Question #145247
A firm's production function is given by Q= L2e^-0,01L

Find the value of L that maximizes the average product of labour
1
Expert's answer
2020-11-20T07:23:52-0500

The average product of labour is:

APL=Q/L=L×e0.01L.APL = Q/L = L×e^{-0.01L}.

APL is maximized if APL'(L) = 0, so:

(L×e0.01L)=e0.01L0.01L×e0.01L=e0.01L×(10.01L)=0,(L×e^{-0.01L}) ' = e^{-0.01L} - 0.01L×e^{-0.01L} = e^{-0.01L}×(1 - 0.01L) = 0,

L = 100 or

e0.01L=0e^{-0.01L} = 0, which has no roots.


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