Answer to Question #320090 in Calculus for boooo

Question #320090

A company determines that in order to sell x

items the price per item, in dollars, must be p(x)=1830

p(x)=1830. The company also determines that the total cost, in dollars, to produce x x

items is given by C(x)=3100+610x+1.5x2C(x)=3100+610x+1.5x2.

How many items must the company produce and sell in order to maximize profit?

The company must produce and sell

Expert's answer

"xp\\left( x \\right) -C\\left( x \\right) \\rightarrow \\max \\\\-\\left( 3100+610x+1.5x^2 \\right) +1830x\\rightarrow \\max \\\\-1.5x^2+1220x-3100\\rightarrow \\max \\\\x_{\\max}=\\frac{1220}{2\\cdot 1.5}=406.667\\approx 407\\\\The\\,\\,company\\,\\,should\\,\\,produce\\,\\,407 items"

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Answer to Question #320090 in Calculus for boooo

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