(1 point) Suppose that you have five consumption choices: good 1. ⚫ 15. An indifference surface is the set of consumption choices with a CONSTANT utility. For example if (x1,, x5) = (2, 1, 1, 1, 1)gives the same utility as (x1,,5) = (1,1,1,1,2) than these are both points on the same indifference surface. An indifference map is the set of all indifference surface for EVERY given utility.Consider the following utility map:5Un(x-ai)Where (a1,, as) = (6,6,3,3,6)The budget constraint gives the set of possible consumption choices with a given income. If you have an income of $772 and the price of good x is given by pi. The equation for the budget line is given by:772 Pixi5A utility maximizing combination of goods 1Find ₁ as a function of P₁ ... Psx1(Use p1 for p₁ and likewise for P2, P3, P4, P5.5 occurs when the surface given by the budget constraint is tangent to an indifference surface.The easiest way to solve this question is using Lagrange multiplier.We define the Lagrange function to be:5A(x1,5,A) = U(x₁,, x5) APixi772i=1Utility is maximized when all of the partial derivatives of the Lagrange function are equal to 0.

The objective of this question is to find the quantity of good 1 (x1) that maximizes utility given a…

Answered: (1 point) Suppose that you have five…

ENGR.ECONOMIC ANALYSIS

14th Edition

ISBN:9780190931919

Author:NEWNAN

Publisher:NEWNAN

Chapter1: Making Economics Decisions

Section: Chapter Questions

Problem 1QTC

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1. Joan is on summer break and spends most of her time either playing video games or browsing the internet. Her utility function is U (q1, 42) 399.24$, where qi represents the 0.2,0.8 %3D hours spent browsing the internet and q2 hours playing video games. Joan does not have a budget constraint but she has 15 hours to spend on both activities. (a) Write the equation for one of Joan's indifference curves when the level of utility is equal to 100. (b) Write Joan's time constraint. (c) Find the amount of hours that Joan will spend on each activity that maximizes her utility and satisfies her time constraint. Use either the substitution or Lagrangian method. (d) Can Joan afford any bundle that yields a utility of 50? Explain. (e) How does Joan's optimum amount of time spent on each activity change if her utility function is U (q1, q2) = 5ln(3) + In(q1) + 4ln(q2)?
Kate’s utility function includes coffee (c) and sugar (s). She only consumes coffee and sugar together, and she only consumes in the ratio of one unit (cup) of coffee with two units (spoons) of sugar. Her utility function is What is her marginal utility of sugar if she has 4 cups of coffee and 6 spoons of sugar? Remember that unit are infinitely divisible (you can have parts of units). (a) 0 (b) 1 (c) ½ (d) 2
A consumer with income I=120 facing prices pX = 4 and pY = 8 for two goods X and Y (for each good she prefers more to less) chooses optimally to consume 12 units of X. If the prices change and now pX = 6 and pY = 4, what is the possible range for her optimal X consumption? (like, x >/ 7 or 10 >/ x >/7…etc. Use indifference curve analysis on a graph to reason about the possible locations of the new optimal bundle.)
1 Consider a consumer who consumes only two goods, 21 and z2. His utility function is u (21, 22) = In z1 + 2. where In represents the natural logarithm. 1.a Derive the consumer's MRS of good 1 for good 2 using calculus to calculate his marginal utility from z and his marginal utility from z2. 1.b If the price of z1 is $2 per unit and the price of z2 is $4 per unit, and the consumer's income is $100, What is the equation of this consumer's budget line? 1.c What are the optimal consumption choices, z and z5, for this consumer? Show your work.
Consider the following utility functions: (1) u(x₁, x₂) = x₁ + 2x2. (2) u(x1, 1₂) = 2125 12.75 (3) u(x₁,1₂)=-1²-1₂. (4) u(x1, 1₂) min{x1, 2x2). For utility functions (1) to (3), give the equations of the indifference curves correspond- ing to utility level k, where 22 is expressed as a function of 2₁ and k. For utility functions (1) to (4), draw two indifference curves for each function. That is, draw four graphs (one for each utility function) and two indifference curves on each graph.
Question 2 David spends his budget on chocolate and chip. His utility function is given by ?(?1,?2)= 2?1?2, where ?1 is the number of chocolates he consumers per week, and ?2 is the number of chips he buys per week. A chocolate costs 10 SEK, and a chip costs 20 SEK. David’s weekly budge for consuming on these two goods is 120 SEK. (1) What is David’s budge line? Draw the budget line on a graph with chocolate amounts on the horizontal axis and chip amounts on the vertical axis. Write explicitly at which points budget line crosses the axis. (2) What is David’s marginal utilities for the two goods, respectively? What is his marginal rate of substitution between the two goods? (3) What is David’s optimal choice? Calculate the numerical answer for the optimal bundle. Also draw an indifference curve for David on the same graph as question(1) and show the optimal bundle.
What is the logarithmic transform of the utility function U=xα1xβ2xγ3U=x1αx2βx3γ given the budget constraint px1x1+px2x2+px3x3=Mpx1x1+px2x2+px3x3=M. Select one: a. ln U=ln xα1+ln xβ2+ln xγ3ln U=ln x1α+ln x2β+ln x3γ b. ln U=α ln x1−β ln x2−γ ln x3ln U=α ln x1−β ln x2−γ ln x3 c. ln U=α ln x1+β ln x2+γ ln x3ln U=α ln x1+β ln x2+γ ln x3 d. ln U=ln xγ1+ln xβ2+ln xα3
Question 3 Lucy consumes only scoops of ice-cream (x) and cones (y). Moreover, she insists on consuming these two goods in the combination of 1 scoop of ice-cream and 1 cone. If there are more scoops of ice-cream than cones, she throws the extra ice-cream away. If there are more cones than scoops of ice-cream, she throws the extra cones away. Her utility function for ice-cream and cones is given by U(x, y) = min {x,y}. (The function min {x,y} returns the smaller number between x and y. In other words, if x y, min {x,y} = y; and if x = y, min {x,y} = x = y.) (a) Draw a couple of indifference curves for Lucy. Put ice-cream on the horizontal axis. (Hint: Draw the 45° line. Choose a point on the line. If you increase the amount of x but not y from that point, how would Lucy's utility change? If you increase the amount of y but not x from that point, how would Lucy's utility change?) (b) Suppose each scoop of ice-cream costs $2, and each cone costs $1. Lucy has an income of $6. Draw her…
3) Oğuz has the utility function U(x1,X2) = x:*x2². (X: nuts, X2: berries). %3D a) If Oğuz has 25 units of nuts and 17 units of berries, the price of nuts is 2 and the price of berries is 1 liras, what would be the optimal consumption of Oğuz? b) Assume the prices change, so that nuts cost 1 and berries cost 3 liras. What is the new demand? In this change, What is the pure substitution effect? What is the income effect? c) In the change calculated in part (b), what is the pure substitution effect? d) In the change calculated in part (b), what is the income effect? In the change calculated in part (b), what is the endowment effect?
Donald likes fishing (X1) and hanging out in his hammock (X2). His utility function for these two activities is u(x1, x2) = 3X12X24. (A) Calculate MU1, the marginal utility of fishing. (B) Calculate MU2, the marginal utility of hanging out in his hammock. (C) Calculate MRS, the rate at which he is willing to substitute hanging out in his hammock for fishing. (D)Last week, Donald fished 2 hours a day, and hung out in his hammock 4 hours a day. Using your formula for MRS from (c) find his MRS last week. (E) This week, Donald is fishing eight hours a day, and hanging out in his ham mock two hours a day. Calculate his MRS this week. Has his MRS increased or decreased? Explain why? (F) Is Donald happier or sadder this week compared to last week? Explain.
Claire has the following utility function: ??(??, ??) = ??1/2??1/2 and faces the budget constraint: ?? = ?????? + ??????. Suppose ?? = 120, ???? = 1 and ???? = 4. Find the optimal ??and ??
2) Which of the following utility functions represent the same preferences? Explain. a) U (x₁, x₂) = X₁ X₂ b) W (x₁, x₂) = 5lnx₁ +5lnx₂ c) V (x₁, x₂) = x₁¹/3x₂ ¹/3 - 0.8 d) Z(x₁, x₂) = 0.5x₁ + 0.5x₂

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