A carpenter is making doors that are 2058.0 millimeters tall. Ifthe doors are too long they must be trimmed, and if they are tooshort they cannot be used. A sample of 20 doors is made, andit is found that they have a mean of 2068.0 millimeters with astandard deviation of 21.0. Is there evidence at the 0.1 levelthat the doors are too long and need to be trimmed? Assume thepopulation distribution is approximately normal.
Step 1. State the hypothesis:
Step 2. Find the value of the z test statistic. (Round youranswer to 2 decimal places.)
Step 3. Specify id the test is one-tailed or two-tailed. A)One-Tailed B) Two-Tailed
Step 4. Find the P-Value of the z test statistic. (Round youranswer to 4 decimal places.)
Step 5. Determine the value of the level of significance.
Step 6. Determine the conclusion. A) Reject Null Hypothesis B)Fail to Reject Null Hypothesis
A carpenter is making doors that are 2058.0 millimeters tall. If the doors are too long they must be trimmed, and if the
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answerhappygod
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