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SBM Chapter 7 Probability: Living with the Odds.

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nPr = n ! (n - r)! 52 ! (52 - 3)! 132,600 possible results. Example Five... nPr. r ! nCr. Please Look at Examples 5-7 on pages 453-54. Example Six... – PowerPoint PPT presentation

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Title: SBM Chapter 7 Probability: Living with the Odds.


1
SBM Chapter 7 Probability Living with the
Odds.
  • 7E Counting and Probability
  • A Brief Review Factorials

2
First of All.
  • You must understand Factorials and Permutations
    Combinations.
  • Please read very carefully (page 450) on
    factorial review.
  • Then, read very carefully on what permutations
    are(on page 448)
  • Then, read very carefully on what combinations
    are(on page 451)

Please Look at Example 1 on page 447-48
3
Factorials...
  • Whenever a positive integer n is multiplied by
    all the preceding positive integers, the result
    is called n factorial and is denoted by the
    symbol n!
  • This is read as n factorial
  • 1! 1
  • 2! 2 X 1 2
  • 3! 3 X 2 X 1 6
  • 4! 4 X 3 X 2 X 1 24
  • etc

4
Example One...
  • Calculate the following?

5 X 4
5!
5 X 4 X 3 X 2 X 1



3!
3 X 2 X 1
1
20
5
Example Two...
  • A brand of ballpoint pen comes in five colors,
    with fine or regular point, and with standard,
    deluxe, or executive styling. How many different
    versions does the pen come in?

5 X 2 X 3 30 versions
6
Example Three...
  • A seven-character computer password can be any
    three letters of the alphabet, followed by two
    numerical digits, followed by two more letters.
    How many different passwords are possible?

26 X 26 X 26 X 10 X 10 X 26 X 26
1,188,137,600
7
Permutations...
  • Mathematically, we are dealing with permutations
    whenever all selections come from a single group
    of items.
  • no item may be selected more than once.
  • the order of arrangement matters.
  • The total number of permutations possible with a
    group of n items is n!
  • where n! n X (n X 1) X X 2 X 1

8
The Permutations Formula...
  • If we make r selections from a group of n items,
    the number of permutations is
  • where is read as the number of
    permutations of n items taken r at at time.

n !
nPr
(n - r)!
nPr
Please Look at Examples 2-4 on pages 449-51
9
Example Four...
  • From a normal deck of 52 playing cards, three
    cards are drawn and placed face up on a table,
    left to right. How many possible results are
    there of this procedure?

n !
52 !
nPr

(n - r)!
(52 - 3)!

132,600 possible results
10
Example Five...
  • Ten finalists in a talent show must give final
    performances. Five contestants will perform on
    the first night of the show. How many different
    ways can the schedule for the first night be made?

n !
10 !
nPr

(n - r)!
(10 - 5)!

30,240 different ways
11
Combinations...
  • Mathematically, we are dealing with combinations
    whenever all selections come from a single group
    of items.
  • no item may be selected more than once
  • the order of arrangement does not matter
  • For example, ABCD is considered the same as DCBA.

12
The Combinations Formula...
  • If we make r selections from a group of n items,
    the number of possible combinations is
  • where is read the number of
    combinations of n items taken r at a time.

nPr
n !
nCr

(n - r)! X r !
r !
nCr
Please Look at Examples 5-7 on pages 453-54
13
Example Six...
  • How many different ways are there to order a
    medium two-topping pizza, given that there are
    nine toppings to choose from?

nCr
n !
(n - r)! X r !
9 !
9 !



36 Orders
(9 - 2)! X 2 !
7 ! X 2 !
14
Example Seven...
  • A scholar is choosing six books to take on
    vacation, from a stack of 34. How many different
    combinations of books are there?

nCr
n !
(n - r)! X r !
34 !
34 !



(34 - 6)! X 6 !
28 ! X 6 !
1,344,904 Combinations
15
Probability Coincidence...
  • Coincidences are bound to happen.
  • Although a particular outcome may be highly
    unlikely, some similar outcomes may be extremely
    likely or even certain to occur.
  • In general, this means that coincidences will
    inevitably be experienced by someone, even if
    these coincidences have a low probability for any
    particular reason.

Please Look at Examples 8-9 on page 455
16
Homework
  • 7E Part I
  • s 1, 3 - 14
  • Part II
  • s 15 - 20a, 22a, 22c,
  • 23 - 29, 31, 33
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