A researcher is examining the relationship between socioeconomic status and IQ scores. The IQ scores of young American adults have historically been reported to be distributed normally with a mean of 100 and a standard deviation of 15. Initially, the researcher obtains a random sampling of 300 high school students from public schools nationwide and conducts IQ tests on all participants. Recently, the researcher received additional funding to enable an increase in sample size to 2,000 participants. Assuming that all other study conditions are held constant, which of the following is most likely to occur as a result of this additional funding?

Decrease in standard error of the mean

Increase in risk of systematic error

Increase in range of the confidence interval

Increase in probability of type II error

In the study, all participants who were enrolled and randomly assigned to treatment with pulmharkimab were analyzed in the pulmharkimab group regardless of medication nonadherence or refusal of allocated treatment. A medical student reading the abstract is confused about why some participants assigned to pulmharkimab who did not adhere to the regimen were still analyzed as part of the pulmharkimab group. Which of the following best reflects the purpose of such an analysis strategy?

To assess treatment efficacy more accurately

To increase internal validity of study

A randomized control double-blind study is conducted on the efficacy of 2 sulfonylureas. The study concluded that medication 1 was more efficacious in lowering fasting blood glucose than medication 2 (p ≤ 0.05; 95% CI: 14 [10-21]). Which of the following is true regarding a 95% confidence interval (CI)?

If the same study were repeated multiple times, approximately 95% of the calculated confidence intervals would contain the true population parameter.

The 95% confidence interval is the probability chosen by the researcher to be the threshold of statistical significance.

When a 95% CI for the estimated difference between groups contains the value ‘0’, the results are significant.

It represents the probability that chance would not produce the difference shown, 95% of the time.

The study is adequately powered at the 95% confidence interval.

A randomized controlled trial is conducted investigating the effects of different diagnostic imaging modalities on breast cancer mortality. 8,000 women are randomized to receive either conventional mammography or conventional mammography with breast MRI. The primary outcome is survival from the time of breast cancer diagnosis. The conventional mammography group has a median survival after diagnosis of 17.0 years. The MRI plus conventional mammography group has a median survival of 19.5 years. If this difference is statistically significant, which form of bias may be affecting the results?

Because this study is a randomized controlled trial, it is free of bias

Sample size determination for USMLE Step 3: High-Yield Biostatistics Lessons

Fundamentals - Sizing Up a Study

Statistical Power (1-β): Probability of detecting a true effect if it exists. Conventionally set to ≥80%.
Errors in Hypothesis Testing:
- Type I Error (α): False positive. Incorrectly rejecting a true null hypothesis. Threshold $p < \textbf{0.05}$.
- Type II Error (β): False negative. Incorrectly failing to reject a false null hypothesis.
Core Determinants of Sample Size:
- Effect Size: Magnitude of the difference to be detected. ↑ effect size → ↓ required sample size.
- Precision: A narrower confidence interval requires ↑ sample size.

Power, Effect Size, and Hypothesis Testing Distributions

⭐ To detect a smaller effect size, a much larger sample size is required to maintain the same statistical power.

Practical & Ethical Constraints: Limited resources (funding, time) and the ethical need to not expose excessive participants to potential harm or ineffective treatment constrain sample size.

Key Inputs - The Power Players

Power ($1-β$): The probability of correctly detecting a true effect (rejecting a false null hypothesis). 📌 You need POWER to detect a difference.
- Typically set at 80% (or 0.8).
- Higher power requires a larger sample size.
- Associated with Z-score $Z_β$.
Significance Level ($α$): The probability of a Type I error (incorrectly rejecting a true null hypothesis).
- Typically set at 0.05.
- Lower $α$ requires a larger sample size.
- Associated with Z-score $Z_α$.
Effect Size: The magnitude of the difference you want to detect.
- A smaller effect size requires a larger sample size to detect.
Variability: The spread of the data, measured by standard deviation ($σ$).
- Higher variability requires a larger sample size.

⭐ As power increases, the sample size requirement increases. As effect size decreases, the sample size requirement increases.

The Formula - Crunching the Numbers

Core Equation (for two means):
- $n = \frac{2(Z_{\alpha/2} + Z_{\beta})^2 \sigma^2}{(\mu_1 - \mu_2)^2}$
- n = sample size per group.
- σ = standard deviation (variability).
- μ₁ - μ₂ = effect size (expected difference).
- Zα/2 = critical value for alpha (e.g., 1.96 for 95% CI).
- Zβ = critical value for power (e.g., 0.84 for 80% power).

⭐ Power is the probability of correctly rejecting a false null hypothesis (1 - β). Conventionally set at 80%.

Key Relationships:

High‑Yield Points - ⚡ Biggest Takeaways

Sample size is set to ensure a study can detect a true effect if one exists.

It's primarily determined by power (1-β), significance level (α), effect size, and population variability.

A larger sample is required for higher power, a stricter alpha (e.g., 0.01), a smaller effect size, or greater variability.

An inadequate sample size leads to an underpowered study, increasing the risk of a Type II error (false negative).

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