Linear Programming Problems: Determination of Optimal Value of Real Life Practical Problems

Authors

  • Dilaram Bhattarai Mahendra Multiple Campus, Ghorahi, Dang Middle Western Nepal

DOI:

https://doi.org/10.3126/nutaj.v5i1-2.23461

Keywords:

Mathematical method, linear programming, problems, determination, optimal value, graphical method, simplex method

Abstract

Nowadays mathematical method are widely applied in planning of natural economy, organization of industry control, business decision, transportation, engineering, telecommunications, elaboration of military operations etc. From the general point of view, the problems of control and planning are usually reduced to a choice of a certain system of numerical parameters or a function ensuring the most effective achievement of the preplanned aim (optimum plan) with the limited possible resources taken into account. To estimate the effectiveness of a plan, introduce the plan quantity index expressed in term of the plan characteristics and attaining the extremism value for an optimal plan. For the large number of practically interesting problems the objective function is expressed linearly in term of plan characteristics, the permissible values of the parameters also obeying linear equalities or inequalities.

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Author Biography

Dilaram Bhattarai, Mahendra Multiple Campus, Ghorahi, Dang Middle Western Nepal

Lecturer

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Published

2018-12-31

How to Cite

Bhattarai, D. (2018). Linear Programming Problems: Determination of Optimal Value of Real Life Practical Problems. NUTA Journal, 5(1-2), 79–86. https://doi.org/10.3126/nutaj.v5i1-2.23461

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Section

Articles