Diogo has a utility function, U(q1, q2) = q1 0.8 q2 0.2, where q1 is chocolate...

Diogo’s utility function is U(q1, q2)=q10.75q20.25 where q1 is chocolate candy and q2 is slices of...

Diogo’s utility function is U(q1, q2)=q10.75q20.25 where q1 is chocolate candy and q2 is slices of pie. If the price of a chocolate bar, p1, is $1, the price of a slice of pie, p2, is $2, and Y is $80, a.Now suppose price of chocolate bar increases to $2. What will be Diogo’s optimal bundle now? b. Underneath the above diagram, draw Diogo’s demand curve. Does Diogo’s utility rise as you move up along his demand curve? What happens...

A consumer has utility function U(q1; q2) = 4(q1)^(.5) + q2, and income y = 10....

A consumer has utility function U(q1; q2) = 4(q1)^(.5) + q2, and income y = 10. Let the price of good 2 be p2 = 1, and suppose the price of good 1 increases from p1 = 1 to p1 = 2. Find the demand function for good 1.

A consumer has utility function U(q1, q2) = q1 + √q2, income Y= 8, and faces...

A consumer has utility function U(q1, q2) = q1 + √q2, income Y= 8, and faces prices p1= 4 and p2= 1. Find all consumption bundles that satisfy the necessary condition for a utility maximizing choice. Then determine which of these is optimal.

What is the money-metric utility function of a consumer with the utility function U(q1, q2,) =?q1...

What is the money-metric utility function of a consumer with the utility function U(q1, q2,) =?q1 +?q2 ? Use prices p1=p2= 2 to determine the money-metric utility function.

Jaydon’s utility is estimated to be U(q1,q2)=20q1^0.5q2^0.5. Jaydon has an income of 500, p1 = 10,...

Jaydon’s utility is estimated to be U(q1,q2)=20q1^0.5q2^0.5. Jaydon has an income of 500, p1 = 10, and p2 = 20. Suppose the price of good 2 decreased to 10, while p1 and income remain the same. Find the values of the total effect, the substitution effect, and the income effect of the change in p2 on the demand of good 1 and good 2.

A consumer has the quasi-linear utility function U(q1,q2) = 64q1^(1/2) + q2 Assume p2 = 1...

A consumer has the quasi-linear utility function U(q1,q2) = 64q1^(1/2) + q2 Assume p2 = 1 and Y = 100. Find the consumer's compensating and equivalent variations for an increase in p1 from 1 to 2.

A consumer has the quasi-linear utility function U(q1,q2) = 64q1^(1/2) + q2 Assume p2 = 1...

A consumer has the quasi-linear utility function U(q1,q2) = 64q1^(1/2) + q2 Assume p2 = 1 and Y = 100. Find the consumer's compensating and equivalent variations for an increase in p1 from 1 to 2.

A consumer has utility functionU(q1, q2) = (q1)^(2)+2(q2)^(2), income Y= 24, and faces prices p1= 1...

A consumer has utility functionU(q1, q2) = (q1)^(2)+2(q2)^(2), income Y= 24, and faces prices p1= 1 and p2= 3. Find all consumption bundles that satisfy the necessary condition fora utility maximizing choice. Then determine which of these is optimal.

Donna and Jim are two consumers purchasing strawberries and chocolate. Jim’s utility function is U(x,y) =...

Donna and Jim are two consumers purchasing strawberries and chocolate. Jim’s utility function is U(x,y) = xy and Donna’s utility function is U(x,y) = x2y where x is strawberries and y is chocolate. Jim’s marginal utility functions are MUX=y and MUy=x while Donna’s are MUX=2xy and MUy=x2. Jim’s income is $100, and Donna’s income is $150. What is the optimal bundle for Jim, and for Donna, when the price of strawberries rises to $3?

Consider a consumer with a utility function U = x2/3y1/3, where x and y are the...

Consider a consumer with a utility function U = x2/3y1/3, where x and y are the quantities of each of the two goods consumed. A consumer faces prices for x of $2 and y of $1, and is currently consuming 10 units of good X and 30 units of good Y with all available income. What can we say about this consumption bundle? Group of answer choices a.The consumption bundle is not optimal; the consumer could increase their utility by...