Answered: Exercise 5 (Cost, Revenue, and Profit).… | bartleby

Calculus: Early Transcendentals

Calculus: Early Transcendentals

8th Edition

ISBN:9781285741550

Author:James Stewart

Publisher:James Stewart

Chapter1: Functions And Models

Section: Chapter Questions

Problem 1RCC: (a) What is a function? What are its domain and range? (b) What is the graph of a function? (c) How...

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(Cost, Revenue, and Profit). A company that manufactures pet toys calculates that its costs and revenue can be modeled by the equations

C = 75,000+1.05x and R=500x−x2/25

where x is the number of toys produced in 1 week. If production in one particular week is 5000 toys and is increasing at a rate of 250 toys per week, find:

a) The rate at which the cost is changing.

b)the rate at which the revenue is changing.

c)the rate at which the profit is changing.

Exercise 5 (Cost, Revenue, and Profit). A company that manufactures
pet toys calculates that its costs and revenue can be modeled by the equations
C = 75,000 + 1.05z and R= 500z
25
where z is the number of toys produced in 1 week. If production in one
particular week is 5000 toys and is increasing at a rate of 250 toys per week,
find:
(5a) the rate at uhich the cost is changing.
(5b) the rate at uhich the revenue is changing.
(5c) the rate at which the profit is changing.

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A certain gas reserve held about 27 billion cubic feet of the gas in 2010 and is being depleted by about 1.7 billion cubic feet each year. (a) Give a linear equation for the remaining gas reserves, R, in terms of t, the number of years since 2010. (Let R be measured in billions of cubic feet.) R(t) = (b) In 2015, what will the gas reserves be? (Round your answer to one decimal place.) billion ft3(c) If the rate of depletion doesn't change, in what year will the gas reserve be depleted? (Round your answer down to the nearest year.)
The demand equation for your company's virtual reality video headsets is 1,500 p = g0.3 where g is the total number of headsets that your company can sell in a week at a price of p dollars. The total manufacturing and shipping cost amounts to $110 per headset. (a) Find the weekly cost, revenue and profit as a function of the demand q for headsets. C(q)= 110g R(q)= 1500g0.7 P(g)= 1500 g0. – 1109 (b) How many headsets should your company sell to maximize profit? (Give your answer to the nearest whole number.) q = 1845 V headsets What is the greatest profit your company can make in a week? (Give your answer to the nearest whole number.) $ E Second derivative test: Your answer above is a critical point for the weekly profit function. To show it is a maximum, calculate the second derivative of the profit function. P"(q)= 86977 Evaluate P"(qg) at your critical point. The result is negative , which means that the profit is concave down v at the critical point, and the critical point is a…

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