INFOMATHS
MOCK TEST-1 NIMCET
Exam Pattern:
NIMCET-2014 test will be conducted with only one question paper containing 120 multiple choice
questions covering the following subjects. Multiple Choice Questions will be written in English
Language only and will not be translated into any other language.
1. Mathematics
50 questions
2. Analytical Ability & Logical Reasoning
40 questions
3. Computer Awareness
10 questions
4. General English
20 questions
 Each correctly answered question will carry FOUR marks and each wrongly answered question will lead
to NEGATIVE ONE mark.
 The candidates are advised not to attempt such questions if they are not sure of the correct answer.
 No deduction from the total score will, however, be made if a question is unanswered.
 More than one answer indicated against a question will be negatively marked.
 The candidates have to mark the responses in the OMR sheet using black or blue ink ball point pen only.
Qualifying Criteria for Allotment of Rank
A Candidate securing zero or negative marks either in Mathematics or Total Marks in NIMCET-2014 test will
be disqualified.
Based on the marks obtained by a qualified candidate in NIMCET-2014 test, a rank will be allotted by
adopting the following criteria.
1. The marks obtained in Mathematics, Logical Reasoning, Computer Awareness, English, will be
multiplied by a factor of 3, 1½ , 2 and 1 respectively. Thus maximum weighted marks will be 1000.
2. Ranking will be based on total weighted marks obtained by a candidate. In case of a tie, it will be
resolved based on weighted marks in Mathematics, then on weighted marks in Logical reasoning
and then on weighted marks in Computer Awareness.
3. In case the tie is not resolved by the above criteria stated in the above paragraph, then it will be
resolved by age i.e., in favour of elder candidate.
9. The co-efficients of x3 in the expansion of (1 – x +
MATHS
1. A1, A2, A3 and A4 are subsets of a set U containing
x2)5 is
75 elements with the following properties : Each
(a) 10
(b) – 20 (c) – 30 (d) – 50
subset contains 28 elements; the intersection of any 10. If log103 = 0.477, the number of digits in 340 is :
two of the subsets contains 12 elements; the
(A) 18
(B) 19
(C) 20
(D) 21
intersection of any three of the subsets contains 5 11. How many different words can be formed by
elements; the intersection of all four subsets contains
jumbling the word MISSISSIPPI in which no two S
1 elements. The number of elements belongs to none
are adjacent?
of the four subsets is
(a) 8.6C4.7C4 (b) 6.78C4 (c) 6.8.7C4
(d)
(a) 15
(b) 17
(c) 16
(d) 18
7.6C4.8C4
2. The set having only one subset is
12. The number of even proper factors of 1008 is
(a) { }
(b) {0} (c) {{}} (d) None of these
(a) 24
(b) 22
(c) 23
(d) 25
3. How many real solutions does the equation x7 + 14x5 13. In how many different ways can the letters of the
+ 16x3 + 30x – 560 = 0 have?
word DISTANCE can be arranged so that all the
(a) 7
(b) 1
(c) 3
(d) 5
vowels come together
4. The roots of the quadratic equation x2 + x – 1 = 0 are
(a) 720 (b) 4320 (c) 4200 (d) 3400
14.
Four students have to be chosen – 2 girls as captain
 1  5 1  5 
 1 5 1 5 
(a) 
,
,
 (b) 

and vice – captain and 2 boys as captain and vice –
2
2 
2 

 2
captain. There are 15 eligible girls and 12 eligible
boys. In how many ways can they be chosen if
 1  5 1  5 
 1  5 1  5 
(c) 
(d) 
,
,


Sunitha is sure to be captain?
2
2 
2 

 2
(a) 114 (b) 1020 (c) 360 (d) 1848
5. The arithmetic mean of 9 observations is 100 and
15. Probability of happening of an event A is 0.4
that of 6 observations is 80, then the combined mean
Probability that in 3 independent trials, event A
of all the 15 observations will be :
happens atleast once is:
(A) 100 (B) 80
(C) 90
(D) 92
(a) 0.064 (b) 0.144 (c) 0.784 (d) 0.4
6. If x, 2x+2, 3x+3 are in G.P then the 4th term is :
16. An anti aircraft gun can take a maximum of four
(A) 27
(B) –27 (C) 13.5 (D) –13.5
shots at an enemy plane moving away from it. The
7. In a polygon, the smallest angle is 88 and common
probabilities of hitting the plane at first, second, third
difference is 10, the number of sides is :
and fourth shot are 0.4, 0.3, 0.2 and 0.1 respectively.
(a) 10
(b) 8
(c) 5
(d) N.O.T.
The probability that the gun hits the plane then is
8. The remainder when 599 is divided by 13 is :
(a) 0.6972 (b) 0.6978 (c) 0.6976 (d) 0.6974
(A) 6
(B) 8
(C) 9
(D) 10
1
INFOMATHS/MCA/MATHS/
INFOMATHS
1 0 k
32. Matrix A  2 1 3 is invertible for
k 0 1
(a) k = 1
(b) k = - 1
(c) all real k
(d) None of these
(e) None of these
33. If A is a singular matrix, then A. adj A is
(a) a scalar matrix
(b) a zero matrix
(c) an identity matrix
(d) an orthogonal
matrix
 3 1
2
34. If A  
, then A – 5A + 7l is
  1 2
17. A six faced die is a biased one. It is thrice more
likely to show an odd number than to show an even
number. It is thrown twice. The probability that the
sum of the numbers in the two throws is even, is.
(a) 4/8
(b) 5/8
(c) 6/8
(d) 7/8
18. Different words are written with the letters of
PEACE. The probability that both E’s come together
is :
(a) 1/3
(b) 2/5
(c) 3/5
(d) 4/5
19. The elevation of the tower 100 meters away is 30.
The length of the tower is
75
50
(a)
mts
(b)
mts
3
3
125
100
(c)
mts
(d)
mts
3
3
20. If (1 + tan 1) (1 + tan2) … (1 + tan 45) = 2n, then
the value of n is
(a) 21
(b) 22
(c) 23
(d) 24
2. The value of sin 12 and 48 sin 54
(a) sin 30 (b) sin230 (c) sin330 (d) cos3 30
1
1
22. The value of 2 tan 1  tan 1 is
3
7
(a) 
(b)

2
(c)

4
1
(a) 
0
0
(c) 
0
0
1 
0 1 
(b) 

1 0 
0
(d) N.O.T
1 
1  1 1
35. If A= 1 2 0 then the value of |adj A| is equal to
1 3 0
(a) 5
(b) 1
(c) 0
(d) N.O.T
(d) None
6
36. The value of the integral

x
dx is
23. The distance between the parallel lines y = 2x + 4
3
9-x+ x
and 6x = 3y + 5 is
(a) 1
(b) 1/2
(c) 3/2
(d) 2
 /2
17
3
17 5
dx
(A)
(B) 1
(C)
(D)
37. The value of 
is
2
15
3
5
0 1  tan x
24. The point of intersection of the lines represented by
(a) 0
(b) 1
(c) /4
(d) /2
2x2 – 9xy + 4y2 = 0 is
38. The area enclosed between the curves y = x and y2 =
(a) (0, 0) (b) (0, 1) (c) (1, 0) (d) (1, 1)
16x is:
25. If a, b, c are the roots of the equation x3 – 3px2 + 3qx
16
32
(a)
sq. unit
(b)
sq. unit
– 1 = 0, then the centroid of the triangle with vertices
3
3
 1  1
 1
64
128
 a, ,  b,  and  c,  is at the point
(c)
sq. unit
(d)
sq. unit
 a  b
 c
3
3
39. The solution of the differential equation
 p q
(a) (p, q)
(b)  , 
dy
3
3


 (4 x  y  1) 2 is:
dx
(c) (p + q, p – q)
(d) (3p, 3q)
(a) 4x + y + 1 = tan (2x + c)
(b) 4x + y + 1 = 2
26. If y = log2 (x) and F = (3, 27) the set onto which the
tan
(2x
+
c)
set F is mapped contains
(c) 2(4x + y + 1) = tan (2x + c) (d) tan (4x + y + 1)
(a) (0, 3) (b) (1, 3) (c) (0, 1) (d) (0, 2)
= 2x + c
27. If f(x) = sin (log x), then, the value of
ds
40. The solution of the equation
 t  s is :
f(xy) + f(x/y) – 2f(x) cos log (y) is
dt
(a) 0
(b) – 1
(c) 1
(d) – 2
(a) s  t  Ce t
(b) s  t  1  Ce 1
28. If f(x) + f(1 – x) = 2, then the value of
(c) s  t  Ce t
(d) s  t  Ce t  1
 1 
 2 
 2000 
f
 f
  ...  f 
 is
2
 2001 
 2001 
 2001 
1  i 
41.
The
value
of
is
(a) 2000 (b) 2001 (c) 1999 (d) 1998
2i
1  cos 3x
(a) 2
(b) 3 + i (c) 1
(d) – 1
29.
lim

x / 2 1  cos 5 x
42. The position vector of A, B, C and D are
 








(a) 0
(b) 1
(c) 3/5
(d) 9/25
i  j  k , 2 i  5 j ,3 i  2 j  3k , and i  6 j  k then the
dy
1
30. If y = 4x3 – 3x2 + 2x – 1, then
at x  is
angle between AB and CD is
dx
2
(a) 0
(b) /4
(c) /2
(d) 
(a) 0
(b) 1
(c) 2
(d) 3
31. For positive values of x, the minimum value of xx 43. Area of the parallelogram whose adjacent sides are i
+ j – k and 2i – j + k is
will be:
1
1
(a) 2 3 (b) 3 5 (c) 3 2 (d) 5 3
e
1e
1
 

(a) ee
(b)   (c) e e
(d)  
44. If a, b and c are unit vectors, then
e
e
2
INFOMATHS/MCA/MATHS/
INFOMATHS






IV. Some trees are needles.
(a) None follow
(b) Only either I or IV follows
  
(c) Only either I or IV, and II follow
If a , b , c are non-coplanar unit vectors such that
(d) Only III follow
 
(e) Only either I or IV, and III follow
  

b c
a   b  c  
, then the angle between a and 53. Statements : All jungles are buses. All books are
2


buses. All fruits are books.

Conclusions: I. Some fruits are jungles.
b is
II. Some buses are books.

3

III. Some buses are jungles.
(a)
(b)
(c)
(d) 
IV. All fruits are buses.
4
4
2
  
 


(a) Only I, II and III follow
If A B  C  0 , | A | 3, | B | 5, | C | 7 then the
(b) Only I, II and IV follow


(c) Only II, III and IV follow
angle between A and B is
(d) All follow
(a) /6
(b) 2/3 (c) 5/3 (d) /4
(e) None of these


54. Statements : Some spoons are bowls. All bowls are
If the vectors a  1, 2,3  and b   2,  , 4  are
knives. All knives are forks.
orthogonal, then the value of  is
Conclusions: I. All spoons are forks.
(a) 12
(b) 10
(c) 5
(d) – 5
II. All bowls are forks.
Out of 120 students, 80 students have taken
III. Some knives are bowls.
mathematics, 60 students have taken physics, 40
IV. Some forks are spoons.
students have taken chemistry, 30 students have
(a) Only II and III follow (b) Only II and IV follow
taken both physics and mathematics, 20 students
(c) Only III and IV follow (d) All follow
have taken both chemistry and mathematics and 15
(e) None of these
students have taken both physics and chemistry. If 55. Statements : All players are spectators. Some
every student has taken at least one course, then how
spectators are theatres. Some theatres are dramas.
many students have taken all the three courses?
Conclusions: I. Some dramas are spectators.
(a) 5
(b) 25
(c) 15
(d) 10
II. Some players are dramas.
In a cricket match, five batsmen A, B, C, D and E
III. Some theatres are players.
scored an average of 36 runs. D scored 5 more than
IV. All spectators are players.
E ; E scored 8 fewer than A ; B scored as many as D
(a) None follows
(b) Only I and III follow
and E combined ; and B and C scored 107 between
(c) Only II follows
(d) Only II and IV follow
them. How many runs did E score?
(e) All follow
(a) 20
(b) 45
(c) 28
(d) 62
A relation R is said to be partial order if
Directions (Questions 56-60) : Study the following
(a) R is reflexive, symmetric and transitive
information carefully and answer the questions given
(b) R is reflexive, asymmetric and transitive
below:
(c) R is reflexive, antisymmetric and transitive
All the roads of a city are either perpendicular or parallel
(d) R is reflexive, antisymmetric but not transitive
to one another. The roads are all straight. Roads A, B, C,
| a  b |2  | b  c |2  | c  a |2
(a) 9
(b) 4
(c) 8
(d) 6
45.
46.
47.
48.
49.
50.
D and E are parallel to one another. Roads G, H, I, J, K, L
and M are parallel to one another.
(i) Road A is 1 km east of road B.
1
(ii) Road B is km west of road C.
2
(iii) Road D is 1 km west of road E.
1
(iv) Road G is
km south of road H.
2
(v) Road I is 1 km north of road J.
1
(vi) Road K is
km north of road l.
2
(vii) Road K is 1 km north of road M.
56. Which is necessarily true?
(a) E and B intersect
(b) D is 2 km west of B.
(c) D is at least 2 km west of A.
(d) M is 1.5 km north of L.
(e) I is 1 km north of L.
57. If E is between B and C, which of the following is
false?
(a) D is 2 km west of A.
(b) C is less than 1.5 km from D.
ANALYTICAL ABILITY AND LOGICAL
REASONING
Directions (Questions 51-55) : In each of the following
questions, three statements are given followed by four
conclusions numbered I, II, III and IV. You have to take
the given statements to be true even if they seem to be at
variance with commonly known facts and then decide
which of the given conclusions logically follows from the
given statements disregarding commonly known facts.
51. Statements : All pencils are birds. All birds are skies.
All skies are hills.
Conclusions: I. All pencils are hills.
II. All hills are birds.
III. All skies are pencils.
IV. All birds are hills.
(a) Only I and II follow (b) Only I and III follow
(c) Only III and IV follow (d) All follow
(e) None of these
52. Statements : All needles are threads. All threads are
boxes. All trees are boxes.
Conclusions: I. No needle is tree.
II. Some trees are threads.
III. Some boxes are needles.
3
INFOMATHS/MCA/MATHS/
INFOMATHS
(c) Distance from E to B added to distance of E to C
1
is
km.
2
(d) E is less than 1 km from A.
(e) D is less than 1 km from B.
58. If road E is between B and C, then distance between
A and D is :
1
(a)
km
(b) 1 km
2
(c) 1.5 km
(d) 1.5 – 2 km
(e) 2 – 2.5 km
59. Which of the following possibilities would make two
roads coincide?
1
(a) L is
km north of I (b) C is 1 km west of D.
2
1
1
(c) I is km north of K. (d) D is km east of A.
2
2
1
(e) E and B are
km apart.
2
1
60. If K is parallel to I and K is
km south of J and 1
2
1
km north of G, which two roads would be
km
2
apart?
(a) I and K
(b) J and G
(c) I and G
(d) J and H
(e) K and J
Directions (Questions 61-63): Read the information
given below to answer these questions:
(i) Aarti is older than Sanya.
(ii) Muskan is elder than Aarti but younger than
Kashish.
(iii) Kashish is elder than Sanya.
(iv) Sanya is younger than Muskan.
(v) Gargi is the eldest.
61. Who is the youngest?
(a) Kashish
(b) Aarti
(c) Muskan
(d) Sanya
62. Agewise, who is in the middle?
(a) Kashish
(b) Aarti
(c) Muskan
(d) Sanya
63. Which of the given statements is/are superfluous and
can be dispensed with while answering the above
questions?
(a) Either (i) or (iii)
(b) Only (iv)
(c) either (i) or (iv)
(d) Both (iii) and (iv)
(e) None of these
64. A, B, C, D and E are five friends. A is shorter than B
but taller than E. C is the tallest. D is shorter than B
and taller than A. Who has two persons taller and
two persons shorter than him/her?
(a) A
(b) B
(c) C
(d) D
65. Five children were administered psychological tests
to know their intellectual levels. In the report,
psychologists pointed out that the child A is less
intelligent than the child B. The child C is less
intelleigent than the child D. The child B is less
intelligent than the child C and child A is more
intelligent than the child E. Which child is the most
intelligent?
(a) A
(b) B
(c) D
(d) E
(e) None of these
66. Which of the following statement is correct with
regard to the given figure?
F
D C
A B
E
(a) A and B are in all the three shapes.
(b) E, A, B, C are in all the three shapes.
(c) F, C, D, B, A are in all the three shapes.
(d) Only B is in all the three shapes.
67. Which number is in the square, ellipse and triangle?
(a) 1
(b) 5
(c) 6
(d) 7
Directions (Questions 68-70) Study the following
diagram to answer these questions:
68. Find out the number that lies inside all the figures:
(a) 2
(b) 5
(c) 9
(d) No such number is there
69. What are the numbers that lie inside any two figures?
(a) 2, 1
(b) 5, 1
(c) 5, 9
(d) 9, 1
70. Find out the number that lies only inside the triangle:
(a) 1
(b) 2
(c) 5
(d) 9
71. Vinu told Amit to choose any digit on the dice. Amit
said, “I choose six”, Vinu said,” fine. Six is your and
all other mine. I will throw 3 dice together each time.
If there is a six you get Rs. 10 if there is any of my
digits i.e., I through 5, you give me Rs. 4”. If they
play 100 rounds who is likely to win and how much
money will he get?
(a) Vinu, Rs. 398
(b) Amit, Rs. 421
(c) Vinu, Rs. 421
(d) Amit, Rs. 398
72. A family uses a mixture of a blend of 2 teas costing
Rs. 25 and Rs. 75 per kg. If the family uses only the
expensive variety, it would have to spend Rs. 500
more. The annual consumption of tea of the family is
15 kg. What is the ratio of the cheaper brand with
respect to the expensive brand that is used?
(a) 3 : 2 (b) 2 : 1 (c) 1 : 1 (d) 2 : 3
1 1 1
1
1
1
  



73. Find the value of 99 99 99 101 101 101
1 1
1
1
1
1
 



99 99 101 101 100 100
4
INFOMATHS/MCA/MATHS/
INFOMATHS
DIRECTIONS for questions 82-87: Choose the correct
alternative.
82. If PAPER is coded as KZKVI, then PENCIL is
coded as :
(a) KVLMTO
(b) KVMXRO
(c) KVDCON
(d) KVCMNR
83. If CUSTARD is coded as XFHGZIW, then MAPLE
is coded as:
(a) ZNKOV
(b) BZCDV
(c) CZPNV
(d) NZKOV
84. If GEOMET is coded as GDMJAO, then AUDIT is
coded as;
(a) AUEJQ
(b) BTEHQ (c) PATBF (d) ATBFP
85. If MONTH is coded as OMPRJ, then WOMEN is
coded is:
(a) YMCOP (b) 2KNJB (c) JWKBN (d) KJWBN
86. A cistern which could be filled in 9 hours takes one
more hour to be filled due to the leak in its bottom. If
the cistern a full, how much time will it leak to
empty it?
(a) 60 hours (b) 30 hours (c) 90 hours (d) 45 hours
87. Given three numbers, the difference of the two
greatest numbers is added to the smallest number.
The average of the new number and the two greatest
numbers if 10 more than the average of the given
thee numbers. What is the difference between the
two greatest numbers?
(a) 10
(b) 20
(c) 25
(d) 30
88. Five years ago Vinay’s age was one-third of the age
of Vikas and now Vinay’s age is 17 years. What is
the present age of Vikas?
(a) 9 years
(b) 36 years
(c) 41 years
(d) 51 years
89. Pushpa is twice as old as Rita was two years ago. If
difference between their ages be 2 years, how old is
Pushpa today?
(a) 6 years
(b) 8 years
(c) 10 years
(d) 12 years
90. 15 years ago the difference between the age of two
persons is 10 years. The elder one was twice as old
as the younger one. The present age of the elder
person is :
(a) 25 yrs
(b) 35 yrs
(c) 45 yrs
(d) 55 yrs
ENGLISH
91. The quality of ________between individuals and the
organisation which they work can be ____________
to the benefit of both the parties.
(a) work , growed
(b) life ,
development
(c) interaction , improved
(d) job, evaluation
92. During her rise to fame, she betrayed many of her
friends, and because of it, very few people trust her
(a) No error
(b) during her rise to
fame
(c) because of it
(d) trust her
93. Not hardly a sound be heard in the auditorium, when
the speaker approached the dais to announce the
result of the contest.
(a) No error
(b) not hardly
(c) when
(d) approached
94. By night the ____________ has decided to get into
house through the AC vent and collect whatever he
could lay his hands on
(a) burglar
(b) robber
1
1
1
1
1
1


 3 

100 100 100
99 100 101
1
1
1
1
1
1
 
 


99 101 99 100 101 100
1
1
1


(a) 0
(b)
99 100 101
100  99  101
(c) 1
(d)
99  100  101
1
of the
9
principal and the number of years is equal to the rate
percent per annum. Find the rate percent?
1
1
1
(a) 4
(b) 3
(c) 3 (d) 2
3
2
2
75. The largest number which gives a remainder of 1
when dividing the square of an odd natural number
greater than 32 is :
(a) 2 (b) 4 (c) 8 (d) 16
DIRECTIONS for questions 76-78 : Choose the correct
alternative.
76. A trader invested Rs. 1,000 and Rs. 2,000 in two
different business and made a loss of 15% on the
first. However, he made an overall profit of 5%.
What was the profit he made on Rs. 2,000 that he
invested?
(a) 10% (b) 5%
(c) 20% (d) 15%
77. The alarm of a clock rings for 1 minute every hour
during which the time of clock stops. The clock is set
right at 12:15 p.m. on March 1 and the alarm goes
off at 1 p.m. What is the actual time on March 3,
when the clock shows 1:30 p.m.?
(a) 2:18 p.m.
(b) 2:19 p.m.
(c) 2:20 p.m.
(d) 2:21 pm.
78. A certain quantity of 40% solution is replaced with
25% solution such that the new concentration is
35%. What fraction of the solution was replaced?
(a) 1/3
(b) 1/2
(c) 2/3
(d) 3/4
DIRECTIONS for questions 79-81: Choose the correct
alternative
79. Solutions A, B and C, whose concentrations are in
the ratio 3:2:1, are mixed in the ratio 1:2:3. If the
concentration of the mixture is 40%, find
concentration of A.
(a) 60% (b) 64% (c) 70% (d) 72%
80. Anand and Bhairav enter into a partnership by
investing certain capital in the ratio of 2:3. However,
after 4 months, Anand alone starts managing the
business and Bhairav pays him Rs. 5000 per month.
How much profit should they make, so that at the
end of the year, when the profit is divided, the net
incomes of both are the same for the year?
(a) Rs. 40,000
(b) Rs. 500,000
(c) Rs. 400,000
(d) Rs. 200,000
81. A man bought 360 rupee shares paying 12% per
annum. He sold them when the price rose to Rs. 21
and invested the proceeds in five rupee shares paying
4.5% per annum at Rs. 3.5 pershare. Find the annual
change in the income.
(a) Loss of Rs. 262 (b) Gain of Rs. 54
(c) Gain of Rs. 262 (d) Loss of Rs. 54
74. The simple interest on a sum of money is
5
INFOMATHS/MCA/MATHS/
INFOMATHS
(c) intruder
(d) the boy
95. The residents were able to ____________ to the
church fund in a big way
(a) donate
(b) give
(c) gift
(d) give away
Directions : In e ach of the following questions, there is a
certain relation between two given words on one side of : :
and one word is given on another side of :: ___________
Choose the suitable word to be put on the another side
from the given alternatives
96. Arguing : Litigation:: Courting : __________
(a) Judiciary
(b) Adjudication
(c) Romance
(d) Arbitration
97. Aircraft : Air:: Satellite : ___________
(a) Telecommunication
(b) Television
(c) Cables
(d) Outer space
98. White : Peace :: Red : ______________
(a) Cleanliness
(b) Hatred
(c) Roses
(d) Violence
99. Give an antonym for ABROGATE
(a) Enact
(b) Entice (c) Disinfect
(d)
Tarnish
100. Give the meaning of ADEPT
(a) Skillful
(b) Perspective
(c) Wealthy
(d) Animate
101. Give the meaning of CALLOUS
(a) Immature
(b) Whimsical
(c) Corrosive
(d) Unfeeling
102. Give the meaning of DIFFIDENCE
(a) Discourage
(b) Humility
(c) Harmful
(d) Defection
Find the appropriate word for questions 88 to 91:
103. I know not _______ he left us
(a) before
(b) while
(c) how
(d) after
104. Make hay _______ the sun shines
(a) when
(b) where
(c) while
(d) whence
105. You will pass ___________ you work hard
(a) if
(b) fill
(c) unless
(d) until
Fill out correct preposition.
106. The President of India is invested ______________
executive powers.
(a) with
(b) of
(c) from
(d) in
107. The man is _____________ television.
(a) seeing
(b) watching
(c) reviewing
(d) listening
108. The court is not concerned with ___________
political status of accused
(a) about
(b) from
(c) in
(d) for
109. Tony enjoys __________ the school boys playing in
the playground.
(a) looking to
(b) looking about
(c) looking at
(d) looking on
110. Nirmala was expecting a call from her mother which
would inform her whether she went or not
(a) had to go
(b) had gone
(c) was expected
(d) should inform
(c) registers
(d) chip
112. Binary-coded-decimal (BCD) numbers express each
digit as a ……
(a) byte
(b) nibble
(c) bit
(d) All of the above
113. BCD numbers are useful whenever …….
Information is transferred into or out of a digital
system.
(a) decimal
(b) binary
(c) ASCII
(d) hexadecimal
114. The ASCII code is a 7-bit code for
(a) letters
(b) numbers
(c) other symbols
(d) All of the above
115. What is the decimal equivalent of 210?
(a) 4096
(b) 1024
(c) 1000
(d) 16
116. Express 8192 in K units.
(a) 8 × 103 K
(b) 8.192 K
(c) 8K
(d) All of the above
117. Solve the following equation for x:
X10 = 110010012
(a) 201
(b) 132
(c) 214
(d) 64
118. A microprocessor has memory locations from 0000
to 3FFF. Each memory location stores 1 byte. How
bytes can the memory store? Express this in
kilobytes?
(a) 4,095 4K
(b) 16,384, 16K
(c) 32,740, 32K
(d) 46,040, 46 K
119. If a microprocessor has a 64K memory, what are the
hexadecimal notations, for the first and last memory
location?
(a) 0000, EEEE
(b) 0, 64
(c) 0000, FFFF
(d) 0000, 9999
120. How many nibbles are there in 1001 0000 0100 0011
number.
(a) two
(b) four
(c) one
(d) eight
COMPUTERS
111. A typical microcomputer may have up to 65,536
registers in its memory. Each of these registers,
usually called a …….
(a) address
(b) memory location
6
INFOMATHS/MCA/MATHS/
INFOMATHS
MOCK TEST -1 NIMCET
A
101
C
Maths
1
C
11
D
21
C
31
B
41
C
2
A
12
C
22
C
32
C
42
D
3
B
13
B
23
D
33
B
43
C
4
A
14
D
24
A
34
D
44
C
5
D
15
C
25
A
35
B
45
B
6
D
16
C
26
B
36
C
46
C
7
A
17
B
27
A
37
C
47
C
8
B
18
B
28
A
38
D
48
A
9
C
19
D
29
B
39
B
49
A
10
C
20
C
30
C
40
B
50
C
53
C
63
D
73
55
A
65
C
75
C
85
56
D
66
D
76
57
B
67
D
77
58
D
68
A
78
59
E
69
B
79
60
E
70
D
80
D
B
A
D
C
86
87
8
A
C
C
B
89
B
90
B
B
102
D
A
103
D
C
104
A
A
105
A
C
106
D
A
107
B
B
108
B
A
109
C
B
110
A
ANVSWERS
Computers
111
B
112
B
113
A
114
D
115
B
116
C
117
A
118
B
119
C
120
B
REASONING
51
E
61
D
71
52
E
62
C
72
B
B
B
81
B
82
83
54
E
64
D
74
B
84
B
D
D
ENGLISH
91
92
93
94
95
96
97
98
99
100
MY PERFORMANCE ANALYSIS
No. of Questions
Attempted (=A)
No. of Right
Responses (=R)
No. of Wrong
Responses (=W)
7
Net Score
(NS = R – 0.25W)
Percentage Accuracy
(= PA= 100R/A)
INFOMATHS/MCA/MATHS/