a company manufactures and sells x cheap radios per month. The cost $C, involved in producing...

11) A company manufactures and sells x e-book readers per month. The monthly cost and price-demand...

11) A company manufactures and sells x e-book readers per month. The monthly cost and price-demand equations are : ?(?)=350?+50,000 ????=500―0.025??ℎ??? 0≤?≤20,000A) Find the maximum revenue (Remember: ) What is the maximum monthly profit? How much should the company charge for each reader? (Remember: B)_____________________________?(?)=?(?)―?(?))

A firm producing lawn chairs has fixed cost of $700.00 per week. The variable cost is...

A firm producing lawn chairs has fixed cost of $700.00 per week. The variable cost is $8.00 per chair, and the revenue per chair is $18.00. A. Write the equation that represent the cost per week, C, for producing x lawn chairs B. Write the equation that represents the revenue per week, R, from selling x lawn chairs. C. What is the cost of produxing 100 lawn chairs in a week (show work) D. What is the revenue from selling...

A company determines its total revenue and total cost functions for producing and selling x items...

A company determines its total revenue and total cost functions for producing and selling x items are given by R(x)=600x−2x2, andC(x)=200+10x. If the company produces and sells 2 additional items every day (in other words, dxdt=2), what is the rate of change of profit with respect to time when they've produced and sold 10 items?

An office supply company manufactures and sells X permanent markers per year at a price of...

An office supply company manufactures and sells X permanent markers per year at a price of P €/unit. The Price/Demand equation for the markers is: P= 7 − 0.002X The total cost of manufacturing is: C(X) = 1000 + 2X PROFIT FUNCTION = 5X -1000 - 0.002X2 PROFIT MAXIMIZATION = 1250 MARKERS , PRICE= 4.5 QUESTION: Draw a graph representing the above-mentioned situation.

If company A manufactures t-shirts and sells them to retailers for US$9.80 each. It has fixed...

If company A manufactures t-shirts and sells them to retailers for US$9.80 each. It has fixed costs of $2625 related to the production of the t-shirts, and the production cost per unit is US$2.30. Company B also manufactures t-shirts and selll them directly to consumers. The demand for its product is p = 15 − x 125 , its production cost per unit is US$5.00 and its fixed cost are the same as for company A . (i) Derive the...

The​ cost, in​ dollars, of producing x belts is given by Upper C left parenthesis x...

The​ cost, in​ dollars, of producing x belts is given by Upper C left parenthesis x right parenthesis equals 805 plus 18 x minus 0.075 x squared. The​ revenue, in​ dollars, of producing and selling x belts is given by Upper R left parenthesis x right parenthesis equals 31 x Superscript six sevenths . Find the rate at which average profit is changing when 676 belts have been produced and sold. When 676 belts have been​ produced, the average profit...

An office supply company manufactures and sells X permanent markers per year at a price of...

An office supply company manufactures and sells X permanent markers per year at a price of P €/unit. The Price/Demand equation for the markers is: P = 7 − 0.002X. The total cost of manufacturing is: C(X) = 1000 + 2X. Revenues function = R(x)=7X - 0.002X2. Profit function = P(X) = 5X – 0.002X2 - 1000 Government decides to tax the company in 3€ for each marker produced. 1. Write new cost function 2. Write new profit function 3....

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....

For a company that produces and sells x number of chairs per month, the profit function...

For a company that produces and sells x number of chairs per month, the profit function is given by G (x) = -0.02x^2 + 200x - 40,000 and the marginal profit function by G' (x) = -0.04x + 200. So, we can conclude that G' (8,900) =-156 can be interpreted as follows: a. The company has a loss of approximately $ 156 when 8,900 chairs are produced and sold. b. The company has a loss of approximately $ 156 when...

Pulsar manufactures a series of 20-in. flat-tube LCD televisions. The quantity x of these sets demanded...

Pulsar manufactures a series of 20-in. flat-tube LCD televisions. The quantity x of these sets demanded each week is related to the wholesale unit price p by the equation p = −0.059x + 290 The weekly total cost incurred by Pulsar for producing x sets is C(x) = 0.000006x3 - 0.07x2 + 410x + 69000. (a) Find the revenue function R. R(x) = Find the profit function P. P(x) = .011x2−120x−0.000006x3−69000    (b) Find the marginal cost function C '....