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\( 3 d) \) Which mean is reasonable for the data set? \( \qquad 15,25,60,30,45\} \)

Ask by Wang Pearson. in the United States
Feb 27,2025

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Answer

The mean of the data set \(15, 25, 60, 30, 45\) is 35.

Solution

To determine a reasonable mean for the given data set, we need to calculate the mean of the numbers provided. The data set is: \(15, 25, 60, 30, 45\) To calculate the mean, we add up all the numbers and then divide by the total number of values. Mean = (Sum of all numbers) / (Total number of values) Let's calculate the mean for the given data set: Calculate the value by following steps: - step0: Calculate: \(\frac{\left(15+25+60+30+45\right)}{5}\) - step1: Remove the parentheses: \(\frac{15+25+60+30+45}{5}\) - step2: Add the numbers: \(\frac{175}{5}\) - step3: Reduce the numbers: \(\frac{35}{1}\) - step4: Calculate: \(35\) The mean of the data set \(15, 25, 60, 30, 45\) is 35.

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The Deep Dive

To determine which mean is reasonable for the data set \( \{ 15, 25, 60, 30, 45 \} \), we first calculate the mean. By summing up the numbers, we get \( 15 + 25 + 60 + 30 + 45 = 175 \). Dividing this by the number of values (5), the mean is \( 35 \). Since the data set has a significantly higher outlier (60), the median, which is 30, might be a more representative measure of central tendency in this case. Another useful concept is the "trimmed mean," which involves removing a certain percentage of the highest and lowest values and then calculating the mean of the remaining data. For this data set, you might trim the lowest (15, 25) and the highest (60) values and find the mean of the middle values (30, 45), which gives a trimmed mean of 37.5—offering a potentially more accurate representation than the traditional mean.

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