They always have the same probability.

They can occur at the same time.

They cannot occur at the same time.

They are always mutually inclusive.

Having blue eyes or brown hair

Having green eyes or blue eyes

Owning a car or a bicycle

Being a teacher or a student

Ignoring the probability of individual events

Subtracting probabilities instead of adding

Multiplying probabilities of all events

Adding probabilities without considering intersection

The total probability of both events

The probability of either event occurring

The probability of both events occurring simultaneously

The probability of neither event occurring

Divide the probability of one event by the other

Subtract the probability of the intersection from the sum of individual probabilities

Multiply the probabilities of both events

Add the probabilities of both events

7 tenths

5 tenths

10 tenths

3 tenths

3 tenths

5 tenths

10 tenths

7 tenths

0.39

0.57

0.46

0.28

0.39

0.28

0.46

0.57

Subtraction rule

Division rule

Addition rule

Multiplication rule