Chapter 7: Probability Lesson 3: Multiplication Counting Principles.

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Presentation transcript:

Chapter 7: Probability Lesson 3: Multiplication Counting Principles

Vocabulary: with replacement: items are replaced between events. ex: A bag of marbles contains 3 black, 4 blue, and 5 red. What is the probability of picking a blue and then another blue one if the first is replaced. without replacement: items are not replaced between events. ex: A bag of marbles contains 3 black, 4 blue, and 5 red. What is the probability of picking a blue and then another blue one if the first is not replaced.

Example 1: Pete Seria decided to offer a special on his famous pizza pies. He limited his special to cheese pizzas with or without pepperoni and with a choice of thin, thick, or stuffed crust. Pete wondered how many different versions of pizzas were possible? Illustrate this situation with a tree diagram.

Example 1, cont. What if Pete also decided to offer his pies in four different sizes: individual, small medium, and large. How many different possible choices were now available? PIZZA WITH PEPPERONI THIN THICK STUFFED W/O PEPPERONI THINTHICK STUFFED

Example 2: Suppose you have a 6 question T / F test. How many arrangements of answers are possible? ____ ____ ____ ____ ____ ____

Theorem - Selections With Replacement: Let S be a set with (n) elements. Then there are n k possible arrangements of (k) elements from S with replacement. Example 3: Using Example 2, what is the probability of getting a perfect score by guessing?

Example 4: How many ways can you answer a matching test with 6 questions (assuming that each is used only once)? _____ ______ ____ ____ ____ ____

Factorial: for integer n>0, n factorial __________________________ Theorem - Selections Without Replacement: Let S be a set with (n) elements. Then there are ________ possible arrangements of the (n) elements _______________ replacement. n! without

Example 5: Evaluate: a) 8! = b) 64! = c) =

Example 6: License plates in NJ have 3 letters (excluding I and O) and 3 numbers. How many combinations are there?

Closure Example 7: All Mixed Up: There are 8 movie DVDs, 3 exercise DVDs, and 5 cartoon DVDs on the shelf. Suppose two DVDs are to be selected at random from the shelf. Find each probability. a. P(selecting 2 movie DVDs) if no replacement occurs = b. P(selecting 2 movie DVDs) if replacement occurs = c. P(selecting an exercise DVD, then a cartoon DVD) if no replacement occurs =