Chapter 10.2, Problem 1E

Solution

a.

To find: The percentage of people planned to skip the game.

The percentage of people planned to skip the game is $29\%$ .

Given:

Super Bowl Preferences table:

  $\begin{array}{cccc}\text{Primary}\text{Interest}& \text{Men}& \text{Women}& \text{Total}\\ \text{The}\text{game}& 279& 200& 479\\ \text{The}\text{commercials}& 81& 156& 237\\ \text{Won't}\text{watch}& 132& 160& 292\\ \text{Total}& 492& 516& 1008\end{array}$

Calculation:

The percentage of people planned to skip the game is the number of people planning to not watch over the total amount of people

In the table,

  $\begin{array}{c}\text{Number of people won’t watch is}\text{=}132+160\\ =292\end{array}$

Total number of people $=1008$

Then,

  $\begin{array}{c}\text{The percentage of people planned to skip the game is=}\frac{292}{1008}\\ =0.2896\\ \approx 0.29\end{array}$

Conclusion:

The percentage of people planned to skip the game is $29\%$ .

ii.

To find: The percentage of people were men who planned to skip the game.

The percentage of people were men who planned to skip the game is $13\%$

Given:

Super Bowl Preferences table:

  $\begin{array}{cccc}\text{Primary}\text{Interest}& \text{Men}& \text{Women}& \text{Total}\\ \text{The}\text{game}& 279& 200& 479\\ \text{The}\text{commercials}& 81& 156& 237\\ \text{Won't}\text{watch}& 132& 160& 292\\ \text{Total}& 492& 516& 1008\end{array}$

Concept Used:

Calculation:

In the table:

Number of people who were men, won’t watch = $132$

Total number of people $=1008$

  $\begin{array}{c}\text{The percentage of people were men who planned to skip the game is=}\frac{132}{1008}\\ =0.1309\\ \approx 0.13\end{array}$

Conclusion:

The percentage of people were men who planned to skip the game is $13\%$

iii.

To find: The percentage of the men planned to skip the game.

The percentage of the men planned to skip the game is $26.8\%$ .

Given:

Super Bowl Preferences table:

  $\begin{array}{cccc}\text{Primary}\text{Interest}& \text{Men}& \text{Women}& \text{Total}\\ \text{The}\text{game}& 279& 200& 479\\ \text{The}\text{commercials}& 81& 156& 237\\ \text{Won't}\text{watch}& 132& 160& 292\\ \text{Total}& 492& 516& 1008\end{array}$

Calculation:

The percentage of the men planned to skip the game is men who didn’t watch over total men.

In the table:

Men who didn’t watch= $132$

And total number of men $=492$

  $\begin{array}{c}\text{Then, the percentage of the men planned to skip the game is=}\frac{132}{492}\\ =0.2682\\ \approx 0.268\end{array}$

Conclusion:

The percentage of the men planned to skip the game is $26.8\%$ .

d.

The percentage of the people who planned to skip the game were men.

The percentage of the people who planned to skip the game were men is $45.2\%$ .

Given:

Super Bowl Preferences table:

  $\begin{array}{cccc}\text{Primary}\text{Interest}& \text{Men}& \text{Women}& \text{Total}\\ \text{The}\text{game}& 279& 200& 479\\ \text{The}\text{commercials}& 81& 156& 237\\ \text{Won't}\text{watch}& 132& 160& 292\\ \text{Total}& 492& 516& 1008\end{array}$

Calculation:

Men who skip the game= $132$

Total number who didn’t watch= $292$

  $\begin{array}{c}\text{The percentage of the people who planned to skip the game were men is=}\frac{132}{292}\\ =0.45205\\ \approx 0.452\end{array}$

Conclusion:

The percentage of the people who planned to skip the game were men is $45.2\%$ .