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Ch: 1 Vector Analysis
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1)
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Define: 1) Vector, 2)
Scalar, 3) Unit Vector, 4) Position Vector, 5) Scalar projection, 6) Vector
Projection.
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2)
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Explain dot product and cross product of two vectors.
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3)
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Explain unit vectors of Cartesian, Cylindrical and Spherical co-ordinate systems.
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4)
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Find expression for
different length, area and volume for cylindrical system.
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5)
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Given the point
A(x=5,y=4,z=3) and B (r=6, θ=450 Φ=100) find : 1)The spherical
coordinate A , 2) The Cartesian coordinate of B, 3) The Distance from A to B.
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6)
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Example of
different co-ordinate conversation system.
Given
points A( x = 5, y = 1, z = -4) and B(ρ= 3, Φ = -30, z = 5), find a unit
vector in cylindrical ordinates at
point B directed towards point A.
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7)
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Obtain the spherical
co-ordinates of 2 āx+3 āy+4 āz at the point P(x= 4, y =1, z = 3)
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Ch : 2 Electrostatic
Field in free Space
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Ø Coulomb’s
law and Electric field intensity
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8)
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Describe coulomb’s
law and Electric field intensity.
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9)
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Define electric field intensity. Obtain the expression for the electric
field intensity at a
point which is at a distance of R
from a point charge Q.
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10)
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Derive expression of electric field intensity due to a uniform line charge over
z-axis
Having a
charge density of C/m.
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11)
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The
finite sheet 0 ≤ x≤ 1, 0≤y≤1 on the z = 0 plane has a charge density ρs =
xy (x2 + y2 + 25)^3/2 nC/m2. Find: 1) The total charge on the
sheet, 2) The electric field at (0, 0, 5),
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12)
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Derive the expression
for total electric field intensity due to infinite surface charge
distribution in free space.
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13)
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Find
Ē at the origin if the following charge distributions are present in free
space : a) point charge 12 nC at P (2,0,6), b) uniform line charge density
3nC/m at x = - 2, y = 3, c) uniform surface charge density 0.2 nC/m2 at x =
2.
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Ø Electric
flux density, the Gauss’s law and Divergence
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14)
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State and prove the
Gauss’s law. Also state the conditions to be satisfied by the special
Gaussian surfaces.
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15)
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Application of
gauss’s law-To find electric flux density due to a uniform line charge.
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16)
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Define
divergence and its physical significance with example.
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17)
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D=2y2z2
āx +3xy2z2 āy +2xyz āz pc/m2in free space.
Find (a) Total flux passing through the surface x=2, 0 ≤
y ≤ 4, 0 ≤ z ≤ 3in a direction
away from the origin , (b) The total charge contained in incremental sphere
of a radius 1µm cantered at p (5,5,5)
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18)
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Explain Gauss’s law
applied to differential volume element with usual expression.
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Ø Energy and
Potential
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19)
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Explain potential and
potential gradient. Derive relationship between potential and electric field
intensity.
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20)
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Explain electrical
dipole. Also derive expression of E due to an electric dipole.
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21)
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An
electrical dipole located at the origin in free space has a moment
P
= 2 āx+3 āy+4 āz nC. Find (A) find V at PA (1,2,3).
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22)
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Write short note:
Electrostatic boundary conditions between perfect dielectrics.
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23)
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Given the potential field,V= 2x2+3zy2,
and a point P(2, 5, 1), find following at point P: (1) the potential V, (2)
the electric field electric flux density D, and (5) the volume charge density
.
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Ch : 3 Electrical Field in material Space and Boundary Condition
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Ø Current, Conductor
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24)
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Derive
the relation between I and J and explain the continuity equation of steady
electric current in integral form and point form.
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Ø Dielectrics
and Capacitance
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25)
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Write
short note: Electrostatic boundary conditions between perfect dielectrics.
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Ø Poisson’s
and Laplace’s equation.
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26)
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Derive
Poisson’s and Laplace’s equation.
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Ch 4 : Steady Magnetic Field
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27)
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State
and explain Biot-Savart’s law.
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28)
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Write
short note on Stoke’s theorem.
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Ch : 5 Magnetic Forces and Materials and Inductance
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29)
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State
and Explain Lorentz force equation on charge particle. Also explain concept
of magnetic torque.
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30)
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Write short-note on ‘ magnetic
materials’
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31)
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State
and Explain Ampere circuital law.
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Ch : 6 Time Varying Fields and Maxwell’s Equations
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32)
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State
Maxwell’s equations in point form and explain physical significance of the
equations.
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33)
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Write
and explain differential and integral forms of Maxwell’s equations.
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Ch : 7 Analytical and Numerical techniques
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34)
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Explain
briefly finite element method. Also state the advantages and disadvantages of
finite element method.
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35)
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Write
a short note on advantages and applications of numerical techniques in
engineering.
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Tuesday, 7 April 2015
Q-Bank_All Chapter_TOE-160906_6th Electrical
Q-Bank_All Chapter_FT-2140909_4th Electrical
|
Ch:
1 Vector Analysis
|
|
|
1)
|
Define: 1) Vector, 2)
Scalar, 3) Unit Vector, 4) Position Vector, 5) Scalar projection, 6) Vector
Projection.
|
|
2)
|
Explain dot product and cross product of two vectors.
|
|
3)
|
Explain unit vectors of Cartesian, Cylindrical and Spherical co-ordinate systems.
|
|
4)
|
Find expression for
different length, area and volume for cylindrical system.
|
|
5)
|
Given
the point A(x=5,y=4,z=3) and B (r=6, θ=450
Φ=100)
find : 1)The spherical coordinate A , 2) The Cartesian coordinate of B, 3)
The Distance from A to B.
|
|
6)
|
Example of
different co-ordinate conversation system.
Given points A( x =
5, y = 1, z = -4) and B(ρ= 3, Φ = -30, z = 5), find a unit vector in
cylindrical ordinates at point B
directed towards point A.
|
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7)
|
Obtain the spherical
co-ordinates of 2 āx+3 āy+4 āz at the point P(x= 4, y =1, z = 3)
|
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|
|
|
=====Electro
Static Field in free Space======
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Ch
: 2 Coulomb’s law and Electric field intensity
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8)
|
Describe
coulomb’s law and Electric field intensity.
|
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9)
|
Define electric field intensity. Obtain the expression for the electric
field intensity at a
point which is at a distance of R
from a point charge Q.
|
|
10)
|
Derive expression of electric field
intensity due to a uniform line
charge over
z-axis
Having
a
charge density of C/m.
|
|
11)
|
The
finite sheet 0 ≤ x≤ 1, 0≤y≤1 on the z = 0 plane has a charge density ρs =
xy (x2 + y2 + 25)^3/2 nC/m2. Find: 1) The total charge on the
sheet, 2) The electric field at (0, 0, 5),
|
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12)
|
Derive
the expression for total electric field intensity due to infinite surface
charge distribution in free space.
|
|
13)
|
Find Ē at the origin
if the following charge distributions are present in free space : a) point
charge 12 nC at P (2,0,6), b) uniform line charge density 3nC/m at x = - 2, y
= 3, c) uniform surface charge density 0.2 nC/m2 at x = 2.
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Ch
: 3 Electric flux density, the Gauss’s
law and Divergence
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|
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14)
|
State
and prove the Gauss’s
law. Also state the conditions to be satisfied by the special Gaussian
surfaces.
|
|
15)
|
Application of
gauss’s law-To find electric flux density due to a uniform line charge.
|
|
16)
|
Define divergence
and its physical significance with example.
|
|
17)
|
D=2y2z2
āx +3xy2z2 āy +2xyz āz pc/m2in free space.
Find (a) Total flux passing through the surface x=2, 0 ≤
y ≤ 4, 0 ≤ z ≤ 3in a direction
away from the origin , (b) The total charge contained in incremental sphere
of a radius 1µm cantered at p (5,5,5)
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18)
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Explain Gauss’s law
applied to differential volume element with usual expression.
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Ch
: 4 Energy and Potential
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19)
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Explain potential and
potential gradient. Derive relationship between potential and electric field
intensity.
|
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20)
|
Explain electrical
dipole. Also derive expression of E due to an electric dipole.
|
|
21)
|
An
electrical dipole located at the origin in free space has a moment
P
= 2 āx+3 āy+4 āz nC. Find (A) find V at PA (1,2,3).
|
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22)
|
Write short note:
Electrostatic boundary conditions between perfect dielectrics.
|
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23)
|
Given the potential field,V= 2x2+3zy2,
and a point P(2, 5, 1), find following at point P: (1) the potential V, (2)
the electric field electric flux density D, and (5) the volume charge density
.
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===Electrical
Field in material Space and Boundary Condition===
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Ch
: 5 Current, Conductor
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24)
|
Derive
the relation between I and J and explain the continuity equation of steady
electric current in integral form and point form.
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Ch
: 6 Dielectrics and Capacitance
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25)
|
Write
short note: Electrostatic boundary conditions between perfect dielectrics.
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Ch
: 7 Poisson’s and Laplace’s equation.
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26)
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Derive
Poisson’s and Laplace’s equation.
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Ch
8 : Steady Magnetic Field
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27)
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State
and explain Biot-Savart’s law.
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28)
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Write
short note on Stoke’s theorem.
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Ch
: 9 Magnetic Forces and Materials and Inductance
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29)
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State
and Explain Lorentz force equation on charge particle. Also explain concept
of magnetic torque.
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Ch
: 10 Time Varying Fields and Maxwell’s Equations
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30)
|
State
Maxwell’s equations in point
form and explain physical significance of the equations.
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31)
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Write
and explain differential and integral forms of Maxwell’s equations.
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Ch
: 11 Transmission Line
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32)
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Explain
physical description of line propagation
and Its Derivation.
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33)
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Explain
line terminology and lossless propagation.
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Ch
: 12 Effect of Electromagnetics Field
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34)
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Explain
EMI source. Also discuss effect of EMI.
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35)
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Explain
method for eliminate of EMI.
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