Group Assignment 1 According to the output‚ three variables (section‚ bed and pool) are insignificant because the p-value of them are larger than 0.05. The relationship between the selling price and variables should be: Y= -49.59+4.04X1+32.97X2+11.09X3+29.15X4+22.52X5+12.92X6-25.66X7+1.59X8 X1=lot size X2=number of bathrooms X3= number of other rooms X4= number of stories X5 =number of fireplaces X6 = car garages X7 =whether or not the lot is fenced X8= age Q4: Based on the results
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Julia’s Food Booth Based on the LP model to maximize profit with the established constraints Julia should sell pizza and hotdogs and not BBQ sandwiches. Based on this model Julia will earn $2250.00 in profit. After buying food supplies for the next game she will have $750 remaining ($2250-1500). Julia’s goal was to clear $1000 in profit which she was not able to meet. It is not clear how Julia is paying for the booth rental each game‚ but assuming she is covering the costs with her profits from
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decision nodes‚ square probability nodes‚ and branches 5. Starting conditions have no impact on the validity of a simulation model. 6. A table of random numbers must be normally distributed and efficiently generated 7. Data cannot exhibit both trend and cyclical patterns. 8. Qualitative methods are the least common type of forecasting method for the long-term strategic planning process. 9. Assume that it takes a college student an average of 5 minutes to find a parking spot in the main parking lot
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together with scale parameters $2.$ On side of repair time it goes with the same way failure time with gamma distribution together with shape parameter $1‚$ and scale parameter $2$ respectively. The time $\tau$ is examined as the following $\tau=2.5‚\tau=5‚$ and $\tau=7.5$ for getting a good approximation. For precise value to $\Lambda_{a}(\tau)$ at given time $\tau$ is examined by applying Mathematica. The given $(n)$ indicated in table$(2)$ is the observations number to the operating with repair times
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2 5 6 3 7 8 4 9 10 5 11 12 6 13 1 7 Shelley saw a wounded dog He brought it home He loved .the dog 26 The dog too __________________ 27 ________________ to trace the owner 28 One day ‚ a lady ------------------------------ 29 The dog’s real name ______________ 30 2 The dog had to be given back‚ as 3 8 4 5 9 Savings10% Food 30% Rent 30% Entertainment 5% Education 20% Clothes 5 % 6
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FM8A Corporate Finance Assignment Wei Jiang CT0171246 Question 1. a) Calculate the net initial outlay for this project in MMK = $95‚000 = $100‚000 + $2‚000 × + $3‚000 880 $1 = $100‚000 = 88‚000‚000 b) Calculate after-tax cash flows in MMK for years 1 through 4. Thanlyn Limited Statement of Operating Cash Flow for Year 1 to Year 4 Year 1 Year 2 Year 3 Year 4 MMK MMK MMK MMK 100‚000‚000 100‚000‚000 100‚000‚000 100‚000‚000 40‚000‚000 40‚000‚000 40‚000
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Correct Answer: False . Question 4 .2 out of 2 points Correct In general‚ an increase in price increases the break even point if all costs are held constant. Answer Selected Answer: False Correct Answer: False . Question 5 .0 out of 2 points Incorrect If events A and B are independent‚ then P(A|B) = P(B|A). Answer Selected Answer: True Correct Answer: False . Question 6 .2 out of 2 points Correct A continuous random variable may assume only
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variables‚ representing the number of barrels of wastes transported from each of the 6 plants to each of the 3 waste disposal sites: = Number of Barrels transported per week from plant ‘i’ to the j-th waste disposal site‚ where i = 1‚ 2‚ 3‚ 4‚ 5‚ 6 and j = A‚ B‚ C. The objective function of the manager is to minimize the total transportation cost for all shipments. Thus the objective function is the sum of the individual shipping costs from each plant to each waste disposal site: Minimize
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CLICK TO DOWNLOAD MAT 540 Week 6 Homework Complete the following problems from Chapter 2: 1. Problems 2‚ 6‚ 7‚ 12‚ 16‚ 20 2. Chapter 2 2. A company produces two products that are processed on two assembly lines. Assembly line 1 has 100 available hours‚ and assembly line 2 has 42 available hours. Each product requires 10 hours of processing time on line 1‚ while on line 2 product 1 requires 7 hours and product 2 requires 3 hours. The profit for product 1 is $6 per unit‚ and the profit
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Julia’s Food Booth Strayer University Quantitative Methods MAT 540 December 12‚ 2012 Dr. L. Joseph Introduction Julia is a senior at Tech‚ and she’s investigating different ways to finance her final year at school. She is considering leasing a food booth outside the Tech stadium at home football games. Tech sells out every home game‚ and Julia knows‚ from attending the games herself‚ that everyone eats a lot of food. She has a booth‚ and the booths are not very large. Vendors
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