Option (a) is correct answer
9.9. The following equations describe an economy: C = 2000 +0.75 (Y - T) Ip =...
2. (16 points) An economy is initially described by the following equations: C = 500+ 0.75(Y – T) I = 1,000 - 50r M/P=Y - 2007 G= 1,000 T= 1,000 M = 6,000 P=2 (a) Derive the equations for the IS curve and the LM curve. Note: Both equations should either show Y as a function of r only, or s as a function of Y only, like you've seen in class. (b) Solve for the equilibrium interest rate and...
The following equations describe an economy. Y=C+I+G C=50+0.75*(Y-T) I=150-10r (M/P)d=Y-50r G=250 T=200 M=3,000 P=4 Identify each of the variables, and briefly explain their meaning. From the above list, use the relevant set of equations to derive the IS curve. Graph the IS curve on an appropriately labeled graph. From the above list, sue the relevant set of equations to derive the LM curve. Graph the LM curve on the same graph you used in part b). What are the equilibrium...
Answer the question (c) 6. An open economy is described by the following equations C = 1000 + 0.6(Y-T) I 20, 000 200r G 5000 T = 5000 MD MS = 60.000 CA = NX = 2000-0.1Y-1000e KA = 5500+ 2(r-r") r"--10 (a) Derive the IS curve (Y as a function of r and e), LM curve (Y as a function of r) and the BP curve (r as a function of Y, e, and the capital mobility parameter z)...
Consider an economy in long run equilibrium described by the following equations: Y = C + I + G + NX Y = 5000 G = 1000 T = 1000 C = 250 + 0.75*( Y - T ) I = 1000 - 50*r NCO = 500 - 50*r Where r is the real interest rate (in % terms). Suppose G rises to 1250 without any change in T. Solve again for the equilibrium real interest rate and the rest...
2. A small open economy is described by the following equations: C=50+0.75(Y-T) 1- 200 20 NX-200-50 G- 200 T-200 M 3000 P-3 r' = 5 (a) Derive and graph the IS and LM* curves. (b) Calculate the equilibrium exchange rate, level of income, and net exports (c) Assume a floating exchange rate. Calculate what happens to the exchange rate, the level of income, net exports, and the money supply if the government increases spending by 50. Use a graph to...
An economy is described by the following equations: C= 1800 +0.6(Y-T) consumption function Ip = 900 planned investment G=1500 government spending NX = 100 net exports T= 1500 taxes Y* = 9000 potential output What is the output gap for this economy? If the natural rate of unemployment is 4 percent, what is the actual unemployment rate for this economy (use Okun's law)?
I need help with this. 1. In an economy which has a national income identity as the following; Y= C+ I + G + NX where C = 400 + 0.6 Yd,; 1 = 1000-4600 r, G-1240 T-200 +0.25 Y; NX-400-0.05Y-8 00 e ( ofcourse, Yd=Y-T) Where e- foreign currency/ domestic currency, and initially set at e 1.25+2.5R The money demand function is Md- 0.75 Y-7500 r, and money supply is set by the Central Bank at 450. All calculation...
A small open economy has the following relationships among its variables: C = 50+0.75 (Y-T) I=200-20r NX = 200-50e M/P = Y-40r G = 200 T= 200 M=3.000 P= 3 r* = 4 Q1. Please calculate the following: Equilibrium Exchange Rate Net Export Income Q2. What will be the impact of increase in G by 100 on the exchange rate, income, net exports, and the money supply?
Assume the following equations for the goods and money market of an economy: C = 250 + .8(Y-T) I = 100 - 50r T = G = 100. Ms = 200 Md = 0.2Y – 100r a) Write the equation of the IS curve for this economy. Is this upward or downward sloping? The IS curve is written as Y = _ +/- _r. (6 points) b) If T falls to 50 and everything else remains the same, write the...
Problem 4: (30 points) The following equations describe an economy (Think of C, I, G etc., as being measured in billions and i' as a percentage; a 6 percent interest rate implies i =6): C = 100+0.75(1-t)Y t=0.2 I= 150 - 301 NX = -100 G = 400 L = 2Y - 80i M B = 1600 a. What is the equation that describes the IS curve? (10 points) b. What is the general definition of the IS curve? (2...