The concept of central limit theorem helps in the computation of:
(A) confidence level
(B) confidence interval
(C) random error
(D) sampling error
Correct Ans: (D)
Explanation:
The central limit theorem (CLT) is a fundamental statistical principle that plays a vital role in computing sampling error in communication research and beyond. It states that the distribution of sample means approximates a normal distribution as the sample size increases, regardless of the population’s distribution.
Why does this matter? Because sampling error is the difference between a sample statistic and the actual population parameter. The CLT allows researchers to predict and quantify this error, even if the original population isn’t normally distributed. This is possible because repeated samples from the same population will produce a distribution of sample means that becomes increasingly normal as the sample size grows—usually around 30 or more observations.
This normality lets researchers calculate how far off a sample mean is likely to be from the population mean. In turn, it makes the estimation of confidence intervals and margins of error statistically valid. However, while the CLT underpins many inferential procedures, it is most directly used for estimating sampling error, which helps determine the reliability of research findings.
In mass communication studies, where surveys, polls, and content analyses often use samples to generalize about larger populations, understanding and applying the CLT helps ensure methodological soundness. Without it, researchers would struggle to justify the accuracy of sample-based conclusions, especially when working with diverse audiences and complex media behaviors.