Mean, median, and mode

Mean, standard deviation, and shape

Variance, skewness, and kurtosis

Range, interquartile range, and outliers

Calculating the mean of sample proportions

Identifying the shape of a distribution

Finding the probability of a sample proportion being greater

Determining the standard deviation of a sample

As the product of sample proportions

As the sum of sample proportions

As the difference of sample proportions being negative

As the ratio of sample proportions

To measure the skewness of the distribution

To calculate the mean of the distribution

To determine the probability of a sample proportion

To find how many standard deviations a value is from the mean

-0.8

0.8

0.02

-0.02

As the standard deviation of the distribution

As the area under the normal curve up to that Z value

As the probability of a value being above the mean

As the mean of the distribution

0.02

0.5

0.8

0.21

The event is unlikely to happen

The event is very likely to happen

The event has a roughly one in five chance of occurring

The event is certain to happen

To calculate the standard deviation

To find the mean of the sample

To determine the exact probability of a Z-score

To identify the mode of the distribution

The value is above the mean

The value is below the mean

The value is equal to the mean

The value is the mean