intermed microeconomics analysis

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PROBLEM SET 3

Consumer Choice

Department of Economics

Economics 3501

A. Alcoholic Beverages

Gabriel John Utterson has an alcoholic beverage budget of £300/year, all of which he spends on gin (G) and wine (W) at Jekyll & Hyde, his local pub. The price of gin is £2/glass and the price of wine £1/glass. His beverage utility function is U = 4GW.

1. Write the equation of Utterson’s budget constraint. __________________________

2. Plot and label this relationship in Figure A. Put the G on the horizontal axis and be

sure the horizontal scale goes to 200 and the vertical scale to 300.

3. What is the slope of the line you have drawn? ________________

4. Give a two sentence economic interpretation of this slope. ______________________

____________________________________________________________________

5. In Figure A, carefully plot and label Utterson’s indifference curve for U = 18,000.

6. Plot and label his indifference curve for U = 30,000.

7. Plot and label his indifference curve for U = 45,000.

8. Assuming Utterson is a utility maximizer, how much gin and wine does he consume

each year?

G = _____________ W = ______________

9. Suppose the price of gin rises to £3/glass (the price of wine remaining

the same). Draw and label his new budget line in Figure A.

Figure A

Figure B

10. What are his utility maximizing consumption quantities after the price change?

G = _____________ W = _____________

11. Suppose the price of gin rises to £5/glass (the price of wine again remaining

the same). Draw and label Utterson’s new budget line in Figure A.

12. What are his consumption quantities

after this price change? G = _____________ W = _____________

13. In Figure A, connect the optimal consumption points identified in problems 8, 10,

and 12. What economic relationship

have you drawn?

_________________________________________

14. Plot the gin price/quantity combinations from the same three problems in Figure

B and connect the dots. Put price on the vertical axis. What economic relationship

have you drawn?

______________________________________________

B. Salad

Teresa Treehugger makes salads using weeds (W) and seeds (S) which she purchases from the local organic food store at prices PW = $.40/oz. and PS = $1.25/oz. Her weekly salad budget is $24.00, and last week she bought 10 ounces of weeds and 16 ounces of seeds. At the end of the week, her utilometer readings were as follows for the last ounce of each good: MUW = 20 and MUS = 25.

15. What inequality tells us that Treehugger did not maximize her salad utility? (A

numerical answer please.)

____________________________________________________________________

16. True or False: Treehugger should have purchased more weeds and

fewer seeds. ____________

17. Suppose Treehugger’s budget function and indifference map were plotted in a

diagram with W on the horizontal axis. At last week’s consumption point, what were

the slopes of her budget line and indifference curve (in absolute value)?

budget line ________________ indifference curve ________________

C. Unusual Budget Lines

The consumers below all live in Johnson City and spend $160/week on clothing (C) and food (F) combined. Both are continuous goods. The consumers patronize different stores, however, and therefore face different pricing structures. Plot the appropriate budget line in each case, being sure to label and number the axes. Put F on the horizontal axis. In all cases, the relationships have shapes different from the one in the canonical model presented in class. (Hint: check your text.)

18. Lyndon shops at TexMart

where the clothing and food

prices are PC = $20/article

and PF = $10/lb. TexMart’s

owner is Lyndon’s

brother-in-law so he (Lyndon)

gets five free pounds of food

per week.

19. Walter shops at Big Train

where the clothing price,

PC = $20/article, is the same

no matter how many articles

are purchased. Food, however,

is $20/lb. for the first five

pounds and then $6/lb.

thereafter.

20. Van shops at Mulholland’s

Maxi-Market where the

prices are PC = $20/article

and PF = $10/lb. Each week

he uses a coupon that gives

him a 60% discount on the

first five pounds of food

purchased.

D. Unusual Indifference Curves

Draw the appropriate indifference map in each case. (The word “map” means that you have to draw at least two indifference curves.) Be sure to label and number all axes. Also use arrows (or other means) to indicate the direction of preference (i.e., whether utility increases or decreases as indifference curves move away from the origin). In all cases, the curves have shapes different from those presented in class. All products are continuous in quantity and are “goods” unless noted otherwise. (Hint: check your text.)

21. “At the Chatterbox Cafe, I always take two lumps of sugar with my cup of coffee, no more and no less.” (Perfect compliments case. Assume, unlike the other cases, that unwanted quantities are not consumed.)















22. “I enjoy apples and oranges in small quantities. However, I begin to dislike apples if I eat more than six per day and to dislike oranges if I eat more than eight per day.” (Satiation case. Assume conventional indifference curves when both products are “goods.”)

23. “I get pleasure from both Pep and Cokesi, but I like Pep twice as much” (Perfect substitutes case.)














24. “I eat only bread and chocolate. If I consume up to four chocolates per day, one chocolate gives me the same utility as one bread slice. If I consume more than four chocolates per day, it takes two chocolates to provide the same utility as one bread slice.” (Modified perfect substitutes case.)















25. “My utility increases by 20 utils each time I eat a pint of ice cream and decreases by 10 utils each time I eat a pickle. (Perfect substitutes case with one “good” and one "bad.")















26. “My diet consists of green eggs and ham. I always get some satisfaction from an additional egg. Ham, however, I only enjoy up to a point. If I eat more than five slices in a day, I become indifferent to it.” (Modified neutral good case.)

E. Cashews

Richard Maple purchases cashews at the West 13th Street Delicatessen. His monthly demand curve for this product is Q = 100 - 40P, where Q is measured in ounces and P in dollars.

27. Last June the deli charged $1.10/oz. for cashews. What is the maximum amount that

Maple would have paid (in total) for the cashews he

purchased at this price? _______________

28. How much consumer surplus did he obtain from the cashews

he purchased? _______________

29. Explain the number you have just obtained in one intuitive sentence (that uses the

number).

_______________________________________________________

____________________________________________________________________

30. Approximately how much consumer surplus did Maple

obtain from the 20th ounce of cashews? ________________

31. In what ways (if any) are consumer surplus and utility similar to one another? In

what ways (if any) are they different?

____________________________________________________________________

F. Miscellaneous

32. Frances has a monthly bread and jam budget of $120. Last month she spent

twice as much money on jam as on bread. Jam was $5/jar;

how many jars did she buy?

__________________

33. Les Coralgab, a utility maximizer, spends $40/month on oranges (X) and grapefruits

(Y). His citrus utility function is U = 30X + 20Y. If oranges are 25% more expensive

than grapefruits (PX = 1.25PY), how many grapefruits does he purchase each month

to maximize his utility?

Y = ______________

34. Joe Quotidian spends his $120/week food budget on meat (X) and potatoes (Y)

which he always consumes in a fixed one-to-one ratio (i.e., X = Y). Last week

the price of meat (PX) was $20/lb; this week it is $5/lb.; and next week it will be

$2/lb. Potatoes are always $10/lb. Write the equation for Quotidian’s meat demand

function: X = f(PX).

__________________________________

35. Plot Quotidian’s meat demand curve in Figure C using the given meat price data.

Put PX on the vertical axis. (Hint: You don’t need the demand equation to do this.)

Figure C