Let $X_1, X_2, ..., X_n$ be a random sample from a distribution with mean $\mu$ and variance $\sigma^2$. Then by the Central Limit Theorem if $n$ is sufficiently large, $\bar{X}$ has approximately a normal distribution with $\mu_{\bar{X}}=\mu$ and $\sigma^2_{\bar{X}}=\sigma^2/n.$

The Central Limit Theorem can generally be used if $n>30.$

A.

Given $\mu=73.5, \sigma=2.5, n=30.$

Assume $\bar{X}\sim N(\mu, \sigma^2/n)$

B.