ee_final

1

2

. In th

trans

a) –1

. The t

a) 0.5

s

e circuit s

sistor Q an

5

transfer fu

5 11

ss

++

Elec

shown bel

d an ideal

b) –0.7

nction 2

2

((

VV

b) 3ss

++

ctrical Eng

ow what

op‐amp ar

7

( )( )ss

of the c

62

++

gineering: E

is the out

re used?

c) +0.7

circuit sho

c) 21

ss

++

Exercise: 1

tput voltag

wn below

2

1

ge (Vout) in

d) +15

is

d) 12

ss

++

n Volts if a

a silicon

3

4

5

6

. Assum

unit s

a) u(t

. The i

a) 2

2t

c) (t −

. Whic

and s

a) A

b) Z

c) A

d) A

th

. Two

the o

a) pro

c) con

ming zero

step input

t)

mpulse res

( )u t

21) ( 12

u t−−

ch one of t

stable LTI s

All the pole

eros of the

All the pole

All the root

he jω axis.

systems w

overall imp

oduct of h

nvolution o

initial con

u(t) is

b) tu(t

sponse of

1)

the follow

system?

es of the sy

e system c

es must lie

ts of the c

with impuls

ulse respo

1(t) and h2

of h1(t) and

ndition, th

t)

a system is

b) t

d) t

ing statem

ystem mus

an lie anyw

within |s|

haracteris

e response

onse of the

(t)

d h2(t)

e response

c) 2

(2t u

s h(t) = t u

( 1) (2

t t u t−−

2 1 (2

t u t−−

ments is NO

t lie on the

where in th

= 1.

tic equatio

es h1(t) an

e cascaded

b) sum

d) subtr

e y(t) of t

)t

(t) . For an

1)−

1)

OT TRUE f

e left side o

he s‐plane

on must be

d h2(t) are

system is

of h1(t) an

raction of

he system

d) e‐t u(t

n input u(t –

or a contin

of the co a

.

e located

connected

given by

nd h2(t)

h2(t) from

m given bel

)

– 1), the o

nuous tim

axis.

on the left

d in cascad

h1(t)

low to a

utput is

e causal

t side of

de. Then

7. A source vs(t) = V cos100πt has an internal impedance of (4 + j3)Ω. If a purely

resistive load connected to this source has to extract the maximum power out of

the source, its value in Ω should be

a) 3 b) 4 c) 5 d) 7

8. A single‐phase load is supplied by a single‐phase voltage source. If the current

flowing from the load to the source is 10∠ ‐ 150° A and if the voltage at the load

terminals is 100∠60° V, then the

a) load absorbs real power and delivers reactive power.

b) load absorbs real power and absorbs reactive power.

c) load delivers real power and delivers reactive power.

d) load delivers real power and absorbs reactive power.

9. A single‐phase transformer has no‐load loss of 64 W, as obtained from an open‐

circuit test. When a short‐circuit test is performed on it with 90% of the rated

currents flowing in its both LV and HV windings, the measured loss is 81 W. The

transformer has maximum efficiency when operated at

a) 50.0% of the rated current.

b) 64.0% of the rated current.

c) 80.0% of the rated current.

d) 88.8% of the rated current.

10. The flux density at a point in space is given by B = 4xax + 2kyay + 8az Wb/m2. The

value of constant k must be equal to

a) ‐2 b) ‐0.5 c) +0.5 d) +2

1

1

1

1. A con

∞. Th

a) 0.3

2. The c

a) 4xy

b) 4a

c) (4x

d) 0

3. In th

the

a) inp

b) inp

c) inp

d) inp

ntinuous ra

hen P{X > 1

368

curl of the

yax + 6yz a

x + 6ay + 8a

xy + 4z2)ax

e feedbac

put impeda

put impeda

put impeda

put impeda

andom va

1} is

b) 0.5

gradient o

ay + 8zxaz

az

+ (2x2 + 6y

k network

ance incre

ance incre

ance decre

ance decre

riable X ha

of the scala

yz)ay + (3y2

k shown be

ases and o

ases and o

eases and o

eases and o

as a proba

c) 0.632

ar field def

2 + 8zx)az

elow, if th

output imp

output imp

output imp

output imp

bility dens

2

ined by V =

e feedbac

pedance de

pedance als

pedance al

pedance in

sity functio

d) 1.0

= 2x2 y +3y

k factor k

ecreases.

so increase

lso decreas

ncreases.

on f(x) = e‐

y2z +4z2x is

is increase

es.

ses.

‐x, 0< x <

s

ed, then

1

1

4. The i

infini

the v

a) 4.4

5. The B

The g

phase

a) 39

s

input impe

te. Assum

voltmeter i

46

Bode plot o

gain (20 log

e is negativ

9.8s

edance of

ing that th

n Volts is

b) 3.15

of a transfe

g |G(s)|) is

ve for all ω

b) 2

39.s

the perma

he diode sh

5

er function

s 32 dB an

ω. Then G(s

8

anent mag

hown in th

c) 2.23

n G (s) is sh

d –8 dB at

s) is

c) 32s

gnet movin

he figure b

hown in th

1 rad/s an

ng coil (PM

below is ide

d) 0

e figure be

nd 10 rad/s

d) 2

32s

MMC) volt

eal, the re

elow.

s respectiv

meter is

ading of

vely. The

1

1

1

1

2

6. A bul

other

by an

switc

a) an

c) an

7. For a

funda

a) 10

8. A ba

Acco

valid

a) 5

9. Cons

show

the e

a) k2

0. The a

a) A

lb in a stair

r one at th

ny one of t

ching of the

AND gate

XOR gate

a periodic

amental fr

0

and‐limited

rding to th

is

ider a de

wn below. I

elements o

angle d in t

Angle betw

rcase has t

he first floo

he switche

e bulb rese

signal v(t

requency in

b) 300

d signal w

he samplin

b) 12

lta connec

If all eleme

f the corre

b) k

the swing e

ween stator

two switch

or. The bul

es irrespec

embles

b) a

d) a

t) = 30 sin

n rad/s is

0

with a max

ng theorem

ction of r

ents of the

esponding

equation o

r voltage a

hes, one sw

lb can be t

ctive of the

an OR gate

a NAND gat

n100t + 1

c) 500

ximum fre

m, the sam

c) 15

esistors a

e delta con

star equiv

c) 1/k

of a synchr

nd current

witch being

turned ON

e state of t

te

10cos 300t

equency o

mpling fre

nd its equ

nnection ar

alent will b

onous gen

t.

g at the gro

and also c

he other s

t + 6 sin

d) 1500

of 5 kHz i

quency in

d) 20

uivalent st

re scaled b

be scaled b

d) k

nerator is t

ound floor

can be tur

witch. The

(500t + π

s to be s

kHz whic

tar conne

by a factor

by a factor

he

and the

ned OFF

e logic of

π/4), the

sampled.

ch is not

ction as

k, k > 0,

of

2

2

2

b) A

c) A

ro

d) A

sy

1. Leaka

a) Flu

b) Flu

c) Flu

d) Flu

2. Three

readi

readi

a) V

c)V =

3. Squa

Angular dis

Angular dis

otating axi

Angular di

ynchronou

age flux in

ux that leak

ux that link

ux that link

ux that link

e moving

ings V, V1

ings is

1 2

2 2V V

= +

V1V2

re root of

placement

splacemen

is.

splacemen

usly rotatin

an inducti

ks through

ks both sta

ks none of t

ks the stato

iron type

and V2, a

2

2

–i, where

t of the rot

nt of the

nt of an

ng axis.

ion motor

h the mach

tor and ro

the windin

or winding

voltmete

as indicate

b) V

d) V

1i = − , a

tor with re

stator mm

axis fixe

is

hine

tor windin

ngs

g or the rot

ers are co

ed. The c

V = V1 + V2

V = V2 – V1

re

espect to th

mf with r

d to the

ngs

tor winding

nnected a

orrect rela

he stator.

respect to

rotor w

g but not b

as shown

ation amo

o a synchr

ith respec

both

below. Vo

ong the vo

ronously

ct to a

oltmeter

oltmeter

a) i, ‐i

b) 3 3cos sin ,cos sin

4 4 4 4i iπ π π π⎛ ⎞ ⎛ ⎞ ⎛ ⎞ ⎛ ⎞− + − +⎜ ⎟ ⎜ ⎟ ⎜ ⎟ ⎜ ⎟

⎝ ⎠ ⎝ ⎠ ⎝ ⎠ ⎝ ⎠

c) 3 3cos sin ,cos sin

4 4 4 4i iπ π π π⎛ ⎞ ⎛ ⎞ ⎛ ⎞ ⎛ ⎞+ +⎜ ⎟ ⎜ ⎟ ⎜ ⎟ ⎜ ⎟

⎝ ⎠ ⎝ ⎠ ⎝ ⎠ ⎝ ⎠

d) 3 3 3 3cos sin ,cos sin4 4 4 4

i iπ π π π⎛ ⎞ ⎛ ⎞ ⎛ ⎞ ⎛ ⎞+ − − +⎜ ⎟ ⎜ ⎟ ⎜ ⎟ ⎜ ⎟⎝ ⎠ ⎝ ⎠ ⎝ ⎠ ⎝ ⎠

24. Given a vector field F = y2xax – yzay – x2az, the line integral 1F d⋅∫ evaluated along

a segment on the x‐axis from x = 1 to x = 2 is

a) ‐2.33 b) 0 c) 2.33 d) 7

25. The equation 1

2

2 2 01 1 0

xx

− ⎡ ⎤⎡ ⎤ ⎡ ⎤=⎢ ⎥⎢ ⎥ ⎢ ⎥−⎣ ⎦ ⎣ ⎦⎣ ⎦

has

a) no solution b) only one solution 1

2

00

xx

⎡ ⎤ ⎡ ⎤=⎢ ⎥ ⎢ ⎥

⎣ ⎦⎣ ⎦

c) Non‐zero unique solution d) multiple solutions

26. A strain gauge forms one arm of the bridge shown in the figure below and has a

nominal resistance without any load as Rs = 300 Ω. Other bridge resistances are R1

= R2 = R3 = 300 Ω. The maximum permissible current through the strain gauge is 20

mA. During certain measurement when the bridge is excited by maximum

permissible voltage and the strain gauge resistance is increased by 1% over the

nominal value, the output voltage V0 in mV is

2

2

7. In the

main

rating

a) 12

c) 25

8. The o

conn

reduc

comp

e circuit sh

tain 5V ac

g of the Ze

5 and 125

0 and 125

open‐loop

ected in f

ce the tim

pared to th

hown belo

cross RL, t

ener diode

transfer f

feedback a

me constan

hat of the o

ow, the kne

the minim

in mW res

b) 1

d) 2

function o

as shown

nt of the

open‐loop

ee current

um value

spectively

125 and 25

250 and 25

of a dc mo

below, th

closed loo

system is

of the ide

of RL in Ω

are

50

50

otor is give

he approx

op system

eal Zener d

Ω and the

en as ((a

sV sω

imate valu

m by one

diode is 10

e minimum

) 10) 1 10s s

=+

ue of Ka t

hundred t

0 mA. To

m power

s. When

that will

times as

2

3

a) 1

9. In th

Thev

a) 10

0. Three

have

show

comb

capac

a) 2.8

he circuit s

enin’s equ

0∠90°

e capacito

breakdow

wn, the m

bination a

citance acr

8 and 36

b) 5

shown be

ivalent vo

c) 800

rs C1, C2, a

wn voltages

maximum s

nd the co

ross the te

b) 7

low, if the

ltage in Vo

∠0°

and C3 wh

s of 10V, 5

safe volta

orrespondi

erminals ar

and 119

c) 10

e source v

olts as seen

c) 800∠

ose values

5V, and 2V

age in Vo

ing total c

re respectiv

c) 2.8 a

voltage VS

n by the lo

∠90°

s are 10µF

V respectiv

olts that c

charge in

vely

and 32

d) 100

S = 100∠5

ad resistan

d) 100∠

F, 5µF, and

vely. For th

can be ap

µC stored

d) 7 and

53.13° V t

nce RL is

60°

d 2µF resp

he intercon

pplied acr

d in the e

80

hen the

ectively,

nnection

ross the

effective

3

3

3

1. A vol

meas

a) sin

c) (sin

2. The s

of 20

is us

arma

at the

a) 0.4

3. For a

per u

react

refer

tage 1000

sured acro

n ωt

nω t – |sin

separately

0 A and a r

ed to con

ature react

e rated spe

4

a power sy

unit. The

tance of –

ence node

sin ωt Vo

ss WX in V

nωt|) / 2

excited dc

ated arma

ntrol the a

tion, the du

eed and th

b) 0.5

ystem netw

voltage at

j3.5 per u

e, the curre

lts is applie

Volts is

b) (

d) 0

c motor in

ture voltag

armature

uty ratio o

he rated fie

work with

t node 3

nit is now

ent drawn

ed across Y

sinωt + |si

0 for all t

n the figure

ge of 150 V

voltage. If

of the chop

eld current

c) 0.6

n nodes, Z

is 1.3 ∠ –

added to

by the cap

YZ. Assum

inωt|)/2

e below h

V. An idea

f La = 0.1

pper to obt

t is

Z33 of its b

– 10° per

the netwo

pacitor per

ing ideal d

as a rated

l chopper

mH, Ra =

tain 50% o

d) 0.7

bus impeda

unit. If a

ork betwee

r unit is

diodes, the

armature

switching

= 1 Ω, ne

of the rated

ance matr

a capacitor

en node 3

e voltage

current

at 5 kHz

eglecting

d torque

ix is j0.5

r having

and the

a) 0.325 ∠ –100° b) 0.325 ∠ 80°

c) 0.371 ∠ –100° d) 0.433 ∠ 80°

34. A dielectric slab with 500 mm × 500 mm cross‐section is 0.4 m long. The slab is

subjected to a uniform electric field of E = 6ax + 8ay kV/mm. The relative

permittivity of the dielectric material is equal to 2. The value of constant ε0 is 8.85 ×

10‐12 F/m. The energy stored in the dielectric in Joules is

a) 8.85 × 10‐11 b) 8.85 × 10‐5 c) 88.5 d) 885

35. A matrix has eigen values –1 and –2. The corresponding eigenvectors are 1

1⎡ ⎤⎢ ⎥−⎣ ⎦

and

12

⎡ ⎤⎢ ⎥−⎣ ⎦

respectively. The matrix is

a) 1 11 2

⎡ ⎤⎢ ⎥− −⎣ ⎦

b) 1 22 4

⎡ ⎤⎢ ⎥− −⎣ ⎦

c) 1 0

0 2−⎡ ⎤

⎢ ⎥−⎣ ⎦ d)

0 12 3

⎡ ⎤⎢ ⎥− −⎣ ⎦

36. 2

2

44

z dzz

−+∫ Evaluated anticlockwise around the circle |z – i| = 2, where 1i = − , is

a) ‐4π b) 0 c) 2 + π d) 2 + 2i

37. The clock frequency applied to the digital circuit shown in the figure below is 1 kHz.

If the initial state of the output Q of the flip‐flop is ‘0’, then the frequency of the

output waveform Q in kHz is

3

3

a) 0.2

8. In the

and t

and Y

expre

a) XY

9. In the

25

e circuit sh

the diode d

Y are digit

ession for Z

Y

e circuit sh

b) 0.5

hown below

drops negl

tal signals

Z is

b) XY

hown below

w, Q1 has n

ligible volt

with 0 V

Y

w the op‐a

c) 1

negligible c

age across

as logic 0

c) XY

amps are id

collector‐t

s it under f

and Vcc a

deal. Then

d) 2

o‐emitter

forward bi

as logic 1,

d) XY

Vout in Vol

saturation

ias. If Vcc is

then the

ts is

n voltage

s +5 V, X

Boolean

4

a) 4

0. The s

this s

a) 5s

c) 2s

signal flow

system is

2

16 2

ss s

++ +

14 2

ss

++ +

b) 6

w graph for

r a system

b) s

d) 5

c) 8

m is given b

2

16 2

ss s

++ +

2

15 6 2s s+ +

below. The

2

d) 10

e transfer

function YU

( )( )

Y sU s

for

4

4

4

4

1. The i

3). Th

a) 0

2. Two

opera

serie

a) q1R

c) (q1

3. The f

which

to ge

appli

VWX2

a) 12

c) 10

4. Thyri

width

mpulse re

he value of

magnetica

ating frequ

s, their eff

R1 + q2R2

1R1 + q2R2)

following

h attenuat

et an open

ed across

/ VYZ2 are r

5/100 and

0/100 and

stor T in t

h 10 µs. It

sponse of

f the step r

b) 1

ally uncoup

uency. The

fective Q fa

/ (R1 + R2)

arrangeme

tes by a fac

n circuit v

YZ to get

respective

d 80/100

100/100

he figure b

t is given t

a continuo

response a

pled induct

eir respecti

actor at the

b) q

d) q1R2 + q

ent consis

ctor of 0.8

oltage VYZ

an open c

ly,

b) 1

d) 8

below is in

that L ⎛= ⎜⎝

ous time sy

at t = 2 is

c) 2

tive coils h

ive resistan

e same op

q1 / R1 + q2

q2R1

sts of an

. An ac vol

1 across Y

ircuit volta

100/100 an

80/100 and

nitially off

100 H⎞μ⎟π ⎠ a

ystem is g

have Q fac

nces are R1

erating fre

/ R2

ideal tran

ltage VWX1

YZ. Next, a

age VWX2 a

nd 80/100

d 80/100

and is trig

and 1C ⎛= ⎜

⎝

iven by h(t

d) 3

tors q1 and

1 and R2. W

equency is

sformer a

= 100V is

an ac volta

across WX.

ggered wit

100 H⎞μ⎟π ⎠. A

t) = δ(t – 1

d q2 at the

When conn

and an att

applied ac

age VYZ2 =

Then, VYZ

h a single

Assuming

1) + δ(t –

e chosen

nected in

tenuator

cross WX

100V is

1 / VWX1,

pulse of

latching

4

4

4

and h

zero,

a) 10

5. A 4‐p

sourc

negat

a) 10

6. A fun

point

a) 20

7. When

1 = 0

1.2 is

a) ‐0.

holding cu

T conduct

μs

pole induc

ce, is rota

tive seque

0

nction y =

t in this int

n the New

, the solut

s

.82

urrents of

ts for

b) 50 μ

ction moto

ating at 14

ence curren

b) 98

5x2 + 10x

terval, dydx

b) 25

wton‐Raphs

ion at the

b) 0.49

the thyrist

μs

or, supplie

440 rpm.

nt in the ro

is defined

is exactly

son metho

end of the

9

tor are bo

c) 100 μ

ed by a sl

The electr

otor is

c) 52

over an o

c) 30

d is applie

e first itera

c) 0.705

oth zero an

μs

ightly unb

rical frequ

open interv

ed to solve

ation with t

5

nd the init

d) 200 μ

balanced t

uency in H

d) 48

val x = (1,

d) 35

the equat

the initial g

d) 1.69

tial charge

s

hree‐phas

Hz of the

2). At leas

tion f(x) = x

guess valu

e on C is

e 50 Hz

induced

st at one

x3 + 2x –

e as x0 =

C

C

In

M

a

4

4

C

T

⎡⎢⎣

5

Common

Common D

n the figur

MOSFET Q

ssumed to

8. The a

a) 3/2

9. The P

a) 0.9

Common D

he state va

1

2

20

xx

−⎤ ⎡=⎥ ⎢

⎣⎦

0. The s

a) Co

b) No

Data Que

Data for Qu

re shown

is switche

o be ideal.

average so

2

PEAK‐TO‐P

96

Data for Qu

ariable for

1

2

01

xx

⎡ ⎤⎤⎢ ⎥⎥− ⎦ ⎣ ⎦

system is

ontrollable

ot controlla

estions

uestions 48

below, th

d at 250 k

urce curre

b) 5/3

EAK sourc

b) 0.14

uestions 50

mulation o

1,

1u⎡ ⎤

+ ⎢ ⎥⎣ ⎦

but not ob

able but ob

8 and 49:

e chopper

Hz, with a

ent in Amp

e current r

44

0 and 51:

of a system

1(0) 0,x =

bservable

bservable

r feeds a

duty ratio

s in steady

c) 5/2

ripple in Am

c) 0.192

m is given a

2 (0) 0 ax =

resistive l

o of 0.4. Al

y‐state is

mps is

2

as

[and 1y =

oad from

ll elements

d) 15/4

d) 0.288

] 1

2

0xx

⎡ ⎤⎢ ⎥⎣ ⎦

a battery

s of the cir

source.

rcuit are

5

L

S

In

v

re

5

c) Bo

d) Bo

1. The r

a) 12

−

c) 2te−

inked An

tatement

n the follo

oltage pha

eactances

2. The v

a) θ2

b) θ2

c) θ2

d) θ2

th control

oth not con

response y

212

te−−

t te−−

nswer Qu

for Linked

owing netw

ase angles

are equal

voltage pha

= ‐0.1, θ3 =

= 0, θ3 = ‐0

= 0.1, θ3 =

= 0.1, θ3 =

lable and o

ntrollable a

y(t) to a un

estions

d Answer Q

work, the

are very

to j1 Ω.

ase angles

= ‐0.2

0.1

0.1

= 0.2

observable

and not ob

it step inpu

b) 1

d) 1

Questions 5

voltage m

small, and

in rad at b

e

bservable

ut is

2112

te−− −

1 te−−

52 and 53:

magnitudes

d the line

buses 2 an

12

te−

:

at all bus

resistance

d 3 are

ses are eq

es are negl

qual to 1 p

ligible. All

p.u., the

the line

5

S

T

H

re

3

5

5

3. If the

respe

the s

a) ‐10

tatement

he Voltage

Hz, square‐

eference d

Ω, L = 9.5

4. In the

curre

a) Q1

5. Appr

(ZCS)

a) ZV

c) ZCS

e base im

ectively, th

lack bus is

0

for Linked

e Source In

‐wave ac o

direction o

5 mH.

e interval

ent is

1, Q2

opriate tra

) of the IGB

VS during tu

S during tu

pedance a

hen the re

b) 0

d Answer Q

nverter (V

output volt

f the outp

when V0 <

b) Q3,

ansition i.

BTs during

urn‐off

urn‐off

and the lin

al power i

Questions 5

SI) shown

tage (vo) a

ut current

< 0 and i0

Q4

e., Zero V

turn‐on/tu

ne‐to‐line

n MW del

c) 10

54 and 55:

in the figu

across an R

t io are indi

> 0 the pa

c) D1, D

Voltage Sw

urn‐off is

b) ZVS d

d) ZCS d

base volta

livered by

:

ure below

R‐L load. R

icated in t

air of devic

D2

witching (Z

during turn

during turn

age are 10

the gener

d) 20

is switche

Reference

he figure.

ces which

d) D3, D4

ZVS)/Zero

n‐on

n‐on

00 Ω and

rator conne

ed to prov

polarity of

It is given

conducts t

4

Current Sw

100 kV,

ected at

ide a 50

f Vo and

that R =

the load

witching

Key for Exercise: 1

Q.NO. Key 1. B 2. D 3. B 4. C 5. C 6. C 7. C 8. B 9. C 10. A 11. A 12. D 13. A 14. A 15. B 16. C 17. A 18. A 19. B 20. D 21. D 22. D 23. B 24. B 25. D 26. C 27. B

28. C 29. C 30. C 31. D 32. D 33. D 34. C 35. D 36. A 37. B 38. B 39. C 40. A 41. B 42. C 43. B 44. C 45. B 46. B 47. C 48. B 49. C 50. A 51. A 52. Marks to all 53. Marks to all 54. D 55. Marks to all

ee_final

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