Understanding Confidence Intervals and Sampling

Parameters are irrelevant in statistics.

Parameters can be easily calculated.

It is impractical to know the true parameter.

The parameter is always known.

A single value that is the true parameter.

A range of values that might contain the true parameter with a certain confidence level.

A range of values that is guaranteed to contain the true parameter.

A range of values that is always incorrect.

To determine the exact population parameter.

To determine the number of standard deviations for the margin of error.

To adjust the sample size.

To calculate the sample mean.

To ignore the population proportion.

To exactly match the population proportion.

To replace the population proportion.

To estimate the population proportion.

By using the population mean directly.

By using the sample proportion and sample size.

By using the population proportion directly.

By using the sample mean and sample size.

It is the only method available.

It provides an exact confidence interval.

It overestimates the confidence interval.

It underestimates the confidence interval.

Because it is always zero.

Because it is often impractical to measure the entire population.

Because it is always infinite.

Because it is irrelevant to statistics.

To construct confidence intervals for sample means when the population standard deviation is unknown.

To calculate exact population parameters.

To replace the z-distribution in all cases.

To construct confidence intervals for known population standard deviations.

A z-table is used for all types of data.

A t-table is only used for proportions.

A t-table is used when the population standard deviation is unknown.

A z-table is more accurate than a t-table.

It will contain the true population mean 5% of the time.

It will always contain the true population mean.

It will contain the true population mean 95% of the time over repeated samples.

It will never contain the true population mean.