A manufacturer determines that x units of a particular luxury item will return a revenue R(x) = 112 x-x^2 ln(x) hundred dollars. Evaluate R(4), R'(4), R''(4) and interpret each in the context of this situation
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A manufacturer determines that x units of a particular luxury item will return a revenue R(x)...
When x units of a certain luxury commodity are produced, they can all be sold at a price of p thousand dollars per unit, where p = -3x + 300. Part 1 out of 2 a. Express the revenue function R (x) as a function of x. How much revenue is obtained when x = 14 units are produced? R(x) = R (14) = dollars CHECK NEXT
The revenue (in thousands of dollars) from producing x units of an item is modeled by R(x) = 10x -0.005% a. Find the average rate of change in revenue as x changes from 1003 to 1007 b. Find the marginal revenue at x=600. a. The average rate of change in revenue is dollars per unit. (Do not round until the final answer. Then round to the nearest dollar as needed.) b. The marginal revenue is dollars per unit. (Do not...
Suppose that the revenue R, in dollars, from selling x cell phones, in hundreds, is R(x) = -1.3x2 + 320x. The cost C, in dollars, from selling x cell phones, in hundreds, is C(x) = 0.03x3 - 3x2 + 75x + 550. (a) Find the profit function, P(x) = R(x)-C(x). (b) Find the profit if x = 21 hundred cell phones are sold. (c) Interpret P(21). (a) P(x)= (Use integers or decimals for any numbers in the expression.) (b) P(21)=$...
The revenue function R(x) and the cost function C(x) for a particular product are given. These functions are valid only for the specified range of values. Find the number of units that must be produced to break even. R(x) = 200x - 2x2 ; C(x) = - x2 + 5x + 8450 ; 0 ≤ x ≤100 The manufacturer must produce --------------- units to break even.
The revenue function R(x) and the cost function C(x) for a particular product are given. These functions are valid only for the specified range of values. Find the number of units that must be produced to break even. R(x)=200x- x2, C(x)=20x+6500, 0 less than or equals X less than or equals 100.The manufacturer must produce ---- units to break even.
The revenue function R(x) and the cost function C(x) for a particular product are given. These functions are valid only for the specified range of values. Find the number of units that must be produced to break even Rx)200x-x2 C)5x+8750:0sxs100 The manufacturer must produce units to break even.
A manufacturer determines that D(p) = 5,000e 0.27 units of a particular commodity will be demanded (sold) when the price is p dollars per unit. a. (5 pts) Find the elasticity of demand for this commodity. For what values of p is the demand elastic, inelastic, and of unit elasticity. In other state the condition for p >1, p=1, p<1 b. (5 pts) Sketch the curve and label data from part a 5500 5000 4500 4000 3500 3000 2500 2000...
(a) The total cost, in millions of dollars, of producing x thousand units of an item is C(x) = 4(x - 5)2 + 4. Plot at least 2 points on the function C(x) with x on the horizontal axis. Then click Connect Points. Plot the vertex and 2 additional points. Vertex Point Connect Points Delete Reset Vertex 2 9.3, 20.9 (b) The revenue (in millions of dollars) from selling x thousand units of the item is R (X) = 5x....
Pierce Manufacturing determines that the daily revenue, in
dollars, from the sale of x lawn chairs is R(x)equals0.007 x cubed
plus 0.02 x squared plus 0.5 x. Currently, Pierce sells 50 lawn
chairs daily.
a) What is the current daily revenue?
b) How much would revenue increase if 53 lawn chairs were
sold each day?
c) What is the marginal revenue when 50 lawn chairs are sold
daily?
d) Use the answer from part (c) to estimate R(51),
R(52), and...
The total revenue R (in dollars) is directly proportional to the number of units sold x. When 25 units are sold, the total revenue is $275. Find a mathematical model that relates the total revenue R to the number of units sold x