-30Cm.
• the dipoles vibrate in response to the field and generate thermal energy in the surrounding medium
• materials such as paper and glass, which has no dipoles, do not become warm
• The large dipole moment of water molecule attracts Na and Cl ions and breaks the ionic bond between these ions.
• Therefore, salt dissolves easily in water.
Note: A dipole in an uniform field experiences no net force, but it does in a non-uniform field.
F+>F-
Induced dipole
Charges in the comb produce a non-uniform field
)2/(4
22
0 a
eE
Ep (a) τ=0
(b) τ=pE
(c) τ=0
0
)'(4
'
)(4 2/3220
2/3220
RD
DQ
RD
QDE
the field produced by the rings is
Q
QRD
RDQ
2/3
2/3
22
22
5
13
''
15363 1087.8)8.9()106.0(3
4)1000(
3
4 grmg(a)
(b)
e
q
mgqE
120
109.1462/1087.8 1715
)90cos()90cos( if
ifif
pE
EpEpUU
電四極