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rubymoose712Lv1
9 Sep 2020
8 of 15 (0 complete) This Question: 1 pt Determine whether the statement makes sense (or is clearly true) or does not make sense for is clearly false). Explain clearly A process consists of repeating this operation Randomly select two values from a normally distributed population and then find the mean of the two values. The sample means will be normal distributed, even though each sample has only two Vanes. Choose the correct answer below O A. The statement does not make sense. Since only two values are being sampled, the distribution of sample means will take on a triangle shape which is certainly not normal OB. The statement makes sense. The Central Limit Theorem guarantees that the distribution of sample means is approximately normal for suitably smal samples O C. The statement does not make sense. The Central Limit Theorem only guarantees that the distribution of sample means is acproximately normal for suitably large sample sizes O D. The statement makes sense. Since the population is normally distributed, the distribution of sample means will also be normal distributed. regardless of sample size 1:43 PM 1/4/2020 Click to select your answer. Type here to search w/ ERTL
8 of 15 (0 complete) This Question: 1 pt Determine whether the statement makes sense (or is clearly true) or does not make sense for is clearly false). Explain clearly A process consists of repeating this operation Randomly select two values from a normally distributed population and then find the mean of the two values. The sample means will be normal distributed, even though each sample has only two Vanes. Choose the correct answer below O A. The statement does not make sense. Since only two values are being sampled, the distribution of sample means will take on a triangle shape which is certainly not normal OB. The statement makes sense. The Central Limit Theorem guarantees that the distribution of sample means is approximately normal for suitably smal samples O C. The statement does not make sense. The Central Limit Theorem only guarantees that the distribution of sample means is acproximately normal for suitably large sample sizes O D. The statement makes sense. Since the population is normally distributed, the distribution of sample means will also be normal distributed. regardless of sample size 1:43 PM 1/4/2020 Click to select your answer. Type here to search w/ ERTL
14 Oct 2023
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