Chapter 7 - Statistical Intervals Based on a Single Sample
COMPLETION
1. The formula used to construct a 95% confidence interval for the mean of a normal population when the value of the
standard deviation is known is given by .
ANS:
PTS: 1
2. If the random sample is taken from a normal distribution with mean value and standard deviation ,
then regardless of the sample size n, the sample mean is distributed with expected value and standard
deviation .
ANS: normally, ,
PTS: 1
3. The standard normal random variable has a mean value of and standard deviation of
.
ANS: 0, 1
PTS: 1
4. If a confidence level of 90% is used to construct a confidence interval for the mean of a normal population when
the value of the standard deviation is known, the z critical value is .
ANS: 1.645
PTS: 1
5. If you want to develop a 99% confidence interval for the mean of a normal population, when the standard deviation
is known, the confidence level is .
ANS: .99
PTS: 1
6. If we think of the width of the confidence interval as specifying its precision or accuracy, then the confidence level
(or reliability) of the interval is related to its precision.
ANS: inversely
PTS: 1
7. The ability of a confidence interval to contain the value of the population mean is described by the .
ANS: confidence level
PTS: 1
, 8. Let be a random sample from a population having a mean and standard deviation . Provided that
n is large, the Central Limit Theorem (CLT) implies that is distributed.
ANS: approximately normally
PTS: 1
9. A random sample of 50 observations produced a mean value of 55 and standard deviation of 6.25. The 95% confidence
interval for the population mean is between and . (two decimal places)
ANS: 53.27, 56.73
PTS: 1
10. The formula used to construct approximately confidence interval for a population proportion p when the
sample size n is large enough is given by , where is the sample proportion,
and
ANS:
PTS: 1
11. A large-sample lower confidence bound for the population mean .
ANS:
PTS: 1
12. When is the mean of a random sample of size n (n is small) from a normal population with mean , the random
variable has a probability distribution called t-distribution with n-1 .
ANS: degrees of freedom
PTS: 1
13. When is the mean of a random sample of size n (n is large) from a normal population with mean , the random
variable has approximately a distribution with mean value of and
standard deviation of .
ANS: standard normal, 0,1
PTS: 1
14. Let denote the density function curve for a t-distribution with degrees of freedom. As , the spread
of the corresponding curve decreases.
ANS: increases
, PTS: 1
15. The z curve is often called the t curve with degrees of freedom equal to .
ANS:
PTS: 1
16. The area under a t-density curve between the critical values is .
ANS:
PTS: 1
17. Let be a random sample from a normal distribution with mean and variance . Then the random
variable has a probability distribution with degrees of freedom.
ANS: chi-squared
PTS: 1
18. The chi-squared critical value, , denotes the number on the measurement axis such that of the area
under the chi-squared curve with degrees of freedom lies to the of .
ANS: right
PTS: 1
19. The 5th percentile of a chi-squared distribution with 10 degrees of freedom is equal to .
ANS: 3.94
PTS: 1
20. The 90th percentile of a chi-squared distribution with 15 degrees of freedom is equal to .
ANS: 22.307
PTS: 1
21. The area under a chi-squared curve with 10 degrees of freedom, which is captured between the two critical values
is .
ANS:
PTS: 1
COMPLETION
1. The formula used to construct a 95% confidence interval for the mean of a normal population when the value of the
standard deviation is known is given by .
ANS:
PTS: 1
2. If the random sample is taken from a normal distribution with mean value and standard deviation ,
then regardless of the sample size n, the sample mean is distributed with expected value and standard
deviation .
ANS: normally, ,
PTS: 1
3. The standard normal random variable has a mean value of and standard deviation of
.
ANS: 0, 1
PTS: 1
4. If a confidence level of 90% is used to construct a confidence interval for the mean of a normal population when
the value of the standard deviation is known, the z critical value is .
ANS: 1.645
PTS: 1
5. If you want to develop a 99% confidence interval for the mean of a normal population, when the standard deviation
is known, the confidence level is .
ANS: .99
PTS: 1
6. If we think of the width of the confidence interval as specifying its precision or accuracy, then the confidence level
(or reliability) of the interval is related to its precision.
ANS: inversely
PTS: 1
7. The ability of a confidence interval to contain the value of the population mean is described by the .
ANS: confidence level
PTS: 1
, 8. Let be a random sample from a population having a mean and standard deviation . Provided that
n is large, the Central Limit Theorem (CLT) implies that is distributed.
ANS: approximately normally
PTS: 1
9. A random sample of 50 observations produced a mean value of 55 and standard deviation of 6.25. The 95% confidence
interval for the population mean is between and . (two decimal places)
ANS: 53.27, 56.73
PTS: 1
10. The formula used to construct approximately confidence interval for a population proportion p when the
sample size n is large enough is given by , where is the sample proportion,
and
ANS:
PTS: 1
11. A large-sample lower confidence bound for the population mean .
ANS:
PTS: 1
12. When is the mean of a random sample of size n (n is small) from a normal population with mean , the random
variable has a probability distribution called t-distribution with n-1 .
ANS: degrees of freedom
PTS: 1
13. When is the mean of a random sample of size n (n is large) from a normal population with mean , the random
variable has approximately a distribution with mean value of and
standard deviation of .
ANS: standard normal, 0,1
PTS: 1
14. Let denote the density function curve for a t-distribution with degrees of freedom. As , the spread
of the corresponding curve decreases.
ANS: increases
, PTS: 1
15. The z curve is often called the t curve with degrees of freedom equal to .
ANS:
PTS: 1
16. The area under a t-density curve between the critical values is .
ANS:
PTS: 1
17. Let be a random sample from a normal distribution with mean and variance . Then the random
variable has a probability distribution with degrees of freedom.
ANS: chi-squared
PTS: 1
18. The chi-squared critical value, , denotes the number on the measurement axis such that of the area
under the chi-squared curve with degrees of freedom lies to the of .
ANS: right
PTS: 1
19. The 5th percentile of a chi-squared distribution with 10 degrees of freedom is equal to .
ANS: 3.94
PTS: 1
20. The 90th percentile of a chi-squared distribution with 15 degrees of freedom is equal to .
ANS: 22.307
PTS: 1
21. The area under a chi-squared curve with 10 degrees of freedom, which is captured between the two critical values
is .
ANS:
PTS: 1
