Confidence Intervals
7-10 Confidence Intervals
A confidence interval is a range of values that has a specified probability of containing the parameter being estimated.
A confidence interval that is too broad makes it difficult to get an idea of where the parameter (actual value) is located. A narrow confidence interval, on the other hand, limits the parameter range and makes it possible to obtain highly accurate results.
The commonly used confidence levels are 68%, 95% and 99%. Raising the confidence level broadens the confidence interval. Conversely, lowering the confidence level narrows the confidence interval, but it also creates the risk that parameters will be missed. With a confidence interval of 95%, for example, there is a 5% probability that a parameter will not be within the interval.
The following is a list of confidence intervals and a description of what each obtains.
Confidence Interval Name | Description | |
|
| |
Obtains the confidence interval for the population mean when the | ||
population standard deviation is known. | ||
| ||
|
| |
| Obtains the confidence interval for the difference between population | |
means when the population standard deviations of two populations are | ||
| known. | |
|
| |
Obtains the confidence interval of the proportion of successes in a | ||
population. | ||
| ||
|
| |
Obtains the confidence interval of the difference between the | ||
proportions of successes of two populations. | ||
| ||
|
| |
Obtains the confidence interval for the population mean when the | ||
population standard deviation is unknown. | ||
| ||
|
| |
Obtains the confidence interval for the difference between two | ||
population means when the population standard deviations are | ||
| unknown. | |
|
|
kGeneral Confidence Interval Precautions
If you input a
20050501