Suppose that c(x)=4x^3-32x^2+18000x is the cost of manufacturing x items. Find a production level that will...

Solve each equation. (a) 5·32x−1 = 20 (b) 4x+5/3=x-3/4 2)Find the local extrema of the function...

Solve each equation. (a) 5·32x−1 = 20 (b) 4x+5/3=x-3/4 2)Find the local extrema of the function f(x) = x3 −6x2 +4x−2. 3) Find the local extrema of the function f(x) = x3 −6x2 +4x−2. 4) Suppose $5, 000 is invested at 3% annual interest, compounded monthly. (a) Write a function that describes the value of the investment after t years. (b) How much is the investment worth after 3 years? (c) When is the investment worth $8, 000?

For the given cost function C(x)=57600+300x+x2C(x)=57600+300x+x2 find: a) The cost at the production level 1500      b)...

For the given cost function C(x)=57600+300x+x2C(x)=57600+300x+x2 find: a) The cost at the production level 1500      b) The average cost at the production level 1500     c) The marginal cost at the production level 1500     d) The production level that will minimize the average cost     e) The minimal average cost

3) Suppose a firm’s cost function is C(q) = 3q2 (2 squared) + 15. a. Find...

3) Suppose a firm’s cost function is C(q) = 3q2 (2 squared) + 15. a. Find variable cost, fixed cost, average cost, average variable cost, and average fixed cost.(Hint: Marginal cost is given by MC = 6q.) b. Find the output that minimizes average cost. :4) Suppose that a firm’s production function is q = x0.5 in the short run, where there are fixed costs of $1,000, and x is the variable input whose cost is $1,000 per unit. What...

g(x)= (x^2 +1)^3 (x^2+2)^6, for this question I need to find the derivative of 32x.

g(x)= (x^2 +1)^3 (x^2+2)^6, for this question I need to find the derivative of 32x.

The cost function for producing x items is C(x) = 45000 + 25x - 0.10x^2. The...

The cost function for producing x items is C(x) = 45000 + 25x - 0.10x^2. The revenue function R(x) = 750 - 0.60x^2. a.Determine the production cost for the first 500 items. b.The marginal cost function. c.How fast is the cost growing when production is at 500 units. d.The average cost per item for the first 500 items. e.The marginal revernue function R'(x). f.The profit function. g.The marginal profit function. h.What production level maximizes revenue.

Given the cost function: C(x) = 1000 + 96x + 2x3/2 Please do the following: 1....

Given the cost function: C(x) = 1000 + 96x + 2x3/2 Please do the following: 1. Find the cost, average cost, and marginal cost at a production level of 1000 units 2. Find the production level that will minimize the average cost 3. Find the minimum average cost 3. Find the minimum average cost Please show your step by step calculation. Thank you.

Let LaTeX: C(x)C ( x ) be the cost in dollar of manufacturing x items. If...

Let LaTeX: C(x)C ( x ) be the cost in dollar of manufacturing x items. If we are given that C(10)=101 and C'(10) = 3 then estimate the cost to manufacture 12 items

Suppose that the total cost function, in dollars, for the production of x units of a...

Suppose that the total cost function, in dollars, for the production of x units of a product is given by the equation shown below. C(x) = 17640 + 65x + 0.4x2 Then the average cost of producing x items is represented by the following equation. C(x) = total cost = 17640 + 65 + 0.4x x x (a) Find the instantaneous rate of change of average cost with respect to the number of units produced, at any level of production....

7. Suppose the cost, in dollars, of producing x items is given by the function C(x)...

7. Suppose the cost, in dollars, of producing x items is given by the function C(x) = 1/6x3+ 2x2+ 30. Current production is at x = 9 units. (a) (3 points) Use marginal analysis to find the marginal cost of producing the 10th unit. (b) (3 points) Find the actual cost of producing the 10th unit.

The cost function for production of a commodity is C(x) = 352 + 29x − 0.06x2...

The cost function for production of a commodity is C(x) = 352 + 29x − 0.06x2 + 0.0001x3. (a) Find C'(100). Interpret C'(100). This is the cost of making 100 items.This is the rate at which costs are increasing with respect to the production level when x = 100.    This is the amount of time, in minutes, it takes to produce 100 items.This is the rate at which the production level is decreasing with respect to the cost when x =...