Operations Management Exam 1
The properties of a linear programming problem are:
Proportionality, additivity, divisibility, and certainty
decision variables
mathematical symbols that represent levels of activity
proportionality (properties of LP problems)
the rate of change (slope) of the objective function and constraints is constant
sensitivity analysis
- sensitivity analysis determines the effect on the optimal solution, for example, due to changes in coefficients of the objective function and/or constraints - changes may be reactions to anticipated uncertainties related to the parameters or to new information that must be added to the model
observation
identification of a problem that exists in the system or organization
objective function
linear relationship that reflects the objective of an operation
model constraints
linear relationship that represents a restriction on decision making
parameters
numerical values that are included in the objective functions and constraints
transformation
the conversion of inputs (resources) into outputs (goods or services)
computer simulations and sensitivity analysis
- early LP used lengthy manual math solution procedure called the simplex method - steps of the simplex method have been programmed in software packages designed for linear programming problems
divisibility (properties of LP problems)
decision variables can take on any fractional value and are therefore continuous as opposed to integer in nature
Fixed cost includes
staff and management salaries
additivity (properties of LP problems)
terms in the objective function and constraints must be additive
case 2: changing the total amount of the constraint resource (right hand side)
the *sensitivity range for a right hand side* value is the range of values over which the quantity's value can change *without changing the solution variable mix, including the slack/surplus variables* the *sensitivity range* for a constraint quantity value is also the range over which the *shadow price is valid*
If one of the coefficients of the objective function is changed to a value outside of its respective sensitivity range (greater than the upper limit or lower than the lower limit), the optimal solution will be different than the one originally obtained before the change is implemented.
true
Sensitivity analysis is a way to deal with uncertainty in linear programming models.
true
graphical solutions of LP models
- limited to only two decision variables - good way to visualize and fully understand how the solution of linear programming problems is achieved
irregular LP problems
- multiple optimal solutions - infeasible solutions - unbounded solutions
slack variables
- standard form requires that all constraints should be under the form of equations (equalities) rather than inequalities - this is added to a <= constraint in order to convert it to an equation (=). They typically *represent unused resources* - contributes nothing to the objective function (Z value)
surplus variables
- subtracted from a >= constraint in order to convert it to an equation (=). - *represents excess* above constraint requirements - does not effect objective function (Z value)
cases of sensitivity analysis
1) changing the objective function coefficients 2) changing the total amount of constraint resource (constraint quantity value or the right hand side of the constraint) 3) changing constraints coefficients 4) adding new constraints 5) adding new decision variables
productivity
a measure of efficiency-- the amount of output produced compared to the amount of input required in production
linear programming
a model that consists of linear relationships representing a firm's decision(s), given an objective function and resource constraints
model implementation
actual use of the model or its solution
excel requires the standard form
all decision variables in the constraints must appear on the left hand side of the inequality (or equality) and all numeric values must be on the right-hand side
___________________ refers to the ability of an organization to sell products in a market. Please choose the option that best fits the empty space above
business competitiveness
model construction
development of the functional mathematical relationship that describes the decision variables, objective function and constraints of the problem
If the objective function slope is exactly the same as one of the constraints and this specific constraint is redundant, we have a case of multiple optimal solutions.
false
Sensitivity ranges can be computed only for the coefficients of the objective function.
false
Slack variables are only associated with maximization problems
false
The break-even point is the volume that the profit is positive (greater than zero).
false
the correct way to implement a sensitivity analysis for the second coefficient of the objective function is to vary not only the second coefficient but also the first one (at the same time).
false
If by processing the same amount of inputs used in the past a company is now capable to produce a(n) ________ amount of outputs, it means that an improvement of productivity was achieved
greater
model solution
models solved using management sciences techniques
productivity and competitiveness can be improved when
operations reduce costs, improves quality and delivers goods and services on time
The sensitivity range for an objective function coefficient is the range of values over which the current __________________ remains the same.
optimal solution
definition of the problem
problem must be clearly and consistently defined showing its boundaries and interaction with the objectives of the organization
Australian road freight company Linfox uses aerodynamic trucks and trailers to reduce fuel consumption. This is a case of generating higher
productivity
outputs
refer to the end result of an organization's efforts -- the service or product that is delivered or provided to the consumer
business competitiveness
refers to the ability of an organization to sell products in a market
inputs
resources used in the process of production
shadow price
the *marginal value* of one additional unit of resource: how much an organization is willing to pay for it also called dual variables Change in Z/Change in Qi
case 1: changing objective function coefficients
the *sensitivity range* for an objective function coefficient is the *range of values* over which the current optimal solution point *remains optimal* the sensitivity range for the Xi coefficient is designated as Ci
characteristic of LP problem
the objective function and constraints must be definable by *linear* mathematical functional relationships
certainty (properties of LP problems)
the parameters values are assumed to be known with certainty (it is a deterministic model)
break-even analysis
to determine the number of units of a product (volume) to sell or produce that will equate total revenue with total cost - zero profit
the optimal solution for a company that is able to produce two different products (x1 and x2) is x1 = 0 and x2 = 6. The best strategy for this company is to produce only x2.
true
