Deck 20: Nonlinear Programming: Solution Techniques

The slope of a curve at its highest point equals 0.

The derivative of a function equals the slope of the curve defined by that function.

Lagrange multiplier is another name for shadow price.

In the method of Lagrange multipliers, constraints as multiples of a multiplier are subtracted from the objective function, which is then differentiated with respect to each variable and solved.

If a Lagrange multiplier equals 3, a one-unit increase in the right-hand side of a constraint, will result in an increase of 3 in the objective function.

The Lagrange multiplier is analogous to the dual variables in a linear programming problem.

In the method of ________, constraints as multiples of multiplier λ are subtracted from the objective function, which is then differentiated with respect to each variable and solved.

In the ________ method, the constraint equation is solved for one variable in terms of another and then substituted into the objective function.

The slope of a curve at any point is equal to the derivative of the curves function.

The Lagrangian function is the original objective function plus the Lagrange multiplier times the difference of the left and right sides of the constraint.

The method of Lagrange multipliers can only be used in solving nonlinear programming problems with one equality constraint.

The Lagrange multiplier reflects the appropriate change in the objective function resulting from a unit change in the quantity value of the constraint equation.

In the substitution method, the constraint equation is solved for one variable in terms of another and then substituted into the objective function.

The Lagrange multiplier at the optimum gives only the instantaneous rate of change in the objective value.

In the method of Lagrange multipliers, the model constraints are multiplied by Lagrange multipliers and subtracted from the objective function.

The slope of a curve at its highest point equals 1.

The Lagrange multiplier reflects a change in the objective function from a unit change in the right-hand-side value of a constraint.

Linear programming is a special case of nonlinear programming.

The Lagrangian function is ________ with respect to each variable and the resulting equations are solved simultaneously.

If a nonlinear programming problem results in profit (Z) of $250, and the Lagrange multiplier for a constraint is 5, the new profit will be ________ if the right-hand side of the constraint is decreased by 1 unit.

In solving a maximization problem, the optimal profit associated with the relaxed solution is always less than or equal to the value of the optimal profit associated with the ________ solution.

A customer molder produces 6-ounce juice glasses and 10-ounce cocktail glasses. The per unit contribution for the juice glasses (x1) is equal to 60 - 5x1, and the per unit contribution for the cocktail glasses (x2) is 80 - 4x2 for a total contribution of 60x1 - 5x12 + 80x2 - 4x22. Demand requires that the production of juice glasses is twice the production of cocktail glasses.(x1 = 2x2). What is the Lagrangian function for this problem?

Given the nonlinear programming model Max Z = 4x1 - 0.1x1x2 + 5x2 - 0.2 x22
Subject to: x1 + 2x2 = 4
What is the Lagrangian function?

Given the nonlinear programming model Max Z = 5x1 - 2x22
Subject to: x1 + x2 = 6
What is the Lagrangian function?

A customer molder produces 6-ounce juice glasses and 10-ounce cocktail glasses. The per unit contribution for the juice glasses (x₁) is equal to 60 - 5x₁, and the per unit contribution for the cocktail glasses (x₂) is 80 - 4 x₂ for a total contribution of 60x₁ - 5x₁² + 80x₂ - 4x₂2. Demand requires that the production of juice glasses is twice the production of cocktail glasses (x₁ = 2x₂). Write the objective function for this problem which illustrates the technique of substitution.

Write the Lagrangian function for the following nonlinear program:
Min x12 + 2x22 - 8x1 - 12x2 + 34
subject to: x12 + 2x22 = 5

Given the nonlinear programming model Max Z = 5x1 - 2x22
Subject to: x1 + x2 = 6
What is the optimal value of the Lagrange multiplier?

If the substitution method cannot be used to solve a nonlinear problem, then the equations which result from taking partial derivatives must be solved using the method of ________.

The Lagrange multiplier, λ, reflects a change in the objective function from a unit change in the ________ value of a constraint.

The slope of a curve at its highest point equals ________.

Given the nonlinear programming model Max Z = 5x1 - 2x22
Subject to: x1 + 4x2 = 6
What is the Lagrangian function?

Given the nonlinear programming model Max Z = 5x1 - 2x22
Subject to: x1 + x2 = 6
What is the optimal profit?

Solve the following nonlinear program:
Min x12 + 2x22 - 8x1 - 12x2 + 34
subject to: x12 + 2x22 = 5

Given the nonlinear programming model Max Z = 5x1 - 2x22
Subject to: x1 + x2 = 6
What are the optimal values of x1 and x2?

The slope of a curve at any point is equal to the ________ of the curves function.

The Lagrangian function is differentiated with respect to each variable and the resulting equations are solved ________ to obtain the value of each variable.

Given the nonlinear programming model Max Z = 5x1 - 2x2- 3x22
Subject to: x1 + 4x2 = 6
What is the Lagrangian function?

If total contribution of is expressed as C = 60x₁ - 5x₁² + 80x₂ - 4x₂² and x₁ = 2x₂, then the Lagrangian function is 60x₁ - 5x₁² + 80x₂ - 4x₂² ________.