(One or more correct answers) 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
a)
b)
c)
d)
Your Answer
Two events A and B have probabilities 0.25 and 0.50 respectively. The possibility of both A and B occur simultaneously is 0.14 then the probability that neither A nor B occur is
a) 0.39
b) 0.25
c) 0.11
d) None of these
The probability that an event A happens in one of the experiments is 0.4 Three independent trials of these experiments are performed. The probability that the event A happens at least once is
a) 0.936
b) 0.784
c) 0.904
Three identical dice are rolled. The probability that the same number will appear on each of them is
The probability that at least one of the events A and B occurs is 0.6. If A and B occur simultaneously with probability 0.2 then is
a) 0.4
b) 0.8
c) 1.2
d) 1.4
India played two matches each with Australia and West indies. In any match the probability of India getting the points 0, 1, and 2 are 0.45, 0.05 and 0.50 respectively. Assuming that the outcomes are independent, the probability of India getting at least seven points is
a) 0.8730
b) 0.0875
c) 0.0625
d) 0.0250
An unbiased die with faces marked 1, 2, 3, 4, 5 and 6 is rolled 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
The probability of India winning a test match against West Indies is ½. Assuming independence of outcomes in each match, the probability that in a 5 test match series India’s second win will occur in the third test is
Three of the vertices of a regular hexagon are chosen at random. The probability that the triangle with three vertices is equilateral equals
For the three events A, B, C,
P(exactly one of A or B occurs) = P(exactly one of B or C occurs) = P(exactly one of C or A occurs) = p and P(all the three events occur simultaneously = where . Then the probability of at least one of A, B, C occurring is
Seven white balls and three black balls are randomly placed in a row. The possibility that no two black balls are placed adjacently equals
If from each of the three boxes containing 3 white and one 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
If are complementary events E and F respectively and if 0 < p(E) < 1, then
A fair coin is tossed repeatedly. If the tail appears on first four times, then the probability of the head appearing on in the fifth toss equals
The numbers are selected from the set S = {1, 2, 3, 4, 5, 6} without replacement one by one. Probability that the minimum of the two numbers is less than 4 is
If three distinct numbers are chosen randomly from the first 100 natural numbers then the probability that all three of them are divisible by 2 and 3 is
If P (B) = and then
P (B ∩ C) is
A fair die is rolled. The probability that 1 occurs at the even number of trail is
One Indian and four American men and their wives are to be seated randomly around a circular table. Then the conditional probability that Indian man is seated adjacent to his wife given that each American man is seated adjacent to his wife is
(One or more correct answers) For two given events A and B, P (A ∩ B) is
a) Not less than P (A) + P (B) − 1
b) Not greater than P (A) + P (B)
c) Equal to P (A) + P (B) − P (A ∪ B)
d) Equal to P (A) + P (B) + P (A ∪ B)
(One or more correct answers) Let E and F are two independent events. The probability that both E and F happen is and the probability that neither E nor F happens is , then
The probability that a student passes in Mathematics, Physics and Chemistry are m, p and c respectively. Of these subjects, the student has 75% chances of passing in at least one, a 50% chance of passing in at least two and 40% chance of passing in exactly two. Which of the following relations is true?
Six boys and six girls sit in a row at random. Find the probability that the six girls sit together,
Six boys and six girls sit in a row at random. Find the probability that the girls and the boys sit alternately.
