B Com Exam  >  B Com Videos  >  Business Mathematics and Statistics  >  Vogel’s Approximation Method (VAM) - Business Mathematics and Statistics

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

115 videos|142 docs

FAQs on Vogel’s Approximation Method (VAM) - Business Mathematics and Statistics Video Lecture - Business Mathematics and Statistics - B Com

1. What is Vogel's Approximation Method (VAM)?
Ans. Vogel's Approximation Method (VAM) is a technique used in business mathematics and statistics to find the initial feasible solution for transportation problems. It is an improvement over the Northwest Corner Method and the Least Cost Method, as it considers both the cost and the penalty of unmet demand or supply in making allocation decisions.
2. How does Vogel's Approximation Method (VAM) work?
Ans. Vogel's Approximation Method works by considering the penalties associated with unmet demand or supply. It compares the differences between the two lowest costs in each row and column and selects the one with the highest difference. This difference represents the penalty for unmet demand or supply, and the allocation is made accordingly. The process is repeated until all demand and supply constraints are satisfied.
3. What are the advantages of using Vogel's Approximation Method (VAM)?
Ans. Vogel's Approximation Method has several advantages: - It provides a better initial feasible solution compared to other methods, resulting in fewer iterations during optimization. - By considering the penalties for unmet demand or supply, VAM helps in finding more balanced allocations. - It is relatively simple to understand and implement, making it suitable for practical applications.
4. Are there any limitations to using Vogel's Approximation Method (VAM)?
Ans. Yes, there are a few limitations to using Vogel's Approximation Method: - VAM assumes that the cost matrix is accurate and reliable. If there are errors or inconsistencies in the cost data, the results may not be optimal. - It may not always guarantee the optimal solution, especially for complex transportation problems with multiple constraints. - VAM can be time-consuming for large-scale problems, as it requires comparing differences in each row and column.
5. How can Vogel's Approximation Method (VAM) be applied in real-life business scenarios?
Ans. Vogel's Approximation Method can be applied in various real-life business scenarios involving transportation and allocation decisions. Some examples include: - Determining the optimal allocation of goods from warehouses to retail stores, considering different costs and demands. - Optimizing the distribution of resources, such as raw materials or finished products, across multiple manufacturing plants or distribution centers. - Planning efficient routes for delivery trucks, taking into account different distances and costs associated with each route.
Explore Courses for B Com exam
Signup for Free!
Signup to see your scores go up within 7 days! Learn & Practice with 1000+ FREE Notes, Videos & Tests.
10M+ students study on EduRev
Related Searches

Viva Questions

,

Exam

,

Semester Notes

,

Objective type Questions

,

study material

,

video lectures

,

Free

,

pdf

,

Summary

,

shortcuts and tricks

,

practice quizzes

,

Extra Questions

,

Previous Year Questions with Solutions

,

past year papers

,

ppt

,

Sample Paper

,

MCQs

,

mock tests for examination

,

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

,

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

,

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

,

Important questions

;