Understanding Central Tendencies and Expected Value

3.0

4.2

4.0

3.6

By adding the numbers and dividing by their count

By finding the median of the numbers

By calculating the mode of the numbers

By multiplying each number by its frequency and adding the results

A variable that can take different values based on an experiment

A fixed number in a dataset

The sum of all numbers in a dataset

The average of a dataset

The most frequent value in a dataset

The sum of all possible values

The average of all possible values weighted by their probabilities

The difference between the highest and lowest values

Expected value is the same as the sample mean

Expected value is the same as the population mean for infinite populations

Expected value is always higher than the population mean

They are completely different concepts

5

4

3

2

Because the population is infinite

Because the numbers are too large

Because the numbers are not integers

Because the numbers are not distinct

The sum of all possible outcomes

The frequency of each possible outcome

The median of the outcomes

The exact values it can take

By finding the mode of the distribution

By adding all outcomes together

By multiplying each outcome by its probability and summing the results

By finding the median of the distribution

It is the most probable outcome

It is the sum of all outcomes

It is the average outcome over many trials

It is the least probable outcome