Outliers and Data Analysis Concepts

Calculating the total sum of data points

Using appropriate measures of center and spread

Finding the mode of the data sets

Identifying the largest data point

It decreases the mean

It has no effect on the mean

It makes the mean equal to the median

It increases the mean

The mean becomes closer to the median

The mean remains unchanged

The mean becomes smaller

The mean becomes larger

Multiplying the mean by 1.5

Subtracting the median from the mean

Multiplying the IQR by 1.5 and adjusting quartiles

Adding the standard deviation to the mean

25

35

65

15

The median is always larger than the mean

The median is not affected by extreme values

The median is easier to calculate

The median is always smaller than the mean

Because the data is normally distributed

Because the mean is not affected by outliers

Because the standard deviation is zero

Because the data has an outlier that inflates the mean

The data is more compact

The data is normally distributed

The data is more spread out

The data has no outliers

Aluminum has a larger median and larger IQR

Aluminum has the same median and IQR as plastics

Aluminum has a larger median and smaller IQR

Aluminum has a smaller median and larger IQR

They are only used when there are no outliers

They are appropriate when outliers are present

They are only used for normally distributed data

They are less reliable than mean and standard deviation