Chapter 2.8, Problem 63E

Solution

To verify: The scatter plot is a linear model.

Given information:

The population estimates in millions of persons $\left(y\right)$ as a function of years since $2000\left(x\right)$ .

  $\begin{array}{lllllllll}\text{Year}\hfill & 2008\hfill & 2009\hfill & 2010\hfill & 2011\hfill & 2012\hfill & 2013\hfill & 2014\hfill & 2015\hfill \\ 2000\left(x=0\right)\hfill & 8\hfill & 9\hfill & 10\hfill & 11\hfill & 12\hfill & 13\hfill & 14\hfill & 15\hfill \\ \text{Population}\left(y\right)\hfill & 304.1\hfill & 304.1\hfill & 304.1\hfill & 311.6\hfill & 314.1\hfill & 316.5\hfill & 319.1\hfill & 321.6\hfill \end{array}$

Calculation:

Plot the points on graph where x -axis represents years and y -axis represents number of export.

  

From the scatter plot it’s verified the data is linear.

To find: The linear regression to model the data.

  $y=2.4774x+284.4$

Given information:

The population estimates in millions of persons $\left(y\right)$ as a function of years since $2000\left(x\right)$ .

  $\begin{array}{lllllllll}\text{Year}\hfill & 2008\hfill & 2009\hfill & 2010\hfill & 2011\hfill & 2012\hfill & 2013\hfill & 2014\hfill & 2015\hfill \\ 2000\left(x=0\right)\hfill & 8\hfill & 9\hfill & 10\hfill & 11\hfill & 12\hfill & 13\hfill & 14\hfill & 15\hfill \\ \text{Population}\left(y\right)\hfill & 304.1\hfill & 304.1\hfill & 304.1\hfill & 311.6\hfill & 314.1\hfill & 316.5\hfill & 319.1\hfill & 321.6\hfill \end{array}$

Calculation:

The linear regression of the given data is, $y=2.4774x+284.4$ .

Where, $x=0$ represents year $2000.$ and $y$ represents the population of city in millions.

To find: The year when city population reached to 330 million.

  $2018$

Given information:

The population estimates in millions of persons $\left(y\right)$ as a function of years since $2000\left(x\right)$ .

  $\begin{array}{lllllllll}\text{Year}\hfill & 2008\hfill & 2009\hfill & 2010\hfill & 2011\hfill & 2012\hfill & 2013\hfill & 2014\hfill & 2015\hfill \\ 2000\left(x=0\right)\hfill & 8\hfill & 9\hfill & 10\hfill & 11\hfill & 12\hfill & 13\hfill & 14\hfill & 15\hfill \\ \text{Population}\left(y\right)\hfill & 304.1\hfill & 304.1\hfill & 304.1\hfill & 311.6\hfill & 314.1\hfill & 316.5\hfill & 319.1\hfill & 321.6\hfill \end{array}$

Calculation:

Substitute $y=330$ into the model $y=2.4774x+284.4$ ,

  $\begin{array}{c}330=2.4774x+284.4\\ 2.4774x=330-284.4\\ x=\frac{45.6}{2.4774}\\ x\approx 18\end{array}$

Since $2000$ represents $x=0$ , the year for the value of $x=18$ will be $2018$ .