Confidence Intervals for Means

A confidence interval is a range of values, derived from a data set, that is likely to contain the value of an unknown population parameter. It is expressed with a confidence level, such as 95% or 99%.

The width of a confidence interval is affected by the sample size, the sample standard deviation, and the confidence level. The sample mean does not affect the width.

Increasing the sample size generally results in a narrower confidence interval, as it reduces the standard error.

The standard error is the standard deviation of the sampling distribution of a statistic, commonly the sample mean. It measures how much the sample mean is expected to vary from the true population mean.

The t-distribution is a type of probability distribution that is used when the sample size is small (typically n < 30) and/or the population standard deviation is unknown.

As the confidence level increases, the width of the confidence interval also increases. This is because a higher confidence level requires a wider range to ensure that the population parameter is captured.

A confidence interval for a population mean is calculated using the formula: CI = sample mean ± (critical value * standard error).

The critical value is a factor used to compute the margin of error in a confidence interval. It is determined by the desired confidence level and the distribution of the data.

If a confidence interval does not include the population mean, it suggests that the sample data may not be representative of the population, or that the sample size is too small.

A 99% confidence interval means that if we were to take 100 different samples and compute a confidence interval for each sample, approximately 99 of the intervals would contain the true population mean.