G:\Statistiske grundbegreber-v8\s1v8-forside.wpd
G:\Statistiske grundbegreber-v8\s1v8-forside.wpd
G:\Statistiske grundbegreber-v8\s1v8-forside.wpd
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Statistiske tabeller<br />
2<br />
Tabel 3 Fraktiler i χ p -fordelingen χ .<br />
2 2 2<br />
( f ) P( χ ≤ χ ) = p<br />
χ , hvor .<br />
2 2 2 2,<br />
= U1+ U2+ ... + U f U1, U2,..., U f<br />
2 1<br />
Approksimativ formel: χ p( f ) = ( 2<br />
2f 2<br />
− 1+<br />
up)<br />
for f > 30<br />
f<br />
1<br />
2<br />
3<br />
4<br />
5<br />
6<br />
7<br />
8<br />
9<br />
10<br />
11<br />
12<br />
13<br />
14<br />
15<br />
16<br />
17<br />
18<br />
19<br />
20<br />
22<br />
24<br />
26<br />
28<br />
30<br />
32<br />
34<br />
36<br />
38<br />
40<br />
45<br />
50<br />
60<br />
70<br />
80<br />
90<br />
100<br />
110<br />
120<br />
130<br />
140<br />
150<br />
160<br />
180<br />
200<br />
300<br />
400<br />
500<br />
1000<br />
p<br />
0.0005 0.001 0.005 0.01 0.025 0.05 0.10 0.20 0.50<br />
0.000 0.000 0.000 0.000 0.001 0.004 0.016 0.064 0.455<br />
0.001 0.002 0.010 0.020 0.051 0.103 0.211 0.446 1.39<br />
0.015 0.024 0.072 0.115 0.216 0.352 0.584 1.01 2.37<br />
0.064 0.091 0.207 0.297 0.484 0.711 1.06 1.65 3.36<br />
0.158 0.210 0.412 0.554 0.831 1.15 1.61 2.34 4.35<br />
0.299 0.381 0.676 0.872 1.24 1.64 2.20 3.07 5.35<br />
0.485 0.598 0.989 1.24 1.69 2.17 2.83 3.82 6.35<br />
0.710 0.857 1.34 1.65 2.18 2.73 3.49 4.59 7.34<br />
0.972 1.15 1.73 2.09 2.70 3.33 4.17 5.38 8.34<br />
1.26 1.48 2.16 2.56 3.25 3.94 4.87 6.18 9.34<br />
1.59 1.83 2.60 3.05 3.82 4.57 5.58 6.99 10.3<br />
1.93 2.21 3.07 3.57 4.40 5.23 6.30 7.81 11.3<br />
2.31 2.62 3.57 4.11 5.01 5.89 7.04 8.63 12.3<br />
2.70 3.04 4.07 4.66 5.63 6.57 7.79 9.47 13.3<br />
3.11 3.48 4.60 5.23 6.26 7.26 8.55 10.3 14.3<br />
3.54 3.94 5.14 5.81 6.91 7.96 9.31 11.2 15.3<br />
3.98 4.42 5.70 6.41 7.56 8.67 10.1 12.0 16.3<br />
4.44 4.90 6.26 7.01 8.23 9.39 10.9 12.9 17.3<br />
4.91 5.41 6.84 7.63 8.91 10.1 11.7 13.7 18.3<br />
5.40 5.92 7.43 8.26 9.59 10.9 12.4 14.6 19.3<br />
6.40 6.98 8.64 9.54 11.0 12.3 14.0 16.3 21.3<br />
7.45 8.08 9.89 10.9 12.4 13.8 15.7 18.1 23.3<br />
8.54 9.22 11.2 12.2 13.8 15.4 17.3 19.8 25.3<br />
9.66 10.4 12.5 13.6 15.3 16.9 18.9 21.6 27.3<br />
10.8 11.6 13.8 15.0 16.8 18.5 20.6 23.4 29.3<br />
12.0 12.8 15.1 16.4 18.3 20.1 22.3 25.1 31.3<br />
13.2 14.1 16.5 17.8 19.8 21.7 24.0 26.9 33.3<br />
14.4 15.3 17.9 19.2 21.3 23.3 25.6 28.7 35.3<br />
15.6 16.6 19.3 20.7 22.9 24.9 27.3 30.5 37.3<br />
16.9 17.9 20.7 22.2 24.4 26.5 29.1 32.3 39.3<br />
20.1 21.3 24.3 25.9 28.4 30.6 33.4 36.9 44.3<br />
23.5 24.7 28.0 29.7 32.4 34.8 37.7 41.4 49.3<br />
30.3 31.7 35.5 37.5 40.5 43.2 46.5 50.6 59.3<br />
37.5 39.0 43.3 45.4 48.8 51.7 55.3 59.9 69.3<br />
44.8 46.5 51.2 53.5 57.2 60.4 64.3 69.2 79.3<br />
52.3 54.2 59.2 61.8 65.6 69.1 73.3 78.6 89.3<br />
59.9 61.9 67.3 70.1 74.2 77.9 82.4 87.9 99.3<br />
67.6 69.8 75.5 78.5 82.9 86.8 91.4 97.4 109<br />
75.5 77.8 83.9 86.9 91.6 95.7 101 107 119<br />
83.4 85.8 92.2 95.4 100 105 110 116 129<br />
91.4 93.9 101 104 109 114 119 126 139<br />
99.5 102 109 113 118 123 128 135 149<br />
108 110 118 121 127 132 137 145 159<br />
124 127 135 139 145 150 156 164 179<br />
141 144 152 156 163 168 175 183 199<br />
226 230 241 246 254 261 269 279 299<br />
313 318 331 337 346 355 364 376 399<br />
403 408 422 429 440 449 460 473 499<br />
859 868 889 899 914 928 943 962 999<br />
155<br />
p