# Probability & Statistics CQs Part III

**1) If (1 – 3p)/2, (1+ 4p)/3, (1 + p)/6 are the probabilities of three mutually exclusive and exhaustive events, then the set of all values of p is****a)** (0,1)**b)** (-1/4, 1/3)**c)** (0,1/3)**d)**

**2) 100 boys are randomly divided into two subgroups containing 50 boys each. The probability that the two tallest boys are in different groups is****a)** 50/99**b)** 49/99**c)** 25/99**d)** none of these

**3) One hundred identical coins, each with probability p of showing up heads are tossed once. If 0 < p < 1 and the probability of heads showing on 50 coins is equal to that of heads showing on 51 coins, then the value of p is****a)** 1/2**b)** 49/101**c)** 50/101**d)** 51/101

**4) In a box containing 100 bulbs, 10 are defective. The probability that out of a sample of 5 bulbs none is defective is****a)** **b)** **c)** **d)** none of these

**5) A pack of cards contains 4 aces, 4 kings, 4 queens and 4 jacks. Two cards are drawn at random. The probability that at least one of them is an ace is****a)** 1/5**b)** 3/16**c)** 9/20**d)** 1/9

**6) India plays two matches each with Indies and Australia. In any math the probabilities of India getting points 0,1,2 are 0.45 0.05 and 0.50 respectively Assuming that outcomes are independent, the probability of India getting at least 7 points is****a)** 0.8750**b)** 0.0875**c)** 0.0625**d)** 0.0250

**7) A fair coin is tossed a fixed number of times. If the probability of getting 7 heads is equal to that of getting 9 heads, then probability of getting 3 heads is ****a)** **b)** **c)** **d)** none of these

**8) A speaks truth 60% times and B speaks truth 70% times. The probability that they say same thing while describing a single event is****a)** 0.42**b)** 0.46**c)** 0.54**d)** 0.12

**9) If two squares are chosen at random on a chessboard, the probability that they have a side in common is****a)** 1/9**b)** 2/7**c)** 1/18**d)** none of these

**10) A bag contains 10 mangoes out of which 4 are rotten, two mangoes are taken out together. If one of them is found to be good, the probability that other is also good is****a)** 5/18**b)** 8/13**c)** 5/13**d)** 2/3

**11) A box contain 5 brown and 4 white socks. A man pulls out two socks. The probability that they are of the same colour is****a)** 5/108**b)** 1/6**c)** 5/18**d)** 4/9

**12) Suppose persons are sitting in a row. Two of them are selected at random. The probability that they are not together is****a)** n – 1/n**b)** (n – 2)/n**c)** 2/n – 1**d)** none of these

**13) A bag contains (2n+1) coins. It is known that n of these coins have a head on both sides, whereas the remaining (n+1) coins are fair. A coin is picked up at random from the bag and tossed. If the probability that the toss results in a head is 31/42, then n is equal to****a)** 10**b)** 11**c)** 12**d)** 13

**14) A contest consists of predicting the results win, draw or defeat of 7 football matches. A sent his entry by predicting at random. The probability that his entry will contain exactly 4 correct predictions is****a)** **b)** **c)** **d)**

**15) Five different objects 1,2,3,4,5 are distributed randomly in 5 places marked 1,2,3,4,5. One arrangement is picked at random. The probability that in the selected arrangement, none of the object occupies the place corresponding to its number is****a)** 119/120**b)** 1/5**c)** 11/30**d)** none of these

**16) You are given a box with 20 cards in it. 10 of these cards have the letter I printed on them. The other ten have the letter T printed on them. If you pick up 3 cards at random and keep them in the same order, the probability of making the word IIT is****a)** **b)** 1/7**c)** 4/27**d)** 5/38

**17) For the three events A, B and C, P (exactly one of the events A or B occurs)
= P (exactly one of the events B or C occurs)= P (exactly one of the events C or A occurs)= p and P (all the three events occurs simultaneously)= p2, where 0< p < 1/2, then the probability of at least one of the events A, B and C occurring is**

**a)**

**b)**

**c)**

**d)**

**18) The probability that Krishna will be alive 10 years hence is 7/15 and Hari will be alive is 7/10. The probability that both Krishna and Hari will be dead 10 years hence is****a)** 21/150**b)** 24/150**c)** 49/150**d)** 56/150

**19) A person draws a card from a pack, replaces it shuffles the pack, again draws a card, replaces it and draws again. This he does until he draws a heart. The probability that he will have to make at least four draws is****a)** 27/256**b)** 175/256**c)** 27/64**d)** none of these

**20) An unbiased dice with face 1,2,3,4,5 and 6 is round 4 times. Out of four face values obtained, the probability that the minimum face value is not less than 2 and the maximum face value is not greater than 5, is****a)** 16/81**b)** 1/81**c)** 80/81**d)** 65/81

**21) From a bag containing 9 distinct white and 9 distinct black balls, 9 balls are drawn at random one by one, the drawn balls being replaced each time. The probability that at least four balls of each colour is in the draw, is****a)** A little less than 1/2**b)** A little greater than 1/2**c)** 1/2**d)** none of these

**22) Cards are drawn one by one at random from a well shuffled pack of 52 playing cards until 2 aces are obtained for the first time. The probability that 18 draws are required for this is****a)** 3/34**b)** 17/445**c)** 561/15925**d)** none of these

**23) In a multiple-choice question there are four alternative answers of which one or more than one is correct. A candidate will get marks on the question only if he ticks all the correct answers. The candidate decides to tick answers at random. If he is allowed upto three chances to answer the question, the probability that he will get marks on it is given by****a)** **b)** **c)** **d)** none of these

**24) A box contains 24 identical balls of which 12 are white and 12 are black. The balls are drawn at random from the box one at a time with replacement. The probability that a white ball is drawn for the time on the
draw is
**

**a)**5/64

**b)**27/32

**c)**5/32

**d)**1/2

**25) An unbiased die is tossed until a number greater than 4 appear. The probability
that an even number of tosses is needed is**

**a)**1/2

**b)**2/5

**c)**1/5

**d)**2/3

**26) If from each of the three boxes containing 3 white and 1 black, 2 white
and 2 black, 1 white and 3 black balls, one ball is drawn at random, then
the probability that 2 white and 1 black ball will be drawn is**

**a)**13/32

**b)**1/4

**c)**1/32

**d)**3/6

**27) A box contains 2 white and 2 red balls. If the first ball is being with
drawn, then the second ball with drawn is red. The probability of this event
is**

**a)**8/25

**b)**2/5

**c)**3/5

**d)**21/25

**28) If p and q are chosen randomly from the set {1,2,3,4…10} with replacement.
Then the probability that the roots of the equation **

**are real is equal to
**

**a)**0.62

**b)**0.31

**c)**0.63

**d)**none of these

**29) Three rifle man take one shot each at the same target. The probability of
the first rifle man hitting the target is 0.4, the probability of the second
rifle man hitting the target is 0.5 and the probability of the third rifle
man hitting the target is 0.8. Then the probability that exactly two of them
hit the target is**

**a)**0.92

**b)**0.44

**c)**0.94

**d)**none of these

**30) There are four machines and it is known that exactly two of them are faulty.
They are tested one by one in a random order till both the faulty machines
are identified. Then the probability that only two tests are needed is**

**a)**1/3

**b)**1/6

**c)**1/2

**d)**1/4

**31) A dice is thrown n times. For the probability of a six appearing at least
once to be more than ½ is**

**a)**n < 4

**b)**

**c)**n = 4

**d)**n = 6

**32) A fair coin is tossed repeatedly. If tail appears on first four tosses,
then the probability of head appearing on fifth toss equals**

**a)**1/2

**b)**1/32

**c)**31/32

**d)**1/5

**33) If the integers m and n are chosen at random between 1 and 100 then the
probability that a number of the form **

**is divisible by 5 equals ****a)** 1/4**b)** 1/7**c)** 1/8**d)** 1/49

**34) Five boys and three girls are seated at random in a row. The probability that no boy sits between two girls is****a)** **b)** **c)** **d)** none of these

**35) In a convex hexagon two diagonals are drawn at random. The probability that the diagonals intersect at an interior point of the hexagon is****a)** **b)** **c)** **d)** none of these

**36) 4 five-rupee coins, 3 two rupee coins and 2 one-rupee coins are stacked together in a column at random. The probability that the coins of the same denomination are consecutive is****a)** **b)** **c)** **d)** none of these

**37) Two cards are drawn at random from a pack of 52 cards. The probability of getting at least a spade and an ace is****a)** **b)** **c)** **d)**

**38) A five-digit number is written down at random. The probability that the
number is divisible by 5 and no two consecutive digits are identical, is**

**a)**

**b)**

**c)**

**d)**none of these

**39) If the letters of the word ATTEMPT are written down at random, the chance that all Ts are consecutive is****a)** **b)** **c)** **d)** none of these

**40) In a single cast with two dice the odds against drawing 7 is****a)** **b)** **c)** 5:1**d)** 1:5

**41) 7 white balls and 3 black balls are placed in a row at random. The probability that no two black balls are adjacent is****a)** **b)** **c)** **d)**

**42) 10 apples are distributed at random among 6 persons. The probability that
at least one of them will receive none is**

**a)**

**b)**

**c)**

**d)**none of these

**43) 4 gentlemen and 4 ladies take seats at random round a table. The probability
that they are sitting alternately is**

**a)**

**b)**

**c)**

**d)**

**44) Let **

**. The index n is given a positive integral value at random. The probability that the value of x will have 3 in the units place is
**

**a)**

**b)**

**c)**

**d)**none of these

**45) Three dice are thrown simultaneously. The probability of getting a sum of
15 is**

**a)**

**b)**

**c)**

**d)**none of these

**46) Three dice are thrown. The probability of getting a sum which is a perfect
square is**

**a)**

**b)**

**c)**

**d)**none of these

**47) The probability of getting a sum of 12 in four throws of an ordinary dice
is**

**a)**

**b)**

**c)**

**d)**none of these

**48) Three different numbers are selected at random from the set A = {1, 2, 3,
…, 10}. The probability that the product of two of the numbers is equal to
the third is**

**a)**

**b)**

**c)**

**d)**none of these

**49) There are 7 seats in a row. Three persons take seats at random. The probability
that the middle seat is always occupied and no two persons are consecutive
is**

**a)**

**b)**

**c)**

**d)**none of these

**50) A second-order determinant is written down at random using the numbers 1,
-1 as elements. The probability that the value of the determinant is nonzero
is**

**a)**

**b)**

**c)**

**d)**

**51)
are fifty real numbers such that
for r = 1, 2, 3, …, 49. Five numbers out of these are picked up at random. The
probability that the five numbers have
as the middle number is**

**a)**

**b)**

**c)**

**d)**none of these

**52) Numbers 1, 2, 3, …, 100 are written down on each of the cards A, B and C.
One number is selected at random from each of the cards. The probability that
the numbers so selected can be the measures (in cm) of three sides of a right-angled
triangle is**

**a)**

**b)**

**c)**

**d)**none of these

**53) Three numbers are chosen at random without replacement from the set
.
The probability that the minimum of the chosen numbers is 3 and maximum is 7,
is**

**a)**

**b)**

**c)**

**d)**none of these

**54) **

**Three natural numbers are taken at random from the set**

. The probability that the AM of the numbers taken is 25 is

. The probability that the AM of the numbers taken is 25 is

**a)**

**b)**

**c)**

**d)**none of these

**55) Let S be the universal set and n(X) = k. The probability of selecting two
subsets A and B of the set X such that
is**

**a)**

**b)**

**c)**

**d)**

**56) From a group of 10 persons consisting of 5 lawyers, 3 doctors and 2 engineers,
four persons are selected at random. The probability that the selection contains
at least one of each category is**

**a)**

**b)**

**c)**

**d)**none of these

**57) 10 different books and 2 different pens are given to 3 boys so that each
gets equal number of things. The probability that the same boy does not receive
both the pens is**

**a)**

**b)**

**c)**

**d)**

**58) Two distinct numbers are selected at random from the first twelve natural
numbers. The probability that the sum will be divisible by 3 is**

**a)**

**b)**

**c)**

**d)**none of these

**59) The probability of a number n showing in a throw of a dice marked 1 to 6
is proportional to n. Then the probability of the number 3 showing in a throw
is**

**a)**

**b)**

**c)**

**d)**

**60) The probability that out of 10 persons, all born in April, at least two
have the same birthday is**

**a)**

**b)**

**c)**

**d)**none of these

**61) If one ball is drawn at random from each of the three boxes containing 3
white and 1 black, 2 white and 2 black, 1 white and 3 black balls then the
probability that 2 white and 1 black balls will be drawn is**

**a)**

**b)**

**c)**

**d)**

**62) A draws two cards at random from a pack of 52 cards. After returning them
to the pack and shuffling it, B draws two cards at random. The probability
that their draws contain exactly one common card is**

**a)**

**b)**

**c)**

**d)**none of these

**63) A and B draw two cards each, one after another, from a pack of well-shuffled
pack of 52 cards. The probability that all the four cards drawn are of the
same suit is**

**a)**

**b)**

**c)**

**d)**none of these

**64) Three numbers are chosen at random without replacement from 1, 2, 3, …,
10. The probability that the minimum of the chosen numbers is 4 or their maximum
is 8, is**

**a)**

**b)**

**c)**

**d)**none of these

**65) A man draws a card from a pack of 52 cards and then replaces it. After shuffling
the pack, he again draws a card. This he repeats a number of times. The probability
that he will draw a heart for the first time in the third draw is**

**a)**

**b)**

**c)**

**d)**none of these

**66) A fair coin is tossed repeatedly. The probability of getting a result in
the fifth toss different from those obtained in the first four tosses is**

**a)**

**b)**

**c)**

**d)**

**67) It has been found that if A and B play a game 12 times, A wins 6 times,
B wins 4 times and they draw twice. A and B take part in a series of 3 games.
The probability that they will win alternately is**

**a)**

**b)**

**c)**

**d)**none of these

**68) If the probability of A to fail in an examination is
and that of B is
then the probability that either A or B fails is**

**a)**

**b)**

**c)**

**d)**none of these

**69) A and B are two events where P(A) = 0.25 and P(B) = 0.5. The probability
of both happening together is 0.14. The probability of both A and B not happening
is**

**a)**0.39

**b)**0.25

**c)**0.11

**d)**none of these

**70) Three faces of an ordinary dice are yellow, two faces are red and one face
is blue. The dice is tossed 3 times. The probability that yellow, red and
blue faces appear in the first, second and third tosses respectively is**

**a)**

**b)**

**c)**

**d)**none of these

**71) India play two matches each with West Indies and Australia. In any match
the probabilities of India getting 0, 1 and 2 points are 0.45, 0.05 and 0.50
respectively. Assuming that the outcomes are independent, the probability
of India getting at least 7 points is**

**a)**0.0875

**b)**

**c)**0.1125

**d)**none of these

**72) Let A and B be two independent events such that ****a)** **b)** **c)** **d)** none of these

**73) Let A and B be two independent events such that their probabilities are
and .
The probability of exactly one of the events happening is**

**a)**

**b)**

**c)**

**d)**none of these

**74) The probability that at least one of the events A and B occurs is .
If A and B occur simultaneously with probability
then
is**

**a)**

**b)**

**c)**

**d)**

**75) A, B, C are three events for which and
then the interval of values of
is**

**a)**[0.2, 0.35]

**b)**[0.55, 0.7]

**c)**[0.2, 0.55]

**d)**none of these

**76) A coin is tossed 2n times. The chance that the number of times one gets
head is not equal to the number of times one gets tail is**

**a)**

**b)**

**c)**

**d)**none of these

**77) A coin is tossed n times. The probability of getting at least one head
is greater than that of getting at least two tails by .
Then n is**

**a)**5

**b)**10

**c)**15

**d)**none of these

**78) A coin is tossed 7 times. Each time a man calls head. The probability
that he wins the toss on more occasions is**

**a)**

**b)**

**c)**

**d)**none of these

**79) A bag contains 14 balls of two colours, the number of balls of each colour
being the same. 7 balls are drawn at random one by one. The ball in hand is
returned to the bag before each new draw. If the probability that at least
3 balls of each colour are drawn is p then**

**a)**

**b)**

**c)**p < 1

**d)**

**80) From a box containing 20 tickets of value 1 to 20, four tickets are drawn
one by one. After each draw, the ticket is replaced. The probability that
the largest value of tickets drawn is 15 is**

**a)**

**b)**

**c)**

**d)**none of these

**81) A dice is thrown 2n + 1 times, .
The probability that faces with even numbers show odd number of times is**

**a)**

**b)**

**c)**

**d)**none of these

**82) 6 ordinary dice are rolled. The probability that at least half of them will
show at least 3 is**

**a)**

**b)**

**c)**

**d)**none of these

**83) An ordinary dice is rolled a certain number of times. The probability of
getting an odd number 2 times is equal to the probability of getting an even
number 3 times. Then the probability of getting an odd number an odd number
of times is**

**a)**

**b)**

**c)**

**d)**none of these

**84) A card is drawn from a pack. The card is replaced and the pack is reshuffled.
If this is done six times, the probability that 2 hearts, 2 diamonds and 2
black cards are drawn is**

**a)**

**b)**

**c)**

**d)**none of these

**85) A man firing at a distant target has 10% chance of hitting the target in
one shot. The number of times he must fire at the target to have about 50%
chance of hitting the target is**

**a)**11

**b)**9

**c)**7

**d)**5

**86) There are four machines and it is known that exactly two of them are faulty.
They are tested one by one in a random order till both the faulty machines
are identified. Then the probability that only two tests will be required
is**

**a)**

**b)**

**c)**

**d)**

**87) Let A = {2, 3, 4, …, 20}. A number is chosen at random from the set A and
it is found to be a prime number. The probability that it is more than 10
is**

**a)**

**b)**

**c)**

**d)**none of these

**88) All the spades are taken out from a pack of cards. From these cards, cards
are drawn one by one without replacement till the ace of spades comes. The
probability that the ace comes in the 4**

^{th}draw is

**a)**

**b)**

**c)**

**d)**none of these

**89) A point is selected at random from the interior of a circle. The probability
that the point is closer to the center than the boundary of the circle is**

**a)**

**b)**

**c)**

**d)**none of these

**90) A, B and C are contesting the election for the post of secretary of a club
which does not allow ladies to become members. The probabilities of A, B and
C winning the election are
respectively. The probabilities of introducing the clause of admitting lady
members to the club by A, B, and C are 0.6, 0.7 and 0.5 respectively. The
probability that ladies will be taken as members in the club after the election
is**

**a)**

**b)**

**c)**

**d)**none of these

**91) There are 4 white and 3 black balls in a box. In another box there are 3
white and 4 black balls. An unbiased dice is rolled. If it shows a number
less than or equal to 3 then a ball is drawn from the first box but if it
shows a number more than 3 then a ball is drawn from the second box. If the
ball drawn is black then the probability that the ball was drawn from the
first box is**

**a)**

**b)**

**c)**

**d)**

**92) If E and F are two events with
then**

**a)**

**b)**

**c)**

**d)**none of the above implications hold

**93) If A and B are two events such that
then**

**a)**

**b)**

**c)**

**d)**none of these

**94) If
and
are the complementary events of the events E and F respectively then**

**a)**

**b)**

**c)**

**d)**

**95) Given that .
Let A be the event of (x, y) satisfying
and B be the event of (x, y) satisfying **

**. Then ****a)** **b)** A, B are exhaustive**c)** A, B are mutually exclusive**d)** A, B are independent

**96) Let A and B be two events such that .
Then**

**a)**A, B are independent

**b)**A, B are mutually exclusive

**c)**P(A) = P(B)

**d)**

**97) The probability that exactly one of the independent events A and B occurs
is equal to**

**a)**

**b)**

**c)**all the above

**d)**none of these

**98) For any two events A and B****a)** **b)** **c)** **d)**

**99) A coin is tossed repeatedly. A and B call alternately for winning a prize
of Rs. 30. One who calls correctly first wins the prize. A starts the call.
Then the expectation of
**

**a)**A is Rs 10, B is Rs 5

**b)**B is Rs 10, A is Rs 20

**c)**A is Rs 20, B is Rs 30

**d)**B is Rs 20, A is Rs 10

**100) The probability that a marksman will hit a target is given as
Then the probability of at least one hit in 10 shots is**

**a)**

**b)**

**c)**

**d)**

**Answers**