{ "key_pair_value_system": true, "answer_rating_count": "", "question_feedback_html": { "html_star": "", "html_star_feedback": "" }, "answer_average_rating_value": "", "answer_date_js": "2024-06-28T07:20:03-04:00", "answer_date": "2024-06-28 07:20:03", "is_docs_available": null, "is_excel_available": null, "is_pdf_available": null, "count_file_available": 0, "main_page": "student_question_view", "question_id": "4262232", "url": "\/study-help\/questions\/healthy-systolic-blood-pressure-ranges-from-90-to-120-mmhg-4262232", "question_creation_date_js": "2024-06-28T07:20:03-04:00", "question_creation_date": "Jun 28, 2024 07:20 AM", "meta_title": "[Solved] Healthy systolic blood pressure ranges fr | SolutionInn", "meta_description": "Answer of - Healthy systolic blood pressure ranges from 90 to 120 mmHg. Does the data provide evidence that patients with heart di | SolutionInn", "meta_keywords": "healthy,systolic,blood,pressure,ranges,90,120,mmhg,data,provide,evidence,patients", "question_title_h1": "Healthy systolic blood pressure ranges from 90 to 120 mmHg. Does the data provide evidence that patients with heart disease have a mean above this", "question_title": "Healthy systolic blood pressure ranges from 90 to 120 mmHg. Does the", "question_title_for_js_snippet": "Healthy systolic blood pressure ranges from 90 to 120 mmHg Does the data provide evidence that patients with heart disease have a mean above this level Use the dataset and the resting blood pressure variable to conduct a significance test at a 5 significance level and determine if the data does or does not provide significant evidence in favor of the claim that the mean resting blood pressure is greater than 125 mmHg a State the null and alternative hypothesis b Compute the sample mean and the sample standard deviation from the dataset c Compute a test statistic and P value Identify your test statistic as z or t and give the degrees of freedom if necessary d ) Based on your results, what conclusion do you reach e ) Briefly explain what the phrase statistically significant means and how it applies to this situation f Discuss the effect on your conclusion above if you increased or decreased the significance level Patient age chest pain level resting blood pressure cholesterol level fasting blood sugar restecg max hr during thalach exang 1 63 3 145 233 1 0 150 0 2 37 2 130 250 0 1 187 0 3 41 1 130 204 0 0 172 0 4 56 1 120 236 0 1 178 0 5 57 0 120 354 0 1 163 1 6 57 0 140 192 0 1 148 0 7 56 1 140 294 0 0 153 0 8 44 1 120 263 0 1 173 0 9 52 2 172 199 1 1 162 0 10 57 2 150 168 0 1 174 0 11 54 0 140 239 0 1 160 0 12 48 2 130 275 0 1 139 0 13 49 1 130 266 0 1 171 0 14 64 3 110 211 0 0 144 1 15 58 3 150 283 1 0 162 0 16 50 2 120 219 0 1 158 0 17 58 2 120 340 0 1 172 0 18 66 3 150 226 0 1 114 0 19 43 0 150 247 0 1 171 0 20 69 3 140 239 0 1 151 0 21 59 0 135 234 0 1 161 0 22 44 2 130 233 0 1 179 1 23 42 0 140 226 0 1 178 0 24 61 2 150 243 1 1 137 1 25 40 3 140 199 0 1 178 1 26 71 1 160 302 0 1 162 0 27 59 2 150 212 1 1 157 0 28 51 2 110 175 0 1 123 0 29 65 2 140 417 1 0 157 0 30 53 2 130 197 1 0 152 0 31 41 1 105 198 0 1 168 0 32 65 0 120 177 0 1 140 0 33 44 1 130 219 0 0 188 0 34 54 2 125 273 0 0 152 0 35 51 3 125 213 0 0 125 1 36 46 2 142 177 0 0 160 1 37 54 2 135 304 1 1 170 0 38 54 2 150 232 0 0 165 0 39 65 2 155 269 0 1 148 0 40 65 2 160 360 0 0 151 0 41 51 2 140 308 0 0 142 0 42 48 1 130 245 0 0 180 0 43 45 0 104 208 0 0 148 1 44 53 0 130 264 0 0 143 0 45 39 2 140 321 0 0 182 0 46 52 1 120 325 0 1 172 0 47 44 2 140 235 0 0 180 0 48 47 2 138 257 0 0 156 0 49 53 2 128 216 0 0 115 0 50 53 0 138 234 0 0 160 0 51 51 2 130 256 0 0 149 0 52 66 0 120 302 0 0 151 0 53 62 2 130 231 0 1 146 0 54 44 2 108 141 0 1 175 0 55 63 2 135 252 0 0 172 0 56 52 1 134 201 0 1 158 0 57 48 0 122 222 0 0 186 0 58 45 0 115 260 0 0 185 0 59 34 3 118 182 0 0 174 0 60 57 0 128 303 0 0 159 0 61 71 2 110 265 1 0 130 0 62 54 1 108 309 0 1 156 0 63 52 3 118 186 0 0 190 0 64 41 1 135 203 0 1 132 0 65 58 2 140 211 1 0 165 0 66 35 0 138 183 0 1 182 0 67 51 2 100 222 0 1 143 1 68 45 1 130 234 0 0 175 0 69 44 1 120 220 0 1 170 0 70 62 0 124 209 0 1 163 0 71 54 2 120 258 0 0 147 0 72 51 2 94 227 0 1 154 1 73 29 1 130 204 0 0 202 0 74 51 0 140 261 0 0 186 1 75 43 2 122 213 0 1 165 0 76 55 1 135 250 0 0 161 0 77 51 2 125 245 1 0 166 0 78 59 1 140 221 0 1 164 1 79 52 1 128 205 1 1 184 0 80 58 2 105 240 0 0 154 1 81 41 2 112 250 0 1 179 0 82 45 1 128 308 0 0 170 0 83 60 2 102 318 0 1 160 0 84 52 3 152 298 1 1 178 0 85 42 0 102 265 0 0 122 0 86 67 2 115 564 0 0 160 0 87 68 2 118 277 0 1 151 0 88 46 1 101 197 1 1 156 0 89 54 2 110 214 0 1 158 0 90 58 0 100 248 0 0 122 0 91 48 2 124 255 1 1 175 0 92 57 0 132 207 0 1 168 1 93 52 2 138 223 0 1 169 0 94 54 1 132 288 1 0 159 1 95 45 1 112 160 0 1 138 0 96 53 0 142 226 0 0 111 1 97 62 0 140 394 0 0 157 0 98 52 0 108 233 1 1 147 0 99 43 2 130 315 0 1 162 0 100 53 2 130 246 1 0 173 0 101 42 3 148 244 0 0 178 0 102 59 3 178 270 0 0 145 0 103 63 1 140 195 0 1 179 0 104 42 2 120 240 1 1 194 0 105 50 2 129 196 0 1 163 0 106 68 2 120 211 0 0 115 0 107 69 3 160 234 1 0 131 0 108 45 0 138 236 0 0 152 1 109 50 1 120 244 0 1 162 0 110 50 0 110 254 0 0 159 0 111 64 0 180 325 0 1 154 1 112 57 2 150 126 1 1 173 0 113 64 2 140 313 0 1 133 0 114 43 0 110 211 0 1 161 0 115 55 1 130 262 0 1 155 0 116 37 2 120 215 0 1 170 0 117 41 2 130 214 0 0 168 0 118 56 3 120 193 0 0 162 0 119 46 1 105 204 0 1 172 0 120 46 0 138 243 0 0 152 1 121 64 0 130 303 0 1 122 0 122 59 0 138 271 0 0 182 0 123 41 2 112 268 0 0 172 1 124 54 2 108 267 0 0 167 0 125 39 2 94 199 0 1 179 0 126 34 1 118 210 0 1 192 0 127 47 0 112 204 0 1 143 0 128 67 2 152 277 0 1 172 0 129 52 2 136 196 0 0 169 0 130 74 1 120 269 0 0 121 1 131 54 2 160 201 0 1 163 0 132 49 1 134 271 0 1 162 0 133 42 1 120 295 0 1 162 0 134 41 1 110 235 0 1 153 0 135 41 1 126 306 0 1 163 0 136 49 0 130 269 0 1 163 0 137 60 2 120 178 1 1 96 0 138 62 1 128 208 1 0 140 0 139 57 0 110 201 0 1 126 1 140 64 0 128 263 0 1 105 1 141 51 2 120 295 0 0 157 0 142 43 0 115 303 0 1 181 0 143 42 2 120 209 0 1 173 0 144 67 0 106 223 0 1 142 0 145 76 2 140 197 0 2 116 0 146 70 1 156 245 0 0 143 0 147 44 2 118 242 0 1 149 0 148 60 3 150 240 0 1 171 0 149 44 2 120 226 0 1 169 0 150 42 2 130 180 0 1 150 0 151 66 0 160 228 0 0 138 0 152 71 0 112 149 0 1 125 0 153 64 3 170 227 0 0 155 0 154 66 2 146 278 0 0 152 0 155 39 2 138 220 0 1 152 0 156 58 0 130 197 0 1 131 0 157 47 2 130 253 0 1 179 0 158 35 1 122 192 0 1 174 0 159 58 1 125 220 0 1 144 0 160 56 1 130 221 0 0 163 0 161 56 1 120 240 0 1 169 0 162 55 1 132 342 0 1 166 0 163 41 1 120 157 0 1 182 0 164 38 2 138 175 0 1 173 0 165 38 2 138 175 0 1 173 0", "question_description": "

Healthy systolic blood pressure ranges from 90 to 120 mmHg. Does the data provide evidence that patients with heart disease have a mean above this level? Use the dataset and the resting blood pressure variable to conduct a significance test at a 5% significance level and determine if the data does or does not provide significant evidence in favor of the claim that the mean resting blood pressure is greater than 125 mmHg?<\/p>

<\/p>

a. State the null and alternative hypothesis<\/p>

b. Compute the sample mean and the sample standard deviation from the dataset<\/p>

c. Compute a test statistic and P-value. Identify your test statistic as z or t and give the degrees of freedom if necessary.<\/p>

d. ) Based on your results, what conclusion do you reach?<\/p>

e. ) Briefly explain what the phrase statistically significant means and how it applies to this situation<\/p>

f. Discuss the effect on your conclusion above if you increased or decreased the significance level?<\/p>

<\/p>

<\/p>

Patient<\/td> age<\/td> chest pain level<\/td> resting blood pressure<\/td> cholesterol level<\/td> fasting blood sugar<\/td> restecg<\/td> max hr during thalach<\/td> exang<\/td> <\/tr>
1<\/td> 63<\/td> 3<\/td> 145<\/td> 233<\/td> 1<\/td> 0<\/td> 150<\/td> 0<\/td> <\/tr>
2<\/td> 37<\/td> 2<\/td> 130<\/td> 250<\/td> 0<\/td> 1<\/td> 187<\/td> 0<\/td> <\/tr>
3<\/td> 41<\/td> 1<\/td> 130<\/td> 204<\/td> 0<\/td> 0<\/td> 172<\/td> 0<\/td> <\/tr>
4<\/td> 56<\/td> 1<\/td> 120<\/td> 236<\/td> 0<\/td> 1<\/td> 178<\/td> 0<\/td> <\/tr>
5<\/td> 57<\/td> 0<\/td> 120<\/td> 354<\/td> 0<\/td> 1<\/td> 163<\/td> 1<\/td> <\/tr>
6<\/td> 57<\/td> 0<\/td> 140<\/td> 192<\/td> 0<\/td> 1<\/td> 148<\/td> 0<\/td> <\/tr>
7<\/td> 56<\/td> 1<\/td> 140<\/td> 294<\/td> 0<\/td> 0<\/td> 153<\/td> 0<\/td> <\/tr>
8<\/td> 44<\/td> 1<\/td> 120<\/td> 263<\/td> 0<\/td> 1<\/td> 173<\/td> 0<\/td> <\/tr>
9<\/td> 52<\/td> 2<\/td> 172<\/td> 199<\/td> 1<\/td> 1<\/td> 162<\/td> 0<\/td> <\/tr>
10<\/td> 57<\/td> 2<\/td> 150<\/td> 168<\/td> 0<\/td> 1<\/td> 174<\/td> 0<\/td> <\/tr>
11<\/td> 54<\/td> 0<\/td> 140<\/td> 239<\/td> 0<\/td> 1<\/td> 160<\/td> 0<\/td> <\/tr>
12<\/td> 48<\/td> 2<\/td> 130<\/td> 275<\/td> 0<\/td> 1<\/td> 139<\/td> 0<\/td> <\/tr>
13<\/td> 49<\/td> 1<\/td> 130<\/td> 266<\/td> 0<\/td> 1<\/td> 171<\/td> 0<\/td> <\/tr>
14<\/td> 64<\/td> 3<\/td> 110<\/td> 211<\/td> 0<\/td> 0<\/td> 144<\/td> 1<\/td> <\/tr>
15<\/td> 58<\/td> 3<\/td> 150<\/td> 283<\/td> 1<\/td> 0<\/td> 162<\/td> 0<\/td> <\/tr>
16<\/td> 50<\/td> 2<\/td> 120<\/td> 219<\/td> 0<\/td> 1<\/td> 158<\/td> 0<\/td> <\/tr>
17<\/td> 58<\/td> 2<\/td> 120<\/td> 340<\/td> 0<\/td> 1<\/td> 172<\/td> 0<\/td> <\/tr>
18<\/td> 66<\/td> 3<\/td> 150<\/td> 226<\/td> 0<\/td> 1<\/td> 114<\/td> 0<\/td> <\/tr>
19<\/td> 43<\/td> 0<\/td> 150<\/td> 247<\/td> 0<\/td> 1<\/td> 171<\/td> 0<\/td> <\/tr>
20<\/td> 69<\/td> 3<\/td> 140<\/td> 239<\/td> 0<\/td> 1<\/td> 151<\/td> 0<\/td> <\/tr>
21<\/td> 59<\/td> 0<\/td> 135<\/td> 234<\/td> 0<\/td> 1<\/td> 161<\/td> 0<\/td> <\/tr>
22<\/td> 44<\/td> 2<\/td> 130<\/td> 233<\/td> 0<\/td> 1<\/td> 179<\/td> 1<\/td> <\/tr>
23<\/td> 42<\/td> 0<\/td> 140<\/td> 226<\/td> 0<\/td> 1<\/td> 178<\/td> 0<\/td> <\/tr>
24<\/td> 61<\/td> 2<\/td> 150<\/td> 243<\/td> 1<\/td> 1<\/td> 137<\/td> 1<\/td> <\/tr>
25<\/td> 40<\/td> 3<\/td> 140<\/td> 199<\/td> 0<\/td> 1<\/td> 178<\/td> 1<\/td> <\/tr>
26<\/td> 71<\/td> 1<\/td> 160<\/td> 302<\/td> 0<\/td> 1<\/td> 162<\/td> 0<\/td> <\/tr>
27<\/td> 59<\/td> 2<\/td> 150<\/td> 212<\/td> 1<\/td> 1<\/td> 157<\/td> 0<\/td> <\/tr>
28<\/td> 51<\/td> 2<\/td> 110<\/td> 175<\/td> 0<\/td> 1<\/td> 123<\/td> 0<\/td> <\/tr>
29<\/td> 65<\/td> 2<\/td> 140<\/td> 417<\/td> 1<\/td> 0<\/td> 157<\/td> 0<\/td> <\/tr>
30<\/td> 53<\/td> 2<\/td> 130<\/td> 197<\/td> 1<\/td> 0<\/td> 152<\/td> 0<\/td> <\/tr>
31<\/td> 41<\/td> 1<\/td> 105<\/td> 198<\/td> 0<\/td> 1<\/td> 168<\/td> 0<\/td> <\/tr>
32<\/td> 65<\/td> 0<\/td> 120<\/td> 177<\/td> 0<\/td> 1<\/td> 140<\/td> 0<\/td> <\/tr>
33<\/td> 44<\/td> 1<\/td> 130<\/td> 219<\/td> 0<\/td> 0<\/td> 188<\/td> 0<\/td> <\/tr>
34<\/td> 54<\/td> 2<\/td> 125<\/td> 273<\/td> 0<\/td> 0<\/td> 152<\/td> 0<\/td> <\/tr>
35<\/td> 51<\/td> 3<\/td> 125<\/td> 213<\/td> 0<\/td> 0<\/td> 125<\/td> 1<\/td> <\/tr>
36<\/td> 46<\/td> 2<\/td> 142<\/td> 177<\/td> 0<\/td> 0<\/td> 160<\/td> 1<\/td> <\/tr>
37<\/td> 54<\/td> 2<\/td> 135<\/td> 304<\/td> 1<\/td> 1<\/td> 170<\/td> 0<\/td> <\/tr>
38<\/td> 54<\/td> 2<\/td> 150<\/td> 232<\/td> 0<\/td> 0<\/td> 165<\/td> 0<\/td> <\/tr>
39<\/td> 65<\/td> 2<\/td> 155<\/td> 269<\/td> 0<\/td> 1<\/td> 148<\/td> 0<\/td> <\/tr>
40<\/td> 65<\/td> 2<\/td> 160<\/td> 360<\/td> 0<\/td> 0<\/td> 151<\/td> 0<\/td> <\/tr>
41<\/td> 51<\/td> 2<\/td> 140<\/td> 308<\/td> 0<\/td> 0<\/td> 142<\/td> 0<\/td> <\/tr>
42<\/td> 48<\/td> 1<\/td> 130<\/td> 245<\/td> 0<\/td> 0<\/td> 180<\/td> 0<\/td> <\/tr>
43<\/td> 45<\/td> 0<\/td> 104<\/td> 208<\/td> 0<\/td> 0<\/td> 148<\/td> 1<\/td> <\/tr>
44<\/td> 53<\/td> 0<\/td> 130<\/td> 264<\/td> 0<\/td> 0<\/td> 143<\/td> 0<\/td> <\/tr>
45<\/td> 39<\/td> 2<\/td> 140<\/td> 321<\/td> 0<\/td> 0<\/td> 182<\/td> 0<\/td> <\/tr>
46<\/td> 52<\/td> 1<\/td> 120<\/td> 325<\/td> 0<\/td> 1<\/td> 172<\/td> 0<\/td> <\/tr>
47<\/td> 44<\/td> 2<\/td> 140<\/td> 235<\/td> 0<\/td> 0<\/td> 180<\/td> 0<\/td> <\/tr>
48<\/td> 47<\/td> 2<\/td> 138<\/td> 257<\/td> 0<\/td> 0<\/td> 156<\/td> 0<\/td> <\/tr>
49<\/td> 53<\/td> 2<\/td> 128<\/td> 216<\/td> 0<\/td> 0<\/td> 115<\/td> 0<\/td> <\/tr>
50<\/td> 53<\/td> 0<\/td> 138<\/td> 234<\/td> 0<\/td> 0<\/td> 160<\/td> 0<\/td> <\/tr>
51<\/td> 51<\/td> 2<\/td> 130<\/td> 256<\/td> 0<\/td> 0<\/td> 149<\/td> 0<\/td> <\/tr>
52<\/td> 66<\/td> 0<\/td> 120<\/td> 302<\/td> 0<\/td> 0<\/td> 151<\/td> 0<\/td> <\/tr>
53<\/td> 62<\/td> 2<\/td> 130<\/td> 231<\/td> 0<\/td> 1<\/td> 146<\/td> 0<\/td> <\/tr>
54<\/td> 44<\/td> 2<\/td> 108<\/td> 141<\/td> 0<\/td> 1<\/td> 175<\/td> 0<\/td> <\/tr>
55<\/td> 63<\/td> 2<\/td> 135<\/td> 252<\/td> 0<\/td> 0<\/td> 172<\/td> 0<\/td> <\/tr>
56<\/td> 52<\/td> 1<\/td> 134<\/td> 201<\/td> 0<\/td> 1<\/td> 158<\/td> 0<\/td> <\/tr>
57<\/td> 48<\/td> 0<\/td> 122<\/td> 222<\/td> 0<\/td> 0<\/td> 186<\/td> 0<\/td> <\/tr>
58<\/td> 45<\/td> 0<\/td> 115<\/td> 260<\/td> 0<\/td> 0<\/td> 185<\/td> 0<\/td> <\/tr>
59<\/td> 34<\/td> 3<\/td> 118<\/td> 182<\/td> 0<\/td> 0<\/td> 174<\/td> 0<\/td> <\/tr>
60<\/td> 57<\/td> 0<\/td> 128<\/td> 303<\/td> 0<\/td> 0<\/td> 159<\/td> 0<\/td> <\/tr>
61<\/td> 71<\/td> 2<\/td> 110<\/td> 265<\/td> 1<\/td> 0<\/td> 130<\/td> 0<\/td> <\/tr>
62<\/td> 54<\/td> 1<\/td> 108<\/td> 309<\/td> 0<\/td> 1<\/td> 156<\/td> 0<\/td> <\/tr>
63<\/td> 52<\/td> 3<\/td> 118<\/td> 186<\/td> 0<\/td> 0<\/td> 190<\/td> 0<\/td> <\/tr>
64<\/td> 41<\/td> 1<\/td> 135<\/td> 203<\/td> 0<\/td> 1<\/td> 132<\/td> 0<\/td> <\/tr>
65<\/td> 58<\/td> 2<\/td> 140<\/td> 211<\/td> 1<\/td> 0<\/td> 165<\/td> 0<\/td> <\/tr>
66<\/td> 35<\/td> 0<\/td> 138<\/td> 183<\/td> 0<\/td> 1<\/td> 182<\/td> 0<\/td> <\/tr>
67<\/td> 51<\/td> 2<\/td> 100<\/td> 222<\/td> 0<\/td> 1<\/td> 143<\/td> 1<\/td> <\/tr>
68<\/td> 45<\/td> 1<\/td> 130<\/td> 234<\/td> 0<\/td> 0<\/td> 175<\/td> 0<\/td> <\/tr>
69<\/td> 44<\/td> 1<\/td> 120<\/td> 220<\/td> 0<\/td> 1<\/td> 170<\/td> 0<\/td> <\/tr>
70<\/td> 62<\/td> 0<\/td> 124<\/td> 209<\/td> 0<\/td> 1<\/td> 163<\/td> 0<\/td> <\/tr>
71<\/td> 54<\/td> 2<\/td> 120<\/td> 258<\/td> 0<\/td> 0<\/td> 147<\/td> 0<\/td> <\/tr>
72<\/td> 51<\/td> 2<\/td> 94<\/td> 227<\/td> 0<\/td> 1<\/td> 154<\/td> 1<\/td> <\/tr>
73<\/td> 29<\/td> 1<\/td> 130<\/td> 204<\/td> 0<\/td> 0<\/td> 202<\/td> 0<\/td> <\/tr>
74<\/td> 51<\/td> 0<\/td> 140<\/td> 261<\/td> 0<\/td> 0<\/td> 186<\/td> 1<\/td> <\/tr>
75<\/td> 43<\/td> 2<\/td> 122<\/td> 213<\/td> 0<\/td> 1<\/td> 165<\/td> 0<\/td> <\/tr>
76<\/td> 55<\/td> 1<\/td> 135<\/td> 250<\/td> 0<\/td> 0<\/td> 161<\/td> 0<\/td> <\/tr>
77<\/td> 51<\/td> 2<\/td> 125<\/td> 245<\/td> 1<\/td> 0<\/td> 166<\/td> 0<\/td> <\/tr>
78<\/td> 59<\/td> 1<\/td> 140<\/td> 221<\/td> 0<\/td> 1<\/td> 164<\/td> 1<\/td> <\/tr>
79<\/td> 52<\/td> 1<\/td> 128<\/td> 205<\/td> 1<\/td> 1<\/td> 184<\/td> 0<\/td> <\/tr>
80<\/td> 58<\/td> 2<\/td> 105<\/td> 240<\/td> 0<\/td> 0<\/td> 154<\/td> 1<\/td> <\/tr>
81<\/td> 41<\/td> 2<\/td> 112<\/td> 250<\/td> 0<\/td> 1<\/td> 179<\/td> 0<\/td> <\/tr>
82<\/td> 45<\/td> 1<\/td> 128<\/td> 308<\/td> 0<\/td> 0<\/td> 170<\/td> 0<\/td> <\/tr>
83<\/td> 60<\/td> 2<\/td> 102<\/td> 318<\/td> 0<\/td> 1<\/td> 160<\/td> 0<\/td> <\/tr>
84<\/td> 52<\/td> 3<\/td> 152<\/td> 298<\/td> 1<\/td> 1<\/td> 178<\/td> 0<\/td> <\/tr>
85<\/td> 42<\/td> 0<\/td> 102<\/td> 265<\/td> 0<\/td> 0<\/td> 122<\/td> 0<\/td> <\/tr>
86<\/td> 67<\/td> 2<\/td> 115<\/td> 564<\/td> 0<\/td> 0<\/td> 160<\/td> 0<\/td> <\/tr>
87<\/td> 68<\/td> 2<\/td> 118<\/td> 277<\/td> 0<\/td> 1<\/td> 151<\/td> 0<\/td> <\/tr>
88<\/td> 46<\/td> 1<\/td> 101<\/td> 197<\/td> 1<\/td> 1<\/td> 156<\/td> 0<\/td> <\/tr>
89<\/td> 54<\/td> 2<\/td> 110<\/td> 214<\/td> 0<\/td> 1<\/td> 158<\/td> 0<\/td> <\/tr>
90<\/td> 58<\/td> 0<\/td> 100<\/td> 248<\/td> 0<\/td> 0<\/td> 122<\/td> 0<\/td> <\/tr>
91<\/td> 48<\/td> 2<\/td> 124<\/td> 255<\/td> 1<\/td> 1<\/td> 175<\/td> 0<\/td> <\/tr>
92<\/td> 57<\/td> 0<\/td> 132<\/td> 207<\/td> 0<\/td> 1<\/td> 168<\/td> 1<\/td> <\/tr>
93<\/td> 52<\/td> 2<\/td> 138<\/td> 223<\/td> 0<\/td> 1<\/td> 169<\/td> 0<\/td> <\/tr>
94<\/td> 54<\/td> 1<\/td> 132<\/td> 288<\/td> 1<\/td> 0<\/td> 159<\/td> 1<\/td> <\/tr>
95<\/td> 45<\/td> 1<\/td> 112<\/td> 160<\/td> 0<\/td> 1<\/td> 138<\/td> 0<\/td> <\/tr>
96<\/td> 53<\/td> 0<\/td> 142<\/td> 226<\/td> 0<\/td> 0<\/td> 111<\/td> 1<\/td> <\/tr>
97<\/td> 62<\/td> 0<\/td> 140<\/td> 394<\/td> 0<\/td> 0<\/td> 157<\/td> 0<\/td> <\/tr>
98<\/td> 52<\/td> 0<\/td> 108<\/td> 233<\/td> 1<\/td> 1<\/td> 147<\/td> 0<\/td> <\/tr>
99<\/td> 43<\/td> 2<\/td> 130<\/td> 315<\/td> 0<\/td> 1<\/td> 162<\/td> 0<\/td> <\/tr>
100<\/td> 53<\/td> 2<\/td> 130<\/td> 246<\/td> 1<\/td> 0<\/td> 173<\/td> 0<\/td> <\/tr>
101<\/td> 42<\/td> 3<\/td> 148<\/td> 244<\/td> 0<\/td> 0<\/td> 178<\/td> 0<\/td> <\/tr>
102<\/td> 59<\/td> 3<\/td> 178<\/td> 270<\/td> 0<\/td> 0<\/td> 145<\/td> 0<\/td> <\/tr>
103<\/td> 63<\/td> 1<\/td> 140<\/td> 195<\/td> 0<\/td> 1<\/td> 179<\/td> 0<\/td> <\/tr>
104<\/td> 42<\/td> 2<\/td> 120<\/td> 240<\/td> 1<\/td> 1<\/td> 194<\/td> 0<\/td> <\/tr>
105<\/td> 50<\/td> 2<\/td> 129<\/td> 196<\/td> 0<\/td> 1<\/td> 163<\/td> 0<\/td> <\/tr>
106<\/td> 68<\/td> 2<\/td> 120<\/td> 211<\/td> 0<\/td> 0<\/td> 115<\/td> 0<\/td> <\/tr>
107<\/td> 69<\/td> 3<\/td> 160<\/td> 234<\/td> 1<\/td> 0<\/td> 131<\/td> 0<\/td> <\/tr>
108<\/td> 45<\/td> 0<\/td> 138<\/td> 236<\/td> 0<\/td> 0<\/td> 152<\/td> 1<\/td> <\/tr>
109<\/td> 50<\/td> 1<\/td> 120<\/td> 244<\/td> 0<\/td> 1<\/td> 162<\/td> 0<\/td> <\/tr>
110<\/td> 50<\/td> 0<\/td> 110<\/td> 254<\/td> 0<\/td> 0<\/td> 159<\/td> 0<\/td> <\/tr>
111<\/td> 64<\/td> 0<\/td> 180<\/td> 325<\/td> 0<\/td> 1<\/td> 154<\/td> 1<\/td> <\/tr>
112<\/td> 57<\/td> 2<\/td> 150<\/td> 126<\/td> 1<\/td> 1<\/td> 173<\/td> 0<\/td> <\/tr>
113<\/td> 64<\/td> 2<\/td> 140<\/td> 313<\/td> 0<\/td> 1<\/td> 133<\/td> 0<\/td> <\/tr>
114<\/td> 43<\/td> 0<\/td> 110<\/td> 211<\/td> 0<\/td> 1<\/td> 161<\/td> 0<\/td> <\/tr>
115<\/td> 55<\/td> 1<\/td> 130<\/td> 262<\/td> 0<\/td> 1<\/td> 155<\/td> 0<\/td> <\/tr>
116<\/td> 37<\/td> 2<\/td> 120<\/td> 215<\/td> 0<\/td> 1<\/td> 170<\/td> 0<\/td> <\/tr>
117<\/td> 41<\/td> 2<\/td> 130<\/td> 214<\/td> 0<\/td> 0<\/td> 168<\/td> 0<\/td> <\/tr>
118<\/td> 56<\/td> 3<\/td> 120<\/td> 193<\/td> 0<\/td> 0<\/td> 162<\/td> 0<\/td> <\/tr>
119<\/td> 46<\/td> 1<\/td> 105<\/td> 204<\/td> 0<\/td> 1<\/td> 172<\/td> 0<\/td> <\/tr>
120<\/td> 46<\/td> 0<\/td> 138<\/td> 243<\/td> 0<\/td> 0<\/td> 152<\/td> 1<\/td> <\/tr>
121<\/td> 64<\/td> 0<\/td> 130<\/td> 303<\/td> 0<\/td> 1<\/td> 122<\/td> 0<\/td> <\/tr>
122<\/td> 59<\/td> 0<\/td> 138<\/td> 271<\/td> 0<\/td> 0<\/td> 182<\/td> 0<\/td> <\/tr>
123<\/td> 41<\/td> 2<\/td> 112<\/td> 268<\/td> 0<\/td> 0<\/td> 172<\/td> 1<\/td> <\/tr>
124<\/td> 54<\/td> 2<\/td> 108<\/td> 267<\/td> 0<\/td> 0<\/td> 167<\/td> 0<\/td> <\/tr>
125<\/td> 39<\/td> 2<\/td> 94<\/td> 199<\/td> 0<\/td> 1<\/td> 179<\/td> 0<\/td> <\/tr>
126<\/td> 34<\/td> 1<\/td> 118<\/td> 210<\/td> 0<\/td> 1<\/td> 192<\/td> 0<\/td> <\/tr>
127<\/td> 47<\/td> 0<\/td> 112<\/td> 204<\/td> 0<\/td> 1<\/td> 143<\/td> 0<\/td> <\/tr>
128<\/td> 67<\/td> 2<\/td> 152<\/td> 277<\/td> 0<\/td> 1<\/td> 172<\/td> 0<\/td> <\/tr>
129<\/td> 52<\/td> 2<\/td> 136<\/td> 196<\/td> 0<\/td> 0<\/td> 169<\/td> 0<\/td> <\/tr>
130<\/td> 74<\/td> 1<\/td> 120<\/td> 269<\/td> 0<\/td> 0<\/td> 121<\/td> 1<\/td> <\/tr>
131<\/td> 54<\/td> 2<\/td> 160<\/td> 201<\/td> 0<\/td> 1<\/td> 163<\/td> 0<\/td> <\/tr>
132<\/td> 49<\/td> 1<\/td> 134<\/td> 271<\/td> 0<\/td> 1<\/td> 162<\/td> 0<\/td> <\/tr>
133<\/td> 42<\/td> 1<\/td> 120<\/td> 295<\/td> 0<\/td> 1<\/td> 162<\/td> 0<\/td> <\/tr>
134<\/td> 41<\/td> 1<\/td> 110<\/td> 235<\/td> 0<\/td> 1<\/td> 153<\/td> 0<\/td> <\/tr>
135<\/td> 41<\/td> 1<\/td> 126<\/td> 306<\/td> 0<\/td> 1<\/td> 163<\/td> 0<\/td> <\/tr>
136<\/td> 49<\/td> 0<\/td> 130<\/td> 269<\/td> 0<\/td> 1<\/td> 163<\/td> 0<\/td> <\/tr>
137<\/td> 60<\/td> 2<\/td> 120<\/td> 178<\/td> 1<\/td> 1<\/td> 96<\/td> 0<\/td> <\/tr>
138<\/td> 62<\/td> 1<\/td> 128<\/td> 208<\/td> 1<\/td> 0<\/td> 140<\/td> 0<\/td> <\/tr>
139<\/td> 57<\/td> 0<\/td> 110<\/td> 201<\/td> 0<\/td> 1<\/td> 126<\/td> 1<\/td> <\/tr>
140<\/td> 64<\/td> 0<\/td> 128<\/td> 263<\/td> 0<\/td> 1<\/td> 105<\/td> 1<\/td> <\/tr>
141<\/td> 51<\/td> 2<\/td> 120<\/td> 295<\/td> 0<\/td> 0<\/td> 157<\/td> 0<\/td> <\/tr>
142<\/td> 43<\/td> 0<\/td> 115<\/td> 303<\/td> 0<\/td> 1<\/td> 181<\/td> 0<\/td> <\/tr>
143<\/td> 42<\/td> 2<\/td> 120<\/td> 209<\/td> 0<\/td> 1<\/td> 173<\/td> 0<\/td> <\/tr>
144<\/td> 67<\/td> 0<\/td> 106<\/td> 223<\/td> 0<\/td> 1<\/td> 142<\/td> 0<\/td> <\/tr>
145<\/td> 76<\/td> 2<\/td> 140<\/td> 197<\/td> 0<\/td> 2<\/td> 116<\/td> 0<\/td> <\/tr>
146<\/td> 70<\/td> 1<\/td> 156<\/td> 245<\/td> 0<\/td> 0<\/td> 143<\/td> 0<\/td> <\/tr>
147<\/td> 44<\/td> 2<\/td> 118<\/td> 242<\/td> 0<\/td> 1<\/td> 149<\/td> 0<\/td> <\/tr>
148<\/td> 60<\/td> 3<\/td> 150<\/td> 240<\/td> 0<\/td> 1<\/td> 171<\/td> 0<\/td> <\/tr>
149<\/td> 44<\/td> 2<\/td> 120<\/td> 226<\/td> 0<\/td> 1<\/td> 169<\/td> 0<\/td> <\/tr>
150<\/td> 42<\/td> 2<\/td> 130<\/td> 180<\/td> 0<\/td> 1<\/td> 150<\/td> 0<\/td> <\/tr>
151<\/td> 66<\/td> 0<\/td> 160<\/td> 228<\/td> 0<\/td> 0<\/td> 138<\/td> 0<\/td> <\/tr>
152<\/td> 71<\/td> 0<\/td> 112<\/td> 149<\/td> 0<\/td> 1<\/td> 125<\/td> 0<\/td> <\/tr>
153<\/td> 64<\/td> 3<\/td> 170<\/td> 227<\/td> 0<\/td> 0<\/td> 155<\/td> 0<\/td> <\/tr>
154<\/td> 66<\/td> 2<\/td> 146<\/td> 278<\/td> 0<\/td> 0<\/td> 152<\/td> 0<\/td> <\/tr>
155<\/td> 39<\/td> 2<\/td> 138<\/td> 220<\/td> 0<\/td> 1<\/td> 152<\/td> 0<\/td> <\/tr>
156<\/td> 58<\/td> 0<\/td> 130<\/td> 197<\/td> 0<\/td> 1<\/td> 131<\/td> 0<\/td> <\/tr>
157<\/td> 47<\/td> 2<\/td> 130<\/td> 253<\/td> 0<\/td> 1<\/td> 179<\/td> 0<\/td> <\/tr>
158<\/td> 35<\/td> 1<\/td> 122<\/td> 192<\/td> 0<\/td> 1<\/td> 174<\/td> 0<\/td> <\/tr>
159<\/td> 58<\/td> 1<\/td> 125<\/td> 220<\/td> 0<\/td> 1<\/td> 144<\/td> 0<\/td> <\/tr>
160<\/td> 56<\/td> 1<\/td> 130<\/td> 221<\/td> 0<\/td> 0<\/td> 163<\/td> 0<\/td> <\/tr>
161<\/td> 56<\/td> 1<\/td> 120<\/td> 240<\/td> 0<\/td> 1<\/td> 169<\/td> 0<\/td> <\/tr>
162<\/td> 55<\/td> 1<\/td> 132<\/td> 342<\/td> 0<\/td> 1<\/td> 166<\/td> 0<\/td> <\/tr>
163<\/td> 41<\/td> 1<\/td> 120<\/td> 157<\/td> 0<\/td> 1<\/td> 182<\/td> 0<\/td> <\/tr>
164<\/td> 38<\/td> 2<\/td> 138<\/td> 175<\/td> 0<\/td> 1<\/td> 173<\/td> 0<\/td> <\/tr>
165<\/td> 38<\/td> 2<\/td> 138<\/td> 175<\/td> 0<\/td> 1<\/td> 173<\/td> 0<\/td> <\/tr>
<\/td> <\/td> <\/td> <\/td> <\/td> <\/td> <\/td> <\/td> <\/td> <\/tr>
<\/td> <\/td> <\/td> <\/td> <\/td> <\/td> <\/td> <\/td> <\/td> <\/tr> <\/tbody><\/table><\/figure>

<\/p>", "transcribed_text": "", "related_book": { "title": "Managerial Accounting Tools for Business Decision Making ", "isbn": "1118856996, 978-1118856994", "edition": "4th Canadian edition", "authors": "Jerry J. Weygandt, Paul D. Kimmel, Donald E. Kieso, Ibrahim M. Aly", "cover_image": "https:\/\/dsd5zvtm8ll6.cloudfront.net\/si.question.images\/book_images\/1190.jpg", "uri": "\/textbooks\/managerial-accounting-tools-for-business-decision-making-4th-canadian-edition-1190", "see_more_uri": "" }, "free_related_book": { "isbn": "1017381631", "uri": "\/textbooks\/economics-and-jurisprudence-an-address-by-henry-c-adams-president-of-the-american-economic-association-delivered-at-the-meeting-of-the-association-in-baltimore-maryland-december-28-1896-1st-edition-978-1017381634-285845", "name": "Economics And Jurisprudence An Address By Henry C Adams President Of The American Economic Association Delivered At The Meeting Of The Association In Baltimore Maryland December 28 1896", "edition": "1st Edition" }, "question_posted": "2024-06-28 07:20:03", "see_more_questions_link": "\/study-help\/questions\/sciences-biology-2023-February-20", "step_by_step_answer": "The Answer is in the image, click to view ...", "students_also_viewed": [ { "url": "\/opus-incorporated-owns-90-percent-of-bloom-company-on-december", "description": "Opus, Incorporated, owns 90 percent of Bloom Company. On December 31, 2010, Opus acquires half of Blooms $500,000 outstanding bonds. These bonds had been sold on the open market on January 1, 2008,...", "stars": 3 }, { "url": "\/study-help\/psychology\/what-degrees-does-the-program-offer-1980695", "description": "What degrees does the program offer?", "stars": 3 }, { "url": "\/the-shareholders-equity-of-kramer-industries-includes-the-data-shown", "description": "The shareholders' equity of Kramer Industries includes the data shown below. During 2012, cash dividends of $150 million were declared. Dividends were not declared in 2010 or 2011. Required:...", "stars": 3 }, { "url": "\/study-help\/questions\/healthcare-finance-owing-data-pertain-to-problems-67-and-6-9869657", "description": "Healthcare Finance owing data pertain to problems 6.7 and 6. St. Luke's Hospital has three support departments and four departments. The direct costs to each of the support departm b- co General...", "stars": 3 }, { "url": "\/study-help\/questions\/3-students-taking-an-introductory-statistics-class-reported-spending-an-4179075", "description": "3. Students taking an introductory statistics class reported spending an average of $185 on textbooks that semester with a standard deviation of $45. Use the Empirical Rule to answer part a-f. A...", "stars": 3 }, { "url": "\/study-help\/elementary-statistics\/following-is-a-sample-from-a-population-with-median-m-1429079", "description": "Following is a sample from a population with median m. Use the sign test to test H0: m = 20 versus H1: m > 20. a. What is the value of the test statistic? b. Is H0 rejected at the = 0.05 level? c....", "stars": 3 }, { "url": "\/study-help\/operations-and-supply-chain-management-the-core\/a-famine-in-one-nation-created-a-huge-influx-of-1397882", "description": "A famine in one nation created a huge influx of migrants to cross the border into a neighboring country. Many international aid organizations arrived at the migrant camps to provide food, water, and...", "stars": 3 }, { "url": "\/study-help\/principles-of-economics\/an-early-freeze-in-normandy-ruins-half-of-the-apple-1383603", "description": "An early freeze in Normandy ruins half of the apple harvest. What happens to consumer surplus in the market for apples? What happens to consumer surplus in the market for cider? Illustrate your...", "stars": 3 }, { "url": "\/study-help\/particle-physics\/two-uniformly-charged-plates-carrying-opposite-charges-are-separated-by-1374538", "description": "Two uniformly charged plates carrying opposite charges are separated by a distance of \\(20 \\mathrm{~mm}\\). The magnitude of the charge density on each plate is \\(3 \\times 10^{-8} \\mathrm{C} \/...", "stars": 3 }, { "url": "\/study-help\/modern-physics\/show-that-for-a-matrix-representation-dx-satisfying-eq-28-1347752", "description": "Show that for a matrix representation \\(D(x)\\) satisfying Eq. (2.8), a new set of matrices formed by performing the same similarity transform \\(S^{-1} D(x) S\\) for a fixed matrix \\(S\\) on all...", "stars": 3 } ], "next_back_navigation": { "previous": "\/study-help\/questions\/frenchmeditrainianwelsh-normal-annual-selling-volume100000200000300000-unit-selling-price-200140-080-4262231", "next": "\/study-help\/questions\/show-workformulas-used-plastic-molding-incs-costing-system-utilizes-two-4262233" }, "breadcrumbs": [ { "name": "Study help", "link": "https:\/\/www.solutioninn.com\/study-help\/questions-and-answers" }, { "name": "Sciences", "link": "https:\/\/www.solutioninn.com\/study-help\/questions-and-answers\/sciences" }, { "name": "Mathematics", "link": "https:\/\/www.solutioninn.com\/study-help\/questions\/sciences-mathematics" }, { "name": "Healthy systolic blood pressure ranges from 90 to 120 mmHg. Does the", "link": "https:\/\/www.solutioninn.com\/study-help\/questions\/healthy-systolic-blood-pressure-ranges-from-90-to-120-mmhg-4262232" } ], "skill_details": { "skill_id": "342", "skill_name": "Mathematics", "parent_id": "5" } }" } }