Consider 5 independent Bernoulli's trials each with probability of success p. If the probability of at least one failure is greater than or equal to `(31)/(32)` , then p lies in the interval :

In a binomial distribution B(n , p=1/4) , if the probability of at least one success is greater than or equal to 9/(10) , then n is greater than

If A and B are two independent events, then the probability of occurrence of at least one of A and B is given by 1- P(A') P(B').

Let E and F be tow independent events. The probability that exactly one of them occurs is 11/25 and the probability if none of them occurring is 2/25 . If P(T) deontes the probability of occurrence of the event T , then

Three students appear at an examination of mathematics. The probability of their success are 1/3,1/4,1/5 respectively. Find the probability of success of at least two.

Consider the experiment of tossing a coin. If the coin shows head, toss it again but if it shows tail, then throw a die. Find the conditional probability of the event that the die shows a number greater than 4' given that there is at least one tail.

The minimum number of tosses of a pair of dice so that the probability of getting the sum of the digits on the dice equal to 7 on atleast one toss is greater than 0.95, is, then (n+1)/6 is

Find the probability distribution of the number of successes in two tosses of a die, where a success is defined as (i) number greater than 4 (ii) six appears on at least one die

Let x^2-(m-3)x+m=0 (m in R) be a quadratic equation . Find the values of m for which the roots are: (ix)one root is smaller than 2 & other root is greater than 2 (x) both the roots are greater than 2. (xi) both the roots are smaller than 2. (xii) exactly one root lies in the interval (1,2) (xiii) both the roots lies in the interval (1,2) (xiv) at least one root lies in the interval (1,2) (xv) one root is greater than 2 and the other root is smaller than 1

Statement-1 If 10 coins are thrown simultaneously, then the probability of appearing exactly foour heads is equal to probability of apppearing exactly six heads. Statement-2 .^nC_r=.^nC_s implies either r=s or r+s=n and P(H)=P(T) in a single trial.

Of the three independent events E_1, E_2 and E_3, the probability that only E_1 occurs is alpha, only E_2 occurs is beta and only E_3 occurs is gamma. Let the probability p that none of events E_1, E_2 and E_3 occurs satisfy the equations (alpha-2beta), p=alphabeta and (beta-3gamma) p=2beta gamma. All the given probabilities are assumed to lie in the interval (0,1). Then, (probability of occurrence of E_1) / (probability of occurrence of E_3) is equal to