Dear readers,

This quiz consists of questions from
various past papers of MBA entrance exams. Leave your answers/ responses in the
comments section below and soon we’ll let you know the correct answers!

1. There are 6 balls of different colours
and 3 boxes of different sizes. Each box can hold all the 6 balls. The balls
are put in the boxes so that no box remains empty. The number of ways in which
this can be done is:

(a) 534             
(b) 543                 (c) 540                 (d) 528

2. On a railway there are 10 stations. The
number of types of tickets required so that it may be possible to book a
passenger from every station to every other is?

a.10! / 2!                    b. 10! * 2!                     c. 10!/8!                  d. 10!/8! 2!

3. The number of ways in which the letters
of the word “ARGUMENT” can be arranged so that only consonants occur at both
the ends is:

(a) 3!*5!                     (b) 14400               (c) 41000                     (d) none of these

4. The number of ways in which the digits of the
number 125453752 can be arranged such that no two 5s come together is:

(a) 9! * 3! * 2!                  (b) 7! * 3! * 2!                    (c) 6! * 2!                    (d) None of these

5. If 2^(x -1) + 2^(x+1) = 320, then the value of x is

(a) 4                      (b) 5                    (c) 6                      (d) 7

6. After a typist had written ten letters
and had addressed the ten corresponding envelops, a careless mailing clerk
inserted the letters in the envelopes at random, one letter per envelop. What
is the probability that exactly nine letters were inserted in proper envelop?

(a) ½                   (b) 1                 (c) 0                 (d) 9/10

7. In a 26-question test, five points were
deducted for each wrong answer and eight points were credited for each correct
answer. If all the questions were answered, how many were correct if the score
was zero?

(a) 13                 (b) 6                  (c) 9                    (d) 10

8. There are n players in an elimination
type singles tournament. How many matches must be played (or defaulted to
determine the winner)?

(a) n + 1             (b) n -1                   (c) n – 2                   (d) n + 2

9. If the value of x is greater than or equal to -1 and less than or equal to 2 and the value of y is greater than or equal to 1 and less than or equal to 3, then least possible value of (2y – 3x) is

(a) 0                    (b) -3                      (c) -4                         (d) -5

10. When n is divided by 4, the remainder is 3. What
is the remainder when 2n is divided by 4?

(a) 1                    (b) 2                (c) 3                   (d) 6

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Answers

1(c)    2(c)    
3(b)    4(d)     5(d)    
6(c)   7(d)    8(b)    
9(c)    10(b)   

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