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Decision Analysis Part 3

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If a small change in one of the inputs causes a change in the recommended ... The difference between these EVs is the Expected Value of Sample Information: ... – PowerPoint PPT presentation

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Title: Decision Analysis Part 3


1
Chapter 14
  • Decision Analysis Part 3

2
Restaurant Decision
  • A company plans to open a restaurant/bar in
    Newark. It is considering 3 locations, A, B and
    C. Location A is furthest from campus, B is next
    closest and C is adjacent to the campus. The
    closer to campus, the greater the chance the
    restaurant will NOT get a liquor license which
    will greatly impact revenues. The company plans
    to request a special vote to obtain a license.
    The vote could be favorable or unfavorable.

3
Restaurant Decision
  • The following payoff table shows the potential
    revenue for each location given the vote outcome

4
Restaurant Decision
  • If the company has determined that the likelihood
    of a favorable vote is .55 and unfavorable is
    .45, then EMVs could be calculated as follows
  • EMVA 60(.55) 50(.45)
  • EMVB 80(.55) 30(.45)
  • EMVC 100(.55) 0(.45)

5
Restaurant Decision - EVPI
  • If the company has determined that the likelihood
    of a favorable vote is .55 and unfavorable is
    .45, then the EVPI could be calculated as
    follows
  • EVPI EPPI EMV
  • EVPI (100)(.55) (50)(.45) 57.5
  • EVPI

6
Sensitivity Analysis
  • In many cases, probabilities and payoffs are
    based on subjective assessments and can vary over
    time.
  • Sensitivity analysis can be used to determine how
    changes to these inputs impact your decision
  • If a small change in one of the inputs causes a
    change in the recommended decision alternative,
    extra effort and care should be taken in
    estimating the input value. The inverse is true
    as well!

7
Sensitivity Analysis Example
  • Assume a reversal of the likelihoods from our
    restaurant example Favorable .45, Unfavorable
    .55.
  • Now EMVs could be calculated as follows
  • EMVA 60(.45) 50(.55)
  • EMVB 80(.45) 30(.55)
  • EMVC 100(.45) 0(.55)

8
Sensitivity Analysis Example
  • When likelihood of Favorable is larger, choose B
    smaller, choose A. Question is up to what
    point?
  • In the situation with 2 states of nature, can
    determine ranges using the following formula
  • P(S2) 1- P(S1) 1-P

9
Sensitivity Analysis Example
  • EV(A) P(S1)(60) P(S2)(50)
  • p(60) (1-p)(50)
  • 60p 50 50p
  • 10p 50
  • Use the same process for each alternative
  • EV(B) 50p30
  • EV(C) 100p

10
Sensitivity Analysis Example
  • Can use these equations to graph the EMVs across
    varying likelihoods to determine ranges of
    optimal selections
  • Identify graphing coordinates for each by setting
    p equal to extreme likelihoods p 1 and p 0

11
Sensitivity Analysis Example
EV
Alt B highest EV
Alt C highest EV
120 100 80 60 40 20 0 -20
Alt A highest EV
EVC
EVB
EVA
.2 .4 .6 .8
1.0 p
How do you determine the points where you would
change your mind?
12
Sensitivity Analysis Example
  • Set equations equal to determine points of
    intersection
  • EVA EVB 10p50 50p30 .50
  • EVB EVC 50p30 100p .60
  • Conclusion If likelihood for Favorable Vote is
  • lt50 - Choose location A
  • 50 - 60 - Choose location B
  • 60 - Choose location C

13
Sensitivity Analysis Example
  • Can also use sensitivity analysis to test payoff
    values
  • Identify best and 2nd best alternatives
  • Best Choice B with EMV of 57.5
  • 2nd Best Choice A with EMV of 55.5
  • Can state that Choice B will remain optimal as
    long as EVB 55.5
  • Up to what point will this be true?

14
Sensitivity Analysis Example
  • Let F the payoff of decision B when a favorable
    vote is encountered
  • Let U the payoff of decision B when an
    unfavorable vote is encountered
  • EVB .55F .45U
  • .55F .45U 55.5
  • .55F .45(30) 55.5
  • .55F 13.5 55.5
  • .55F 42
  • F 76.4

What does this mean to you?
15
Sensitivity Analysis Example
  • Let F the payoff of decision B when a favorable
    vote is encountered
  • Let U the payoff of decision B when an
    unfavorable vote is encountered
  • EVB .55F .45U
  • .55F .45U 55.5
  • .55(80) .45U 55.5
  • 44 .45U 55.5
  • .45U 11.5
  • U 25.5

What does this mean to you?
16
Reviewing Our Decision
  • Have alternatives ?
  • Have payoff information ?
  • Have initial assumptions re likelihoods ?
  • Have EVPI information can decide whether or not
    to get new information to revise or update our
    assumptions ?
  • What happens if our new information changes our
    initial assumptions?

17
New Information
  • Prior to deciding on a location, the company must
    decide whether to conduct a lobbying effort among
    the Newark authorities. The outcome of the
    lobbying effort can be positive or negative with
    the following likelihoods
  • P(positive lobbying effort) .75
  • P(negative lobbying effort) .25

18
New Information
  • If the lobbying effort is positive, the company
    has determined that the likelihood for a
    favorable vote would increase with new
    likelihoods as follows
  • P(Favorable vote given a positive lobbying
    effort) .95
  • P(Unfavorable vote given a positive lobbying
    effort) .05

19
New Information
  • If the lobbying effort is negative, the company
    has determined that the likelihood for a
    favorable vote would decrease with new
    likelihoods as follows
  • P(Favorable vote given a negative lobbying
    effort) .35
  • P(Unfavorable vote given a negative lobbying
    effort) .65

20
New Information
  • If NO lobbying effort is conducted, the PRIOR
    probabilities are still applicable
  • P(favorable) .55
  • P(unfavorable) .45

21
Decision Strategy with New Information
  • Can now create a new decision tree that reflects
    the alternate courses of action and revised
    (posterior) probabilities and SOLVE
  • LETS GO TO THE BOARD

22
Fav .95
60 50 80 30 100 0
A
Unfav .05
Positive .75
B
Fav .95
Unfav .05
C
Fav .95
Lobby Effort
Unfav .05
Fav .35
60 50 80 30 100 0
A
Unfav .65
B
Fav .35
Unfav .65
Negative .25
C
Fav .35
Unfav .65
23
Fav .55
60 50 80 30 100 0
A
Unfav .45
B
Fav .55
Unfav .45
No Lobby Effort
C
Fav .55
Unfav .45
24
Fav .95
60 50 80 30 100 0
A
Unfav .05
Positive .75
B
Fav .95
Unfav .05
C
Fav .95
Lobby Effort
Unfav .05
Fav .35
60 50 80 30 100 0
A
Unfav .65
B
Fav .35
Unfav .65
Negative .25
C
Fav .35
Unfav .65
25
Fav .55
60 50 80 30 100 0
A
Unfav .45
B
Fav .55
Unfav .45
No Lobby Effort
C
Fav .55
Unfav .45
26
Expected Value of Sample Information
  • If we chose to do the lobbying effort, the EV
    84.625
  • If we chose NOT to do the lobbying effort, the EV
    57.5
  • The difference between these EVs is the Expected
    Value of Sample Information
  • EVSI EVwSI EVwoSI

27
Expected Value of Sample Information
  • EVSI EVwSI EVwoSI
  • EVSI 84.625 57.5 27.125
  • Conducting the lobbying effort adds 27,125 to
    the location decision EV.

28
Efficiency of Sample Information
  • Since we cant be sure that the sample
    information will yield us PERFECT information,
    its helpful to consider the efficiency of the
    information we do receive.
  • Assuming that perfect information yields an
    efficiency of 100, we can calculate
  • Efficiency (EVSI / EVPI) x 100

29
Efficiency of Sample Information
  • Efficiency (EVSI / EVPI) x 100
  • 27.125 x 100 135
  • 20
  • This value means that the lobbying effort is 135
    as efficient as perfect information so we would
    definitely want to pursue it!

30
For Next Class
  • Read balance of Chapter 14 (Bayes Theorem) and
    Utility Theory
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