Find the maximum profit and the number of units that must be produced and sold in...

Find the maximum profit and the number of units that must be produced and sold in...

Find the maximum profit and the number of units that must be produced and sold in order to yield the maximum profit. Assume that revenue, R(x) and cost C(x) of producing units in dollars. R(x)=4x, , C(x) = 0.05x ^ 2 + 0.8x + 5 What is the production for the maximum profit? units What is the profit?

assume that revenue, R(x), and cost, C(x), of producing x units are in dollars: R(x)=9x-2x^2 C(x)=x^3...

assume that revenue, R(x), and cost, C(x), of producing x units are in dollars: R(x)=9x-2x^2 C(x)=x^3 - 3x^2 +4x +1 how many units must be produced to maximize profit? what is the maximum profit as a dollar amount?

The monthly demand function for x units of a product sold by a monopoly is p...

The monthly demand function for x units of a product sold by a monopoly is p = 6,100 − 1/2x2  and its average cost is C = 3,030 + 2x dollars. Production is limited to 100 units. a) Find the profit function, P(x), in dollars. b) Find the number of units that maximizes profits. (Round your answer to the nearest whole number.) c) Find the maximum profit. (Round your answer to the nearest cent.)

The demand for cat food is given by D(x)=110e^−0.02x where x is the number of units...

The demand for cat food is given by D(x)=110e^−0.02x where x is the number of units sold and D(x) is the price in dollars. Find the revenue function. R(x)= Find the number of units sold that will maximize the revenue. Select an answer units or dollars   Find the price that will yield the maximum revenue. Select an answer units or dollars  

3. As the number of units sold increases, market price decreases (supply and demand).             Suppose...

3. As the number of units sold increases, market price decreases (supply and demand).             Suppose that p = 5000 – 0.75x , where p is the market price and x is the number of      units sold. Suppose further that the cost of producing x items is given by      C(x) = 3000 + 15x, and that the revenue from the sale of x units is given by      R(x) = 120x.     a. Express the cost as a...

Suppose a company has fixed costs of $48,000 and variable cost per unit of 2/5x +...

Suppose a company has fixed costs of $48,000 and variable cost per unit of 2/5x + 444 dollars, where x is the total number of units produced. Suppose further that the selling price of its product is 2468 −3/5x dollars per unit. (a) Find the break-even points. (Enter your answers as a comma-separated list.) x =      (b) Find the maximum revenue. (Round your answer to the nearest cent.) $   (c) Form the profit function P(x) from the cost and...

A video game console manufacturer determines that in order to sell x units of a new...

A video game console manufacturer determines that in order to sell x units of a new console, the price per unit, in dollars, must be p=1750-2x . The manufacturer also determines that the total cost of producing x units is given by (Cx)=22500+15x . Find the total revenue function R(x) ? Find the total profit function P(x) ? How many units must the company produce and sell in order to maximize profit? (Use the second derivative test to verify this...

Find the number of units x that produces a maximum revenue R. R = 180x2 −...

Find the number of units x that produces a maximum revenue R. R = 180x2 − 0.08x3 x =  units

The monthly demand function for a product sold by a monopoly is p = 2200 −...

The monthly demand function for a product sold by a monopoly is p = 2200 − (1/3)x^2 dollars, and the average cost is C = 1000 + 10x + x^2 dollars. Production is limited to 1000 units and x is in hundreds of units. (a) Find the quantity (in hundreds of units) that will give maximum profit. (b) Find the maximum profit. (Round your answer to the nearest cent.)

Suppose a company has fixed costs of $2400 and variable costs per unit of 15 16...

Suppose a company has fixed costs of $2400 and variable costs per unit of 15 16 x + 1700 dollars, where x is the total number of units produced. Suppose further that the selling price of its product is 1800 − 1 16 x dollars per unit. (a) Find the break-even points. (Enter your answers as a comma-separated list.) (b) Find the maximum revenue. (c) Form the profit function P(x) from the cost and revenue functions. Find the maximum profit....