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Hypergeometric_log.txt
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Hypergeometric_log.txt
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Hypergeometric (c) SCHRAUSSER 2009; 05/16/09 01:34:14;
k(A)= 4, n(A)= 20, N= 100, K(A)= 30
i P(i) Pi <pi >pi
20 | 1.000 0.000000000000056 1.000000000000000 0.000000000000056
19 | 0.950 0.000000000007134 0.999999999999944 0.000000000007190
18 | 0.900 0.000000000389716 0.999999999992810 0.000000000396906
17 | 0.850 0.000000012231078 0.999999999603094 0.000000012627984
16 | 0.800 0.000000248771382 0.999999987372016 0.000000261399365
15 | 0.750 0.000003502701054 0.999999738600635 0.000003764100419
14 | 0.700 0.000035574307575 0.999996235899581 0.000039338407994
13 | 0.650 0.000267853609978 0.999960661592006 0.000307192017972
12 | 0.600 0.001523417406752 0.999692807982028 0.001830609424724
11 |% 0.550 0.006628202050428 0.998169390575276 0.008458811475152
10 |%%%% 0.500 0.022237617879185 0.991541188524848 0.030696429354337
9 |%%%%%%%%%% 0.450 0.057760046439441 0.969303570645663 0.088456475793778
8 |%%%%%%%%%%%%%%%%%%%%% 0.400 0.116176457042968 0.911543524206222 0.204632932836746
7 |%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.350 0.180287210929555 0.795367067163254 0.384920143766301
6 |%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.300 0.214091062978847 0.615079856233699 0.599011206745147
5 |%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.250 0.191825592429047 0.400988793254853 0.790836799174194
4 |_______________________ 0.1268 0.200 0.126807783456701 0.209163200825806 0.917644582630895
3 |||||||||||| 0.150 0.059674251038448 0.082355417369105 0.977318833669343
2 |||| 0.100 0.018825805387129 0.022681166330657 0.996144639056472
1 | 0.050 0.003553328058551 0.003855360943528 0.999697967115023
0 | 0.000 0.000302032884977 0.000302032884977 1.000000000000000
Hypergeometric Point Probability k P= 0.126807783456701
Hypergeometric kum. Probability <=k <p= 0.209163200825806
Hypergeometric kum. Probability >k >p= 0.790836799174194
Hypergeometric (c) SCHRAUSSER 2009; 05/16/09 01:34:27;
k(A)= 6, n(A)= 6, N= 45, K(A)= 6
i P(i) Pi <pi >pi
6 | 0.0000 1.000 0.000000122773804 1.000000000000000 0.000000122773804
5 | 0.833 0.000028729070136 0.999999877226196 0.000028851843940
4 | 0.667 0.001364630831449 0.999971148156060 0.001393482675389
3 ||| 0.500 0.022440595894935 0.998606517324611 0.023834078570324
2 ||||||||||||||| 0.333 0.151474022290812 0.976165921429676 0.175308100861135
1 ||||||||||||||||||||||||||||||||||||||||| 0.167 0.424127262414273 0.824691899138865 0.599435363275409
0 |||||||||||||||||||||||||||||||||||||| 0.000 0.400564636724591 0.400564636724591 1.000000000000000
Hypergeometric Point Probability k P= 0.000000122773804
Hypergeometric kum. Probability <=k <p= 1.000000000000000
Hypergeometric kum. Probability >k >p= 0.000000000000000
Hypergeometric (c) SCHRAUSSER 2009; 09/29/09 22:30:46;
k(A)= 3, n(A)= 6, N= 45, K(A)= 6
i P(i) Pi <pi >pi
6 | 1.000 0.000000122773804 1.000000000000000 0.000000122773804
5 | 0.833 0.000028729070136 0.999999877226196 0.000028851843940
4 | 0.667 0.001364630831449 0.999971148156060 0.001393482675389
3 |__ 0.0224 0.500 0.022440595894935 0.998606517324611 0.023834078570324
2 ||||||||||||||| 0.333 0.151474022290812 0.976165921429676 0.175308100861135
1 ||||||||||||||||||||||||||||||||||||||||| 0.167 0.424127262414273 0.824691899138865 0.599435363275409
0 |||||||||||||||||||||||||||||||||||||| 0.000 0.400564636724591 0.400564636724591 1.000000000000000
Hypergeometric Point Probability k P= 0.022440595894935
Hypergeometric kum. Probability <=k <p= 0.998606517324611
Hypergeometric kum. Probability >k >p= 0.001393482675389
Hypergeometric (c) SCHRAUSSER 2009; 09/29/09 22:30:52;
k(A)= 3, n(A)= 6, N= 45, K(A)= 6
i P(i) Pi <pi >pi
6 | 1.000 0.000000122773804 1.000000000000000 0.000000122773804
5 | 0.833 0.000028729070136 0.999999877226196 0.000028851843940
4 | 0.667 0.001364630831449 0.999971148156060 0.001393482675389
3 |__ 0.0224 0.500 0.022440595894935 0.998606517324611 0.023834078570324
2 ||||||||||||||| 0.333 0.151474022290812 0.976165921429676 0.175308100861135
1 ||||||||||||||||||||||||||||||||||||||||| 0.167 0.424127262414273 0.824691899138865 0.599435363275409
0 |||||||||||||||||||||||||||||||||||||| 0.000 0.400564636724591 0.400564636724591 1.000000000000000
Hypergeometric Point Probability k P= 0.022440595894935
Hypergeometric kum. Probability <=k <p= 0.998606517324611
Hypergeometric kum. Probability >k >p= 0.001393482675389
Hypergeometric (c) SCHRAUSSER 2009; 09/29/09 22:31:02;
k(A)= 6, n(A)= 6, N= 45, K(A)= 6
i P(i) Pi <pi >pi
6 | 0.0000 1.000 0.000000122773804 1.000000000000000 0.000000122773804
5 | 0.833 0.000028729070136 0.999999877226196 0.000028851843940
4 | 0.667 0.001364630831449 0.999971148156060 0.001393482675389
3 ||| 0.500 0.022440595894935 0.998606517324611 0.023834078570324
2 ||||||||||||||| 0.333 0.151474022290812 0.976165921429676 0.175308100861135
1 ||||||||||||||||||||||||||||||||||||||||| 0.167 0.424127262414273 0.824691899138865 0.599435363275409
0 |||||||||||||||||||||||||||||||||||||| 0.000 0.400564636724591 0.400564636724591 1.000000000000000
Hypergeometric Point Probability k P= 0.000000122773804
Hypergeometric kum. Probability <=k <p= 1.000000000000000
Hypergeometric kum. Probability >k >p= 0.000000000000000
Hypergeometric (c) SCHRAUSSER 2009; 09/29/09 22:31:45;
k(A)= 4, n(A)= 20, N= 100, K(A)= 30
i P(i) Pi <pi >pi
20 | 1.000 0.000000000000056 1.000000000000000 0.000000000000056
19 | 0.950 0.000000000007134 0.999999999999944 0.000000000007190
18 | 0.900 0.000000000389716 0.999999999992810 0.000000000396906
17 | 0.850 0.000000012231078 0.999999999603094 0.000000012627984
16 | 0.800 0.000000248771382 0.999999987372016 0.000000261399365
15 | 0.750 0.000003502701054 0.999999738600635 0.000003764100419
14 | 0.700 0.000035574307575 0.999996235899581 0.000039338407994
13 | 0.650 0.000267853609978 0.999960661592006 0.000307192017972
12 | 0.600 0.001523417406752 0.999692807982028 0.001830609424724
11 |% 0.550 0.006628202050428 0.998169390575276 0.008458811475152
10 |%%%% 0.500 0.022237617879185 0.991541188524848 0.030696429354337
9 |%%%%%%%%%% 0.450 0.057760046439441 0.969303570645663 0.088456475793778
8 |%%%%%%%%%%%%%%%%%%%%% 0.400 0.116176457042968 0.911543524206222 0.204632932836746
7 |%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.350 0.180287210929555 0.795367067163254 0.384920143766301
6 |%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.300 0.214091062978847 0.615079856233699 0.599011206745147
5 |%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.250 0.191825592429047 0.400988793254853 0.790836799174194
4 |_______________________ 0.1268 0.200 0.126807783456701 0.209163200825806 0.917644582630895
3 |||||||||||| 0.150 0.059674251038448 0.082355417369105 0.977318833669343
2 |||| 0.100 0.018825805387129 0.022681166330657 0.996144639056472
1 | 0.050 0.003553328058551 0.003855360943528 0.999697967115023
0 | 0.000 0.000302032884977 0.000302032884977 1.000000000000000
Hypergeometric Point Probability k P= 0.126807783456701
Hypergeometric kum. Probability <=k <p= 0.209163200825806
Hypergeometric kum. Probability >k >p= 0.790836799174194
Hypergeometric (c) SCHRAUSSER 2009; 09/29/09 22:32:29;
k(A)= 8, n(A)= 20, N= 100, K(A)= 30
i P(i) Pi <pi >pi
20 | 1.000 0.000000000000056 1.000000000000000 0.000000000000056
19 | 0.950 0.000000000007134 0.999999999999944 0.000000000007190
18 | 0.900 0.000000000389716 0.999999999992810 0.000000000396906
17 | 0.850 0.000000012231078 0.999999999603094 0.000000012627984
16 | 0.800 0.000000248771382 0.999999987372016 0.000000261399365
15 | 0.750 0.000003502701054 0.999999738600635 0.000003764100419
14 | 0.700 0.000035574307575 0.999996235899581 0.000039338407994
13 | 0.650 0.000267853609978 0.999960661592006 0.000307192017972
12 | 0.600 0.001523417406752 0.999692807982028 0.001830609424724
11 |% 0.550 0.006628202050428 0.998169390575276 0.008458811475152
10 |%%%% 0.500 0.022237617879185 0.991541188524848 0.030696429354337
9 |%%%%%%%%%% 0.450 0.057760046439441 0.969303570645663 0.088456475793778
8 |_____________________ 0.1162 0.400 0.116176457042968 0.911543524206222 0.204632932836746
7 |||||||||||||||||||||||||||||||||| 0.350 0.180287210929555 0.795367067163254 0.384920143766301
6 ||||||||||||||||||||||||||||||||||||||||| 0.300 0.214091062978847 0.615079856233699 0.599011206745147
5 |||||||||||||||||||||||||||||||||||| 0.250 0.191825592429047 0.400988793254853 0.790836799174194
4 |||||||||||||||||||||||| 0.200 0.126807783456701 0.209163200825806 0.917644582630895
3 |||||||||||| 0.150 0.059674251038448 0.082355417369105 0.977318833669343
2 |||| 0.100 0.018825805387129 0.022681166330657 0.996144639056472
1 | 0.050 0.003553328058551 0.003855360943528 0.999697967115023
0 | 0.000 0.000302032884977 0.000302032884977 1.000000000000000
Hypergeometric Point Probability k P= 0.116176457042968
Hypergeometric kum. Probability <=k <p= 0.911543524206221
Hypergeometric kum. Probability >k >p= 0.088456475793779
Hypergeometric (c) SCHRAUSSER 2009; 09/29/09 22:32:35;
k(A)= 8, n(A)= 40, N= 100, K(A)= 30
i P(i) Pi <pi >pi
40 | 1.000 0.000000000000000 1.000000000000000 0.000000000000000
39 | 0.975 0.000000000000000 1.000000000000000 0.000000000000000
38 | 0.950 0.000000000000000 1.000000000000000 0.000000000000000
37 | 0.925 0.000000000000000 1.000000000000000 0.000000000000000
36 | 0.900 0.000000000000000 1.000000000000000 0.000000000000000
35 | 0.875 0.000000000000000 1.000000000000000 0.000000000000000
34 | 0.850 0.000000000000000 1.000000000000000 0.000000000000000
33 | 0.825 0.000000000000000 1.000000000000000 0.000000000000000
32 | 0.800 0.000000000000000 1.000000000000000 0.000000000000000
31 | 0.775 0.000000000000000 1.000000000000000 0.000000000000000
30 | 0.750 0.000000000000000 1.000000000000000 0.000000000000000
29 | 0.725 0.000000000000005 1.000000000000000 0.000000000000005
28 | 0.700 0.000000000000337 0.999999999999995 0.000000000000341
27 | 0.675 0.000000000014019 0.999999999999659 0.000000000014361
26 | 0.650 0.000000000385278 0.999999999985639 0.000000000399638
25 | 0.625 0.000000007479527 0.999999999600362 0.000000007879165
24 | 0.600 0.000000107128640 0.999999992120835 0.000000115007805
23 | 0.575 0.000001166711911 0.999999884992195 0.000001281719716
22 | 0.550 0.000009876540412 0.999998718280284 0.000011158260129
21 | 0.525 0.000066074632934 0.999988841739871 0.000077232893063
20 | 0.500 0.000353829659362 0.999922767106938 0.000431062552424
19 | 0.475 0.001531730127106 0.999568937447576 0.001962792679530
18 |% 0.450 0.005401669501273 0.998037207320470 0.007364462180803
17 |%%% 0.425 0.015608837622407 0.992635537819197 0.022973299803210
16 |%%%%%%%% 0.400 0.037117444227092 0.977026700196791 0.060090744030301
15 |%%%%%%%%%%%%%%%% 0.375 0.072849170536372 0.939909255969699 0.132939914566673
14 |%%%%%%%%%%%%%%%%%%%%%%%%%% 0.350 0.118204783923200 0.867060085433327 0.251144698489873
13 |%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.325 0.158636485613706 0.748855301510127 0.409781184103579
12 |%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.300 0.175948006861233 0.590218815896421 0.585729190964812
11 |%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.275 0.160939737673433 0.414270809035188 0.746668928638245
10 |%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.250 0.120973036151197 0.253331071361755 0.867641964789442
9 |%%%%%%%%%%%%%%%% 0.225 0.074330590569092 0.132358035210558 0.941972555358534
8 |________ 0.0371 0.200 0.037059712059306 0.058027444641466 0.979032267417840
7 |||| 0.175 0.014843415633767 0.020967732582160 0.993875683051606
6 || 0.150 0.004711329226894 0.006124316948394 0.998587012278501
5 | 0.125 0.001163025272010 0.001412987721499 0.999750037550511
4 | 0.100 0.000217445964318 0.000249962449489 0.999967483514829
3 | 0.075 0.000029602253401 0.000032516485171 0.999997085768230
2 | 0.050 0.000002754345006 0.000002914231770 0.999999840113236
1 | 0.025 0.000000155860372 0.000000159886764 0.999999995973608
0 | 0.000 0.000000004026393 0.000000004026392 1.000000000000001
Hypergeometric Point Probability k P= 0.037059712059306
Hypergeometric kum. Probability <=k <p= 0.058027444641467
Hypergeometric kum. Probability >k >p= 0.941972555358533
Hypergeometric (c) SCHRAUSSER 2009; 09/29/09 22:32:42;
k(A)= 8, n(A)= 60, N= 100, K(A)= 30
i P(i) Pi <pi >pi
60 | 1.000 0.000000000000000 1.000000000000000 0.000000000000000
59 | 0.983 0.000000000000000 1.000000000000000 0.000000000000000
58 | 0.967 0.000000000000000 1.000000000000000 0.000000000000000
57 | 0.950 0.000000000000000 1.000000000000000 0.000000000000000
56 | 0.933 0.000000000000000 1.000000000000000 0.000000000000000
55 | 0.917 0.000000000000000 1.000000000000000 0.000000000000000
54 | 0.900 0.000000000000000 1.000000000000000 0.000000000000000
53 | 0.883 0.000000000000000 1.000000000000000 0.000000000000000
52 | 0.867 0.000000000000000 1.000000000000000 0.000000000000000
51 | 0.850 0.000000000000000 1.000000000000000 0.000000000000000
50 | 0.833 0.000000000000000 1.000000000000000 0.000000000000000
49 | 0.817 0.000000000000000 1.000000000000000 0.000000000000000
48 | 0.800 0.000000000000000 1.000000000000000 0.000000000000000
47 | 0.783 0.000000000000000 1.000000000000000 0.000000000000000
46 | 0.767 0.000000000000000 1.000000000000000 0.000000000000000
45 | 0.750 0.000000000000000 1.000000000000000 0.000000000000000
44 | 0.733 0.000000000000000 1.000000000000000 0.000000000000000
43 | 0.717 0.000000000000000 1.000000000000000 0.000000000000000
42 | 0.700 0.000000000000000 1.000000000000000 0.000000000000000
41 | 0.683 0.000000000000000 1.000000000000000 0.000000000000000
40 | 0.667 0.000000000000000 1.000000000000000 0.000000000000000
39 | 0.650 0.000000000000000 1.000000000000000 0.000000000000000
38 | 0.633 0.000000000000000 1.000000000000000 0.000000000000000
37 | 0.617 0.000000000000000 1.000000000000000 0.000000000000000
36 | 0.600 0.000000000000000 1.000000000000000 0.000000000000000
35 | 0.583 0.000000000000000 1.000000000000000 0.000000000000000
34 | 0.567 0.000000000000001 1.000000000000000 0.000000000000001
33 | 0.550 0.000000000000040 0.999999999999999 0.000000000000041
32 | 0.533 0.000000000002051 0.999999999999959 0.000000000002092
31 | 0.517 0.000000000095037 0.999999999997908 0.000000000097129
30 | 0.500 0.000000004026393 0.999999999902871 0.000000004123522
29 | 0.483 0.000000155860372 0.999999995876478 0.000000159983893
28 | 0.467 0.000002754345006 0.999999840016107 0.000002914328900
27 | 0.450 0.000029602253401 0.999997085671100 0.000032516582300
26 | 0.433 0.000217445964318 0.999967483417700 0.000249962546618
25 | 0.417 0.001163025272010 0.999750037453382 0.001412987818629
24 |% 0.400 0.004711329226894 0.998587012181371 0.006124317045523
23 |%%% 0.383 0.014843415633767 0.993875682954477 0.020967732679290
22 |%%%%%%%% 0.367 0.037059712059306 0.979032267320710 0.058027444738595
21 |%%%%%%%%%%%%%%%% 0.350 0.074330590569092 0.941972555261404 0.132358035307687
20 |%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.333 0.120973036151197 0.867641964692313 0.253331071458885
19 |%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.317 0.160939737673433 0.746668928541115 0.414270809132318
18 |%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.300 0.175948006861233 0.585729190867682 0.590218815993551
17 |%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.283 0.158636485613706 0.409781184006449 0.748855301607257
16 |%%%%%%%%%%%%%%%%%%%%%%%%%% 0.267 0.118204783923200 0.251144698392743 0.867060085530456
15 |%%%%%%%%%%%%%%%% 0.250 0.072849170536372 0.132939914469544 0.939909256066828
14 |%%%%%%%% 0.233 0.037117444227092 0.060090743933172 0.977026700293920
13 |%%% 0.217 0.015608837622407 0.022973299706080 0.992635537916326
12 |% 0.200 0.005401669501273 0.007364462083674 0.998037207417599
11 | 0.183 0.001531730127106 0.001962792582401 0.999568937544705
10 | 0.167 0.000353829659362 0.000431062455295 0.999922767204067
9 | 0.150 0.000066074632934 0.000077232795933 0.999988841837001
8 | 0.0000 0.133 0.000009876540412 0.000011158162999 0.999998718377413
7 | 0.117 0.000001166711911 0.000001281622587 0.999999885089324
6 | 0.100 0.000000107128640 0.000000114910676 0.999999992217964
5 | 0.083 0.000000007479527 0.000000007782036 0.999999999697491
4 | 0.067 0.000000000385278 0.000000000302509 1.000000000082769
3 | 0.050 0.000000000014019 -0.000000000082768 1.000000000096788
2 | 0.033 0.000000000000337 -0.000000000096788 1.000000000097124
1 | 0.017 0.000000000000005 -0.000000000097124 1.000000000097129
0 | 0.000 0.000000000000000 -0.000000000097129 1.000000000097129
Hypergeometric Point Probability k P= 0.000009876540412
Hypergeometric kum. Probability <=k <p= 0.000011158260129
Hypergeometric kum. Probability >k >p= 0.999988841739871
Hypergeometric (c) SCHRAUSSER 2009; 09/29/09 22:32:54;
k(A)= 20, n(A)= 60, N= 100, K(A)= 30
i P(i) Pi <pi >pi
60 | 1.000 0.000000000000000 1.000000000000000 0.000000000000000
59 | 0.983 0.000000000000000 1.000000000000000 0.000000000000000
58 | 0.967 0.000000000000000 1.000000000000000 0.000000000000000
57 | 0.950 0.000000000000000 1.000000000000000 0.000000000000000
56 | 0.933 0.000000000000000 1.000000000000000 0.000000000000000
55 | 0.917 0.000000000000000 1.000000000000000 0.000000000000000
54 | 0.900 0.000000000000000 1.000000000000000 0.000000000000000
53 | 0.883 0.000000000000000 1.000000000000000 0.000000000000000
52 | 0.867 0.000000000000000 1.000000000000000 0.000000000000000
51 | 0.850 0.000000000000000 1.000000000000000 0.000000000000000
50 | 0.833 0.000000000000000 1.000000000000000 0.000000000000000
49 | 0.817 0.000000000000000 1.000000000000000 0.000000000000000
48 | 0.800 0.000000000000000 1.000000000000000 0.000000000000000
47 | 0.783 0.000000000000000 1.000000000000000 0.000000000000000
46 | 0.767 0.000000000000000 1.000000000000000 0.000000000000000
45 | 0.750 0.000000000000000 1.000000000000000 0.000000000000000
44 | 0.733 0.000000000000000 1.000000000000000 0.000000000000000
43 | 0.717 0.000000000000000 1.000000000000000 0.000000000000000
42 | 0.700 0.000000000000000 1.000000000000000 0.000000000000000
41 | 0.683 0.000000000000000 1.000000000000000 0.000000000000000
40 | 0.667 0.000000000000000 1.000000000000000 0.000000000000000
39 | 0.650 0.000000000000000 1.000000000000000 0.000000000000000
38 | 0.633 0.000000000000000 1.000000000000000 0.000000000000000
37 | 0.617 0.000000000000000 1.000000000000000 0.000000000000000
36 | 0.600 0.000000000000000 1.000000000000000 0.000000000000000
35 | 0.583 0.000000000000000 1.000000000000000 0.000000000000000
34 | 0.567 0.000000000000001 1.000000000000000 0.000000000000001
33 | 0.550 0.000000000000040 0.999999999999999 0.000000000000041
32 | 0.533 0.000000000002051 0.999999999999959 0.000000000002092
31 | 0.517 0.000000000095037 0.999999999997908 0.000000000097129
30 | 0.500 0.000000004026393 0.999999999902871 0.000000004123522
29 | 0.483 0.000000155860372 0.999999995876478 0.000000159983893
28 | 0.467 0.000002754345006 0.999999840016107 0.000002914328900
27 | 0.450 0.000029602253401 0.999997085671100 0.000032516582300
26 | 0.433 0.000217445964318 0.999967483417700 0.000249962546618
25 | 0.417 0.001163025272010 0.999750037453382 0.001412987818629
24 |% 0.400 0.004711329226894 0.998587012181371 0.006124317045523
23 |%%% 0.383 0.014843415633767 0.993875682954477 0.020967732679290
22 |%%%%%%%% 0.367 0.037059712059306 0.979032267320710 0.058027444738595
21 |%%%%%%%%%%%%%%%% 0.350 0.074330590569092 0.941972555261404 0.132358035307687
20 |___________________________ 0.1210 0.333 0.120973036151197 0.867641964692313 0.253331071458885
19 ||||||||||||||||||||||||||||||||||||| 0.317 0.160939737673433 0.746668928541115 0.414270809132318
18 ||||||||||||||||||||||||||||||||||||||||| 0.300 0.175948006861233 0.585729190867682 0.590218815993551
17 ||||||||||||||||||||||||||||||||||||| 0.283 0.158636485613706 0.409781184006449 0.748855301607257
16 ||||||||||||||||||||||||||| 0.267 0.118204783923200 0.251144698392743 0.867060085530456
15 ||||||||||||||||| 0.250 0.072849170536372 0.132939914469544 0.939909256066828
14 ||||||||| 0.233 0.037117444227092 0.060090743933172 0.977026700293920
13 |||| 0.217 0.015608837622407 0.022973299706080 0.992635537916326
12 || 0.200 0.005401669501273 0.007364462083674 0.998037207417599
11 | 0.183 0.001531730127106 0.001962792582401 0.999568937544705
10 | 0.167 0.000353829659362 0.000431062455295 0.999922767204067
9 | 0.150 0.000066074632934 0.000077232795933 0.999988841837001
8 | 0.133 0.000009876540412 0.000011158162999 0.999998718377413
7 | 0.117 0.000001166711911 0.000001281622587 0.999999885089324
6 | 0.100 0.000000107128640 0.000000114910676 0.999999992217964
5 | 0.083 0.000000007479527 0.000000007782036 0.999999999697491
4 | 0.067 0.000000000385278 0.000000000302509 1.000000000082769
3 | 0.050 0.000000000014019 -0.000000000082768 1.000000000096788
2 | 0.033 0.000000000000337 -0.000000000096788 1.000000000097124
1 | 0.017 0.000000000000005 -0.000000000097124 1.000000000097129
0 | 0.000 0.000000000000000 -0.000000000097129 1.000000000097129
Hypergeometric Point Probability k P= 0.120973036151197
Hypergeometric kum. Probability <=k <p= 0.867641964789442
Hypergeometric kum. Probability >k >p= 0.132358035210558
Hypergeometric (c) SCHRAUSSER 2009; 09/29/09 22:33:08;
k(A)= 20, n(A)= 160, N= 100, K(A)= 30
i P(i) Pi <pi >pi
160 | 1.000 0.000000000000000 1.000000000000000 0.000000000000000
159 | 0.994 0.000000000000000 1.000000000000000 0.000000000000000
158 | 0.988 0.000000000000000 1.000000000000000 0.000000000000000
157 | 0.981 0.000000000000000 1.000000000000000 0.000000000000000
156 | 0.975 0.000000000000000 1.000000000000000 0.000000000000000
155 | 0.969 0.000000000000000 1.000000000000000 0.000000000000000
154 | 0.963 0.000000000000000 1.000000000000000 0.000000000000000
153 | 0.956 0.000000000000000 1.000000000000000 0.000000000000000
152 | 0.950 0.000000000000000 1.000000000000000 0.000000000000000
151 | 0.944 0.000000000000000 1.000000000000000 0.000000000000000
150 | 0.938 0.000000000000000 1.000000000000000 0.000000000000000
149 | 0.931 0.000000000000000 1.000000000000000 0.000000000000000
148 | 0.925 0.000000000000000 1.000000000000000 0.000000000000000
147 | 0.919 0.000000000000000 1.000000000000000 0.000000000000000
146 | 0.912 0.000000000000000 1.000000000000000 0.000000000000000
145 | 0.906 0.000000000000000 1.000000000000000 0.000000000000000
144 | 0.900 0.000000000000000 1.000000000000000 0.000000000000000
143 | 0.894 0.000000000000000 1.000000000000000 0.000000000000000
142 | 0.887 0.000000000000000 1.000000000000000 0.000000000000000
141 | 0.881 0.000000000000000 1.000000000000000 0.000000000000000
140 | 0.875 0.000000000000000 1.000000000000000 0.000000000000000
139 | 0.869 0.000000000000000 1.000000000000000 0.000000000000000
138 | 0.863 0.000000000000000 1.000000000000000 0.000000000000000
137 | 0.856 0.000000000000000 1.000000000000000 0.000000000000000
136 | 0.850 0.000000000000000 1.000000000000000 0.000000000000000
135 | 0.844 0.000000000000000 1.000000000000000 0.000000000000000
134 | 0.838 0.000000000000000 1.000000000000000 0.000000000000000
133 | 0.831 0.000000000000000 1.000000000000000 0.000000000000000
132 | 0.825 0.000000000000000 1.000000000000000 0.000000000000000
131 | 0.819 0.000000000000000 1.000000000000000 0.000000000000000
130 | 0.813 0.000000000000000 1.000000000000000 0.000000000000000
129 | 0.806 0.000000000000000 1.000000000000000 0.000000000000000
128 | 0.800 0.000000000000000 1.000000000000000 0.000000000000000
127 | 0.794 0.000000000000000 1.000000000000000 0.000000000000000
126 | 0.787 0.000000000000000 1.000000000000000 0.000000000000000
125 | 0.781 0.000000000000000 1.000000000000000 0.000000000000000
124 | 0.775 0.000000000000000 1.000000000000000 0.000000000000000
123 | 0.769 0.000000000000000 1.000000000000000 0.000000000000000
122 | 0.762 0.000000000000000 1.000000000000000 0.000000000000000
121 | 0.756 0.000000000000000 1.000000000000000 0.000000000000000
120 | 0.750 0.000000000000000 1.000000000000000 0.000000000000000
119 | 0.744 0.000000000000000 1.000000000000000 0.000000000000000
118 | 0.738 0.000000000000000 1.000000000000000 0.000000000000000
117 | 0.731 0.000000000000006 1.000000000000000 0.000000000000006
116 | 0.725 0.000000000000441 0.999999999999994 0.000000000000447
115 | 0.719 0.000000000029575 0.999999999999552 0.000000000030022
114 | 0.713 0.000000001848419 0.999999999969978 0.000000001878441
113 | 0.706 0.000000107601575 0.999999998121559 0.000000109480016
112 | 0.700 0.000005826176937 0.999999890519984 0.000005935656953
111 | 0.694 0.000292973468823 0.999994064343047 0.000298909125776
110 | 0.688 0.013658423116535 0.999701090874224 0.013957332242311
109 | 0.681 0.589186879536822 0.986042667757689 0.603144211779133
108 | 0.675 23.465500529245340 0.396855788220869 24.068644741024471
107 | 0.669 860.696849600998800 -23.068644741024514 884.765494342023320
106 | 0.662 28992.732767115122000 -883.765494342023890 29877.498261457145000
105 | 0.656 894030.450418677300000 -29876.498261457193000 923907.948680134490000
104 | 0.650 25144606.418025300000000 -923906.948680132630000 26068514.366705433000000
103 | 0.644 642290297.274470690000000 -26068513.366705418000000 668358811.641176100000000
102 | 0.637 14828046690.526142000000000 -668358810.641176220000000 15496405502.167318000000000
101 | 0.631 307619138122.101680000000000 -15496405501.167297000000000 323115543624.268980000000000
100 | 0.625 5696081040894.249000000000000 -323115543623.268550000000000 6019196584518.517600000000000
99 | 0.619 93378377719577.875000000000000 -6019196584517.515600000000000 99397574304096.391000000000000
98 | 0.613 1341937654002320.500000000000000 -99397574304095.500000000000000 1441335228306417.000000000000000
97 | 0.606 16699668583139992.000000000000000 -1441335228306416.000000000000000 18141003811446408.000000000000000
96 | 0.600 177173046374250850.000000000000000 -18141003811446400.000000000000000 195314050185697250.000000000000000
95 | 0.594 1570025764793361400.000000000000000 -195314050185697280.000000000000000 1765339814979058700.000000000000000
94 | 0.588 11299427852679496000.000000000000000 -1765339814979059700.000000000000000 13064767667658555000.000000000000000
93 | 0.581 63411714516529701000.000000000000000 -13064767667658564000.000000000000000 76476482184188264000.000000000000000
92 |%%% 0.575 260174534560467450000.000000000000000 -76476482184188264000.000000000000000 336651016744655720000.000000000000000
91 |%%%%%%%% 0.569 693798758827913250000.000000000000000 -336651016744655780000.000000000000000 1030449775572569000000.000000000000000
90 |%%%%%%%%%%% 0.563 901938386476287260000.000000000000000 -1030449775572569200000.000000000000000 1932388162048856400000.000000000000000
89 |%%%%%%%%%%%%%% 0.556 1143302180040364100000.000000000000000 -1932388162048856400000.000000000000000 3075690342089220400000.000000000000000
88 |%%%%%%%%%%%%%%%%%% 0.550 1413248528105450000000.000000000000000 -3075690342089220400000.000000000000000 4488938870194670400000.000000000000000
87 |%%%%%%%%%%%%%%%%%%%%% 0.544 1703642061277803100000.000000000000000 -4488938870194670400000.000000000000000 6192580931472473500000.000000000000000
86 |%%%%%%%%%%%%%%%%%%%%%%%%% 0.537 2002930531502281700000.000000000000000 -6192580931472473500000.000000000000000 8195511462974755700000.000000000000000
85 |%%%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.531 2296693676122616100000.000000000000000 -8195511462974756700000.000000000000000 10492205139097373000000.000000000000000
84 |%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.525 2568670558821346700000.000000000000000 -10492205139097373000000.000000000000000 13060875697918719000000.000000000000000
83 |%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.519 2802186064168742300000.000000000000000 -13060875697918719000000.000000000000000 15863061762087462000000.000000000000000
82 |%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.512 2981813375974431500000.000000000000000 -15863061762087462000000.000000000000000 18844875138061893000000.000000000000000
81 |%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.506 3095046795315232400000.000000000000000 -18844875138061893000000.000000000000000 21939921933377124000000.000000000000000
80 |%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.500 3133734880256673200000.000000000000000 -21939921933377124000000.000000000000000 25073656813633797000000.000000000000000
79 |%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.494 3095046795315232400000.000000000000000 -25073656813633797000000.000000000000000 28168703608949028000000.000000000000000
78 |%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.487 2981813375974431500000.000000000000000 -28168703608949028000000.000000000000000 31150516984923459000000.000000000000000
77 |%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.481 2802186064168742300000.000000000000000 -31150516984923459000000.000000000000000 33952703049092200000000.000000000000000
76 |%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.475 2568670558821347200000.000000000000000 -33952703049092200000000.000000000000000 36521373607913547000000.000000000000000
75 |%%%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.469 2296693676122616600000.000000000000000 -36521373607913551000000.000000000000000 38818067284036166000000.000000000000000
74 |%%%%%%%%%%%%%%%%%%%%%%%%% 0.463 2002930531502281700000.000000000000000 -38818067284036166000000.000000000000000 40820997815538450000000.000000000000000
73 |%%%%%%%%%%%%%%%%%%%%% 0.456 1703642061277803100000.000000000000000 -40820997815538450000000.000000000000000 42524639876816250000000.000000000000000
72 |%%%%%%%%%%%%%%%%%% 0.450 1413248528105450000000.000000000000000 -42524639876816250000000.000000000000000 43937888404921700000000.000000000000000
71 |%%%%%%%%%%%%%% 0.444 1143302180040364100000.000000000000000 -43937888404921700000000.000000000000000 45081190584962062000000.000000000000000
70 |%%%%%%%%%%% 0.438 901938386476287390000.000000000000000 -45081190584962062000000.000000000000000 45983128971438348000000.000000000000000
69 |%%%%%%%% 0.431 693798758827913120000.000000000000000 -45983128971438348000000.000000000000000 46676927730266258000000.000000000000000
68 |%%%%%% 0.425 520349069120934900000.000000000000000 -46676927730266258000000.000000000000000 47197276799387193000000.000000000000000
67 |%%%% 0.419 380470287099178250000.000000000000000 -47197276799387193000000.000000000000000 47577747086486373000000.000000000000000
66 |%%% 0.412 271186268464307900000.000000000000000 -47577747086486373000000.000000000000000 47848933354950684000000.000000000000000
65 |%% 0.406 188403091775203380000.000000000000000 -47848933354950684000000.000000000000000 48037336446725891000000.000000000000000
64 |% 0.400 127564593389460620000.000000000000000 -48037336446725891000000.000000000000000 48164901040115352000000.000000000000000
63 |% 0.394 84166329659025572000.000000000000000 -48164901040115352000000.000000000000000 48249067369774375000000.000000000000000
62 | 0.388 54106926209373577000.000000000000000 -48249067369774375000000.000000000000000 48303174295983749000000.000000000000000
61 | 0.381 33885145706880414000.000000000000000 -48303174295983749000000.000000000000000 48337059441690630000000.000000000000000
60 | 0.375 20669938881197052000.000000000000000 -48337059441690630000000.000000000000000 48357729380571831000000.000000000000000
59 | 0.369 12279171612592310000.000000000000000 -48357729380571831000000.000000000000000 48370008552184421000000.000000000000000
58 | 0.362 7102658089636727800.000000000000000 -48370008552184421000000.000000000000000 48377111210274060000000.000000000000000
57 | 0.356 3999555040766312400.000000000000000 -48377111210274060000000.000000000000000 48381110765314827000000.000000000000000
56 | 0.350 2192063820419998500.000000000000000 -48381110765314827000000.000000000000000 48383302829135245000000.000000000000000
55 | 0.344 1169100704223999000.000000000000000 -48383302829135245000000.000000000000000 48384471929839470000000.000000000000000
54 | 0.338 606608855965282560.000000000000000 -48384471929839470000000.000000000000000 48385078538695436000000.000000000000000
53 | 0.331 306139048804908930.000000000000000 -48385078538695436000000.000000000000000 48385384677744243000000.000000000000000
52 | 0.325 150234903580186820.000000000000000 -48385384677744243000000.000000000000000 48385534912647827000000.000000000000000
51 | 0.319 71671697120823072.000000000000000 -48385534912647827000000.000000000000000 48385606584344951000000.000000000000000
50 | 0.313 33229605028745240.000000000000000 -48385606584344951000000.000000000000000 48385639813949984000000.000000000000000
49 | 0.306 14968290553488848.000000000000000 -48385639813949984000000.000000000000000 48385654782240540000000.000000000000000
48 | 0.300 6548627117151371.000000000000000 -48385654782240540000000.000000000000000 48385661330867656000000.000000000000000
47 | 0.294 2781717713480228.500000000000000 -48385661330867656000000.000000000000000 48385664112585366000000.000000000000000
46 | 0.287 1146848530996234.500000000000000 -48385664112585366000000.000000000000000 48385665259433900000000.000000000000000
45 | 0.281 458739412398493.750000000000000 -48385665259433900000000.000000000000000 48385665718173309000000.000000000000000
44 | 0.275 177959254809760.530000000000000 -48385665718173309000000.000000000000000 48385665896132561000000.000000000000000
43 | 0.269 66924847962644.969000000000000 -48385665896132561000000.000000000000000 48385665963057413000000.000000000000000
42 | 0.263 24387868325370.629000000000000 -48385665963057413000000.000000000000000 48385665987445277000000.000000000000000
41 | 0.256 8607482938366.104500000000000 -48385665987445277000000.000000000000000 48385665996052761000000.000000000000000
40 | 0.250 2940890003941.752400000000000 -48385665996052761000000.000000000000000 48385665998993647000000.000000000000000
39 | 0.244 972195042625.372800000000000 -48385665998993647000000.000000000000000 48385665999965845000000.000000000000000
38 | 0.237 310783661167.127380000000000 -48385665999965845000000.000000000000000 48385666000276626000000.000000000000000
37 | 0.231 96014464425.616547000000000 -48385666000276626000000.000000000000000 48385666000372642000000.000000000000000
36 | 0.225 28649477288.288815000000000 -48385666000372642000000.000000000000000 48385666000401289000000.000000000000000
35 | 0.219 8251049459.027177800000000 -48385666000401289000000.000000000000000 48385666000409544000000.000000000000000
34 | 0.212 2291958183.063104600000000 -48385666000409544000000.000000000000000 48385666000411834000000.000000000000000
33 | 0.206 613595104.127130510000000 -48385666000411834000000.000000000000000 48385666000412446000000.000000000000000
32 | 0.200 158192487.782775820000000 -48385666000412446000000.000000000000000 48385666000412605000000.000000000000000
31 | 0.194 39241547.356967643000000 -48385666000412605000000.000000000000000 48385666000412647000000.000000000000000
30 | 0.188 9357599.754353823100000 -48385666000412647000000.000000000000000 48385666000412656000000.000000000000000
29 | 0.181 2142961.775806219300000 -48385666000412656000000.000000000000000 48385666000412656000000.000000000000000
28 | 0.175 235401.104160531630000 -48385666000412656000000.000000000000000 48385666000412656000000.000000000000000
27 | 0.169 16519.375730563625000 -48385666000412656000000.000000000000000 48385666000412656000000.000000000000000
26 | 0.163 832.132732696301900 -48385666000412656000000.000000000000000 48385666000412656000000.000000000000000
25 | 0.156 32.052520074227921 -48385666000412656000000.000000000000000 48385666000412656000000.000000000000000
24 | 0.150 0.982001227764336 -48385666000412656000000.000000000000000 48385666000412656000000.000000000000000
23 | 0.144 0.024575630309014 -48385666000412656000000.000000000000000 48385666000412656000000.000000000000000
22 | 0.138 0.000511992298104 -48385666000412656000000.000000000000000 48385666000412656000000.000000000000000
21 | 0.131 0.000009003861358 -48385666000412656000000.000000000000000 48385666000412656000000.000000000000000
20 | 0.0000 0.125 0.000000135057920 -48385666000412656000000.000000000000000 48385666000412656000000.000000000000000
19 | 0.119 0.000000001741559 -48385666000412656000000.000000000000000 48385666000412656000000.000000000000000
18 | 0.113 0.000000000019419 -48385666000412656000000.000000000000000 48385666000412656000000.000000000000000
17 | 0.106 0.000000000000188 -48385666000412656000000.000000000000000 48385666000412656000000.000000000000000
16 | 0.100 0.000000000000002 -48385666000412656000000.000000000000000 48385666000412656000000.000000000000000
15 | 0.094 0.000000000000000 -48385666000412656000000.000000000000000 48385666000412656000000.000000000000000
14 | 0.087 0.000000000000000 -48385666000412656000000.000000000000000 48385666000412656000000.000000000000000
13 | 0.081 0.000000000000000 -48385666000412656000000.000000000000000 48385666000412656000000.000000000000000
12 | 0.075 0.000000000000000 -48385666000412656000000.000000000000000 48385666000412656000000.000000000000000
11 | 0.069 0.000000000000000 -48385666000412656000000.000000000000000 48385666000412656000000.000000000000000
10 | 0.063 0.000000000000000 -48385666000412656000000.000000000000000 48385666000412656000000.000000000000000
9 | 0.056 0.000000000000000 -48385666000412656000000.000000000000000 48385666000412656000000.000000000000000
8 | 0.050 0.000000000000000 -48385666000412656000000.000000000000000 48385666000412656000000.000000000000000
7 | 0.044 0.000000000000000 -48385666000412656000000.000000000000000 48385666000412656000000.000000000000000
6 | 0.037 0.000000000000000 -48385666000412656000000.000000000000000 48385666000412656000000.000000000000000
5 | 0.031 0.000000000000000 -48385666000412656000000.000000000000000 48385666000412656000000.000000000000000
4 | 0.025 0.000000000000000 -48385666000412656000000.000000000000000 48385666000412656000000.000000000000000
3 | 0.019 0.000000000000000 -48385666000412656000000.000000000000000 48385666000412656000000.000000000000000
2 | 0.013 0.000000000000000 -48385666000412656000000.000000000000000 48385666000412656000000.000000000000000
1 | 0.006 0.000000000000000 -48385666000412656000000.000000000000000 48385666000412656000000.000000000000000
0 | 0.000 0.000000000000000 -48385666000412656000000.000000000000000 48385666000412656000000.000000000000000
Hypergeometric Point Probability k P= 0.000000135057920
Hypergeometric kum. Probability <=k <p= 0.000000136819088
Hypergeometric kum. Probability >k >p= 0.999999863180912
Hypergeometric (c) SCHRAUSSER 2009; 09/29/09 22:33:32;
k(A)= 20, n(A)= 160, N= 220, K(A)= 30
i P(i) Pi <pi >pi
160 | 1.000 0.000000000000000 1.000000000000000 0.000000000000000
159 | 0.994 0.000000000000000 1.000000000000000 0.000000000000000
158 | 0.988 0.000000000000000 1.000000000000000 0.000000000000000
157 | 0.981 0.000000000000000 1.000000000000000 0.000000000000000
156 | 0.975 0.000000000000000 1.000000000000000 0.000000000000000
155 | 0.969 0.000000000000000 1.000000000000000 0.000000000000000
154 | 0.963 0.000000000000000 1.000000000000000 0.000000000000000
153 | 0.956 0.000000000000000 1.000000000000000 0.000000000000000
152 | 0.950 0.000000000000000 1.000000000000000 0.000000000000000
151 | 0.944 0.000000000000000 1.000000000000000 0.000000000000000
150 | 0.938 0.000000000000000 1.000000000000000 0.000000000000000
149 | 0.931 0.000000000000000 1.000000000000000 0.000000000000000
148 | 0.925 0.000000000000000 1.000000000000000 0.000000000000000
147 | 0.919 0.000000000000000 1.000000000000000 0.000000000000000
146 | 0.912 0.000000000000000 1.000000000000000 0.000000000000000
145 | 0.906 0.000000000000000 1.000000000000000 0.000000000000000
144 | 0.900 0.000000000000000 1.000000000000000 0.000000000000000
143 | 0.894 0.000000000000000 1.000000000000000 0.000000000000000
142 | 0.887 0.000000000000000 1.000000000000000 0.000000000000000
141 | 0.881 0.000000000000000 1.000000000000000 0.000000000000000
140 | 0.875 0.000000000000000 1.000000000000000 0.000000000000000
139 | 0.869 0.000000000000000 1.000000000000000 0.000000000000000
138 | 0.863 0.000000000000000 1.000000000000000 0.000000000000000
137 | 0.856 0.000000000000000 1.000000000000000 0.000000000000000
136 | 0.850 0.000000000000000 1.000000000000000 0.000000000000000
135 | 0.844 0.000000000000000 1.000000000000000 0.000000000000000
134 | 0.838 0.000000000000000 1.000000000000000 0.000000000000000
133 | 0.831 0.000000000000000 1.000000000000000 0.000000000000000
132 | 0.825 0.000000000000000 1.000000000000000 0.000000000000000
131 | 0.819 0.000000000000000 1.000000000000000 0.000000000000000
130 | 0.813 0.000000000000000 1.000000000000000 0.000000000000000
129 | 0.806 0.000000000000000 1.000000000000000 0.000000000000000
128 | 0.800 0.000000000000000 1.000000000000000 0.000000000000000
127 | 0.794 0.000000000000000 1.000000000000000 0.000000000000000
126 | 0.787 0.000000000000000 1.000000000000000 0.000000000000000
125 | 0.781 0.000000000000000 1.000000000000000 0.000000000000000
124 | 0.775 0.000000000000000 1.000000000000000 0.000000000000000
123 | 0.769 0.000000000000000 1.000000000000000 0.000000000000000
122 | 0.762 0.000000000000000 1.000000000000000 0.000000000000000
121 | 0.756 0.000000000000000 1.000000000000000 0.000000000000000
120 | 0.750 0.000000000000000 1.000000000000000 0.000000000000000
119 | 0.744 0.000000000000000 1.000000000000000 0.000000000000000
118 | 0.738 0.000000000000000 1.000000000000000 0.000000000000000
117 | 0.731 0.000000000000000 1.000000000000000 0.000000000000000
116 | 0.725 0.000000000000000 1.000000000000000 0.000000000000000
115 | 0.719 0.000000000000000 1.000000000000000 0.000000000000000
114 | 0.713 0.000000000000000 1.000000000000000 0.000000000000000
113 | 0.706 0.000000000000000 1.000000000000000 0.000000000000000
112 | 0.700 0.000000000000000 1.000000000000000 0.000000000000000
111 | 0.694 0.000000000000000 1.000000000000000 0.000000000000000
110 | 0.688 0.000000000000000 1.000000000000000 0.000000000000000
109 | 0.681 0.000000000000000 1.000000000000000 0.000000000000000
108 | 0.675 0.000000000000000 1.000000000000000 0.000000000000000
107 | 0.669 0.000000000000000 1.000000000000000 0.000000000000000
106 | 0.662 0.000000000000000 1.000000000000000 0.000000000000000
105 | 0.656 0.000000000000000 1.000000000000000 0.000000000000000
104 | 0.650 0.000000000000000 1.000000000000000 0.000000000000000
103 | 0.644 0.000000000000000 1.000000000000000 0.000000000000000
102 | 0.637 0.000000000000000 1.000000000000000 0.000000000000000
101 | 0.631 0.000000000000000 1.000000000000000 0.000000000000000
100 | 0.625 0.000000000000000 1.000000000000000 0.000000000000000
99 | 0.619 0.000000000000000 1.000000000000000 0.000000000000000
98 | 0.613 0.000000000000000 1.000000000000000 0.000000000000000
97 | 0.606 0.000000000000000 1.000000000000000 0.000000000000000
96 | 0.600 0.000000000000000 1.000000000000000 0.000000000000000
95 | 0.594 0.000000000000000 1.000000000000000 0.000000000000000
94 | 0.588 0.000000000000000 1.000000000000000 0.000000000000000
93 | 0.581 0.000000000000000 1.000000000000000 0.000000000000000
92 | 0.575 0.000000000000000 1.000000000000000 0.000000000000000
91 | 0.569 0.000000000000000 1.000000000000000 0.000000000000000
90 | 0.563 0.000000000000000 1.000000000000000 0.000000000000000
89 | 0.556 0.000000000000000 1.000000000000000 0.000000000000000
88 | 0.550 0.000000000000000 1.000000000000000 0.000000000000000
87 | 0.544 0.000000000000000 1.000000000000000 0.000000000000000
86 | 0.537 0.000000000000000 1.000000000000000 0.000000000000000
85 | 0.531 0.000000000000000 1.000000000000000 0.000000000000000
84 | 0.525 0.000000000000000 1.000000000000000 0.000000000000000
83 | 0.519 0.000000000000000 1.000000000000000 0.000000000000000
82 | 0.512 0.000000000000000 1.000000000000000 0.000000000000000
81 | 0.506 0.000000000000000 1.000000000000000 0.000000000000000
80 | 0.500 0.000000000000000 1.000000000000000 0.000000000000000
79 | 0.494 0.000000000000000 1.000000000000000 0.000000000000000
78 | 0.487 0.000000000000000 1.000000000000000 0.000000000000000
77 | 0.481 0.000000000000000 1.000000000000000 0.000000000000000
76 | 0.475 0.000000000000000 1.000000000000000 0.000000000000000
75 | 0.469 0.000000000000000 1.000000000000000 0.000000000000000
74 | 0.463 0.000000000000000 1.000000000000000 0.000000000000000
73 | 0.456 0.000000000000000 1.000000000000000 0.000000000000000
72 | 0.450 0.000000000000000 1.000000000000000 0.000000000000000
71 | 0.444 0.000000000000000 1.000000000000000 0.000000000000000
70 | 0.438 0.000000000000000 1.000000000000000 0.000000000000000
69 | 0.431 0.000000000000000 1.000000000000000 0.000000000000000
68 | 0.425 0.000000000000000 1.000000000000000 0.000000000000000
67 | 0.419 0.000000000000000 1.000000000000000 0.000000000000000
66 | 0.412 0.000000000000000 1.000000000000000 0.000000000000000
65 | 0.406 0.000000000000000 1.000000000000000 0.000000000000000
64 | 0.400 0.000000000000000 1.000000000000000 0.000000000000000
63 | 0.394 0.000000000000000 1.000000000000000 0.000000000000000
62 | 0.388 0.000000000000000 1.000000000000000 0.000000000000000
61 | 0.381 0.000000000000000 1.000000000000000 0.000000000000000
60 | 0.375 0.000000000000000 1.000000000000000 0.000000000000000
59 | 0.369 0.000000000000000 1.000000000000000 0.000000000000000
58 | 0.362 0.000000000000000 1.000000000000000 0.000000000000000
57 | 0.356 0.000000000000000 1.000000000000000 0.000000000000000
56 | 0.350 0.000000000000000 1.000000000000000 0.000000000000000
55 | 0.344 0.000000000000000 1.000000000000000 0.000000000000000
54 | 0.338 0.000000000000000 1.000000000000000 0.000000000000000
53 | 0.331 0.000000000000000 1.000000000000000 0.000000000000000
52 | 0.325 0.000000000000000 1.000000000000000 0.000000000000000
51 | 0.319 0.000000000000000 1.000000000000000 0.000000000000000
50 | 0.313 0.000000000000000 1.000000000000000 0.000000000000000
49 | 0.306 0.000000000000000 1.000000000000000 0.000000000000000
48 | 0.300 0.000000000000000 1.000000000000000 0.000000000000000
47 | 0.294 0.000000000000000 1.000000000000000 0.000000000000000
46 | 0.287 0.000000000000000 1.000000000000000 0.000000000000000
45 | 0.281 0.000000000000000 1.000000000000000 0.000000000000000
44 | 0.275 0.000000000000000 1.000000000000000 0.000000000000000
43 | 0.269 0.000000000000000 1.000000000000000 0.000000000000000
42 | 0.263 0.000000000000000 1.000000000000000 0.000000000000000
41 | 0.256 0.000000000000000 1.000000000000000 0.000000000000000
40 | 0.250 0.000000000000000 1.000000000000000 0.000000000000000
39 | 0.244 0.000000000000000 1.000000000000000 0.000000000000000
38 | 0.237 0.000000000000003 1.000000000000000 0.000000000000004
37 | 0.231 0.000000000000072 0.999999999999996 0.000000000000076
36 | 0.225 0.000000000001446 0.999999999999924 0.000000000001522
35 | 0.219 0.000000000027490 0.999999999998478 0.000000000029012
34 | 0.212 0.000000000496345 0.999999999970988 0.000000000525357
33 | 0.206 0.000000008504303 0.999999999474643 0.000000009029660
32 | 0.200 0.000000138128483 0.999999990970340 0.000000147158143
31 | 0.194 0.000002124394654 0.999999852841857 0.000002271552797
30 | 0.188 0.000030901771463 0.999997728447203 0.000033173324260
29 | 0.181 0.000424604493386 0.999966826675740 0.000457777817646
28 | 0.175 0.002751887455242 0.999542222182354 0.003209665272888
27 |%% 0.169 0.011200664730107 0.996790334727112 0.014410330002995
26 |%%%%%%% 0.163 0.032160117573946 0.985589669997005 0.046570447576941
25 |%%%%%%%%%%%%%%% 0.156 0.069370564722468 0.953429552423059 0.115941012299409
24 |%%%%%%%%%%%%%%%%%%%%%%%%%% 0.150 0.116892802075237 0.884058987700591 0.232833814374646
23 |%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.144 0.157969834712729 0.767166185625354 0.390803649087374
22 |%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.138 0.174425025828638 0.609196350912626 0.565228674916012
21 |%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.131 0.159506178695413 0.434771325083988 0.724734853611425
20 |___________________________ 0.1220 0.125 0.122022226701991 0.275265146388575 0.846757080313416
19 ||||||||||||||||||| 0.119 0.078673260284972 0.153242919686584 0.925430340598388
18 |||||||||| 0.113 0.042984040683867 0.074569659401612 0.968414381282254
17 ||||| 0.106 0.019977520791211 0.031585618717746 0.988391902073465
16 || 0.100 0.007917678131040 0.011608097926535 0.996309580204505
15 | 0.094 0.002679269473308 0.003690419795495 0.998988849677814
14 | 0.087 0.000774189595241 0.001011150322186 0.999763039273055
13 | 0.081 0.000190836650928 0.000236960726945 0.999953875923982
12 | 0.075 0.000040044177128 0.000046124076018 0.999993920101110
11 | 0.069 0.000007129023410 0.000006079898890 1.000001049124520
10 | 0.063 0.000001071729853 -0.000001049124520 1.000002120854373
9 | 0.056 0.000000135191404 -0.000002120854373 1.000002256045776
8 | 0.050 0.000000014190246 -0.000002256045776 1.000002270236022
7 | 0.044 0.000000001225870 -0.000002270236022 1.000002271461892
6 | 0.037 0.000000000085904 -0.000002271461892 1.000002271547795
5 | 0.031 0.000000000004788 -0.000002271547795 1.000002271552584
4 | 0.025 0.000000000000207 -0.000002271552584 1.000002271552790
3 | 0.019 0.000000000000007 -0.000002271552790 1.000002271552797
2 | 0.013 0.000000000000000 -0.000002271552797 1.000002271552797
1 | 0.006 0.000000000000000 -0.000002271552797 1.000002271552797
0 | 0.000 0.000000000000000 -0.000002271552797 1.000002271552797
Hypergeometric Point Probability k P= 0.122022226701991
Hypergeometric kum. Probability <=k <p= 0.275267417941372
Hypergeometric kum. Probability >k >p= 0.724732582058628
Hypergeometric (c) SCHRAUSSER 2009; 09/29/09 22:33:57;
k(A)= 20, n(A)= 60, N= 100, K(A)= 30
i P(i) Pi <pi >pi
60 | 1.000 0.000000000000000 1.000000000000000 0.000000000000000
59 | 0.983 0.000000000000000 1.000000000000000 0.000000000000000
58 | 0.967 0.000000000000000 1.000000000000000 0.000000000000000
57 | 0.950 0.000000000000000 1.000000000000000 0.000000000000000
56 | 0.933 0.000000000000000 1.000000000000000 0.000000000000000
55 | 0.917 0.000000000000000 1.000000000000000 0.000000000000000
54 | 0.900 0.000000000000000 1.000000000000000 0.000000000000000
53 | 0.883 0.000000000000000 1.000000000000000 0.000000000000000
52 | 0.867 0.000000000000000 1.000000000000000 0.000000000000000
51 | 0.850 0.000000000000000 1.000000000000000 0.000000000000000
50 | 0.833 0.000000000000000 1.000000000000000 0.000000000000000
49 | 0.817 0.000000000000000 1.000000000000000 0.000000000000000
48 | 0.800 0.000000000000000 1.000000000000000 0.000000000000000
47 | 0.783 0.000000000000000 1.000000000000000 0.000000000000000
46 | 0.767 0.000000000000000 1.000000000000000 0.000000000000000
45 | 0.750 0.000000000000000 1.000000000000000 0.000000000000000
44 | 0.733 0.000000000000000 1.000000000000000 0.000000000000000
43 | 0.717 0.000000000000000 1.000000000000000 0.000000000000000
42 | 0.700 0.000000000000000 1.000000000000000 0.000000000000000
41 | 0.683 0.000000000000000 1.000000000000000 0.000000000000000
40 | 0.667 0.000000000000000 1.000000000000000 0.000000000000000
39 | 0.650 0.000000000000000 1.000000000000000 0.000000000000000
38 | 0.633 0.000000000000000 1.000000000000000 0.000000000000000
37 | 0.617 0.000000000000000 1.000000000000000 0.000000000000000
36 | 0.600 0.000000000000000 1.000000000000000 0.000000000000000
35 | 0.583 0.000000000000000 1.000000000000000 0.000000000000000
34 | 0.567 0.000000000000001 1.000000000000000 0.000000000000001
33 | 0.550 0.000000000000040 0.999999999999999 0.000000000000041
32 | 0.533 0.000000000002051 0.999999999999959 0.000000000002092
31 | 0.517 0.000000000095037 0.999999999997908 0.000000000097129
30 | 0.500 0.000000004026393 0.999999999902871 0.000000004123522
29 | 0.483 0.000000155860372 0.999999995876478 0.000000159983893
28 | 0.467 0.000002754345006 0.999999840016107 0.000002914328900
27 | 0.450 0.000029602253401 0.999997085671100 0.000032516582300
26 | 0.433 0.000217445964318 0.999967483417700 0.000249962546618
25 | 0.417 0.001163025272010 0.999750037453382 0.001412987818629
24 |% 0.400 0.004711329226894 0.998587012181371 0.006124317045523
23 |%%% 0.383 0.014843415633767 0.993875682954477 0.020967732679290
22 |%%%%%%%% 0.367 0.037059712059306 0.979032267320710 0.058027444738595
21 |%%%%%%%%%%%%%%%% 0.350 0.074330590569092 0.941972555261404 0.132358035307687
20 |___________________________ 0.1210 0.333 0.120973036151197 0.867641964692313 0.253331071458885
19 ||||||||||||||||||||||||||||||||||||| 0.317 0.160939737673433 0.746668928541115 0.414270809132318
18 ||||||||||||||||||||||||||||||||||||||||| 0.300 0.175948006861233 0.585729190867682 0.590218815993551
17 ||||||||||||||||||||||||||||||||||||| 0.283 0.158636485613706 0.409781184006449 0.748855301607257
16 ||||||||||||||||||||||||||| 0.267 0.118204783923200 0.251144698392743 0.867060085530456
15 ||||||||||||||||| 0.250 0.072849170536372 0.132939914469544 0.939909256066828
14 ||||||||| 0.233 0.037117444227092 0.060090743933172 0.977026700293920
13 |||| 0.217 0.015608837622407 0.022973299706080 0.992635537916326
12 || 0.200 0.005401669501273 0.007364462083674 0.998037207417599
11 | 0.183 0.001531730127106 0.001962792582401 0.999568937544705
10 | 0.167 0.000353829659362 0.000431062455295 0.999922767204067
9 | 0.150 0.000066074632934 0.000077232795933 0.999988841837001
8 | 0.133 0.000009876540412 0.000011158162999 0.999998718377413
7 | 0.117 0.000001166711911 0.000001281622587 0.999999885089324
6 | 0.100 0.000000107128640 0.000000114910676 0.999999992217964
5 | 0.083 0.000000007479527 0.000000007782036 0.999999999697491
4 | 0.067 0.000000000385278 0.000000000302509 1.000000000082769
3 | 0.050 0.000000000014019 -0.000000000082768 1.000000000096788
2 | 0.033 0.000000000000337 -0.000000000096788 1.000000000097124
1 | 0.017 0.000000000000005 -0.000000000097124 1.000000000097129
0 | 0.000 0.000000000000000 -0.000000000097129 1.000000000097129
Hypergeometric Point Probability k P= 0.120973036151197
Hypergeometric kum. Probability <=k <p= 0.867641964789442
Hypergeometric kum. Probability >k >p= 0.132358035210558
Hypergeometric (c) SCHRAUSSER 2009; 09/29/09 22:34:08;
k(A)= 10, n(A)= 50, N= 100, K(A)= 30
i P(i) Pi <pi >pi
50 | 1.000 0.000000000000000 1.000000000000000 0.000000000000000
49 | 0.980 0.000000000000000 1.000000000000000 0.000000000000000
48 | 0.960 0.000000000000000 1.000000000000000 0.000000000000000
47 | 0.940 0.000000000000000 1.000000000000000 0.000000000000000
46 | 0.920 0.000000000000000 1.000000000000000 0.000000000000000
45 | 0.900 0.000000000000000 1.000000000000000 0.000000000000000
44 | 0.880 0.000000000000000 1.000000000000000 0.000000000000000
43 | 0.860 0.000000000000000 1.000000000000000 0.000000000000000
42 | 0.840 0.000000000000000 1.000000000000000 0.000000000000000
41 | 0.820 0.000000000000000 1.000000000000000 0.000000000000000
40 | 0.800 0.000000000000000 1.000000000000000 0.000000000000000
39 | 0.780 0.000000000000000 1.000000000000000 0.000000000000000
38 | 0.760 0.000000000000000 1.000000000000000 0.000000000000000
37 | 0.740 0.000000000000000 1.000000000000000 0.000000000000000
36 | 0.720 0.000000000000000 1.000000000000000 0.000000000000000
35 | 0.700 0.000000000000000 1.000000000000000 0.000000000000000
34 | 0.680 0.000000000000000 1.000000000000000 0.000000000000000
33 | 0.660 0.000000000000000 1.000000000000000 0.000000000000000
32 | 0.640 0.000000000000000 1.000000000000000 0.000000000000000
31 | 0.620 0.000000000000020 1.000000000000000 0.000000000000021
30 | 0.600 0.000000000001605 0.999999999999979 0.000000000001625
29 | 0.580 0.000000000114610 0.999999999998375 0.000000000116235
28 | 0.560 0.000000003701391 0.999999999883765 0.000000003817627
27 | 0.540 0.000000072096666 0.999999996182373 0.000000075914292
26 | 0.520 0.000000953027800 0.999999924085708 0.000001028942093
25 | 0.500 0.000009118569992 0.999998971057907 0.000010147512085
24 | 0.480 0.000065758918212 0.999989852487915 0.000075906430297
23 | 0.460 0.000367414908108 0.999924093569703 0.000443321338405
22 | 0.440 0.001622202429101 0.999556678661595 0.002065523767506
21 |% 0.420 0.005742969519117 0.997934476232494 0.007808493286624
20 |%%% 0.400 0.016482322519867 0.992191506713376 0.024290815806491
19 |%%%%%%%% 0.380 0.038668205325201 0.975709184193509 0.062959021131692
18 |%%%%%%%%%%%%%%%%% 0.360 0.074617552463475 0.937040978868308 0.137576573595167
17 |%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.340 0.118970643088617 0.862423426404833 0.256547216683784
16 |%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.320 0.157211206938529 0.743452783316216 0.413758423622313
15 |%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.300 0.172483152755415 0.586241576377687 0.586241576377728
14 |%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.280 0.157211206938529 0.413758423622272 0.743452783316257
13 |%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.260 0.118970643088617 0.256547216683743 0.862423426404874
12 |%%%%%%%%%%%%%%%%% 0.240 0.074617552463475 0.137576573595126 0.937040978868349
11 |%%%%%%%% 0.220 0.038668205325201 0.062959021131651 0.975709184193550
10 |___ 0.0165 0.200 0.016482322519867 0.024290815806450 0.992191506713417
9 || 0.180 0.005742969519117 0.007808493286583 0.997934476232535
8 | 0.160 0.001622202429101 0.002065523767465 0.999556678661636
7 | 0.140 0.000367414908108 0.000443321338364 0.999924093569744
6 | 0.120 0.000065758918212 0.000075906430256 0.999989852487957
5 | 0.100 0.000009118569992 0.000010147512043 0.999998971057949
4 | 0.080 0.000000953027800 0.000001028942051 0.999999924085749
3 | 0.060 0.000000072096666 0.000000075914251 0.999999996182415
2 | 0.040 0.000000003701391 0.000000003817585 0.999999999883806
1 | 0.020 0.000000000114610 0.000000000116194 0.999999999998416
0 | 0.000 0.000000000001605 0.000000000001584 1.000000000000021
Hypergeometric Point Probability k P= 0.016482322519867
Hypergeometric kum. Probability <=k <p= 0.024290815806470
Hypergeometric kum. Probability >k >p= 0.975709184193529
Hypergeometric (c) SCHRAUSSER 2009; 09/29/09 22:34:14;
k(A)= 10, n(A)= 40, N= 100, K(A)= 30
i P(i) Pi <pi >pi
40 | 1.000 0.000000000000000 1.000000000000000 0.000000000000000
39 | 0.975 0.000000000000000 1.000000000000000 0.000000000000000
38 | 0.950 0.000000000000000 1.000000000000000 0.000000000000000
37 | 0.925 0.000000000000000 1.000000000000000 0.000000000000000
36 | 0.900 0.000000000000000 1.000000000000000 0.000000000000000
35 | 0.875 0.000000000000000 1.000000000000000 0.000000000000000
34 | 0.850 0.000000000000000 1.000000000000000 0.000000000000000
33 | 0.825 0.000000000000000 1.000000000000000 0.000000000000000
32 | 0.800 0.000000000000000 1.000000000000000 0.000000000000000
31 | 0.775 0.000000000000000 1.000000000000000 0.000000000000000
30 | 0.750 0.000000000000000 1.000000000000000 0.000000000000000
29 | 0.725 0.000000000000005 1.000000000000000 0.000000000000005
28 | 0.700 0.000000000000337 0.999999999999995 0.000000000000341
27 | 0.675 0.000000000014019 0.999999999999659 0.000000000014361
26 | 0.650 0.000000000385278 0.999999999985639 0.000000000399638
25 | 0.625 0.000000007479527 0.999999999600362 0.000000007879165
24 | 0.600 0.000000107128640 0.999999992120835 0.000000115007805
23 | 0.575 0.000001166711911 0.999999884992195 0.000001281719716
22 | 0.550 0.000009876540412 0.999998718280284 0.000011158260129
21 | 0.525 0.000066074632934 0.999988841739871 0.000077232893063
20 | 0.500 0.000353829659362 0.999922767106938 0.000431062552424
19 | 0.475 0.001531730127106 0.999568937447576 0.001962792679530
18 |% 0.450 0.005401669501273 0.998037207320470 0.007364462180803
17 |%%% 0.425 0.015608837622407 0.992635537819197 0.022973299803210
16 |%%%%%%%% 0.400 0.037117444227092 0.977026700196791 0.060090744030301
15 |%%%%%%%%%%%%%%%% 0.375 0.072849170536372 0.939909255969699 0.132939914566673
14 |%%%%%%%%%%%%%%%%%%%%%%%%%% 0.350 0.118204783923200 0.867060085433327 0.251144698489873
13 |%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.325 0.158636485613706 0.748855301510127 0.409781184103579
12 |%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.300 0.175948006861233 0.590218815896421 0.585729190964812
11 |%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.275 0.160939737673433 0.414270809035188 0.746668928638245
10 |___________________________ 0.1210 0.250 0.120973036151197 0.253331071361755 0.867641964789442
9 ||||||||||||||||| 0.225 0.074330590569092 0.132358035210558 0.941972555358534
8 ||||||||| 0.200 0.037059712059306 0.058027444641466 0.979032267417840
7 |||| 0.175 0.014843415633767 0.020967732582160 0.993875683051606
6 || 0.150 0.004711329226894 0.006124316948394 0.998587012278501
5 | 0.125 0.001163025272010 0.001412987721499 0.999750037550511
4 | 0.100 0.000217445964318 0.000249962449489 0.999967483514829
3 | 0.075 0.000029602253401 0.000032516485171 0.999997085768230
2 | 0.050 0.000002754345006 0.000002914231770 0.999999840113236
1 | 0.025 0.000000155860372 0.000000159886764 0.999999995973608
0 | 0.000 0.000000004026393 0.000000004026392 1.000000000000001
Hypergeometric Point Probability k P= 0.120973036151197
Hypergeometric kum. Probability <=k <p= 0.253331071361756
Hypergeometric kum. Probability >k >p= 0.746668928638244
Hypergeometric (c) SCHRAUSSER 2009; 09/29/09 22:34:24;
k(A)= 10, n(A)= 30, N= 100, K(A)= 30
i P(i) Pi <pi >pi
30 | 1.000 0.000000000000000 1.000000000000000 0.000000000000000
29 | 0.967 0.000000000000000 1.000000000000000 0.000000000000000
28 | 0.933 0.000000000000000 1.000000000000000 0.000000000000000
27 | 0.900 0.000000000000000 1.000000000000000 0.000000000000000
26 | 0.867 0.000000000000001 1.000000000000000 0.000000000000001
25 | 0.833 0.000000000000059 0.999999999999999 0.000000000000060
24 | 0.800 0.000000000002651 0.999999999999940 0.000000000002710
23 | 0.767 0.000000000083087 0.999999999997290 0.000000000085797
22 | 0.733 0.000000001881146 0.999999999914203 0.000000001966944
21 | 0.700 0.000000031677573 0.999999998033057 0.000000033644517
20 | 0.667 0.000000405789714 0.999999966355483 0.000000439434231
19 | 0.633 0.000004024360802 0.999999560565769 0.000004463795033
18 | 0.600 0.000031328530963 0.999995536204967 0.000035792325996
17 | 0.567 0.000193532463463 0.999964207674004 0.000229324789459
16 | 0.533 0.000956800801510 0.999770675210541 0.001186125590968
15 | 0.500 0.003810193414012 0.998813874409031 0.004996319004980
14 |%% 0.467 0.012278943619373 0.995003680995020 0.017275262624353
13 |%%%%%% 0.433 0.032120696803620 0.982724737375647 0.049395959427973
12 |%%%%%%%%%%%%%% 0.400 0.068306049684241 0.950604040572027 0.117702009112214
11 |%%%%%%%%%%%%%%%%%%%%%%%%% 0.367 0.118069182833702 0.882297990887786 0.235771191945917
10 |___________________________________ 0.1656 0.333 0.165592028924267 0.764228808054083 0.401363220870184
9 ||||||||||||||||||||||||||||||||||||||||| 0.300 0.187746064539986 0.598636779129816 0.589109285410170
8 ||||||||||||||||||||||||||||||||||||| 0.267 0.171066145582921 0.410890714589830 0.760175430993091
7 ||||||||||||||||||||||||||| 0.233 0.124176559364540 0.239824569006909 0.884351990357631
6 |||||||||||||||| 0.200 0.070927236164815 0.115648009642369 0.955279226522446
5 ||||||| 0.167 0.031321467490382 0.044720773477554 0.986600694012829
4 ||| 0.133 0.010425044652864 0.013399305987171 0.997025738665693
3 | 0.100 0.002516883208373 0.002974261334307 0.999542621874066
2 | 0.067 0.000414130017704 0.000457378125934 0.999956751891770
1 | 0.033 0.000041363759200 0.000043248108230 0.999998115650970
0 | 0.000 0.000001884349030 0.000001884349030 1.000000000000000
Hypergeometric Point Probability k P= 0.165592028924267
Hypergeometric kum. Probability <=k <p= 0.764228808054083
Hypergeometric kum. Probability >k >p= 0.235771191945917
Hypergeometric (c) SCHRAUSSER 2009; 09/29/09 22:35:08;
k(A)= 10, n(A)= 50, N= 100, K(A)= 50
i P(i) Pi <pi >pi
50 | 1.000 0.000000000000000 1.000000000000000 0.000000000000000
49 | 0.980 0.000000000000000 1.000000000000000 0.000000000000000
48 | 0.960 0.000000000000000 1.000000000000000 0.000000000000000
47 | 0.940 0.000000000000000 1.000000000000000 0.000000000000000
46 | 0.920 0.000000000000000 1.000000000000000 0.000000000000000
45 | 0.900 0.000000000000000 1.000000000000000 0.000000000000000
44 | 0.880 0.000000000000003 1.000000000000000 0.000000000000003
43 | 0.860 0.000000000000099 0.999999999999997 0.000000000000101
42 | 0.840 0.000000000002857 0.999999999999899 0.000000000002958
41 | 0.820 0.000000000062217 0.999999999997042 0.000000000065176
40 | 0.800 0.000000001045875 0.999999999934824 0.000000001111050
39 | 0.780 0.000000013829747 0.999999998888950 0.000000014940798
38 | 0.760 0.000000146076706 0.999999985059202 0.000000161017504
37 | 0.740 0.000001248134696 0.999999838982496 0.000001409152200
36 | 0.720 0.000008717838770 0.999998590847800 0.000010126990970
35 | 0.700 0.000050214751315 0.999989873009030 0.000060341742285
34 | 0.680 0.000240285431099 0.999939658257715 0.000300627173385
33 | 0.660 0.000961141724397 0.999699372826615 0.001261768897782
32 | 0.640 0.003230504129223 0.998738231102218 0.004492273027004
31 |%% 0.620 0.009163535258516 0.995507726972996 0.013655808285520
30 |%%%%% 0.600 0.022015393458585 0.986344191714480 0.035671201744105
29 |%%%%%%%%%%% 0.580 0.044929374405275 0.964328798255895 0.080600576149380
28 |%%%%%%%%%%%%%%%%%%% 0.560 0.078069429493463 0.919399423850620 0.158670005642843
27 |%%%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.540 0.115702141253072 0.841329994357157 0.274372146895915
26 |%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.520 0.146435522523419 0.725627853104085 0.420807669419335
25 |%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.500 0.158384661161330 0.579192330580665 0.579192330580665
24 |%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.480 0.146435522523419 0.420807669419335 0.725627853104085
23 |%%%%%%%%%%%%%%%%%%%%%%%%%%%%% 0.460 0.115702141253072 0.274372146895915 0.841329994357157
22 |%%%%%%%%%%%%%%%%%%% 0.440 0.078069429493463 0.158670005642843 0.919399423850620
21 |%%%%%%%%%%% 0.420 0.044929374405275 0.080600576149380 0.964328798255895
20 |%%%%% 0.400 0.022015393458585 0.035671201744105 0.986344191714480
19 |%% 0.380 0.009163535258516 0.013655808285520 0.995507726972996
18 | 0.360 0.003230504129223 0.004492273027004 0.998738231102219
17 | 0.340 0.000961141724397 0.001261768897781 0.999699372826616
16 | 0.320 0.000240285431099 0.000300627173384 0.999939658257715
15 | 0.300 0.000050214751315 0.000060341742285 0.999989873009030
14 | 0.280 0.000008717838770 0.000010126990970 0.999998590847800
13 | 0.260 0.000001248134696 0.000001409152200 0.999999838982496
12 | 0.240 0.000000146076706 0.000000161017504 0.999999985059202
11 | 0.220 0.000000013829747 0.000000014940798 0.999999998888950
10 | 0.0000 0.200 0.000000001045875 0.000000001111050 0.999999999934824
9 | 0.180 0.000000000062217 0.000000000065176 0.999999999997042
8 | 0.160 0.000000000002857 0.000000000002958 0.999999999999899
7 | 0.140 0.000000000000099 0.000000000000101 0.999999999999998
6 | 0.120 0.000000000000003 0.000000000000003 1.000000000000000
5 | 0.100 0.000000000000000 0.000000000000000 1.000000000000000
4 | 0.080 0.000000000000000 0.000000000000000 1.000000000000000
3 | 0.060 0.000000000000000 0.000000000000000 1.000000000000000
2 | 0.040 0.000000000000000 0.000000000000000 1.000000000000000
1 | 0.020 0.000000000000000 0.000000000000000 1.000000000000000
0 | 0.000 0.000000000000000 0.000000000000000 1.000000000000000
Hypergeometric Point Probability k P= 0.000000001045875
Hypergeometric kum. Probability <=k <p= 0.000000001111050
Hypergeometric kum. Probability >k >p= 0.999999998888950
Hypergeometric (c) SCHRAUSSER 2009; 09/29/09 22:35:28;