Deck 13: Introduction to Optimization Modeling

It is instructive to look at a graphical solution procedure for LP models with three or more decision variables.

The proportionality property of LP models means that if the level of any activity is multiplied by a constant factor,then the contribution of this activity to the objective function,or to any of the constraints in which the activity is involved,is multiplied by the same factor.

In general,the complete solution of a linear programming problem involves three stages: formulating the model,invoking Solver to find the optimal solution,and performing sensitivity analysis.

If an LP model does have an unbounded solution,then we must have made a mistake - either we made an input error or we omitted one or more constraints.

Proportionality,additivity,and divisibility are three important properties that LP models possess,which distinguish them from general mathematical programming models:.

There is often more than one objective in linear programming problems

Suppose the allowable increase and decrease for shadow price for a constraint are $25 (increase)and $10 (decrease).If the right hand side of that constraint were to increase by $10 the optimal value of the objective function would change.

If a constraint has the equation $20 x + 10 y \leq 1000$ ,then the slope of the constraint line is function line is -2:

When formulating a linear programming spreadsheet model,we specify the constraints in a Solver dialog box,since Excel does not show the constraints directly.

Unboundedness refers to the situation in which the LP model has been formulated in such a way that the objective function is unbounded - that is,it can be made as large (for maximization problems)or as small (for minimization problems)as we like.

All linear programming problems should have a unique solution,if they can be solved.

All optimization problems include decision variables,an objective function,and constraints.

When formulating a linear programming spreadsheet model,there is one target (objective)cell that contains the value of the objective function.

In determining the optimal solution to a linear programming problem graphically,if the objective is to maximize the objective,we pull the objective function line down until it contacts the feasible region.

Suppose the allowable increase and decrease for an objective coefficient of a decision variable that has a current value of $50 are $25 (increase)and $10 (decrease).If the coefficient were to change from $50 to $60,the optimal value of the objective function would not change.

Linear programming problems can always be formulated algebraically,but not always on spreadsheet.

If a solution to an LP problem satisfies all of the constraints,then is must be feasible.

Shadow prices are associated with nonbinding constraints,and show the change in the optimal objective function value when the right side of the constraint equation changes by one unit.

When formulating a linear programming spreadsheet model,there is a set of designated cells that play the role of the decision variables.These are called the objective cells.

There are two primary ways to formulate a linear programming problem,the traditional algebraic way and in spreadsheets.

Infeasibility refers to the situation in which there are no feasible solutions to the LP model

The feasible region in a graphical solution of a linear programming problem will appear as some type of polygon,with lines forming all sides.

If a constraint has the equation $3 x + 2 y \leq 60$ ,then the constraint line passes through the points (0,20)and (30,0):

The optimal solution to any linear programming model is a corner point of a polygon.

When the proportionality property of LP models is violated,then we generally must use non-linear optimization.

Nonbinding constraints will always have slack,which is the difference between the two sides of the inequality in the constraint equation.

The additivity property of LP models implies that the sum of the contributions from the various activities to a particular constraint equals the total contribution to that constraint.

There are generally two steps in solving an optimization problem,model development and optimization.

If the objective function has the equation $\min \{ 15 x + 25 y \}$ ,then the y-intercept of the objective function line is 40:

If the objective function has the equation $\min \{ 4 x + 2 y \}$ ,then the slope of the objective function line is 2:

The divisibility property of LP models simply means that we allow only integer levels of the activities.

Consider the following linear programming problem:
Maximize $2 x _ { 1 } + 2 x _ { 2 }$
Subject to $4 x _ { 1 } + 3 x _ { 2 } \geq 12$
$- 2 x _ { 1 } - 3 x _ { 2 } \leq 6$
$x _ { 2 } \geq 2$
$x _ { 1 } , x _ { 2 } \geq 0$
The above linear programming problem:

Suppose a firm must at least meet minimum expected demands of 60 for product x and 80 of product y.An algebraic formulation of these constraints is:

It is often useful to perform sensitivity analysis to see how,or if,the optimal solution to a linear programming problem changes as we change one or more model inputs.

The set of all values of the changing cells that satisfy all constraints,not including the nonnegativity constraints,is called the feasible region.

It helps to ensure that Solver can find a solution to a linear programming problem if the model is well-scaled;that is,all of the numbers are of roughly the same magnitude.

The equation of the line representing the constraint $2 x + 4 y \leq 80$
Passes through the points:

The equation of the line representing the constraint $20 x + 10 y \leq 1000$
Is:

Suppose a liquor store sells beer for a net profit of $1 per unit and wine for a net profit of $2 per unit.Let x equal the amount of beer sold and y equal the amount of wine sold.An algebraic formulation of the profit function is:

Consider the following linear programming problem:
Maximize $5 x _ { 1 } + 5 x _ { 2 }$
Subject to $x _ { 1 } + 2 x _ { 2 } \leq 8$
$x _ { 1 } + x _ { 2 } \leq 6$
$x _ { 1 } , x _ { 2 } \geq 0$
The above linear programming problem:

Consider the following linear programming problem:
Maximize $2 x _ { 1 } + 4 x _ { 2 }$
Subject to $x _ { 1 } + x _ { 2 } \leq 5$
$- x _ { 1 } + x _ { 2 } \geq 8$
$x _ { 1 } , x _ { 2 } \geq 0$
The above linear programming problem:

Consider the following linear programming problem:
Minimize $5 x _ { 1 } + 6 x _ { 2 }$
Subject to $x _ { 1 } + 2 x _ { 2 } \geq 12$
$3 x _ { 1 } + 2 x _ { 2 } \geq 24$
$3 x _ { 1 } + x _ { 2 } \geq 15$
$x _ { 1 } , x _ { 2 } \geq 0$
The above linear programming problem:

If a manufacturing process takes 3 hours per unit of x and 5 hours per unit of y and a maximum of 100 hours of manufacturing process time are available,then an algebraic formulation of this constraint is:

What are the decision variables in this problem?
Western Chassis produces high-quality polished steel and aluminum sheeting and two lines of industrial chassis for the rack mounting of Internet routers,modems,and other telecommunications equipment.The contribution margin (contribution toward profit)for steel sheeting is $0.40 per pound and for aluminum sheeting is $0.60 per pound.Western earns $12 contribution on the sale of a Standard chassis rack and $15 contribution on a Deluxe chassis rack.During the next production cycle,Western can buy and use up to 25,800 pounds of raw unfinished steel either in sheeting or in chassis.Similarly,20,400 pounds of aluminum are available.One standard chassis rack requires 16 pounds of steel and 8 pounds of aluminum.A Deluxe chassis rack requires 12 pounds of each metal.The output of metal sheeting is restricted only by the capacity of the polisher.For the next production cycle,the polisher can handle any mix of the two metals up to 4,000 pounds of metal sheeting.Chassis manufacture can be restricted by either metal stamping or assembly operations;no polishing is required.During the cycle no more than 2,500 total chassis can be stamped,and there will be 920 hours of assembly time available.The assembly time required is 24 minutes for the Standard chassis rack and 36 minutes for the Deluxe chassis rack.Finally,market conditions limit the number of Standard chassis racks sold to no more than 1,200 Standard and no more than 1,000 Deluxe.Any quantities of metal sheeting can be sold.