Q. 7.35

Question

Refer to Exercise 7.5 on page 295.

a. Use your answers from Exercise 7.5(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 7.5(a).

Step-by-Step Solution

Verified

Answer

Part a. The variable $\bar{x}$ has a mean value of $μ_{\bar{x}} = 2.5$ for each of the possible sample sizes.

Part b. The population mean is $μ = 2.5$ .

1Part (a) Step 1. Given Information

It is given that the population data is 1,2,3,4.

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: 1,2,3,4.

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

Sample	$\bar{x}$
1	1
2	2
3	3
4	4

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

$μ_{\bar{x}} = \frac{1 + 2 + 3 + 4}{4} μ_{\bar{x}} = \frac{10}{4} μ_{\bar{x}} = 2.5$

So when the sample size is 1, the variable $\bar{x}$ has a mean $μ_{\bar{x}} = 2.5$ .

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

For the population data: 1,2,3,4.

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

Sample	$\bar{x}$
1,2	$\frac{1 + 2}{2} = 1.5$
1,3	$\frac{1 + 3}{2} = 2$
1,4	$\frac{1 + 4}{2} = 2.5$
2,3	$\frac{2 + 3}{2} = 2.5$
2,4	$\frac{2 + 4}{2} = 3$
3,4	$\frac{3 + 4}{2} = 3.5$

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

$μ_{\bar{x}} = \frac{1.5 + 2 + 2.5 + 2.5 + 3 + 3.5}{6} μ_{\bar{x}} = \frac{15}{6} μ_{\bar{x}} = 2.5$

So when the sample size is 2, the variable $\bar{x}$ has a mean $μ_{\bar{x}} = 2.5$ .

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

For the population data: 1,2,3,4.

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

Sample	$\bar{x}$
1,2,3	$\frac{1 + 2 + 3}{3} = 2$
1,2,4	$\frac{1 + 2 + 4}{3} = 2.33$
1,3,4	$\frac{1 + 3 + 4}{3} = 2.67$
2,3,4	$\frac{2 + 3 + 4}{3} = 3$

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

$μ_{\bar{x}} = \frac{2 + 2.33 + 2.67 + 3}{4} μ_{\bar{x}} = \frac{10}{4} μ_{\bar{x}} = 2.5$

So when the sample size is 3, the variable $\bar{x}$ has a mean $μ_{\bar{x}} = 2.5$ .

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

For the population data: 1,2,3,4.

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

Sample	$\bar{x}$
1,2,3,4	$\frac{1 + 2 + 3 + 4}{4} = 2.5$

So when the sample size is 4, the variable $\bar{x}$ has a mean $μ_{\bar{x}} = 2.5$ .

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: 1,2,3,4 the population mean can be given as

$μ = \frac{1 + 2 + 3 + 4}{4} μ = \frac{10}{4} μ = 2.5$

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. 7.34

Q. 7.36

Other exercises in this chapter

Q. 7.29

Does the sample size have an effect on the standard deviation of all possible sample means? Explain your answer.

View solution

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. 7.36

Refer to Exercise 7.6 on page 295.a. Use your answers from Exercise 7.6(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

View solution