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8 . The 99% confidence interval, because it includes all but one percent of the distribution. The 95% confidence interval will be narrower, because it excludes five percent of the distribution.
9 . The t -distribution will have more probability in its tails (“thicker tails”) and less probability near the mean of the distribution (“shorter in the center”).
10 . Both distributions are symmetrical and centered at zero.
11 . df = n – 1 = 20 – 1 = 19
12 . You can get the
t -value from a probability table or a calculator. In this case, for a
t -distribution with 19 degrees of freedom, and a 95% two-sided confidence interval, the value is 2.093, i.e.,
The calculator function is invT(0.975, 19).
13 .
98.4 ± 0.14 = (98.26, 98.54).
The calculator function Tinterval answer is (98.26, 98.54).
14 .
The calculator function is invT(0.995, 19).
98.4 ± 0.19 = (98.21, 98.59). The calculator function Tinterval answer is (98.21, 98.59).
15 .
df =
n – 1 = 30 – 1 = 29.
98.4 ± 0.11 = (98.29, 98.51). The calculator function Tinterval answer is (98.29, 98.51).
16 .
17 . Because you are using the normal approximation to the binomial,
.
Calculate the error bound for the population (
EBP ):
Calculate the 95% confidence interval:
0.56 ± 0.0435 = (0.5165, 0.6035).
The calculator function 1-PropZint answer is (0.5165, 0.6035).
18 .
0.56 ± 0.03 = (0.5236, 0.5964). The calculator function 1-PropZint answer is (0.5235, 0.5965)
19 .
0.56 ± 0.05 = (0.5127, 0.6173).
The calculator function 1-PropZint answer is (0.5028, 0.6172).
20 .
EBP = 0.04 (because 4% = 0.04)
for a 95% confidence interval
You need 601 subjects (rounding upward from 600.25).
21 .
You need 577 subjects (rounding upward from 576.24).
22 .
You need 1,068 subjects (rounding upward from 1,067.11).
23 .
H
0 :
p = 0.58
H
a :
p ≠ 0.58
24 .
H
0 :
p ≥ 0.58
H
a :
p <0.58
25 .
H
0 :
μ ≥ $268,000
H
a :
μ <$268,000
26 . H a : μ ≠ 107
27 . H a : p ≥ 0.25
28 . a Type I error
29 . a Type II error
30 . Power = 1 – β = 1 – P (Type II error).
31 . The null hypothesis is that the patient does not have cancer. A Type I error would be detecting cancer when it is not present. A Type II error would be not detecting cancer when it is present. A Type II error is more serious, because failure to detect cancer could keep a patient from receiving appropriate treatment.
32 . The screening test has a ten percent probability of a Type I error, meaning that ten percent of the time, it will detect TB when it is not present.
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