STATISTICAL TECHNIQUES FOR BUSINESS AND
STATISTICAL TECHNIQUES FOR BUSINESS AND
17th Edition
ISBN: 9781307261158
Author: Lind
Publisher: MCG/CREATE
bartleby

Concept explainers

bartleby

Videos

Question
Book Icon
Chapter 20, Problem 17CE

a.

To determine

Construct a payoffs table.

a.

Expert Solution
Check Mark

Explanation of Solution

On observing the given information, it is clear that the lease about for a complete part set for summer season is $560. The rental amount per day is $5. Profit for each set for the first season is $10.

If the firm leased 41 complete sets, the profit for only 41 sets rented is shown below:

Profit for 41 sets={No. of sets rented-[{No. of sets leasedNo.of sets rented}×rent per day]}=41×10([4141]×5)=$410

If the firm leased 42 complete sets, the profit for only 41 sets rented is shown below:

Profit for 42 sets, 41 are rented=41×10([4241]×5)=$4105=$405

In a similar way, the calculations are obtained.

The payoffs are computed as follows:

Event
Act414243444546
41$410$410$410$410$410$410
42$405$420$420$420$420$420
43$400$415$430$430$430$430
44$395$410$425$440$440$440
45$390$405$420$435$450$450
46$385$400$415$430$445$460

b.

To determine

Find the expected payoffs for leasing 41, 42, and 44 complete sets from the Boston firms .

Give the recommended decision.

b.

Expert Solution
Check Mark

Answer to Problem 17CE

The expected payoffs are given below:

EventExpected payoffs
41(S1)$410
42(S2)$419.1
43(S3)$426.70
44(S4)$432.20
45(S5)$431.70
46(S6)$427.45

Explanation of Solution

The expected profit for 41 sets is shown below:

EventPayoff valueProbabilityExpected payoffs
41$4100.06(=3606,000)$24.6(=$410×0.06)
42$4100.1(=6006,000)$41(=$410×0.1)
43$4100.14(=8406,000)$57.4(=$410×0.14)
44$4100.4(=2,4006,000)$164(=$410×0.4)
45$4100.25(=1,5006,000)$102.5(=$410×0.25)
46$4100.05(=3006,000)$20.5(=$410×0.05)
Expected profit(values)$410

The expected profit for 42 sets is shown below:

EventPayoff valueExpected payoffs
41$405$24.3(=$405×0.06)
42$420$42(=$420×0.1)
43$420$58.8(=$420×0.14)
44$420$168(=$420×0.4)
45$420$105(=$420×0.25)
46$420$21(=$420×0.05)
Expected profit(values)$419.10

The expected profit for 43 sets is shown below:

EventPayoff valueExpected payoffs
41$400$24(=$400×0.06)
42$415$41.50(=$415×0.1)
43$430$60.20(=$430×0.14)
44$430$172(=$430×0.4)
45$430$107.50(=$430×0.25)
46$430$21.50(=$430×0.05)
Expected profit(values)$426.70

Therefore, the expected profit for all the sets will be obtained in the same way.

The expected profit all the events is shown below:

EventExpected payoffs
41(S1)$410
42(S2)$419.1
43(S3)$426.70
44(S4)$432.20
45(S5)$431.70
46(S6)$427.45

c.

To determine

Identify the most profitable alternative based on the expected daily profit.

c.

Expert Solution
Check Mark

Explanation of Solution

The expected profit for the event S4 is greater when compared to other events.

Thus, the event S4 would be recommended.

Hence, order 44 sets because the expected profit of $432.20 is the highest.

d.

To determine

Obtain the expected opportunity loss for 41, 42, and 43.

d.

Expert Solution
Check Mark

Answer to Problem 17CE

The expected opportunity loss table is obtained as follows:

Act
41(S1)42(S2)43(S3)44(S4)9(S5)45(S6)
Expected opp. loss$28.3$19.2$11.6$6.10$6.60$10.85

Explanation of Solution

Opportunity loss:

Opportunity loss={Difference between the best payoffs and remaining payoffs.}

From the table in Part (a) if the Supply A1, then the best payoff value is $410 when the state of nature S1.

Then, the opportunity loss is obtained by taking the difference between $410 and $410 That is, $410$410=0.

Thus, the opportunity loss for A1, given a state of nature is S1, is $0.

In the same way, the remaining values in the table are obtained. If the Supply A2, then the value is $15 when the state of nature is S1.

Then, the opportunity loss is obtained by taking the difference between $410 and $405, that is, $410$405=$5.

Thus, the opportunity loss for A2, given a state of nature is S1, is $5.

The opportunity loss table is obtained as follows:

SupplyOpportunity loss
41(S1)42(S2)43(S3)44(S4)45(S5)46(S6)
41(A1)$0$10$20$30$40$50
42(A2)$5$0$10$20$30$40
43(A3)$10$5$0$10$20$30
44(A4)$15$10$5$0$10$20
45(A5)$20$15$10$5$0$10
46(A6)$25$20$15$10$5$0

Then, the expected opportunity loss for 41 sets is calculated as follows:

Expectedopportunitylossfor41 sets={P(S1)R(A1,S1)+P(S2)R(A1,S2)+P(S3)R(A1,S3)+P(S4)R(A1,S4)+P(S5)R(A1,S5)+P(S6)R(A1,S6)}={0(0.06)+10(0.1)+20(0.14)+30(0.4)+40(0.25)+50(0.05)}=28.30

Thus, the expected opportunity loss for 41 sets is $28.3.

The expected opportunity loss for 42 sets is calculated as follows:

Expectedopportunitylossfor42 sets={P(S1)R(A2,S1)+P(S2)R(A2,S2)+P(S3)R(A2,S3)+P(S4)R(A2,S4)+P(S5)R(A2,S5)+P(S6)R(A2,S6)}={5(0.06)+0(0.1)+10(0.14)+20(0.4)+30(0.25)+40(0.05)}=19.2

Thus, the expected opportunity loss for 42 sets is $19.2.

The expected opportunity loss for 43 sets is calculated as follows:

Expectedopportunitylossfor43 sets={P(S1)R(A3,S1)+P(S2)R(A3,S2)+P(S3)R(A3,S3)+P(S4)R(A3,S4)+P(S5)R(A3,S5)+P(S6)R(A3,S6)}={10(0.06)+5(0.1)+0(0.14)+10(0.4)+20(0.25)+30(0.05)}=11.6

Thus, the expected opportunity loss for 42 sets is $11.6.

In the same way, the remaining values are obtained. The expected opportunity losses are shown below:

Act
41(S1)42(S2)43(S3)44(S4)9(S5)45(S6)
Expected opp. loss$28.3$19.2$11.6$6.10$6.60$10.85

e.

To determine

Obtain the most profitable course of action to take based on the expected opportunity loss table.

State whether the decision made in Part (c) is agreed in this context.

e.

Expert Solution
Check Mark

Explanation of Solution

On observing the table in Part (d), the opportunity loss when ordering 44 sets is minimum. Therefore, ordering 44 sets is most profitable.

Both the results stated in Part (c) and Part (e) conclude with the same results. Therefore, the result obtained in Part (c) is agreed with result in this context.

f.

To determine

Obtain the expected value of perfect information.

f.

Expert Solution
Check Mark

Answer to Problem 17CE

The expected value of perfect information is $6.10.

Explanation of Solution

It is given that P(S1)=0.06, P(S2)=0.1, P(S3)=0.14, P(S4)=0.4, P(S5)=0.25, and P(S6)=0.05.

The above calculations show that the EMV for the ordering 44 sets is the maximum at $432.20.

In order to maximize the profit, it is appropriate to order 44.

The expected value of perfect information can be calculated using the following formula:

Expected value of perfect information=Expected value under conditions of certaintyExpected value under conditions of uncertainty.

The expected monetary values calculated above provide the expected values under conditions of uncertainty.

Now, under conditions of certainty, the maximum rent (S1) is $410 when 41 sets are ordered; the maximum rent (S2) is $420 when 42 sets are ordered; the maximum rent (S3) is $430 when 43 sets are ordered; the maximum rent (S4) is $440 when 44 sets are ordered; the maximum rent (S5) is $450 when 45 sets are ordered; and the maximum rent (S6) is $460 when 45 sets are ordered. The expected value of uncertainty is $432.20.

Using the probabilities, the expected value under conditions of certainty is calculated below:

Expected value under conditions of certainty={410(0.06)+420(0.1)+430(0.14)+440(0.4)+450(0.25)+460(0.05)}=438.3.

Hence, the expected value of perfect information is calculated below:

Expected value of perfect information=438.3432.20=$6.10.

Thus, the expected value of perfect information is $6.10.

On observing the evidence stated in the previous parts, the maximum amount to be paid for the perfect information is $6.10.

Want to see more full solutions like this?

Subscribe now to access step-by-step solutions to millions of textbook problems written by subject matter experts!
Students have asked these similar questions
Homework Let X1, X2, Xn be a random sample from f(x;0) where f(x; 0) = (-), 0 < x < ∞,0 € R Using Basu's theorem, show that Y = min{X} and Z =Σ(XY) are indep. -
Homework Let X1, X2, Xn be a random sample from f(x; 0) where f(x; 0) = e−(2-0), 0 < x < ∞,0 € R Using Basu's theorem, show that Y = min{X} and Z =Σ(XY) are indep.
An Arts group holds a raffle.  Each raffle ticket costs $2 and the raffle consists of 2500 tickets.  The prize is a vacation worth $3,000.    a. Determine your expected value if you buy one ticket.     b. Determine your expected value if you buy five tickets.     How much will the Arts group gain or lose if they sell all the tickets?
Knowledge Booster
Background pattern image
Statistics
Learn more about
Need a deep-dive on the concept behind this application? Look no further. Learn more about this topic, statistics and related others by exploring similar questions and additional content below.
Similar questions
SEE MORE QUESTIONS
Recommended textbooks for you
Text book image
MATLAB: An Introduction with Applications
Statistics
ISBN:9781119256830
Author:Amos Gilat
Publisher:John Wiley & Sons Inc
Text book image
Probability and Statistics for Engineering and th...
Statistics
ISBN:9781305251809
Author:Jay L. Devore
Publisher:Cengage Learning
Text book image
Statistics for The Behavioral Sciences (MindTap C...
Statistics
ISBN:9781305504912
Author:Frederick J Gravetter, Larry B. Wallnau
Publisher:Cengage Learning
Text book image
Elementary Statistics: Picturing the World (7th E...
Statistics
ISBN:9780134683416
Author:Ron Larson, Betsy Farber
Publisher:PEARSON
Text book image
The Basic Practice of Statistics
Statistics
ISBN:9781319042578
Author:David S. Moore, William I. Notz, Michael A. Fligner
Publisher:W. H. Freeman
Text book image
Introduction to the Practice of Statistics
Statistics
ISBN:9781319013387
Author:David S. Moore, George P. McCabe, Bruce A. Craig
Publisher:W. H. Freeman
Statistics 4.1 Point Estimators; Author: Dr. Jack L. Jackson II;https://www.youtube.com/watch?v=2MrI0J8XCEE;License: Standard YouTube License, CC-BY
Statistics 101: Point Estimators; Author: Brandon Foltz;https://www.youtube.com/watch?v=4v41z3HwLaM;License: Standard YouTube License, CC-BY
Central limit theorem; Author: 365 Data Science;https://www.youtube.com/watch?v=b5xQmk9veZ4;License: Standard YouTube License, CC-BY
Point Estimate Definition & Example; Author: Prof. Essa;https://www.youtube.com/watch?v=OTVwtvQmSn0;License: Standard Youtube License
Point Estimation; Author: Vamsidhar Ambatipudi;https://www.youtube.com/watch?v=flqhlM2bZWc;License: Standard Youtube License