A company produces x widgets for a cost of C(x) dollars and sells them for 2280...

a) The Cost of selling widgets is given by the cost function c(x)= 4x+10. The price...

a) The Cost of selling widgets is given by the cost function c(x)= 4x+10. The price of each widget is given by the function p= 50-0.05x. A) How many widgets must be sold to maximize profit? B) What will be the Maximum Profit? C) What price per widget must be charged in order to maximize profit.

A). A company produces widgets: it is called widget incorporated. The widgets are produced at a...

A). A company produces widgets: it is called widget incorporated. The widgets are produced at a constant marginal and average cost of 100 coins per widget. The market demand is Q=80-0.2P. What is the equilibrium price if Widget Incorporated produces as a single price monopolist? Suppose the state adds a 20 coin tax per widget on the production of widgets. How much revenue will the tax raise? How much surplus value will be lost? How much profit will Widget Incorporated...

A company produces widgets at plants 1 and 2. It costs 135x1/2 dollars to produce x...

A company produces widgets at plants 1 and 2. It costs 135x1/2 dollars to produce x units at plant 1 and 260x1/3 dollars to produce x units at plant 2. Each plant can produce up to 1,000 units. Each unit produced can be sold for $12. At most 1,700 widgets can be sold. Determine how the company can maximize its profit.

A company making widgets has a price-demand equation p(x) = 400 − .02x where x is...

A company making widgets has a price-demand equation p(x) = 400 − .02x where x is the monthly demand and p is the price per widget and the cost equation is C(x) = 200x + 20, 000. Find the price that maximizes the profit and give the maximum profit.

A company manufactures microchips. Use the revenue function R(x) = x(75-3x) and the cost function C(x)...

A company manufactures microchips. Use the revenue function R(x) = x(75-3x) and the cost function C(x) = 125+14x to answer parts (A) through (D), where x is in millions of chips and R(x) and C(x) are in millions of dollars. Both functions have domain 1≤ x ≤ 20. (D) Find the value of x (to the nearest thousand chips) that produces the maximum profit. Find the maximum profit (to the nearest thousand dollars), and compare it to the maximum revenue....

A company has determined that its weekly total cost and total revenue (in dollars) for a...

A company has determined that its weekly total cost and total revenue (in dollars) for a product can be modeled by C(x) = 4000 + 30x R(x) = 300x -0.001x^2, where x is the number of items produced and sold. If the company can produce a maximum of 100,000 items per week, what production level will maximize profit?

A manufacturer estimates that its product can be produced at a total cost of C(x) =...

A manufacturer estimates that its product can be produced at a total cost of C(x) = 45000 + 150x + x 3 dollars If the manufacturer sells the product for $4600 per unit, determine the level of production x, that will maximize the profit. Round your answer to the nearest tenth of a unit. Use calculus to support your answer. Box both your profit function and your final answer.

JMC manufacturers sells 500 units per week at 29 dollars per unit. If the price is...

JMC manufacturers sells 500 units per week at 29 dollars per unit. If the price is reduced by one dollar, 20 more units will be sold. In addition, the cost function for JMC Manufacturers is also given by ?(?) = 40? + 10000 a. To maximize the revenue, find the following: I. [2 marks]. The number of units sold number of units sold. II. [2 marks]. The maximum revenue. b. [2 marks]. Find the value of x that maximizes the...

The weekly demand function for x units of a product sold by only one firm is...

The weekly demand function for x units of a product sold by only one firm is p = 400 − 1/2x dollars, and the average cost of production and sale is C = 100 + 2x dollars. (a) Find the quantity that will maximize profit. units (b) Find the selling price at this optimal quantity. $  per unit (c) What is the maximum profit? $ The weekly demand function for x units of a product sold by only one firm is...

If C(x) = 14000 + 600x − 0.6x2 + 0.004x3 is the cost function and p(x)...

If C(x) = 14000 + 600x − 0.6x2 + 0.004x3 is the cost function and p(x) = 1800 − 6x is the demand function, find the production level that will maximize profit. (Hint: If the profit is maximized, then the marginal revenue equals the marginal cost.)