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Prove that `E = A/(A-M)` where A = average revenue, M = marginal revenue, and E = elasticity.
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Average Revenue (AR): The revenue per unit sold, which is equal to the price (P) of the good:
`A = AR = (TR)/Q = P`
Marginal Revenue (MR): The additional revenue from selling one more unit:
`M = MR = (d(TR))/(dQ)`
TR = P ⋅ Q
Now, differentiate TR with respect to Q to get MR:
`MR = (d(PQ))/(dQ)`
Using the product rule of differentiation:
`MR = P+Qxx(dP)/(dQ)`
Elasticity is given by:
`E = -(dQ)/(dP)xxP/Q`
Take the reciprocal to get:
=> `(dP)/(dQ) = P/Qxx1/E`
Substitute into MR Expression
`MR = P+Qxx(dP)/(dQ) = P+Qxx(P/Qxx1/E)=P(1+1/E)`
Since A = P and M = MR, we rewrite:
`M=A(1+1/E) => M/A = 1+1/E=>M/A -1 = 1/E => 1/E = (M-A)/A => E= A/(A-I)`
`E = A/(A-M)`
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