- X More Info b. Construct a 90% confidence interval estimate of the population mean amount of tea per bag. Interpret th

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X More Info B Construct A 90 Confidence Interval Estimate Of The Population Mean Amount Of Tea Per Bag Interpret Th 1 (144.29 KiB) Viewed 20 times

- X More Info b. Construct a 90% confidence interval estimate of the population mean amount of tea per bag. Interpret this interval. The 90% confidence interval issus % (Round to four decimal places as needed.) Interpret the 90% confidence interval. Choose the correct answer below. 5.66 5.59 5.48 5.76 5.59 5.43 5.41 5.42 5.58 5.45 5.42 5.51 5.47 5.43 5.43 Tea Bag Weight (in grams) 5.38 5.53 5.33 5.54 5.55 5.54 5.61 5.57 5.63 5.53 5.31 5.68 5.58 5.56 5.49 5.31 5.24 5.54 5.63 5.51 5.45 5.46 5.31 5.48 5.59 5.52 5.44 5.47 5.51 5.66 5.41 5.53 5.53 5.58 5.34 O A. Do not reject H, because the hypothesized mean is not contained within the confidence interval. B. Do not reject He because the hypothesized mean is contained within the confidence interval. OC. Reject He because the hypothesized mean is not contained within the confidence interval. OD. Reject H, because the hypothesized mean is contained within the confidence interval. Print Done c. Compare the conclusions reached in (a) and (b). Choose the correct answer below. O A. The confidence interval shows insufficient evidence while the hypothesis test shows sufficient evidence that the mean amount of tea per bag is different from 5.5 grams. OB. The confidence interval and hypothesis test both show that there is insufficient evidence that the mean amount of tea per bag is different from 5.5 grams. OC. The confidence interval shows sufficient evidence while the hypothesis test shows insufficient evidence that the mean amount of tea per bag is different from 5.5 grams. OD. The confidence interval and hypothesis test both show that there is sufficient evidence that the mean amount of tea per bag is different from 5.5 grams.