5.6.97 A city's population in thousands during year x is modeled by P(x)= 125(1.012)* 1992 Estimate...
The number of White Sturgeon in thousands can be modeled by F(x)= 170(0.82)^x in a particular region, where x is the year and x=0 corresponds to 1973. Estimate the year when the number of sturgeon reached 7 thousand. (Round to the nearest year.)
the population P (in thousands) of a certain city from 2000 through 2008 can be modeled by p=280.84e^kt where t is the year with t=0 corresponding to 2000. in 2006 the population was about 360,000. (a) finf the value of k for the model. round your result to four decimal places (b) use your model to predict the population in 2015(round your answer to the nearest person p=?? 16. 1/2 points Previous Answers LarATRMRP7 4.5.0183/30 Submissions Used My Note Corplete...
The populations P (in thousands) of a certain city from 2000 through 2008 can be modeled by P = 281.81ekt, where t is the year, with t = 0 corresponding to 2000. In 2006, the population was about 364,000. (a) Find the value of k for the model. Round your result to four decimal places. k= (b) Use your model to predict the population in 2015. (Round your answer to the nearest person.) P= thousand
The populations P (in thousands) of a certain city from 2000 through 2008 can be modeled by P = 1111.9ekt where t is the year, with t = 0 corresponding to 2000. In 2002, the population was about 1,300,000. (a) Find the value of k for the model. Round your result to four decimal places. k= (b) Use your model to predict the population in 2015. (Round your answer to the nearest person.) P= thousand
19&20 The population P (in thousands) of Reno, Nevada from 2000 through 2007 can be modeled by P = 346.8e" where / represents the year, with 1 0 corresponding to 2000. In 2005, the population of Reno was about 395,000. According to the model, during what year will the population reach 486,000.00 O a 2009 Ob.2005 O c.2021 Od 2013 Oe.2017 QUESTION 20 Use the Remainder Theorem and synthetic division to find the function value. Verify your answers using another...
0/0.39 POINTS PREVIOUS ANSWERS 9/30 Submissions Used The populations P (in thousands) of a certain city from 2000 through 2008 can be modeled by P= 1115.2ekt, where t is the year, with t = 0 corresponding to 2000. In 2002, the population was about 1,400,000. (a) Find the value of k for the model. Round your result to four decimal places. k = Enter a number (b) Use your model to predict the population in 2015. (Round your answer to...
The profit P (in dollars) from selling x units of a product is given by the function below. P 35,000+2077 x 8x2 150 x s 275 Find the marginal profit for each of the following sales. (Round your answers to two decimal places.) (a) = 150 P(150) $ (b) x 175 P(175)$ (c) X-200 P(200) $ (d) X 225 P(225) $ (e) x250 P(250) $ (f x275 P(275) $ Need Help? Read It Watch It Talk to a Tutor The...
The population of a certain state (in thousands) from 1990 (t = 0) to 2000 (t= 10) is modeled by the polynomial p(t) = -0.376+ 108t + 7066. a. Determine the average growth rate from 1990 to 2000. b. What was the growth rate for this state in 1994 (t = 4) and 2000 (t = 10)? c. Use a graphing utility to graph p' for Osts 10. What does this graph tell you about population growth in this state...
The demand for a new computer game can be modeled by p(x) = 58 -8 In x, for 0 5x5 800, where p(x) is the price consumers will pay, in dollars, and x is the number of games sold in thousands. Recall that total revenue is given by R(x)=x.p(x). Complete parts (a) through (c) below. a) Find R(x). R(x) = b) Find the marginal revenue, R'(x). R'(x)=0 c) How many units will be sold if the price that consumers are...
The demand for a new computer game can be modeled by p(x) = 58 -8 In x, for 0 5x5 800, where p(x) is the price consumers will pay, in dollars, and x is the number of games sold in thousands. Recall that total revenue is given by R(x)=x.p(x). Complete parts (a) through (c) below. a) Find R(x). R(x) = b) Find the marginal revenue, R'(x). R'(x)=0 c) How many units will be sold if the price that consumers are...