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Counting

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Title: Counting


1
Chapter 4
  • Lecture 4
  • Section 4.7

2
Counting
  • Fundamental Rule of Counting
  • If an event occurs m ways and if a different
    event occurs n ways, then the events together
    occur a total of mn ways.
  • Example 1
  • You have 3 shirts, 5 neck ties and 6 pair of
    pants. How many different combinations of
    shirts, neck ties and pants can be made?
  • 35690

1. An ATM code consists of only 4 digits. How
many different codes are possible?
3
2. At CSU-Long Beach, the password to log into
www.my.csulb.edu consists of 2 letters and then 4
digits. For example, ab1234 is a password. How
many different passwords are possible.
Let us recall our example of rolling 2 dice. How
many possible outcomes are possible. We know
that one die has six sides and since we have two
of them, then by the fundamental rule of counting
we get 6636. Also recall a husband and wife
that want to have 3 children. Since at each
birth there are two possible outcomes (boy,
girl), then the number of different combinations
of births is 2228 3. How many different
combinations of heads and tails can be made if
you flip a coin 4 times?
4
4. What if we had a 5 digit home security code
that had an additional property that digits could
not repeat. How many different codes are
possible? In this case we would have to use
the Factorial Rule. n! Where n is the number
of items that can be arranged.
5. A UPS man has 7 locations to make deliveries.
How many different routes are possible to make
all of his deliveries?
5
  • Example In a state lottery, a player wins or
    shares in the jackpot
  • by selecting the correct 6-number combination
    when 6 different
  • numbers from 1 through 42 are drawn. If a player
    selects one
  • particular 6-number combination, how many
    arrangements of 6
  • numbers out of 42 total numbers are possible.
  • To start, say we have a combination of 123456.
    This combination is the same as 654321 when
    playing this lottery. In this case we will use
    the method called the Combination Rule.

We must have a total of n different items
available. (42) We must select r of the n items
(6 of 42). We must consider rearrangements of
the same items to be the same. As stated above
with 123456 654321 and so on.
This case tells us that the order of the outcome
does not matter.
6
Combination Rule Formula. ( Order is not taken
into consideration)
So the answer to our question n42 and r6.
6. What is the probability of winning the lottery
if to win you pick 6 numbers out of 42.
7
What if the order of the numbers does matter?
Better said, what if the order of the numbers is
taken into consideration? We saw in the previous
example that the six numbers 123456 was the same
as 654321. However, if we take into
consideration the order of the numbers, then
123456 is not the same as 654321 because the way
the numbers are ordered are totally
different. Permutation Rule (Order is taken into
consideration)
So if we take into consideration the order that
the numbers are drawn, then
8
7. In a horse race involving 10 horses, how many
ways can first, second, and third place be
decided?
8. A manager must select 4 employees for
promotion. 12 employees are eligible for
promotion. In how many ways can 4 employees be
chosen to be placed in 4 different jobs?
9
9. A certain department consists of 10 males and
8 females. How many different ways can this
department form a committee of members consisting
of a. 5 people. b. 3 male and 2 female.

10
9. The classic example of the permutation rule is
in how many different ways can the word
Mississippi be arranged? This Permutation is a
little different. We will need to find the
number of permutations when some of the items are
identical to others. So in the word Mississippi,
M1, i4, s4, p2. Thus we will use the
following formula.
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