unit 6: Sampling distributions

Question 1

We view statistics as random variables that have probability distributions

Answer 1

true

Question 2

We view parameters as random variables that have probability distributions.

Answer 2

false
A parameter’s value is not usually known, but it is a fixed value that does not change from sample to
sample

Question 3

The sampling distribution of a statistic is the probability distribution of the statistic

Answer 3

true

“Sampling distribution” is another name for the probability distribution of a statistic.

Question 4

In repeated sampling, the value of a statistic will vary about the parameter it estimates.

Answer 4

true

Question 5

In repeated sampling, the value of a parameter will vary about the statistic that estimates it.

Answer 5

false
A parameter’s value is not usually known, but it is a fixed value that does not change
from sample to sample.

Question 6

The sampling distribution of µ is normal, provided n is large. Is this
statement true or false?

Answer 6

False. µ is a parameter, and as such it does not have a sampling distribution. (We view µ as a fixed,
unchanging value.)

Question 7

The standard deviation of the sampling distribution of the sample mean depends on the value of µ

Answer 7

False. σX¯ = √σ/n

depends only on σ and n

Question 8

We cannot possibly determine any characteristics of a statistic’s sampling distribution without
repeatedly sampling from the population.

Answer 8

False. We can often mathematically determine

characteristics of the sampling distribution

Question 9

The sampling distribution of X¯ is always at least approximately normal for large sample sizes,
and is sometimes approximately normal for small sample sizes.

Answer 9

true

Question 10

If the sample size is quadrupled, then the standard deviation of the sampling distribution of
the sample mean decreases by a factor of 2.

Answer 10

True. √σ/n

Question 11

If we draw a very large sample from any population and plot a histogram of the observations,
the shape of the histogram will be approximately normal.

Answer 11

False. A histogram of a large number of observations sampled from a distribution will look like the distribution from which we are sampling

Question 12

In practice, we usually know the true standard deviation of the sampling distribution of X¯.

Answer 12

false
The population standard deviation σ is almost always unknown, and so the true standard deviation of the sampling distribution of X¯ (σX¯ = √σ/n) is almost always unknown.

Question 13

In practice, we usually know the true value of µ

Answer 13

False. In practical problems, the parameter µ

is almost always unknown

Question 14

The sample mean is an unbiased estimator of the population mean.

Answer 14

True. E(X¯) = µ.

Question 15

If we were to repeatedly sample from a population, then the distribution of the sample mean
would become approximately normal as the number of samples increases, as long as the sample
size of each sample stays constant.

Answer 15

False. The distribution of X¯ becomes approximately normal
as the sample size n increases (in other words, as the number of values used to calculate the mean increases).
Repeatedly sampling from a population doesn’t change the sampling distribution of
X¯.

Question 16

Statistics have sampling distributions.

Answer 16

true

Question 17

The value of a parameter does not vary from sample to sample

Answer 17

true

parameter is the true value of the population

Question 18

The value of a statistic does not vary from sample to sample

Answer 18

false

Question 19

All else being equal, the standard deviation of the sampling distribution of the sample mean will be smaller for n = 10 than for n = 40.

Answer 19

False. σX¯ = √σ/ n
decreases for increasing sample
size

Question 20

The sampling distribution of µ is usually approximately normal for n > 30

Answer 20

µ IS A FIXED KNWON QUANTITY IS DOES NOT HAVE A SAMPLING DISTRIBUTION