3.2 Conditional Probability and the Multiplication Rule

1. 3.2 Conditional Probability and the Multiplication Rule • What are we going to learn about? • Conditional Probability • Dependent vs Independent Events • The Multiplication Rule

2. 3.2 Conditional Probability and the Multiplication Rule • Example 1: Suppose a professor has 40 students in her Anatomy and Physiology class. She collected information about each student’s class level and political party affiliation. The results are shown in the table. A student is picked at random. • What is the probability he/she is a republican? • Suppose we knew the selected student was a senior. Would that change the probability we found earlier?

3. 3.2 Conditional Probability and the Multiplication Rule • Example 2: The table below shows the number of patients admitted for surgery to Palos Community Hospital and General Hospital along with their survival status for the month of July. Suppose a researcher randomly pulls the file on one of the 575 patients. • What is the probability that the patient survived their surgery? • Does knowing which hospital the patient was admitted to change that probability?

4. 3.2 Conditional Probability and the Multiplication Rule • Example 3: Suppose we draw two cards from a deck of 52. • What is the probability that our second card is an ace given that the first card was an ace and it was not replaced? • In all three examples, we needed to decide how the extra (or given) information affected the probability of an event. • Definition of Conditional Probability P( B | A ) represents the probability of event B occurring given that event A has already occurred. #7 p. 152 (Nursing Majors)

5. 3.2 Conditional Probability and the Multiplication Rule • Suppose we draw two cards from a deck of 52. • Find the probability that the second card is a Jack given that the first card was a Jack and it was not replaced. P( J2 | J1 ) = 3/51 ≈ 0.059 • Find the probability that the second card is a Jack given that the first card was a Jack and it was replaced. P( J2 | J1 ) = 4/52 = 1/13 ≈ 0.077 • If the occurrence of one event influences the chances of another event occurring, we say the two events are dependent. Otherwise, the two events are independent. If events A and B are independent, then we have P( B | A ) = P( B )

6. 3.2 Conditional Probability and the Multiplication Rule • We can use the Multiplication Rule to calculate the probability of consecutive events. P( A and B ) = P(A) ∙ P( B | A ) • If events A and B are independent, then P( A and B ) = P(A) ∙ P(B) Practice using these ideas: #24 p. 154 #28 p. 155 #32 p. 155