The profit function for a certain commodity is P(x) = 170x − x2 − 1000. Find...

The profit function for a certain commodity is P(x) = 120x − x2 − 2000. Find...

The profit function for a certain commodity is P(x) = 120x − x2 − 2000. Find the level of production that yields maximum profit, and find the maximum profit.

The profit function for a company producing x thousand items of a certain good (in hundreds...

The profit function for a company producing x thousand items of a certain good (in hundreds of dollars) is given by P(x)= -1000 + 30x2 - x3, where 1 < x < 50. Find the number of items that should be produced in order to maximize the profit. What is the maximum profit?

The demand function for a certain commodity at a sales price of p dollars follows the...

The demand function for a certain commodity at a sales price of p dollars follows the function: d(p)=22000e^-0.5p -1 a) Determine the sales price at which there will be no demand for this commodity. Construct the elasticity of demand function for this commodity. Calculate and interpret the elasticity at a sales price of $2. Determine the maximum revenue generated by sales of this commodity.

A commodity has a demand function modeled by p = 103 − 0.5x and a total...

A commodity has a demand function modeled by p = 103 − 0.5x and a total cost function modeled by C = 30x + 31.75, where x is the number of units. (a) What price yields a maximum profit? (b) When the profit is maximized, what is the average cost per unit? (Round your answer to two decimal places.)

(1 point) The profit function for a computer company is given by P(x)=−x2+26x−13 where x is...

(1 point) The profit function for a computer company is given by P(x)=−x2+26x−13 where x is the number of units produced (in thousands) and the profit is in thousand of dollars. a) Determine how many (thousands of) units must be produced to yield maximum profit. Determine the maximum profit. (thousands of) units = maximum profit = thousand dollars b) Determine how many units should be produced for a profit of at least 40 thousand. more than [Answer] (thousands of) 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.)

Given the given cost function C(x)=2600+590x+1.2x2 and the demand function p(x)=1770 Find the production level that...

Given the given cost function C(x)=2600+590x+1.2x2 and the demand function p(x)=1770 Find the production level that will maximize profit.   

. For the function f(x) = x 1+x2 (a) find the intervals on which the function...

. For the function f(x) = x 1+x2 (a) find the intervals on which the function is increasing or decreasing (b) determine the points of local maximum and local minimum (c) find the asymptotes.

1. In this problem, p and C are in dollars and x is the number of...

1. In this problem, p and C are in dollars and x is the number of units. A monopoly has a total cost function C = 1000 + 216x + 0x2 for its product, which has demand function p = 648 ? 3x ? 2x2. Find the consumer's surplus at the point where the monopoly has maximum profit. (Round your answer to the nearest cent.) 2. In this problem, p is in dollars and x is the number of units....

Given the given cost function C(x)=5350+700x+1.5x2C(x)=5350+700x+1.5x2 and the demand function p(x)=2100p(x)=2100. Find the production level that...

Given the given cost function C(x)=5350+700x+1.5x2C(x)=5350+700x+1.5x2 and the demand function p(x)=2100p(x)=2100. Find the production level that will maximize profit.??