In a distribution where the mean is to the right of the median, the histogram of the distribution will probably:
a. have a longer tail on the right side
b. show a uniform distribution
c. be symmetric
d. be bi-modal
actually idk
To determine the answer to this question, we need to understand the relationship between the mean and median in a distribution, as well as how it is represented in a histogram.
The mean is a measure of the average value in a distribution, while the median represents the middle value. In a distribution where the mean is to the right of the median, it suggests that there are some higher values pulling the average towards the right side.
Now, let's consider how this situation would be reflected in a histogram. A histogram is a graphical representation of the distribution of data points. It consists of bars that represent the frequencies or counts of data falling within certain intervals or bins.
Given that the mean is to the right of the median, it indicates that there are more high values on the right side of the distribution. This means that there is a longer tail on the right side of the histogram because the higher values extend further toward the right.
Therefore, the answer to the question "In a distribution where the mean is to the right of the median, the histogram of the distribution will probably have:" would be:
a. have a longer tail on the right side