7.4 Setting Up a Test for a Population Mean

    Cards (48)

    • To set up a test for a population mean, it is crucial to identify the research question and formulate the null and alternative hypotheses
    • The significance level (α\alpha) in hypothesis testing determines the threshold for rejecting the null hypothesis
    • Choosing α\alpha depends on the consequences of Type I errors versus the need for sensitivity

      True
    • A z-test is used when the population standard deviation is known

      True
    • What must be determined about the population standard deviation before choosing a test statistic?
      Known or unknown
    • What does the null hypothesis in a hypothesis test assert about the population mean?
      No difference from a value
    • What is the common value for the significance level (α\alpha) in general use?

      0.05
    • What determines the choice between a z-test and a t-test for a population mean?
      Known or unknown standard deviation
    • Match the test statistic with the condition for its use:
      z-test ↔️ Population standard deviation known
      t-test ↔️ Population standard deviation unknown
    • When should a t-test be used instead of a z-test?
      Population SD is unknown
    • What is the formula for the z-test statistic?
      z = \frac{\bar{x} - \mu_{0}}{\frac{\sigma}{\sqrt{n}}}</latex>
    • What is the formula for the t-test statistic?
      t = \frac{\bar{x} - \mu_{0}}{\frac{s}{\sqrt{n}}}</latex>
    • In the example calculation, the t-test statistic is 2.5
    • The p-value is compared to the significance level to make a decision
    • The null hypothesis asserts there is no difference between the population mean and a specified value

      True
    • If α=\alpha =0.05 0.05, there is a 5% chance of rejecting the null hypothesis when it is true

      True
    • Match the assumption/condition with its description:
      Independence ↔️ Sample observations must be independent of each other
      Normality ↔️ The population from which the sample is drawn must be normally distributed
      Known Population Standard Deviation ↔️ If unknown, the sample size must be large enough
    • A t-test is used when the population standard deviation is unknown
    • If the population standard deviation is known, a z-test should be used.
    • The alternative hypothesis for a two-tailed test is denoted as \( H_a: \mu \neq \mu_0 \), where \neq means "not equal to."
    • Steps to check assumptions and conditions for a hypothesis test
      1️⃣ Independence of observations
      2️⃣ Normality of the population
      3️⃣ Known population standard deviation (or large sample size if unknown)
    • A z-test is used when the population standard deviation is known because the test statistic follows a standard normal distribution.
    • The formula for the z-test statistic is \( z = \frac{\bar{x} - \mu_{0}}{\frac{\sigma}{\sqrt{n}}} \), where \sigma is the population standard deviation.
    • The t-test is more appropriate when the population standard deviation is unknown
    • In the z-test formula, xˉ\bar{x} represents the sample mean
    • In the t-test formula, ss represents the sample standard deviation
    • What does the p-value represent?
      Probability of extreme test statistic
    • What decision is made if the p-value is less than or equal to the significance level?
      Reject null hypothesis
    • The p-value assumes the null hypothesis is true.

      True
    • Rejecting the null hypothesis means the population mean is likely different from the specified value.

      True
    • Match the alternative hypothesis with its notation:
      States the population mean is different from the specified value ↔️ Ha:μμ0H_{a}: \mu \neq \mu_{0}
      States the population mean is greater than the specified value ↔️ Ha:μ>μ0H_{a}: \mu > \mu_{0}
      States the population mean is less than the specified value ↔️ Ha:μ<μ0H_{a}: \mu < \mu_{0}
    • The significance level (α\alpha) determines the threshold for rejecting the null hypothesis and is the probability of making a Type I error
    • The choice between a z-test or a t-test depends on whether the population standard deviation is known or unknown
    • The t-test accounts for additional uncertainty in estimating the standard deviation from the sample
      True
    • The t-test is more appropriate when the population standard deviation is unknown because it accounts for additional uncertainty.

      True
    • The significance level (α\alpha) represents the probability of rejecting a true null hypothesis.

      True
    • The population from which the sample is drawn must be normally distributed for a valid hypothesis test.
    • The t-test is appropriate for small sample sizes when the population standard deviation is unknown.

      True
    • What is the key difference in the t-test formula compared to the z-test formula?
      Use of sample standard deviation
    • The z-test is used when the population standard deviation is known.

      True
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