А 1 Question 1 12 pts If a revenue function is given by: R(x)= 10,000 -...
Question 14 12 pts If a revenue function is given by: R(x)= -x3 + 30x2 + 1000 for x between [0, 15). (a) Is there a point of diminishing return? Asnwer: (Select) (b) The value of x at the point of diminishing return is (Select) (c) The revenue at the point of diminshing return is (Select]
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)
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
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...
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.
Given the cost function, C(x), and the revenue function, R(x), find the number of units x that must be sold to break even. C(x) = 81x + 1750 R(x) = 106x
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(x) and the revenue function R(x), find the number of the units x that must be sold to break even. C(x)=1.4+4800 and R(x)=1.7x How many units must be produced and sold in order to break even?
Question 5 of 14 (1 point) 10.3 Section Exercise 12 Given r = 0.28, find the coefficients of determination and nondetermination and explain the meaning of each. The coefficient of determination is 1% of the variation of y is (select) to the variation of x. The coefficient of nondetermination is % of the variation of y is (select) to the variation of x.