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Effect size

Effect size measures the practical importance of a result independently of sample size. A finding can be statistically significant yet trivially small. Cohen's d is the most widely used index for mean comparisons.

ByHoang TruongUpdated

FrameworkHypothesis testing

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Cohen's d divides the difference between two group means by the pooled standard deviation. Conventional benchmarks treat 0.2 as a small effect, 0.5 as medium and 0.8 as large, though what counts as meaningful still depends on context. A statistically significant result can still carry a trivially small effect size.

Where it fits
SubjectData Analysis & StatisticsAdvancedTopicHypothesis TestingAdvanced

The formula

LaTeX
d=xˉ1xˉ2spooledd = \frac{\bar{x}_1 - \bar{x}_2}{s_{\text{pooled}}}

Variables

Sample mean of group 1
Sample mean of group 2
Pooled standard deviation: √[((n₁ − 1)s₁² + (n₂ − 1)s₂²) ÷ (n₁ + n₂ − 2)]

Conventional benchmarks: |d| = 0.2 small, 0.5 medium, 0.8 large. What constitutes a practically important effect depends on context, not convention alone.

Check yourself

PracticeCORE

A randomised trial of a new study-skills workshop shows a statistically significant improvement in exam scores (p = 0.001) with Cohen's d = 0.08. What is the most accurate interpretation?

Select an answer to check your understanding.
Effect size — Edlintics Glossary