If the marginal revenue (MR) function is defined as the rate of cha...

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If the marginal revenue (MR) function is defined as the rate of change of total revenue (R) with respect to the quantity demanded at an instant. If the marginal revenue of a function is given by :
\[
\mathrm{MR}=25 e^{-x / 400}\left(1-\frac{x}{100}\right)
\]
find the total revenue function through integration, putting the condition that \( \mathrm{R}=6 \) when \( x=0 \).
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