Identify the information given to you in the application problem below. Use that information to answer the questions that follow. For part a) and b), round your answers to two decimal places as needed. For part c) and d), round your answer to the nearest whole number (person). In 2000, the estimated population of Pottsville, USA was 36956. By 2001, the population had grown to 41278. Assuming that the growth is linear, construct a linear equation that expresses the population, P, of Pottsville t years since 2000. P(t)=P(t)= Assuming that the growth is exponential, construct an exponential equation that expresses the population, P, of Pottsville t years since 2000. P(t)=P(t)= If the population of Pottsville is growing at a linear rate, estimate the population in the year 2008. If the population of Pottsville is growing at a linear rate the population in the year 2008 will be approximately people. If the population of Pottsville is growing at an exponential rate, estimate the population in the year 2008. If the population of Pottsville is growing at an exponential rate, the population in the year 2008 will be approximately people.
Identify the information given to you in the application problem below. Use that information to answer the questions that follow. For part a) and b), round your answers to two decimal places as needed. For part c) and d), round your answer to the nearest whole number (person). In 2000, the estimated population of Pottsville, USA was 36956. By 2001, the population had grown to 41278. Assuming that the growth is linear, construct a linear equation that expresses the population, P, of Pottsville t years since 2000. P(t)=P(t)= Assuming that the growth is exponential, construct an exponential equation that expresses the population, P, of Pottsville t years since 2000. P(t)=P(t)= If the population of Pottsville is growing at a linear rate, estimate the population in the year 2008. If the population of Pottsville is growing at a linear rate the population in the year 2008 will be approximately people. If the population of Pottsville is growing at an exponential rate, estimate the population in the year 2008. If the population of Pottsville is growing at an exponential rate, the population in the year 2008 will be approximately people.
Mathematics For Machine Technology
8th Edition
ISBN:9781337798310
Author:Peterson, John.
Publisher:Peterson, John.
Chapter5: Division Of Common Fractions And Mixed Numbers
Section: Chapter Questions
Problem 23A: A double-threaded square-thread screw is shown in Figure 5-7. The pitch of a screw is the distance...
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Identify the information given to you in the application problem below. Use that information to answer the questions that follow. For part a) and b), round your answers to two decimal places as needed. For part c) and d), round your answer to the nearest whole number (person). |
In 2000, the estimated population of Pottsville, USA was 36956. By 2001, the population had grown to 41278. |
Assuming that the growth is linear, construct a linear equation that expresses the population, P, of Pottsville t years since 2000. P(t)=P(t)= |
Assuming that the growth is exponential, construct an exponential equation that expresses the population, P, of Pottsville t years since 2000. P(t)=P(t)= |
If the population of Pottsville is growing at a linear rate, estimate the population in the year 2008. If the population of Pottsville is growing at a linear rate the population in the year 2008 will be approximately people. |
If the population of Pottsville is growing at an exponential rate, estimate the population in the year 2008. If the population of Pottsville is growing at an exponential rate, the population in the year 2008 will be approximately people. |
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