THE EMPLOYMENT FUNCTION
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That is to say, the sum of the elasticities of price and ofoutput in response to changes in effective demand(measured in terms of wage-units) is equal to unity.Effective demand spends itself, partly in affecting out-put and partly in affecting price, according to this law.
If we are dealing with industry as a whole and areprepared to assume that we have a unit in which outputas a whole can be measured, the same line of argumentapplies, so that e' v + e 0 = 1, where the elasticities withouta suffix r apply to industry as a whole.
Let us now measure values in money instead ofwage-units and extend to this case our conclusions inrespect of industry as a whole.
If W stands for the money-wages of a unit of labourand p for the expected price of a unit of output as a
whole in terms of money, we can write eJ = for
pdT)
the elasticity of money-prices in response to changes ineffective demand measured in terms of money, and
' for the elasticity of money-wages in re-
WDy
sponse to changes in effective demand in terms ofmoney. It is then easily shown that6 $ = 1 — € q (^1 — £«;)•
This equation is, as we shall see in the next chapter,a first step to a generalised Quantity Theory of Money.
1 For, since p =f w .W and D=D„.W, we have
a/.=wa/„+4aw
= W.e' ^-AD„ + 4 aWD w W
-''•S( AD -
D
AW
-w AW
= f '4 AD + AwL( r _ e' v ),
_da/ D .A\W?,’"TAD B+ />AD W 1 *'
=e'„+e a (i- e' v )
= 1 - e a (i - eJ).
so that