Mark ‘TRUE’ or ‘FALSE’ for each of the following. ( B ) \left(B\right) The critical value is the boundary of the rejection region.

Welcome back. We'd like to mark either true or false for each of the following statements, and in part b, our statement is this. The critical value is the boundary of the rejection region. Well, if we're doing a left tailed hypothesis test, then anything to the left of our critical value is in the rejection region. If we're doing a right tailed hypothesis test, anything to the right of the critical value is in the rejection region. And if we're doing a two tailed hypothesis test, then anything to the left of the negative critical value or to the right of the positive critical value is in the rejection region, so our critical values are marking off where the rejection region starts. So the answer here is true. And, in fact, when we defined the rejection region, we did say that the critical value was acting as a boundary for it. Great work.

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9. Hypothesis Testing for One Sample

Critical Values and Rejection Regions

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9. Hypothesis Testing for One Sample

Critical Values and Rejection Regions

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Multiple Choice

Mark ‘TRUE’ or ‘FALSE’ for each of the following.
$(B)$ The critical value is the boundary of the rejection region.

TRUE

FALSE

Cannot be determined

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Verified step by step guidance

Identify the type of hypothesis test you are conducting (e.g., left-tailed, right-tailed, or two-tailed) based on the research question or claim.

Determine the significance level $ \alpha $ for the test, which represents the probability of rejecting the null hypothesis when it is true.

Find the critical value(s) corresponding to the significance level $ \alpha $ and the type of test using the appropriate statistical distribution (e.g., z-distribution for large samples or t-distribution for small samples). For example, for a z-test, use the standard normal distribution table to find $ z_{\alpha} $ or $ z_{\alpha/2} $.

Define the rejection region(s) based on the critical value(s). For a right-tailed test, the rejection region is $ z > z_{\alpha} $; for a left-tailed test, it is $ z < -z_{\alpha} $; and for a two-tailed test, it is $ z < -z_{\alpha/2} $ or $ z > z_{\alpha/2} $.

Use the critical value(s) and rejection region(s) to decide whether to reject or fail to reject the null hypothesis after calculating the test statistic from your sample data.