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deleted it please Problem: Suppose the person faces the budget constraint given by the following equation: PAA + PB B = 1 were A and
deleted it please
Problem: Suppose the person faces the budget constraint given by the following equation: PAA + PB B = 1 were A and B are the quantities of apples and bananas, respectively. PA and Ps are the prices of apples and bananas. The price of an apple is $0.4, and the price of a banana is $0.1. The person has an income I=$8. Part A - Budget Constraint: Write down the budget constraint using the above information. (2 points) Part B - Utility Function: If this person's utility function is given by U = VAB 1. What is this utility function called? (See page 71 in the book.) (2 points) 2. If A = 5 and B = 80, what will utility be? (2 points) 3. If A = 10, how many units of B should he consume to obtain the same level of utility you obtained in 1 above? (2 points) 4. If A = 20, how many units of B should he consume to obtain the same level of utility you obtained in 1 above? (2 points) Part C - Marginal Rate of Substitution: Slope of Indifference Curve If the marginal rate of substitution is given by the following expression MUR MRS = MUA 5. Building on the Cobb-Douglas utility maximization (Page 71) sheet posted on Blackboard, write down the expressions for MUB and MUA. (2 points) 6. Calculate the MRS. (2 points) Part D - Price Ratio: Slope of Budget Constraint 7. What is the price ratio for the above budget constraint? Please note that Apples are on the y-axis and Bananas are on the x-axis. (2 points) Edit View History Bookman Profiles TS Window Hei - 13 + O twitter.com Comment 10559062 korte Login @ X egle X learn-eu-central-1-prod-tiet01-xythos.content blackboardon.com/502098210856/105500627X-Blackboard-pation: 1631707200000 Kortet PDR alketbia 1 Reading List 2062 1+ 100 C Part Utility Maximization: MRS.Price Ratio 8. Based on your answers to parts 5 and 6, does this person maximize utility? Explain. (2 points) 9. Should this person buy more apples and less bananas) or less apples and more bananas) to maximise utility ( points) Ralketbia Oralketi39 . O Raketbi Ralketbi Ralketi 15 MacBook Pro Problem: Suppose the person faces the budget constraint given by the following equation: PA A+ PB B = 1 were A and B are the quantities of apples and bananas, respectively. Pa and Paare the prices of apples and bananas. The price of an apple is $0.4, and the price of a banana is $0.1. The person has an income I=$8. Part A - _Budget Constraint: Write down the budget constraint using the above information. (2 points) Part B - _Utility Function: If this person's utility function is given by U=VAB 1. What is this utility function called? (See page 71 in the book.) (2 points) 2. If A = 5 and B = 80, what will utility be? (2 points) 3. If A - 10, how many units of B should he consume to obtain the same level of utility you obtained in 1 above? (2 points) 4. If A - 20, how many units of B should he consume to obtain the same level of utility you obtained in 1 above? (2 points) Part C- _Marginal Rate of Substitution: Slope of Indifference Curve If the marginal rate of substitution is given by the following expression MRS=_MUMUA 5. Building on the Cobb-Douglas utility maximization (Page 7.) sheet posted on Blackboard, write down the expressions for MUn and MUA. (2 points) 6. Calculate the MRS. (2 points) Part D- _Price Ratio: Slope of Budget Constraint 7. What is the price ratio for the above budget constraint? Please note that Apples are on the y-axis and Bananas are on the x-axis. (2 points) Part E - Utility Maximization: MRS=Price Ratio 8. Based on your answers to parts 5 and 6, does this person maximize utility? Explain. (2 points) 9. Should this person buy more apples (and less bananas) or less apples (and more bananas) to maximize utility? (2 points) Problem: Suppose the person faces the budget constraint given by the following equation: PAA + PB B = 1 were A and B are the quantities of apples and bananas, respectively. PA and Ps are the prices of apples and bananas. The price of an apple is $0.4, and the price of a banana is $0.1. The person has an income I=$8. Part A - Budget Constraint: Write down the budget constraint using the above information. (2 points) Part B - Utility Function: If this person's utility function is given by U = VAB 1. What is this utility function called? (See page 71 in the book.) (2 points) 2. If A = 5 and B = 80, what will utility be? (2 points) 3. If A = 10, how many units of B should he consume to obtain the same level of utility you obtained in 1 above? (2 points) 4. If A = 20, how many units of B should he consume to obtain the same level of utility you obtained in 1 above? (2 points) Part C - Marginal Rate of Substitution: Slope of Indifference Curve If the marginal rate of substitution is given by the following expression MUR MRS = MUA 5. Building on the Cobb-Douglas utility maximization (Page 71) sheet posted on Blackboard, write down the expressions for MUB and MUA. (2 points) 6. Calculate the MRS. (2 points) Part D - Price Ratio: Slope of Budget Constraint 7. What is the price ratio for the above budget constraint? Please note that Apples are on the y-axis and Bananas are on the x-axis. (2 points) Edit View History Bookman Profiles TS Window Hei - 13 + O twitter.com Comment 10559062 korte Login @ X egle X learn-eu-central-1-prod-tiet01-xythos.content blackboardon.com/502098210856/105500627X-Blackboard-pation: 1631707200000 Kortet PDR alketbia 1 Reading List 2062 1+ 100 C Part Utility Maximization: MRS.Price Ratio 8. Based on your answers to parts 5 and 6, does this person maximize utility? Explain. (2 points) 9. Should this person buy more apples and less bananas) or less apples and more bananas) to maximise utility ( points) Ralketbia Oralketi39 . O Raketbi Ralketbi Ralketi 15 MacBook Pro Problem: Suppose the person faces the budget constraint given by the following equation: PA A+ PB B = 1 were A and B are the quantities of apples and bananas, respectively. Pa and Paare the prices of apples and bananas. The price of an apple is $0.4, and the price of a banana is $0.1. The person has an income I=$8. Part A - _Budget Constraint: Write down the budget constraint using the above information. (2 points) Part B - _Utility Function: If this person's utility function is given by U=VAB 1. What is this utility function called? (See page 71 in the book.) (2 points) 2. If A = 5 and B = 80, what will utility be? (2 points) 3. If A - 10, how many units of B should he consume to obtain the same level of utility you obtained in 1 above? (2 points) 4. If A - 20, how many units of B should he consume to obtain the same level of utility you obtained in 1 above? (2 points) Part C- _Marginal Rate of Substitution: Slope of Indifference Curve If the marginal rate of substitution is given by the following expression MRS=_MUMUA 5. Building on the Cobb-Douglas utility maximization (Page 7.) sheet posted on Blackboard, write down the expressions for MUn and MUA. (2 points) 6. Calculate the MRS. (2 points) Part D- _Price Ratio: Slope of Budget Constraint 7. What is the price ratio for the above budget constraint? Please note that Apples are on the y-axis and Bananas are on the x-axis. (2 points) Part E - Utility Maximization: MRS=Price Ratio 8. Based on your answers to parts 5 and 6, does this person maximize utility? Explain. (2 points) 9. Should this person buy more apples (and less bananas) or less apples (and more bananas) to maximize utility? (2 points) Step by Step Solution
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