Use Table 1 to evaluate all integrals involved in any solutions of Problems 71–94. 88. Revenue. The marginal revenue for a Company that manufactures and sells x graphing calculators per week is given by R ′ ( x ) = x 1 + 2 x R ( 0 ) = 0 where R ( x ) is the revenue in dollars. Find the revenue func- tion and the number of calculators that must be sold (to the nearest unit) to produce $10,000 in revenue per week. How inuch weekly revenue (to the nearest dollar) will the Company have if 1,000 calculators are sold per week?
Use Table 1 to evaluate all integrals involved in any solutions of Problems 71–94. 88. Revenue. The marginal revenue for a Company that manufactures and sells x graphing calculators per week is given by R ′ ( x ) = x 1 + 2 x R ( 0 ) = 0 where R ( x ) is the revenue in dollars. Find the revenue func- tion and the number of calculators that must be sold (to the nearest unit) to produce $10,000 in revenue per week. How inuch weekly revenue (to the nearest dollar) will the Company have if 1,000 calculators are sold per week?
Solution Summary: The author calculates the revenue function and the number of calculators that must be sold that generates 10,000 per week. They also calculate the weekly revenue that the agency will have on the sale of 1,000 calculations.
Use Table 1 to evaluate all integrals involved in any solutions of Problems 71–94.
88. Revenue. The marginal revenue for a Company that manufactures and sells x graphing calculators per week is given by
R
′
(
x
)
=
x
1
+
2
x
R
(
0
)
=
0
where R(x) is the revenue in dollars. Find the revenue func- tion and the number of calculators that must be sold (to the nearest unit) to produce $10,000 in revenue per week. How inuch weekly revenue (to the nearest dollar) will the Company have if 1,000 calculators are sold per week?
With differentiation, one of the major concepts of calculus. Integration involves the calculation of an integral, which is useful to find many quantities such as areas, volumes, and displacement.
Please, help me to solve problem num 41 step by steps.
Find the derivatives in Exercises 39–44.a. by evaluating the integral and differentiating the result. b. by differentiating the integral directly.
In Problems 23–30, use the given zero to find the remaining zeros of each function.
In Problems 49–56, for each graph of a function y = f(x), find the absolute maximum and the absolute minimum, if they exist. Identify any local maximum values or local minimum values.
Chapter 6 Solutions
Calculus for Business, Economics, Life Sciences and Social Sciences Books a la Carte Edition Plus NEW MyLab Math with Pearson eText -- Access Card Package (13th Edition)
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Definite Integral Calculus Examples, Integration - Basic Introduction, Practice Problems; Author: The Organic Chemistry Tutor;https://www.youtube.com/watch?v=rCWOdfQ3cwQ;License: Standard YouTube License, CC-BY