Expected Value expected_value
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Transcript Expected Value expected_value
Chapter 1
Expected Value
12-5-1
© 2008 Pearson Addison-Wesley. All rights reserved
Expected Value
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Expected Value
Games and Gambling
Investments
Business and Insurance
12-5-2
© 2008 Pearson Addison-Wesley. All rights reserved
Expected Value
Children in third grade were surveyed and told to pick
the number of hours that they play electronic games
each day. The probability distribution is given below.
# of Hours x
Probability P(x)
0
.3
1
.4
2
.2
3
.1
12-5-3
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Expected Value
Compute a “weighted average” by multiplying
each possible time value by its probability and then
adding the products.
0(.3) 1(.4) 2(.2) 3(.1) 1.1
1.1 hours is the expected value (or the mathematical
expectation) of the quantity of time spent playing
electronic games.
12-5-4
© 2008 Pearson Addison-Wesley. All rights reserved
Expected Value
If a random variable x can have any of the
values x1, x2 , x3 ,…, xn, and the corresponding
probabilities of these values occurring are
P(x1), P(x2), P(x3), …, P(xn), then the
expected value of x is given by
E ( x) x1 P( x1 ) x2 P( x2 )
xn P( xn ).
12-5-5
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Example: Finding Expected Value
Find the expected number of boys for a three-child
family. Assume girls and boys are equally likely.
Solution
S = {ggg, ggb, gbg,
bgg, gbb, bgb, bbg,
bbb}
The probability
distribution is on
the right.
# Boys Probability
x
P(x)
0
1/8
1
3/8
2
3/8
3
1/8
Product
x P( x)
0
3/8
6/8
3/8
12-5-6
© 2008 Pearson Addison-Wesley. All rights reserved
Example: Finding Expected Value
Solution (continued)
The expected value is the sum of the third column:
3 6 3 12
0
8 8 8 8
3
1.5.
2
So the expected number of boys is 1.5.
12-5-7
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Example: Finding Expected Winnings
A player pays $3 to play the following game: He rolls
a die and receives $7 if he tosses a 6 and $1 for
anything else. Find the player’s expected net winnings
for the game.
12-5-8
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Example: Finding Expected Winnings
Solution
The information for the game is displayed below.
Die Outcome Payoff Net P(x) x P ( x )
1, 2, 3, 4, or 5
$1
–$2 5/6
6
$7
$4
–$10/6
1/6
$4/6
Expected value: E(x) = –$6/6 = –$1.00
12-5-9
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Games and Gambling
A game in which the expected net winnings
are zero is called a fair game. A game with
negative expected winnings is unfair against
the player. A game with positive expected net
winnings is unfair in favor of the player.
12-5-10
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Example: Finding the Cost for a Fair
Game
What should the game in the previous example
cost so that it is a fair game?
Solution
Because the cost of $3 resulted in a net loss of $1,
we can conclude that the $3 cost was $1 too high. A
fair cost to play the game would be $3 – $1 = $2.
12-5-11
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Investments
Expected value can be a useful tool for
evaluating investment opportunities.
12-5-12
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Example: Expected Investment Profits
Mark is going to invest in the stock of one of the two
companies below. Based on his research, a $6000
investment could give the following returns.
Company ABC
Company PDQ
Profit or Probability Profit or Probability
Loss x
P(x)
Loss x
P(x)
–$400
.2
$600
.8
$800
.5
1000
.2
$1300
.3
12-5-13
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Example: Expected Investment Profits
Find the expected profit (or loss) for each of the
two stocks.
Solution
ABC: –$400(.2) + $800(.5) + $1300(.3) = $710
PDQ: $600(.8) + $1000(.2) = $680
12-5-14
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Business and Insurance
Expected value can be used to help make
decisions in various areas of business,
including insurance.
12-5-15
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Example: Expected Lumber Revenue
A lumber wholesaler is planning on purchasing a
load of lumber. He calculates that the probabilities
of reselling the load for $9500, $9000, or $8500 are
.25, .60, and .15, respectfully. In order to ensure an
expected profit of at least $2500, how much can he
afford to pay for the load?
12-5-16
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Example: Expected Lumber Revenue
Solution
The expected revenue from sales can be found below.
Income x
P(x)
x P( x)
$9500
.25
$2375
$9000
.60
$5400
$8500
.15
$1275
Expected revenue: E(x) = $9050
12-5-17
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Example: Expected Lumber Revenue
Solution (continued)
profit = revenue – cost or cost = profit – revenue
To have an expected profit of $2500, he can pay up to
$9050 – $2500 = $6550.
12-5-18
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