Deck 17: Linear Programming: Simplex Method

The variable to remove from the current basis is the variable with the smallest positive c_j − z_j value.

The coefficient of an artificial variable in the objective function is zero.

The purpose of row operations is to create a unit column for the entering variable while maintaining unit columns for the remaining basic variables.

In order to determine a basic solution,set n − m of the variables equal to zero,and solve the m linear constraint equations for the remaining m variables.

The variable to enter into the basis is the variable with the largest positive c_j − z_j value.

If a variable is not in the basis,its value is 0.

When a system of simultaneous equations has more variables than equations,there is a unique solution.

Infeasibility can be recognized when the optimality criterion indicates that an optimal solution has been obtained,and one or more of the artificial variables remain in the solution at a positive value.

A solution is optimal when all values in the c_j − z_j row of the simplex tableau are either zero or positive.

At each iteration of the simplex procedure,a new variable becomes basic and a currently basic variable becomes nonbasic,preserving the same number of basic variables and improving the value of the objective function.

Artificial variables are added for the purpose of obtaining an initial basic feasible solution.

Coefficients in a nonbasic column in a simplex tableau indicate the amount of decrease in the current basic variables when the value of the nonbasic variable is increased from 0 to 1.

A basic feasible solution also satisfies the nonnegativity restriction.

The simplex method is an iterative procedure for moving from one basic feasible solution (an extreme point)to another until the optimal solution is reached.

A simplex tableau is shown below. ​
a.What is the current complete solution?
b.The 32/5 for z₁ is composed of 0 + 8(4/5)+ 0.Explain the meaning of this number.
c.Explain the meaning of the −12/5 value for c ₂ − z₂.

Determine from a review of the following tableau whether the linear programming problem has multiple optimal solutions.

What type of solution is shown in this simplex tableau?

A simplex tableau is shown below. ​
a.Perform one more iteration of the simplex procedure.
b.What is the current complete solution?
c.Is this solution optimal? Why or why not?

Jackie Quinn developed the following LP formulation for a problem she is working on and now needs to create an initial simplex tableau.Create the initial simplex tableau.​
Min 75x_l + 45x₂
s.t.3x_l + 2x₂ > 10
x_l + 6x₂ > 15
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Write the following problem in tableau form.Which variables would be in the initial basic solution?

Write the following problem in tableau form.Which variables would be in the initial basis?

Joe Forrester,an operations analyst for a manufacturing company,developed the following LP formulation.From it,create an initial simplex tableau.​
Max 40x_l + 30x₂ + 50x₃
s.t.2x_l + 3x₂ + 4x₃ < 200
x₁ + 2x₂ + 2x₃ < 300
3x_l + x₂ + 5x₃ < 500

Write the following problem in tableau form.Which variables would be in the initial basic solution?

Solve the following problem by the simplex method.

Solve the following problem by the simplex method.

Identify the type of solution shown in this simplex tableau. ​

A student in a Management Science class wants to perform row operations on this second tableau and complete the third tableau to see if it is optimal.If it is optimal,what is the optimal answer?
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A student in a Management Science class developed this initial tableau for a maximization problem and now wants to perform row operations to create the next tableau and check for an optimal solution.Create the next tableau.Is there an optimal solution?
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A manager for a food company is putting together a buffet,and she is trying to determine the best mix of crab and steak to be served.Below are variable definitions she developed including vitamin,mineral,and protein requirements and an optimal simplex tableau she obtained from her computations.She is interested in interpreting what it means.​
Variable definitions:
x_l = amount of crab (oz.)to be served per buffet batch
x₂ = amount of steak (oz.)to be served per buffet batch
s₁ = vitamin A units provided in excess of requirements
s₂ = mineral units provided in excess of requirements
s₃ = protein units provided in excess of requirements
Optimal tableau ​

An operations research analyst for a communications company has the following LP problem and wants to solve it using the simplex method.​
Max 50x₁ + 20x₂
s.t.2x₁ + x₂ < 200
x₁ + x₂ < 350
x_l + 2x₂ < 275

The operations research analyst for a big manufacturing firm in Oregon developed the following variable definitions for an LP maximization problem she was working on.The company was trying to determine how many consoles of each model to produce next week given each console had to go through three production departments.She obtained the following optimal simplex tableau for the problem and wanted to interpret its meaning.Variable definitions:
x_l = number of model 1 consoles produced
x₂ = number of model 2 consoles produced
s₁ = unused personnel hours in department 1
s₂ = unused personnel hours in department 2
s₃ = unused personnel hours in department 3
objective function = total profit on model 1 and model 2 consoles produced in the coming week
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Optimal tableau ​