$A$ die is thrown three times. Getting a $3$ or a $6$ is considered success. Then the probability of at least two successes is

If a Bernoulli trial is conducted $n$ times,then which one of the following is not suitable to use Poisson distribution?
$(i)$ Each trial results in two mutually exclusive outcomes namely success,failure.
(ii) The number $n$ of such trials is sufficiently large.
(iii) The trials are independent of each other.
(iv) The probability $p$ of success in each trial is very large.

If the sum and the product of the mean and variance of a binomial distribution are $24$ and $128$ respectively,then the probability of one or two successes is:

$A$ and $B$ are playing a chess game with each other. The probability that $A$ wins the game is $0.6$,the probability that he loses is $0.3$,and the probability that it is a draw is $0.1$. If they play three games,what is the probability that $A$ wins at least two games?

If the mean and variance of a binomial distribution are $4$ and $2$ respectively,then the probability of $2$ successes of that binomial variate $X$ is:

In a binomial distribution,the mean is $18$ and the variance is $12$,then $p = . . . . . .$