__TCS MOCK TEST 1__###
TCS New Questions Pattern for 2012-13 batch: Moct Test Paper 1

**So, all 70 questions pattern I posted on my blog so that my readers should prepare for both old as well as new pattern...**

**Click here for old pattern questions**

1.The difference between the ages of two of my three
grandchildren is 3. My eldest grandchild is three times older than the age of
my youngest grandchild and my eldest grandchild's age is two years more than
the ages of my two youngest grandchildren added together. How old is my eldest
grandchild?

(a) 12

(b) 13

(c) 10

(d) 15

(a) 12

(b) 13

(c) 10

(d) 15

2.A greengrocer was selling apple at a penny each, chickoos at 2
for a penny and peanuts at 3 for a penny. A father spent 7 pennies and got the
same amount of each type of fruit for each of his three children. What did each
child get?

(a) 1 apple, 2 chickoos, 2 peanuts (c) 1 apple, 3 chickoos, 2 peanuts

(b) 1 apple, 2 chickoos, 1 peanut (d) 1 apple, 1 chickoo, 1 peanut

(a) 1 apple, 2 chickoos, 2 peanuts (c) 1 apple, 3 chickoos, 2 peanuts

(b) 1 apple, 2 chickoos, 1 peanut (d) 1 apple, 1 chickoo, 1 peanut

3.The IT giant Tirnop has recently crossed a head count of
150000 and earnings of $7 billion. As one of the forerunners in the technology
front, Tirnop continues to lead the way in products and services in India. At
Tirnop, all programmers are equal in every respect. They receive identical
salaries and also write code at the same rate.Suppose 12 such programmers take
12 minutes to write 12 lines of code in total. How long will it take 72
programmers to write 72 lines of code in total?

(a) 12

(b) 18

(c) 6

(d) 72

(a) 12

(b) 18

(c) 6

(d) 72

4.One day Rapunzel meets Dwarf and Byte in the Forest of
forgetfulness. She knows that Dwarf lies on Mondays, Tuesdays and Wednesdays,
and tells the truth on the other days of the week. Byte, on the other hand,
lies on Thursdays, Fridays and Saturdays, but tells the truth on the other days
of the week. Now they make the following statements to Rapunzel - Dwarf:
Yesterday was one of those days when I lie. Byte: Yesterday was one of those
days when I lie too. What day is it?

(a) Monday

(b) Sunday

(c) Thursday

(d) Saturday

(a) Monday

(b) Sunday

(c) Thursday

(d) Saturday

5.Alok and Bhanu play the following min-max game. Given the
expression N = 9 + X + Y – Z , where X, Y and Z are variables representing
single digits (0 to 9). Alok would like to maximize N while Bhanu would like to
minimize it. Towards this end, Alok chooses a single digit number and Bhanu
substitutes this for a variable of her choice (X, Y or Z). Alok then chooses
the next value and Bhanu, the variable to substitute the value. Finally Alok
proposes the value for the remaining variable. Assuming both play to their
optimal strategies, the value of N at the end of the game would be

(a) 20

(b) 18

(c) 27

(d) 0

(a) 20

(b) 18

(c) 27

(d) 0

6.A sheet of paper has statements numbered from 1 to 40. For
each value of n from 1 to 40, statement n says "At least n of the
statements on this sheet are true." Which statements are true and which
are false?

a) All statements are false. b) The odd numbered statements are true the even numbered are false. c) All statements are true. d) The even numbered statements are true and the odd numbered are false.

a) All statements are false. b) The odd numbered statements are true the even numbered are false. c) All statements are true. d) The even numbered statements are true and the odd numbered are false.

7.10 suspects are rounded by the police and questioned about a
bank robbery. Only one of them is guilty. The suspects are made to stand in a
line and each person declares that the person next to him on his right is
guilty. The rightmost person is not questioned. Which of the following
possibilities are true?

(A) All suspects are lying or the leftmost suspect is innocent. (B) All suspects are lying and the leftmost suspect is innocent. (c) Both A and B (d) Neither A nor B

(A) All suspects are lying or the leftmost suspect is innocent. (B) All suspects are lying and the leftmost suspect is innocent. (c) Both A and B (d) Neither A nor B

8.The citizens of planet nigiet are 8 fingered and have thus
developed their decimal system in base 8. A certain street in nigiet contains
1000 (in base 8) buildings numbered 1 to 1000. How many 3s are used in
numbering these buildings?

(a) 192

(b) 64

(c) 54

(d) 102

(a) 192

(b) 64

(c) 54

(d) 102

9.On planet zorba, a solar blast has melted the ice caps on its
equator. 8 years after the ice melts, tiny plantoids called echina start
growing on the rocks. echina grows in the form of a circle and the relationship
between the diameter of this circle and the age of echina is given by the
formula d = 4 * √ (t - 8) for t ≥ 8 where d represents the diameter in mm and t
the number of years since the solar blast. Jagan recorded the radius of some
echina at a particular spot as 8mm. How many years back did the solar blast
occur?

(a) 8

(b) 12

(c) 16

(d) 24

(a) 8

(b) 12

(c) 16

(d) 24

10.A circular dartboard of radius 1 foot is at a distance of 20
feet from you. You throw a dart at it and it hits the dartboard at some point Q
in the circle. What is the probability that Q is closer to the center of the
circle than the periphery?

(a) ¼

(b) ½

(c)3/4

(d) 1/3

(a) ¼

(b) ½

(c)3/4

(d) 1/3

11.After the typist writes 12 letters and addresses 12
envelopes, she inserts the letters randomly into the envelopes (1 letter per
envelope). What is the probability that exactly 1 letter is inserted in an improper
envelope?

(a) 11/12

(b) 0

(c) 1/12

(d) 1/6

(a) 11/12

(b) 0

(c) 1/12

(d) 1/6

12.Alok is attending a workshop "How to do more with
less" and today's theme is “Working with fewer digits”. The speakers
discuss how a lot of miraculous mathematics can be achieved if mankind (as well
as womankind) had only worked with fewer digits. The problem posed at the end
of the workshop is “How many 5-digit numbers can be formed using the digits 1,
2, 3, 4, 5 (but with repetition) that are divisible by 4?” Can you help Alok
find the answer?

(a) 375

(b) 625

(c) 500

(d) 3125

(a) 375

(b) 625

(c) 500

(d) 3125

13.Given 3 lines in the plane such that the points of
intersection form a triangle with sides of length 20, 20 and 30, the number of
points equidistant from all the 3 lines is

(a) 1

(b) 0

(c) 4

(d) 2

(a) 1

(b) 0

(c) 4

(d) 2

14.The pacelength P is the distance between the rear of two
consecutive footprints. For men, the formula, n/P = 144 gives an approximate
relationship between n and P where, n = number of steps per minute and P =
pacelength in meters. Bernard knows his pacelength is 164cm. The formula applies
to Bernard’s walking. Calculate Bernard’s walking speed in kmph. (a) 236.16 (b)
11.39 (c) 8.78 (d) 23.24

15.Alice and Bob play the following coins-on-a-stack game. 20
coins are stacked one above the other. One of them is a special (gold) coin and
the rest are ordinary coins. The goal is to bring the gold coin to the top by
repeatedly moving the topmost coin to another position in the stack. Alice
starts and the players take turns. A turn consists of moving the coin on the
top to a position i below the top coin (0 ≤ i ≤ 20). We will call this an
i-move (thus a 0-move implies doing nothing). The proviso is that an i-move
cannot be repeated; for example once a player makes a 2-move, on subsequent
turns neither player can make a 2-move. If the gold coin happens to be on top
when it's a player's turn then the player wins the game. Initially, the gold
coin is the third coin from the top. Then

(a) In order to win, Alice’s first move should be a 0-move. (b) In order to win, Alice’s first move should be a 1-move. (c) Alice has no winning strategy. (d) In order to win, Alice’s first move can be a 0-move or a 1-move

(a) In order to win, Alice’s first move should be a 0-move. (b) In order to win, Alice’s first move should be a 1-move. (c) Alice has no winning strategy. (d) In order to win, Alice’s first move can be a 0-move or a 1-move

16.For the FIFA world cup, Paul, the octopus has been predicting
the winner of each match with amazing success. It is rumored that in a match
between 2 teams A and B, Paul picks A with the same probability as A's chances
of winning. Let's assume such rumors to be true and that in a match between
Ghana and Bolivia, Ghana the stronger team has a probability of 2/3 of winning
the game. What is the probability that Paul will correctly pick the winner of
the Ghana-Bolivia game?

(a) 5/9

(b) 1/9

(c) 2/3

(d) 1/3

(a) 5/9

(b) 1/9

(c) 2/3

(d) 1/3

17.36 people {a1, a2, ..., a36} meet and shake hands in a
circular fashion. In other words, there are totally 36 handshakes involving the
pairs, {a1, a2}, {a2, a3}, ..., {a35, a36}, {a36, a1}. Then size of the
smallest set of people such that the rest have shaken hands with at least one
person in the set is

(a) 18

(b) 13

(c) 34

(d) 12

(a) 18

(b) 13

(c) 34

(d) 12

18.One the Planet Oz, there are 8 days in a week – Sunday to
Saturday and another day called Oz day. There are 36 hours in a day and each
hour has 90 minutes while each minute has 60 seconds. As on earth, the hour
hand covers the dial twice every day. Find the approximate angle between the
hands of clock on Oz when the time is 12.40 am.

(a) 89

(b) 251

(c) 111

(d) 79

(a) 89

(b) 251

(c) 111

(d) 79

19.The IT giant Tirnop has recently crossed a head count of
150000 and earning of $7 billion. As one of the forerunners in the technology
front, Tirnop continues to lead the way in products and services in India. At
Tirnop, all programmers are equal in every respect. They receive identical
salaries and also write code at the same rate. If 12 such programmers take 12
minutes to write 12 lines of code in total, how many lines of code can be
written by 72 programmers in 72 minutes?

(a) 6

(b) 432

(c) 72

(d) 12

(a) 6

(b) 432

(c) 72

(d) 12

20.A hollow cube of size 5 cm is taken with a thickness of 1 cm.
It is made of smaller cubes of size 1 cm. If the 4 faces of the outer surface
of the cube are painted totally, how many faces of the smaller cubes remain
unpainted?

(a) 900

(b) 488

(c) 500

(d)800

(a) 900

(b) 488

(c) 500

(d)800

21.Planet fourfi resides in 4-dimensional space and thus the
currency used by its residents are 3-dimensional objects. The notes are cubical
in shape while their coins are spherical. However the coin minting machinery
lays out some stipulations on the size of the coins. - The diameter of the
coins should be at least 64mm and not exceed 512mm. - Given a coin, the
diameter of the next larger coin is at least 50% greater. - The diameter of the
coin must always be an integer. You are asked to design a set of coins of
different diameters with these requirements and your goal is to design as many
coins as possible. How many coins can you design?

(a) 5

(b) 8

(c) 9

(d) 6

(a) 5

(b) 8

(c) 9

(d) 6

22.A hare and a tortoise race along a circle of 100 yards
diameter. The tortoise goes in one direction and the hare in the other. The
hare starts after tortoise has covered 1/5 of its distance and that too
leisurely. The hare and tortoise meet when the hare has covered only 1/8 of the
distance. By what factor should the hare increase its speed so as to tie the
race?

(a)8

(b) 37.80

(c) 40

(d) 5

(a)8

(b) 37.80

(c) 40

(d) 5

23.Anoop managed to draw 7 circles of equal radii with their
centres on the diagonal of a square such that the two extreme circles touch two
sides of the square and each middle circle touches two circles on either side.
Find the ratio of the radius of the circles to the side of the square.

(a) 1:(2 + 7Ö2)

(b) 1:(4 + 7Ö3)

(c) (2 + 7Ö2):1

(d) 1:(2 + 6Ö2)

(a) 1:(2 + 7Ö2)

(b) 1:(4 + 7Ö3)

(c) (2 + 7Ö2):1

(d) 1:(2 + 6Ö2)

24.Ferrari S.p.A. is an Italian sports car manufacturer based in
Maranello, Italy. Founded by Enzo Ferrari in 1928 as Scuderia Ferrari, the
company sponsored drivers and manufactured race cars before moving into
production of street-legal vehicles in1947 as Ferrari S.p.A. Throughout its
history the company has been noted for its continued participation in racing
especially in Formula One where it has enjoyed great success. Rohit once bought
a Ferrari. It could go 2 times as fast as Mohit’s old Mercedes. If the speed of
Mohit’s Mercedes is 32 km/hr and the distance travelled by the Ferrari is 952
km, find the total time taken in hours for Rohit to drive that distance.

(a) 15.88

(b) 29.75

(c) 14.88

(d)476

(a) 15.88

(b) 29.75

(c) 14.88

(d)476

25.There are two boxes, one containing 10 red balls and the
other containing 10 green balls. You are allowed to move the balls between the
boxes so that when you choose a box at random and a ball at random from the
chosen box, the probability of getting a red is maximized. This maximum
probability is

(a) 37/38

(b) 1 / 2

(c) 14/19

(d) 3 / 4

(a) 37/38

(b) 1 / 2

(c) 14/19

(d) 3 / 4

26.Pizza shops make pizzas of same thickness but different
diameter. Cost of pizza A with diameter 8 cm is 80 $, cost of the pizza B with
diameter 12 cm is 240 $, cost of the pizza B with diameter 24 cm is 720 $.
Which of the above mentioned pizzas gives the best value for money?

(a) A

(b) B

(c) C

(d) Cannot say

(a) A

(b) B

(c) C

(d) Cannot say

27.Determine the distance between x-intercept and z-intercept of
the plane whose equation is 6x+8y-3z=72.

(a) 31.92

(b)26.83

(c) 32.66

(d) 25.63

(a) 31.92

(b)26.83

(c) 32.66

(d) 25.63

28.Lucy finds around 25 groups of stars that appear to her as
constellations. She draws 7 patterns of the constellations in her notebook and
notes down the number of stars in each of them. She counts 5 stars in first
constellation and 15 on next. She counts a number the third time and forgets to
note it down. The next four constellations she counts 51, 53, 159, 161. Next
day her father looks at the notebook and wants to know the number of stars in
the third constellation. Lucy only remembers that number of stars counted in
each of the constellation followed a pattern 5, 15, x, 51, 53, 159, 161. What
is the value of x?

(a) 19

(b) 17

(c) 47

(d) 31

(a) 19

(b) 17

(c) 47

(d) 31

29.6 persons standing in the queue for ROBERT movie are wearing
different coloured shirts. All of them belong to different age groups. After
two years, their average age will be 43. A seventh person joined with them,
hence the current average age has become 45. Find the age of seventh person?

(a) 67

(b) 69

(c) 72

(d) 74

(a) 67

(b) 69

(c) 72

(d) 74

30.X is 6 years younger to Y. X's father is a businessman who
invested 10000 at 8% rate of interest and obtained his amount after 10 years.
Y's father is a job holder who invested around 20000 at 2% rate and obtained
his amount after 20 years. Now compounding, both of them get around Rs. A.
After 5 years, the ratio of ages of X and Y is 1:2. Now X's father is 20 years
older to Y and Y's father is 30 years more than X. After 20 years, again X's
mother asks X's father to purchase a LCD TV which costs around 45000. What is
the age of X and Y together?

(a) 12

(b) 8

(c) 18

(d) 6

(a) 12

(b) 8

(c) 18

(d) 6

31.The great musician Rahman has organized a live concert. The
concert is organized in a big auditorium. Rahman plays both English and Tamil
songs on his Yamaha Casio. The audience in the eastern part of the auditorium
love listening to Tamil songs and those in the western part of the auditorium
love listening to English songs. He plays songs in random. The probability that
he plays English songs for 6 consecutive times is 1 in

(a) 32

(b) 16

(c) 64

(d) 128

(a) 32

(b) 16

(c) 64

(d) 128

32.It is dark in my bedroom and I want to get two socks of the
same color from my drawer, which contains 24 red and 24 blue socks. How many
socks do I have to take from the drawer to get at least two socks of the same
colour?

(a) 3

(b) 25

(c) 48

(d) 26

(a) 3

(b) 25

(c) 48

(d) 26

33.A person was fined for exceeding the speed limit by 10mph.
Another person was also fined for exceeding the same speed limit by twice the
same. If the second person was traveling at a speed of 35 mph, find the speed
limit

(a) 35 mph

(b) 15 mph

(c) 20 mph

(d) 30 mph

(a) 35 mph

(b) 15 mph

(c) 20 mph

(d) 30 mph

34.A person drives with constant speed and after some time he
sees a milestone with 2 digits. Then travels for 1 hour and sees the same 2
digits in reverse order. 1 hour later he sees that the milestone has the same 2
digits with a 0 between them. What is the speed of the car?

(a) 54 (b) 45 (c) 27 (d) 36 35. With four fifths of the tank full, a vehicle travels 12 miles. How much distance will the vehicle travel with one-third tank full? (a) 8.05 km (b) 6.05 km (c) 12 km (d) 5 km

DISCLAIMER:(a) 54 (b) 45 (c) 27 (d) 36 35. With four fifths of the tank full, a vehicle travels 12 miles. How much distance will the vehicle travel with one-third tank full? (a) 8.05 km (b) 6.05 km (c) 12 km (d) 5 km

**Please note that this Mock test is intended to be supplementary and cannot substitute thorough preparation. Questions in this test are simulated based on TCS Aptitude Test pattern as of August 2012. However, test patterns and questions are likely to change anytime without notice.**

**All The Best !**

---------------------------------------------------------------------------------

Posted By Sundeep aka SunTechie

Sundeep
is a Founder of Youth Talent Auzzar, a passionate blogger, a
programmer, a developer, CISE and these days he is pursuing his
graduation in Engineering with Computer Science dept.

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