Question 14 12 pts If a revenue function is given by: R(x)= -x3 + 30x2 +...
А 1 Question 1 12 pts If a revenue function is given by: R(x)= 10,000 - x3 + 42x2 + 800x for x between [0, 20). (a) Is there a point of diminishing return? Asnwer: [Select) (b) The value of x at the point of diminishing return is 14 (c) The revenue at the point of diminshing return is 26,688
This Question: 2 pts For the given functions fand g, find (f.g)(x). f(x) = 5x + 2, g(x) = 6x + 6 O A. 30x2 + 12 O B. 30x2 + 18x + 12 O C. 30x2 +42x + 12 O D. 11x2 + 42x + 8 Mika's ag rages wil es us r = oblems in t problems, so Click to select your answer
Question 11 12 pts Assume the total revenue from the sale of 'x'lawnmowers is given by : R(x) = 250000*(0.005x)0.3 Read carefully before answering the following: (a) Find the total revenue if 700 units are sold. Total revenue is $ [Select] (b) Find the marginal revenue if 700 units are sold. The marginal revenue is $ [Select] (c) Find the average revenue per unit if 700 units are sold. The average revenue is $ [Select)
36. Revenue Suppose that the revenue function for a certain product is given by R(x) = 15(2x + 1)-1 + 30x – 15 where x is in thousands of units and R is in thousands of dollars. (a) Find the marginal revenue when 2000 units are sold. (b) How is revenue changing when 2000 units are sold?
Given the cost function C(a)-5 c 107 and revenue function R (x) 11x, where a is the number of units produced, find the value of x for the break-even point. Round up to the next greater whole number, if necessary
Question 3 4 pts Find the second derivative of the following function: x3-6x2+1 (a)3x+12 (b)3x-12 (c)6x-12 (d)6x+12 (e) 0 (a) (b) O (c) O (d) (e)
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.
Let R(x) represent revenue, in thousands of dollars, and x represent the amount spent on advertising, in thousands of dollars. Find the following for R(x) = -x +36x² + 1000, O SXS 17. (a) Find R''(x). (b) Find the point of diminishing returns. (a) R''(x) = Find the point of diminishing returns (x,y) for the function R(x), where R(x) represents revenue (in thousands of dollars) and x represents the amount spent on advertising in thousands of dollars). R(x) = 10,000...
Consider the random variable X whose probability density function is given by k/x3 if x>r fx(x) = otherwise Suppose that r=5.2. Find the value of k that makes fx(x) a valid probability density function.