Question

In: Math

Let R(x), C(x), and P(x) be, respectively, the revenue, cost, and profit, in dollars, from the...

Let R(x), C(x), and P(x) be, respectively, the revenue, cost, and profit, in dollars, from the production and sales of x items. If R(x) = 6x and C(x) = 0.004x^2+2.7x+70, find each of the following:

a) P(x) =

b) R(150), C(150), and P(150)

c)R'(x), C'(x), P'(x)

d) R'(150), C'(150), and P'(150)

Solutions

Expert Solution

milcah answered 2 years ago
Next > < Previous

Related Solutions

Let R(x), C(x), and P(x) be, respectively, the revenue, cost, and profit, in dollars, from the...
Let R(x), C(x), and P(x) be, respectively, the revenue, cost, and profit, in dollars, from the production and sale of x items. If R(x) = 6x and C(x) = 0.005x^2 + 2.5x + 40, find each of the following. a) P(x) b) R(150), C(150), and P(150) c) R'(x), C'(x), and P'(x) d) R'(150), C'(150), and P'(150)
Profit = Revenue - Cost P(x) = R(x) - C(x) Given: R(x) = x^2 - 30x...
Profit = Revenue - Cost P(x) = R(x) - C(x) Given: R(x) = x^2 - 30x Given: C(x) = 5x + 100 X is hundreds of items sold / P, R, C are in hundreds of dollars (1) Determine the Initial Cost? (2) Determine the maximum Profit and number of items required for that profit? (3) Determine the maximum Revenue and number of items required for that revenue? (4) Find the break even points, P(x) = 0. What do the...
Solve the problem. Let C(x) be the cost function and R(x) the revenue function. Compute the...
Solve the problem. Let C(x) be the cost function and R(x) the revenue function. Compute the marginal cost, marginal revenue, and the marginal profit functions. C(x) = 0.0004x3 - 0.036x2 + 200x + 30,000 R(x) = 350x Select one: A. C'(x) = 0.0012x2 - 0.072x + 200 R'(x) = 350 P'(x) = 0.0012x2 - 0.072x - 150 B. C'(x) = 0.0012x2 + 0.072x + 200 R'(x) = 350 P'(x) = 0.0012x2 + 0.072x + 150 C. C'(x) = 0.0012x2 -...
1)The total profit​ P(x) (in thousands of​ dollars) from a sale of x thousand units of...
1)The total profit​ P(x) (in thousands of​ dollars) from a sale of x thousand units of a new product is given by ​P(x)= ln (-x3+9x2+48x+1) (0≤x≤​10). ​a) Find the number of units that should be sold in order to maximize the total profit. ​b) What is the maximum​ profit? 2)Suppose that the cost function for a product is given by C(x)=0.003x3+9x+9,610. Find the production level​ (i.e., value of​ x) that will produce the minimum average cost per unit C(x). a)The...
Profit Analysis The same multimedia company now estimates their cost and revenue functions to be: C(x)...
Profit Analysis The same multimedia company now estimates their cost and revenue functions to be: C(x) = 11.2x + 48,000   and    R(x) = 18.26x. Find the profit of manufacturing and selling 9,633 units.  (Round to two decimal places).
Let L = {x = a r b s c t | r + s =...
Let L = {x = a r b s c t | r + s = t, r, s, t ≥ 0}. Give the simplest proof you can that L is not regular using the pumping lemma.
Let V = {P(x) ∈ P10(R) : P'(−4) = 0 and P''(2) = 0}. If V=...
Let V = {P(x) ∈ P10(R) : P'(−4) = 0 and P''(2) = 0}. If V= M3×n(R), find n.
c(x)=74,000+60x and P(x)=300-x/30, 0<x<9000. a: max revenue b: max profit, production level that will realize the...
c(x)=74,000+60x and P(x)=300-x/30, 0<x<9000. a: max revenue b: max profit, production level that will realize the max profit and the price the company should charge for each set c: gov. taxes $5 for each tv set, how many sets should the company manufactor each month to maximize profit, what is max profit, what should the company charge?
Let A ⊆ R, let f : A → R be a function, and let c...
Let A ⊆ R, let f : A → R be a function, and let c be a limit point of A. Suppose that a student copied down the following definition of the limit of f at c: “we say that limx→c f(x) = L provided that, for all ε > 0, there exists a δ ≥ 0 such that if 0 < |x − c| < δ and x ∈ A, then |f(x) − L| < ε”. What was...
The profit in dollars from the sale of x expensive watches is P(x)=0.03x^2-4x+7x^0.7-4700. Find the marginal...
The profit in dollars from the sale of x expensive watches is P(x)=0.03x^2-4x+7x^0.7-4700. Find the marginal profit when: (a) x=400 (b) x=2000 (c) x=5000 (d) x=10,000
ADVERTISEMENT
Subjects
ADVERTISEMENT
Latest Questions
ADVERTISEMENT