5 Must Know Facts For Your Next Test

1. The significance level (alpha) is typically set at 0.05, meaning there is a 5% risk of committing a Type I error when rejecting the null hypothesis.
2. Type I errors can have serious implications in fields such as medicine, where incorrectly concluding that a treatment works could lead to harmful consequences.
3. In hypothesis testing, reducing the alpha level lowers the risk of Type I errors but may increase the risk of Type II errors.
4. The probability of making a Type I error is controlled by the significance level, which researchers choose based on the context of their study.
5. In post-hoc tests, the likelihood of Type I errors can increase because multiple comparisons are made; thus, adjustments are often necessary.

Review Questions

• How does setting a lower alpha level impact the likelihood of committing a Type I error?
  • Setting a lower alpha level decreases the probability of committing a Type I error because it raises the threshold for rejecting the null hypothesis. For instance, changing alpha from 0.05 to 0.01 means that you require stronger evidence to conclude that an effect exists. However, this change can also increase the risk of making a Type II error, where you fail to reject a false null hypothesis due to insufficient evidence.
• Discuss how understanding Type I errors can influence the design and interpretation of one-sample tests.
  • Understanding Type I errors is crucial in designing one-sample tests as it influences how researchers set their alpha levels and interpret their results. If a researcher does not account for the possibility of a Type I error, they may mistakenly conclude that their sample provides strong evidence against the null hypothesis when it does not. This understanding leads researchers to consider factors like sample size and variability, ensuring they interpret results more cautiously and accurately.
• Evaluate how post-hoc analyses can complicate the understanding of Type I errors in hypothesis testing.
  • Post-hoc analyses often involve conducting multiple tests after obtaining an overall significant result, which increases the chance of Type I errors across these tests. Each additional test adds another opportunity to falsely reject a true null hypothesis. Consequently, researchers must implement corrections such as the Bonferroni correction to adjust their significance levels accordingly. By recognizing this complication, researchers can more responsibly interpret their findings and avoid overstating the effects found in their data.

© 2025 Fiveable Inc. All rights reserved.

AP® and SAT® are trademarks registered by the College Board, which is not affiliated with, and does not endorse this website.