Ch 2 supply demand and elasticity-2.2.ppt
ErginAkalpler
179 views
42 slides
Mar 28, 2023
Slide 1 of 42
1
2
3
4
5
6
7
8
9
10
11
12
13
14
15
16
17
18
19
20
21
22
23
24
25
26
27
28
29
30
31
32
33
34
35
36
37
38
39
40
41
42
About This Presentation
upply demand and elasticity-2.2.ppt
Slide Content
Demand and Supply cont2
Lecturer: AssocProf Akalpler
Lecturer: AssocProf Akalpler
2
Factors that determine price elasticity of
demand
Demand tends to be more price-elastic when
there are good substitutes for the good
Demand tends to be more price-elastic when
consumer expenditure in that good is large
Demand tends to be less price-elastic when
consumers consider the good as a necessity.
Factors that determine price elasticity of
demand
Demand tends to be more price-elastic when
there are good substitutes for the good
Demand tends to be more price-elastic when
consumer expenditure in that good is large
Demand tends to be less price-elastic when
consumers consider the good as a necessity.
3
In general, for the elasticity of “Y” with respect
to “X”:
Y,X= (% Y)=(Y/Y)=dY. X
(% X)(X/X) dX Y
In general, for the elasticity of “Y” with respect
to “X”:
Y,X= (% Y)=(Y/Y)=dY. X
(% X)(X/X) dX Y
4
Price elasticity of supply: measures curvature
of supply curve
(% Q
S
)= (Q
S
/Q
S
)= dQ
S
. P
(% P)(P/P) dPQ
S
Price elasticity of supply: measures curvature
of supply curve
(% Q
S
)= (Q
S
/Q
S
)= dQ
S
. P
(% P)(P/P) dPQ
S
5
6
Income elasticity of demandmeasures degree
of shift of demand curve as income changes…
(% Q
D
)= (Q
D
/Q
D
)= dQ
D
. I
(% I) (I/I) dIQ
D
Income elasticity of demandmeasures degree
of shift of demand curve as income changes…
(% Q
D
)= (Q
D
/Q
D
)= dQ
D
. I
(% I) (I/I) dIQ
D
7
Cross price elasticity of demandmeasures
degree of shift of demand curve when the price
of another good changes
(% Q
D
)= (Q
D
/Q
D
)= dQ
D
. P
0
(% P
0)(P
0/P
0)dP
0Q
D
Cross price elasticity of demandmeasures
degree of shift of demand curve when the price
of another good changes
(% Q
D
)= (Q
D
/Q
D
)= dQ
D
. P
0
(% P
0)(P
0/P
0)dP
0Q
D
8
Cross elasticity of demand
Cross elasticity of demand (XED) measures the percentage change in
quantity demand for a good after the change in price of another.
XED = % change in Q.D. good A
% change in P good B
Cross elasticity of demand for Coffee / Tea
For example: if there is an increase in the price of tea by 10%. and Q.D
of coffee increases by 2%, then XED = +0.2
Cross elasticity of demand
Cross elasticity of demand (XED) measures the percentage change in
quantity demand for a good after the change in price of another.
XED = % change in Q.D. good A
% change in P good B
Cross elasticity of demand for Coffee / Tea
For example: if there is an increase in the price of tea by 10%. and Q.D
of coffee increases by 2%, then XED = +0.2
9
Substitute goods
For goods which are substitutes, we expect to see a positive cross elasticity of
demand. If the price of Asda bread increases, people will buy more of an
alternative, such as Mother’s Pride bread.
Weak substitutes like tea and coffee will have a low cross elasticity of
demand
Alternative brands of chocolate, e.g. Mars vsCadbury quite similar, so will
have a higher cross elasticity of demand.
Substitute goods
For goods which are substitutes, we expect to see a positive cross elasticity of
demand. If the price of Asda bread increases, people will buy more of an
alternative, such as Mother’s Pride bread.
Weak substitutes like tea and coffee will have a low cross elasticity of
demand
Alternative brands of chocolate, e.g. Mars vsCadbury quite similar, so will
have a higher cross elasticity of demand.
10
Complements goods
These are goods which are used together, therefore the cross
elasticity of demand is negative. If the price of one goes up, you will
buy less of both goods.
For example, if the price of DVD players goes down, you will buy
more DVD players and also there will be a increase in demand for
DVD disks.
If the price of Samsung mobile phones goes down, we will also buy
more Samsung related phone apps.
Complements goods
These are goods which are used together, therefore the cross
elasticity of demand is negative. If the price of one goes up, you will
buy less of both goods.
For example, if the price of DVD players goes down, you will buy
more DVD players and also there will be a increase in demand for
DVD disks.
If the price of Samsung mobile phones goes down, we will also buy
more Samsung related phone apps.
11
oComplementary goods have a negative cross-price
elasticity: as the price of one good increases, the
demandfor the second good decreases.
oSubstitute goodshave a positive cross-price
elasticity: as the price of one good increases, the
demand for the other good increases.
oIndependent goods have a cross-price elasticity of
zero: as the price of one good increases, the
demandfor the second good is unchanged.
oComplementary goods have a negative cross-price
elasticity: as the price of one good increases, the
demandfor the second good decreases.
oSubstitute goodshave a positive cross-price
elasticity: as the price of one good increases, the
demand for the other good increases.
oIndependent goods have a cross-price elasticity of
zero: as the price of one good increases, the
demandfor the second good is unchanged.
12
substitute
A good with a positive cross elasticity of demand,
meaning the good's demand is increased when
the price of another is increased.
Complement
A good with a negative cross elasticity of
demand, meaning the good's demand is
increased when the price of another good is
decreased.
substitute
A good with a positive cross elasticity of demand,
meaning the good's demand is increased when
the price of another is increased.
Complement
A good with a negative cross elasticity of
demand, meaning the good's demand is
increased when the price of another good is
decreased.
13
COEFFICIENT ELASTICITY
The coefficient of elasticityis defined as the percentage change in quantity
demandeddivided by the percentage change in price.
DQ/Qt-1
DP/Pt-1
The first step is to find percentage changes. The percentage change in any variable
X is
usually definedas
Xnew-Xold
coefficient of elasticity = -----------
Xold
where Xnewis the NEW value of X and Xoldis the OLD value of X.
COEFFICIENT ELASTICITY
The coefficient of elasticityis defined as the percentage change in quantity
demandeddivided by the percentage change in price.
DQ/Qt-1
DP/Pt-1
The first step is to find percentage changes. The percentage change in any variable
X is
usually definedas
Xnew-Xold
coefficient of elasticity = -----------
Xold
where Xnewis the NEW value of X and Xoldis the OLD value of X.
14
For example, if price increased from 10 dollars to 12 dollars, the
percentage change, as usually defined, would be:
(12 -10) / 10 = 2/10 = 20 percent.
If at the same time the quantity demanded fell from 30 to 20 items, the
percentage changein quantity demanded --again using the usual definition of
percentage --would be
(20 -30) / 30 = -10/30 or -33 percent.
If we used the usual percentage change formula in our calculation of elasticity,
we would arrive at a coefficient of elasticityof:
-33/20 = -1.67
For example, if price increased from 10 dollars to 12 dollars, the
percentage change, as usually defined, would be:
(12 -10) / 10 = 2/10 = 20 percent.
If at the same time the quantity demanded fell from 30 to 20 items, the
percentage changein quantity demanded --again using the usual definition of
percentage --would be
(20 -30) / 30 = -10/30 or -33 percent.
If we used the usual percentage change formula in our calculation of elasticity,
we would arrive at a coefficient of elasticityof:
-33/20 = -1.67
15
MIDPOINT
The midpoint formula makes only one change to the calculation of percentages:
rather than dividing by the old value of X, it divides by the average value.
That we define the midpoint percentage change as
Xnew -Xold
-----------
Xaverage
Where X average is the sum of the old and new values divided by 2.
MIDPOINT
The midpoint formula makes only one change to the calculation of percentages:
rather than dividing by the old value of X, it divides by the average value.
That we define the midpoint percentage change as
Xnew -Xold
-----------
Xaverage
Where X average is the sum of the old and new values divided by 2.
16
Implementing this is straightforward. In our previous example:
The percentage change in price, calculated by the midpointformula would be
(12 -10) / 11 = 2/11 = 18.2 percent
since the average price is 11.
The percentage change in quantity, calculated bye the midpointformula would
be
(20 -30) / 25 = -10/25 = -40 percent
since the average quantity is 25.
And the coefficient of elasticity, calculated by the midpointformula is
-40/18.2 = -2.2
Implementing this is straightforward. In our previous example:
The percentage change in price, calculated by the midpointformula would be
(12 -10) / 11 = 2/11 = 18.2 percent
since the average price is 11.
The percentage change in quantity, calculated bye the midpointformula would
be
(20 -30) / 25 = -10/25 = -40 percent
since the average quantity is 25.
And the coefficient of elasticity, calculated by the midpointformula is
-40/18.2 = -2.2
COBWEB THEOREM
THE CLASSIC PAPER ON THE COBWEB THEOREM WAS
PUBLISHED BY EZEKIEL' IN 1938
17
THE CLASSIC PAPER ON THE COBWEB THEOREM WAS
PUBLISHED BY EZEKIEL' IN 1938
17
THE COBWEB THEORY WAS NAMED BY HUNGARIAN -BORN
ECONOMIST NICHOLAS KALDOR(1908-
1986).
•The Cobweb theory stems from a simple dynamic model of cyclical
demand, which involves time lag (between the response of production and
change in price (most often seen in agricultural sector)
•it is assumed that the demand for a good is a decreasing function of its
current price and
•its supply is an increasing function of last year’s price because of the time
taken to produce, plant and harvest products.
•Especially, this happens in agriculture because the price of agricultural
products has mostly an elastic demand. Not durable and need to be sold in
short period therefore price can be change depends on demand less
demand price reduced more demand price increase
18
ECONOMIST NICHOLAS KALDOR(1908-
1986).
•The Cobweb theory stems from a simple dynamic model of cyclical
demand, which involves time lag (between the response of production and
change in price (most often seen in agricultural sector)
•it is assumed that the demand for a good is a decreasing function of its
current price and
•its supply is an increasing function of last year’s price because of the time
taken to produce, plant and harvest products.
•Especially, this happens in agriculture because the price of agricultural
products has mostly an elastic demand. Not durable and need to be sold in
short period therefore price can be change depends on demand less
demand price reduced more demand price increase
18
IF ANY CHANGES IN THE CONDITIONS OF DEMAND AND/ OR
SUPPLY OCCUR, THEN THIS WILL LEAD TO CHANGES IN THE
EQUILIBRIUM VALUES OF PRICE AND QUANTITY.
if difference in price changes between first year product prices
(P0P1) and second year product prices (P0P2) is increasingly
decreased, then output and price tend to approach to the equilibrium
position. This has also meant that the slope of the demand curve is
smaller than the slope of the supply curve (Fig1.1).
P2 P1P0 P1
Slope of demand curve= --------< ------= Slope of supply curve
Q1 Q2 Q1 Q2
19
SUPPLY OCCUR, THEN THIS WILL LEAD TO CHANGES IN THE
EQUILIBRIUM VALUES OF PRICE AND QUANTITY.
if difference in price changes between first year product prices
(P0P1) and second year product prices (P0P2) is increasingly
decreased, then output and price tend to approach to the equilibrium
position. This has also meant that the slope of the demand curve is
smaller than the slope of the supply curve (Fig1.1).
P2 P1P0 P1
Slope of demand curve= --------< ------= Slope of supply curve
Q1 Q2 Q1 Q2
19
COBWEB THEOREM
In the opposite case, if the supply curve is more elastic than
the demand curve (absolute slope of supply curve is less than
demand curve), then output and price tend to move further away
from the equilibrium position.
Therefore, the slope of the demand curve is expected to be greater
than the slope of the supply curve, which means that price and
output tend to move further from the equilibrium position (Fig1.2).
P2 P1P0 P1
Slope of demand curve= --------< ------= Slope of supply curve
Q1 Q2 Q1 Q2
20
In the opposite case, if the supply curve is more elastic than
the demand curve (absolute slope of supply curve is less than
demand curve), then output and price tend to move further away
from the equilibrium position.
Therefore, the slope of the demand curve is expected to be greater
than the slope of the supply curve, which means that price and
output tend to move further from the equilibrium position (Fig1.2).
P2 P1P0 P1
Slope of demand curve= --------< ------= Slope of supply curve
Q1 Q2 Q1 Q2
20
COBWEB MODEL The case where supply and price have the same slope is shown in Figure 1.3.
P p p
P0 P1
P2 P0 p
P1 P2
Q2 Q1 Q 0 Q1 Q2 Q 0 Q1 Q2 Q
Figure1.1: Demand is price elastic Figure 1.2: Supply is price elastic Figure 1.3: Both have the same elasticity
(A Stable Cobweb) (An Unstable Cobweb)
Source: Sexton Robert: Microeconomics, 1995, p.282 (reproduced by the permission of author and publisher)
21
P p p
P0 P1
P2 P0 p
P1 P2
Q2 Q1 Q 0 Q1 Q2 Q 0 Q1 Q2 Q
Figure1.1: Demand is price elastic Figure 1.2: Supply is price elastic Figure 1.3: Both have the same elasticity
(A Stable Cobweb) (An Unstable Cobweb)
Source: Sexton Robert: Microeconomics, 1995, p.282 (reproduced by the permission of author and publisher)
21
22SentraEscortLS400735i
Sentra-6.5280.4540.0000.000
Escort0.078-6.0310.0010.000
LS4000.0000.001-3.0850.032
735i0.0000.0010.093-3.515
Source: Berry, Levinsohn and Pakes, “Automobile Price in Market
Equilibrium," Econometrica 63 (July 1995), 841-890.
Example:The Cross-Price Elasticity of Demand for Cars
(Above -1 is elastic below -1 is inelastic)
Sentra-6.5280.4540.0000.000
Escort0.078-6.0310.0010.000
LS4000.0000.001-3.0850.032
735i0.0000.0010.093-3.515
Source: Berry, Levinsohn and Pakes, “Automobile Price in Market
Equilibrium," Econometrica 63 (July 1995), 841-890.
Example:The Cross-Price Elasticity of Demand for Cars
(Above -1 is elastic below -1 is inelastic)
23ElasticityCoke Pepsi
Price
elasticity of
demand
-1.47 -1.55
Cross-price
elasticity of
demand
0.52 0.64
Income
elasticity of
demand
0.58 1.38
Source: Gasmi, Laffont and Vuong, "Econometric
Analysis of Collusive Behavior in a Soft Drink Market,"
Journal of Economics and Management Strategy 1
(Summer, 1992) 278-311.
Example:Elasticities of Demand for Coke and Pepsi
Price
elasticity of
demand
-1.47 -1.55
Cross-price
elasticity of
demand
0.52 0.64
Income
elasticity of
demand
0.58 1.38
Source: Gasmi, Laffont and Vuong, "Econometric
Analysis of Collusive Behavior in a Soft Drink Market,"
Journal of Economics and Management Strategy 1
(Summer, 1992) 278-311.
Example:Elasticities of Demand for Coke and Pepsi
24
1.Use Own Price Elasticities and Equilibrium
Price and Quantity
2.Use Information on Past Shifts of Demand and
Supply
1.Use Own Price Elasticities and Equilibrium
Price and Quantity
2.Use Information on Past Shifts of Demand and
Supply
25
1.Choose a general shape for functions
Linear
Constant elasticity
2.Estimate parameters of demand and supply
using elasticity and equilibrium information
We need information on ε, P* and Q*
1.Choose a general shape for functions
Linear
Constant elasticity
2.Estimate parameters of demand and supply
using elasticity and equilibrium information
We need information on ε, P* and Q*
26
Example: Linear Demand Curve
•Suppose demand is linear: Q
D
= a –bP
•Then, elasticity is
Q,P= -bP/Q where b =dq /dp
•ǫ = (p /q) .(dq /dp)
•Suppose P = 0.7 Q = 70
Q,P= -0.55
•finding a and b
•Notice that, if = -bP/Q b = -Q/P
•Then b = -(-0.55)(70)/(0.7) = 55
•…and a = Q
D
+ bP = (70)+(55)(0.7) = 108.5
•Hence Q
D
= 108.5 –55P
Example: Linear Demand Curve
•Suppose demand is linear: Q
D
= a –bP
•Then, elasticity is
Q,P= -bP/Q where b =dq /dp
•ǫ = (p /q) .(dq /dp)
•Suppose P = 0.7 Q = 70
Q,P= -0.55
•finding a and b
•Notice that, if = -bP/Q b = -Q/P
•Then b = -(-0.55)(70)/(0.7) = 55
•…and a = Q
D
+ bP = (70)+(55)(0.7) = 108.5
•Hence Q
D
= 108.5 –55P
27
Example: Constant Elasticity Demand Curve for finding
coefficient
•Suppose demand is: Q
D
= AP
ε
•Suppose again P = 0.7 Q = 70
Q,P= -0.55
•Finding deman equation
•Notice that, if Q
D
= AP
ε
thenA = QP
-ε
•Then A = (70)(0.7)
0.55
= 57.53
•Hence Q
D
= 57.53P
-0.55
Example: Constant Elasticity Demand Curve for finding
coefficient
•Suppose demand is: Q
D
= AP
ε
•Suppose again P = 0.7 Q = 70
Q,P= -0.55
•Finding deman equation
•Notice that, if Q
D
= AP
ε
thenA = QP
-ε
•Then A = (70)(0.7)
0.55
= 57.53
•Hence Q
D
= 57.53P
-0.55
28
Quantity
Price
0 70
.7•
Observed price and quantity
Example:Broilers in the U.S., 1990
Quantity
Price
0 70
.7•
Observed price and quantity
Example:Broilers in the U.S., 1990
29
Quantity
Price
0 70
.7•
Observed price and quantity
Linear demand curve
Example:Broilers in the U.S., 1990
Quantity
Price
0 70
.7•
Observed price and quantity
Linear demand curve
Example:Broilers in the U.S., 1990
30
Quantity
Price
0 70
.7•
Observed price and quantity
Constant elasticity demand curve
Example:Broilers in the U.S., 1990
Quantity
Price
0 70
.7•
Observed price and quantity
Constant elasticity demand curve
Example:Broilers in the U.S., 1990
31
Quantity
Price
0 70
.7•
Observed price and quantity
Constant elasticity demand curve
Linear demand curve
Example:Broilers in the U.S., 1990
Quantity
Price
0 70
.7•
Observed price and quantity
Constant elasticity demand curve
Linear demand curve
Example:Broilers in the U.S., 1990
32
1.A shift in the supply curve reveals the slope of
the demand curve
2.A shift in the demand curve reveals the slope of
the supply curve.
1.A shift in the supply curve reveals the slope of
the demand curve
2.A shift in the demand curve reveals the slope of
the supply curve.
33
Example: Shift in Supply Curve
•Old equilibrium point: (P
1,Q
1)
•New equilibrium point: (P
2,Q
2)
•Both equilibrium points would lie on the same (linear)
demand curve.
•Therefore, if Q
D
= a -bP
•b = dQ/dp = (Q
2–Q
1)/(P
2–P
1)
•a = Q
1-bP
1
Example: Shift in Supply Curve
•Old equilibrium point: (P
1,Q
1)
•New equilibrium point: (P
2,Q
2)
•Both equilibrium points would lie on the same (linear)
demand curve.
•Therefore, if Q
D
= a -bP
•b = dQ/dp = (Q
2–Q
1)/(P
2–P
1)
•a = Q
1-bP
1
34
Quantity
Price
0
Market Demand
Supply
Example:Identifying demand by a shift in supply
Quantity
Price
0
Market Demand
Supply
Example:Identifying demand by a shift in supply
35
Quantity
Price
0
Market Demand
New Supply
Old Supply
Example:Identifying demand by a shift in supply
Quantity
Price
0
Market Demand
New Supply
Old Supply
Example:Identifying demand by a shift in supply
36
Quantity
Price
0
Market Demand
New Supply
Q
2
•
•
Q
1
Old Supply
P
2
P
1
Example:Identifying demand by a shift in supply
Quantity
Price
0
Market Demand
New Supply
Q
2
•
•
Q
1
Old Supply
P
2
P
1
Example:Identifying demand by a shift in supply
37
This technique only works if the curve we want to estimate
stays constant.
Example: Shift in Supply Curve
•We require that the demand curve does not shift
This technique only works if the curve we want to estimate
stays constant.
Example: Shift in Supply Curve
•We require that the demand curve does not shift
38
Quantity
Price
0
Demand
Supply
Quantity
Price
0
Demand
Supply
39
Quantity
Price
0
Old Demand
New Supply
Old Supply
New Demand
Quantity
Price
0
Old Demand
New Supply
Old Supply
New Demand
40
Quantity
Price
0
Old Demand
New Supply
Q
2 =
•
•
Q
1
Old Supply
P
2
P
1
New Demand
Quantity
Price
0
Old Demand
New Supply
Q
2 =
•
•
Q
1
Old Supply
P
2
P
1
New Demand
41
1. First example of a simple microeconomic
model of supply and demand (two equations and an
equilibrium condition)
2. Elasticity as a way of characterizing demand and
supply
3. Elasticity changes as market definition
changes (commodity, geography, time)
1. First example of a simple microeconomic
model of supply and demand (two equations and an
equilibrium condition)
2. Elasticity as a way of characterizing demand and
supply
3. Elasticity changes as market definition
changes (commodity, geography, time)
42
4. Elasticity a very general concept
5. Back of the envelope calculations:
Estimating demand and supply from own price
elasticity and equilibrium price and quantity
Estimating demand and supply from information on
past shifts, assuming that only a single curve shifts
at a time.
4. Elasticity a very general concept
5. Back of the envelope calculations:
Estimating demand and supply from own price
elasticity and equilibrium price and quantity
Estimating demand and supply from information on
past shifts, assuming that only a single curve shifts
at a time.
Categories
GeneralDownload
Download Slideshow Get the original presentation fileQuick Actions
Statistics
- Views 179
- Slides 42
- Age 980 days
Related Slideshows
22
Pray For The Peace Of Jerusalem and You Will Prosper
RodolfoMoralesMarcuc
30 views
26
Don_t_Waste_Your_Life_God.....powerpoint
chalobrido8
32 views
31
VILLASUR_FACTORS_TO_CONSIDER_IN_PLATING_SALAD_10-13.pdf
JaiJai148317
30 views
14
Fertility awareness methods for women in the society
Isaiah47
29 views
35
Chapter 5 Arithmetic Functions Computer Organisation and Architecture
RitikSharma297999
26 views
5
syakira bhasa inggris (1) (1).pptx.......
ourcommunity56
28 views