Comparing Treatments Using Randomized Experiments - Statistics

Fail to reject $H_0$; the difference is not statistically significant. $p > \alpha$ means insufficient evidence to reject null.

The observed responses and group sizes; only treatment labels are shuffled. Simulates null hypothesis by reassigning treatments randomly.

The observed difference is unlikely by chance; evidence of a treatment effect. Small p-values suggest the difference isn't due to chance.

Reject $H_0$ if $p\text{-value} \le \alpha$. Standard hypothesis testing decision rule.

Proportion of simulated stats $c^6$ as or more extreme than observed. Measures how extreme the observed difference is.

Under $H_0$, treatment labels are exchangeable (no real effect). If no effect exists, any assignment gives similar results.

$H_0:\ p_1 - p_2 = 0$ (no treatment effect). Tests if treatment proportions are equal (no effect).

$H_0:\ \mu_1 - \mu_2 = 0$ (no treatment effect). Tests if treatment means are equal (no effect).

The difference in sample means, $\bar{x}_1 - \bar{x}_2$. Sample means estimate population means.

The difference in sample proportions, $c^6p_1 - c^6p_2$. Sample proportions estimate population proportions.

$1.3$. Direct subtraction: $18.2 - 16.9 = 1.3$

The difference in population means, $bc_1 - bc_2$. Compares average outcomes between two treatment groups.

The difference in population proportions, $p_1 - p_2$. Compares success rates between two treatment groups.

The outcome measured on each experimental unit. The variable we measure to compare treatment effects.

To reduce confounding and support a cause-and-effect conclusion. Random assignment ensures groups are comparable except for treatment.

Approximately $0$. Under $H_0$, no treatment effect means difference centers at 0.

Right-tail probability (simulated differences $\ge$ observed). One-sided test looks only at differences in predicted direction.

Two tails: simulated differences with $|\text{stat}| \ge |\text{observed}|$. Two-sided test considers extreme differences in either direction.

$0.15$. $\frac{12}{40} - \frac{6}{40} = 0.30 - 0.15 = 0.15$

Not statistically significant; insufficient evidence of a treatment effect. Common results suggest random variation, not treatment.

The difference is statistically significant; evidence of a treatment effect. Extreme results suggest treatment causes the difference.

Proportion of simulated statistics at least as extreme as observed. Counts how often random chance produces results this extreme.

The observed result is unlikely if $H_0$ is true. Low probability under null suggests treatment effect.

To reduce confounding and support a cause-and-effect conclusion. Random assignment ensures groups are comparable except for treatment.

Rejecting $H_0$ and claiming a treatment effect when none exists. False positive: concluding effect when there's none.

The difference in population proportions, $p_1 - p_2$. Compares success rates between two groups.

Random assignment of experimental units to treatments. Random assignment eliminates confounding variables.

Only to the population represented by the random sample (if one exists). Without random sampling, can't generalize beyond participants.

Failing to reject $H_0$ when a treatment effect actually exists. False negative: missing a real treatment effect.