Introduction to Algorithms, Third Edition

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Introduction-to-algorithms-3rd-edition

Figure 29.1
The effects of policies on voters. Each entry describes the number of thousands of
urban, suburban, or rural voters who could be won over by spending $1,000 on advertising support
of a policy on a particular issue. Negative entries denote votes that would be lost.
would win
20.
2/
C
0.8/
C
4.0/
C
9.10/
D
50
thousand urban votes,
20.5/
C
0.2/
C
4.0/
C
9.0/
D
100
thousand suburban votes, and
20.3/
C
0.
5/
C
4.10/
C
9.
2/
D
82
thousand rural votes. You would win the exact number of votes desired in the
urban and suburban areas and more than enough votes in the rural area. (In fact,
in the rural area, you would receive more votes than there are voters.) In order to
garner these votes, you would have paid for
20
C
0
C
4
C
9
D
33
thousand dollars
of advertising.
Naturally, you may wonder whether this strategy is the best possible. That is,
could you achieve your goals while spending less on advertising? Additional trial
and error might help you to answer this question, but wouldn’t you rather have a
systematic method for answering such questions? In order to develop one, we shall
formulate this question mathematically. We introduce
4
variables:
x
1
is the number of thousands of dollars spent on advertising on building roads,
x
2
is the number of thousands of dollars spent on advertising on gun control,
x
3
is the number of thousands of dollars spent on advertising on farm subsidies,
and
x
4
is the number of thousands of dollars spent on advertising on a gasoline tax.
We can write the requirement that we win at least 50,000 urban votes as
2x
1
C
8x
2
C
0x
3
C
10x
4
50 :
(29.1)
Similarly, we can write the requirements that we win at least 100,000 suburban
votes and 25,000 rural votes as
5x
1
C
2x
2
C
0x
3
C
0x
4
100
(29.2)
and
3x
1
5x
2
C
10x
3
2x
4
25 :
(29.3)
Any setting of the variables
x
1
; x
2
; x
3
; x
4
that satisﬁes inequalities (29.1)–(29.3)
yields a strategy that wins a sufﬁcient number of each type of vote. In order to

Chapter 29
Linear Programming
845
keep costs as small as possible, you would like to minimize the amount spent on
advertising. That is, you want to minimize the expression
x
1
C
x
2
C
x
3
C
x
4
:
(29.4)
Although negative advertising often occurs in political campaigns, there is no such
thing as negative-cost advertising. Consequently, we require that
x
1
0; x
2
0; x
3
0;
and
x
4
0 :
(29.5)
Combining inequalities (29.1)–(29.3) and (29.5) with the objective of minimiz-
ing (29.4), we obtain what is known as a “linear program.” We format this problem
as
minimize
x
1
C
x
2
C
x
3
C
x
4
(29.6)
subject to
2x
1
C
8x
2
C
0x
3
C
10x
4
50
(29.7)
5x
1
C
2x
2
C
0x
3
C
0x
4
100
(29.8)
3x
1
5x
2
C
10x
3
2x
4
25
(29.9)
x
1
; x
2
; x
3
; x
4
0 :
(29.10)
The solution of this linear program yields your optimal strategy.

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