Which level of confidence interval corresponds to a specific value of 1.96 SEM?

The relationship between the standard error of the mean (SEM) and confidence intervals is fundamentally tied to the properties of the normal distribution. Specifically, a confidence interval expresses the probability that a population parameter will fall between two specific values based on sample statistics.

A Z-score of 1.96 corresponds to a standard normal distribution and represents the critical value for which approximately 95% of the data lies within ±1.96 standard deviations from the mean in a normally distributed dataset. Thus, when we discuss a confidence interval that uses 1.96 as the multiplier of the SEM, we are indicating that we are constructing an interval that captures 95% of the probable values the true population mean could take.

In practical terms, if you calculate a confidence interval using 1.96 times the SEM, you are stating with 95% confidence that the true mean lies within this interval. This is a commonly used confidence level in research, as it provides a balance between precision and reliability.

The other confidence levels correspond to different Z-scores: for instance, 1.64 corresponds to a 90% confidence level and 2.576 corresponds to a 99% confidence level. These critical values reflect the amount of data captured within those ranges but