Revenue for the numbers of units X is given by R=36X^2-0.05X^3 Find the number of units...

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

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?

The marginal revenue of a company is given by r(x)=x^3-0.3x^2+0.1 and the marginal cost is given...

The marginal revenue of a company is given by r(x)=x^3-0.3x^2+0.1 and the marginal cost is given by c(x)=x\sqrt{-x^2+100} both measured in thousands of dollars per hundred units (x) produced. Find the total profit for x=1 to x=4 hundred units produced.

A company's revenue from selling x units of an item is given as R=1900x−2x^2. If sales...

A company's revenue from selling x units of an item is given as R=1900x−2x^2. If sales are increasing at the rate of 50 units per day, how rapidly is revenue increasing (in dollars per day) when 360 units have been sold? ? dollars per day The cost of producing x units of stuffed alligator toys is C(x)=0.002x^2+7x+5000. Find the marginal cost at the production level of 1000 units. ? dollars/unit Suppose a product's revenue function is given by R(q)=−7q^2+600q ,...

The revenue R (in dollars) from renting x apartments can be modeled by R = 2x(500...

The revenue R (in dollars) from renting x apartments can be modeled by R = 2x(500 + 36x − x2). (a) Find the marginal revenue, in dollars, when x = 14. $ (b) Find the additional revenue, in dollars, when the number of rentals is increased from 14 to 15. $ Correct: Your answer is correct. (c) Compare the results of parts (a) and (b).The revenue R (in dollars) from renting x apartments can be modeled by R = 2x(500...

Total revenue is in dollars and x is the number of units. Suppose that the total...

Total revenue is in dollars and x is the number of units. Suppose that the total revenue function for a commodity is R = 81x − 0.02x2. (a) Find R(100). $ Tell what it represents. The actual revenue of the 100th unit is this amount. The revenue decreases by about this amount when the number of units is increased from 100 to 101.     100 units produce this amount of revenue. 101 units produce this amount of revenue. The revenue increases...

A company's revenue from selling x units of an item is given as R=1600x−x^2 If sales...

A company's revenue from selling x units of an item is given as R=1600x−x^2 If sales are increasing at the rate of 40 units per day, how rapidly is revenue increasing (in dollars per day) when 250 units have been sold? ___ dollars per day

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  

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?

5. Find the open intervals on which f(x) =x^3−6x^2−36x+ 2 is increasing, as well as the...

5. Find the open intervals on which f(x) =x^3−6x^2−36x+ 2 is increasing, as well as the open intervals on which f(x) is decreasing. - How do you know when the function is increasing or decreasing? Please show all work. 6. Find the open interval on which f(x) =x^3−6x^2−36x+ 2 has upward concavity, as well as the open intervals on which f(x) has downward con-cavity. - How do you know if a function has an upward concavity or downward concavity? Please...