Chapter 10.4, Problem 49E

Solution

a.

To determine: the number of students who except to be married.

We should expect 1.84 of the college students to be married.

Given information:

A random sample of 8 students.

Assume that 23% of all college students are married.

Concept Used:

Expected Value for a Binomial Distribution:

If the binomial random variable $X$ counts the number of successes in $n$ independent trials with probability of success $p$ , then $\mu =E(x)=np$ .

Calculation:

There are of 8 students in which 23% would like to marry.

Here, $n=8\text{and}p=23\%=0.23$ .

  $\begin{array}{c}\mu =E(x)\\ =8(0.23)\\ =1.84\end{array}$

b.

To determine: whether it as unusual if the sample contained five married students.

It is unusual.

Given information:

A random sample of 8 students.

Assume that 23% of all college students are married.

Concept Used:

Standard Deviation for a Binomial Distribution:

If the binomial random variable $X$ counts the number of successes in $n$ independent trials with probability of success $p$ , then $\sigma =\sqrt{npq}$ where $q$ represents the probability of failure.

Calculation:

There are of 8 students in which 23% would like to marry.

We should expect 1.84 of the college students to be married.

The probability of failure $q$ is $1-0.23=0.77$ .

Here, $n=8,q=0.77\text{and}p=23\%=0.23$

  $\begin{array}{c}\sigma =\sqrt{8(0.23)(0.77)}\\ \approx 1.1903\end{array}$

Since,

  $\begin{array}{c}\mu +2\sigma =1.84+2(1.1903)\\ =4.2206\end{array}$

4.2206 is less than 5, 5 is more than double the expected number of married students, this would be unusual.

c.

To determine: the probability that five or more of the eight students are married.

The probability that five or more of the eight students are married is $1.913\%$ .

Given information:

A random sample of 8 students.

Assume that 23% of all college students are married.

Concept Used:

Binomial probability Distribution:

Consider a simple event with these properties:

Each trial has two possible outcomes, called success and failure.

The probability of success on each trial is the same. (We denote the probability of success as $p$ and the probability of failure as $q$ . Note that $q=1-p$ .)

The trials are independent.

If the binomial random variable $X$ counts the number of successes in $n$ trials with probability of success $p$ and the probability of getting $k$ successes in $n$ trials, then $P\left(X=k\right)=\left(\begin{array}{c}n\\ k\end{array}\right)p^k{q}^{n-k}$ .

Calculation:

There are of 8 students in which 23% would like to marry.

We should expect 1.84 of the college students to be married.

The probability of failure $q$ is $1-0.23=0.77$ .

Here, $n=8,q=0.77\text{and}p=23\%=0.23$

  $\begin{array}{c}P\left(8\le X\le 5\right)=P\left(X=5\right)+P\left(X=6\right)+P\left(X=7\right)+P\left(X=8\right)\\ ={\displaystyle \sum _{k=5}^8\left(\begin{array}{c}8\\ k\end{array}\right){(1.84)}^k{(0.77)}^{8-k}}\\ =1.913\%\end{array}$