Operations Research




                    Notes          6.2 Stepping Stone Method

                                   It is a method for computing optimum solution of a transportation problem.

                                   Steps Involved:

                                   Step 1: Determine an initial basic feasible solution using any one of the following:
                                         (a)  North West Corner Rule

                                         (b)  Matrix Minimum Method
                                         (c)  Vogel Approximation Method
                                   Step 2: Make sure that the number of occupied cells is exactly equal to m+n–1, where m is the
                                         number of rows and n is the number of columns.
                                   Step 3: Select an unoccupied cell.
                                   Step 4: Beginning at this cell, trace a closed path using the most direct route through at least
                                         three occupied cells used in a solution and then back to the original occupied cell and
                                         moving with only  horizontal and vertical moves.  The cells at the turning points are
                                         called “Stepping Stones” on the path.

                                   Step 5: Assign plus (+) and minus (-) signs alternatively on each corner cell of the closed path
                                         just traced, starting with the plus sign at unoccupied cell to be evaluated.
                                   Step 6: Compute the net change in the cost along the closed path by adding together the unit
                                         cost figures found in each cell containing a plus sign and then subtracting the unit costs
                                         in each square containing the minus sign.
                                   Step 7: Check the sign of each of the net changes. If all the net changes computed are greater than
                                         or equal to zero, an optimum solution has been reached. If not, it is possible to improve
                                         the current solution and decrease the total transportation cost.
                                   Step 8: Select the unoccupied cell having the most negative net cost change and determine the
                                         maximum number of units that can be assigned to a cell marked with a minus sign on the
                                         closed path corresponding to this cell. Add this number to the unoccupied cell and to all
                                         other cells on the path marked with a plus sign. Subtract this number from cells on the
                                         closed path marked with a minus sign.
                                   Step 9: Repeat the procedure until you get an optimum solution


                                        Example: Consider  the following  transportation problem  (cost in  rupees). Find  the
                                   optimum solution

                                          Factory      D       E      F      G   Capacity
                                          A             4      6      8      6      700
                                          B             3      5      2      5      400

                                          C             3      9      6      5      600
                                          Requirement  400    450    350     500   1700










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