If `A_1, A_2, …, A_n` are n independent events, such that `P(A_i)=(1)/(i+1), i=1, 2,…, n` , then the probability that none of `A_1, A_2, …, A_n` occur, is

Let E_(1), E_(2), E_(3), ....,E_(n) be independent events with respective probabilities p_(1), p_(2), p_(3), ....,p_(n) . The probability that none of them occurs is ……….

Probability of independent events is P(A_(i))= (1)/(i+1) . Where i = 1, 2, 3 ... n, probability of an event that at least one event occurs is ...............

If a_1, a_2, a_3,.....a_n are in H.P. and a_1 a_2+a_2 a_3+a_3 a_4+.......a_(n-1) a_n=ka_1 a_n , then k is equal to

......... is the minimum value of n such that (1+i)^(2n) = (1 - i)^(2n) . Where n in N .

Let H_1, H_2,..., H_n be mutually exclusive events with P (H_i) > 0, i = 1, 2,.......... n. Let E be any other event with 0 P(E|H_i) .P(H_i) for i=1,2,.......,n statement II: sum_(i=1)^n P(H_i)=1

If a_(i) gt 0 AA I in N such that prod_(i=1)^(n) a_(i) = 1 , then prove that (a + a_(1)) (1 + a_(2)) (1 + a_(3)) .... (1 + a_(n)) ge 2^(n)

A box contains n coins, Let P(E_(i)) be the probability that exactly i out of n coins are biased. If P(E_(i)) is directly proportional to i(i+1),1 leilen . Q. If P be the probabiloity that a coin selected at random is biased, then lim_(xto oo) P is

If Sigma_( i = 1)^( 2n) sin^(-1) x_(i) = n pi , then find the value of Sigma_( i = 1)^( 2n) x_(i) .

x_1,x_2, x_3,………., x_n are n observations . sum_(i=1)^(n) (x_i - 2) = 100 " and " sum_(i=1)^(n) (x_i - 5) = 20 then mean barx = …….

If a_1,a_2,a_3,.....,a_(n+1) be (n+1) different prime numbers, then the number of different factors (other than1) of a_1^m.a_2.a_3...a_(n+1) , is