cms-a-dse-b--1-th: operation research (o.r.) lesson vii

CMS-A-DSE-B--1-TH: Operation Research (O.R.)

Lesson VII: Transportation Problem

Introduction

Transportation problem is a particular class of linear programming, which is associated with day-

to-day activities in our real life and mainly deals with logistics. It helps in solving problems on

distribution and transportation of resources from one place to another. The goods are transported

from a set of sources (e.g., factory) to a set of destinations (e.g., warehouse) to meet the specific

requirements. In other words, transportation problems deal with the transportation of a product

manufactured at different plants (supply origins) to a number of different warehouses (demand

destinations). The objective is to satisfy the demand at destinations from the supply constraints at

the minimum transportation cost possible. To achieve this objective, we must know the quantity

of available supplies and the quantities demanded. In addition, we must also know the location, to

find the cost of transporting one unit of commodity from the place of origin to the destination. The

model is useful for making strategic decisions involved in selecting optimum transportation routes

so as to allocate the production of various plants to several warehouses or distribution centers. The

transportation model can also be used in making location decisions. The model helps in locating a

new facility, a manufacturing plant or an office when two or more number of locations is under

consideration. The total transportation cost, distribution cost or shipping cost and production costs

are to be minimized by applying the model.

Modelling of Transportation Problem

A transportation problem can be expressed in two ways.

1. Mathematical representation

2. Network representation

Obviously, the method used for solving the problems is the formulation of transportation problem

through mathematical methods. But for understanding of the readers, network representation is

equally important.

Mathematical representation

Network representation

General Representation of Transportation Model

Use of Linear Programming to Solve Transportation Problem

The network diagram shown in Figure represents the transportation model of GM Textiles units

located at Chennai, Coimbatore and Madurai. GM Textiles produces ready-made garments at these

locations with capacities 6000, 5000 and 4000 units per week at Chennai, Coimbatore and Madurai

respectively. The textile unit distributes its ready-made garments through four of its wholesale

distributors situated at four locations Bangalore, Hyderabad, Cochin and Goa. The weekly demand

of the distributors are 5000, 4000, 2000 and 4000 units for Bangalore, Hyderabad, Cochin and Goa

respectively. The cost of transportation per unit varies between different supply points and

destination points. The transportation costs are given in the network diagram.

Minimizing Case

Vogel’s Approximation Method (VAM)

cms-a-dse-b--1-th: operation research (o.r.) lesson vii

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