C = -0.1733(x)2+ 424.81(x)+ 119,384 R= – 0.4375(x)2 +937.5(x) P= –0.2642(x)2+ 512.69(x) – 119,384 1.  Calculate how...

MarginalCost/Revenue/Profit “mC”/“mR”/“mP” values represent the changes in total Cost/Revenue/Profit “C”/”R”/”P” anticipated if the present sales volume...

MarginalCost/Revenue/Profit “mC”/“mR”/“mP” values represent the changes in total Cost/Revenue/Profit “C”/”R”/”P” anticipated if the present sales volume “x” changed by 1-unit from its current level.   The differential calculus approach to estimating a product line’s mC/mR/mP involves taking the 1stderivativeof the total C/R/Pequations, and then using these 1stderivativesin the process of solving for the appropriate “x” values.   C = -0.1733(x)2+ 424.81(x)+ 119,384 R= 937.5(x) – 0.4375(x)2 P= –0.2642(x)2+ 512.69(x) – 119,384. Make your estimates assuming each of the following two initial sales...

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?

Question 4 i. The profit for a product is given by π(x) = −1600 + 100x...

Question 4 i. The profit for a product is given by π(x) = −1600 + 100x − x^2, where x is the number of units produced and sold. How many units of the product must be sold to break-even? ii. Write the profit function in the form k − a(x − h)^2 . a. How many units of the product must be sold to maximise profit? b. What would the maximum profit be?

(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 total revenue function for a certain product is given by R=590x dollars, and the total...

The total revenue function for a certain product is given by R=590x dollars, and the total cost function for this product is C=15,000 +50x + x squared 2 dollars, where x is the number of units of the product that are produced and sold. a. Find the profit function. b. Find the number of units that gives maximum profit. c. Find the maximum possible profit.

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 x units are in dollars. ​R(x)=40x−0.1x^2, ​C(x)=4x+10 In order to yield the maximum profit of ​$__ , __ units must be produced and sold. (Simplify your answers. Round to the nearest cent as​ needed.)

The cost of producing a plastic toy is given by the function C(x) = 8x +...

The cost of producing a plastic toy is given by the function C(x) = 8x + 25, where x is the number of hundreds of toys. The revenue from toy sales is given by R(x) = −x2 + 120x − 360. Since profit = revenue − cost, the profit function must be P(x) = −x2 + 112x − 385 (verify). How many toys sold will produce the maximum profit? What is the maximum profit?

3. Complete the chart for predicted values based on the p(x) and c(x) functions. R(x) =...

3. Complete the chart for predicted values based on the p(x) and c(x) functions. R(x) = -0.35x^2 + 23.3x ......if you need to use it as well. Predicted Data Quantity p(x) C(x) R(x) Profit(x) 0 1 35x+23.35 C(x) = 23.35- 0.35x 2 3 4 5 6 7 8 9 10 11 12 13 14 15

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....

X Company's accountant has developed the following budgeted revenue and cost functions for 2020: R =...

X Company's accountant has developed the following budgeted revenue and cost functions for 2020: R = $30.12X C = $20.37X + $325,000 where R is revenue, C is total cost, and X is units sold. Assuming a tax rate of 30%, how many units must X Company sell in 2020 in order to earn $276,000 after taxes?