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Material Type: Notes; Class: Inter Microeconomic Theory; Subject: Economics; University: University of Illinois - Urbana-Champaign; Term: Unknown 1989;
Typology: Study notes
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True/False Questions
____ The Lagrangian method is one way to solve constrained maximization problems.
____ The substitution method is a way to avoid using calculus when solving constrained maximization problems.
____ The Lagrange multiplier (Lagrangian) method is a way to solve minimization problems that are subject to a constraint.
____ The value of the Lagrange multiplier measures how the objective function of an economic agent changes as the constraint is relaxed (by a bit).
____ The substitution and the Lagrange multiplier methods are guaranteed to give identical answers.
____ At the optimum of a constrained maximization problem solved using the Lagrange multiplier method, the value of the Lagrange multiplier is equal to zero.
____ When taking no constraint into consideration, a firm’s optimal choices of output levels for its two products are 4 and 5, respectively. If for that firm the sum of its two products output levels is constrained to be less than 10, then we must solve the firm’s constrained optimization problem to make sure that 4 and 5 are still the optimal output levels.
Short Questions
where D is the amount of money spent on development (in millions) and M is the amount of money spent on marketing (in millions). The constraint that the firm can raise up to 10 million for D and M implies that
Assume that this constraints binds (which is indeed the case), i.e, take as given that.
a. What is the Lagrangian expression for this constrained maximization problem?
b. What are the associated First Order Conditions of maximization of the Lagrangian? [Note: there is no need to proceed to the solution of this particular problem, as it is algebraically too tedious.]
c. What would the way the profit function look like if I used the constraint to substitute away one of the two variables?
where G is the number of hours spent playing golf and T is the number of hours spent playing tennis. This person has 10 hours per week to devote to these sports. However, each hour of playing tennis typically entails one hour of waiting for an empty court, thus using up twice the time of actual play. As a consequence, for example, if he spent 2 hours playing golf and 4 hours playing tennis, he would have used up the full 10 hours of his available time.
a. What equation describes this person time constraint?
b. What is the Lagrangian expression of this constrained maximization problem?
c. Use this Lagrangian expression to find out what is the satisfaction (or utility) maximizing choice of time to play golf and tennis.
Following the decision on advertising and R&D, the firm produces the product at a unit cost of and sells it at a unit price of 10. Note that the production costs are not financed out of the expense budget B. They are incurred by the firm, but are financed out of current revenue. The quantity that the firm sells equals , i.e., the more the firm advertizes, the more units of the product it will be able to sell.
a. Write the firm’s profit function in terms of A and RD (i.e., in terms of the decision variables of the firm). [Note that costs consist of total production costs, the advertising expenditure and the R&D expenditure.]
b. What allocation of funds to advertizing and R&D maximizes the firm’s profits? You can solve this problem either with the substitution or the Lagrangian method.