We are now going to go to the national income model, and add a financial market...
We are now going to go to the national income model, and add a financial market to it. In thefinancial markets, as a nation, we borrow to invest. This means that the demand for investment,I, is now endogenous, and is a function of the real interest rate,R0, which is exogenous. The15 system of equations is nowY“C`I`G0C“α`βpY ́Tq pαą0; 0ăβă1qT“γ`δYpγą0; 0ăδă1qI“ ́θR0pą0;θą0q.(a) Solve the system of equations and get the equilibrium expressions of the endogenous variablesin terms of the exogenous variables and the parameters.(b) Find the partial effects of government expenditure,G0, on both equilibrium income,Y ̊, andequilibrium consumption,C ̊. Can you sign them? Do they differ at all from those we gotin equations (9) and (12)?(c) Find the partial effects ofR0onY ̊andC ̊. Can you sign these partial effects
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We are now going to go to the national income model, and add a
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National Income Model - Application of Matrix Algebra Consider the following three-sector national income determination model:...
National Income Model - Application of Matrix Algebra Consider the following three-sector national income determination model: C = 30 + 0.75 (Y − T) T = 10 + 0.3Y I = 250 G = 100 Determine the exogenous and endogenous variables in the system. Solve the model presented in the above system of equations using the determinant and the inverse matrix method to find the equilibrium values of unknown variables. Verify your solution in part (b) above by solving these...
National Income Model - Application of Matrix Algebra Consider the following three-sector nationa...
National Income Model - Application of Matrix Algebra Consider the following three-sector national income determination model: C = 30 + 0.75 (Y − T) T = 10 + 0.3Y I = 250 G = 100 Determine the exogenous and endogenous variables in the system. Solve the model presented in the above system of equations using the determinant and the inverse matrix method to find the equilibrium values of unknown variables. Verify your solution in part (b) above by solving these...
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...
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;...
Consider National-Income Model: National Income: Consumption: Investment: Government Sector: Taxes: Y=C+I+G C = a + b...
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...
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+IG C ab (1-t) Y I d-e t-income tax rate i-rate of interest G Go Money Market: Md Ms Md kY - 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 the following values of parameters: a 10; b 0.7;t= 0.2; d 25; k 0.25;1 0.04; e...
please, i need answeer for all 4 questions Consider National-Income Model: National Income: Consumption: Investment: Government...
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...
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...
USU.US CUJL 1.ULTIUZULUV.CUIT 1. Points = 18 Consider National-Income Model: National Income: Consumption: Investment: Government Sector:...
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...
4. Points = 18. Consider IS-LM Model: Real Sector: Y=C+I+G C = a +b (1-t) Y...
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....
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...
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;...
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...
Consider IS- LM Model Real Sector: Y C+IG C ab (1-t) Y I d-e t-income tax rate i-rate of interest G Go Money Market: Md Ms Md kY - 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 the following values of parameters: a 10; b 0.7;t= 0.2; d 25; k 0.25;1 0.04; e...
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...
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...
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...
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