5 Must Know Facts For Your Next Test

1. Degrees of freedom are typically calculated as $n - 1$ where $n$ is the sample size.
2. They are critical when using the Student's t-distribution to estimate population parameters.
3. The concept helps adjust for sample size and ensures appropriate variability in estimates.
4. Higher degrees of freedom result in a t-distribution that more closely approximates a normal distribution.
5. In confidence intervals for a single population mean using the t-distribution, degrees of freedom influence the width of the interval.

Review Questions

• How are degrees of freedom calculated in a sample?
• Why are degrees of freedom important when using the Student's t-distribution?
• What effect do higher degrees of freedom have on a t-distribution?

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