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CHAPTER 7MAGNETOSTATIC FIELDS
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LECTURE SYLLABUS
•
INTRODUCTION• BIOT-SAVART’S LAW
• AMPERE’S CIRCUIT LAW-MAXWELL’SEQUATION
• APPLICATIONS OF AMPERE’S LAW
• MAGNETIC FLUX DENSITY-MAXWELL’SEQUATION
• MAXWELL’S EQUATION FOR STATIC FIELDS
• MAGNETIC SCALAR & VECTOR POTENTIALS• DERIVATION OF BIOT-SAVART’S LAW &
AMPERE’S LAW
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7.1 INTRODUCTION
• Static magnetic fields are characterized by H and B such as E and D
on electrostatic fields.
• There are similarities and dissimilarities between electric and
magnetic fields. Example the relation between H and B are H = B
and relation between E and D are related according to D = E. Table
7.1 further shows the analogy between electric and magnetic fieldquantities.
• Missing link - thanks to Oersted (1820).
• An electrostatic field is produced by static or stationary charges. If
the charges are moving with constant velocity, a static magnetic field
is produced. A magnetostatic field is produced by a constant currentflow.
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• This current flow may be due to magnetization as in
permanent magnets, electron-beam current as in vacuum
tubes, or conduction currents as in current-carrying wires.
• Another products which involving in magnetostatic are motor,
transformers, microphones, compasses and so on.
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7.1 INTRODUCTION
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Table 7.1
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7.2 BIOT-SAVART’S LAW
• Two major laws that governing magnetostatic fields are Biot-Savart’s law
and Ampere’s circuit law.
• Biot-Savart's law states that the differential magnetic field intensity d H produced at a point P (Figure 7.1) by the differential current element, I dl is
proportional to the product I dl and the sine of the angle between the
element and the line joining P to the element, and is inversely proportional
to the square of the distance R between P and the element.
• That is, dH I dl sin or dH = kI dl sin (7.1) R2 R2
k constant of proportionality. In SI unit k = 1/4, so eq. (7.1) becomes,
dH = I dl sin (7.2)
4 R2
If written in vector form as,
d H = I d l a R = I d l R (7.3)
4 R2 4 R3
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Figure 7.1
Right hand rule Right handed screw rule
Figure 7.3
Figure 7.2
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CONCEPT QUESTION #1
The magnetic field at point P
points towards the:
a) +x direction
b) -x direction
c) +y direction
d) -y directione) +z direction
f) -z direction
g) field is zero (no direction)
8
x
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CONCEPT QUESTION #2
The magnetic field at point P
is equal to the field of:
a) a semicircle
b) a semicircle + field along
the straight wire
c) a semicircle – field alongthe straight wire
d) field is zero (no direction)
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• Thus the direction of d H can be determined by the right-hand rule
[Figure 7.2(a)], or by the right-handed-screw rule [Figure 7.2(b)].
•
It is customary to represent the direction of the magnetic fieldintensity H (or current I ) by a small circle with a dot or cross sign
depending on whether H (or I ) is out of or into the page (Figure 7.3).
• Similar to charges, there are three different current distributions
which are: line current, surface current, and volume current (Figure7.4).
• If K defined as the surface current density (A/m) and J as the volume
current density (A/m2), the source elements are related as,
I d l = K d S = J dv (7.4)• Thus, the Biot-Savart's law becomes,
H = I d l a R (line current) (7.5)
4 R2
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Figure 7.4 Current distributions: (a) line current, (b) surface current, (c)
volume current.
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H = K d S a R (surface current) (7.6)
4 R2
H = J dv a R (volume current) (7.7)
4 R2
• As an example, to determine the field due to a straight current-
carrying filamentary conductor or finite length AB as in Figure 7.5.
• Assume that the conductor is along the z -axis, with its upper and
lower ends, respectively, subtending angles 1 and 2 at P , the pointat which H is to be determined.
• If the contribution d H at P due to an element d l at (0, 0, z),
d H = I d l R (7.8)
4 R3
But d l = dz a z and R = a - z a z , so
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Figure 7.5
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d l R = dz aΦ (7.9)
Hence,
H = I dz aΦ (7.10)
4[ 2 + z 2]3/2
Finally,
H = 1 (cos 2 – cos 1) aΦ (7.11)
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• When the conductor is semi-infinite (with respect to P ) so that point A isnow at O (origin) while B is at (0, 0, ); 1 = 900, 2 = 00, and becomes
H = ( I / 4 ) aΦ (7.12)
• When the conductor is infinite in length (with respect to P ) so that point A
is at (0, 0,- ) while B is at (0, 0, ); 1 = 1800, 2 = 00, and becomes
H = ( I / 2 ) aΦ (7.13)
• A simple approach is to determine unit vector aΦ from,
aΦ = al a (7.14)
Where; al : unit vector along line current
a : unit vector along perpendicular line
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Example 7.1
The conducting triangular loop in Figure 7.6 (a)carries a current of 10A. Find H at (0, 0, 5) due to
side 1 of the loop.
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Solution:
Observe that 1, 2 and are assigned in the same manner as
in Figure 7.5 on which eq. 7.12 is based:
cos 1 = cos 90 = 0, , = 5
According to eq. 7.15 and , so
Hence,
= -59.1 a y mA/m
29
2cos 2
xaa z
aa
y z x aaaa
y
I aaH
0
29
2
54
10coscos
4121
aΦ = al a
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Example 7.2
Find H at (-3, 4, 0) due to the current filamentshown in Figure 7.7 (a)
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Solution:
Let H = H1 + H2 where H1 and H2 are the contributions to the
magnetic field intensity at P (-3, 4, 0) due to the portions of thefilament along x and z , respectively.
At P (-3, 4, 0), ρ = (9 + 16)1/2 = 5, 1 = 90, 2 = 0, and a is
obtained as a unit vector along the circular path through P on
plane z as in Figure 7.7(b).
The direction of a is determined using the right-handed-screw
rule or the right-hand rule. From the geometry in Fig. 7.7(b)
aH 122 coscos4
I
y x y x aaaaa5
3
5
4cossin
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Alternatively, we can determine a from eq. 7.14. At point, al
and a ρ are as illustrated in Fig 7.7(a) for H2. Hence,
As obtained before. Thus
= 38.2 a x + 28.65 a y mA/m
It should be noted that in this case a happens to be the negative
of the regular a of cylindrical coordinates. H2 could have also
been obtained in cylindrical coordinates as
= -47.75 a mA/m
y x y x z aaaaaa53
54
54
53
5
3401
54
32
y x aaH
aH 01
54
32
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Similarly, for H1 at P , ρ = 4, 1 = 0 = 3/5, and a = a z or a =a
lx a
ρ= a x x a y = a z . Hence,
= 23.88 a z mA/m
Thus
H = H1 + H2 = 38.2 a x + 28.65 a y + 23.88 a z mA/m
Or
H = -47.75 a + 23.88 a z mA/m
z aH
5
31
44
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Brain Teaser
21
stand
5432 _ ?
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7.3 AMPERE’S CIRCUIT LAW – 3rd MAXWELL’S
EQUATION
• Ampere’s circuit law states that the line integral of H around a closed path
is the same as the net current I enc enclosed by the path.• In other words, the circulation of H equals I enc , that is:
H · d l = I enc (7.15)
• Ampere’s law is similar to Gauss’s law and easily applied to determine H
when the current distribution is symmetrical. Ampere’s law is a special case
of Biot-Savart's law. The former may be derived from the latter.
• By applying Stoke’s theorem to the left-hand side of eq. (7.15), obtained
I enc = L H · d l = S ( H) · d S (7.16)
But, I enc = S J · d S (7.17)
Comparing the surface integrals in eqs. (7.16) and (7.17), clearly reveals that H = J (7.18)
This is the 3rd Maxwell’s equation to be derived, that is a magnetostatic field
is not conservative.
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A. I nfi nite L ine Current
• Consider an infinitely long filamentary current I along the z -axis[Figure 7.10].
• To determine H at an observation point P , allow a closed path to
pass through P . This path on which Ampere’s law is to be
applied, is known as an Amperian path.
• By chosen a concentric circle as the Amperian path shows that
H is constant provided is constant. Since this path encloses the
whole current I , according to Ampere’s law,
I = H a · d a
= H d = H · 2 (7.18)
or
H = I a (7.19)
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7.4 APPLICATIONS OF AMPERE’S LAW
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Figure 7.10
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B. I nf ini te Sheet of Current
• Consider an infinite current sheet z = 0 plane. If the sheet has a
uniform current density K = K y a y A/m as shown in Figure 7.11.
• Applying Ampere’s law to the rectangular closed path gives,
H · d l = I enc = K yb (7.20)
• To evaluate the integral H needs to regard the infinite sheet ascomprising of filaments; d H above or below the sheet due to a pair
of filamentary current can be found by using eqs. (7.13) and (7.14).
• As evident in Figure 7.11(b), the resultant d H has only an x-
component and H on one side of the sheet is the negative of that on
the other side.
H = ( I / 2 ) a (7.13)
aΦ = al a (7.14)
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Figure 7.11
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That is: H = H o a x z > 0 (7.21)
- H o a x z < 0
• Evaluating the line integral of H along the closed path in Figure 7.11(a)
gives,
H · d l = ( + + + ) H · d l = 2 H ob (7.22)
• Substituting H o in eq. (7.21), givesH = 1/2 K y a x z > 0 (7.23)
-1/2 K y a x z < 0
In general, for an infinite sheet of current density K A/m,
H = 1 K an (7.24)
2
where an is unit normal vector directed from the current sheet to the point of
interest.
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C. I nf in itely Long Coaxial Transmission Line
• Consider an infinitely long transmission consisting of two concentric
cylinder having their axes along the z -axis [Figure 7.12].
• The inner conductor has radius a and carries current I , while the outer
conductor has inner radius b and the thickness t and carries return current - I .
Need to determined H everywhere, assuming that current is uniformly
distributed in both conductors.
•
Since the current distribution is symmetrical, apply Ampere’
s law along theAmperian path for each of the four possible regions: 0 a, a b,
b b + t , and b + t .
• For region 0 a, applied Ampere’s law to path L1 giving,
L1 H · d l = I enc = J · d S (7.25)
So that, J = I a z , d S = d d a z (7.26)
a2
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Figure 7.12
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I enc = J · d S = I d d = I 2 = I 2 (7.27)
a2 a2 a2
Hence eq. (7.26) becomes,
H dl = H 2 = I 2
/a2
or H = I
2a2
• For region a b, used path L2,
L2 H · d l = I enc = I
H 2 = I or H = I / 2 (7.28)
since the whole current I is enclosed by L2.
• For region b b + t , used path L3, getting
L3 H · d l = H · 2 = I enc (7.29)
where I enc = I + J · d S
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• In this case J is the current density of the outer conductor and isalong - a z , that is,
J = - I a z
[(b + t)2 - b2]thus, I enc = I 1 - 2 - b2
t 2 + 2bt
Substituting this in eq. (7.29), we have,
H = I 1 - 2
- b2
(7.30)2 t 2 + 2bt
• For region b + t , used path L4, getting
H · d l = I - I = 0
or
H = 0 (7.31)
• List all the equations together – Refer to Eq. 6.29, Pg. 246
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7.5 MAGNETIC FLUX DENSITY – 4rd MAXWELL’S
EQUATION
• Magnetic flux density B is similar to the electric flux density D. As D = oE
in free space, the B is related to the magnetic field intensity H according toB = oH (7.32)
where o is a constant known as the permeability of free space. Unit H/m
and has the value of,
o = 4 10-7 H/m (7.33)
• The magnetic flux through a surface S is given by,
= S B · d S (7.34)
where the magnetic flux is in webers (Wb) and the magnetic flux density B
is Wb/m2.
• A magnetic flux line is a path to which B is tangential at every point on the
line. For example, the magnetic flux lines due to a straight line long wire are
shown in Figure 7.16.
• The direction of B is taken as that indicated as “north” by the needle of the
magnetic compass.
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Figure 7.16
Figure 7.17 Flux leaving a closed surface due to (a) isolated electric charge, and (b)
magnetic charge,
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• Notice that each flux line is closed and has no beginning or end.
Though Figure 7.16 is for a straight, current-carrying conductor, it is
generally true that magnetic flux lines are closed and do not cross each
other regardless of the current distribution.• Thus it is possible to have an isolated electric charge as shown in Figure
7.17(a), which also reveals that electric flux lines are not necessarily
closed.
• Unlike electric flux lines, magnetic flux lines always close uponthemselves as in Figure 7.17(b). This is because it is not possible to
have isolated magnetic poles (or magnetic charges).
• For example, if desired to have an isolated magnetic pole by dividing a
magnetic bar successively into two, and ends up with pieces each
having north and south poles as illustrated in Figure 7.18.
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Figure 7.18 Successive division of a bar magnet results in pieces with north and
south poles, showing that magnetic poles cannot be isolated.
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• An isolated magnetic charge does not exist.
• Thus the total flux through a closed surface in a magnetic field must be
zero, that is,
B · d S = 0 (7.35)
• This equation is referred to as the law of conservative of magnetic
flux or Gauss ’ s law for magnetostatic field. Although the
magnetostatic field is not conservative, magnetic flux is conserved.
• By applying the divergence theorem to eq. (7.35), obtained,
S B · d S = v · B dv = 0
or · B = 0 (7.36)
• This equation is the fourth Maxwell’s equation to be derived where eq.
(7.35) or (7.36) shows that magnetostatic field have no sources or sinks.
Eq. (7.36) suggests that magnetic field lines are always continuous.
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7.6 MAXWELL’S EQUATION FOR STATIC
FIELDS
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7.7 MAGNETIC SCALAR & VECTOR POTENTIALS
• The magnetic potential could be scalar V m or vector A. Todefine V
mand A involves recalling two important identities:
(V ) = 0
· ( A) = 0
which must always hold for any scalar field V and vector field A.
• Definition of magnetic scalar potential V m (A) as related to H
according to,
H = - V m if J = 0 (7.37)
• Combining eqs. (7.37) and (7.18) gives,
J = H = (- V m) = 0 (7.38)
since V m must satisfy the condition in identity above, thus V m isonly defined in a region where J = 0. V m also satisfies Laplace'sequation, hence
2V m = 0 (J = 0) (7.39)
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• Know that for a magnetostatic field, · B = 0, then can define the
vector magnetic potential A (Wb/m) such as
B = A (7.40)
• Just as defined, V = dQ
4 r
then can defined these equations,
A = o I d l (line current) (7.41)
4 R
A = oK dS (surface current) (7.42)
4 R
A = oJ dv (volume current) (7.43)
4 R
L
L
S
v
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by substituting eq. (7.40) into eq. (7.34) and applying
Stoke’s theorem, obtained
= S B · d S =
S ( A) · d S =
L A · d l
or, = L A · d l (7.44)
• Thus the magnetic flux through a given area can be found by
using either eq. (7.34) or (7.44).
• Also, the magnetic field can be determined by using either V m or A. Where V m can be used only in a source-free region.
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Example 7.7
Given the magnetic vector potential A = - 2/4 a z
Wb/m, calculate the total magnetic flux crossing the
surface = /2, 1 2 m, 0 z 5m.
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Solution:
We can solve this problem in two different ways: using eq. 7.32
or eq. 7.51
Method 1:
, d S = d ρ d z a
Hence,
= 3.75 Wb
aaAB
2
z A
4
155
4
1
2
1 5
0
2
1
1
2
2 z dz d d
SB
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Method 2:
We use
where L is the path bounding surface S ; 1, 2, 3 and 4 are,
respectively, the evaluations of A · d l along the segments of L
labeled 1 to 4 in figure above. Since A has only a z -component,
1 = 0 = 3
That is,
= 3.75 Wb
4321 Ld lA
5
0
5
0
22
42 214
1dz dz
4
15541
4
1
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• Both Biot-Savart's law and Ampere’s law may be derived by using the
concept of magnetic vector potential, which is
A = ( · A) - 2A (7.45)
• Thus the Biot-Savart's law becomes,
B = oI d l aR (7.46)
4 R 2
• Using the identity in eq. (7.45) with eq. (7.40), obtained
B = ( · A) - 2A (7.45)
on magnetostatic field, · A = 0. Upon replacing B with oH becomes,
2A = - o H or 2A = - oJ (7.47)
is called vector Poisson’s equation.
7.8 DERIVATION OF BIOT-SAVART’S LAW &
AMPERE’S LAW (from potential of vector A)
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• For scalar Poisson’s equations, in coordinates Cartesian
may be decomposed into 3 scalar equations:
2 A x = - oJ x ;
2 Ay = - oJ y ;
2 Az = - oJ z (7.48)
• It can also be shown that Ampere’s circuit law is consistent
with our definition of the magnetic vector potential by using
the vector identity related to A.