Chapter 12: Q.45 (page 815)

European population growth Many populations grow exponentially. Here are the data for the estimated population of Europe (in millions) from $1700$ to $2012$ . The dates are recorded as years since $1700$ so that $x = 312$ is the year $2012$ .
$\begin{array}{l} year since 1700 & population (in millions) \\ 0 & 125 \\ 50 & 163 \\ 100 & 203 \\ 150 & 276 \\ 200 & 408 \\ 250 & 729 \\ 299 & 732 \\ 308 & 740 \\ 310 & 729 \\ 312 & 73 \end{array}$
a. Use a logarithm to transform population size. Then calculate and state the least-squares regression line using the transformed variable.
b. Use your model from part (a) to predict the population size of Europe in $2020$ .

Short Answer

Expert verified

a). The least-squares regression line using the transformed variable is $\log y = 2.0796 + 0.0026 x$ .

b). The expected size of Europe in $2020$ is $815.831$ millions.

Step by step solution

Part (a) Step 1: Given Information

Given data:

$\begin{array}{l} year since 1700 & population (in millions) \\ 0 & 125 \\ 50 & 163 \\ 100 & 203 \\ 150 & 276 \\ 200 & 408 \\ 250 & 729 \\ 299 & 732 \\ 308 & 740 \\ 310 & 729 \\ 312 & 73 \end{array}$

Part (a) Step 2: Explanation

Log of given data:

$\begin{array}{l} year since 1700 & population (in millions) & \log (population) \\ 0 & 125 & 2.096910013 \\ 50 & 163 & 2.212187604 \\ 100 & 203 & 2.307496038 \\ 150 & 276 & 2.440909082 \\ 200 & 408 & 2.610660163 \\ 250 & 547 & 2.737987326 \\ 299 & 729 & 2.862727528 \\ 308 & 732 & 2.864511081 \\ 310 & 738 & 2.868056362 \\ 312 & 740 & 2.86923172 \end{array}$

Making use of a $T i 83 / 84$ calculator

Step 1: select STAT;

Step 2: select 1: EDIT.

Step 3: Type the data for each year since $1700$ in list L1 and the population logarithmic in list L2.

Step 4: hit STAT once more, select CALC, and then $L i n R e g (a + b x) .$

Part (a) Step 3: Explanation

The required result:

$y = a + b x$

$a = 2.0796$

$b = 0.0026$

Substituting the value in $a$ and $b$

$y = 2.0796 + 0.0026 x$

The year since $1700$ is represented by $x$ , while the population logarithm is represented by $y$ .

\log y = 2.0796 + 0.0026 x

Part (b) Step 1: Given Information

Given data:

$\begin{array}{l} year since 1700 & population (in millions) \\ 0 & 125 \\ 50 & 163 \\ 100 & 203 \\ 150 & 276 \\ 200 & 408 \\ 250 & 729 \\ 299 & 732 \\ 308 & 740 \\ 310 & 729 \\ 312 & 73 \end{array}$

Part (b) Step 2: Explanation

Substituting the value $x$ by $320$ :

$\log y = 2.0796 + 0.0026 x$

$\log y = 2.0796 + 0.0026 (320)$

$\log y = 2.9116$

Using the exponential function with a base of ten

$y = 10^{\log y}$

$= 10^{2.9116}$

$= 815.831$

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Short Answer

Step by step solution

Part (a) Step 1: Given Information

Part (a) Step 2: Explanation

Part (a) Step 3: Explanation

Part (b) Step 1: Given Information

Part (b) Step 2: Explanation

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