ZuoTi.Pro
Question

Once we have optimal consumption c ∗ and optimal leisure l ∗, we can get optimal...

Once we have optimal consumption LaTeX: c^*c ∗ and optimal leisure LaTeX: l^*l ∗, we can get optimal labor hours LaTeX: h^*h ∗ as

Group of answer choices

l^*

1-c^*

w(1-l^*)

1-l^*

business   economics   
0 0
Add a comment Improve this question Transcribed image text
Next > < Previous
Sort answers by oldest

Homework Answers

Answer #1

Total of leisure hours and working hours is 1 since both leisure hours and working hours are counted in fractions

Then, optimal labor hours = 1 - optimal leisure hours

= 1 - l^*

Select 1-l^*

0 0
Add a comment
Know the answer?
Add Answer to:
Once we have optimal consumption c ∗ and optimal leisure l ∗, we can get optimal...
Your Answer:

Post as a guest

Your Name:

What's your source?

Earn Coins

Coins can be redeemed for fabulous gifts.

Log In

Sign Up

Not the answer you're looking for? Ask your own homework help question. Our experts will answer your question WITHIN MINUTES for Free.
Similar Homework Help Questions

  • A worker's preferences over consumption (c) and leisure (l) can be represented by U(cl) = cl....

    A worker's preferences over consumption (c) and leisure (l) can be represented by U(cl) = cl. The price of consumption is given by p = 1 and the wage by w=1 (a) Suppose we measure leisure in hours per day such that the maximum value I can take is 24. Let's represent hours worked by h; then we have h = 24-1. Write the Budget Constraint of this worker in terms of c and l. (b) Explain briefly why w/p...

  • 4. Consider the consumption-leisure choice model we discussed in class. Suppose individual utility is represented by...

    4. Consider the consumption-leisure choice model we discussed in class. Suppose individual utility is represented by the function U(c, L) = min {c, 10L}, where c is consumption and L is leisure. Individuals have a total h = 16 hours that could be divided into work and leisure. Market wage rate is w = 10. (a) Sketch the individual’s indifference curve. (b) Find the optimal consumption and leisure choice. (c) Now suppose wage increases to w = 12. Find the...

  • Problem #1: Optimal labor supply Clark gains utility from consumption c and leisure l and his...

    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...

  • Suppose Tom has a utility function U=C*L C= consumption L= hours of leisure Tom has 100...

    Suppose Tom has a utility function U=C*L C= consumption L= hours of leisure Tom has 100 hours to divide between work and leisure per week wage is $20/hr 1. Write down budget constraint in terms of consumption and hours of work 2.Tom make decisions on hours of work, leisure and consumption to max. utility. Explain why we can collapse this problem to one in which he chooses hours of leisure only 3. Find optimal hours of work and total consumption...

  • Clark gains utility from consumption c and leisure l and his preferences for consumption and leisure...

    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...

  • Question 1: Households A household's utility over consumption C and leisure l is U - U(C,0)...

    Question 1: Households A household's utility over consumption C and leisure l is U - U(C,0) Cl 1. Plot the household's indifference curve for U-80 for values of C andlless than 20 (i.e. find the curve containing all combinations of C and ( such that U(C, 0) 80) The household has a time endowment of h=16 hours per day. The wage rate per hour is w 1.25. The household's labour income is therefore wNs, where N-h-l-16- l is the time...

  • 13) Consider the standard labor-leisure choice model. Consumer gets utility from consumption (C) and leisure (L)....

    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...

  • 7. ) Shelly's preferences for consumption and leisure can be expressed as U(C, L) (C-100) x...

    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...

  • Mr. Simpson’s preferences for consumption and leisure can be expressed as U(C,L)=(C-100)(L-68). There are 168 hours...

    Mr. Simpson’s preferences for consumption and leisure can be expressed as U(C,L)=(C-100)(L-68). There are 168 hours in a week available for him to split between work and leisure. He earns $20 per hour after taxes. He also receives $300 worth of welfare benefits each week regardless of how much he works. What is Mr. Simpson’s optimal level of consumption? What is Mr. Simpson’s reservation wage? Suppose that in addition to the $300 government welfare, Mr. Simpson receives from his oversea...

  • 4.1 Cindy gets utility from consumption (C) and leisure (L), and has a weekly timebudget ofT=...

    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...

ADVERTISEMENT
Free Homework Help App
Download From Google Play
Scan Your Homework
to Get Instant Free Answers
Need Online Homework Help?
Ask a Question
Get Answers For Free
Most questions answered within 3 hours.
ADVERTISEMENT
ADVERTISEMENT
ADVERTISEMENT