This document describes a lecture on Coulomb's law and electric field intensity. It discusses various charge distributions including line charges, surface charges, and volume charges. It defines the charge densities for these distributions. The document then examines the electric field for continuous volume charge distributions and derives equations for calculating the electric field from line charges, surface charges, and volume charge densities. It provides examples of calculating the total charge within given volumes and the electric field from a line charge.
This document describes a lecture on Coulomb's law and electric field intensity. It discusses various charge distributions including line charges, surface charges, and volume charges. It defines the charge densities for these distributions. The document then examines the electric field for continuous volume charge distributions and derives equations for calculating the electric field from line charges, surface charges, and volume charge densities. It provides examples of calculating the total charge within given volumes and the electric field from a line charge.
This document describes a lecture on Coulomb's law and electric field intensity. It discusses various charge distributions including line charges, surface charges, and volume charges. It defines the charge densities for these distributions. The document then examines the electric field for continuous volume charge distributions and derives equations for calculating the electric field from line charges, surface charges, and volume charge densities. It provides examples of calculating the total charge within given volumes and the electric field from a line charge.
This document describes a lecture on Coulomb's law and electric field intensity. It discusses various charge distributions including line charges, surface charges, and volume charges. It defines the charge densities for these distributions. The document then examines the electric field for continuous volume charge distributions and derives equations for calculating the electric field from line charges, surface charges, and volume charge densities. It provides examples of calculating the total charge within given volumes and the electric field from a line charge.
Notes that: Q L = where (L) is any given line length or circumference S =
V =
L Q
A Q V
where (A) is any given area such as area of circle or sphere
where (V) is any given volume such as volume of sphere
Q
Since, E = K
R2
a R R
So by replacing Q in above equations with line charge density, surface charge density, and volume charge density, we get: = K LL E a R 2 = E
R K sds
E =
a R
R2 K vdv R2
a R R
4- Field Due to Continuous Volume Charge Distribution
C Volume charge density is measured in Coulomb per cubic meter ( 3 ). The total charge m within some finite volume is obtained by integrating throughout that volume as:
Dr. Ahmed Thamer
Q = Vol Q = Vol V dv
Coulomb's Law and Electric Field Intensity
Page 1
Electromagnetic Fields
Coulomb's Law and Electric Field Intensity
Lecture No.4
Example 4.1: Find the total charge inside each of the volumes indicated as: (a) V = 10 ze-0.1x siny; -1 x 2; 0 y 1; 3 z 3.6 (b) V = 4xyz; 0 2; 0 /2; 0 z 3 (c) V = 3 sin cos2/[2r2(r2+1)]; universe R
Solution: (a) Cartesian coordinate:
Q = V dxdydz Q = 10 ze0.1x siny dxdydz 3.6 1 2 Q = 10 [ z=3 z z y=0 siny y x=1 e0.1x x ] z2
Q = 10 [ ]3.6 3 [ 2
e 0.1x
]10 [
0.1
]21 = 36.1 C
(b) Cylindrical coordinate:
Q = V ddz Since, V = 4xyz, we have x= cos; y= sin, and z=z; then, V = 4 z 2 cos sin Hence, Q = 4 z 2 cos sin ddz = 4 z 3 cos sin ddz R
Q=
2 4[=0 3
Q=4
4 [ ]20 4
=0 cos sin z=0 z z]
sin 2 2
(c) Spherical coordinate:
z2
]0 [ ]30 = 36 C 2
Q = 3sin cos 2 /[2r 2 (r 2 + 1)] r2 sinrd
Q=
Q= Q= Q=
Hint:
x2+ a2
1 a
3 2 3 2 3
r =0 sin2 =0 cos2 ] r 2 +1 1
[ tan1 (r)] 0 * [
* * * * * 2
2 2 3()4 8
[r=0
= 36.5 C
sin 2 ]0 2
* [ + 2
sin 2 2 ]0 2
tan1 ( ) + c 1
2 2 3 = 2 2 1/2 + c (x + a ) (x + a )
2 2 3/2 = 2 2 2 1/2 + c (x + a ) a (x + a ) 1
sin 2x = (1-cos2x) P
2 1
cos x = (1+cos2x) 2 sin2x = 2 sinx cosx Dr. Ahmed Thamer
Coulomb's Law and Electric Field Intensity
Page 2
Electromagnetic Fields
Coulomb's Law and Electric Field Intensity
Lecture No.4
5- Field of a Line Charge
Let us assume a straight line charge extending a long z-axis in cylindrical coordinate at any system from - to as shown in Fig. 4.1. We desire the electric field intensity E and every point resulting from a uniform line charge density L .
Figure 4.1
Symmetry should be always considered first in order to determine two specific factors: With which coordinates the field does not vary. Which components of the field are not present. Now, which components are present? Each incremental length of line charge acts as a point charge and produces an incremental contribution to the electric field intensity which is directed away from the bit of charge. No element of charge produce as component of electric intensity, (E is zero). However, each element does produce an Er and Ez component, but the contribution to Ez by elements of charge which are equal distance above and below the point at which we are determining the field will cancel. We therefore have found that we have only an (E )component and it is varies only with (r), now to find this component: We choose a point P(0, y,0) on the y-axis at which to determine the field. This is a perfectly general point in view of the lack of variation of the field with and z we have: E =
a R
4o R 2
dQ = L dL = L dz' = k Q dE 2 R
a R = k
r= ya y = a r = z' a z R
L R2
a R R
Dr. Ahmed Thamer
Coulomb's Law and Electric Field Intensity
Page 3
Electromagnetic Fields
Coulomb's Law and Electric Field Intensity
Lecture No.4
=r- r= a - z' a z R = 2 + z'2 R R
a z az
a R =
2 + z 2 L (a z az)
= k dE
3/2
( 2 + z 2)
z =0, then, dE = k Due to symmetry, dE
L a
3/2
( 2 + z 2)
Since only the E component is present, we may simplify: dE = k
For infinite line charge (i.e L );
L
E =
4o
E = R
E = R
Or, E =
4o L
2o L
2o
3/2
( 2 + z 2)
4o
1/2
2( 2 + z 2)
3/2
( 2 + z 2)
. We might have used the angle as our
There are many other ways of obtainingE variable of integration, from Fig.4.1 z'= cot and dz' = - csc2 d. Since R= csc, our integral becomes, simply, L
dE = R
E = R
E = R
= Or, E
sin= -
4o R 2 0
- L sin
4o L
2o L
2o
L sin 4o
= -
4o
[cos]0
As an example, let us consider an infinite line charge parallel to the z-axis at x=6, y=8, at the general field point P(x, y, z). We replace in above equation Fig.4.2. We wish to find E by the radial distance between the line charge and point P, R=(x-6)2 + (y-8)2, and let a be aR . Thus,
E =
2o (x6)2 + (y8)2
Where aR = E =
Dr. Ahmed Thamer
(x6)ax + (8)ay
aR
(x6)2 + (y8)2
2o
(x6)ax + (8)ay (x6)2 + (y8)2
) Figure 4.2
Coulomb's Law and Electric Field Intensity
Page 4
Electromagnetic Fields
Coulomb's Law and Electric Field Intensity
Lecture No.4
Example 4.2: A uniform line charge, L = 25nC/m, lies on the line x=-3, z=4, in free space. in Cartesian components at: (a) the origin (b) point P (2, 15, 3) Find E (c) Q ( =4, =60o, z=2) Solution: L (a) L in the direction of y, by replace and a in E = a by R and aR , R
respectively, then: L
= E
aR
2o R
R=3ax 4az =32 + (-4)2=25=5 R aR =
3ax 4az 5
R=5ax az =52 + (-1)2=26 R 26
-X
(0, 0, 0)
(b) P(2, 15, 3)
5ax az
(-3, 0, 4)
2510 3a 4a = E ( x z) 12 5 5 23.148.85410 = 53.9ax 71.9az (V/m) E
aR =
2o
(-3,15, 4)
(2,15, 3)
2510 5a a E = ( x z) 12 26 26 23.148.85410 E= 86.4ax 17.3az (V/m)
Another basic charge configuration is the infinite sheet of charge having a uniform density of S C/m2. Let us place a sheet of charge in y-z plane and again consider symmetry as shown in Fig. 4.3. We see first that the field cannot vary with y or with z. Hence only E x is present, and this component is a function of(x) alone. Let us use the field of the infinite line charge by dividing infinite sheet into differential-width strips. Once such strip is shown in Fig. 4.3, the line charge density, or charge per unit length, is ( L = S dy', and the distance from this line charge to our general point P on the x-axis is R=x2 + y'2.
Figure 4.3
The contribution to E x at point P from this differential-width strip is:
= L aR (line charge), then; We have E 2o R S y
dE x =
2o x2 + y 2
cos =
Adding the effects of all the strips,
E x = Ex =
Ex =
2o S
2o
S x y
2o (x2 + y 2)
S y
2o x2 + y 2
2o
x y
.(
x2 + y 2
)=
S x y
2o (x2 + y 2) y
S [tan1 ( )] (x2 + y 2) = 2 x o
If the point P were chosen on the negative x-axis, then,
Ex
Dr. Ahmed Thamer
Coulomb's Law and Electric Field Intensity
Page 6
Electromagnetic Fields
Coulomb's Law and Electric Field Intensity
Lecture No.4
Example 4.3: Three uniform sheets of charge are located in free space as follow: at the points: 2C/m2 at x=-3, -5 C/m2 at x=1, and 4 C/m2 at x=5. Determine E (a) (0, 0, 0) (b) (2.5, -1.6, 4.7) (c) (8, -2, -5) (d) (-3.1, 0, 3.1) S1= 2C/m2
-X
X= - 3.1 X= - 3
S2= - 5/ S3= /
X= 1
Y X= 0
X= 2.5 X= 5
X= 8
Solution: (a) Since the position of plates in x-axis,
depended on (x) in each point. we determine E Point (0, 0, 0), and normal on plates is ( ) X
S1 + E S2 + E S3 = T = E E R
S 1
2o 510 6
S 2
2o
(- ) +
S 3
2o
(- )
410 T = 210 12 + (- ) + (- ) E 12 28.8510 28.8510 28.8510 12 E T = 169.4 (KV/m) R
(b) Point (2.5, -1.6, 4.7)
X 6
E T = 210 12 + 510 12 28.8510 28.8510 T = - 395 (KV/m) E R
Dr. Ahmed Thamer
410 6
28.8510 12
(- )
Coulomb's Law and Electric Field Intensity
Page 7
Electromagnetic Fields
Coulomb's Law and Electric Field Intensity
Lecture No.4
(c) Point (8, -2, -5)
X 6
E T = 210 12 + 510 12 28.8510 28.8510 E T = 56.5 (KV/m) R
410 6
28.8510 12
(d) Point (-3.1, 0, 3.1)
X 6
T = 210 12 (- ) + 510 12 (- ) + 410 12 (- )
E 28.8510 28.8510 28.8510 E T = - 56.5 (KV/m) R
Example 4.4: Two infinite uniform sheets of charge, each with charge density S , are located at everywhere. x= 1 as shown. Determine E R
Solution: a) x<-1
E = E 1 + E 2 = R
E =
b) -1<x<1
E = E 1 + E 2 = S
E =
(- ) +
2o
(- )
-X
X= - 1
c) x>1
2o
(V/m)
1 + E 2 = = E E R
2o S
2o
(V/m)
(- ) +
2o
2o
=0
X= 1
4- Streamlines and Sketches of Fields
is represented by lines from the charge which are everywhere tangent The direction of E to E. These lines are usually called streamlines, although other terms such as flux lines and direction lines are also used. In the case of the two-dimensional fields in Cartesian coordinates, the equation of the streamline is obtained by solving the differential equation as: Ey Ex
Dr. Ahmed Thamer
y x
Coulomb's Law and Electric Field Intensity
Page 8
Electromagnetic Fields
= E
Let
x2 + y2
ax +
Coulomb's Law and Electric Field Intensity
x2 + y2
ay
Thus we form the differential equation,
Therefore, lny = lnx + C 1
or,
y x
Ey Ex
y x
or,
lny = lnx + lnC
y y
Lecture No.4 x
From which the equations of the streamlines are obtained, y = Cx
If we want to find the equation of one particular streamline, say that one passing through P(-2, 7, 10). Here, 7 = C(-2), and C = - 3.5, so that: y = - 3.5 x Each streamline is associated with a specific value of C. The equations of streamlines may also be obtained directly in cylindrical or spherical coordinates as: Cylindrical coordinates: Spherical coordinates:
E Er E Ey
Cartesian coordinates:
Ex
Home Work:
= = =
r y x
Q 4.1: Calculate the total charge within each of the indicated volumes: 1 (a) 0.1 |x| , |y| , |z| 0.2 ; V = 3 3 3 R
x y z
(b) 0 0.1 , 0 , 2 4 ; V = 2 z2 sin0.6
(c) Universe; V = R
e 2r
r2
Q 4.2: Infinite uniform line charges of 5nC/m lie along the (positive and negative) x and y axes in free space. Find E at: (a) P A (0, 0, 4); (b) P B (0, 3, 4) Q 4.3: Three infinite uniform sheets of charge are located in free space as follows: 3nC/m2 at at the points: (a) P A (2, 5, -5); z = - 4, 6nC/m2 at z = 1, and -8nC/m2 at z = 4. Find E (c) P C (-1, -5, 2); (d) P D (-2, 4, 5) (b) P B (4, 2, -3);
Q 4.4: Find the equation of that streamline that passes through the point P(1, 4, -2) in the field: 8x 4x 2 ax + 2 ay (b) E = 2e5x[y(5x+1) ax + x ay ] (a) E = y
Q 4.5: The region in which 4 r 5, 0 25o, and 0.9 1.1, contains the volume 1 charge density V = 10(r-4)(r-5) sinsin . Outside that region V = 0. Find the charge 2 within the region. R
