Question

Suppose the function u(x) = ln(x) where x is consumption represents your preference over gambles using...

Suppose the function u(x) = ln(x) where x is consumption represents your preference over gambles using an expected utility function.

You have a probability ? of getting consumption xB (bad state) and a probability 1-? of getting xG (good state).

(a) Find the certainty equivalent xCE of the gamble.

Hint: use the fact that ?ln(x0) + ?ln (x1) = ln(x0?x1?) for any positive numbers x0 and x1.

(b) Find the risk premium of the gamble.

.

[The following info is for parts c-e only]

Now let ? = 0.1, xB = 10 and xG = 100.

An insurance company allows you to choose an insurance contract (b, p), where b is the insurance benefit the company pays you if bad state occurs and p is the insurance premium you pay the company regardless of the state.

Suppose the company's offer is p = 0.2b. You may choose any combination of (b, p).

(c) Is the insurance contract actuarily fair? How much will you insure (i.e. find your optimal p and b)?

Hint: Refer to Section 17B.1.4 (p. 599-600) of the textbook or slide 20-22 of Chapter 17 for an illustration of choosing actuarilyfair insurance.

(d) What will your consumptions be in the two states with the insurance. Are you fully insured?

(e) What is the expected profit of the insurance company from the contract?

Homework Answers

Know the answer?
Your Answer:

Post as a guest

Your Name:

What's your source?

Earn Coins

Coins can be redeemed for fabulous gifts.

Not the answer you're looking for?
Ask your own homework help question
Similar Questions
Suppose the function u(x) = ln(x) where x is consumption represents your preference over gambles using...
Suppose the function u(x) = ln(x) where x is consumption represents your preference over gambles using an expected utility function. You have a probability ? of getting consumption xB (bad state) and a probability 1-? of getting xG (good state). (a) Find the certainty equivalent xCE of the gamble. Hint: use the fact that ?ln(x0) + ?ln (x1) = ln(x0?x1?) for any positive numbers x0 and x1. (b) Find the risk premium of the gamble. [The following info is for...
Suppose the function u(x) = ln(x) represents your taste over gambles using an expected utility function....
Suppose the function u(x) = ln(x) represents your taste over gambles using an expected utility function. Consider a gamble that will result in a lifetime consumption of x0 with probability p, and x1 with probability 1 – p, where x1 > x0. (a) Are you risk averse? Explain. (b) Write down the expected utility function. (c) Derive your certainty equivalent of the gamble. Interpret its meaning. Use the fact that αln(x0) + βln (x1) = ln(x0 α x1 β )....
Consider a consumer who has preferences over consumption (x) and leisure (L) represented by u(L, x)...
Consider a consumer who has preferences over consumption (x) and leisure (L) represented by u(L, x) = 10 ln L + 5 ln x. The consumer has 24 hours in the day (T = 24) to divide between work and leisure. The consumer can choose however many hours they want to work. For each hour of work they are paid a wage given by w = 10. Consumption (x) costs 1 per unit. (a) Initially suppose that the consumer has...
Suppose Hannah is strictly risk averse with a utility function u over monetary amounts (y): u(y)=y​^(1/2)...
Suppose Hannah is strictly risk averse with a utility function u over monetary amounts (y): u(y)=y​^(1/2) Hannah is facing a risky situation: Either nothing happens to her wealth of $576 with probability 3/4 or she losses everything (so ends up with $0) with probability 1/4. Question 1 What is the expected payoff that Hannah is facing? Provide the numerical value. Numeric Answer: Question 2 What is Hannah's expected utility in this gamble? Provide the numerical value. Numeric Answer: Question 3...
1. Al Einstein has a utility function that we can describe by u(x1, x2) = x21...
1. Al Einstein has a utility function that we can describe by u(x1, x2) = x21 + 2x1x2 + x22 . Al’s wife, El Einstein, has a utility function v(x1, x2) = x2 + x1. (a) Calculate Al’s marginal rate of substitution between x1 and x2. (b) What is El’s marginal rate of substitution between x1 and x2? (c) Do Al’s and El’s utility functions u(x1, x2) and v(x1, x2) represent the same preferences? (d) Is El’s utility function a...
ADVERTISEMENT
Need Online Homework Help?

Get Answers For Free
Most questions answered within 1 hours.

Ask a Question
ADVERTISEMENT