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Human blood is divided into 8 possible blood types. The rarest blood type is AB negative. Only 1% of the population has this blood type. Suppose a random sample of 71 people is selected. Can we find the probability that more than 8% of the sample have AB negative blood? If so, find the probability. If not, explain why this probability cannot be calculated. Select the correct choice below and fill in the answer box with in your choice if necessary. A. This probability cannot be calculated because the sample is too small to satisfy the conditions of the Central Limit Theorem. B. This probability can be calculated, the sample meets enough of the conditions of the Central Limit Theorem. The probability is %. (Type an integer or decimal rounded to one decimal place as needed.) C. This probability cannot be calculated because the sample does not satisfy the Central Limit Theorems conditions for randomness and independence. D. This probability cannot be calculated because the population size is too small to satisfy the conditions of the Central Limit Theorem. E. This probability can be calculated, the sample meets all of the conditions of the Central Limit Theorem. The probability is || %. (Type an integer or decimal rounded to one decimal place as needed.)