2. Cindy gains utility from consumption C and leisure L. The most leisure she can consume...
Cindy gains utility from consumption C and leisure L. The most leisure she can consume in any given week is 80 hours. Her utility function is: a) Derive Cindy's marginal rate of substitution (MRS) b) Suppose Cindy receives $800 each week from her grandmother regardless of how much Cindy works. What is Cindy's reservation wage?
Cindy gains utility from consumption C and leisure L. The most leisure she can consume in any given week is 80 hours. Her utility function...
4.1 Cindy gets utility from consumption (C) and leisure (L), and has a weekly timebudget ofT= 110 hours. Her utility function isU(C, L) =C∗L. She receives$660 each week from her great-grandmother regardless of how much Cindy works.What is Cindy’s reservation wage? 4.2What is Cindy’s optimal labor supply (h) and consumption (C) if her wage is10 dollars per hour? Show your work.4.3 4.3 What is her optimal labor supply and consumption if her wage is 5 dollars perhour? What is her...
3. What happens to the reservation wage if nonlabor income increases, and why? You should include graphs with your answer 4. What happens to hours of work when the wage rate falls? Decompose the change in hours of work into income and substitution effects. 5. Cindy gains utility from consumption C and leisure L. The most leisure she can consume in any given week is 168 hours. Her utility function is UCL) = CXL. This functional form implies that the...
3. What happens to the reservation wage if nonlabor income increases, and why? You should include graphs with your answer 4. What happens to hours of work when the wage rate falls? Decompose the change in hours of work into income and substitution effects. 5. Cindy gains utility from consumption C and leisure L. The most leisure she can consume in any given week is 168 hours. Her utility function is UCL) = CXL. This functional form implies that the...
Clark gains utility from consumption c and leisure l and his preferences for consumption and leisure can be expressed as U(c, l) = 2(√ c)(l). This utility function implies that Clark’s marginal utility of leisure is 2√ c and his marginal utility of consumption is l √ c . He has 16 hours per day to allocate between leisure (l) and work (h). His hourly wage is $12 after taxes. Clark also receives a daily check of $30 from the...
Problem #1: Optimal labor supply Clark gains utility from consumption c and leisure l and his preferences for consumption and leisure can be expressed as U(c, l) = 2(√ c)(l). This utility function implies that Clark’s marginal utility of leisure is 2√ c and his marginal utility of consumption is l √ c . He has 16 hours per day to allocate between leisure (l) and work (h). His hourly wage is $12 after taxes. Clark also receives a daily...
7. ) Shelly's preferences for consumption and leisure can be expressed as U(C, L) (C-100) x (L-40). This utility function implies that Shelly's marginal utility of leisure is C- 100 and her marginal utility of consumption is L - 40. There are 110 (non-sleeping) hours in the week available to split between work and leisure. Shelly earns S10 per hour after taxes. She also receives $320 worth of welfare benefits each week regardless of how much she works a) Graph...
13) Consider the standard labor-leisure choice model. Consumer gets utility from consumption (C) and leisure (L). She has H total hours. She works N S hours and receives the hourly wage, w. She has some non-labor income π and pays lump-sum tax T. Further suppose (π – T) > 0. The shape of utility function is downward-sloping and bowed-in towards the origin (the standard U- shaped case just like a cobb-douglas function) If this consumer decides to NOT WORK AT...
Need as much details as possible. Microeconomics.
2. Vera's utility over consumption (that is, all goods and services that she buys), C, and leisure (work- free time), L, is U(CL)-CL. Her hourly wage is w=10 €. Suppose that she can work for 24 hours a day if she wants to and that the price of consumption is p . (a) How many units of consumption can Vera buy in a day if she works non-stop? What if she works 24-L...
1. Janet's utility depends on consumption c and leisure l. She earns a wage equal to w per hour, has an investment income equal to M(greater than or equal to) 0 and needs to sleep at least 8 hours a night. Normalize the price of consumption goods at $1. (i) Draw her indifference curves between hours of leisure and consumption, her budget line and her equilibrium choice of c and l. What is the slope of the budget line and...