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Z-interval

Written by the Fiveable Content Team • Last updated August 2025
Written by the Fiveable Content Team • Last updated August 2025

Definition

The z-interval is a statistical concept used to estimate the range of values that a population mean or proportion is likely to fall within, based on a sample drawn from that population. It is a fundamental tool in hypothesis testing, particularly in the context of evaluating the mean or proportion of a single population.

z-interval cheat sheet for homework

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5 Must Know Facts For Your Next Test

  1. The z-interval is used when the population standard deviation is known, and the sample size is large enough (typically $n \geq 30$) to assume a normal distribution.
  2. The z-interval formula is $\bar{x} \pm z_{\alpha/2} \frac{\sigma}{\sqrt{n}}$, where $\bar{x}$ is the sample mean, $z_{\alpha/2}$ is the critical value from the standard normal distribution, $\sigma$ is the population standard deviation, and $n$ is the sample size.
  3. The z-interval can be used to test hypotheses about a single population mean or proportion, providing a range of plausible values for the parameter based on the sample data.
  4. The confidence level of the z-interval, typically 95%, represents the probability that the true population parameter will fall within the calculated interval.
  5. The margin of error in a z-interval is determined by the critical value $z_{\alpha/2}$ and the standard error of the sample statistic, $\frac{\sigma}{\sqrt{n}}$.

Review Questions

  • Explain how the z-interval is used in hypothesis testing of a single mean.
    • In hypothesis testing of a single mean, the z-interval is used to determine whether the sample mean is significantly different from a hypothesized population mean. The z-interval provides a range of plausible values for the population mean, based on the sample data and the known population standard deviation. If the hypothesized mean falls outside the z-interval, the null hypothesis can be rejected, indicating that the sample mean is significantly different from the hypothesized value.
  • Describe the role of the z-interval in hypothesis testing of a single proportion.
    • When testing hypotheses about a single population proportion, the z-interval is used to estimate the range of values that the true population proportion is likely to fall within. The z-interval formula for a proportion is $\hat{p} \pm z_{\alpha/2} \sqrt{\frac{\hat{p}(1-\hat{p})}{n}}$, where $\hat{p}$ is the sample proportion, $z_{\alpha/2}$ is the critical value, and $n$ is the sample size. The z-interval is then used to determine whether the hypothesized proportion falls within the calculated range, allowing for the evaluation of the null hypothesis.
  • Analyze the factors that influence the width of the z-interval and the interpretation of the results.
    • The width of the z-interval is influenced by several factors, including the population standard deviation, the sample size, and the desired level of confidence. A smaller population standard deviation, a larger sample size, and a lower confidence level (e.g., 90% instead of 95%) will result in a narrower z-interval, indicating more precision in the estimation of the population parameter. The interpretation of the z-interval results depends on the context of the hypothesis test, as a wider interval suggests greater uncertainty in the estimation of the population mean or proportion, while a narrower interval indicates more confidence in the sample-based inference.
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