An epidemiologist is analyzing vaccination rates across 5 regions. The rates (in %) are: 68, 74, 70, 82, and 76. She wants to compute the standard deviation to assess disparity. What is the standard deviation, rounded to the nearest tenth? - Nelissen Grade advocaten
How Epidemiologists Analyze Vaccine Disparity Using Standard Deviation: A Numerical Example
How Epidemiologists Analyze Vaccine Disparity Using Standard Deviation: A Numerical Example
In public health, understanding how vaccination rates vary across regions is crucial for identifying disparities and informing targeted interventions. Epidemiologists rely on statistical tools like the standard deviation to quantify this variation in coverage. A lower standard deviation indicates more uniform vaccination rates, while a higher value suggests significant differences between regions—highlighting areas where equity efforts are most needed.
Consider a recent analysis of vaccination rates across five regions, with percentages: 68%, 74%, 70%, 82%, and 76%. To assess the degree of disparity, one key metric is the standard deviation—a measure of how far individual values deviate from the mean. This article walks through the calculation and explains what the result reveals.
Understanding the Context
Step 1: Calculate the Mean (Average)
First, sum all vaccination rates and divide by the number of regions:
68 + 74 + 70 + 82 + 76 = 370
Mean = 370 ÷ 5 = 74%
Step 2: Find Deviations from the Mean
Next, subtract the mean from each rate and square the result:
- (68 – 74)² = (-6)² = 36
- (74 – 74)² = 0² = 0
- (70 – 74)² = (-4)² = 16
- (82 – 74)² = 8² = 64
- (76 – 74)² = 2² = 4
Step 3: Compute Variance
Average these squared deviations:
(36 + 0 + 16 + 64 + 4) = 120
Variance = 120 ÷ 5 = 24 (using population variance; divide by N, not N–1, since this represents the full population of five regions)
Step 4: Calculate Standard Deviation
Take the square root of the variance:
√24 ≈ 4.899
Key Insights
Rounded to the nearest tenth, the standard deviation is 4.9%.
What This Means
A standard deviation of 4.9% indicates moderate variation in vaccination coverage across the five regions. While most rates cluster near the mean of 74%, the range from 68% to 82% reflects meaningful differences. Public health officials can use this insight to investigate underlying causes—such as access, outreach, or misinformation—and design equitable strategies to boost coverage in lower-performing areas.
Understanding and communicating statistical disparity through tools like standard deviation empowers data-driven decisions in vaccination campaigns and beyond.
