Q. 7.36

Question

Refer to Exercise 7.6 on page 295.

a. Use your answers from Exercise 7.6(b) to determine the mean, $μ_{s}$ , of the variable $\bar{x}$ for each of the possible sample sizes.

b. For each of the possible sample sizes, determine the mean, $μ_{s}$ , of the variable $\bar{x}$ , using only your answer from Exercise 7.6(a).

Step-by-Step Solution

Verified

Answer

Part a. The variable $\bar{x}$ has a mean value of $μ_{\bar{x}} = 5.5$ for each of the possible sample sizes.

Part b. The population mean is $μ = 5.5$ .

1Part (a) Step 1. Given Information

It is given that the population data is 3,4,7,8.

We need to determine the mean, $μ_{s}$ , of the variable $\bar{x}$ for each of the possible sample sizes.

2Part (a) Step 2. When the sample size is 1

For the population data: 3,4,7,8.

The sample and sample mean for a sample of size $n = 1$ are shown in the table below.

Sample	$\bar{x}$
3	3
4	4
7	7
8	8

The variable $\bar{x}$ has the following mean

$μ_{\bar{x}} = \frac{3 + 4 + 7 + 8}{4} μ_{\bar{x}} = \frac{22}{4} μ_{\bar{x}} = 5.5$

So when the sample size is 1, the variable $\bar{x}$ has a mean $μ_{\bar{x}} = 5.5$ .

3Part (a) Step 3. When the sample size is 2

For the population data: 3,4,7,8.

The sample and sample mean for a sample of size $n = 2$ are shown in the table below.

Sample	$\bar{x}$
3,4	$\frac{3 + 4}{2} = 3.5$
3,7	$\frac{3 + 7}{2} = 5$
3,8	$\frac{3 + 8}{2} = 5.5$
4,7	$\frac{4 + 7}{2} = 5.5$
4,8	$\frac{4 + 8}{2} = 6$
7,8	$\frac{7 + 8}{2} = 7.5$

The variable $\bar{x}$ has the following mean

$μ_{\bar{x}} = \frac{3.5 + 5 + 5.5 + 5.5 + 6 + 7.5}{6} μ_{\bar{x}} = \frac{33}{6} μ_{\bar{x}} = 5.5$

So when the sample size is 2, the variable $\bar{x}$ has a mean $μ_{\bar{x}} = 5.5$ .

4Part (a) Step 4. When the sample size is 3

For the population data: 3,4,7,8.

The sample and sample mean for a sample of size $n = 3$ are shown in the table below.

Sample	$\bar{x}$
3,4,7	$\frac{3 + 4 + 7}{3} = 4.67$
3,4,8	$\frac{3 + 4 + 8}{3} = 5$
3,7,8	$\frac{3 + 7 + 8}{3} = 6$
4,7,8	$\frac{4 + 7 + 8}{3} = 6.33$

The variable $\bar{x}$ has the following mean

$μ_{\bar{x}} = \frac{4.67 + 5 + 6 + 6.33}{4} μ_{\bar{x}} = \frac{22}{4} μ_{\bar{x}} = 5.5$

So when the sample size is 3, the variable $\bar{x}$ has a mean $μ_{\bar{x}} = 5.5$ .

5Part (a) Step 5. When the sample size is 4

For the population data: 3,4,7,8.

The sample and sample mean for a sample of size $n = 4$ are shown in the table below.

Sample	$\bar{x}$
3,4,7,8	$\frac{3 + 4 + 7 + 8}{4} = 5.5$

So when the sample size is 4, the variable $\bar{x}$ has a mean $μ_{\bar{x}} = 5.5$ .

Thus it can be seen that the mean of all potential sample means is the same.

6Part (b) Step 1. Find the population mean

For the given population data: 3,4,7,8 the population mean can be given as

$μ = \frac{3 + 4 + 7 + 8}{4} μ = \frac{22}{4} μ = 5.5$

So from the results, it can be observed that the population mean is equal to the mean of all potential sample means that is $μ_{\bar{x}} = μ$ .

Q. 7.35

Q. 7.37

Other exercises in this chapter

Q. 7.34

Refer to Exercise 7.4 on page 295.a. Use your answers from Exercise 7.4(b) to determine the mean, μs, of the variable x¯ for each of the possible

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Q. 7.35

Refer to Exercise 7.5 on page 295.a. Use your answers from Exercise 7.5(b) to determine the mean, μs, of the variable x¯ for each of the possible

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Q. 7.37

Refer to Exercise 7.7 on page 295.a. Use your answers from Exercise 7.7(b) to determine the mean, μs, of the variable x¯ for each of the possible

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Q. 7.38

Refer to Exercise 7.8 on page 295.a. Use your answers from Exercise 7.8(b) to determine the mean, μs, of the variable x¯ for each of the possible

View solution