A police department released the numbers of calls for the different days of the week during the month of October, as shown in the table to the right. Use a 0.01 significance level to test the claim that the different days of the week have the same frequencies of police calls. What is the fundamental error with this analysis? Day Frequency Sun Mon Tues Wed Thurs Fri Sat 156 210 220 248 174 214 232 Determine the null and alternative hypotheses. Họ: Calculate the test statistic, . x2= (Round to three decimal places as needed.) Calculate the Pvalue. P-value =D(Round to four decimal places as needed.) What is the conclusion for this hypothesis test? O A. Fal to reject Hg. There is sufficient evidence to warrant rejection of the claim that the different days of the week have the same frequencies of police calls. O B. Reject Hg. There is insufficient evidence to warrant rejection of the claim that the different days of the week have the same frequencies of police calls. OC. Fail to reject Ha. There is insufficient evidence to warrant rejection of the claim that the different days of the week have the same frequencies of police calls. OD. Reject H. There is sufficient evidence to warrant rejection of the claim that the different days of the week have the same frequencies of police calls. What is the fundamental error with this analysis? O A. Because October has 31 days, two of the days of the week occur more often than the other days of the week. OB. Because October has 31 days, each day of the week occurs the same number of times as the other days of the week. OC. Because October has 31 days, three of the days of the week occur more often than the other days of the week. OD. Because October has 31 days, one of the days of the week occur more often than the other days of the week.

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A police department released the numbers of calls for the different days of the week during the month of October, as shown in the table to the right. Use a 0.01 significance level to test the claim that the different days of the week have the same frequencies of police calls. What is the fundamental error with this analysis? Day Sun Mon Tues Wed Thurs Fri Sat Frequency 156 210 220 248 174 214 232 Determine the null and alternative hypotheses. Ho: H1: Calculate the test statistic, x. x2 = (Round to three decimal places as needed.) Calculate the P-value. P-value = (Round to four decimal places as needed.) What is the conclusion for this hypothesis test? O A. Fail to reject H,. There is sufficient evidence to warrant rejection of the claim that the different days of the week have the same frequencies of police calls. O B. Reject H,- There is insufficient evidence to warrant rejection of the claim that the different days of the week have the same frequencies of police calls. O C. Fail to reject H,. There is insufficient evidence to warrant rejection of the claim that the different days of the week have the same frequencies of police calls. O D. Reject H,- There is sufficient evidence to warrant rejection of the claim that the different days of the week have the same frequencies of police calls. What is the fundamental error with this analysis? O A. Because October has 31 days, two of the days of the week occur more often than the other days of the week. O B. Because October has 31 days, each day of the week occurs the same number of times as the other days of the week. O C. Because October has 31 days, three of the days of the week occur more often than the other days of the week. O D. Because October has 31 days, one of the days of the week occur more often than the other days of the week.