Answer:
The increase in cost is $300,000.
Explanation:
The marginal cost function (C'(x)) is:
[tex]C'(x) = 700 -\frac{x}{3}[/tex]
For 0≤ x ≤ 900.
Integrating the marginal cost function and evaluating it in the interval of 300 to 900 bikes, gives us the increase in cost of going from a production level of 300 bikes per month to 900 bikes per month:
[tex]\int\limits^{900}_{300} {C'(x)}dx=\int\limits^{900}_{300} {(700 -\frac{x}{3})}dx\\C (x) = 700x - \frac{x^2}{6} +c\\ C(900) - C(300) = 700*900 - \frac{900^2}{6} +c - (700*300 - \frac{300^2}{6} +c)\\ C(900) - C(300) = 495,000 - 195,000\\C(900) - C(300) = 300,000[/tex]
The increase in cost is $300,000.
