1. Plimsouls "A Million Miles Away“ The Rolling Stones-Ruby Tuesday
Plimsouls "A Million Miles Away“
The Rolling Stones-Ruby Tuesday
Addams Family - Wednesday

5. 5 + 8 ÷ 2 *

8. Probability
53 Fundamental counting principle 52 Factorials 51 Permutations 50 WP: Permutations 49 Combinations 48 WP: Combinations

10. 53a Fundamental counting principle
Fundamental Counting Principal =
Fancy way of describing how one would determine the number of ways a sequence of events can take place.

11. 53b Fundamental counting principle
You are at your school cafeteria that allows you to choose a lunch meal from a set menu. You have two choices for the Main course (a hamburger or a pizza), Two choices of a drink (orange juice, apple juice) and Three choices of dessert (pie, ice cream, jello).
How many different meal combos can you select?_________
12 meals
Method one: Tree diagram
Lunch
Hamburger Pizza
Apple Orange
Apple Orange
Pie Icecream Jello
Pie Icecream Jello
Pie Icecream Jello
Pie Icecream Jello

12. 53c Fundamental counting principle
Method two:
Multiply number of choices
2 x 2 x 3 =
12 meals
Ex 2: No repetition
During the Olympic 400m sprint, there are 6 runners. How many possible ways are there to award first, second, and third places?
1st
2nd
3rd
3 places ____ x ____ x ____ = 6 5 4
120 different ways

13. 53d Fundamental counting principle
Ex 3: With repetition
License Plates for cars are labeled with 3 letters followed by 3 digits. (In this case, digits refer to digits
How many possible plates are there? You can use the same number more than once.
___ x ___ x ___ x ___ x ___ x ___ = 26 26 26 10 10 10
17,576,000 plates
Ex 4: Account numbers for Century Oil Company consist of five digits. If the first digit cannot be a 0 or 1, how many account numbers are possible?
___ x ___ x ___ x ___ x ___ = 8 10 10 10 10
80,000 different account #’s

14. 53e Fundamental counting principle
We are going to collect data from cars in the student parking lot.
License place Vehicle color

15. Factorials

16. Factorials
You think math is hard? What about English?
The bandage was wound around the wound.
The farm was used to produce produce.
The dump was so full that it had to refuse more refuse.

17. 52a Factorials
5 • 4 • 3 • 2 • 1 = 5!
Factorial
7!= 7 • 6 • 5 • 4 • 3 • 2 •1
= 5040 42 56

18. 51a Permutations Permutations = A listing in which order IS important.
P(6,4) or 6P4
Can be written as:
P(6,4) Represents the number of ways 6 items can be taken 4 at a time…..
Or 6 x 5 x 4 x 3 =
360
Or 6 (6-1) (6-2) (6-3)
Find P(15,3) = _____
2730
15 x 14 x 13

19. 51b Permutations - Activity
Write the letters M A T H on the top of your paper.
Compose a numbered list of different 4 letter Permutations (not necessarily words)
On the bottom of your paper write how many different permutations you have come up with.
Don’t forget your Name, Date and Period before turning in.
Hint: You may wish to devise a strategy or pattern for finding all of the permutations before you start.

20. 50a WP: Permutations
Use the same formula from section 52 to solve these WPs.
Ex1. Ten people are entered in a race. If there are no ties, in how many ways can the first three places come out?
___ x ___ x ___ = 10 9 8
720
Ex2. How many different arrangements can be made with the letters in the word LUNCH?
5! or
___ x ___ x ___ x ___ x ___ = 5 4 3 2 1
120
Ex3. You and 8 friends go to a concert. How many different ways can you sit in the assigned seats?
9! =
362,880

21. 50b WP: Permutations - Activity
On a separate sheet of paper, use only the letters below to form as many words as possible. Don’t forget Name, Date and Period.
Mathematics Permutations

22. Puzzle
How long will a so-called Eight Day Clock run without winding?

23. An ice cream parlor has five flavors of ice cream available
An ice cream parlor has five flavors of ice cream available. How many different two-scoop cones can be served?

24. 49a Combinations Combinations =
A listing in which order is NOT important.
C(3,2) or 3C2
Can be written as:
C(3,2) means the number of ways 3 items can be taken 2 at a time. (order does not matter)
                          
Ex. C(3,2) using the letters C A T
CA   CT   AT
n = total r = What you want

25. 49b Combinations 42 7 x 6 2 2 x 1 n = total r = What you want = 21
Which is not an expression for the number of ways 3 items can be selected from 5 items when order is not considered?

26. WP: Combinations
If you were to take two apples from three apples, how many would you have?

27. 48a WP: Combinations Permutations = Order IS important
P(8,3) = ___ x ___ x ___ =
336
Combinations =
Order does not matter
C(8,3) = 56

28. 48b WP: Combinations
Ex1. A college has seven instructors qualified to teach a special computer lab course which requires two instructors to be present. How many different pairs of teachers could there be?
C(7,2) = 21
Ex2. A panel of judges is to consist of six women and three men. A list of potential judges includes seven women and six men. How many different panels could be created from this list?
Women
Men
C(7,6)
C(6,3) = 20 7
7*20 = 140
 140 choices

29. WP: Perms and Combs Ex1. The school board has seven members
The board must have three officers: a chairperson, an assistant chairperson, and a secretary. a. How many different sets of these officers can be formed from this board?
b. How many three-person committees can be formed from this board?
Is part (a) asking for a number of permutaions or a number of combinations? What about part (b)?
How are your answers to parts (a) and (b) related?

30. WP: Perms and Combs
Ex2. Ralph has room for three plants on a windowsill.
a. In how many different ways can three plants be arranged on his windowsill?
b. Was (a) a permutation or a combination?
c. Suppose Ralph has six plants. How many groups of three plants can be put on his windowsill?
d. Was (c) a permutation or a combination?
e. Suppose Ralph has nine plants. How many ways can three of these plants be arranged on his windowsill?
f. Was (e) a permutation or a combination?

31. WP: Perms and Combs
Ex3.
To open your locker, you must dial a sequence of three numbers called the lock’s combination. Given that there are 40 numbers on a lock, how many different locker combinations are there?