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The data shown below represent the repair cost for a low-impact collision in a simple random sample of mini- and micro-vehicles. Complete parts (a) through (d) below. $3148 $1042 $743 $663 $773 $1758 $3345 $2018 $2664 $1343 Click here to view the table of critical t-values Click here to view page 1 of the standard normal distribution table Click here to view page 2 of the standard normal distribution table (a) Draw a normal probability plot to determine if it is reasonable to conclude the data come from a population that is normally distributed. Choose the correct ans below. OA OC OD Q Q Q Expected 2-score Expected E-score Expected 2-spare 2000 2000 4000 2000 4000 4000 Ropair Cost ($) Repair Cout IS) Repair Cost (s) Rapor Cow Ist Is it reasonable to conclude that the data come from a population that is normally distributed? O A. Yes, because the plotted values are not linear. O B. No. because there are not enough values to make a determination. C. Yes, because the plotted values are approximately linear. O D. No, because the plotted values are not linear. (b) Draw a boxplot to check for outliers, Choose the correct answer below. OB OC OD 2000 4080 2000 4080 2060 4000 2000 4090 Dous the boxplot suggest that there are outliers? O A. Yes, there is at least one point that is greater than the third quartile or less than the first quartile. ") B. Yes, there is at least one point that is outside of the 1.5(1QR) boundary. C. No. there are no points that are outside of the 1.5(10R) boundary. O D. No, there are no points that are greater than the third quartile or less than the first quartile. (c) Construct and interpret a 95% confidence interval for population mean cost of repair. Select the correct choice and fill in the answer boxes to complete your choice. (Round to one decimal place as needed.) O A. The lower bound is $ and the upper bound is $ $ . We are 95% confident that the mean cost of repair is within the confidence interval. O B. The lower bound is $ and the upper bound is $ . We are 95% confident that the mean cost of repair is outside of the confidence interval