gate 2012 electronics & communication...
TRANSCRIPT
GATE 2012 Question Paper ECE
Page : 1
GATE 2012
Electronics & Communication Engineering
Set - A
Q. 1 – Q. 25 carry one mark each.
1. The current i is through the base of a silicon npn transistor is 1 + 0.1 cos (10000 π t) mA. At 300 K, the r in the small signal model of the transistor is
(A) 250 (B) 27.5
(C) 25 (D) 22.5
[Ans. C] Given base current is a sum of DC and AC (small signal currents), So I (dc) = 1mA and we know V = at 300 K V ≃ 25 mV
So I (dc) = 1 mA rπ =
( )= Ω
⇒ 푟 = 25Ω
2. The power spectral density of a real process X(t) for positive frequencies is shown below. The values of E[X2(t)] and |E[X(t)]|, respectively, are
B C 퐢퐛
퐫훑 퐫ퟎ
E
GATE 2012 Question Paper ECE
Page : 2
(A) 6000/π, 0 (B) 6400/π, 0
(C) 6400/π, 20/( π√2) (D) 6000/π, 20/( π√2)
[Ans. B] E[X (t)] = ∫ S (f) df
= 2 ∫ S (f) df (∵ PSD is even)
= 2 ×
∫ S ()d
= [Area under the triangle + Integration of delta function]
=
× 2 × 10 × 6 + 400 =
|E[X(t)]| = Absolute value of mean of signal X(t) = Average value of X(t) = D.C. Component present in X() = Value of X() at = 0
From given PSD S (): S
= 0= 0
We know that S () = |X()|
∴ |X()|
= 0= 0 ⟹ |X()| = 0
From inequality: |E[X()]| ≤ E[|X()|] As |X()| = 0 ⟹ E[|X()|] = 0 ∴ |E[X()]| = 0 Logically, If PSD doesn’t contain value at = 0 then the dc component in the signal is zero.
10 9 0 11 훚 (ퟏퟎퟑ rad∕s)
400 훅(훚 - ퟏퟎퟒ)
6
퐒퐗(훚)
GATE 2012 Question Paper ECE
Page : 3
3. In a baseband communications link, frequencies upto 3500 Hz are used for signaling. Using a raised cosine pulse with 75% excess bandwidth and for no inter-symbol interference, the maximum possible signaling rate in symbols per second is (A) 1750 (B) 2625
(C) 4000 (D) 5250
[Ans. C] In the problem, it is given that, frequencies upto 3500 Hz ⟹ W = 3500 Hz Raised Cosine Pulse with 75% excess BW ⟹ α = 0.75 We know that, (1 + α)R = 2W α ⟹ Roll off factor (excess BW) R ⟹ Signalling rate (Symbols per second) W ⟹ Highest signalling frequency or signal BW Using above formula, R =
= ×.
= .
= 4000
4. A plane wave propagation in air with E = (8 a + 6 a + 5 a ) e ( ) V/m is incident on a perfectly conducting slab positioned at x ≤ 0. The E field of the reflected wave is (A) (− 8 a − 6 a – 5 a ) e ( ) V/m (B) (− 8 a + 6 a – 5 a ) e ( ) V/m (C) (− 8 a − 6 a – 5 a ) e ( ) V/m (D) (− 8 a − 6 a – 5 a ) e ( ) V/m
[Ans. Marks to All*] (*Ambiguous options)
5. The electric field of a uniform plane electromagnetic wave in free space, along the positive x direction, is given by E = 10 (a + ja ) e . The frequency and polarization of the wave, respectively, are (A) 1.2 GHz and left circular (B) 4 Hz and left circular
(C) 1.2 GHz and right circular (D) 4 Hz and right circular
[Ans. A]
GATE 2012 Question Paper ECE
Page : 4
Approach – 1
= 25
⇒ 휆 =2휋25
푓 = × = 1.2 GHz
Let E = cosωt
then E = cos ωt + π Now if we increase ‘t’, we will see that it in left circular polarization. Approach – 2 E = 10 a + j a e
훽 =2휋휆
E(x, t) = Re E(x) ∙ e ω
β =2π
휆
⇒ 25 =2휋푓
퐶
⇒ 푓 = = × ××
GHz
≅ 1.2 GHz To know the polarization we convert E into time-domain from phasor form
퐄퐳
퐄퐲
GATE 2012 Question Paper ECE
Page : 5
E(x, t) = Re E(x) ∙ e ω = Re 10 a + j a e (ω ) = 10 cos(휔푡 − 25푥) 푎 − 10 sin(휔푡 − 25푥) 푎 퐸(0, 푡) = (10 cos 휔푡) 푎 − (10 sin 휔푡). 푎 ∴ It is left – circularly polarized.
6. Consider the given circuit.
In this circuit, race around (A) does not occur (B) occurs when CLK = 0
(C) occurs when CLK = 1 and A = B = 1 (D) occurs when CLK = 1 and A = B = 0
[Ans. A]
CLK
A
B 퐐
Q
CLK
A
B
10 Z
훚t = 훑
10
10 훚t = 훑/2
x y 10
훚t = 0
GATE 2012 Question Paper ECE
Page : 6
Q = A. CLK. Q = A.CLK + Q Q = A. CLK + Q If CLK = 1 and A and B = 1
then Q = 1Q = 1 No race around
If CLK = 1 and A = B = 0 Q = QQ = Q No race around
Thus race around does not occur in the circuit.
7. The output Y of a 2-bit comparator is logic 1 whenever the 2-bit input A is greater than the 2-bit input B. The number of combinations for which the output is logic 1, is (A) 4 (B) 6
(C) 8 (D) 10
[Ans. B] Approach – 1 A > B A & B are 2 bit 01 00 –1 10 00 01 –2 11 00 01 10 Approach – 2 Input A Input B Y A A B B 0 0 0 0…………………….. 0 0 0 0 1…………………….. 0 0 0 1 0…………………….. 0 0 0 1 1…………………….. 0 0 1 0 0…………………….. 1 0 1 0 1…………………….. 0 0 1 1 0…………………….. 0 0 1 1 1…………………….. 0 1 0 0 0…………………….. 1 1 0 0 1…………………….. 1 1 0 1 0…………………….. 0
GATE 2012 Question Paper ECE
Page : 7
1 0 1 1…………………….. 0 1 1 0 0…………………….. 1 1 1 0 1…………………….. 1 1 1 1 0…………………….. 1 1 1 1 1…………………….. 0 Thus for 6 combinations output in logic 1.
8. The i-v characteristics of the diode in the circuit given below are
i = . A, v ≥ 0.7V
0 A, v < 0.7 푉
The current in the circuit is (A) 10 mA (B) 9.3 mA
(C) 6.67 mA (D) 6.2 mA
[Ans. D] Approach – 1 I (diode current) = 500 i + 0.7 Applying KCL, 10 = 1000 i + 500 i + 0.7 ⟹ 푖 = .
.= 6.2푚퐴
Approach – 2 Here diode equivalent circuit model is given which is graphically presented as →
10V
1k
v +
-
+
-
i
GATE 2012 Question Paper ECE
Page : 8
푉 ≥ 0.7푉
퐼 =푉 − 0.7
500 퐴
Slope = =
R = 500 Ω Equivalent circuit Model:
Now applying KVL for Linear circuit −10푉 + 1퐾Ω × 퐼 + 500Ω × 퐼 + 0.7푉 = 0 ⇒ −9.3푉 + 1500Ω I = 0
⇒ 퐼 =9.3
1500푉Ω
= 6.2 × 10 퐴
퐼 = 6.2 mA
9. In the following figure, C and C are ideal capacitors. C has been charged to 12 V before the ideal switch S is closed at t = 0. The current i(t) for all t is
1kΩ
+ − 10V
+
− 0.7V
500Ω I
500 Ω 0.7V
퐈퐃
퐕퐃
model As
퐈퐃
퐕퐃 0.7V
ퟏ푹
∆퐕
∆퐈
GATE 2012 Question Paper ECE
Page : 9
(A) zero (B) a step function (C) an exponentially decaying function (D) an impulse function
[Ans. D] Initially when switch is closed, impulse current flows from C1 to C2 till voltages of C1 and C2 becomes equal. This happens due to the fact that there is a potential difference initially between C and C , but resistance in the circuit is zero leading to an infinite current. Once charge is equal in C1 and C2, current i(t) will be zero.
10. The average power delivered to an impedance (4 – j3) by a current 5 cos(100 π t + 100) A is (A) 44.2 W (B) 50 W
(C) 62.5 W (D) 125 W
[Ans. B] P = ReVI∗
= ReIZI∗
= Re|I| Z
= |I| ReZ
= × 5 × 4 (∵ ReZ = 4) = 50 W
11. The unilateral Laplace transform of f(t) is
. The unilateral Laplace transform of tf(t) is
(A) − ( )
(B) – ( )
(C) ( )
(D) ( )
t = 0
퐂ퟏ 퐂ퟐ
S
i(t)
GATE 2012 Question Paper ECE
Page : 10
[Ans. D] 퐿t. f(t) = (−1) . F(s)
= − = 1
12. With initial condition x(1) = 0.5, the solution of the differential equation.
t + x = t is
(A) x = t −
(B) x = t −
(C) x =
(D) x = [Ans. D] Approach – 1 Just substitute, x = , or divide by t, and take integrating fact. Approach – 2 Given DE is 푡 + 푥 = 푡 ⇒ + = 1
IF = 푒∫ = 푒 = 푡; solution is x (IF) = ∫(퐼퐹) tdt
푥푡 = ∫ 푡. 푡푑푡 ⇒ 푥푡 = + 푐; Given that 푥(1) = 0.5 ⇒ 0.5 = + 푐 ⇒ 푐 = 0
∴ the required solution is 푥푡 = ⇒ 푥 = Approach – 3 Given: 푡 + 푥 = 푡, 푥(1) = 0.5
푡 + 푥 = 푡 푡 푑푥 + 푥푑푡 = 푡푑푡 푑(푥푡) = 푡 푑푡
푥푡 =푡2
+ 퐶
Using initial condition, at t = 1, x = 0.5
0.5 × 1 =12
+ 퐶
퐶 = 0
GATE 2012 Question Paper ECE
Page : 11
∴ 푥푡 =푡2
푥 =푡2
13. The diodes and capacitors in the circuit shown are ideal. The voltage v(t) across the diode D1 is
(A) cos (ωt) – 1 (B) sin (ωt)
(C) 1 − cos (ωt) (D) 1 – sin (ωt)
[Ans. A] Approach – 1 C will trap the peak voltage that will be – 1V, so the voltage across D is −1 + cost =(cost − 1)
Approach – 2 Circuit composed of two sections in cascade: A clamper form by C and D and peak rectifier formed by D and C . When excited by sinusoidal of [cos (ωt)], the clamping section clam the positive peak to 0 volt and height peak reach to -2 volt. So the whole i/p signal lower down by -1 volt level.
1
-1
i/p ⇒
0 훑/2 훑 2훑 Cos (훚t)
V(t) ⇒
⇒Cos (훚t) - ⊥
-1 -2
0
C1 D2
C2
v(t)
cos(훚t) D1 +
-
GATE 2012 Question Paper ECE
Page : 12
14. In the circuit shown
(A) Y = A B + C (B) Y = (A + B) C
(C) Y = (A + B) C (D) Y = AB + C
[Ans. A] Since A & B are in parallel so those represent (A + B) & C is in sense, so it represents ‘dot’ operation and the whole function should be inverted or it is complementary logic. So 훾 = (퐴 + 퐵)퐶 = 퐴 + 퐵 + 퐶 = A B + C
15. A source alphabet consists of N symbols with the probability of the first two symbols being the same. A source encoder increase the probability of the first symbol by a small amount ε and decreases that of the second by ε. After encoding, the entropy of the source (A) increases (B) remains the same
(C) increases only if N = 2 (D) decreases
[Ans. D] Approach – 1 Entropy is maximum when all symbols are equiprobable. If the probability of symbols at different, then entropy in going to decrease. Approach – 2 We know that Entropy is maximum when symbols are equally likely. Before encoding p = p = p
5 volts
A
B
A
Y
C
C
B
GATE 2012 Question Paper ECE
Page : 13
퐻 = − 푝 log 푝 + 푝 log 푝 + 푝 log 푝
= − 2푝 log 푝 + 푝 log 푝
After encoding p = p + ε p = p − ε
퐻 = − (푝 + 휀) log(푝 + 휀) + (푝 − 휀) log(푝 − 휀) + 푝 log 푝
Comparing H and H′ and using the concept given above 2푝 log 푝 > (푝 + 휀) log(푝 + 휀) + (푝 − 휀) log (푝 − 휀) Thus, 퐻 < 퐻 Hence, entropy of the source will decrease.
16. A coaxial cable with an inner diameter of 1 mm and outer diameter of 2.4 mm is filled with a
dielectric of relative permittivity 10.89. Given μ = 4 π × 10 H/m, ε =
F/m, the characteristic impedance of the cable is (A) 330 (B) 100
(C) 143.3 (D) 43.4
[Ans. Marks to All*] (*Ambiguous options)
17. The radiation pattern of an antenna in spherical co-ordinates is given by F (θ) = cos θ; 0 ≤ θ ≤ π ∕ 2
The directivity of the antenna is (A) 10 dB (B) 12.6 dB
(C) 11.5 dB (D) 18 dB
[Ans. B]
18. If x[n] = (1 / 3)| | – (1 / 2) u[n], then the region of convergence (ROC) of its Z-transform in the Z-plane will be (A) < |z| < 3
(B) < |z| <
(C) < |z| < 3
(D) < |z|
[Ans. C]
GATE 2012 Question Paper ECE
Page : 14
Given: x[n] = (1 / 3)| | – (1 / 2) u[n] 푥[푛] 푥(푧) 푥(푧) = ∑ 푥[푛] 푧
First consider | |
∑| |
푧
= ∑ 푧 + ∑ 푧
= ∑ 3 푧 + ∑
=3푧
+ 3 푧 + − − − − − + 1 +1
3푧+
13푧
+ − − − − − −
> 1 < 1
< 1 |푧| > 13
|푧| < 3
Consider u(n)
= ∑ 푧
= 1 + + + -------------
< 1 |푧| > 12
ROC is < |푧| < 3
19. In the sum of products function f(X, Y, Z) = ∑(2, 3, 4, 5), the prime implicants are (A) X Y, X Y (B) X Y, X Y Z, X Y Z
(C) X Y Z, XY Z, X Y (D) X Y Z, X Y Z, X Y Z, X Y Z
[Ans. A]
II Unit circle
x x IR
GATE 2012 Question Paper ECE
Page : 15
f(x, y, z) = xy + xy
20. A system with transfer function
G(s) = ( )( ) ( ) ( )
is excited by sin (ωt). The steady-state output of the system is zero at (A) ω = 1 rad/s (B) ω = 2 rad/s
(C) ω = 3 rad/s (D) ω = 4 rad/s
[Ans. C]
G(s) = ( )( )( )( )
By substituting s = jw and equating |G(s)|=0 we get w=3
21. The impedance looking into nodes 1 and 2 in the given circuit is
(A) 50 (B) 100
(C) 5 k (D) 10.1k
[Ans. A]
1k
9k
100 1 2
99퐢퐛
퐢퐛
x
0
1
yz
1
1 1 0
0 1 0
0
00 01 11 10
GATE 2012 Question Paper ECE
Page : 16
Approach – 1
By nodal analysis at node a, + − 99 i = 1
+ −1 + = 0
⇒ V + = 1.
⇒ V = 50V ∴ R (thevenin) = = 50
Approach – 2
After connecting a voltage source of V V = V ⇒ (10k)(−i ) = 100(I + 99i + i ); −10000i = 100I + 100 × 100i = 100I + 10000i
−20000푖 = 100퐼 ⇒ 푖 = −100
20000퐼 = −
퐼200
1k
9k
100
99퐢퐛
퐢퐛
9k
퐢퐛 +
−
퐕ퟏ 퐕ퟐ +
−
100
(I + 99퐢퐛) I
99퐢퐛
+
−
V
9 k
1k
Ib ퟗퟗ 퐢퐛
100
1A Is
퐕퐚
GATE 2012 Question Paper ECE
Page : 17
푉 = 100[퐼 + 99푖 + 푖 ] = 100 퐼 + 100−퐼
200= 50퐼
R =V퐼
=50퐼
퐼= 50Ω
22. In the circuit shown below, the current through the inductor is
(A) A
(B) A
(C) A
(D) 0 A
[Ans. C] Approach – 1
1 j1
1 -j1
+ − + −
1∟0 A 1∟0 V 1∟0 V
1∟0 A
1∟0 V j1 1
1 j1
1 -j1
1 ∠ 0 V
1 ∠ 0 A
1 ∠ 0 V
1 ∠ 0 A
+ - + -
GATE 2012 Question Paper ECE
Page : 18
I = 1 0 × = 퐴
Approach – 2
Apply Superposition theorem, V only: Short circuit V open circuit I and I
I = --------------(1)
I =
Similarly for V only I = --------------(2)
For I only Using current divider rule
+1j
1 −ퟏ풋
+ −
퐈퐋ퟏ
1
1 1 j
1 -1 j
+ − + −
1∟0 A
1∟0 A
퐈퐋
퐈ퟐ
퐕ퟏ 퐕ퟐ
1∟0 1∟0
퐈ퟏ
GATE 2012 Question Paper ECE
Page : 19
I = × 1 < 0 = -------------- (3)
For I only
I = I + I Current in Inductor = 0 So I = 0 ------------ (4) From (1), (2), (3), (4), Total current,
I =−1
1 + 1푗+
11 + 1푗
+1
1 + 1푗+ 0
⇒ I =
1 1j
1 -1j
1∠0
퐈퐱
퐈ퟐ 퐈퐱
퐈퐲
퐈퐲
1 1j
1 -1j
1∠0
퐈퐋ퟑ
퐈ퟏ
GATE 2012 Question Paper ECE
Page : 20
23. Given f(z) = − . If C is a counterclockwise path in the z-plane such that |z + 1| = 1, the value of
π ∮ f (z)dz is
(A) – 2 (B) – 1
(C) 1 (D) 2
[Ans. C] Z = –3 is outside circle Z = 1 is inside circle lim→
(z + 1).( )
=1
24. Two independent random variables X and Y are uniformly distributed in the interval [−1, 1]. The
probability that max[ X, Y] is less than 1/2 is (A) 3/4 (B) 9/16
(C) 1/4 (D) 2/3
[Ans. B] 푃 max[푋, 푌] < = 푃 푋 < , 푌 < (If maximum is < then both are less than )
P x < , y <
P x < . P y < (since independent events) Probability density function of X and Y
= ×
=
25. If x = √− 1, then the value of x is (A) e / (B) e /
(C) x (D) 1
1/2
-1 0 1/2 1
GATE 2012 Question Paper ECE
Page : 21
[Ans. A] Approach – 1
Given, 푥 = √−1; x = √−1√
= i
We know that e θ = cosθ + i sinθ ⇒ eπ
= cos π + i sin π = i
∴ (푖) = 푒 / = 푒 / Approach – 2 푥 = √−1 = 푖 = 푒 Let y = x Taking Natural logarithm on both sides log 푦 = log 푥 log 푦 = 푥 log 푥
= 푒 log 푒 = 푖 푖휋
2 log 푦 = − 휋
2
푦 = 푒 ∴ 푥 = 푒 Q. 26 To Q.55 carry two marks each.
26. The source of a silicon (n = 10 per cm ) n-channel MOS transistor has an area of 1 sq μm and a depth of 1μm. If the dopant density in the source is 10 /cm , the number of holes in the source region with the above volume is approximately (A) 10 (B) 100
(C) 10 (D) 0
[Ans. D] Given ⟹ Si n 10 /cm n – MOS – Source – Area = 1m × 1 m Area = 10 cm × 10 cm Depth = 14m = 10 cm Do pant density (n) = 10 /cm To find ⟹ no. of holes (p) = p in volume Formula ⟹ np = n [Law of Mass Act]
GATE 2012 Question Paper ECE
Page : 22
p = ⟹ ××
p ⟹ 10/cm Volume of source = 10 × 10 × 10 × cm × cm ⟹ 10 cm
no. of holes in source volume ⟹ (p) = 10 × 10 (p) = 10
thus no. of holes in source approx ~ zero [0]
27. A BPSK scheme operating over and AWGN channel with noise power spectral density of N /2,
uses equiprobable signals s (t) = sin(ω t) and s (t) = - sin(ω t) over the symbol
interval (0, T). If the local oscillator in a coherent is ahead in phase by 45 with respect to the received signal, the probability of error in the resulting system is
(A) Q
(B) Q
(C) Q
(D) Q
[Ans. B] Equiprobable signals
s (t) = sin(ω t) ; and s (t) = − sin(ω t)
Local oscillator in-coherent receiver is ahead in phase by 45° with respect to the received signal. Generally, we consider the local oscillator function of unit energy
(t) = sinω t 0 ≤ t ≤ T but the local oscillator is ahead with 45°
(t + 45°) =2푇
sin(휔 푡 + 45°) 0 ≤ 푡 ≤ 푇
Receiver structure:
퐬ퟏ(퐭) 퐬ퟏ, 퐬ퟐ (signal co-ordinates)
ퟏ(퐭 + ퟒퟓ°)
GATE 2012 Question Paper ECE
Page : 23
s = s (t) (t + 45°)dt =2E푇
sinω t.2푇
sin(ω t + 45°) dt
s =E2
;
Similarly s = −
Probability of making an error when we transmit i.e. s
푦 =퐸2
+ 푁; 푃푠
푠= 푃(훾 < 0) = 푃
퐸2
+ 푁 < 0 = 푃 푁 < −퐸2
Probability of making an error when we transmit 푖. 푒. s
푦 = + 푁;
푃푠
푠= 푃(훾 < 0) = 푃
퐸2
+ 푁 < 0 = 푃 푁 < −퐸2
Gaussian Random Variable with
mean 퐄ퟐ variance 퐍퐨
ퟐ
− 퐄ퟐ 퐄
ퟐ
퐈퐈
−푬ퟐ
푬ퟐ
푰푹
푰
Decision region for 퐬ퟏ
Decision region for 퐬ퟐ
GATE 2012 Question Paper ECE
Page : 24
푃 푁 <퐸2
=1
2휋 푁2
푒 푑푥 =1휋푁
푒 푑푥;
퐿푒푡 푥 + 퐸
2
푁2
= 푡; 푑푥 =푁푡
푑푡 ⇒ 푃 푁 <퐸2
=1
2휋 푒 푑푡 = 푄
퐸푁
(∵ sign in the limit is removed since Area of Gaussian Pulse is same)
Symbols are equiprobable 푃(푒) = 푃 + 푃
∴ 푃(푒) =12
푄퐸푁
+12
푄 퐸푁
= 푄퐸푁
28. A transmission line with a characteristic impedance of 100 is used to match a 50 section to a
200 section. If the matching is to be done both at 429 MHz and 1 GHz, the length of the transmission line can be approximately (A) 82.5 cm (B) 1.05 m
(C) 1.58 m (D) 1.75 m
[Ans. C]
29. The input x(t) and output y(t) of a system are related as 푦(푡) = ∫ 푥(휏) cos(3휏) 푑휏. The system is (A) time-invariant and stable (B) stable and not time-invariant
(C) time-invariant and not stable (D) not time-invariant and not stable
[Ans. D] Assume a bounded input x(t) = cos (3t)
푦(푡) = 푐표푠 (3휏) 푑휏
Thus, y(t) is unbounded, hence, system is not stable.
GATE 2012 Question Paper ECE
Page : 25
Assume 푥(푡) = 훿(푡)
푦(푡) = 훿 (휏) cos(3휏) 푑휏
= 푢(푡) cos(0) = 푢(푡)
Time shifted input 푥 푡 − = 훿 푡 −
푦 (푡) = 훿 휏 −휋6
cos(3휏) 푑휏
= 푢(푡) cos 3 ×휋6
= 0
푦 (푡) ≠ 푦 푡 − ⟹ System is not time – invariant
30. The feedback system shown below oscillates at 2 rad/s when
(A) K = 2 and a = 0.75 (B) K = 3 and a = 0.75
(C) K = 4 and a = 0.5 (D) K = 2 and a = 0.5
[Ans. A] 1 + 퐺(푆)퐻(푆) = 푆 + 푎푠 + (2 + 푘)푠 + 1 + 푘 s 1 (2 + 푘)
s 푎 (2 + 푘)
s 푎(2 + 푘) − (2 + 푘)0
s (1 + k)
For system to oscillate, 푎(2 + 푘) − (1 + 푘) = 0
푎 =1 + 푘2 + 푘
퐊 (퐬 + ퟏ)퐬ퟑ + 퐚퐬ퟐ + ퟐ퐬 + ퟏ
Y(s) +
-
R(s)
GATE 2012 Question Paper ECE
Page : 26
퐴. 퐸 ⇒ 푎푠 + (1 + 푘) = 0 ⇒ 푠 =1 + 푘
푎= 2 ⇒
1 + 푘푎
= 푎 ⇒ 2 + 푘 = 4 ⇒ 푘 = 2
Thus a = 0.75
31. The Fourier transform of a signal h(t) is H(jω) = (2 cos ω) (sin 2ω)/ ω. The value of h(0) is (A) 1/4 (B) 1/2
(C) 1 (D) 2
[Ans. C] Approach – 1
2 cos 휔sin 2휔
휔= 푒 + 푒
sin 2휔휔
⟷ ℎ(푡) = ℎ (푡 − 1) + ℎ (푡 + 1)
Approach – 2 Given: H(jω) = (2 cosω) (sin 2ω) ω⁄ Solution: 퐻(푗휔) = ω ω
퐻(푗휔) =sin 3ω
휔+
sinω
휔
1/2
-3 3
−ퟑ −ퟏ ퟏ ퟑ
ퟏ/ퟐ
풉(풕)
ퟏ
퐬퐢퐧 ퟐ흎흎
−ퟐ ퟐ 풕
ퟏ/ퟐ = 풉 (풕)
GATE 2012 Question Paper ECE
Page : 27
ℎ(푡) =
ℎ(0) =12
+12
ℎ(0) = 1
32. The state variable description of an LTI system is given by 푥푥푥
=0 푎 00 0 푎
푎 0 0
푥푥푥
+001
푢
푦 = (1 0 0) 푥푥푥
where y is the output and u is the input. The system is controllable for (A) 푎 ≠ 0, 푎 = 0, 푎 ≠ 0 (B) 푎 = 0, 푎 ≠ 0, 푎 ≠ 0
(C) 푎 = 0, 푎 ≠ 0, 푎 = 0 (D) 푎 ≠ 0, 푎 ≠ 0, 푎 = 0
[Ans. D] The controllability matrix = [퐵 퐴퐵 퐴 퐵]
퐴 =0 푎 00 0 푎
푎 0 0
퐵 =001
1/2
-1 1
1/2
-3 3
+
1/2
-1 1
GATE 2012 Question Paper ECE
Page : 28
⇒ Controllability matrix =0 0 푎 푎0 푎 01 0 0
⇒ a ≠ 0 a ≠ 0 a can be zero For system to be controllable, determinant of control ability matrix should not be zero.
33. Assuming both the voltage sources are in phase, the value of R for which maximum power is transferred from circuit A to circuit B is
(A) 0.8 Ω (B) 1.4 Ω
(C) 2 Ω (D) 2.8 Ω
[Ans. A]
From KVL: 10 = (2 + R)i + (i − i )(−j)
10 = (2 + R − j)i + ji -------------- (1) 3 = −j(i − i ) ⟹ 3 = −ji + ji ------------- (2)
From (1) & (2): i = ; i = − 3j
−
R 2
3V 10V −j 퐢ퟏ
퐢ퟐ + +
−
Circuit A Circuit B
~ ~
2 R
10 V 3V + +
- -
Circuit A Circuit B
-j1
GATE 2012 Question Paper ECE
Page : 29
From (2) i − i = 3j Power transfer from circuit A to circuit B P = i R + (i − i ) (−j) + 3i
= ( ) + 9j + 3 − 3j = ( )( )
= 0 for max power ⟹ R = 0.8 Ω
34. Consider the differential equation ( ) + 2 ( ) + 푦(푡) = 훿(푡) with 푦(푡)| = −2 and = 0
The numerical value of is
(A) −2 (B) −1
(C) 0 (D) 1
[Ans. D] Approach – 1 푑 푦 (푡)
푑푡+
2 푑푦 (푡)푑푡
+ 푦 (푡) = 훿(푡)
Converting to s – domain, s y(푠) − 푠푦(0) − 푦 (0) + 2[푠푦(푠) − 푦(0)] + 푦(푠) = 1 [푠 + 2푠 + 1]푦(푠) + 2푠 + 4 = 1
푦(푠) =−3 − 2푠
(푠 + 2푠 + 1)
Find inverse Laplace transform 푦(푡) = [−2푒 − 푡푒 ] 푢(푡) 푑푦(푡)
푑푡= 2푒 + 푡푒 − 푒
푑푦(푡)푑푡
= 2 − 1 = 1
Approach – 2 푑 푦(푡)
푑푡+
2푑푦(푡)푑푡
+ 푦(푡) = 훿(푡)
Applying Laplace Transform on both sides
s y(s) − sy(0 ) −dy푑푡
+ 2 sy(s) − y(0 ) + y(s) = 1
s y(s) + 2s + 2sy(s) + y(s) = 1 − 4
GATE 2012 Question Paper ECE
Page : 30
푦(푠) =−3 − 2푠
푠 + 2푠 + 1=
−3(푠 + 1) −
2푠(푠 + 1)
푦(푡) = −3푡푒 − 2푑푑푡
(푡푒 )
= −3푡푒 − 2(−푡푒 + 푒 ) 푦(푡) = −te − 2e 푑푦(푡)
푑푡= +푡푒 + (푒 ) + 2푒
= 푡푒 + 푒 푑푦(푡)
푑푡= 1
35. The direction of vector A is radially outward from the origin, with |퐴| = 푘푟 where r = x +
y + z and k is a constant. The value of n for which ∇∙A = 0 is (A) −2 (B) 2
(C) 1 (D) 0
[Ans. A] We know that, ∇. 퐴 = (푟 퐴 )
Now, ∇. 퐴 = (푟 퐴 )
=1푟
휕휕푟
(푘푟 ) =푘푟
(푛 + 2) 푟
= 푘(푛 + 2) 푟 ∴ For, ∇. 퐴 = 0, ⇒ (푛 + 2) = 0 ⇒ 푛 = −2
36. A fair coin is tossed till a head appears for the first time. The probability that the number of required tosses is odd, is (A) 1/3 (B) 1/2
(C) 2/3 (D) 3/4
[Ans. C] If required tosses is odd the possible sequence of heads and tails will be: H, TTH, TTTTH, TTTTTT H, …………… Since, these events are mutually exclusive, we can add the prob. of each event. Thus, the required prob. is given by 푃 = + × × + × × × × + ……………..
GATE 2012 Question Paper ECE
Page : 31
This is a geometric series with 푎 = , 푟 =
푃 =12
1 − 14
=1234
=23
37. In the CMOS circuit shown, electron and hole mobilities are equal, and M1 and M2 are equally
sized. The device M1 is in the linear region if
(A) V < 1.875 푉 (B) 1.875 푉 < 푉 < 3.125 푉
(C) V > 3.125 푉 (D) 0 < 푉 < 5 푉
[Ans. A]
W퐿
=W퐿
μ M = μ M
M ⎯ Linear Region
Concept: When M is in Linear Region, M will be with cutoff or saturation. If M is in cutoff I = 0 hence I = 0
5 V
퐕퐓퐩 = ퟏ퐕
퐕퐢퐧
M1
M2 퐕퐓퐧 = 1V
5 V
퐕퐓퐩 = ퟏ퐕
퐕퐢퐧
M1
M2 퐕퐓퐧 = 1V
GATE 2012 Question Paper ECE
Page : 32
I = μ C W퐿
(V − V )V −V
2= 0
⇒ V = 2 (V − V )
⇒ 5 − 푉 = 2(5 − 푉 − 1) ⇒ 푉 =3 + 푉
2
Now I = 0 ⇒ V = 5V hence V = 4V If V = 4V ⇒ V < V for cutoff 4 ≮ 퐼푉 (false so M must be in saturation then I = I
μ cW퐿
(V + V )V −V
2=
V − V2
휇 푐 푊퐿
∴ (5 − 푉 − 1) (5 − 푉 ) −(5 − 푉 )
2=
(푉 − 1)2
∴ 푉 = 1.833 푉 So the device M is in the linear region if V < 1.833 푉
38. A binary symmetric channel (BSC) has a transition probability of 1/8. If the binary transmit symbol X is such that P(X=0) ≈ 9/10, then the probability of error for an optimum receiver will be (A) 7/80 (B) 63/80
(C) 9/10 (D) 1/10
[Ans. D]
39. The signal m(t) as shown is applied both to a phase modulator (with k as the phase constant) and a frequency modulator (with k as the frequency constant) having the same carrier frequency.
The ratio k /k (in rad/Hz) for the same maximum phase deviation is (A) 8π (B) 4π
(C) 2π (D) π
0
2
2 4 6 8 -2
-2
m(t)
t (Seconds)
GATE 2012 Question Paper ECE
Page : 33
[Ans. B] Approach – 1 In phase modulation, Maximum Phase deviation = K |m(t)| = K . 2 In Frequency modulation, Maximum Phase deviation = 2휋 푘 ∫ 2 푑푡 = 2휋 푘 × 4
Now K . 2 = 2πK × 4 ⇒ = 4휋
Approach – 2
S (t) = A cos 2πf t + 2πk m(τ) dτ
S (t) = A cos 2πf t + k m(t) Given same maximum phase deviation
k (m(t)) = 2휋푘 푚(휏) 푑휏
k (2) = 2π k (4) (Explanation given belo) 푘푘
= 4휋
40. The magnetic field along the propagation direction inside a rectangular waveguide with the cross-section shown in the figure is H = 3 cos(2.094 × 10 x) cos(2.618 × 10 y) cos(6.283 × 10 t − βz)
풎(흉) 풅흉
ퟒ ퟐ풕 −ퟐ풕
ퟎ ퟐ ퟒ
GATE 2012 Question Paper ECE
Page : 34
The phase velocity v of the wave inside the waveguide satisfies (A) v > 푐 (B) v = c
(C) 0 < 푣 < 푐 (D) v = 0
[Ans. Marks to All*] (*Ambiguous options)
41. The circuit shown is a
(A) low pass filter with f = ( ) rad/s
(B) high pass filter with f = rad/s
(C) low pass filter with f = rad/s
(D) high pass filter with f = ( ) rad/s
[Ans. B] The transfer function of the N/W is ( )
( ) = = −
This represents H.P filter with cutoff frequency at
42. Let y[n] denote the convolution of h[n] and g[n], where h[n] – (1/2) u[n] and g[n] is a causal
sequence. If y[0] = 1 and y[1] = 1/2, then g[1] equals
+ -
+ 5V
−5V
퐑ퟏ C
퐑ퟐ
+ −
Input Output
+
− −
Y
X 3 cm
1.2 cm
GATE 2012 Question Paper ECE
Page : 35
(A) 0 (B) 1/2
(C) 1 (D) 3/2
[Ans. A]
푦[푛] =12
푔(푛 − 푘)
푦[0] =12
푔(−푘) = 1
⇒12
푔(0) = 1
⇒ 푔(0) = 1 since g(n) is Causal sequence 푔(−1), 푔 − 2),………….. = 0
푦[1] =12
푔[1 − 푘]
⇒12
푔[1] +12
푔(0) = 12
푔[1] = 0
43. The state transition diagram for the logic circuit shown is
D Q
CLK 퐐
X1
X0 Y
A
Select
2 – 1 MUX
GATE 2012 Question Paper ECE
Page : 36
[Ans. D] A = 0, Y = QA = 1, Y = Q
whenever A = 1, output gets into same state
Whenever A = 0, output gets toggled
44. The voltage gain A of the circuit shown below is
(A) |퐴 | ≈ 200 (B) |퐴 | ≈ 100
(C) |퐴 | ≈ 20 (D) |퐴 | ≈ 10
C
13.7 Volts
100k
10k 훃 = 100
C 퐯퐨
퐯퐢
12k
Q = 0 Q = 1
A = 0
A = 0
A = 1 A = 1
Q = 0 Q = 1
A = 0
A = 1
A = 0 A = 1
Q = 0 Q = 1
A = 0
A = 0
A = 1 A = 1
(C) (D)
Q = 0 Q = 1
A = 1
A = 0
A = 1 A = 0
Q = 0 Q = 1
A = 1
A = 1
A = 0 A = 0
(A) (B)
GATE 2012 Question Paper ECE
Page : 37
[Ans. D] Approach – 1 This is voltage shunt feedback if we neglect base to emitter voltage. Feedback factor P =
×
= – 1 Now with F/B,
A =VI
= 12 × 10
So with feedback = A =
β = ×
β 105
But I =×
=
VV
1010
10
Approach – 2
KVL in input loop, 13.7 − (퐼 + 퐼 )12푘 − 100푘 (퐼 ) − 0.7 = 0 ⇒ 퐼 − 9.9휇퐴; I = βI = 0.99mA; I = 1mA
∴ 푟 = = 26Ω; z = βr = 2.6kΩ; ∴ A = ( || ) = 412
푧 = 푧 || = 221Ω; A = A = (412)
|퐴 | ≈ 10
10k ퟏퟎퟎ풌ퟏ − 푨풗
100k 12k
퐕ퟎ
~
GATE 2012 Question Paper ECE
Page : 38
Approach – 3 This is a shunt – shunt feedback amplifier output voltage is sampled and current is feedback , , , DC circuit reduces to
V = 100 I + 0.7 ---------------- (1)
. = (훽 + 1) 퐼 -------------- (2) From (1) and (2) 13.7 − 100 퐼 − 0.7
12≃ 훽퐼 = 100 퐼
⇒ 퐼 = 0.01 푚퐴 and I = βI = 1 mA
To divide R to input and output side
2 Feedback N/W
퐑퐢퐟
1 Feedback N/W 2
퐑퐨퐟
퐑퐟
퐈퐬 =퐕퐬
푹풔
퐑퐬 퐫훑 +
− 퐯훑 퐠퐦퐯훑
퐑퐜
퐯ퟎ
FEED BACK NETWORK
퐈퐁
ퟏퟎퟎ 퐊
+ ퟎ. ퟕ퐕
−
퐕퐜 퐯ퟎ
ퟏퟐ 퐊훀
ퟏퟑ. ퟕ퐕
GATE 2012 Question Paper ECE
Page : 39
So
So, our circuit redeces to,
퐴 =푉퐼
= −푔 푅 ||푅 푣
푣푅 ||푅 ||푟
= −푔 푅 ||푅 푅 ||푅 ||푟
Now R = R = 100kΩ, R = 12kΩ, rπ = = 2.5푘Ω, and R = 10 k
Also, g = =
퐴 = −840.336 푘Ω ---------------- (1) Note: This is a trans-resistance amplifier. Now feedback factor, for, shunt – shunt configuration is
훽 ≡퐼푉
퐈퐟
퐑퐟 ±
퐯ퟎ
퐈퐟 ퟏ Feedback N/W ퟐ ± 퐕ퟎ
퐈퐬
퐑퐬 퐑퐢퐟 퐫훑 +
−
퐯훑 퐠퐦퐯훑 퐑퐨퐟 퐑퐜
퐯ퟎ
퐑퐟
퐑퐢퐟 = 퐑퐟 퐑퐨퐟 = 퐑퐟
퐑퐟
GATE 2012 Question Paper ECE
Page : 40
푣퐼
=1훽
⇒ 훽 =퐼푣
= −1
푅
So here 훽 =Ω
---------- (2) So gain after feedback
= ⇒ = ..
≈ 10 (Approx.)
So, 푉푉
=푉
퐼 푅=
1푅
×푣퐼
=1
10푘× 10 = 10
So |퐴 | ≈ 10
45. If V − V = 6 V, then V − V is
(A) −5V (B) 2V
(C) 3V (D) 6V
[Ans. A] 퐼 = = = 3퐴; Since current entering any network is same as leaving in V − V branch also it is I = 3A
R 퐕퐀 퐕퐁
퐕퐃
R R R R R
R
R
퐕퐂
2
1
5 V 2A
10V
+ -
+
-
GATE 2012 Question Paper ECE
Page : 41
V = 2 + 3 + V = 5 + V ; V − V = −5V
46. The maximum value of 푓(푥) = 푥 − 9푥 + 24푥 + 5 in the interval [1, 6] is (A) 21 (B) 25
(C) 41 (D) 46
[Ans. C] f(x) = x − 9x + 24x + 5 f(x) = x − 9x + 24x + 5
( ) = 3x − 18x + 24 = 0
x − 6x + 8 = 0 (x − 2)(x − 4) = 0 x = 2, x = 4 (critical points)
( ) = 6x − 18 = 6(2) − 18 < 0 (for x=2)
( ) = 6(4) – 18 > 0 (for x=4) ∴ Maximum at x = 2 f(2) = 2 − 9(2) + 24(2) + 5 = 8 − 36 + 48 + 5 = 25 We have to find the maximum in the close interval [1, 6]
R 퐕퐀 퐕퐁
퐕퐃
R R R R R
R
R
퐕퐂
2
1
5 V 2A
10V
-
+
-
퐕퐂
1
2A 퐕퐃
퐕퐂
1 - +
2V
3A 퐕퐃
GATE 2012 Question Paper ECE
Page : 42
Hence, we have to check at end points also (as extremum exists at the critical points or end points) f(6) = (6) − 9(6) + 24(6) + 5 = 41 ∴ Maximum value = 41
47. Given that
퐴 = −5 −32 0 and 퐼 = 1 0
0 1 , the value of A is
(A) 15 A + 12 I (B) 19 A + 30 I
(C) 17 A + 15 I (D) 17 A + 21 I
[Ans. B]
Given: 퐴 = −5 −32 0
We know that Every characteristic equation satisfies its own matrix
|퐴 − 휆퐼| = 0 ⇒ −5 − 휆 −32 −휆 = 0
+5휆 + 휆 + 6 = 0 ⇒ 휆 + 5휆 + 6 = 0 We know by Cayley Hamilton Theorem that every characteristic equation satisfies its own matrix. ∴ 퐴 + 5퐴 + 6퐼 = 0 ⇒ 퐴 + 5퐴 + 6퐴 = 0 퐴 + 5(−5퐴 − 6퐼) + 6퐴 = 0 ∴ A = 19A + 30I Common Data Questions
Common Data for Question 48 and 49:
With 10 V dc connected at port A in the linear nonreciprocal two-port network shown below, the following were observed: (i) 1 Ω connected at port B draws a current of 3 A (ii) 2.5 Ω connected at port B draws a current of 2 A
GATE 2012 Question Paper ECE
Page : 43
48. With 10 V dc connected at port A, the current drawn by 7 Ω connected at port B is
(A) 3/7 A (B) 5/7 A
(C) 1 A (D) 9/7 A
[Ans. C] The given network can be replaced by a Thevenin equivalent with V and R as Thevenin voltage and Thevenin Resistance. Now we can write two equations for this V = 3(R + 1) V = 2(R + 2.5) Solving these two equations we get R = 2 and V = 9. Now using the same equation with current unknown, 9 = 퐼 × 2 + 7 × 퐼 ⇒ 퐼 = 1퐴
49. For the same network, with 6 V dc connected at port A, 1 Ω connected at port B draws 7/3 A. If 8 V dc is connected to port A, the open circuit voltage at port B is (A) 6 V (B) 7 V
(C) 8 V (D) 9 V
[Ans. C]
∴ V = (R + 1) = 7V
R is same whatever the input voltage.
6V
ퟕퟑ
퐀
150 100
250
퐑퐭퐡
퐕퐭퐡ퟔ퐕
ퟕퟑ
퐀
± ±
A
+
−
B
GATE 2012 Question Paper ECE
Page : 44
Since, two port network is linear non reciprocal, output (at port 2) can be expressed as a linear function of input. i.e. V = aV + b 9 = 10a + b -------------------(I) 7 = 6a + b -------------------(II) From (I) & (II), a = 0.5, b = 4 ∴ V = 0.5(8) + 4 = 8V Common Data for Questions 50 and 51:
In the three dimensional view of a silicon n-channel MOS transistor shown below, δ = 20 nm. The transistor is of width 1 μm. The depletion width formed at every p-n junction is 10 nm. The relative permittivities of Si and SiO , respectively, are 11.7 and 3.9, and ε = 8.9 × 10 F/m.
50. The gate-source overlap capacitance is approximately
(A) 0.7 fF (B) 0.7 pF
(C) 0.35 fF (D) 0.24 pF
훅
G
1nm 1m
1m
0.2m 0.2m
0.2m 0.2m
D
D S 훅
B
p substrate
± 퐕퐭퐡ퟖ퐕 = 퐕퐎퐂ퟖ퐕 =?
+
−
ퟖ퐕
± ± 퐕퐭퐡ퟏퟎ퐕 = 퐕퐎퐂ퟏퟎ퐕 = ퟗ퐕
+
−
+
−
퐕퐭퐡ퟔ퐕 = 퐕퐎퐂ퟔ퐕 = ퟕ퐕 ퟏퟎ퐕 ퟔ퐕
GATE 2012 Question Paper ECE
Page : 45
[Ans. A] δ = 20 nm Depletion width at each junction = 10 nm t = 1nm ∈ = 11.7 ∈ , = 3.9
Gate source overlap capacitance, Formulae: 퐶 = ∈ ∈ Overlap area will be, A = δ × w and medium Si O So
퐶 =퐴 ∈ ∈
푑=
훿푤 ×∈ ×∈푑
Here d = t i.e. oxide thickness So
C =δw ∈ ∈
푡=
20 × 10 × 1 × 10 3.9 × 8.9 × 101 × 10
퐹
⇒ C = 0.69 fF Or C ≃ 0.7fF
51. The source-body junction capacitance is approximately
(A) 2 fF (B) 7 fF
(C) 2 pF (D) 7 pF
[Ans. B]
훅
W
1nm
L
0.2m
0.2m
퐭퐨퐱
GATE 2012 Question Paper ECE
Page : 46
Formulae: 퐶 = ∈ ∈ Find source body junction area
Area will be, four wall shown in red + area of base in blue. So A = (0.2 μm + 0.2 μm + 0.2 μm) ×1 μm + (0.2 μm * 0.2μm) Side wall along length + base Two ends of parallel piped So, A = 0.68 × 10 m Now, Given, depletion width at all junctions is 10nm, and here material is silicon, so ∈ = 11.7 So,
C =0.68 × 10 × 11.7 × 8.9 × 10
10 × 10 퐹
⇒ C = 7 × 10 F or C = 7fF Linked Answer Questions
Statement for Linked Answer Question 52 and 53:
An infinitely long uniform solid wire of radius a carries a uniform dc current of density . 52. The magnetic field at a distance r from the center of the wire is proportional to
(A) r for r < a and l/r for r > a (B) 0 for r < a and l/r for r > a
(C) r for r < a and l/r for r > a (D) 0 for r < a and l/r for r > a
[Ans. C]
H. d푙 = I
When we take contour for r > a,
0.2 0.2
1 훍m
GATE 2012 Question Paper ECE
Page : 47
I = J. a = I (say) ∮ H. dl = 퐻. 2r ⟹ H. 2r = I for r > a
∴ H =
; r > a
For Contour r < a, I =
= J
Hence, H.2r = J.
⟹ H ∝ r ; r < a
53. A hole of radius b (b < a) is now drilled along the length of the wire at a distance d from the center of the wire as shown below.
The magnetic field inside the hold is (A) Uniform and depends only on d (B) Uniform and depends only on b (C) Uniform and depends on both b and d (D) Non uniform [Ans. A] Statement for Linked Answer Questions 54 and 55:
Transfer function of a compensator is given as
G (s) =s + a푠 + 푏
d
a
b
r
a
GATE 2012 Question Paper ECE
Page : 48
54. G (s) is a lead compensator if (A) 푎 = 1, 푏 = 2 (B) 푎 = 3, 푏 = 2
(C) 푎 = −3, 푏 = −1 (D) 푎 = 3, 푏 = 1
[Ans. A]
= 푡푎푛휔푎
− 푡푎푛휔훽
For phase lead should be positive
⇒ 푡푎푛휔푎
> 푡푎푛휔훽
⇒ 푎 < 푏 Both option (A) and (C) satisfies, It may be observed that option (C) will have poles and zero in RHS of s – plane, thus not possible (not a practical system). Therefore, it can be concluded that Option (A) is right.
55. The phase of the above lead compensator is maximum at (A) √2 rad/s (B) √3 rad/s
(C) √6 rad/s (D) 1/√3 rad/s
[Ans. A] 훚 = geometric mass of two carrier frequencies = √2 × 1 = √2 푟푎푑/푠푒푐 General Aptitude (GA) Questions (Compulsory)
Q. 56 – Q. 60 carry one mark each.
56. If (1.001) = 3.52 and (1.001) = 7.85, then (1.001) = (A) 2.23 (B) 4.33
(C) 11.37 (D) 27.64
[Ans. D] (1.001) = 3.52 and (1.001) = 7.85, then (1.001) × (1.001) = 3.52 × 7.85 or (1.001)( ) = 3.52 × 7.85 or (1.001) = 27.64
GATE 2012 Question Paper ECE
Page : 49
57. Choose the most appropriate alternative from the options given below to complete the following sentence: If the tired soldier wanted to lie down, he _______ the mattress out on the balcony. (A) should take (B) shall take
(C) should have taken (D) will have taken
[Ans. A]
58. Choose the most appropriate word from the options given below to complete the following sentence: Given the seriousness of the situation that he had to face, his _____ was impressive (A) beggary (B) nomenclature
(C) jealousy (D) nonchalance
[Ans. D] Nonchalance means behaving in a calm and relaxed way; giving the impression that you are not feeling any anxiety.
59. Which one of the following options is the closest in meaning to the word given below? Latitude (A) Eligibility (B) Freedom
(C) Coercion (D) Meticulousness
[Ans. B] Latitude means freedom to choose what you do or the way that you do it.
60. One of the parts (A, B, C, D) in the sentence given below contains an ERROR. Which one of the following is INCORRECT? I requested that he should be given the driving test today instead of tomorrow. (A) requested that (B) should be given
(C) the driving test (D) instead of tomorrow
[Ans. B] The correct statement should be -" i requested that he be given the driving test today instead of tomorrow."
GATE 2012 Question Paper ECE
Page : 50
Q. 61 – Q. 65 carry two marks each.
61. One of the legacies of the Roman legions was discipline. In the legions, military law prevailed and discipline was brutal. Discipline on the battlefield kept units obedient, intact and fighting, even when the odds and conditions were against them. Which one of the following statements best sums up the meaning of the above passage? (A) Through regimentation was the main reason for the efficiency of the Roman legions even in
adverse circumstances. (B) The legions were treated inhumanly as if the men were animals. (C) Discipline was the armies’ inheritance from their seniors. (D) The harsh discipline to which the legions were subjected to led to the odds and conditions
being against them. [Ans. A] The passage states that the strict discipline kept the armies intact even when condition were against them.
62. Raju has 14 currency notes in his pocket consisting of only Rs. 20 notes and Rs. 10 notes. The total money value of the notes is Rs. 230. The number of Rs. 10 notes that Raju has is (A) 5 (B) 6
(C) 9 (D) 10
[Ans. A] Let the number of Rs. 10 notes = x And the number of Rs. 20 notes = y Now, x + y = 14 and 10x + 20y =230. Solving them, we get x = 5 and y = 9.
63. There are eight bags of rice looking alike, seven of which have equal weight and one is slightly heavier. The weighing balance is of unlimited capacity. Using the balance, the minimum number of weighing required to identify the heavier bag is (A) 2 (B) 3
(C) 4 (D) 8
[Ans. A]
GATE 2012 Question Paper ECE
Page : 51
64. The data given in the following table summarizes the monthly budget of an average household. Category Amount (Rs.) Food 4000 Clothing 1200 Rent 2000 Savings 1500 Other expenses 1800
The approximate percentage of the monthly budget NOT spent on savings is (A) 10% (B) 14%
(C) 81% (D) 86%
[Ans. D] Total Income = 10500 Savings =1500 Percentage of budget spent on savings = × 100 = 14.28% Percentage of budget not spent on savings = 86%
65. A and B are friends. They decide to meet between 1 PM and 2 PM on a given day. There is a condition that whoever arrives first will not wait for the other for more than 15 minutes. The probability that they will meet on that day is (A) 1/4 (B) 1/16
(C) 7/16 (D) 9/16
[Ans. C] We can solve this question graphically. Let x axis represents the time when A reaches the meeting place and y axis represents the time when B reaches the same place.
GATE 2012 Question Paper ECE
Page : 52
Given conditions are Total area is represented by 0 x 1 and 0 y 1. Total area = 1 × 1 = 1 unit Desired area is represented by 0 x 1, 0 y 1, x – y 1/4 and y – x 1/4
Desired area = 1 3 3 1 3 3 7
12 4 4 2 4 4 16
Required probability = 7 7
16 1 16desired area
total area
(0.75, 4)
(4, 0.75)
0.25
0.25
1
1
Y
X