2. is the mean greater than, less than, or equal to the median? greater than less than equal to

2. is the mean greater than, less than, or equal to the median? greater than less than equal to
Answer
Explanation:
Step1: Count data - points
Count the number of dots in the dot - plot. There are 10 values at each of the 9 positions, so there are (n = 9\times10=90) data - points.
Step2: Find the median position
For a set of (n = 90) data - points (an even number of data - points), the median is the average of the (\frac{n}{2}=45)th and ((\frac{n}{2}+1) = 46)th ordered data - points. When we order the data, the 45th and 46th values fall in the 25 value category. So the median is 25.
Step3: Calculate the mean
Let (x_i) be the values on the x - axis ((x_1 = 10,x_2 = 15,\cdots,x_9 = 50)) and (f_i = 10) for (i = 1,\cdots,9). The mean (\bar{x}=\frac{\sum_{i = 1}^{9}f_ix_i}{\sum_{i = 1}^{9}f_i}). (\sum_{i = 1}^{9}f_ix_i=10\times(10 + 15+20 + 25+30+35+40+45+50)=10\times(10 + 50)\times\frac{9}{2}=10\times270 = 2700), and (\sum_{i = 1}^{9}f_i=90). So (\bar{x}=\frac{2700}{90}=30).
Step4: Compare mean and median
Since (30>25), the mean is greater than the median.
Answer:
greater than