probability and statistics semester review. -
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1) Find the mean, median, mode, 5% trimmed mean, midrange, range, and standard deviation for the data. What percentile is 23? Where is the 40th percentile?
311243Range 22.11
41Mode 5.272
4312midrange
375.30 32~ 8.29 %5
xxx
23 = 3/10 = 30th Percentile P40 = (23+27)/2 = 25
Use the following data for questions 1-4: 12,14,21,23,27,37,39,41,41,43
Construct a box and whisker plot. Find the inner quartile range. Label the inner and outer fences.
12 21 32 41 43
IQR = 41-21 = 01Inner fences (1.5)*20 = 30 (-9,71)Outer fence (3.0)*20 = 60 (-39, 101)
10 20 30 40 50
2 2
3 3
3) Construct a histogram for the data using the given class intervals [10, 20), [20, 30). [30, 40), [40, 50)
x (15)(2) (25)(3) (35)(2) 45(3)
1031
L a
a b
W 20
1
11
10 25
5.421031
140
W
ba
aL
30102
52
10
302
W
f
FN
L
2
2
37
10
3
2
3
Construct a frequency curve and ogive. Estimate the mean, standard deviation, the median and the mode.
Mode
Median
100,22352 C
18
5
36
10
How many ways can three cards be chosen for 52?
What is the probability that the sum of two six sided dice is less than 6?
(1,1) (1,2), (1,3),(1,4) (2,1), (2,2), (2,3) (3,1),(3,2)(4,1)
75.4.
3. 428.
7.
3.
1035.512
53
1024
106
4
3
4
1
4
3
4
1
4
3
4
105
55
14
45
23
35
CCC
P(A) =.7, P(B) =.4, P(A B) =.3. Find A B .4 .3 .1 .2
a. P(A U B) b. P(A|B) c. P(Ac) d. P(B|A) e. P(Ac U B)
9) Find the probability of getting at least 3 questions right on a 5 question multiple choice test with four possible
answers.
8. 3. 6.
10) If a person is vaccinated properly, the probability of getting the disease is .04. Without the vaccination, the probability of getting the disease is .30. Assume 1/4 of the population is properly vaccinated.
1.00
.25 .75
.01 .24 .225 .525
Proper Improper
DD N N
a. If a person is selected at random, what is the probability they will get the disease? .01+ .225 = .235
b. If a person gets the disease, what is the probability that they were properly vaccinated? P(V|D) = .01/.235 = .0425
11) The probability that a part is defective is .15. Find the expected value of defective parts and the standard deviation out of a lot of 100 parts. What interval would contain about 68% of the parts?
a. Expected value = n p = (100)(.15) = 15
57.3)85)(.15)(.100(b. npq
c. 15 + 3.57 (11.43, 18.57)
12) An average for a test is 85 with a standard deviation of 4.2.
a. What is the probability that the score is between 81 and 84?
z x
81 85
4.2 .95 .3295
84 85
4.2 2.3 .0940
.3295 - .0940 = .2355
b. What is the probability that the score is less than 88?
z x
88 85
4.2.71 .2612
.5000 .2612 .7612
c. What score must be obtained in order to be in the top 10%?
z x
1.22 x 85
4.2
(1.22)(4.2) x 85
x 90.376
e r
r!
e 4 46
6!.1042
1e 4 40
0!
e 4 41
1!
e 4 42
2!
.7619
13) The average number of bulls that walk into a barn is 4 each day.
a. What is the probability that 6 walk in on a given day?
b. What is the probability that more than 2 walk in on any given day?
14) A sample of 20 ACT scores was taken from a random sample. Find a 95% and a 99% confidence interval for . Assume normal distribution.
14,23,20,15,21,31,21,26,27,22,19,22,30,14,16,22,28,29,24,26
x 22.5
s 5.20
SE s
n5.20
201.16
99% 22.5 + 2.861(1.16) = (19.18,25.82)
95% 22.5 + 2.091(1.16) = (20.07,24.93)
15) About 200 baseball players were surveyed. A random sample of n = 40 yields a mean annual income of $1,200,000 and an estimated standard deviation of s = $250,000. Use this information to find an 85% confidence interval. Use Chebyshev's theorem. (Small population, not normally distributed).
1 1
k 2 .85 120000002.58250000
40
1
k 2 .15 (1098016.55,1301983.45)
k 2.58
16) A poll of 400 voters in Wisconsin found that 210 preferred candidate A and a poll of 300 voters in Minnesota found that 140 preferred Candidate A. Find a 90% confidence intervals for the proportions of all voters who prefer Candidate A. Is there a difference between Wisconsin and Minnesota?
P 350
700.5 PW 210
400.525 PM
140
300.467
.5 1.645(.5)(.5)
700 .525 .467 1.645
(.525)(.475)
399
(.467)(.533)
299(.469.531) ( .0044,.121) No Difference
17) In a large population of students, a school claims that the average ACT score
is µ = 25. A newspaper disputes this claim and obtains a random sample of 34 students which yields an average of 24.2, and s = 6.2. Conduct a hypothesis test at the 10% level to determine whether there is statistical evidence that the survey is different than the actual population.
different are scores that thelevel .1 the
at evidenceenough not reject, toFail 5. 30 test tailTwo .2
25:
752.06.1
8.
34
2.6252.24
.4 25: .1
nz
H
SE
xzH
A
O
-1.645 1.645
3.
18) A random sample of n = 10 prices of CDs gives the following values: $24.19, $21.04, $12.34, $16.07, $19.65, $19.36, $15.99, $15.02, $18.68, $20.60 Conduct a hypothesis test at 10% level of significance to determine whether evidence exists to support the claim that the population mean is more that $19.00.
$19.00
thanmore ismean that thelevel .1
at the evidenceenough not reject, toFail 5. 30 t test tailOne .2
19:
6845.
10
45.31929.18
.4 19: .1
n
H
SE
xtH
A
O
3.
1.383
19) A test was designed to test student’s ability to learn statistics. Thousands took the test and were divided by sex. A random sample of 50 was chosen from each group. The females had an average of 44 with a standard deviation of s = 2.1 and the males had an average of 45 with a standard deviation of s = 2.3. Construct a 95% confidence interval for the difference in mean test scores of the two populations.
x F 44 sF 2.1
x M 45 sF 2.3
45 44 1.962.12
50
2.32
50(.1367,1.863)
Male Female
Hired 200 300
Interviewed
450 500
20) The following is a random sample of numbers of people who were hired at a company over the last 10 years. Construct a 70% and 90% confidence interval for the difference in male and female hirings. Perform a hypothesis test at the 5% significance level for the difference between populations. What conclusion can be made?
PM 200
450.44 PF
300
500.6
.6 .444 1.04(.44)(.56)
449 (.6)(.4)
499(.122,.189)
.6 .444 1.645(.44)(.56)
449
(.6)(.4)
499(.1028,.2083)
Hiring practices are different at both levels
21) 15 similar students were tested to determine whether they did better after taking the ACT test once. Use the method of matched pair an perform a hypothesis test at the .1 level to determine if scores improved.
Pair No. One Test Two Tests Difference1 21 23 22 18 17 -13 22 25 34 24 24 05 23 22 -16 30 33 37 19 24 58 21 19 -29 27 26 -110 22 20 -211 23 26 312 18 21 313 21 21 014 15 16 115 21 22 1
d .933 sd 2.15
improved. scores that thelevel .1 the
at evidenceenough ,HReject 5.
680.1
15
15.20933.
.4
3.
d.f. 14 30 t test tailOne .2
0:
0: .1
O
SE
xt
n
H
H
dA
dO
1.345
22) Find the correlation coefficient and the line of best fit for the following data:
(3,8) (6,10) (8,14) (12,20) (7,12) (15,28) (13,22) (14,29) (16,38)
y = 2.1x – 1.8 r = .949
23) The following table shows billions of miles traveled by air, bus, and rail during the last 5 decades. Conduct a hypothesis test at the 10% level of significance to determine whether the data in the table supports the claim that the mode of transportation is not independent of the decade.
Air Bus Rail Total1940s 1 1 24 261950s 10 26 32 681960s 34 19 22 751970s 119 25 11 1551980s 219 28 12 259 Total 383 99 101 583
Air Bus Rail
1940s 17 4 41950s 45 11 121960s 49 13 131970s 101 26 261980s 170 44 44
Observed Expected
level. .1 the 3.
att independennot are decade and mode d.f. 8 = 1)-1)(3-(5
thatevidenceEnough ,HReject 5. test Square Chi .2
tindependennot are Mode and Decade:
243 .4 t independen are Mode and Decade: .1
O
2
A
O
H
H
13.362
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