I'm currently messing around with confidence intervals and I can't really understand how a $t$ distribution converges to a normal distribution for large $n$.
For example, suppose we want to construct a $95\%$ confidence interval when we have a sample mean $\bar{X} = 74.8$ and sample variance $S = 1.23$ with $n = 143$.
I would construct the confidence interval using,
$$(\bar{X} - z_{1 - \frac{\alpha}{2}} \frac{S} {\sqrt{n}},\bar{X} + z_{1 - \frac{\alpha}{2}} \frac{S} {\sqrt{n}})$$
since $n>30$. If $n<30$ I would have used a $t$-distribution.
My question is why does the $t$ - distribution approach a normal distribution for relatively large $n$?