For n independent events `A_i's, p(A_i)=1/(1+i),i=1,2,...n`. The probability that at least one of the events occurs, is

For n independent events A_(i)^( prime)s,p(A_(i))=(1)/(1+i),i=1,2,...n. The probability that at least one of the events occurs,is

If A_(1),A_(2),...A_(n) are n independent events such that P(A_(k))=(1)/(k+1),K=1,2,3,...,n; then the probability that none of the n events occur is

If A_(1),A_(2),A_(3),.......A_(1006) be independent events such that P(A)=(1)/(2i)(i=1,2,3,.....1006) and probability that none of the events occur be (alpha!)/(2^(alpha)(beta!)^(2)). then

For three events A, B and 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) = (1)/(4) and P(All the three events occurs simultaneously = (1)/(16) . Then the probability that at least one of the events occurs, is :

If A_(1), A_(2), A_(3) ...., A_(8) are independent events such that P(A_(i)) = 1/(1+i) where 1 le I le 8 , then probability that none of them will occur is

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 P(A_i), the probability of happening of independent events A_i(i=1, 2, 3) " be given by " P(A_i)=1/(i+1) Statement-1 : The probability that at least one event happens is 3/4 . . Statement-2 : P(uuu_(i=1)^(3)Ai)=1-prod_(i=1)^(3)P(A'_(i))

If M and N are any two events, then probability that at least one of them occurs is: