resultat statistiques

bonjour

j'ai pourri un serveur avec mon gene d'aleas
pendant ce week-end de 3 jours en gros 72 heures

http://groups.google.fr/group/sci.crypt.random-numbers/browse_thread/thread/eae8fdfb61d3a469/b06114dd20de5ecf?q=remy&rnum=1#b06114dd20de5ecf

a l'arrivee 28 M


le principe l'ecart entre 2 nb premier
et somme modulo 2 des chiffres de l'ecart


il ne reste plus qu'a chercher une attaque
le point faible du gene c'est la "graine" et le
generateur de nb premier

par exemple

java gene 3 10 10 100000
et
java gene 7 10 10 100000

c'est tout ce que j'ai trouve mais je vous fais confiance
pour trouver autre chose

stat
*****************************************

Entropy = 7.988851 bits per byte.

Optimum compression would reduce the size
of this 28321610 byte file by 0 percent.

Chi square distribution for 28321610 samples is 433986.73, and randomly
would exceed this value 0.01 percent of the times.

Arithmetic mean value of data bytes is 125.6735 (127.5 = random).
Monte Carlo value for Pi is 3.152780308 (error 0.36 percent).
Serial correlation coefficient is -0.000183 (totally uncorrelated = 0.0).
Value Char Occurrences Fraction
0 152744 0.005393
1 140840 0.004973
2 129875 0.004586
3 138836 0.004902
4 133714 0.004721
5 114829 0.004054
6 130388 0.004604
7 135924 0.004799
8 134421 0.004746
9 122451 0.004324
10 105672 0.003731
11 113981 0.004025
12 133923 0.004729
13 118184 0.004173
14 126167 0.004455
15 133022 0.004697
16 134238 0.004740
17 124080 0.004381
18 112581 0.003975
19 122787 0.004335
20 109501 0.003866
21 93310 0.003295
22 107353 0.003790
23 111345 0.003931
24 133141 0.004701
25 122289 0.004318
26 109375 0.003862
27 116932 0.004129
28 129756 0.004582
29 113074 0.003992
30 125288 0.004424
31 131049 0.004627
32 134146 0.004737
33 ! 122453 0.004324
34 " 114008 0.004025
35 # 122202 0.004315
36 $ 116132 0.004100
37 % 98925 0.003493
38 & 115232 0.004069
39 ' 119090 0.004205
40 ( 108942 0.003847
41 ) 99426 0.003511
42 * 86276 0.003046
43 + 92613 0.003270
44 , 109828 0.003878
45 - 96751 0.003416
46 . 102817 0.003630
47 / 109056 0.003851
48 0 133503 0.004714
49 1 123248 0.004352
50 2 112287 0.003965
51 3 122127 0.004312
52 4 113307 0.004001
53 5 96534 0.003408
54 6 109312 0.003860
55 7 113594 0.004011
56 8 129808 0.004583
57 9 118696 0.004191
58 : 104344 0.003684
59 ; 111568 0.003939
60 < 127313 0.004495
61 = 112144 0.003960
62 > 123242 0.004352
63 ? 129136 0.004560
64 @ 131134 0.004630
65 A 119203 0.004209
66 B 110527 0.003903
67 C 118839 0.004196
68 D 113586 0.004011
69 E 98673 0.003484
70 F 111620 0.003941
71 G 115747 0.004087
72 H 113412 0.004004
73 I 103474 0.003654
74 J 88894 0.003139
75 K 96062 0.003392
76 L 113955 0.004024
77 M 101208 0.003574
78 N 107742 0.003804
79 O 114179 0.004032
80 P 106416 0.003757
81 Q 97497 0.003442
82 R 89101 0.003146
83 S 97558 0.003445
84 T 86587 0.003057
85 U 73507 0.002595
86 V 84843 0.002996
87 W 87100 0.003075
88 X 106610 0.003764
89 Y 97607 0.003446
90 Z 87743 0.003098
91 [ 93461 0.003300
92 \ 103003 0.003637
93 ] 89364 0.003155
94 ^ 99181 0.003502
95 _ 104062 0.003674
96 ` 130344 0.004602
97 a 119496 0.004219
98 b 110963 0.003918
99 c 118740 0.004193
100 d 112452 0.003971
101 e 96913 0.003422
102 f 111938 0.003952
103 g 115471 0.004077
104 h 110017 0.003885
105 i 100360 0.003544
106 j 86612 0.003058
107 k 94446 0.003335
108 l 108883 0.003845
109 m 96510 0.003408
110 n 103428 0.003652
111 o 109249 0.003857
112 p 125980 0.004448
113 q 115999 0.004096
114 r 106437 0.003758
115 s 115154 0.004066
116 t 105035 0.003709
117 u 90283 0.003188
118 v 102800 0.003630
119 w 106579 0.003763
120 x 124745 0.004405
121 y 112957 0.003988
122 z 101177 0.003572
123 { 108558 0.003833
124 | 121783 0.004300
125 } 106772 0.003770
126 ~ 117428 0.004146
127 123599 0.004364
128 139769 0.004935
129 128798 0.004548
130 118744 0.004193
131 128030 0.004521
132 123233 0.004351
133 105381 0.003721
134 120408 0.004251
135 124443 0.004394
136 123514 0.004361
137 112645 0.003977
138 97005 0.003425
139 105072 0.003710
140 122918 0.004340
141 108493 0.003831
142 115927 0.004093
143 123942 0.004376
144 121619 0.004294
145 112328 0.003966
146 102309 0.003612
147 111934 0.003952
148 98840 0.003490
149 84737 0.002992
150 98136 0.003465
151 100928 0.003564
152 123188 0.004350
153 111886 0.003951
154 100617 0.003553
155 107529 0.003797
156 119152 0.004207
157 103713 0.003662
158 114138 0.004030
159 120892 0.004269
160 115650 0.004083
161 ¡ 106152 0.003748
162 ¢ 99081 0.003498
163 £ 105578 0.003728
164 ¤ 100983 0.003566
165 ¥ 85775 0.003029
166 ¦ 99682 0.003520
167 § 103283 0.003647
168 ¨ 94733 0.003345
169 © 86656 0.003060
170 ª 74288 0.002623
171 « 79978 0.002824
172 ¬ 95113 0.003358
173 ­ 84129 0.002970
174 ® 89088 0.003146
175 ¯ 94907 0.003351
176 ° 115952 0.004094
177 ± 106537 0.003762
178 ² 97186 0.003432
179 ³ 105735 0.003733
180 ´ 98265 0.003470
181 µ 83544 0.002950
182 ¶ 95075 0.003357
183 · 99166 0.003501
184 ¸ 112392 0.003968
185 ¹ 101956 0.003600
186 º 90512 0.003196
187 » 96771 0.003417
188 ¼ 110768 0.003911
189 ½ 97309 0.003436
190 ¾ 106559 0.003762
191 ¿ 112284 0.003965
192 À 138556 0.004892
193 Á 127209 0.004492
194 Â 118271 0.004176
195 Ã 125445 0.004429
196 Ä 122539 0.004327
197 Å 104556 0.003692
198 Æ 118764 0.004193
199 Ç 123019 0.004344
200 È 121458 0.004289
201 É 109634 0.003871
202 Ê 94962 0.003353
203 Ë 102224 0.003609
204 Ì 120944 0.004270
205 Í 106642 0.003765
206 Î 114392 0.004039
207 Ï 121263 0.004282
208 Ð 115982 0.004095
209 Ñ 107314 0.003789
210 Ò 98167 0.003466
211 Ó 106197 0.003750
212 Ô 95033 0.003355
213 Õ 81022 0.002861
214 Ö 93248 0.003292
215 × 96259 0.003399
216 Ø 116233 0.004104
217 Ù 105541 0.003727
218 Ú 94120 0.003323
219 Û 101213 0.003574
220 Ü 112128 0.003959
221 Ý 98187 0.003467
222 Þ 108059 0.003815
223 ß 113268 0.003999
224 à 135573 0.004787
225 á 124038 0.004380
226 â 115043 0.004062
227 ã 124222 0.004386
228 ä 117826 0.004160
229 å 100481 0.003548
230 æ 116582 0.004116
231 ç 119965 0.004236
232 è 113398 0.004004
233 é 103389 0.003651
234 ê 89061 0.003145
235 ë 96289 0.003400
236 ì 112757 0.003981
237 í 99368 0.003509
238 î 106731 0.003769
239 ï 112964 0.003989
240 ð 133515 0.004714
241 ñ 122189 0.004314
242 ò 111658 0.003943
243 ó 121371 0.004285
244 ô 111358 0.003932
245 õ 95924 0.003387
246 ö 109255 0.003858
247 ÷ 112223 0.003962
248 ø 131542 0.004645
249 ù 119768 0.004229
250 ú 106061 0.003745
251 û 114248 0.004034
252 ü 128296 0.004530
253 ý 112907 0.003987
254 þ 123464 0.004359
255 ÿ 130807 0.004619

Total: 28321610 1.000000

Entropy = 7.988851 bits per byte.

Optimum compression would reduce the size
of this 28321610 byte file by 0 percent.

Chi square distribution for 28321610 samples is 433986.73, and randomly
would exceed this value 0.01 percent of the times.

Arithmetic mean value of data bytes is 125.6735 (127.5 = random).
Monte Carlo value for Pi is 3.152780308 (error 0.36 percent).
Serial correlation coefficient is -0.000183 (totally uncorrelated = 0.0).
Value Char Occurrences Fraction
0 152744 0.005393
1 140840 0.004973
2 129875 0.004586
3 138836 0.004902
4 133714 0.004721
5 114829 0.004054
6 130388 0.004604
7 135924 0.004799
8 134421 0.004746
9 122451 0.004324
10 105672 0.003731
11 113981 0.004025
12 133923 0.004729
13 118184 0.004173
14 126167 0.004455
15 133022 0.004697
16 134238 0.004740
17 124080 0.004381
18 112581 0.003975
19 122787 0.004335
20 109501 0.003866
21 93310 0.003295
22 107353 0.003790
23 111345 0.003931
24 133141 0.004701
25 122289 0.004318
26 109375 0.003862
27 116932 0.004129
28 129756 0.004582
29 113074 0.003992
30 125288 0.004424
31 131049 0.004627
32 134146 0.004737
33 ! 122453 0.004324
34 " 114008 0.004025
35 # 122202 0.004315
36 $ 116132 0.004100
37 % 98925 0.003493
38 & 115232 0.004069
39 ' 119090 0.004205
40 ( 108942 0.003847
41 ) 99426 0.003511
42 * 86276 0.003046
43 + 92613 0.003270
44 , 109828 0.003878
45 - 96751 0.003416
46 . 102817 0.003630
47 / 109056 0.003851
48 0 133503 0.004714
49 1 123248 0.004352
50 2 112287 0.003965
51 3 122127 0.004312
52 4 113307 0.004001
53 5 96534 0.003408
54 6 109312 0.003860
55 7 113594 0.004011
56 8 129808 0.004583
57 9 118696 0.004191
58 : 104344 0.003684
59 ; 111568 0.003939
60 < 127313 0.004495
61 = 112144 0.003960
62 > 123242 0.004352
63 ? 129136 0.004560
64 @ 131134 0.004630
91 [ 93461 0.003300
92 \ 103003 0.003637
93 ] 89364 0.003155
94 ^ 99181 0.003502
95 _ 104062 0.003674
96 ` 130344 0.004602
97 a 238699 0.008428
98 b 221490 0.007821
99 c 237579 0.008389
100 d 226038 0.007981
101 e 195586 0.006906
102 f 223558 0.007894
103 g 231218 0.008164
104 h 223429 0.007889
105 i 203834 0.007197
106 j 175506 0.006197
107 k 190508 0.006727
108 l 222838 0.007868
109 m 197718 0.006981
110 n 211170 0.007456
111 o 223428 0.007889
112 p 232396 0.008206
113 q 213496 0.007538
114 r 195538 0.006904
115 s 212712 0.007511
116 t 191622 0.006766
117 u 163790 0.005783
118 v 187643 0.006625
119 w 193679 0.006839
120 x 231355 0.008169
121 y 210564 0.007435
122 z 188920 0.006671
123 { 108558 0.003833
124 | 121783 0.004300
125 } 106772 0.003770
126 ~ 117428 0.004146
127 123599 0.004364
128 139769 0.004935
129 128798 0.004548
130 118744 0.004193
131 128030 0.004521
132 123233 0.004351
133 105381 0.003721
134 120408 0.004251
135 124443 0.004394
136 123514 0.004361
137 112645 0.003977
138 97005 0.003425
139 105072 0.003710
140 122918 0.004340
141 108493 0.003831
142 115927 0.004093
143 123942 0.004376
144 121619 0.004294
145 112328 0.003966
146 102309 0.003612
147 111934 0.003952
148 98840 0.003490
149 84737 0.002992
150 98136 0.003465
151 100928 0.003564
152 123188 0.004350
153 111886 0.003951
154 100617 0.003553
155 107529 0.003797
156 119152 0.004207
157 103713 0.003662
158 114138 0.004030
159 120892 0.004269
160 115650 0.004083
161 ¡ 106152 0.003748
162 ¢ 99081 0.003498
163 £ 105578 0.003728
164 ¤ 100983 0.003566
165 ¥ 85775 0.003029
166 ¦ 99682 0.003520
167 § 103283 0.003647
168 ¨ 94733 0.003345
169 © 86656 0.003060
170 ª 74288 0.002623
171 « 79978 0.002824
172 ¬ 95113 0.003358
173 ­ 84129 0.002970
174 ® 89088 0.003146
175 ¯ 94907 0.003351
176 ° 115952 0.004094
177 ± 106537 0.003762
178 ² 97186 0.003432
179 ³ 105735 0.003733
180 ´ 98265 0.003470
181 µ 83544 0.002950
182 ¶ 95075 0.003357
183 · 99166 0.003501
184 ¸ 112392 0.003968
185 ¹ 101956 0.003600
186 º 90512 0.003196
187 » 96771 0.003417
188 ¼ 110768 0.003911
189 ½ 97309 0.003436
190 ¾ 106559 0.003762
191 ¿ 112284 0.003965
215 × 96259 0.003399
223 ß 113268 0.003999
224 à 274129 0.009679
225 á 251247 0.008871
226 â 233314 0.008238
227 ã 249667 0.008815
228 ä 240365 0.008487
229 å 205037 0.007240
230 æ 235346 0.008310
231 ç 242984 0.008579
232 è 234856 0.008292
233 é 213023 0.007522
234 ê 184023 0.006498
235 ë 198513 0.007009
236 ì 233701 0.008252
237 í 206010 0.007274
238 î 221123 0.007808
239 ï 234227 0.008270
240 ð 249497 0.008809
241 ñ 229503 0.008103
242 ò 209825 0.007409
243 ó 227568 0.008035
244 ô 206391 0.007287
245 õ 176946 0.006248
246 ö 202503 0.007150
247 ÷ 112223 0.003962
248 ø 247775 0.008749
249 ù 225309 0.007955
250 ú 200181 0.007068
251 û 215461 0.007608
252 ü 240424 0.008489
253 ý 211094 0.007453
254 þ 231523 0.008175
255 ÿ 130807 0.004619

Total: 28321610 1.000000

Entropy = 7.559807 bits per byte.

Optimum compression would reduce the size
of this 28321610 byte file by 5 percent.

Chi square distribution for 28321610 samples is 12487423.54, and randomly
would exceed this value 0.01 percent of the times.

Arithmetic mean value of data bytes is 132.3895 (127.5 = random).
Monte Carlo value for Pi is 2.854429452 (error 9.14 percent).
Serial correlation coefficient is -0.000279 (totally uncorrelated = 0.0).
Entropy = 0.999850 bits per bit.

Optimum compression would reduce the size
of this 226572880 bit file by 0 percent.

Chi square distribution for 226572880 samples is 47214.24, and randomly
would exceed this value 0.01 percent of the times.

Arithmetic mean value of data bits is 0.4928 (0.5 = random).
Monte Carlo value for Pi is 3.152780308 (error 0.36 percent).
Serial correlation coefficient is 0.037638 (totally uncorrelated = 0.0).
Value Char Occurrences Fraction
0 114921789 0.507218
1 111651091 0.492782

Total: 226572880 1.000000

Entropy = 0.999850 bits per bit.

Optimum compression would reduce the size
of this 226572880 bit file by 0 percent.

Chi square distribution for 226572880 samples is 47214.24, and randomly
would exceed this value 0.01 percent of the times.

Arithmetic mean value of data bits is 0.4928 (0.5 = random).
Monte Carlo value for Pi is 3.152780308 (error 0.36 percent).
Serial correlation coefficient is 0.037638 (totally uncorrelated = 0.0).
0,File-bytes,Entropy,Chi-square,Mean,Monte-Carlo-Pi,Serial-Correlation
1,28321610,7.988851,433986.725577,125.673455,3.152780,-0.000183
0,File-bytes,Entropy,Chi-square,Mean,Monte-Carlo-Pi,Serial-Correlation
1,28321610,7.988851,433986.725577,125.673455,3.152780,-0.000183
2,Value,Occurrences,Fraction
3,0,152744,0.005393
3,1,140840,0.004973
3,2,129875,0.004586
3,3,138836,0.004902
3,4,133714,0.004721
3,5,114829,0.004054
3,6,130388,0.004604
3,7,135924,0.004799
3,8,134421,0.004746
3,9,122451,0.004324
3,10,105672,0.003731
3,11,113981,0.004025
3,12,133923,0.004729
3,13,118184,0.004173
3,14,126167,0.004455
3,15,133022,0.004697
3,16,134238,0.004740
3,17,124080,0.004381
3,18,112581,0.003975
3,19,122787,0.004335
3,20,109501,0.003866
3,21,93310,0.003295
3,22,107353,0.003790
3,23,111345,0.003931
3,24,133141,0.004701
3,25,122289,0.004318
3,26,109375,0.003862
3,27,116932,0.004129
3,28,129756,0.004582
3,29,113074,0.003992
3,30,125288,0.004424
3,31,131049,0.004627
3,32,134146,0.004737
3,33,122453,0.004324
3,34,114008,0.004025
3,35,122202,0.004315
3,36,116132,0.004100
3,37,98925,0.003493
3,38,115232,0.004069
3,39,119090,0.004205
3,40,108942,0.003847
3,41,99426,0.003511
3,42,86276,0.003046
3,43,92613,0.003270
3,44,109828,0.003878
3,45,96751,0.003416
3,46,102817,0.003630
3,47,109056,0.003851
3,48,133503,0.004714
3,49,123248,0.004352
3,50,112287,0.003965
3,51,122127,0.004312
3,52,113307,0.004001
3,53,96534,0.003408
3,54,109312,0.003860
3,55,113594,0.004011
3,56,129808,0.004583
3,57,118696,0.004191
3,58,104344,0.003684
3,59,111568,0.003939
3,60,127313,0.004495
3,61,112144,0.003960
3,62,123242,0.004352
3,63,129136,0.004560
3,64,131134,0.004630
3,65,119203,0.004209
3,66,110527,0.003903
3,67,118839,0.004196
3,68,113586,0.004011
3,69,98673,0.003484
3,70,111620,0.003941
3,71,115747,0.004087
3,72,113412,0.004004
3,73,103474,0.003654
3,74,88894,0.003139
3,75,96062,0.003392
3,76,113955,0.004024
3,77,101208,0.003574
3,78,107742,0.003804
3,79,114179,0.004032
3,80,106416,0.003757
3,81,97497,0.003442
3,82,89101,0.003146
3,83,97558,0.003445
3,84,86587,0.003057
3,85,73507,0.002595
3,86,84843,0.002996
3,87,87100,0.003075
3,88,106610,0.003764
3,89,97607,0.003446
3,90,87743,0.003098
3,91,93461,0.003300
3,92,103003,0.003637
3,93,89364,0.003155
3,94,99181,0.003502
3,95,104062,0.003674
3,96,130344,0.004602
3,97,119496,0.004219
3,98,110963,0.003918
3,99,118740,0.004193
3,100,112452,0.003971
3,101,96913,0.003422
3,102,111938,0.003952
3,103,115471,0.004077
3,104,110017,0.003885
3,105,100360,0.003544
3,106,86612,0.003058
3,107,94446,0.003335
3,108,108883,0.003845
3,109,96510,0.003408
3,110,103428,0.003652
3,111,109249,0.003857
3,112,125980,0.004448
3,113,115999,0.004096
3,114,106437,0.003758
3,115,115154,0.004066
3,116,105035,0.003709
3,117,90283,0.003188
3,118,102800,0.003630
3,119,106579,0.003763
3,120,124745,0.004405
3,121,112957,0.003988
3,122,101177,0.003572
3,123,108558,0.003833
3,124,121783,0.004300
3,125,106772,0.003770
3,126,117428,0.004146
3,127,123599,0.004364
3,128,139769,0.004935
3,129,128798,0.004548
3,130,118744,0.004193
3,131,128030,0.004521
3,132,123233,0.004351
3,133,105381,0.003721
3,134,120408,0.004251
3,135,124443,0.004394
3,136,123514,0.004361
3,137,112645,0.003977
3,138,97005,0.003425
3,139,105072,0.003710
3,140,122918,0.004340
3,141,108493,0.003831
3,142,115927,0.004093
3,143,123942,0.004376
3,144,121619,0.004294
3,145,112328,0.003966
3,146,102309,0.003612
3,147,111934,0.003952
3,148,98840,0.003490
3,149,84737,0.002992
3,150,98136,0.003465
3,151,100928,0.003564
3,152,123188,0.004350
3,153,111886,0.003951
3,154,100617,0.003553
3,155,107529,0.003797
3,156,119152,0.004207
3,157,103713,0.003662
3,158,114138,0.004030
3,159,120892,0.004269
3,160,115650,0.004083
3,161,106152,0.003748
3,162,99081,0.003498
3,163,105578,0.003728
3,164,100983,0.003566
3,165,85775,0.003029
3,166,99682,0.003520
3,167,103283,0.003647
3,168,94733,0.003345
3,169,86656,0.003060
3,170,74288,0.002623
3,171,79978,0.002824
3,172,95113,0.003358
3,173,84129,0.002970
3,174,89088,0.003146
3,175,94907,0.003351
3,176,115952,0.004094
3,177,106537,0.003762
3,178,97186,0.003432
3,179,105735,0.003733
3,180,98265,0.003470
3,181,83544,0.002950
3,182,95075,0.003357
3,183,99166,0.003501
3,184,112392,0.003968
3,185,101956,0.003600
3,186,90512,0.003196
3,187,96771,0.003417
3,188,110768,0.003911
3,189,97309,0.003436
3,190,106559,0.003762
3,191,112284,0.003965
3,192,138556,0.004892
3,193,127209,0.004492
3,194,118271,0.004176
3,195,125445,0.004429
3,196,122539,0.004327
3,197,104556,0.003692
3,198,118764,0.004193
3,199,123019,0.004344
3,200,121458,0.004289
3,201,109634,0.003871
3,202,94962,0.003353
3,203,102224,0.003609
3,204,120944,0.004270
3,205,106642,0.003765
3,206,114392,0.004039
3,207,121263,0.004282
3,208,115982,0.004095
3,209,107314,0.003789
3,210,98167,0.003466
3,211,106197,0.003750
3,212,95033,0.003355
3,213,81022,0.002861
3,214,93248,0.003292
3,215,96259,0.003399
3,216,116233,0.004104
3,217,105541,0.003727
3,218,94120,0.003323
3,219,101213,0.003574
3,220,112128,0.003959
3,221,98187,0.003467
3,222,108059,0.003815
3,223,113268,0.003999
3,224,135573,0.004787
3,225,124038,0.004380
3,226,115043,0.004062
3,227,124222,0.004386
3,228,117826,0.004160
3,229,100481,0.003548
3,230,116582,0.004116
3,231,119965,0.004236
3,232,113398,0.004004
3,233,103389,0.003651
3,234,89061,0.003145
3,235,96289,0.003400
3,236,112757,0.003981
3,237,99368,0.003509
3,238,106731,0.003769
3,239,112964,0.003989
3,240,133515,0.004714
3,241,122189,0.004314
3,242,111658,0.003943
3,243,121371,0.004285
3,244,111358,0.003932
3,245,95924,0.003387
3,246,109255,0.003858
3,247,112223,0.003962
3,248,131542,0.004645
3,249,119768,0.004229
3,250,106061,0.003745
3,251,114248,0.004034
3,252,128296,0.004530
3,253,112907,0.003987
3,254,123464,0.004359
3,255,130807,0.004619
0,File-bytes,Entropy,Chi-square,Mean,Monte-Carlo-Pi,Serial-Correlation
1,28321610,7.559807,12487423.540334,132.389471,2.854429,-0.000279
0,File-bits,Entropy,Chi-square,Mean,Monte-Carlo-Pi,Serial-Correlation
1,226572880,0.999850,47214.235910,0.492782,3.152780,0.037638
0,File-bits,Entropy,Chi-square,Mean,Monte-Carlo-Pi,Serial-Correlation
1,226572880,0.999850,47214.235910,0.492782,3.152780,0.037638
2,Value,Occurrences,Fraction
3,0,114921789,0.507218
3,1,111651091,0.492782




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des conneries j'en ai dites oui oui je vous assure...
mais elles n'engagent que votre perception
remy