Consider IS- LM Model Real Sector: Y C+IG C ab (1-t) Y I d-e t-income tax...
Consider IS-LM Model: Real Sector: Y=C+I+G C=a+b (1-t) Y I=d-ei G=GO t-income tax rate i- rate of interest Money Market: Ma=M Ma=ky-li M = Mo Mo - exogenous stock of money 1) Setup the system of solutions in general form, with variables vector in the following order: Y, C, I, i; (6 points) 2) Now, suppose we have the following values of parameters: a= 10; b = 0.7; t = 0.2; d = 25; k = 0.25; 1 = 0.04;...
4. Points = 18. Consider IS-LM Model: Real Sector: Y=C+I+G C = a +b (1-t) Y I=d-ei G=Go t-income tax rate i-rate of interest Money Market: Ma=M Ma= kY-li Mg = Mo Mo - exogenous stock of money 1) Setup the system of solutions in general form, with variables vector in the following order: Y, C, I, i; (6 points) 2) Now, suppose we have the following values of parameters: a = 10; b = 0.7; t = 0.2; d...
it is all basicly one question, please answer them all! thank you! 4. Points = 18. Consider IS-LM Model: Real Sector: Y=C+I+G C = a + b (1-t) Y I=d-ei G = Go t-income tax rate i-rate of interest Money Market: Ma=M Ma=KY -li Ms = Mo Mo - exogenous stock of money 1) Setup the system of solutions in general form, with variables vector in the following order: Y, C, I, i; (6 points) 2) Now, suppose we have...
USU.US CUJL 1.ULTIUZULUV.CUIT 1. Points = 18 Consider National-Income Model: National Income: Consumption: Investment: Government Sector: Taxes: Y=C+I+G C = a + b (Y-T) I=k+rY G=Go T=f+jY 0<b<1 0<r<1 a> 0 in mln dollars; k>0 in mln dollars; Go >O in mln dollars f> 0 in mln dollars; 0<j<1 1) Discuss in words the meaning of each of the equations in the model (3 points); 2) Find the equilibrium level of GDP (Y) in reduced form (3 points); 3) If...
please, i need answeer for all 4 questions Consider National-Income Model: National Income: Consumption: Investment: Government Sector: Taxes: Y=C+I+G C = a + b (Y-T) I=k+rY G=Go T=f+jY 0<b<1 0<x<1 a> 0 in mln dollars; k>0 in mln dollars; Go > in mln dollars f> 0 in mln dollars; 0<j<1 1) Discuss in words the meaning of each of the equations in the model (3 points); 2) Find the equilibrium level of GDP (Y) in reduced form (3 points); 3)...
1. Points = 18. Consider National-Income Model: National Income: Consumption: Investment: Government Sector: Taxes: Y=C+I+G C = a + b (Y-T) I=k+rY G=Go T=f+jY 0<b<1 (<r<1 a> 0 in mln dollars; k>0 in mln dollars; Go >O in mln dollars p> 0 in mln dollars; 0<j<1 1) Discuss in words the meaning of each of the equations in the model (3 points); 2) Find the equilibrium level of GDP (Y) in reduced form (3 points); 3) If we know the...
Consider National-Income Model: National Income: Consumption: Investment: Government Sector: Taxes: Y=C+I+G C = a + b (Y-T) I=k+rY G=GO T=f+jY <b<1 (<r<1 a>0 in mln dollars; k>O in mln dollars; Go >O in mln dollars fo in mln dollars; 0<j<1 1) Discuss in words the meaning of each of the equations in the model (3 points); 2) Find the equilibrium level of GDP (Y*) in reduced form (3 points); 3) If we know the parameters of the system, find the...
Macroeconomics model usually wants to model Output Y, Consumption C, Investment I, and Interest Rate r taking as given Government spending Go, taxes To and Money in the economy Mo. The variables Y, C, I, and r are therefore endogenous while Go, Mo and To are exogenous. a,b,c,d,e,f are parameters. (i) Write the following system using matrix notation (5pts) (ii) Find the determinant of the coefficient matrix (the A matrix) (5 pts) (iii) Let a,b,c,d,e,f to be equal to 1...
Macroeconomics model usually wants to model Output Y, Consumption C, Investment I, and Interest Rate r taking as given Government spending Go, taxes To and Money in the economy Mo. The variables Y, C, I, and r are therefore endogenous while Go, Mo and To are exogenous. a,b,c,d,e,f are parameters. (i) Write the following system using matrix notation (5pts) (ii) Find the determinant of the coefficient matrix (the A matrix) (5 pts) (iii) Let a,b,c,d,e,f to be equal to 1...
4. Consider the IS-LM model: Y =C+I+G C = co + C(Y - T) - Car T = to +tįY I = io ti Y - ir M = m;Y + mo - mar, where the endogenous variables of the system are Y and r. The simultaneous solution of the first four equations defines the set of values of Y and r that establishes equilibrium in the goods market. While the fifth equation defines the values of Y and r...