Asked by
tyasia billie
on Nov 30, 2024
Verified
In a mound-shaped distribution, there is no difference in the values of the mean, and median.
Mound-Shaped
Description of a symmetric, bell-shaped distribution, often associated with the normal distribution.
Mean
A statistical measure that calculates the average value of a set of numbers by dividing the sum of all values by the number of values.
Median
The middle value in a dataset when it is ordered from smallest to largest, or the mean of the two middle numbers if there is an even number of values.
- Recognize the imperative nature of determining variability (standard deviation, variance) and central figures (mean, median, mode) in the representation of data.
- Assess how the configuration of data distribution, specifically mound-shaped distributions, influences statistical metrics.
Verified Answer
SL
Learning Objectives
- Recognize the imperative nature of determining variability (standard deviation, variance) and central figures (mean, median, mode) in the representation of data.
- Assess how the configuration of data distribution, specifically mound-shaped distributions, influences statistical metrics.