1. A and B are two events such that P (A) 0. Find P(B|A), if (i) A is a subset of B (ii) A B = 2. A couple has two children, (i) Find the probability that both children are males, if it is known that at least one of the children is male. (ii) Find the probability that both children are females, if it is known that the elder child is a female. 3. Suppose that 5% of men and 0.25% of women have grey hair. A grey haired person is selected at random. What is the probability of this person being male? Assume that there are equal number of males and females. 4. Suppose that 90% of people are right-handed. What is the probability that at most 6 of a random sample of 10 people are right-handed? 5. An urn contains 25 balls of which 10 balls bear a mark 'X' and the remaining 15 bear a mark 'Y'. A b
Question 1:A and B are two events such that P (A) 0. Find P(B|A), if (i) A is a subset of B (ii) A B = ✥
Question 2:A couple has two children, (i) Find the probability that both children are males, if it is known that at least one of the children is male. (ii) Find the probability that both children are females, if it is known that the elder child is a female.
Question 3:Suppose that 5% of men and 0.25% of women have grey hair. A grey haired person is selected at random. What is the probability of this person being male? Assume that there are equal number of males and females.
Question 4:Suppose that 90% of people are right-handed. What is the probability that at most 6 of a random sample of 10 people are right-handed?
Question 5:An urn contains 25 balls of which 10 balls bear a mark 'X' and the remaining 15 bear a mark 'Y'. A ball is drawn at random from the urn, its mark is noted down and it is replaced. If 6 balls are drawn in this way, find the probability that (i) all will bear 'X' mark. (ii) not more than 2 will bear 'Y' mark. (iii) at least one ball will bear 'Y' mark. (iv) the number of balls with 'X' mark and 'Y' mark will be equal.
Question 6:In a hurdle race, a player has to cross 10 hurdles. The probability that he will clear each hurdle is 5
Question 6:What is the probability that he will knock down fewer than 2 hurdles?
Question 7:A die is thrown again and again until three sixes are obtained. Find the probability of obtaining the third six in the sixth throw of the die.
Question 8:If a leap year is selected at random, what is the chance that it will contain 53 tuesdays?
Question 9:An experiment succeeds twice as often as it fails. Find the probability that in the next six trials, there will be atleast 4 successes.
Question 10:How many times must a man toss a fair coin so that the probability of having at least one head is more than 90%?
Question 11:In a game, a man wins a rupee for a six and loses a rupee for any other number when a fair die is thrown. The man decided to throw a die thrice but to quit as and when he gets a six. Find the expected value of the amount he wins / loses.
Question 12:Suppose we have four boxes A,B,C and D containing coloured marbles as given below: Box Marble colour Red White Black A1 6 3 B6 2 2 C8 1 1 D0 6 4 One of the boxes has been selected at random and a single marble is drawn from it. If the marble is red, what is the probability that it was drawn from box A?, box B?, box C?
Question 13:Assume that the chances of a patient having a heart attack is 40%. It is also assumed that a meditation and yoga course reduce the risk of heart attack by 30% and prescription of certain drug reduces its chances by 25%. At a time a patient can choose any one of the two options with equal probabilities. It is given that after going through one of the two options the patient selected at random suffers a heart attack. Find the probability that the patient followed a course of meditation and yoga?
Question 14:If each element of a second order determinant is either zero or one, what is the probability that the value of the determinant is positive? (Assume that the individual entries of the determinant are chosen independently, each value being assumed with probability 1 2 ).
Question 15:An electronic assembly consists of two subsystems, say, A and B. From previous testing procedures, the following probabilities are assumed to be known: P(A fails) = 0.2 P(B fails alone) = 0.15 P(A and B fail) = 0.15 Evaluate the following probabilities (i) P(A fails|B has failed) (ii) P(A fails alone)
Question 16:Bag I contains 3 red and 4 black balls and Bag II contains 4 red and 5 black balls. One ball is transferred from Bag I to Bag II and then a ball is drawn from Bag II. The ball so drawn is found to be red in colour. Find the probability that the transferred ball is black. Choose the correct answer in each of the following:
Question 17:If A and B are two events such that P(A) 0 and P(B | A) = 1, then (A) A B (B) B A (C) B = (D) A =
Question 18:If P(A|B) > P(A), then which of the following is correct : (A) P(B|A) < P(B) (B) P(A B) < P(A) . P(B) (C) P(B|A) > P(B) (D) P(B|A) = P(B)
Question 19:If A and B are any two events such that P(A) + P(B) – P(A and B) = P(A), then (A) P(B|A) = 1 (B) P(A|B) = 1 (C) P(B|A) = 0 (D) P(A|B) = 0
