Solution:
a: North-West Corner Method.
b: Least Cost Method
c: Vogel Approximation Method
Consider the transportation problem presented in the following table: Capacity 120 B 4 17 22 20...
Q3. Suppose that you are required to plan the least-cost transportation from the manufacturing centers to the outlets. The transportation cost matrix is given below. Destination 1 Destination 2 Destination 3 Supply Origin 1 20 17 4 120 Origin 2 35 10 5 60 Demand 40 30 110 180 a. Find the initial basic feasible solution using Vogel’s Approximation Method. (5 Marks) b. Find the final (optimal) solution using Modified Distribution method. (5 Marks) Pls write answer step-by-step with conclusion...
The parameter table given below shows the transportation problem formulation of Option 1 for the Better Products Co. problem presented in Sec. 9.3 of the textbook. As stated in the textbook, the optimal solution for this transportation problem has the following basic variables (allocations): x12 = 30, x13 = 30, x15 = 15, x24 = 15, x25 = 60, x31 = 20, x34 = 25 Verify that this optimal solution actually is optimal by applying just the optimality test portion...
(a) A retail chain has 3 distribution centers to serve 4 regions to meet the demand. The transportation cost between the distribution centers and the regions is given in the following table. Unit Transportation Cost for Regions 2 3 4 1 А 12 15 13 11 Distribution B 8 16 12 10 Center C 9 17 11 13 The demand is expected to be 100, 90, 110, and 120 units in regions 1, 2, 3, and 4 respectively. The distribution...
please step by step Question 2: (20 Marks) A) Explain and discuss with examples the stages of development of Operational research? B) Solve the following linear programming problem graphically: z = 10x+15 Subject to : 3x+6x, 560 Max X: + xy S 16 * 20 C) Discuss and explain the aim and the steps of the ?stepping stone methods of the transportation problems (Question 3: (20 Marks A) Find the starting basic feasible solution for the following Table by using...
Glassware is a high-end glass manufacturer. The company is planning to expand its sales operation to the European market. A supply chain analyst within the company picked five locations for potential warehouse sites. These locations are Barcelona Spain, Budapest-Hungary, Helsinki-Finland, Lyon-France, and Munich-Germany. A marketing analyst divided Europe into four general regions; East, West, South, and North. In the accompanying spreadsheet, the fixed cost of opening warehouses, the capacity of the warehouses, transportation cost from warehouses to regions, and demand...
Table 17-4 Only two firms, ABC and MNO, sell a particular product. The following table shows the demand curve for their product. Each firm has the same constant marginal cost of $4 and zero fixed cost. Price Quantity Demanded Total Revenue (Dollars per unit) (Units) (Dollars) 14 0 0 13 5 65 12 10 120 ir 15 165 10 20 200 9 25 225 8 30 240 7 35 245 6 40 240 5 45 225 4 50 200 3...
Problem 1: Consider the following linear optimization problem: max +22 +rs subject to X1 + X2 + X3 = 10 2x1 - 22 24 i 20, 1,2,3. (a) Bring the problem to a standard form. (b) Show that the point (2,8,0)Ts optimal by the optimality condition of the linear program- ming. Is it an extreme point? Provide arguments for your answers. (c) Determine at least one other point different than (2,8,0)T, which is an extreme point of the constraint set...
Can somone show me how to do the 1st problem? Need to find the LS and SS for the fit and the LH and SH for the hole. Fits are all SHAFT BASIS METRIC but the shaft and hole diameters can not be used right out of the table. This is because the 3mm shaft tolerance does not match. You will need to lookup the "Fit" from the table, and then use the LS (Largest Shaft) and SS (Smallest Shaft)...
HERE IS THE SENSITIVITY REPORT!!!!!!!!! PLEASE SHOW ALL WORK A B C D E F G H J K M N O 1 Transportation Model (Basic) Use Solver on Data Ribbon to solve 2 3 Input Matrix: Destinations C D A 4 1 4 7 7 1 100 5 SUPPLY 8 8 2 12 3 200 6 5 3 10 16 150 7 90 80 120 160 8 Demand Required 10 Do not change or delete unshaded cells. 11 12...
#2 A For the full Heaven! Chocolates data set, fill in the correlation table (to two decimals) Time Pages Amt Spent Time Pages Amt Spent #2.B which variables, if any, are correlated under the 0.7 rule? #3.A Fill in the mean values of Time and Amt Spent by day of the week (to two decimals): Time Amt Spent Sun Mon Tue Wed Thu ! Fri Sat 6.50 #3.8 The greatest mean value of Time, which is a demand on the...