Question

Suppose that c(x)=4x^3-32x^2+18000x is the cost of manufacturing x items. Find a production level that will minimize the average cost of making x items. The production level that minimizes the average cost of making x items is x___At this level, the average cost of making x items is $

Answer #1

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...

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.

find the following for the function f(x)=3x^2+4x-4
a. f(0) b. f(3) c. f(-3) d. f(-x) e. -f(x) f. f(x+2) g. f(4x) h.
f(x+h)

Find the area of the region bounded by the graph of f(x) = 4x^3 +
4x + 9 and the x axis between x=0 and x=2 using Riemann sums.

If the total cost function for a product is C(x) = 9(x + 3)^3
dollars, where x represents the number of hundreds of units
produced, producing how many units will minimize average cost?
a) x= ?
b) Find the minimum average cost per hundred units.

find the upper bound of the LTE (euler)
2x'+2/3 x = 4x^2
and the interval for t is [0,1].

Find dy/dx if y= (x^3+5x)(4x^2+10)^9

find the derivative of the function
f(x)=(4x-3)^5(2x^2+5x-8)^2

For each cost function (given in dollars), find the cost,
average cost, and marginal cost at a production level of 1000
units; the production level that will minimize the average cost;
and the minimum average cost.
C(q) = 6,000 +
340q − 0.3q2 +
0.0001q3
(a) the cost, average cost, and marginal cost at a production
level of 1000 units
(b) the production level that will minimize the average cost
(Round your answer to the nearest integer.)
(c) the minimum...

Find the exact length of the curve y=(x^3)/3 + 1/(4x) for
2≤x≤3
Conslder the curve deflned by x=t+1 and y=t^2. Find the
corresponding rectangular equation. Produce two graphs: one using
the rectangular equation and one using the parametric equations.
What are the differnce's between the graphs?
Please show work.

ADVERTISEMENT

Get Answers For Free

Most questions answered within 1 hours.

ADVERTISEMENT

asked 4 minutes ago

asked 6 minutes ago

asked 10 minutes ago

asked 10 minutes ago

asked 11 minutes ago

asked 11 minutes ago

asked 11 minutes ago

asked 13 minutes ago

asked 14 minutes ago

asked 19 minutes ago

asked 22 minutes ago

asked 25 minutes ago