http://www.ck12.org Chapter 1. Independent and Dependent Events
P(AorB) =P(A)+P(B)
P(A∪B) =P(A)+P(B)P(A∪B) =15
36
+
3
36
P(A∪B) =
18
36
P(A∪B) =
1
2
P(AandB) = 0Example C
A card is chosen at random from a standard deck of cards. What is the probability that the card chosen is a diamond
or club? Are these events mutually exclusive?
A standard deck of cards contains 52 cards, with 13 hearts, 13 diamonds, 13 spades, and 13 clubs. Since a card
cannot be a diamond and a club at the same time, choosing a diamond and choosing a club are mutually exclusive
events. Suppose that eventAis choosing a diamond and eventBis choosing a club. The probability that the card
chosen is a diamond or club can then be calculated as follows:
P(A) =
13
52
P(B) =
13
52
P(AorB) =P(A)+P(B)
P(A∪B) =P(A)+P(B)P(A∪B) =13
52
+
13
52
P(A∪B) =
26
52
P(A∪B) =
1
2
P(AandB) = 0Points to Consider
- Can mutually exclusive events be independent? Can they be dependent?
Guided Practice
3 coins are tossed simultaneously. What is the probability of getting 1 or 2 heads? Are these events mutually
exclusive?
Solution:
When tossing 3 coins simultaneously, there are 2^3 =8 possible outcomes. These outcomes are as follows, whereH
represents heads andTrepresents tails: