If n is the sample size and x is the number in the sample who have a certain characteristic, then x/n is called the sample [blank]

If \( n \) is the sample size and \( x \) is the number in the sample who have a certain characteristic, then \( \frac{x}{n} \) is called the sample proportion.

The probability distribution of p is called a [blank] distribution.

The probability distribution of \( p \) is called a binomial distribution, if \( p \) represents the probability of success in a binomial experiment (which consists of a fixed number of independent trials, each with two possible outcomes). If \( p \) is being considered in a different context, it could also be related to other distributions (e.g., normal or uniform), but in the context of sample proportion and successes in trials, the term “binomial” is most applicable.

The probability distribution of ^p is called a [blank] distribution.

The probability distribution of \( \hat{p} \) (the sample proportion) is called a sampling distribution. Specifically, when the sample size is large, the sampling distribution of \( \hat{p} \) can be approximated by a normal distribution due to the Central Limit Theorem, especially when the conditions for the normal approximation are met (e.g., \( np \) and \( n(1-p) \) both being greater than 5 or 10).