How to calculate population standard deviation
Population standard deviation is a widely-used measure in statistics that helps quantify the amount of variation or dispersion within a set of data points. As a critical tool for understanding the general tendencies of a population, it can weigh heavily in making informed decisions in various fields, including finance, social sciences, and quality control. In this article, we will walk you through the process of calculating population standard deviation, step-by-step.
A Brief Primer on Population Standard Deviation
The population standard deviation sheds light on the average distance each data point varies from the mean or average value of the overall data set. A lower standard deviation correlates with less variability, and vice versa. It is essential to differentiate between a population and a sample when computing standard deviation. While population refers to the entire group or set under study, samples refer to smaller groups within the population representative of that larger group.
The Formula
To calculate the population standard deviation for a given data set, use this formula:
Population Standard Deviation (σ) = √[Σ(xᵢ – μ)² / N]
Where:
– σ denotes the population standard deviation
– xᵢ symbolizes each individual data point
– μ stands for the average (mean) value of all data points
– Σ signifies summing up each squared difference
– N refers to the total number of data points in the population
Step-by-step Calculation
1. Compute the mean (μ) for your given data set.
2. Subtract this mean from each individual data point (xᵢ), resulting in a new value depicting each difference.
3. Square all new values obtained in step 2.
4. Sum all squared differences generated in step 3.
5. Divide the total sum from step 4 by the total number of items in your original data set (N).
6. Take the square root of the resulting quotient to get your population standard deviation (σ).
A Worked Example
Here’s an example for better understanding. Consider the following population data set:
Age group (in years): [20, 24, 22, 26, 28]
1. Calculate the mean (μ): (20+24+22+26+28) / 5 = 24
2. Subtract the mean from each data point and record the differences: (-4, 0, -2, 2, 4)
3. Square the differences: (16, 0, 4, 4, 16)
4. Sum all squared differences: (16 + 0 +4 +4 +16) = 40
5. Divide this sum by the number of data points (N=5): 40 / 5 =8
6. Take the square root of this quotient: √(8) ≈ 2.83
The population standard deviation for this set of ages is approximately 2.83 years.
Conclusion
With a firm grasp on calculating population standard deviation (σ), you are now better equipped to analyze variations in a data set effectively and make informed choices based on statistical evidence. Remember that understanding your data remains crucial for ensuring your results are relevant and useful in whatever context they are applied to.