CUET Mathematics MCQs Probability

Question. A bag contains 4 red and 6 black balls. A ball is drawn at random from the bag, its colour is observed and this ball along with two additional balls of the same colour are returned to the bag. If now a ball is drawn at random from the bag, then the probability that this drawn ball is red, is :
(a) 2/5
(b) 1/5
(c) 3/4
(d) 3/10
Answer : A

Question. Two aeroplanes I and II bomb a target in succession. The probabilities of I and II scoring a hit correctly are 0.3 and 0.2, respectively. The second plane will bomb only if the first misses the target. The probability that the target is hit by the second plane is 
(a) 0.2
(b) 0.7
(c) 0.06
(d) 0.14.
Answer : D

Question. If a fair die is rolling. The events are E={1,3,6}, F={4,6}. Then the probability P(E/F) is
a) 1/2
b) 2/3
c) 1/6
d) None of these
Answer : A

Question. A speaks truth in 75% cases and B speaks truth in 80% cases. The probability that they contradict each other in a statement is
a) 7/20
b) 13/20
c) 3/5
d) 2/5
Answer : A

Question. A player X has a biased coin whose probability of showing heads is p and a player Y has a fair coin. They start playing a game with their own coins and play alternately. The player who throws a head first is a winner. If X starts the game, and the probability of winning the game by both the players is equal, then the value of ‘p’ is
(a) 1/3
(b) 1
(c) 1/4
(d) 2/5
Answer : A

Question. Let A and E be any two events with positive probabilities:
Statement - 1: P(E/A) ≥ P(A/E) P(E)
Statement - 2: P(A/E) ≥ P(A∩E)
(a) Both the statements are true
(b) Both the statements are false
(c) Statement-1 is true, Statement-2 is false
(d) Statement-1 is false, Statement-2 is true
Answer : A

Question. Let A, B, C, be pairwise independent events with P (C) > 0 and P( A ∩ B ∩ C) = 0. Then P (A^c ∩ B^c / C)
(a)  P (B^c) - P (B)
(b)  P (A^c) + P (B^c)
(c)  P (A^c) - P (B^c)
(d) P (A^c) - P (B)
Answer : D

Question. Let two fair six-faced dice A and B be thrown simultaneously. If E₁ is the event that die A shows up four, E₂ is the event that die B shows up two and E₃ is the event that the sum of numbers on both dice is odd, then which of the following statements is NOT true ?
(a) E₁ and E₃ are independent.
(b) E₁, E₂ and E₃ are independent.
(c) E₁ and E₂ are independent.
(d) E₂ and E₃ are independent.
Answer : B

Question. Three houses are available in a locality. Three persons apply for the houses. Each applies for one house without consulting others. The probability that all the three apply for the same house is
(a) 9/2
(b) 9/1
(c) 9/8
(d) 9/7
Answer : B

Question. Let A and B are two events. If P(A)=0.2 p(B)=0.4, P(AᴜB)=0.6, then P(A/B) is equal to
a) 0
b) 0.3
c) 0.5
d) 0.8
Answer : A

Question. The probability that a leap year will have 53 fridays or 53 saturdays
a) 3/7
b) 4/7
c) 1/7
d) 2/7
Answer : A

Question. If A and B are any two events such that P(A) = 2/5 and  P(A ∩ B) = 3/20 then the conditional probability, P(A | A' ù B')) , where A' denotes the complement of A, is equal to :
(a) 11/20
(b) 5/17
(c) 8/17
(d) 1/4/5
Answer : B

Question. Let X be a set containing 10 elements and P(X) be its power set. If A and B are picked up at random from P(X), with replacement, then the probability that A and B have equal number elements, is :
(a) (210 -1)
(b) ²⁰C₁₀/2¹⁰
(c) (2¹⁰ - 1)/2²⁰
(d) ²⁰C₁₀/2²⁰
Answer : D

Question. Let a random variable X have a binomial distribution with mean 8 and variance 4. If P(X d” 2) = k/16², then k is equal to:
(a) 17
(b) 121
(c) 1
(d) 137
Answer : D

Question. The probability that A speaks truth is , 5/4 while the probability for B is . 4/3
The probability that they contradict each other when asked to speak on a fact is
(a) 5/4
(b) 5/1
(c) 20/7
(d) 20/3
Answer : C

Question. Two numbers are chosen from {1,2,3,4,5,6} one after the other without replacement. The probability that one of the smaller values is less than 4 is
a) 4/5
b) 1/15
c) 1/5
d) 14/15
Answer : A

Question. An unbiased coin is tossed eight times. The probability of obtaining at least one head and at least one tail is :
(a) 255/256
(b) 127/128
(c) 63/64
(d) 1/2
Answer : B

Question. Three persons P, Q and R independently try to hit a target. If the probabilities of their hitting the target are 3/4, 1/4 and 5/8 respectively, then the probability that the target is hit by P or Q but not by R is : 
(a) 21/64
(b) 9/64
(c) 15/64
(d) 39/64
Answer : A

Question. The probability of a man hitting a target is 2/5. He fires at the target k times (k, a given number). Then the minimum k, so that the probability of hitting the target at least once is more than 7/10, is : 
(a) 3
(b) 5
(c) 2
(d) 4
Answer : A

Question : A person writes 4 letters and addresses 4 envelopes . If the letters are placed in the envelopes at random, then the probability that all letters are not placed in the right envelopes, is
a) 23/24
b) 15/24
c) 11/24
d) 1/4
Answer : A

Question. Let A and B be two events such that P(A)=0.6, P(B)=0.2 and P(A/B)=0.5, then P(A’/B’) equals
a) 3/8
b) 3/10
c) 1/10
d) 6/7
Answer : A

Question. If the probability of hitting a target by a shooter, in any shot, is 1/3 then the minimum number of independent shots at the target required by him so that the probability of hitting the target at least once is greater than 5/6 is:
(a) 3
(b) 6
(c) 5
(d) 4
Answer : C

Question. A, B, C try to hit a target simultaneously but independently.
Their respective probabilities of hitting the targets are
3/4, 1/2, 5/8. The probability that the target is hit by A or B but not by C is :
(a) 21/64
(b) 7/8
(c) 7/32
(d) 9/64
Answer : A

Question. A person throws two fair dice. He wins Rs. 15 for throwing a doublet (same numbers on the two dice), wins Rs. 12 when the throw results in the sum of 9, and loses Rs. 6 for
any other outcome on the throw. Then the expected gain/loss (in Rs.) of the person is :
(a) (1/2) gain
(b) (1/4) loss
(c) (1/2) loss
(d) 2 gain
Answer : C

Question. The probability of a student getting 1,2,3 division in an examination are 1/10, 3/5 and 1/4 respectively. The probability that the student fails in the examination is
a) 27/100
b) 83/100
c) None of these
d) 197/200
Answer : A

Question. Three numbers are chosen at random without replacement from {1,2,3,..8}. The probability that their minimum is 3, given that their maximum is 6, is :
(a) 3/8
(b) 1/5
(c) 1/4
(d) 2/5
Answer : B

Question. If C and D are two events such that C ⊂ D and P(D) ≠ 0, then the correct statement among the following is
(a) P(C | D) ≥ P(C)
(b) P(C | D) < P(C)
(c) P(C | D) = P(D)/P(C)
(d) P(C | D) = P(C)
Answer : A

Question. A die is thrown two times and the sum of the scores appearing on the die is observed to be a multiple of 4.
Then the conditional probability that the score 4 has appeared atleast once is :
(a) 1/4
(b) 1/3
(c) 1/8
(d) 1/9
Answer : D