1. 12.1 The Fundamental Counting Principle and Permutations
Algebra 2

2. The Total Number of Possibilities
Using tree diagrams…
Ham, Turkey, or Roast Beef on either white or wheat
Using the counting principle…

3. Fundamental Counting Principle
Two events. If one event can occur m ways and another event can occur in n ways, then the number of ways both events occur is m*n.
Three or more events. The fundamental counting principle can be extended to 3 or more events. For m, n, and p, then events can occur m*n*p.

4. Example:
At a restaurant, you have a choice of 8 different entrées, 2 different salads, 12 different drinks, and 6 different desserts. How many different dinners consisting of 1 salad, 1 entrée, 1 drink and 1 dessert can you choose.

5. Example:
In a high school, there are 273 freshman, 291 sophomores, 252 juniors, and 237 seniors. In how many different ways can a committee of 1 freshman, 1 sophomore, 1 junior, and 1 senior be chosen.

6. Example:
How many different 7 digit phone numbers are possible if the first digit cannot be 0 or 1.

7. Example:
A multiple choice test has 10 question with 4 answer choices for each question. In how many different ways could you complete the test?

8. Permutations
Permutations: the arrangement of objects in a particular order “order matters”
The fundamental counting principle is used to determine the number of permutations (the number of arrangements of n objects)

9. Example:
You have homework assignments from 5 different classes to complete this weekend.
In how many different ways can you complete the assignments.
In how many different ways can you choose 2 of the assignment to complete first and last?

10. Example:
There are 8 movies you would like to see currently showing in theaters.
In how many different ways can you see all 8 of the movies?
In how many ways can you choose a movie to see this Saturday and one to see this Sunday?

11. Permutations of n Objects Taken r at a Time
The number of permutations of r objects taken from a group of n distinct objects is denoted by nPr and is given by:

12. Example:
There are 12 books on the summer reading list. You want to read some or all of them. In how many orders can you read (a) 4 of the books or (b) all 12 of the books.

13. Example:
There are 9 players on a baseball team. (a) In how many ways can you choose the bating order for all 9 of the players? (b) In how many ways can you choose a pitcher, catcher, and shortstop from the 9 players.

14. Permutations with Reptition
The number of distinguishable permutations of n objects where one object is repeated q1 times, another is repeated q2 times, and so on is:

15. Example:
Find the number of distinguishable permutations of the letters in (a) SUMMER and (b) WATERFALL

16. Example:
You dog has 8 puppies, 3 male and 5 female. One possible birth order is MMMFFFFF. How many different birth orders are possible?