How high must be the new salary for the person to switch the job.
Explanation of Solution
The current salary of the individual is $115,600 per year, which gives a utility of 340. Since the main concerns of the individual is the utility from the income, the individual must be offered an income that provides a utility of over 340 utils. The probability of the company's success can be calculated by setting the probability equal to 'p' as follows:
Let the probability of success be 'p'. Then the salary from the new job would be equal to the fixed salary and the probable profit that the individual can make. This can be calculated as follows:
Thus, P must be equal to 0.21. Thus, substituting the value in the equation gives the expected value of the salary that the individual must receive in order to switch the job. This can be calculated as follows:
Thus, the new salary must be equal to $132,750 per year, which means that the new salary must be higher than the existing salary by $17,150 in order to to switch the job.
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Chapter 17 Solutions
Principles of Microeconomics (12th Edition)
- 21. Let U=x 2 +y 2 is the utility function of a worker who has 10 hours that to be allocatedbetween labour supply (L) and leisure (x). Let y is a consumption good whose price is 1.Wage rate (w) is Rs 1 and non-wage income is 20. Find out L.a) 10 b) 0 c) 5 d) 8 e) none 22. On the basis of the above question, hen w=0 and non-wage income is 40, find out L.a) 10 b) 0 c) 5 d) 8 e) nonearrow_forwardAssume an individual has a utility function of this form U(C, L) = 20 + 4(C*L)1/2 This utility function implies that the individual’s marginal utility of leisure is 2(C/L)1/2 and her marginal utility of consumption is 2(L/C)1/2. The individual has an endowment of V=$80 in non-labour income and T = 16 hours to either work (h) or use for leisure (L). Assume that the price of each unit of consumption good p=$1 and the wage rate for each hour of work w=$10. a. How much utility does the individual receive if she consumes C = 100 and works h = 7 hours? b. Calculate the rate at which the individual is willing to sacrifice an additional leisure hour when she is already working 4 hours. c. What is this individual’s optimal amount of consumption and leisure?arrow_forwardAssume an individual has a utility function of this form U(C, L) = 20 + 4(C*L)1/2 This utility function implies that the individual’s marginal utility of leisure is 2(C/L)1/2 and her marginal utility of consumption is 2(L/C)1/2. The individual has an endowment of V=$80 in non-labour income and T = 16 hours to either work (h) or use for leisure (L). Assume that the price of each unit of consumption good p=$1 and the wage rate for each hour of work w=$10. a. What is this individual’s optimal amount of consumption and leisure? b. Assume a cash grant welfare program is instituted which pays M = 20 dollars for individuals who do not work. Compute the new optimal labour supply for this individual under the welfare program. Assume that prior to the welfare program, p =$1, w =$10, and V =$80 (as in part c). Does the individual accept the welfare program and not work? Show why or why not.arrow_forward
- 3. A firm that is located in country H, where price levels are p = (1,1), needs to send one of its two employees to its branch in country F. However, in country F price levels are p′ ≫ p, so the firm will have to pay additional salary to ensure that its employee is equally well-off in country F as she was in country H. Suppose the utility functions of the two employees are u1(x1, x2) = x1 + x2 and u2(x1, x2) = min {x1, x2}. The two employees are otherwise identical, including current salary. If the firm wants to minimize the additional salary it needs to pay, which employee should it send? Explain.arrow_forwardQ1: Suppose Labor and Capital are substitutes and the price of capital falls. All else equal, we should expect the labor select (supply, demand) Curve shift select ( up to the right, down to the left ) and for equilibrium wages to select (rise, fall) Q2: An individual has a utility function over Leisure and Income such that ?=?1/2?1/2 This individual has a budget constraint ?=?⋅(24−?)+? The best possible wage this individual can earn in the labor market is $2 per hour. This individual is $30 in debt (they have negative non-labor income). If this individual is earning a utility level of 4, which of the following are true? Group of answer choices The worker could be supplying 1 unit of Labor The worker could be earning $10 The worker could be supplying 8 units of labor The worker is maximizing their utility given their budget The worker's Marginal Rate of Substitution at the point where the budget constraint intersects the indifference curve is equal to -2arrow_forwardFor Miranda, catching fish is not just a profitable activity, it is also her only viable source of food. She derives utility from consuming fish q as well as leisure time r, by the function U (q, r) = √gr Again, let p denote the price of fish and let w = 1 be the hourly wage that Miranda earns from working. She has a total of l = 24 hours per day to divide between labor and leisure, so that l + r = 24. a) Suppose that Miranda's expenditure on fish comes entirely from her wages pq = wł. Rewrite this condition as a budget constraint. What is the "price" of leisure and what is Miranda's "income" I? b) Write Miranda's utility maximization problem and state the first order conditions. (c) Find Miranda's demand for fish qd(p) and leisure r(p), and her indirect utility v(p).arrow_forward
- A consumer finds only three products, X, Y, and Z, are for sale. The amount of utility which their consumption will yield is shown in the table below. Assume that the prices of X, Y, and Z are $10, $2, and $8, respectively, and that the consumer has an income of $74 to spend. Product X Product Y Product Z Quantity Utility Marginal Utility per $ Quantity Utility Marginal Utility per $ Quantity Utility Marginal Utility per $ 1 42 NA 1 14 NA 1 32 NA 2 82 4 2 26 6 2 60 3.5 3 118 3.6 3 36 5 3 84 3 4 148 3 4 44 4 4 100 2 5 170 2.2 5 50 3 5 110 1.25 6 182 1.2 6 54 2 6 116 0.75 7 182 _0 7 56.4 _1.2 7 120 _0.5_ Why would the consumer not be maximizing utility by purchasing 2 units of X, 4 units of Y, and 1 unit of Z?arrow_forwardA consumer finds only three products, X, Y, and Z, are for sale. The amount of utility which their consumption will yield is shown in the table below. Assume that the prices of X, Y, and Z are $10, $2, and $8, respectively, and that the consumer has an income of $74 to spend. Product X Product Y Product Z Quantity Utility Marginal Utility per $ Quantity Utility Marginal Utility per $ Quantity Utility Marginal Utility per $ 1 42 NA 1 14 NA 1 32 ___NA__ 2 82 4 2 26 6 2 60 __3.5_ 3 118 3.6 3 36 5 3 84 __3___ 4 148 3 4 44 4 4 100 __2___ 5 170 2.2 5 50 3 5 110 _1.25___ 6 182 1.2 6 54 2 6 116 _0.75__ 7 182 0 7 56.4 1.2 7 120 _0.5_ How many units of X, Y, and Z will the consumer buy when maximizing utility and spending all…arrow_forward, and you are considering a self-employment opportunity that may pay $10,000 per year or $40,000 per year with equal probabilities. What certain income would provide the same satisfaction as the expected utility from the self-employed position? a) $22,500 b) $15,000 c) $27,500 d) $25,00arrow_forward
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