Question

C= 550 + 0.6 Yd,

I= 1700,

G= 2350,

t= 0.10 Y

C=consumption, Yd= disposable income, I=investment,

G=government expenditure, t= tax rate​

Answer 1

Answer:

Econ 311: Intermediate Macroeconomics

Professor Christiano

Problem Set #1

Solutions

Problem #1:

C = 160 + 0.6YD

I = 150

G = 150

T = 100

(a) In equilibrium, Y = Z(Y ). So therefore

Y = c0 + c1(Y − T) + G + I

Y = 160 + 0.6(Y − 100) + 150 + 150

0.4Y = 160 + 150 + 150 − 60 = 400

Y = 1000

(b) YD = Y − T = 1000 − 100 = 900

(c) C = 160 + 0.6YD = 160 + 0.6(900) = 700

Problem #2:

(a) The equilibrium output we solved for before was Y = 100.

The total demand is C + G + I = 700 + 150 + 150 = 1000.

(b) Follow the same procedure that was used to solve Problem #1, part (a).

Y = c0 + c1(Y − T) + G + I

Y = 160 + 0.6(Y − 100) + 110 + 150

0.4Y = 160 + 110 + 150 − 60 = 360

Y = 900

Note also that this could be solved using the multiplier. The multiplier is

1

1−MPC = 1

1−.6 = 2.5. Therefore, multiply the change in government spending

(as that is going to affect demand directly) by the multiplier to get 2.5(−40) =

−100. Therefore, Y = 900.

C = 160 + 0.6YD = 160 + 0.6(900 − 100) = 640

I = 150

G = 110

Therefore, the total demand is Z = 900. Since we are in equilibrium and

therefore Y = Z(Y ), we should expect this to be true.

1(c) Private Savings are Y − C − T = 900 − 640 − 100 = 160.

Public Savings are T − G = −10

Total Savings are private plus public savings, which is equal to 150, also

equal to investment. In equilibrium, the demand is equal to the production,

therefore it stands to reason that investment will be adequately financed through

savings. If it weren’t, then we would not be in equilibrium.

Problem #3:

(a) An increase of 1 in G has a direct impact of 1 unit on demand, therefore

we take the change in demand and multiply it by the multiplier: 1

1−MPC = 1

1−c1 .

(b) A decrease of 1 in T has a direct impact of c1 unit on demand be-

cause it affects disposable income, only a fraction c1 of which will get used for

consumption. Therefore, the effect is c1

1

1−c1 .

(c) The decrease in T has an indirect affect on demand because only a part

of the tax reduction goes toward consumption. As c1 < 1, the effect of a unit

decrease in T is going to be smaller than the effect of a unit increase in G.

(d) Simply subtract the two effects : 1

1−c1 − c1

1

1−c1 = 1. Therefore, any 1

unit increase in G with a matching increase in T will have a 1 unit increase in

output.

(e) As the c1 terms disappear from the multiplier in part (d), changing the

MPC does not affect the multiplier in a balanced budget world.