Separating E_t(1+r_{t+1}^K)=E_t[((1)/(X_{t+1})alpha A_0(Y_{t+1})/(K_{t+1})+Q_(t+1)(1-delta))/(Q_t)]

independanteng

independanteng

Answered question

2022-10-31

Separating the log of a sum
I know there is no formula to separate the log of a sum, e.g. log ( X + Y ) into two parts, but are there any approximation rules that can allow me to achieve this objective?
E t ( 1 + r t + 1 K ) = E t [ 1 X t + 1 α A 0 Y t + 1 K t + 1 + Q t + 1 ( 1 δ ) Q t ]
Suppose we ignore the expectations operator for the moment.

Answer & Explanation

megagoalai

megagoalai

Beginner2022-11-01Added 22 answers

log ( X + Y ) = log ( X ) + log ( 1 + Y / X ), so if either X is small compared to Y or vice versa then you can approximate with a Taylor approximation.

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