6.1: Sampling Distributions

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So far, we’ve worked with samples to estimate characteristics of a population. And we’ve seen that statistics (like averages or proportions) can vary from sample to sample. How do we know if our sample is representative of the population? We can express a distribution of possible samples, which is fittingly called the Sample distribution.

Review: A Few Key Terms

Population: The entire group we care about (e.g., all voters, all students at a college).
Sample: A subset of the population that we actually measure (e.g., 100 randomly chosen voters).
Statistic: A summary measure calculated from a sample (e.g., the sample mean \( \bar{x} \), or sample proportion \( \hat{p} \)).
Parameter: A summary measure from a population (e.g., the population mean \( \mu \), or population proportion \(p\)).

We use sample statistics to make guesses about underlying population parameters.

What is a Distribution of Samples?

Definition: Sampling Distribution

The sampling distribution of a statistic is the distribution of values that the statistic takes on in repeated random samples of the same size from the same population.

You can imagine if we repeated took a new random sample and recorded the statistic obtained, we would build up a histogram showing where the most likely statistics fall.

Sampling Distribution Simulation (n = 5)

This simulation draws random samples from a fixed population (sample size = 5). Samples are shown in the left. The distribution of sample means builds on the right.

Why Does This Matter?

Sampling distributions allow us to study the long-run behavior of sample statistics. They help us answer questions like:

How much do sample means typically vary?
How close is a sample proportion likely to be to the true population proportion?
What’s the probability of getting a certain sample result if nothing unusual is happening?

Think About It: Imagine 10 different people take random samples of 25 students to estimate the average number of hours of sleep students at your school get per night. Do you expect them to get the same result? What do you think the distribution of their results would look like?

In the next section, we’ll study the sampling distribution of the sample mean one of the most important and widely used statistics in all of data analysis.

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Definition: Sampling Distribution

Sampling Distribution Simulation (n = 5)

Why Does This Matter?