confidence interval of months to months has been found for the mean duration of imprisonment, , of political prisoners of a certain country with chronic PTSD.a. Determine the margin of error, E.b. Explain the meaning of E in this context in terms of the accuracy of the estimate.c. Find the sample size required to have a margin of error of months and a % confidence level. (Use months.)d. Find a % confidence interval for the mean duration of imprisonment, , if a sample of the size determined in part (c) has a mean of months.

A 95% confidence interval of 19.3 months to 47.5 months has been found for the mean duration of? imprisonment, ??,of political prisoners of a certain country with chronic PTSD.

a. Determine the margin of error, E.

b. Explain the meaning of E in this context in terms of the accuracy of the estimate.

c. Find the sample size required to have a margin of error of 13 months and a 99% confidence level.? (Use 38 months. for standard deviation )

d. Find a 99% confidence interval for the mean duration of? imprisonment, ??, if a sample of the size determined in part? (c) has a mean of 36.5 months.

Answer:

a

[tex]E = 14.1 [/tex]

b

In this context E tell us that the true mean will lie within E = 14.1 of the sample mean

c

[tex]n =57 [/tex]

d

[tex] 23.514 < \mu < 49.486[/tex]

Step-by-step explanation:

Considering question a

From the question we are told that

The upper limit is U = 47.5 months

The lower limit is L = 19.3 months

Generally the margin of error is mathematically represented as

[tex]E = \frac{U - L }{2}[/tex]

=> [tex]E = \frac{ 47.5 - 19.3 }{2}[/tex]

=> [tex]E = 14.1 [/tex]

Considering question b

In this context E tell us that the true mean will lie within E = 14.1 of the sample mean

Considering question c

Generally the sample size is mathematically represented as

[tex]n = [ \frac{ Z_{\frac{\alpha }{2} * \sigma }}{ E} ]^2[/tex]

Here E is given as E = 13

Given that the confidence level is 99% then the level of significance is

[tex]\alpha = (100 - 99 )\%[/tex]

=> [tex]\alpha = 0.01 [/tex]

From the normal distribution table the critical value of [tex]\frac{\alpha }{2}[/tex] is

[tex]Z_{\frac{\alpha }{2} } = Z_{\frac{0.01 }{2} } = 2.58[/tex]

So

[tex] n = [ \frac{2.58 * 38}{13}]^2[/tex]

=> [tex]n =57 [/tex]

Considering question d

From the question

The sample mean is [tex]\= x = 36.5[/tex]

Generally the margin of error is mathematically represented as

[tex]E = Z_{\frac{\alpha }{2} } * \frac{\sigma }{n}[/tex]

=> [tex]E = 2.58 * \frac{38 }{57}[/tex]

=> [tex]E = 12.986 [/tex]

Generally the 99% confidence interval for mean distribution is mathematically represented as

[tex] 36.5 - 12.986 < \mu < 36.5 + 12.986[/tex]

=> [tex] 23.514 < \mu < 49.486[/tex]