Pregunta
The revenue (in dollars) from the sale of \( x \) units of a certain product can be described by \[ R(x)=100 x-0.01 x^{2} \text {. } \] Find the instantaneous rate of change of the marginal revenue.
Ask by Higgins Dawson. in the United States
Mar 08,2025
Solución de inteligencia artificial de Upstudy
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The instantaneous rate of change of the marginal revenue is \(-0.02\) dollars per unit.
Solución
We are given the revenue function:
\[
R(x)=100x-0.01x^2.
\]
**Step 1. Find the Marginal Revenue**
The marginal revenue is the derivative of the revenue function, \( R'(x) \). Differentiate \( R(x) \) with respect to \( x \):
\[
R'(x)=\frac{d}{dx}(100x-0.01x^2)=100-0.02x.
\]
**Step 2. Find the Instantaneous Rate of Change of the Marginal Revenue**
We now find the derivative of the marginal revenue, i.e., the derivative of \( R'(x) \). Differentiate \( R'(x)=100-0.02x \) with respect to \( x \):
\[
R''(x)=\frac{d}{dx}(100-0.02x)=-0.02.
\]
The result \( -0.02 \) is constant, meaning that the instantaneous rate of change of the marginal revenue is \(-0.02\) dollars per unit.
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Simplifique esta solución Mind Expander
The instantaneous rate of change of the marginal revenue can be found by deriving the revenue function \( R(x) \) with respect to \( x \). First, we find the marginal revenue \( R'(x) \): \[ R'(x) = \frac{d}{dx}(100x - 0.01x^2) = 100 - 0.02x. \] Now, to find the rate of change of this marginal revenue, we take the derivative of \( R'(x) \): \[ R''(x) = \frac{d}{dx}(100 - 0.02x) = -0.02. \] Thus, the instantaneous rate of change of the marginal revenue is \( -0.02 \) dollars per unit, indicating that for each additional unit sold, the marginal revenue decreases slightly.
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