Download Using Survey Data in Economic Modelling and Preparing for Analysis-

Survey
yes no Was this document useful for you?
   Thank you for your participation!

* Your assessment is very important for improving the workof artificial intelligence, which forms the content of this project

Document related concepts
no text concepts found
Transcript
Introduction to Economic
Modeling
D. K. Twerefou
Major Economic and CC Questions
• Why rate of growth of income are different
over time and in different countries?
• How do households and firms make their
consumption and investment decisions?
• What factors affect household decision to
adapt or not adapt to climate change
• What is the relationship between land value
and climatic variable?
• What is the relationship between plant
growth and changes in climatic variable?
2
What is an Economic Model?
• An abstract map of an economy
• Way of systematic thinking on
– how the value of one variable
determines the value of another
variable.
– How one set of variables determine
another set of variables
• Language that economists speak
3
Uses of Models
–Analysis of behaviour, facts
–Evaluation of a policy
–Analysis of impacts
–Analysis of the interrelationships
between variable
Components of a Model
– Endogenous variables
– Exogenous variables
– Parameters
– Assumptions
– Solutions
Example of a model-1
Y  0  1 X i  2 X 2  u
• Endogenous Variable -variables determined
within a given model -Y -endogenous determined by given values of X.
• Exogenous Variable - X1 and X2 - exogenous
determined outside the model.
• Parameters- constants whose values are fixed in
a given model. Eg. B0 ,B1 and B2 are parameters.
Example of a model-2
• Models are abstract representation of reality,
there is the need to make some assumptions
about the behaviour of the model.
• Why? necessary to ensure that model is concise
and yield meaningful analysis.
Representation of model
• Diagrams and equations
– linear or non-linear,
– Single or multiple equations,
– static or dynamic or strategic
Single Linear/ Non-linear
• A linear model is a model without polynomial
terms.
Y  0  1 X1  2 X 2  u
• A non-linear is a model expressed in terms of
polynomial
Y   0  1 X 1   2 X  u
2
2
Multiple (simultaneous) equations
• More than one equation with the
same variables.
• Y=C+I+G ;
• C = a0 + a1(Y-T)
Static or Dynamic
• Static model -Explains the behavior of a
phenomenon/activity within a specific point in
time.
• A dynamic model - explains the behaviour of a
phenomenon over a some period of time.
- model deforestation using a dynamic model. deforestation occurs over a period of time
• Yt= Ct + It + Gt
• Current consumption depends on past income
• Ct =200 + 0.8*(Yt-1 -Tt-1)
What determined GDP growth?
GDP Growth
30
20
10
0
Benin
Burkina
Faso
Cape
Verde
Ghana
Guinea Gambia Guinea Liberia
Bissau
Mali
Niger
Nigeria Senegal
-10
-20
-30
-40
-50
-60
1985
1990
1995
2000
2005
2009
Sierra
Leone
Togo
Cote
D'ivoire
Determinants of Economic Growth and
CO2 emissions
GDP  0  1Labor  2Capital  3 FDI  4ODA  u
What determined CO2 emissions?
Carbon Dioxide Emission
0.9
0.8
0.7
0.6
1985
0.5
1990
1995
0.4
2000
2005
0.3
0.2
0.1
0
Benin
Burkina Cape
Faso
Verde
Ghana Gambia Guinea Guinea Senegal Sierra
Bissau
Leone
Togo
Mali
Niger
Liberia Nigeria
Cote
d’ivoire
What determines CO2 emissions
• What factors account for the rate of carbon
emissions into the atmosphere in a given
country????
CO2  0  1GDP  2 Industrialization  3ind .Effic.  4 Pop  u
–
–
–
–
–
–
Linear or Non-linear?
Exogenous/Independent variables
Endogenous/Dependent Variables
Parameters
Dynamic or static?
Linear non –linear
Forest Area
60
50
40
1990
30
2000
2005
20
10
0
Benin
Burkina
Faso
Cape
Verde
Ghana
Gambia Guinea
Guinea Senegal
Bissau
Sierra
Leone
Niger
Liberia
Mali
Togo
Nigeria
Cote
d’ivoire
Determinants of Deforestation
• What factors account for the rate of
deforestation?
DEF  0  1GDP   2GDP 2  3 Agric _ landuse   4Urbanisation  u
• Why do we introduce a non-linear element
into the equation?????
Quiz
Identify the :
- endogenous variables
– exogenous variables
– Parameters
– Assumptions
– In the equations
Keynesian Static Model of National Income -1
Y=C+I+G ;
C = a0 + a1(Y-T)
Endogenous variables - Y, C
Exogenous variables - G, I
Parameters- a0 and a1.
C =200 + 0.8*(Y-T)
T =20; G=20; I =30
19
Keynesian Static Model of National Income -2
•
•
•
•
•
•
•
•
•
Solving the model:
Y = (a0 - a1T+I+G)/(1-a1)
Y =200 +0.8*(Y-T) +I +G
Y-0.8Y = 200 -0.8*(20) +30+20
0.2 Y =200-16 +50
Y =234/0.2 = 5*(234) = 1170
C = 200+0.8*(1170-20) = 1120
Checking the validity of the solution:
Y =1170 =1120+20+30 = C + I + G
MULTIPLIER = (1/(1-0.8))=5
Keynesian Dynamic Model of National Income
Yt= Ct + It + Gt
Current consumption depends on past income
Ct =200 + 0.8*(Yt-1 -Tt-1)
Tt-1 =20; Gt =20; It =30; Yt-1 = 500
Yt =200 +0.8*(500-20) +30 +20
Yt = 200 +384 +30+20
Yt =200+384 +50 = 634
Assume Tt, It , Gt remain same for all years
Yt+1 = 200 +0.8*(634-20) +30 +20 = 741
Solve this model for another 20 years.
21
Thanks you
Micro-Foundation to Macro Variables
General Equilibrium with a representative household and firm
Market p and w
such that
Y=C
LD = LS
LS +l = L
Households
(consumers)
Max U(C,L)
Wage payment, wL
Labour supply, L
Economy
(p, w, y, c, l, L)
Firms
(producers)
Max π(LS)
Payments for goods, p.y
Max U  c  l 1
l  LS  1
pc  wLS  
c  0; l  0; LS  0
Supply of Goods
Max   py  wLD
y  LD 

y  0; LD  0
23