ANSWER:
Given that,
S1= 0.40 , S2 =1-S1= 0.60
Expected value at node 10 =S1(100)+S2(250)
=0.40(100) + 0.60(250)
=190
Expected value at node 11 = S1(300)+S2(200)
=0.40(300) + 0.60(200)
=240
Expected value at node 5= Max(190,240)
=240
OPTION-E:240 is correct answer
Question 18 3.13 pts Below is a portion of a decision tree. If the probability of s1 - 0.40, what is the value at node 5. S1 P(S1)100 D1 10 S2 P(S2) 250 No Research 1 PS1300 D2 S2 P(S2) 200 O 160...
5 pts If the probability of s1 is 40 what is the value at node 11 100 10 No Market 300 Research 400 11 200 O O O 5 pts If the probability of s1 is 40 what is the value at node 11 100 10 No Market 300 Research 400 11 200 O O O
3.13 pts D Question 15 A payoff table is given below and the probabilities of s1, s2, and s3 are 0.3, 0.4, and O.3, respectively, what is the expected opportunity loss of the best decision? s3 s2 s1 750 d1 250 500 d2 300 -250 1200 500 600 d3 500 530 625 280 385 810 Next Previous 4
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