Suppose that the Best Custom Calendar Company models the coming year's revenuse and cost functions, in thousands of dollars, to be R(x)= -x^3+9x^2 and C(x)=2x^3-12x^2+30x, where x represents units of 1000 calendars

College Algebra

1st Edition

ISBN:9781938168383

Author:Jay Abramson

Publisher:Jay Abramson

Chapter6: Exponential And Logarithmic Functions

Section6.7: Exponential And Logarithmic Models

Problem 16TI: Recent data suggests that, as of 2013, the rate of growth predicted by Moore’s Law no longer holds....

See similar textbooks

Related questions

Q: Suppose a small quantity of radon gas, which has a half-life of 3.8 days, is accidentally released…

A: half life problem

Q: Suppose 15 blackberry plants started growing in a yard. Absent constraint, the blackberry plants…

A: Please refer the attached image for complete solution.

Q: Suppose that the revenue from selling x washingmachines isr(x) = 20,000(1 - 1/x)dollars. Find the…

A: To find the marginal revenue we find dr/dx

Q: Show that √(10x + 1) and √(x + 1) grow at the same rate asx→ ∞ by showing that they both grow at the…

Q: In the least-squares line ŷ = 5 − 3x, what is the value of the slope? In the least-squares line ŷ =…

A: Determine the value of slope. Slope: The slope of a least squares regression line is interpreted as…

Q: Suppose 30 blackberry plants started growing in a yard. Absent constraint, the blackberry plants…

A: We have the following data : Initial number of plants = 30 Spreading rate = 80% a month Carrying…

Q: An fruit grower knows from previous experience and careful data analysis that if the fruit on a…

A: *Concept:- first form Revenue equation in terms of number of weeks (x). then, use maxima principle,…

Q: The half-life of carbon-14 is 5700 years. If an item is discovered with only 17% of the original…

A: Given Half life of carbon-14 =5700 years i.e. and an item is found with only 17% of the original…

Q: Explain a general mathematical modeling to growth of Human population. And what will be the Iraq…

Q: Suppose that the demand for a product is given by q2p=6,000, where q represents the number of units…

Q: Suppose income from an investment starts (at time 0) at $6000 a year and increases linearly and…

A: While calculating compound interest, the addition of interest to the principal sum of a loan or a…

Q: Suppose the population of a city has been growing at a rate of 2.5% per year for each of the last 8…

Q: A company estimates that the daily cost (in dollars) of producing x chocolate bars is given by C(x)…

A: Given that C(x) = 930 + 0.03x + 0.0004x2

Q: A company is considering expanding their production capabilities with a new machine that costs…

Q: If there are 520 grams of Tadioactive material with a half-life of 12 hours, how TIuch of the…

A: The material is decaying at a constant rate, every 12 hours it is getting halved. So, it is an…

Q: Suppose a product has a daily marginal revenue of 46 dollars per unit, and a daily marginal cost of…

A: Given, Marginal Cost, MC = 30 + 1/2x marginal Revenue, MR = $46 Daily Fixed Cost = $200

Q: customers turn up only about 95% of the time. A flight can accommodate 40 passengers and each seat…

Q: 1 What is the family of the equation y %3D quadratic exponential linear

Q: An fruit grower knows from previous experience and careful data analysis that if the fruit on a…

A: TO FIND: How many weeks should the grower wait before harvesting the apples in order to maximize the…

Q: Suppose 175 trout are seeded into a lake. Absent constraint, their population will grow by 60% a…

A: Recall: Logistic growth model P(t)=m1+m-PPe-ktWe have, P=175, m=2000, k=60%=0.60, t=5 years

Q: An fruit grower knows from previous experience and careful data analysis that if the fruit on a…

Q: The average annual increment in the horn length (in centimeters) of bighorn rams born in recent…

Q: Suppose that the total cost in dollars of producing x units of a product is given by C(x) = 5,000 +…

Q: An fruit grower knows from previous experience and careful data analysis that if the fruit on a…

A: The average pounds of fruits is 130 pounds, and the selling price is $0.6 per pound. The yield per…

Q: A manufacturer of aluminum doors currently is able to sell 500 doors per week at a price of $75…

Q: write down the solution parameters of this graph. what is the: -scale factor -starting x value…

A: Given graph: There is no Linear 2 and Exponential 2 graph. To find: Scale factor Starting x-value…

Q: The price elasticity of supply for bananas is 0.2. If the price rises by 5%, what will happen to the…

A: Price elasticity of supply= (% change in quantity supplied)/ (% change in price)

Q: Suppose that the College of Business and Entrepreneurial Technology had the following record of its…

A: The following information has been given: Year Enrolment 2015 1200 2016 1500 2017 2000…

Q: Explain a general mathematical modeling to growth of Human population. And what will be the Iraq…

Q: An engine health monitoring system consists of a primary unit and a standby unit. The MTTF of the…

Q: Suppose 275 trout are seeded into a lake. Absent constraint, their population will grow by 50% a…

Q: Suppose that the marginal propensity to consume is dC dy = 0.02 + ln(y + 1) y + 1 (in…

Q: Suppose 175 trout are seeded into a lake. Absent constraint, their population will grow by 65% a…

Q: Suppose stock A is priced at $30/share and the company will pay a dividend of $0.30/share after two…

A: Given: stock A is priced at $30/share and the company will pay a dividend of $0.30/share after two…

Q: Suppose that the revenue (in dollars) from the sale of a product is given by R = 30x + 0.8x2 −…

Q: An fruit grower knows from previous experience and careful data analysis that if the fruit on a…

A: To find: How many weeks should the grower wait to maximise the sales revenue per tree. Find the…

Q: The polluted water from Pond 1 drains into Pond 2 at 8 gallons per minute. Pond 1 initially contains…

Q: Aman with $30,000 to invest decides to diversity his investments by placing $15,000 in an account…

Q: A manufacturer of digital cameras estimates that when X hundred camera are produced, the total…

A: Given,P(x)=0.004x3+0.06x2+25x-200Marginal profit is P'(x)P'(x)=ddx(0.004x3+0.06x2+25x-200)…

Q: The City Council proposed to utilize government-owned land with an area of 21,600 square meters.…

Q: If a city's population is 1.3 million now and will grow at a continuous rate of 4.5% in the future,…

A: from 2020 to 2030 there is 10 year In each year population is increasing by 4.5 %

Q: uppose that a machine's production can be considered as a continuous income stream with annual rate…

A: Given,A continuous income stream with annual rate of flow at time t is given byf(t( = 10,000 - 800t…

Q: Suppose we create a model of the height of a shrub (Y) based on the amount of bacteria in the soil…

A: Let Y: Height of a shrub X1: Amount of bacteria in the soil X2=1 ; If the plant is in full sun0 ; If…

Q: Suppose that a machine's production can be considered as a continuous income stream with annual rate…

Q: Suppose 19 blackberry plants started growing in a yard. Absent constraint, the blackberry plants…

Q: A money market fund has a continuous flow of money at a rate of f(x)=1500x-170x2 for 10 years. Find…

Q: At the beginning of the COVID-19 pandemic, the number of new cases was growing exponentially. There…

A: Here, the exponential model is given by: P(t)=a×bt...(1) where P(t) is the number of cases after a…

Concept explainers

Minimization

In mathematics, traditional optimization problems are typically expressed in terms of minimization. When we talk about minimizing or maximizing a function, we refer to the maximum and minimum possible values of that function. This can be expressed in terms of global or local range. The definition of minimization in the thesaurus is the process of reducing something to a small amount, value, or position. Minimization (noun) is an instance of belittling or disparagement.

Maxima and Minima

The extreme points of a function are the maximum and the minimum points of the function. A maximum is attained when the function takes the maximum value and a minimum is attained when the function takes the minimum value.

Derivatives

A derivative means a change. Geometrically it can be represented as a line with some steepness. Imagine climbing a mountain which is very steep and 500 meters high. Is it easier to climb? Definitely not! Suppose walking on the road for 500 meters. Which one would be easier? Walking on the road would be much easier than climbing a mountain.

Concavity

In calculus, concavity is a descriptor of mathematics that tells about the shape of the graph. It is the parameter that helps to estimate the maximum and minimum value of any of the functions and the concave nature using the graphical method. We use the first derivative test and second derivative test to understand the concave behavior of the function.

Question

Suppose that the Best Custom Calendar Company models the coming year's revenuse and cost functions, in thousands of dollars, to be R(x)= -x^3+9x^2 and C(x)=2x^3-12x^2+30x, where x represents units of 1000 calendars and where teh model is thought to be accurate up to approximately x=5.5. Round the dollar amounts to the nearest dollar.

What is the profitable zone of calendar production levels?

What is the maximum profit and the level of production that will generate the maximum profit?

What is the maximum loss and the level of production generating this maximum loss when the ompnay is not in the profitable zone?

Expert Solution

This question has been solved!

Explore an expertly crafted, step-by-step solution for a thorough understanding of key concepts.

This is a popular solution!

SEE SOLUTION Check out a sample Q&A here

Given:

VIEW

Calculation:

VIEW

Trending now

This is a popular solution!

Step by step

Solved in 2 steps

SEE SOLUTION Check out a sample Q&A here

Knowledge Booster

$Application of Differentiation$

Learn more about

Need a deep-dive on the concept behind this application? Look no further. Learn more about this topic, calculus and related others by exploring similar questions and additional content below.

Similar questions

Recent data suggests that, as of 2013, the rate of growth predicted by Moore’s Law no longer holds. Growth has slowed to a doubling time of approximately three years. Find the new function that takes that longer doubling time into account.
suppose a company has fixed costs of 31,200$ and variable cost per unit of 1/3x +222 where x is total number of units produced. suppose further that the selling price is 1448 - 2/3 x dollars per unit, what is the maximum revenue, break even points, and the profit function
Suppose a company has fixed costs of $32,000 and variable costs of 4/9x + 333 dollars per unit, where x is the total number of units produced. Suppose further that the selling price of its product is 1365 − 5/9x dollars per unit Form the profit function, P(x), from the cost and revenue functions. Find maximum profit. (Round your answer to the nearest cent.)
An fruit grower knows from previous experience and careful data analysis that if the fruit on a specific kind of tree is harvested at this time of year, each tree will yield, on average, 130 pounds, and will sell for $0.6 per pound. However, for each additional week the harvest is delayed (up to a point), the yield per tree will increase by 7 pounds, while the price per pound will decrease by $0.02.A) How many weeks should the grower wait before harvesting the apples in order to maximize the sales revenue per tree? (Round your answer to the nearest tenth of a week.)Answer: (rounded to the nearest tenth)B) Use your answer in part A to find the actual maximum revenue that can be expected. (Round your answer to the nearest dollar.)Answer: dollars (rounded to the nearest dollar)
Suppose that the cost of producing x items is C(x) = .005x3 - .5x2 + 28x + 300 dollars, and daily production is 50 items. (a) What is the extra cost of increasing daily production from 50 to 51 items? (b) What is the marginal cost when x = 50?
A company estimates that the daily cost (in dollars) of producing x chocolate bars is given by C(x) = 930 + 0.03x + 0.0004x2. Currently, the company produces 690 chocolate bars per day. Use marginal cost to estimate the increase in the daily cost if one additional chocolate bar is produced per day. Round to the nearest cent.
Suppose the marginal cost of producing x units of a product is given by: MC=30 Square root (x+4) And the marginal revenue is given by: MR = 900 And the fixed costs are $1000. What is the profit (or loss) for the production and sale of 5 units of this product ? How many units are needed to be sold to make the maximum profit?
Suppose that a price-demand function is given by P(x)=100+10x−4x2. Calculate the marginal revenue when x=20. Give your answer as an integer.
Suppose a company has fixed costs of $39,000 and variable costs of 1/3x^2 + 444 x dollars, where x is the total number of units produced. Suppose further that the selling price of its product is 1970-2/3 x dollars per unit. Find the maximum revenue.
use graphical method to solve this LP problem.
Suppose a company has fixed costs of $46,800 and variable cost per unit of 2/5 x + 333 dollars, where x is the total number of units produced. Suppose further that the selling price of its product is 2159 − 3/5 x dollars per unit. Form the profit function P(x) from the cost and revenue functions. P(x) =
Suppose that the revenue (in dollars) from the sale of a product is given by R = 30x + 0.8x2 − 0.002x3 where x is the number of units sold. How fast is the marginal revenue changing when x = 90?