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Vogel’s Approximation Method (VAM)


The steps involved in this method for finding the initial solution are as follows.

Step 1  Find the penalty cost, namely the difference between the smallest and next smallest costs in each row and column.

Step 2  Among the penalties as found in Step(1) choose the maximum penalty.
If this maximum penalty is more than one (i.e., if there is a tie) choose any one arbitrarily.

Step 3  In the selected row or column as by Step(2) find out the cell having the least cost. Allocate to this cell as much as possible depending on the capacity and requirements.

Step 4  Delete the row or column which is fully exhausted. Again, compute the column and row penalties for the reduced transportation table and then go to Step (2). Repeat the procedure until all the rim requirements are satisfied.

Note  If the column is exhausted, then there is a change in row penalty and vice versa.

Example 3.5  Find the initial basic feasible solution for the following transportation problem by VAM.

Vogel’s Approximation Method (VAM) - Business Mathematics and Statistics | Business Mathematics and Statistics - B Com

Solution  Since Σai = Σbj = 950 the problem is balanced and there exists a feasible solution to the problem.
First, we find the row Σ column penalty PI as the difference between the least and the next least cost. The maximum penalty is 5. Choose the first column arbitrarily.

In this column, choose the cell having the least cost name (1, 1). Allocate to this cell with minimum magnitude (i.e.(250, 200) = 200.) This exhausts the first column.
Delete this column. Since a column is deleted, then there is a change in row penalty PII and column penalty PII remains the same. Continuing in this manner, we get the remaining allocations as given in the following table below.

Vogel’s Approximation Method (VAM) - Business Mathematics and Statistics | Business Mathematics and Statistics - B Com

Vogel’s Approximation Method (VAM) - Business Mathematics and Statistics | Business Mathematics and Statistics - B Com

Vogel’s Approximation Method (VAM) - Business Mathematics and Statistics | Business Mathematics and Statistics - B Com

Finally, we arrive at the initial basic feasible solution which is shown in the following table.

Vogel’s Approximation Method (VAM) - Business Mathematics and Statistics | Business Mathematics and Statistics - B Com

There are 6 positive independent allocations which equals to m + n –1 = 3 + 4 – 1. This ensures that the solution is a non-degenerate basic feasible solution.

∴ The transportation cost  

= 11 × 200 + 13 × 50 + 18 × 175 + 10 × 125
+ 13 × 275 + 10 × 125 = Rs 12,075.


Example 3.6  Find the initial solution to the following TP using VAM.

Vogel’s Approximation Method (VAM) - Business Mathematics and Statistics | Business Mathematics and Statistics - B Com

Solution  Since Σai = Σ bj the problem is a balance TP. Hence, there exists a feasible solution.

Vogel’s Approximation Method (VAM) - Business Mathematics and Statistics | Business Mathematics and Statistics - B Com

Finally, we have the initial basic feasible solution as given in the following table.

Vogel’s Approximation Method (VAM) - Business Mathematics and Statistics | Business Mathematics and Statistics - B Com

There are 6 independent non-negative allocations equal to m]n[1 \3]4[1\6. This ensures that the solution is non-degenerate basic feasible.

∴  The transportation cost = 3 × 45 + 4 × 30 + 1× 25 + 2 × 80 + 4 × 45 + 1 + 75
= 135 + 120 + 25 + 160 + 180 + 75
= Rs 695

The document Vogel’s Approximation Method (VAM) - Business Mathematics and Statistics | Business Mathematics and Statistics - B Com is a part of the B Com Course Business Mathematics and Statistics.
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FAQs on Vogel’s Approximation Method (VAM) - Business Mathematics and Statistics - Business Mathematics and Statistics - B Com

1. What is Vogel's Approximation Method (VAM)?
Ans. Vogel's Approximation Method (VAM) is a mathematical technique used in operations research to solve transportation problems. It is an iterative method that helps in finding an initial feasible solution by considering the costs and penalties associated with transportation routes.
2. How does Vogel's Approximation Method work?
Ans. Vogel's Approximation Method works by analyzing the penalty or cost associated with each transportation route. It considers the difference between the two lowest costs for each row and column in the transportation table. The method selects the route with the highest difference, and the allocation is made accordingly. This process is repeated until all the demands and supplies are satisfied.
3. What are the advantages of using Vogel's Approximation Method?
Ans. Vogel's Approximation Method has several advantages. Firstly, it provides a good initial solution for transportation problems. Secondly, it takes into account the penalties or costs associated with different routes, allowing for better decision-making. Additionally, it is an efficient method that can be easily implemented and provides a near-optimal solution.
4. How is Vogel's Approximation Method different from other transportation methods?
Ans. Vogel's Approximation Method differs from other transportation methods in the way it considers penalties or costs associated with each route. Unlike other methods that only consider the lowest cost, VAM takes into account the differences between the two lowest costs for each row and column. This additional analysis helps in making more informed allocation decisions.
5. Can Vogel's Approximation Method guarantee an optimal solution?
Ans. No, Vogel's Approximation Method does not guarantee an optimal solution. While it provides a near-optimal solution, it is still an approximation method and may not always yield the best possible solution. However, it is a widely used technique due to its simplicity and ability to provide a good initial solution for transportation problems.
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