A firm produces a product that has the production cost function C(x)equals=220220xplus+81958195 and the revenue function R(x)equals=275275x. No more than 162162 units can be sold. Find and analyze the break-even quantity, then find the profit function.
A firm produces a product that has the production cost function C(x)equals=220220xplus+81958195 and the revenue function...
The revenue function R(x) and the cost function C(x) for a particular product are given. These functions are valid only for the specified range of values. Find the number of units that must be produced to break even. R(x)=200x- x2, C(x)=20x+6500, 0 less than or equals X less than or equals 100.The manufacturer must produce ---- units to break even.
The point at which a company cost equals its revenue is its break even point. C represents the cost, in dollars of of x units of a product abd R represents the revenue in dollars from the sale of x units. Find the number of units that must be produced and sold in order to break even. That is find the value of x for which C=R. C=13x+42,000 and R = 16x. How many units must be produced and sold...
The revenue function R(x) and the cost function C(x) for a particular product are given. These functions are valid only for the specified range of values. Find the number of units that must be produced to break even. R(x) = 200x - 2x2 ; C(x) = - x2 + 5x + 8450 ; 0 ≤ x ≤100 The manufacturer must produce --------------- units to break even.
Suppose you are the manager of a firm. The accounting department has provided cost estimates, and the sales department sales estimates, on a new product. Analyze the data they give you, determine what it will take to break even, and decide whether to go ahead with production of the new product. The product has a production cost function C(x)-90x + 4,410 and a revenue function R(x) 120x. The break-even quantity isunits
The revenue function R(x) and the cost function C(x) for a particular product are given. These functions are valid only for the specified range of values. Find the number of units that must be produced to break even Rx)200x-x2 C)5x+8750:0sxs100 The manufacturer must produce units to break even.
The revenue and cost functions for a particular product are given below. The cost and revenue are given in dollars, and x represents the number of unitsR(x)=-0.8x2+608xC(x)=256x+36720(a) How many items must be sold to maximize the revenue?(b) What is the maximum revenue?(c) Find the profit function.(d) How many items must be sold to maximize the profit?(e) What is the maximum profit?(f) At what production level(s) will the company break even on this product?
Given the cost function C(x) and the revenue function R(x), find the number of the units x that must be sold to break even. C(x)=1.4+4800 and R(x)=1.7x How many units must be produced and sold in order to break even?
The point at which a company's costs equals its revenue is the break-even. C represents cost, in dollars, of x units of a product. R represents the revenue, in dollars, for the sale of x units. Find the number of units that must be produced and sold in order to break even. C = 1 5x + 1 2,000 R = 18x-6000 OA. 545 OB. 12,000 C. 6000 D 800
Given the cost function, C(x), and the revenue function, R(x), find the number of units x that must be sold to break even. C(x) = 81x + 1750 R(x) = 106x
The total revenue function for a product is given by R=655x dollars, and the total cost function for this same product is given by C=19,250+70x+x2, where C is measured in dollars. For both functions, the input x is the number of units produced and sold. a. Form the profit function for this product from the two given functions. b. What is the profit when 25 units are produced and sold? c. What is the profit when 43 units are produced...