Math  /  Data & Statistics

Questioning a Claim about a Question 20, Question HW Score: 27.58\%, 5.19 of 21 points Points: 0 of 1 Save
This is the second problem where we want you to use the tcdf calculator program to find a p-value when you already have the Test Statistic. If you have not already accessed it, you need to open the Technology Guide to find P-values (with Examples) Handout found in Content for detailed steps and examples. There is also a video that works through examples of these. Follow the directions for a right tailed test for this problem provided on the handout. The bounds you need to enter in your calculator for a right tailed test are specified on the handout. Do not guess. Read and follow the directions. Use Technology to find the p -value for the claim H1: μ>44.6\mu>44.6, if the test statistic is known to be t=1.67\mathrm{t}=1.67 and n=151\mathrm{n}=151. Will the test statistic, t=1.67\mathrm{t}=\mathbf{1 . 6 7}, be the upper or lower bound for a right tail test? A. Lower bound, since we want the area to the right of this value for a right tail. B. Upper bound, since we want the area to the left of this value for a right tail.
What is the p-value? \square Round your answer to 4 decimal places. Clear all Check answer

Studdy Solution
The *p*-value for the right-tailed test with t=1.67t = 1.67 and n=151n = 151 is 0.04830.0483.
The test statistic, t=1.67t = 1.67, is the lower bound for a right tail test since we want the area to the right of this value.

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