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Decision Analysis A. A. Elimam College of Business San Francisco State University
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Characteristics of a Good Decision n n Based on Logic n n Considers all Possible Alternatives n n Uses all Available Data n n Applies Quantitative Approach Decision Analysis Frequently results in a favorable outcome
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Decision Analysis (DA) Steps n n Clearly define the problem n n List all possible alternatives n n Identify possible outcomes n n Determine payoff for each alternative/outcome n n Select one of the DA models n n Apply model to make decision
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Types of Decision Making (DM) n n DM under Certainty: Select the alternative with the Maximum payoff n n DM under Uncertainty: Know nothing about probability n n DM under Risk: Only know the probability of occurrence of each outcome
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Decision Table Example 200,000 100,000 0 -180,000 -20,000 0 Favorable($)Unfavorable($) Alternatives Large Plant Small Plant Do Nothing State of Nature (Market)
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Decision Making Under Risk n n Expected Monetary Value (EMV) EMV (Alternative i) = (Payoff of first State of Nature-SN) x (Prob. of first SN) + (Payoff of second SN) x (Prob. of Second SN) + (Payoff of third State of Nature-SN) x (Prob. of third SN) +... + (Payoff of last SN) x (Prob. of last SN)
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Thompson Lumber Example n n EMV(Large F.) = ( 0.50)($200,000)+(0.5)(-180,000)= $10,000 n n EMV(Small F.) = ( 0.50)($100,000)+(0.5)(-20,000)= $ 4 0,000 n n EMV(Do Nothing) = ( 0.50)($0)+(0.5)(0)= $0
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Thompson Lumber 200,000 100,000 0 -180,000 -20,000 0 Favorable ($)Unfavorable ($) Alternatives Large Plant Small Plant Do Nothing State of Nature (Market) EMV ($) Probabilities 0.5 10,000 40,000
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Expected Value of Perfect Information (EVPI) n n Expected Value with Perfect Information = (Best Outcome for first SN) x (Prob. of first SN) + (Best Outcome for second SN) x (Prob. of Second SN) +... + (Best Outcome for last SN) x (Prob. of last SN)
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Expected Value of Perfect Information (EVPI) n n EVPI = Expected Outcome with Perfect Information - Expected Outcome without Perfect Information n n EVPI = Expected Value with Perfect Information - Maximum EMV
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Thompson Lumber Thompson Lumber Expected Value of Perfect Information n n Best Outcome For Each SN Favorable: Large plant, Payoff = $200,000 Unfavorable: Do Nothing, Payoff = $0 n n So Expected Value with Perfect Info. = ( 0.50)($200,000)+(0.5)(0)= $100,000 n n The Max. EMV = $ 40,000 n n EVPI = $100,000 - $40,000 = $ 60,000
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Decision Table Example 200 160 0 270 800 0 Low ($)High ($)Alternative Small Facility Large Facility Do Nothing Possible Future Demand
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Example A.5 200 160 0 270 800 0 Low ($)High ($) Alternatives Small Large Do Nothing Demand EMV ($) Probabilities 0.40.6 242 544
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Example A.8 Example A.8 Expected Value of Perfect Information n n Best Outcome For Each SN High Demand: Large, Payoff = $800 Low Demand : Small, Payoff = $200 n n So Expected Value with Perfect Info. = ( 0.60)($800)+(0.4)(200)= $560 n n The Max. EMV = $ 544 n n EVPI = $ 560 - $ 544 = $ 16
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Opportunity Loss : Thompson Lumber 200,000-200,000 200,000-100,000 200,000-0 0-(-180,000) 0-(-20,000) 0 - 0 Favorable ($)Unfavorable($) State of Nature (Market)
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Opportunity Loss : Thompson Lumber 0 100,000 200,000 180,000 20,000 0 Favorable ($)Unfavorable ($) Alternatives Large Plant Small Plant Do Nothing State of Nature (Market) EOL ($) Probabilities0.5 90,000 60,000 100,000
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Sensitivity Analysis EMV, $ 0 -100,000 1 Values of P -200,000 100,000 200,000 EMV(LF) EMV(DN) EMV(SF) Point 2, p=0.62 Point 1 p=0.167
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One Time Decision
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Decision Trees n n Decision Table: Only Columns-Rows n n Columns: State of Nature n n Rows: Alternatives- 1 Decision ONLY n n For more than one Decision Trees n n Decision Trees can handle a sequence of one or more decision(s)
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Decision Trees n n Two Types of Nodes n n Selection Among Alternatives n n State of Nature n n Branches of the Decision Tree
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Decision Tree: Example Small Large Do Nothing Unfavorable (0.5) F. (0.5) Favorable (0.5) U. (0.5) F. (0.5)
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A Decision Tree for Capacity Expansion (Payoff in thousands of dollars) Low demand [0.40] $70 High demand [0.60] ($135) 2 Low demand [0.40] $40 High demand [0.60] $220 ($109) ($148) 1 Don’t expand $90 Expand $135 Small expansion Large expansion
![A Decision Tree for Capacity Expansion (Payoff in thousands of dollars) Low demand [0.40] $70 High demand [0.60] ($135) 2 Low demand [0.40] $40 High demand [0.60] $220 ($109) ($148) 1 Don’t expand $90 Expand $135 Small expansion Large expansion](http://images.slideplayer.com./17/5375211/slides/slide_22.jpg "A Decision Tree for Capacity Expansion (Payoff in thousands of dollars) Low demand [0.40] $70 High demand [0.60] ($135) 2 Low demand [0.40] $40 High demand [0.60] $220 ($109) ($148) 1 Don’t expand $90 Expand $135 Small expansion Large expansion")
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Decision Tree for Retailer 3 2 1 Low demand [0.4] $200 Don’t expand $223 Expand $270 Do nothing $40 Advertise Modest response [0.3] $20 Sizable response [0.7] $220 High demand [0.6] $800 ($544) ($160) ($270) ($242) Large facility Low demand [0.4] Small facility High demand [0.6]
![Decision Tree for Retailer Low demand [0.4] $200 Don’t expand $223 Expand $270 Do nothing $40 Advertise Modest response [0.3] $20 Sizable response [0.7] $220 High demand [0.6] $800 ($544) ($160) ($270) ($242) Large facility Low demand [0.4] Small facility High demand [0.6]](http://images.slideplayer.com./17/5375211/slides/slide_23.jpg "Decision Tree for Retailer Low demand [0.4] $200 Don’t expand $223 Expand $270 Do nothing $40 Advertise Modest response [0.3] $20 Sizable response [0.7] $220 High demand [0.6] $800 ($544) ($160) ($270) ($242) Large facility Low demand [0.4] Small facility High demand [0.6]")
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