statitstics work
9.1.2
Many high school students take the AP tests in different subject areas. In 2007, of the 144,796 students who took the biology exam 84,199 of them were female. In that same year, of the 211,693 students who took the calculus AB exam 102,598 of them were female (“AP exam scores,” 2013). Estimate the difference in the proportion of female students taking the biology exam and female students taking the calculus AB exam using a 90% confidence level.
9.1.5
Are there more children diagnosed with Autism Spectrum Disorder (ASD) in states that have larger urban areas over states that are mostly rural? In the state of Pennsylvania, a fairly urban state, there are 245 eight year olds diagnosed with ASD out of 18,440 eight year olds evaluated. In the state of Utah, a fairly rural state, there are 45 eight year olds diagnosed with ADS out of 2,123 eight year olds evaluated (“Autism and developmental,” 2008). Is there enough evidence to show that the proportion of children diagnosed with ASD in Pennsylvania is more than the proportion in Utah? Test at the 1% level.
In each problem show all steps of the hypothesis test or confidence interval. If some of the assumptions are not met, note that the results of the test or interval may not be correct and then continue the process of the hypothesis test or confidence interval.
9.2.3
All Fresh Seafood is a wholesale fish company based on the east coast of the U.S. Catalina Offshore Products is a wholesale fish company based on the west coast of the U.S. Table #9.2.5 contains prices from both companies for specific fish types (“Seafood online,” 2013) (“Buy sushi grade,” 2013). Do the data provide enough evidence to show that a west coast fish wholesaler is more expensive than an east coast wholesaler? Test at the 5% level.
Table #9.2.5: Wholesale Prices of Fish in Dollars
Fish | All Fresh Seafood Prices | Catalina Offshore Products Prices |
Cod | 19.99 | 17.99 |
Tilapia | 6.00 | 13.99 |
Farmed Salmon | 19.99 | 22.99 |
Organic Salmon | 24.99 | 24.99 |
Grouper Fillet | 29.99 | 19.99 |
Tuna | 28.99 | 31.99 |
Swordfish | 23.99 | 23.99 |
Sea Bass | 32.99 | 23.99 |
Striped Bass | 29.99 | 14.99 |
9.2.6
The British Department of Transportation studied to see if people avoid driving on Friday the 13th. They did a traffic count on a Friday and then again on a Friday the 13th at the same two locations (“Friday the 13th,” 2013). The data for each location on the two different dates is in table #9.2.6. Estimate the mean difference in traffic count between the 6th and the 13th using a 90% level.
Table #9.2.6: Traffic Count
Dates | 6th | 13th |
1990, July | 139246 | 138548 |
1990, July | 134012 | 132908 |
1991, September | 137055 | 136018 |
1991, September | 133732 | 131843 |
1991, December | 123552 | 121641 |
1991, December | 121139 | 118723 |
1992, March | 128293 | 125532 |
1992, March | 124631 | 120249 |
1992, November | 124609 | 122770 |
1992, November | 117584 | 117263 |
In each problem show all steps of the hypothesis test or confidence interval. If some of the assumptions are not met, note that the results of the test or interval may not be correct and then continue the process of the hypothesis test or confidence interval.
9.3.1
The income of males in each state of the United States, including the District of Columbia and Puerto Rico, are given in table #9.3.3, and the income of females is given in table #9.3.4 (“Median income of,” 2013). Is there enough evidence to show that the mean income of males is more than of females? Test at the 1% level.
Table #9.3.3: Data of Income for Males
$42,951 | $52,379 | $42,544 | $37,488 | $49,281 | $50,987 | $60,705 |
$50,411 | $66,760 | $40,951 | $43,902 | $45,494 | $41,528 | $50,746 |
$45,183 | $43,624 | $43,993 | $41,612 | $46,313 | $43,944 | $56,708 |
$60,264 | $50,053 | $50,580 | $40,202 | $43,146 | $41,635 | $42,182 |
$41,803 | $53,033 | $60,568 | $41,037 | $50,388 | $41,950 | $44,660 |
$46,176 | $41,420 | $45,976 | $47,956 | $22,529 | $48,842 | $41,464 |
$40,285 | $41,309 | $43,160 | $47,573 | $44,057 | $52,805 | $53,046 |
$42,125 | $46,214 | $51,630 |
Table #9.3.4: Data of Income for Females
$31,862 | $40,550 | $36,048 | $30,752 | $41,817 | $40,236 | $47,476 | $40,500 |
$60,332 | $33,823 | $35,438 | $37,242 | $31,238 | $39,150 | $34,023 | $33,745 |
$33,269 | $32,684 | $31,844 | $34,599 | $48,748 | $46,185 | $36,931 | $40,416 |
$29,548 | $33,865 | $31,067 | $33,424 | $35,484 | $41,021 | $47,155 | $32,316 |
$42,113 | $33,459 | $32,462 | $35,746 | $31,274 | $36,027 | $37,089 | $22,117 |
$41,412 | $31,330 | $31,329 | $33,184 | $35,301 | $32,843 | $38,177 | $40,969 |
$40,993 | $29,688 | $35,890 | $34,381 |
9.3.3
A study was conducted that measured the total brain volume (TBV) (in mm3 ) of patients that had schizophrenia and patients that are considered normal. Table #9.3.5 contains the TBV of the normal patients and table #9.3.6 contains the TBV of schizophrenia patients (“SOCR data oct2009,” 2013). Is there enough evidence to show that the patients with schizophrenia have less TBV on average than a patient that is considered normal? Test at the 10% level.
Table #9.3.5: Total Brain Volume (in mm3 ) of Normal Patients
1663407 | 1583940 | 1299470 | 1535137 | 1431890 | 1578698 |
1453510 | 1650348 | 1288971 | 1366346 | 1326402 | 1503005 |
1474790 | 1317156 | 1441045 | 1463498 | 1650207 | 1523045 |
1441636 | 1432033 | 1420416 | 1480171 | 1360810 | 1410213 |
1574808 | 1502702 | 1203344 | 1319737 | 1688990 | 1292641 |
1512571 | 1635918 |
Table #9.3.6: Total Brain Volume (in mm3 ) of Schizophrenia Patients
1331777 | 1487886 | 1066075 | 1297327 | 1499983 | 1861991 |
1368378 | 1476891 | 1443775 | 1337827 | 1658258 | 1588132 |
1690182 | 1569413 | 1177002 | 1387893 | 1483763 | 1688950 |
1563593 | 1317885 | 1420249 | 1363859 | 1238979 | 1286638 |
1325525 | 1588573 | 1476254 | 1648209 | 1354054 | 1354649 |
1636119 |
9.3.4
A study was conducted that measured the total brain volume (TBV) (in mm3 ) of patients that had schizophrenia and patients that are considered normal. Table #9.3.5 contains the TBV of the normal patients and table #9.3.6 contains the TBV of schizophrenia patients (“SOCR data oct2009,” 2013). Compute a 90% confidence interval for the difference in TBV of normal patients and patients with Schizophrenia.
9.3.8
The number of cell phones per 100 residents in countries in Europe is given in table #9.3.9 for the year 2010. The number of cell phones per 100 residents in countries of the Americas is given in table #9.3.10 also for the year 2010 (“Population reference bureau,” 2013). Find the 98% confidence interval for the difference in mean number of cell phones per 100 residents in Europe and the Americas.
Table #9.3.9: Number of Cell Phones per 100 Residents in Europe
100 | 76 | 100 | 130 | 75 | 84 |
112 | 84 | 138 | 133 | 118 | 134 |
126 | 188 | 129 | 93 | 64 | 128 |
124 | 122 | 109 | 121 | 127 | 152 |
96 | 63 | 99 | 95 | 151 | 147 |
123 | 95 | 67 | 67 | 118 | 125 |
110 | 115 | 140 | 115 | 141 | 77 |
98 | 102 | 102 | 112 | 118 | 118 |
54 | 23 | 121 | 126 | 47 |
Table #9.3.10: Number of Cell Phones per 100 Residents in the Americas
158 | 117 | 106 | 159 | 53 | 50 |
78 | 66 | 88 | 92 | 42 | 3 |
150 | 72 | 86 | 113 | 50 | 58 |
70 | 109 | 37 | 32 | 85 | 101 |
75 | 69 | 55 | 115 | 95 | 73 |
86 | 157 | 100 | 119 | 81 | 113 |
87 | 105 | 96 |
In each problem show all steps of the hypothesis test. If some of the assumptions are not met, note that the results of the test may not be correct and then continue the process of the hypothesis test.
11.3.2
Levi-Strauss Co manufactures clothing. The quality control department measures weekly values of different suppliers for the percentage difference of waste between the layout on the computer and the actual waste when the clothing is made (called run-up). The data is in table #11.3.3, and there are some negative values because sometimes the supplier is able to layout the pattern better than the computer (“Waste run up,” 2013). Do the data show that there is a difference between some of the suppliers? Test at the 1% level.
Table #11.3.3: Run-ups for Different Plants Making Levi Strauss Clothing
Plant 1 | Plant 2 | Plant 3 | Plant 4 | Plant 5 |
1.2 | 16.4 | 12.1 | 11.5 | 24 |
10.1 | -6 | 9.7 | 10.2 | -3.7 |
-2 | -11.6 | 7.4 | 3.8 | 8.2 |
1.5 | -1.3 | -2.1 | 8.3 | 9.2 |
-3 | 4 | 10.1 | 6.6 | -9.3 |
-0.7 | 17 | 4.7 | 10.2 | 8 |
3.2 | 3.8 | 4.6 | 8.8 | 15.8 |
2.7 | 4.3 | 3.9 | 2.7 | 22.3 |
-3.2 | 10.4 | 3.6 | 5.1 | 3.1 |
-1.7 | 4.2 | 9.6 | 11.2 | 16.8 |
2.4 | 8.5 | 9.8 | 5.9 | 11.3 |
0.3 | 6.3 | 6.5 | 13 | 12.3 |
3.5 | 9 | 5.7 | 6.8 | 16.9 |
-0.8 | 7.1 | 5.1 | 14.5 | |
19.4 | 4.3 | 3.4 | 5.2 | |
2.8 | 19.7 | -0.8 | 7.3 | |
13 | 3 | -3.9 | 7.1 | |
42.7 | 7.6 | 0.9 | 3.4 | |
1.4 | 70.2 | 1.5 | 0.7 | |
3 | 8.5 | |||
2.4 | 6 | |||
1.3 | 2.9 |
11.3.4
A study was undertaken to see how accurate food labeling for calories on food that is considered reduced calorie. The group measured the amount of calories for each item of food and then found the percent difference between measured and labeled food, (measured – labeled)/ labeled *100%. The group also looked at food that was nationally advertised, regionally distributed, or locally prepared. The data is in table #11.3.5 (“Calories datafile,” 2013). Do the data indicate that at least two of the mean percent differences between the three groups are different? Test at the 10% level.
Table #11.3.5: Percent Differences Between Measured and Labeled Food
National Advertised | Regionally Distributed | Locally Prepared |
2 | 41 | 15 |
-28 | 46 | 60 |
-6 | 2 | 250 |
8 | 25 | 145 |
6 | 39 | 6 |
-1 | 16.5 | 80 |
10 | 17 | 95 |
13 | 28 | 3 |
15 | -3 | |
-4 | 14 | |
-4 | 34 | |
-18 | 42 | |
10 | ||
5 | ||
3 | ||
-7 | ||
3 | ||
-0.5 | ||
-10 | ||
6 |
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