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Title: Returns to scale, homogeneity, and partial elasticities
Description: A summary on returns to scale, homogeneity and partial elasticities.
Description: A summary on returns to scale, homogeneity and partial elasticities.
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EECM 3714
Lecture 10: Unit 10
Returns to scale, homogeneity and partial elasticities
Renshaw, Ch
...
g
...
β’ Self-check: is π =
πΌπΎπ½
+ 1βπΌ
πΏπ½
1
ΰ΅π½
homogeneous?
EXAMPLE
Suppose that a firmβs production function is π = 10πΎ 0
...
8
...
Is this production function homogeneous? b
...
Does this production function exhibit decreasing returns to capital and labour (i
...
diminishing marginal productivity)?
SOLUTION
β’ Homogeneity:
β’ 10 ππΎ
0
...
8
= 10π0
...
3 π0
...
8 = 10π1
...
3 πΏ0
...
1 π
β’ This function is homogeneous: π = 1
...
1 βΉ 1
...
3 + 0
...
1 > 1 β increasing RTS
β’ Decreasing returns to labour:
β’
π2 π
ππΏ2
= β1
...
3 πΏβ1
...
1πΎ β1
...
8
β’ This is negative for all values of K and L πΎ β₯ 0, πΏ β₯ 0
EXAMPLE 2
Suppose π = 10[0
...
5 + 0
...
5 ]0
...
Does this function exhibit increasing, decreasing or constant returns to scale?
Solution:
β’ First, check if function is homogenous
...
5 ππΎ
0
...
5 ππΏ
0
...
5 =
β’ βΉ 10 π0
...
5πΎ 0
...
5πΏ0
...
5 π0
...
5 + 0
...
5 Γ πΏ0
...
5
0
...
25 Γ 0
...
5 + 0
...
5
β’ Function is homogenous
β’ Degree of homogeneity is π = 0
...
25 < 1, function exhibits decreasing returns to scale
0
...
25 π
PARTIAL ELASTICITIES
β’ Recall that if π¦ = π(π₯), then π π¦ =
ππ¦
ππ₯
Γ
π₯
π¦
β’ Now suppose that π§ = π(π₯, π¦)
...
r
...
x and y are:
ππ§
π₯
ππ§
π¦
β’ ππ₯π§ = ππ₯ Γ π§ ; and ππ¦π§ = ππ¦ Γ π§
β’ Note that these two elasticities can also be written as
divided by average (w
...
t
...
e
...
r
...
x)
Γ· , i
...
marginal function (w
...
t
...
r
...
y)
β’ PARTIAL DEMAND ELASTICITIES
β’ Suppose that demand is π π = π(π, ππ§ , π¦), where ππ§ , π¦ are the price of another product and the
income of consumers
β’ The other partial demand elasticities are:
β’ price elasticity of demand, π π
β’ cross-price elasticity of demand, π π§
β’ income elasticity of demand, π π¦
β’ Do examples 17
...
6
PRICE, CROSS PRICE AND INCOME ELASTICITY OF DEMAND
Price elasticity of demand is:
β’ ππ =
ππ
ππ
Γ
π
π
Income elasticity of demand is:
β’ ππ¦ =
ππ
ππ¦
Γ
π¦
π
Interpretation:
Interpretation:
β’ If π π > 1 β price elastic demand
β’ If π π¦ > 0, the good is a normal good
β’ If π π < 1 β price inelastic demand
β’ If π π = 1 β unit elastic demand
Cross-price elasticity of demand is:
β’ ππ§ =
ππ
πππ§
Γ
ππ§
π
Interpretation:
β’ If π π§ < 0, the two products are complements
β’ If π π§ > 0, the two products are substitutes
β’ If 0 < π π¦ < 1, the good is a necessity
β’ If π π¦ > 1, the good is a luxury
β’ If π π¦ < 0, the good is an inferior good
EXAMPLE 1
Suppose that the demand function is ππ = 1000 β 5π β ππ§2 + 0
...
Find and interpret the
β’ Price elasticity of demand
β’ Cross-price elasticity of demand
β’ Income elasticity of demand
SOLUTION, 1
π π = 1000 β 5π β ππ§2 + 0
...
π = 15; ππ§ = 20; π¦ = 100
...
005 100
β’ ππ =
ππ
ππ
π
π
Γ = β5 Γ
15
5525
3
= 5525
= β0
...
014 = 0
...
145
β’ β0
...
015π¦ 2 Γ
100
5525
= 0
...
715 > 0 β the product is a normal good;
β’ 2
...
715
EXAMPLE 2
Suppose ππ = 10 + 5Ξ€π + 2 ln π¦ β 2π 0
...
Also suppose that π = 2, π¦ = 100 and ππ§ = 3
...
Find and interpret:
β’ The price elasticity of demand
β’ The income elasticity of demand
β’ The cross-price elasticity of demand
SOLUTION
β’ π π = 10 + 5Ξ€π + 2 ln π¦ β 2π 0
...
1Γ3 = 11
...
2094
ππ
π
11
...
8788
β’ π π = β0
...
2094 < 1 βdemand is price
ππ
ππ π
π¦
2
100
2
=
Γ π= Γ
=
=
ππ¦
π
π¦
11
...
9394
β’ π π¦ = 0
...
1675
β’ π π¦ = 0
...
6π 0
...
1π
π§
=
Γ π = β0
...
0678
πππ§
π
11
...
9394
π ππ§ = β0
...
π΄ππΏ
This
ππ
πΎ
πππΎ
...
r
...
labour) = π πΏ = Γ =
ππΏ
π
shows the (percentage) change in production due to a 1% change in labour input
...
r
...
capital) = π πΎ = Γ =
ππΎ
π
shows the (percentage) change in production due to a 1% change in capital input
...
3 πΏ0
...
a
...
Solution
β’ ππΏ =
β’ πππΏ
πΏ
β’ π =
πππΏ
π΄ππΏ
ππ
= ππΏ
πππΏ
π΄ππΏ
π
= 8πΎ 0
...
2 and π΄ππΏ = πΏ = 10πΎ 0
...
2
=
8πΎ0
...
2
10πΎ0
...
2
= 0
...
8%
...
7 πΏ0
...
7 πΏ0
...
7 πΏ0
...
7πΏ0
...
3
β’ This means that if capital input increases by 1%, production will increase by 0
...
(note that for CobbDouglas, this is equal to πΌ)
PARTIAL ELASTICITIES AND LOGS
β’ Recall from ch
Title: Returns to scale, homogeneity, and partial elasticities
Description: A summary on returns to scale, homogeneity and partial elasticities.
Description: A summary on returns to scale, homogeneity and partial elasticities.