3. Given any basic feasible solution to a LPP (where the objective is to minimize the objective function), if for some a; (not in the basis), z, – c, > 0 and y;, s0 (i = 1,2, ... ,m), what would be your conclusion? Justify your answer.

3. Given any basic feasible solution to a LPP (where the objective is to minimize the objective function), if for some a; (not in the basis), z, – c, > 0 and y;, s0 (i = 1,2, ... ,m), what would be your conclusion? Justify your answer.

Linear Algebra: A Modern Introduction

4th Edition

ISBN:9781285463247

Author:David Poole

Publisher:David Poole

Chapter2: Systems Of Linear Equations

Section2.4: Applications

Problem 16EQ

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3. Given any basic feasible solution to a LPP (where the objective is to minimize the objective
function), if for some a; (not in the basis), z, – c, > 0 and yij < 0 (i = 1,2, ..,m), what
would be your conclusion? Justify your answer.

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