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Use the following distribution to complete parts (a) through (d) below. \( 3,5,9,12,11 \) p a) Compute the mean and standard deviation of the distribution. The mean is 8 . The standard deviation is 3.87 . (Round to the nearest hundredth as needed.) b) Multiply each number in the distribution by 2 and compute the mean and the standard deviation of this new distribution. The mean is 16 . The standard deviation is 7.75 . (Round to the nearest hundredth as needed.) c) Multiply each number in the original distrhation by 4 and compute the mean and the standard deviation of this new distribution. The mean is \( \square \)

Ask by Schwartz Mullins. in the United States
Mar 16,2025

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For part (c), the mean is 32 and the standard deviation is approximately 15.48.

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To find the mean of the distribution when each number is multiplied by 4, simply multiply the original mean by 4. Since the original mean is 8, the mean of this new distribution is \( 8 \times 4 = 32 \). For the standard deviation, when each value in a distribution is multiplied by a constant (in this case, 4), the standard deviation is also multiplied by the same constant. So, you multiply the original standard deviation (3.87) by 4, which gives you \( 3.87 \times 4 = 15.48 \). Thus, the standard deviation of this new distribution is 15.48. So the mean is 32 and the standard deviation is 15.48.

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