You may need to use the appropriate appendix table or technology to answer this question. Consider the following hypothe

[answerhappygod]

You May Need To Use The Appropriate Appendix Table Or Technology To Answer This Question Consider The Following Hypothe 1 (30.83 KiB) Viewed 55 times

You May Need To Use The Appropriate Appendix Table Or Technology To Answer This Question Consider The Following Hypothe 2 (39.7 KiB) Viewed 55 times

You May Need To Use The Appropriate Appendix Table Or Technology To Answer This Question Consider The Following Hypothe 3 (46.53 KiB) Viewed 55 times

You May Need To Use The Appropriate Appendix Table Or Technology To Answer This Question Consider The Following Hypothe 4 (34.04 KiB) Viewed 55 times

You May Need To Use The Appropriate Appendix Table Or Technology To Answer This Question Consider The Following Hypothe 5 (37.27 KiB) Viewed 55 times

You May Need To Use The Appropriate Appendix Table Or Technology To Answer This Question Consider The Following Hypothe 6 (23.92 KiB) Viewed 55 times

You May Need To Use The Appropriate Appendix Table Or Technology To Answer This Question Consider The Following Hypothe 7 (55.58 KiB) Viewed 55 times

You May Need To Use The Appropriate Appendix Table Or Technology To Answer This Question Consider The Following Hypothe 8 (37.63 KiB) Viewed 55 times

You May Need To Use The Appropriate Appendix Table Or Technology To Answer This Question Consider The Following Hypothe 9 (39.37 KiB) Viewed 55 times

You May Need To Use The Appropriate Appendix Table Or Technology To Answer This Question Consider The Following Hypothe 10 (47.72 KiB) Viewed 55 times

You May Need To Use The Appropriate Appendix Table Or Technology To Answer This Question Consider The Following Hypothe 11 (45.23 KiB) Viewed 55 times

You May Need To Use The Appropriate Appendix Table Or Technology To Answer This Question Consider The Following Hypothe 12 (50.54 KiB) Viewed 55 times

You May Need To Use The Appropriate Appendix Table Or Technology To Answer This Question Consider The Following Hypothe 13 (47.94 KiB) Viewed 55 times

You May Need To Use The Appropriate Appendix Table Or Technology To Answer This Question Consider The Following Hypothe 14 (49.5 KiB) Viewed 55 times

You May Need To Use The Appropriate Appendix Table Or Technology To Answer This Question Consider The Following Hypothe 15 (44.11 KiB) Viewed 55 times

You May Need To Use The Appropriate Appendix Table Or Technology To Answer This Question Consider The Following Hypothe 16 (47.42 KiB) Viewed 55 times

You May Need To Use The Appropriate Appendix Table Or Technology To Answer This Question Consider The Following Hypothe 17 (50.96 KiB) Viewed 55 times

You May Need To Use The Appropriate Appendix Table Or Technology To Answer This Question Consider The Following Hypothe 18 (42.8 KiB) Viewed 55 times

You May Need To Use The Appropriate Appendix Table Or Technology To Answer This Question Consider The Following Hypothe 19 (49.75 KiB) Viewed 55 times

You May Need To Use The Appropriate Appendix Table Or Technology To Answer This Question Consider The Following Hypothe 20 (58.39 KiB) Viewed 55 times

You May Need To Use The Appropriate Appendix Table Or Technology To Answer This Question Consider The Following Hypothe 21 (55.79 KiB) Viewed 55 times

You May Need To Use The Appropriate Appendix Table Or Technology To Answer This Question Consider The Following Hypothe 22 (35.05 KiB) Viewed 55 times

You May Need To Use The Appropriate Appendix Table Or Technology To Answer This Question Consider The Following Hypothe 23 (54.59 KiB) Viewed 55 times

You May Need To Use The Appropriate Appendix Table Or Technology To Answer This Question Consider The Following Hypothe 24 (55.62 KiB) Viewed 55 times

You May Need To Use The Appropriate Appendix Table Or Technology To Answer This Question Consider The Following Hypothe 25 (59.42 KiB) Viewed 55 times

You May Need To Use The Appropriate Appendix Table Or Technology To Answer This Question Consider The Following Hypothe 26 (56.19 KiB) Viewed 55 times

You May Need To Use The Appropriate Appendix Table Or Technology To Answer This Question Consider The Following Hypothe 27 (59.63 KiB) Viewed 55 times

You May Need To Use The Appropriate Appendix Table Or Technology To Answer This Question Consider The Following Hypothe 28 (47.64 KiB) Viewed 55 times

You may need to use the appropriate appendix table or technology to answer this question. Consider the following hypothesis test. Hos 50 Hala 50 A sample of 60 is used and the population standard deviation is 8. Use the critical value approach to state your conclusion for each of the following sample results. Use 0.05. (Round your answers to two decimal places.) (a)-52.9 Find the value of the test statistic. 2.81 State the critical values for the rejection rule. (If the test is one-tailed, enter NONE for the unused tail.) test statistics test statistica State your conclusion. Reject Ho. There is insufficient evidence to conclude that >50. Do not reject Ho. There is insufficient evidence to conclude that > 50. Reject Ho- There is sufficient evidence to conclude that > 50. Do not reject Ho. There is sufficient evidence to conclude that > 50. Find the value of the test statistic State the critical values for the rejection rule. (If the test is one-tailed, enter NONE for the unused tail.) test statistics test statistic z State your conclusion Reject Ho. There is insufficient evidence to conclude that > 50. Do not reject Ho. There is insufficient evidence to conclude that >50. Reject Ho. There is sufficient evidence to conclude that > 50. Do not reject Ho. There is sufficient evidence to conclude that > 50, Find the value of the test statistic State the critical values for the rejection rule. (If the test is one-tailed, enter NONE for the unused tail.) test statistics test statistica State your conclusion. Reject Mg. There is insufficient evidence to conclude that >50. Do not reject Ho. There is insufficient evidence to conclude that > 50. Reject Mo. There is sufficient evidence to conclude that > 50. Do not reject Ho. There is sufficient evidence to conclude that > 50. (c) 7-51.9
Tables TABLE 1 CUMULATIVE PROBABILITIES FOR THE STANDARD NORMAL DISTRIBUTION Entries in the table Cumulative probability give the area under the curve to the left of the z value. For example, for 2-85, the cumulative probability is 1977. 01 -3.0 0013 0013 0013 0012 0011 -29 0018 0015 0015 0017 0023 0024 0033 0032 -27 0026 0025 0035 0034 -26 0047 0045 -25 0062 0044 0043 0059 0057 0055 10078 -24 0082 CONO -23 0107 0104 0102 0075 0073 0071 0069 0096 0094 0132 0129 0125 0122 0119 0139 0136 0179 0174 0170 0166 8158 0154 0150 0046 0207 0212 0297 -20 0228 0222 0217 1012 JOINS 0183 0274 1256 02:39 -1.9 0287 0281 -1.8 0359 0351 0344 0062 0329 0409 0050 0322 0514 0301 -17 0446 0436 0427 -16 0548 0537 0526 0401 0505 0495 0992 0384 0375 10367 0485 9475 0465 0455 -15 0655 0643 0630 0618 0571 -14 0793 0778 1764 0749 0735 0721 0706 10694 0958 0918 0883 0853 0838 <-12 1003 3985 0934 1151 1131 1112 3093 -1.1 1357 1335 1314 1292 <-1.0 1587 1362 1075 1271 1056 1038 3000 1251 1230 1230 1190 3170 1539 1515 1379 -9 1841 1814 1788 1635 1611 1762 1736 2033 2005 1549 1922 1944 1867 1977 2266 2327 2177 2578 2413 2451 -A 2119 2090 2061 -3 2420 2389 2358 -6 2743 2709 2676 3085 3050 3015 3446 3409 3372 3821 3783 3745 -2 4207 4168 4129 2912 2827 2843 2810 2776 -A 2611 2981 2946 3336 3300 3264 3707 4090 4483 3156 3121 3483 3669 3632 3994 4013 4443 4404 4840 3192 3557 3520 3974 3936 3897 4325 3859 4247 -1 4562 4522 4602 -0 5000 4960 4920 4800 4761 4721 Appendix B: T- 6100 SONO 0900 1960 $100 6000 9900 00336 0418 9197 0012 0011 9100 0031 0030 00:40 2940 1060 1900 9090 6000 0021 0021 0020 0029 0028 10027 0036 0048 00520051 0049 0066 0064 2009 0084 0113 2110 1600 6990 1000 $100 SPAT 9116 0010 0010 0014 0014 0019 2610 LIKE 9000 CHE 1128 1990 1199
Appendix B Tables 977 TABLE 1 CUMULATIVE PROBABILITIES FOR THE STANDARD NORMAL DISTRIBUTION (Continued) Cumulative probability Entries in the table give the area under the curve to the left of the z value. For example, for 1.25, the cumulative probability is 8944; 2 .00 .01 02 .03 04 .05 .06 .07 ..09 5239 5279 5319 5359 5636 5675 3714 5753 6141 6026 6064 6103 6406 6443 6480 6772 6808 6844 6517 6879 7224 5000 5040 5080 5120 5160 5199 5398 5438 5478 5517 5557 5596 5793 5832 5871 5910 5948 5987 6179 6217 6255 6293 6331 6368 6554 6591 6628 6664 6700 6736 6915 6950 6985 .7019 7054 7088 7123 7157 7190 6 7257 7291 7324 7357 7389 7422 7454 7486 7517 .7580 7611 7642 7673 7704 7734 7764 7794 7823 7881 7910 7939 7967 7995 8023 8051 8078 $106 8159 8186 8212 8238 8264 8289 8315 8340 8365 1.0 8413 8438 8461 8485 8508 3665 8686 8708 8729 8888 8907 8925 8944 9066 9082 9099 9115 9236 9251 9265 7549 7852 8133 8389 1.1 8643 1.2 8849 8869 13 9032 9049 9192 9207 8531 8554 8577 $599 8621 8749 8770 8790 8810 8830 8962 8980 8997 9015 9131 9147 9162 9177 9279 9292 9306 9319 9222 15 9332 9345 9357 9370 9382 9394 9441 9474 9484 1.6 9452 9463 1.7 9554 9564 9495 9505 9591 9599 9406 9418 9429 9515 9525 9535 9545 9608 9616 9625 9633 9573 9582 9641 9649 9656 9664 9671 9738 9744 9678 9686 9693 9699 9706 9767 19 9713 9719 9726 9732 9750 9788 9793 9798 9803 9778 9756 9761 9808 9812 9834 9838 9842 9846 9850 9854 9817 9857 9890 2.0 9772 2.1 9821 9826 9861 9864 9893 9896 9918 9920 2.5 9938 9940 26 9953 9955 9965 9966 2.8 9974 9975 9981 9783 9830 9868 9871 9875 9878 9881 9884 9887 9898 9901 9904 9906 9909 9911 9913 9916 9922 9925 9927 9931 9932 9934 9936 9941 9943 9945 9946 9948 9949 9951 9952 9956 9957 9959 9960 9961 9962 9963 9964 9967 9968 9969 9970 9971 9972 9973 9974 9976 9977 9977 9978 9979 9979 9980 9981 9982 9982 9983 9984 9987 9987 9989 9989 9984 9985 9985 9986 9986 3.0 9987 9988 9988 9989 9990 A 93003 29992 223 222 2 14
978 Appendix 8 Tables TABLE 2 Degrees of Freedom 1 -234 ST9 5. 6 7 8 20103 000ER RRRR式 美式斯特角 南民防网文: 11 14 15 16 17 18 20 21 22 23 24 25 26 27 28 29 30 31 32 33 34 DISTRIBUTION 0 20 1.376 1.061 978 941 920 906 896 889 883 879 876 873 870 .868 866 .865 863 862 861 860 859 858 858 857 856 856 855 855 854 854 853 853 853 852 Area or probability Entries in the table giver values for an area or probability in the upper tail of the 1 distribution. For example, with 10 degrees of freedom and a 05 area in the upper tail, -1.812 1 .01 005 31.821 63.656 6.965 9.925 4.541 5.841 3.747 4.604 3.365 4,032 3.143 3.707 2.998 3.499 2.896 3.355 2.821 3.250 2.764 3.169 2,718 3.106 2.681 3.055 2.650 3.012 2.624 2.977 2.602 2.947 2.583 2.921 2.567 2.898 2.552 2.878 2.539 2.861 2.528 2.845 2.518 2.831 2.508 2.819 2.500 2.807 2,492 2.797 2,485 2.479 2.473 2.467 2.462 2.457 2.453 2,449 2.445 2.441 .10 3.078 1.886 1.638 1.533 1,476 1,440 1415 1.397 1.383 1.372 1.363 1.356 1.350 1.345 1.341 1.337 1.333 1.330 1.328 1.325 1.323 1.321 1.319 1.318 1.316 1.315 1.314 1.313 1.311 1.310 1.309 1.309 1.308 1.307 Area in Upper Tail .05 025 6.314 12.706 2.920 4.303 2.353 3.182 2.132 2.776 2015 2.571 1.943 2.447 1.895 2.365 1.860 2.306 1.833 2.262 1,812 2.228 1.796 2.201 1.782 2.179 1.771 2160 1.761 2.145 1.753 2.131 1.746 2.120 1.740 2110 1.734 2101 1.729 2.093 1.725 2.086 1.721 2.080 1.717 2.074 1.714 2.069 1.711 2064 1,708 2.060 1.706 2056 1.703 2.052 1.701 2.048 1.699 2.045 1.697 2.042 1.696 2.040 1.694 2.037 1.692 2.035 1.601 2.032 2.787 2.779 2.771 2.763 2.756 2.750 2.744 2.738 2.733 2.728
Appendix B Tables TABLE 2 DISTRIBUTION (Continued) Degrees of Freedom 20 .10 852 1.306 852 1.306 851 1.305 1.304 851 1.304 851 1.303 850 1.303 850 1.302 850 1.302 850 1.301 850 1.301 850 1.300 849 1.300 849 1.299 849 1.299 849 1.299 849 1.298 849 1.298 848 1.298 848 1.297 848 1.297 848 1.297 848 1.297 848 1.296 848 1.296 848 1.296 848 1.296 .847 1.295 847 1.295 847 1.295 847 1.295 847 1.295 847 1.294 847 1.294 847 1.294 847 1.294 847 1.294 847 1.293 847 1.293 847 1.293 846 1.293 846 1.293 846 1.293 846 1.292 846 1.292 2 993 9959S R S 83033 3363S REFRZ ***** 35 36 37 38 39 40 41 42 43 44 45 46 47 48 49 50 51 52 53 54 55 56 57 58 59 60 61 62 64 65 66 67 68 69 70 71 72 73 74 75 76 77 78 79 Area in Upper Tail 05 3025 1.690 2.030 1.688 2.028 1.687 2.026 1.686 2.024 1.685 2.023 1.684 2.021 1.683 2.020 1.682 2018 1.681 2017 1.680 2015 1.679 2014 1.679 2013 1.678 2012 1.677 2011 1.677 2010 1.676 2.009 1.675 2.008 1.675 2.007 1.674 2006 1.674 2005 1.673 2.004 1.673 2.003 1.672 2.002 1.672 2,002 1.671 2.001 1.671 2.000 1.670 2.000 1.670 1.999 1.669 1.998 1.669 1.998 1.669 1.997 1.668 1.997 1.668 1.996 1.668 1.995 1.667 1.995 1.667 1.994 1.667 1.994 1.666 1.993 1.666 1.993 1,666 1.993 1.665 1.992 1.665 1.992 1.665 1.991 1.665 1.991 1.664 1.990 01 2,438 2.434 2,431 2,429 2.426 2.423 2421 2418 2416 2414 2,412 2410 2.408 2,407 2.405 2.403 2.402 2.400 2.399 2.397 2.396 2.395 2.394 2.392 2.391 2.390 2.389 2.388 2.387 2.386 2.385 2.384 2.383 2.382 2.382 2.381 2.380 2.379 2.379 2.378 2.377 2.376 2.376 2.375 2.374 979 005 2,724 2.719 2.715 2.712 2.708 2704 2.701 2.698 2.695 2.692 2.690 2.687 2.685 2.682 2.680 2.678 2676 2.674 2672 2.670 2.668 2.667 2.665 2.663 2.662 2.660 2.659 2.657 2.656 2655 2.654 2652 2.651 2650 2.649 2648 2.647 2.646 2.645 2.644 2643 2642 2641 2.640 2.639
980 Appendix B Tables TABLE 2 DISTRIBUTION (Continued) Degrees of Freedom .20 10 80 846 1.292 846 1.292 846 1.292 846 1.292 846 1.292 846 1.292 846 1.291 846 1.291 846 1.291 846 1.291 846 1.291 846 1.291 846 1.291 846 1.291 845 1.291 845 1.291 845 1.290 845 1.290 845 1.290 845 1.290 845 1.290 842 1.282 882382 23828 335** ***** 100 Area in Upper Tail 05 1025 1.664 1.990 1.664 1.990 1664 1.989 1.663 1.989 1.663 1.989 1.663 1.988 1.663 1.988 1.663 1.988 1.662 1.987 1.662 1.987 1.662 1.987 1.662 1.986 1.662 1.986 1.661 1.986 1.661 1.986 1.661 1.985 1.661 1.985 1.661 1.985 1.661 1.984 1.660 1984 1.660 1.984 1.645 1.960 .01 2.374 2.373 2.373 2.372 2.372 2.371 2.370 2.370 2.369 2.369 2.368 2.368 2.368 2.367 2.367 2.366 2.366 2.365 2.365 2.364 2.364 2.326 005 2.639 2.638 2.637 2.636 2.636 2.635 2.634 2.634 2.633 2632 2.632 2.631 2610 2630 2.629 2629 2.628 2.627 2.627 2.626 2.626 2.576
Appendix B Tables 981 TABLE 3 CHI-SQUARE DISTRIBUTION Area or probability Entries in the table give x values, where a is the area or probability in the upper tail of the chi-square distribution. For example, with 10 degrees of freedom and a .01 area in the upper tail, X-23.209. Area in Upper Tail Degrees of Freedom 995 .99 975 95 .90 10 .05 025 .01 .005 000 .000 .001 004 .016 2.706 3.841 5.024 6.635 7.879 010 020 051 103 211 4.605 5.991 7.378 9.210 10.597 072 115 216 352 584 9.348 11.345 12.838 6.251 7.815 7.779 9.488 207 297 484 711 14.860 1.064 1.610 9.236 11.070 11.143 13.277 12.832 412 554 .831 1.145 15.086 16.750 676 872 1.237 1.635 18.548 1.690 2.167 989 1.239 1.344 1.647 1.735 2.088 2.180 2.733 2,204 10.645 12.592 2.833 12.017 14.067 3.490 13.362 15.507 4.168 14.684 16.919 4.865 15.987 18.307 14.449 16.812 16.013 18,475 20,278 17.535 20.090 21.955 19.023 21.666 23.589 20.483 23.209 25.188 2.700 3.325 2.156 2.558 3.247 3.940 2.603 3.053 3.816 4.575 26.757 5.578 5.226 6.304 17.275 19.675 18.549 21.026 3.074 3.571 4.404 28.300 3.565 4.107 5.009 5.892 4.075 21.920 24.725 23.337 26.217 27.688 29.141 30.578 32.801 4.660 7,041 19.812 7,790 21.064 8.547 22.307 5.629 6.571 22.362 24.736 23.685 26.119 24.996 27.488 29.819 31.319 4.601 5.229 6.262 7.261 5.142 5.812 6.908 5.697 6.408 7.564 6.265 7.015 8.231 7.962 9.312 23.542 26.296 28.845 32.000 34.267 8.672 10.085 24,769 27.587 30.191 33.409 35.718 9.390 10.865 25.989 28.869 31.526 34.805 37.156 10.117 11.651 27.204 30.144 32.852 36.191 38.582 10.851 12.443 28.412 31.410 34.170 37.566 39.997 6.844 7.633 8,907 7.434 8.260 9.591 8.034 8.897 10.283 29.615 32.671 35.479 38.932 41.401 8.643 9.542 10.982 9.260 10.196 36.781 40.289 42.796 38.076 41.638 44,181 39.364 42.980 45.558 9.886 10.856 10.520 11.524 11.591 13.240 12.338 14.041 30.813 33.924 11.689 13.091 14.848 32.007 35.172 12,401 13.848 15.659 33.196 36.415 13.120 14.611 16.473 34.382 37.652 40.646 44.314 46.928 13.844 15.379 17.292 35.563 38.885 41.923 45.642 48.290 14.573 16.151 18.114 36.741 40.113 43.195 46.963 49.645 37.916 41.337 44.461 48.278 50.994 39.087 42.557 45.722 49.588 52.335 11.160 12.198 11.808 12.878 12.461 13.565 13.121 14.256 15.308 16.928 18.939 16.047 17.708 19.768 12445 3 67899 H 28 5833 38688 10 11 12 13 14 15 16 17 18 19 20 21 22 23 24 25 26 27 28
982 Appendix B Tables TABLE 3 CHI-SQUARE DISTRIBUTION (Continued) Area in Upper Tail Degrees of Freedom 995 99 975 95 .90 .10 .05 025 .01 .005 30 20.599 50.892 53.672 40.256 43.773 46.059 49.802 35 60.275 13.787 14.953 16.791 17.192 18.509 20.569 20.707 22.164 24.433 24.311 25.901 29.707 46.979 53.203 57.342 59,342 63.691 40 18.493 22.465 24.797 26.509 29.051 28.366 30.612 33.350 32.357 34.764 37.689 66.766 45 51.805 55.758 57.505 61.656 65.410 69.957 73.166 63.167 67.505 71.420 76.154 79.490 50 27.991 55 31.735 77.380 82,292 85.749 60 83.298 88.379 91.952 65 33.571 36.398 38.958 42.060 35.534 37.485 40.482 43.188 46.459 39.383 41.444 44.603 47.450 50.883 43.275 45.442 48.758 51.739 55.329 47,206 49.475 52.942 56.054 59,795 68.796 73.311 74.397 79.082 79.973 84.821 85.527 91.061 94.422 98.105 70 89.177 90.531 95.023 100.425 96.217 100.839 106.393 104.215 75 110.285 80 116.321 85 90 51.172 53.540 57.153 60.391 64.278 96.578 55.170 57.634 61.389 64.749 68.777 102.079 59.196 61.754 65.647 69.126 73.291 107.565 63.250 65.898 69.925 73.520 77.818 113,038 67.328 70.065 74.222 77.929 82.358 118.498 101.879 106.629 112.329 107.522 112.393 118.236 122.324 113.145 118.136 124.116 128.299 118.752 123.858 129.973 134.247 124.342 129.561 135.807 140.170 95 100
983 TABLE 4 F DISTRIBUTION Area or probability Entries in the table give F, values, where a is the area or probability in the upper tail of the F distribution. For example, with 4 numerator degrees of freedom, 8 denominator degrees of freedom, and a .05 area in the upper tail, Fos3.84. Denominator Area in Degrees Upper Numerator Degrees of Freedom of Freedom Tail 1 2 3 4 6 7 20 25 60 1000 61.34 39.86 49.50 53.59 16145 199.50 215.71 025 647.79 799.64.15 4052.18 4999.34 5403.53 8.53 9.00 9.16 9.34 9.29 9.33 18.31 19.00 19:36 19.25 19.30 19.33 38.31 39.00 39.17 39.25 39.30 39.33 98.50 99.00 92.16 99.25 99.30 99.33 5.38 62.05 62.26 62.53 62.79 63.00 63.30 249.26 230.10 251.14 252.20 253.04 254.19 998.00 1001.40 1005.60 1009.79 1013.16 301776 6208.66 6239.36 6260.35 628643 6312.97 6333.92 6362.0 9.489.49 1949 194 39.49 39.50 999 99.50 5.13 9.45 946 1945 1946 39.46 39.46 99.40 99.47 947 9.47 19.47 1948 39.47 39.48 19.40 99.48 9.35 9.37 9.38 1935 19.37 19.38 39.36 39.31 39.39 99.36 99.38 99.39 5.27 5.25 5.24 K.49 ARE 1442 14.54 14.47 27.47 27.49 27.34 5.54 5.39 5.34 531 5.37 5.19 55.83 37.24 38.20 38.91 39.44 59.36 60.1961.22 224.38 230.14 233.99 236.77 238.88 240.34 241.38 245.95 248.00 199.00 921.83 917.11 948.20 956.64 963.28 96463 964.87 991.08 5624.26 5763.96 5858.95 5928.33 59195 6022.40 6055.93 615697 9.39 9.42 9.44 19.40 19.43 19.45 39.40 39.43 39.45 99.40 994) 9945 5.23 5.30 5.18 6.79 K70 8.66 1442 14:25 14.17 27.23 26.47 36.69 3.92 387 384 5.96 5.86 5.80 IM K.56 14.00 321 4.56 5.46 9.35 5.36 8.39 5.15 5.14 10.13 9.12 9.01 8.94 9:28 15.44 29.46 26.71 26.24 1744 16.04 34.12 30.12 8.57 13.99 863 8.62 1400 15.10 14.A 8.35 8.39 13.91 14.01 13.96 14.73 27.91 26.50 26.41 26.32 26.24 36.14 4.54 4.19 4.11 4.05 4.01 3.90 1968 3.94 381 3.82 1.80 7.71 6.26 6.16 6.09 6.01 5.63 6.94 12.22 10.45 9.98 639 960 6.00 8.90 5.77 1.50 3.79 3.28 3.76 3.71 5.49 5.66 4.32 8.26 11.58 13.47 9.36 5.75 8.46 13.91 13.84 9.20 9.07 8.98 21.30 18:00 16:09 15.98 15.52 15.31 14.98 1480 14.35 4.06 3.78 362 352 345 3.37 3.34 332 3.30 3.324 3.19 3.17 3.11 661 5.79 541 5.19 4.38 481 4.77 4.74 442 3.40 5.05 4.95 7.39 7.15 6.98 6.85 676 11.39 10.97 10.67 10.46 10.29 8.43 7.76 662 643 10.01 16.26 13.27 6.68 10.14 10.05 9.72 6.02 9.05 1 2 3 4 5 * * *g* anpa ang= 669 0 $ www. 993 ww 4.52 633 627 9.55 9.45 IFV KY 13.35 3.16 3.14 3.13 4.50 446 443 4.41 623 6.18 6.12 6.08 9.38 9.29 9.20 913
TABLE 4 F DISTRIBUTION (Continued) Area in Denominator Degrees Upper of Frvedam 1 2 3 3.78 5.99 881 9 7 19 11 13 13 14 15 *********** *** *** *** *** *** *** *** AFT 5.59 KOT 12.25 3.46 DES 7.57 9211 1.36 5.12 126 967 769 6.72 940 4.35 6.55 9.31 3.14 OVE 3.71 5.08 10.56 3.29 2.92 2.73 199 199 HE WE WY OFE OFF 5.14 476 7:26 6.00 10.50 9.78 326 3.07 4.74 4.35 654 9.55 8.45 118 262 WY 10€ SEY 1ST 009 6.06 1.42 8.61 7.59 1.48 OFF Ws 4 3.18 4.53 4.39 623 5.99 8.75 296 2.88 4.12 5.99 5.32 5:29 7.85 2.81 4.07 3.84 505 7.01 2.60 3.36 361 4.72 6.99 6.42 ACT ves (97 176 HCC IVE 197 INZ OFF 169 198 3.59 3.99 3.49 3.26 4.47 4.12 5.41 2.76 2.56 2.43 3.81 341 3.18 4,97 9.07 6.70 2.73 6.30 8.36 3.07 2.70 371 3.48 4.83 4.47 10.04 7.56 6.55 5.99 5.64 991 IVE SEP PLS. EFT ACE KY WY FCF 159 6FZ 621 565 192 Dry 5 TEE 001 LEE WPL 65 HOS 2.73 300 DEY 663 3.48 WY 6:06 2.52 ** PCY ww NEW 195. DES WPZ OCE ICE OFE 90% 5.21 239 231 311 Nomerater Degrees of Freedom 10 30 40 237 2.30 2.78 415 4.30 4.06 3.94 -3.87 383 3.81 5.46 3.82 5.70 5.60 5.12 8.26 8.10 5.17 3.11 5.07 7.40 7.30 7.25 7.87 2.78 2.75 2.32 2.30 2.59 2.57 3.79 3.73 3.4 164 351 3.44 3,40 3.36 457 4.47 4.90 4.76 6.34 6.72 6.62 631 262 2.59 2.56 2.54 2.46 3.50 344 339 3.35 4.41 4:30 6.03 591 5.81 WET 8 3.05 3.01 2.98 " 962 NEY ICY LIVE 283 387 5.12 7.19 267 3.58 465 453 6:38 2.55 251 2.47 3.37 3.29 LEW CEY L 407 6CF Act 667 669 5.30 246 241 3.22 404 3.48 3706 1.07 439 OCY 148 2.39 2.33 3.00 3.33 361 3.51 4.42 2.35 2:38 3.03 2.92 3.77 140 3.48 BEE SOX oc's ZEY 2.34 3.09 3.01 2.95 VEZ INC 2.45 2.76 EZE 3.18 410 4.00 3.96 561 5.47 5.39 5.26 2.35. 2.32 2.24 2.36 3.07 3.00 2.98 2.85 3.85 3.76 3.72 3.52 1.06 AN 435 2.25 NECE Oct 4.29 912 WE 199 OFF 122 oft OFE 668 29Y 17. OLY YEE AFZ 512 212 OCZ KEZ SKE ZKY WF WZ 3.66 3.50 400 4.46 236 2.27 2:21 3.06 2.90 279 271 477 4.15 3.30 3.58 341 3.29 3.30 3.12 6.36 4.30 4.56 217 OST 007 FE KY ICY 4.39 PEC WVz OT WY 612 FI 245 3.29 3.21 401 2.12 200 264 2.59 2.54 3.06 330 LZS PIZ 1.56 192 ZEV 017 967 WY 412 3.15 311 4.00 5.36 242 234 2.30 3.01 294 3.77 347 ANI 2.20 2.77 2.73 3.33 VEY OFT BIT 017 DEZ 092 WE SEE MOT 902 20 SUVE ZVE PECC 919 EVE WE L61 WE ZVE ZVE IFF 2.12 WE EZE 3.59 4.74 463 231 210 2.15 263 3.37 4.30 4.01 2.16 2.01 2.11 2.67 2.31 2.46 241 2.36 2.34 3.25 3.66 3.57 201 1.96 60 100 1000 2.36 2.75 2.72 3.77 3.74 3.71 367 5.00 4.96 4.92 7.00 6.99 4.86 6.99 2.54 251 2.50 247 3.30 3.27 3.21 4.25 5.99 5.91 5.81 5.75 566 2.36 234 2.32 104 394 3.39 3.84 5.30 5.12 5.01 221 2.25 223 221 2.39 2.86 283 3.40 3.56 351 3.45 140 4.71 4.57 441 2.17 2.16 2.13 2.09 206 2.33 2.70 266 262 2.59 2.54 331 3.00 192 244 241 249 HT 25 WE INT OFF 261 6.06 OFE YES ACE ICY OFE 109 4.10 106 201 2.50 3.07 3.01 2.96 3.36 3.70 861 960 WY 161 ACE KOE TPE Ww 200 2.40 2.31 2.53 3.16 3.12 WY ACT ME 102 Lrt WE 1.89 1.87 2.33 2.28 2.25 2.76 289 KY ICY SEE VER WE IDE 901 4.17 205 201 167 [VE (61 101 #FF 112 2.84 2.76 2.12 267 331 343 1.99 2.39 2.34 2.31 2.95 234 2.78 2.73 267 261 3.31 ar at 2.97 293 3.78 3.74 1.68 487 2.16 2.79 2.76 2.71 OFY BOY LZE oct GFE 199 241 2.34 2.85 KLV NT 961 161 SCE 3.00 2.96 ICF NE WOP 612 KCY WI Sre 109 102 KIV SOX STY 2.80 1.47 337 1.90 LAR 2.30 2.36 221 OCT (81 FCC ZEP 11 230 ECE OFE 327 3.18 221 2.19 214 2.56 3.11 1.82 1.79 216 2.12 259 2.53 3.13 ONI SCT 201 2.47 2.96
727 DEZ HI mz NOT 921 OKI 240 258 2.21 2.78 199 3.15 1.39 1.94 197 2.25 2.30 2.36 242 2.31 2.62 164 1.73 1.30 16T 1.78 1.80 201 198 2.10 1.96 1.94 184 1.79 1.76 1.74 1.71 1.68 3.68 3.59 1.38 1.34 191 SYT ICT 117 Wi 161 1.62 250 AKT 191 2.55 2.18 161 197 222 1.75 Grz 417 1.78 m 2.18 EXT WCZ 17 DE? NET 162 ZOVE Grz ICT 117 617 IKI 1.66 NET 292 4 ww 197 SET K KEZ B 90% OLZ 161 161 2.49 245 203 200 2.99 19% BLE 3.05 Art 17 (02 956 05 206 A 14 16 Namerator Degrees of Freedom 195 * 19 IVE WELFT 955 OCTORY 157 097 002 102 6072 912 szt WET 662 162 01 64 165 017 PET LVT 615 119 OF 262 962 905 91X KE ME WE 109 299 109 197 3.09 2.97 1.13 201 2.15 2.10 4.20 3.34 274 2.18 + 069 2.22 WFT 3.30 233 22% BEE SUZ VEZ * 190 EFT 1ST (42 ZAW . 3.72 3.01 2.19 487 4.37 3.01 3 4.45 3.59 192 (29 4.69 EVE E T R A 288 288= 2aga aga age age ang = K Tall Appar Area in # 8 18 17 16 of Freedom sug Denominator 985
986 TABLE 4 FDISTRIBUTION (Continued) Denominator Area in Upper of Freedom Tail 1 3 2.32 2.99 3.69 saudi Of 5 % A 28 8 8 300 1000 195 AD 1.6 1.75 5.66 427 367 3.33 3.10 294 2.82 2.79 265 2.32 4.14 3.82 3.50 3.42 3.29 3.18 5.63 4.34 3.65 3.31 3.08 292 2.80 271 7.68 5.49 4.00 4.11 3.78 3.56 2.80 2.50 2.90 251 2.30 2.17 2.07 2.00 195 191 187 1.85 1.75 1.70 1.66 1.64 1.60 1.57 1.54 1.50 263 2.57 2.36 2.25 2.18 2.13 207 200 1.94 1.86 3.39 3.36 3.15 3.06 2.78 263 234 2.47 2.38 2.29 2.22 2.11 767 424 5.09 2.21 ET 5 2.09 323 888 41 6% 2017 092 OFT 1.13 2.97 185 AXY 161 3.63 SWZ www ww San wi 102 102 212 261 961 7 1.97 2.40 5.45 4.57 4.07 3.75 8 8552 5565 3853 Numerator Degrees of Freedom 19 15 1.87 1.77 224 2.09 6 353 336 323 192 311 In 991 T 6T 1 W1 261 461 907 ocz szz 17 LET WE 1ST (47 967 SEY ICV 1.83 1.73 168 2.18 203 194 3.00 2.73 117 262 K LFI ( 1 CL 2E WIKC 163 17 907 912 822 NO 102 612 972 677 67 07 717 **C 697 847 062 978 628 SWE ZZY 061 122 1 2011 201 507 117 912 152 2010 11 061 961 WIZ 612 92Z SEZ 12 092 527 2.22 1.49 WI 20 185 1.06 1.92 2.18 S 152 OF 164 1.62 1.39 1.85 1.58 1.55 1.81 1.75 1.52 1.47 1.71 21 11
Appendix B Tables 987 TABLE 5 BINOMIAL PROBABILITIES Entries in the table give the probability of a successes in n trials of a binomial experiment, where p is the probability of a success on one trial. For example, with six trials and p=05, the probability of two successes is .0305. P "1 X .01 .02 03 04 .05 06 07 .08 .09 0 9801 9604 9409 9216 9025 8836 8649 8464 8281 1 0198 0392 0582 0768 0950 1128 1302 1472 1638 2 0004 0009 0016 0025 0036 0049 0064 9703 9412 9127 8847 8574 3306 8044 7787 7536 0294 0576 0847 1106 -1354 1590 1816 2031 2236 0003 0012 0026 0046 0071 0102 .0137 0177 0221 0007 0000 0000 0000 0001 0002 0003 9224 8853 8493 8145 7807 7481 7164 6857 0388 0753 -1095 1416 1715 1993 2252 2492 2713 0006 0023 0051 0088 0135 0191 0254 0325 0402 0000 0002 0005 0000 0000 0000 0008 0013 0019 0027 0000 0000 0000 0000 0000 0000 0001 8587 8154 7738 7339 6957 6240 9510 0480 2036 2342 2618 2866 3086 9039 0922 1328 1699 0010 0038 0082 0142 0000 0214 0394 0498 0610 00010003 0011 0019 0030 0043 0000 0000 0000 0000 0000 0002 0003 5 0000 0000 0000 0000 0000 0000 0000 0000 0 9415 8858 8330 7351 6899 6470 5679 0571 JOKS 1546 2321 7828 1957 0204 0011 2922 3164 3370 105.50 0688 0833 0014 0055 0120 0305 0422 0000 0002 0005 0055 0080 0110 0000 0000 0000 0000 0003 0005 0008 0036 0002 0000 0000 0000 0000 5 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0 9321 8581 8080 7514 6983 5168 0659 1240 1749 2192 2573 6485 6017 5578 2897 3170 3396 0716 0886 3578 2 0020 0076 0162 10274 0406 0555 1061 0175 0003 0008 0019 0036 00:59 0128 0000 0000 0002 0004 0007 0017 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0 9227 6096 5596 5132 4703 7837 1939 1 1389 3721 0746 0026 0099 2 0210 1288 2793 3113 3370 3570 0515 0695 0888 1087 0054 0089 0134 .0189 0004 0007 3 0001 0004 0013 0255 4 0000 0001 0013 0000 0000 0021 0031 0002 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 ,0000 0000 2 m 4 s 6723 1 0 1 2 3 4 0 812345 6123750 4 DIN34567 1 E 6 5 6 7 8 1000 9096 0000 0000 1000 0000 0000 . 9000 1000 0000 0000 7214 2405 1960 0029 0002 0000 0000 0000 1000 1000 6600 1000 0000 1000 0000 0600 1000 9000 1909 1100 1000 1000 1800 0900 1000
988 Appendix B Tables TABLE 5 BINOMIAL PROBABILITIES (Continued) P n Г .01 02 03 04 .05 .08 0 9135 8337 7602 6925 6302 5730 4722 4279 1 08.30 1531 2116 2597 2985 3292 3695 3809 2 0034 10125 0262 0433 0629 0840 1285 1507 3 0019 0042 0077 0125 0261 0348 4 0000 0001 0003 0012 0021 0034 0052 5 0000 0000 0000 0000 0002 0005 6 0000 0000 0000 0000 0000 0000 0000 0000 7 0000 0000 0000 0000 0000 0000 0000 0000 0000 8 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 9044 8171 7374 6648 3987 5386 4840 4344 3894 0914 1667 2281 2770 3151 3438 3643 3777 3851 0042 0153 0317 10746 0988 1234 1478 1714 0008 0026 0058 0105 0248 0343 0452 0000 0004 0010 0019 0033 0052 0078 0000 0000 0000 0001 0003 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 .0000 0000 0000 0000 ,0000 0000 6127 5404 4759 4186 3064 3413 3645 3781 0702 0988 1280 1565 0098 0173 100272 0393 0009 0039 0067 6 10 PA 15 6 0 1 2 3 56x49sA6 7 8 10 2925451TNGUNG 3 6 10 11 G CHCIESOJAUAWNIO 5 0000 6 0000 7 0000 8 0000 0000 0000 0000 0000 10 11 1000 12 1000 13 14 15 0000 0000 0000 0000 0000 0000 0000 0000 0000 7847 1922 2575 0216 0438 0003 0000 0000 0002 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 5421 3953 1303 2261 2938 3388 3658 3785 0092 101323 1691 1348 0178 0307 0468 0085 4 0000 0002 0022 0049 0000 0000 0002 0006 0013 0000 0000 0000 0000 0000 0001 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 1074 0060 0002 9000 1098 0000 0000 1000 0000 $100 10000000 0000 6200 0000 6190 0000 1000 0000 0000 0000 9000 1000 0000 0000 0000 90° 1200 1000 8910 1000 0000 0000 1000 0000 .07 5204 3525 1061 9810 0000 0000 0000 0000 0000 3677 3837 1835 05:32 0104 0008 0014 0001 0000 0000 0000 0000 1000 0000 0000 $000 0000 1000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 3367 2863 2430 3801 2003 2273 3734 3605 2496 0653 0857 1070 0148 0223 0317 0024 0043 0003 0000 60° 9000 1000 6000 0001 0000 0000 0000 0000 3225 3827 2082 0686 0153 0024 .0003 6900 0011 1000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000
Appendix B Tables TABLE 5 BINOMIAL PROBABILITIES (Continued) P #1 X .01 .02 .03 .04 .05 .06 .09 18 8345 6951 5780 4796 3972 3283 2708 2229 1831 1517 2554 3217 3597 .3763 3772 3669 3489 3260 0130 0443 0846 1274 1683 2047 2348 2579 2741 .0007 0048 0140 0283 0473 0697 0942 -1196 1446 0000 0004 0016 0044 0093 0167 10266 0390 05:36 0000 0000 0001 0005 0014 0030 0056 0095 0148 0000 0000 0000 0000 0002 0004 0018 0032 0000 0000 0000 0000 0000 0003 0005 0000 0000 0000 0000 0000 0000 0000 0001 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 .0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 .0000 0000 0000 0000 0000 ,0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 .0000 0000 0000 0000 0000 0000 0000 ,0000 0000 0000 0000 0000 0000 0000 8179 6676 5438 4420 3585 2901 2342 1887 1516 1652 2725 3364 3683 3703 3526 3282 3000 0159 0528 0988 3774 1458 1887 0364 2711 2818 0066 0183 2246 2521 0860 0233 1139 1414 0010 0000 0000 1672 0024 0065 0364 0523 00703 0133 0022 0002 0048 0088 0145 0222 ,0000 0000 0000 0000 0003 0008 0017 0032 0055 .0000 0000 0000 0000 0002 0005 0011 0000 0000 0000 0000 ,0000 0000 0000 0001 0002 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 ,0000 0000 0000 .0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 ,0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 DO00 0000 0000 20 0 1 2 3 4 5 6 7 8 6 10 11 12 13 14 15 16 17 18 0 1 2 3 4 5 9 L 8 9 10 11 12 13 14 15 91 17 18 19 20 9000 0000 0000 0000 0000 0000 0000 0000 0000 0000 6000 1000 0000 0000 0000 9650 1000 .07 6000 1000 0000 0000 0000 0000 80⁰ 0000 989
990 Appendix B Tables TABLE 5 BINOMIAL PROBABILITIES (Continued) P "1 X .10 .15 .20 25 30 .35 40 45 2 8100 7225 6400 5625 4225 3600 3025 2500 4900 3750 4200 4550 4800 -1800 2550 3200 4950 5000 0100 0225 0400 0625 0900 1225 1600 2025 2500 3 7290 6141 5120 4219 1664 -1250 2430 3251 3840 3430 2746 2160 4219 4410 4436 4320 1406 1890 2389 2880 3341 .0156 0270 0429 4084 3750 0270 0574 0960 3750 0010 0034 0080 0640 0911 1250 6561 5220 4096 0625 3164 2401 1785 1296 0915 4096 4219 4116 3845 3456 2916 3685 2995 2500 0486 0975 1536 0256 2109 3675 3750 0036 2646 3105 0469 0756 0039 3456 1115 1536 2005 0115 2500 0001 0005 0150 0256 0410 0625 5905 3277 2373 1681 1160 0778 0503 0312 3280 4437 3915 4096 3955 3602 3124 1382 2048 2637 3087 2592 2059 1562 0729 3364 3456 3369 3125 0081 0244 0512 2757 3125 0879 1323 0146 1811 2304 0488 0004 0022 0064 0768 1128 1562 0000 0001 0003 0010 0024 0053 0102 0185 0312 5314 3771 2621 1780 1176 0754 0467 0277 0156 3543 3993 3932 3560 3025 2437 1866 1359 0938 2 0984 1762 2458 2966 3241 3280 3110 2780 2344 3 0146 0415 0819 1318 1852 2355 2765 3032 3125 4 0012 0055 0154 0330 0595 0951 1382 1861 2344 5 0004 0015 0044 0102 0205 0369 0609 0938 6 0000 0000 0002 0007 0018 0041 0083 0156 0 1335 0824 0490 0280 0152 0078 4783 3206 3720 3960 2097 .3670 3115 1 1848 1306 0872 0547 2471 3177 2 1240 2097 2753 3115 2985 2613 2140 1641 3 02:30 0617 1147 1730 2269 2679 2903 2918 2734 4 0026 0287 0577 0972 1442 1935 2388 2734 5 0002 0012 .0043 0115 0250 0466 0774 1172 1641 6 0000 0001 0004 0013 0036 0084 0172 03.20 0547 7 0000 0000 0000 0002 0016 0037 0078 0 4305 2725 1678 1001 0576 0319 0084 0039 1 3826 3847 3355 2670 1977 1373 0548 0312 2 2376 2936 2090 1569 1094 3115 2965 2587 2076 2541 2786 2787 2568 3 0839 1468 2188 1488 0331 0046 0004 0026 4 DIRS 0459 0865 1361 1875 2322 2627 2734 5 0092 0231 0467 0808 1239 1719 2188 6 .0038 0100 0217 0413 0703 1094 0000 0002 0000 0000 7 0004 0012 0033 0079 0164 0313 8 0000 0000 0002 .0007 0017 0039 4 7 0 1 2 0 1 2 3 0 1 2 3 4 0 1 2 3 4 5 0 1 1000 6010 0000 9100 1000 1100 1000 0000 1000 1800 1800 1000/ 9000 8910' 9680 -50
Appendix B Tables TABLE 5 BINOMIAL PROBABILITIES (Continued) P " x 10 -15 25 30 35 3874 3874 2316 1342 0751 0404 3679 3020 2253 2597 3020 3003 1069 1762 2336 2668 0207 0101 1556 -1004 0605 2668 2162 1612 1722 0446 2716 2508 .0074 0283 0661 1168 1715 2194 2508 0008 0050 0165 0389 0735 1181 1672 0028 0087 0210 0424 0743 0000 00000003 0012 0039 0098 0212 0000 0000 0000 0001 0004 0013 0035 0000 0000 0000 0000 0000 0003 3487 1969 1074 0563 0282 0135 0060 3874 3474 2684 1877 1211 0725 0403 1937 2759 3020 2816 2335 1757 1209 0574 1298 2013 2503 2668 2522 2150 0112 0401 1460 2377 2508 0881 2001 0264 0584 1029 0015 1536 2007 0085 0012 0055 1115 0162 0368 0031 0689 0212 0000 0001 0008 0425 0000 0000 0014 0043 0106 0000 0000 0000 0000 0001 0005 0016 0000 0000 0000 0000 0000 0000 0001 0138 0057 0022 2824 1422 0687 0317 3766 3012 2062 1267 0712 10368 2301 1678 1088 2924 2835 2323 1720 2362 2581 0174 0075 0639 0339 1954 1419 0923 0853 2397 0213 0683 1329 1936 2311 2128 1700 2225 0038 0193 2367 0532 1032 -1585 2039 2270 0155 0401 0792 1281 1766 0005 0040 0000 0006 0033 0115 0291 0024 30078 0591 -1009 0199 0420 .0000 0001 0005 0004 0015 0048 0125 0008 0025 0000 0000 0002 0000 0000 0000 0001 0003 0000 0000 0000 0000 0000 0000 0874 0352 0134 0047 0016 0005 2312 1319 0668 0305 0126 0047 0016 0005 0476 0219 2856 2309 1559 0916 0032 1285 2184 2501 2252 1700 1110 0634 0318 0139 1156 1876 2252 2186 1792 1268 0780 0417 0449 1651 2061 2123 1899 1404 0916 1032 0430 0030 .0138 0917 1472 1906 2066 1914 0019 0132 0003 0000 1527 0393 0811 1319 1771 2013 1964 0005 0710 1181 1647 1964 0035 0131 0007 0348 0016 0000 0001 0034 0298 0612 1048 1527 0007 0030 10245 0515 0191 0417 0139 0052 0010 0032 0001 0005 0000 0000 9 10 12 15: 0 I 2 3 4 5 6 7 8 6 0 56xL9UAWNIO 1 2 3 4 5. 7 8 10 DINMASerxagIN 0 2 3 4 6 8 6 11 10 0000 0000 0000 12 0 2059 3432 2 2669 CHERISCOWNIO 1 6 4 0428 5 0105 8 1000 6 1000 12 10 0000 11 0000 0000 0000 0000 0000 0000 0000 0000 0000 9000 13 0000 14 15 0000 0000 0000 1000 1000 1000 1000 0600 0000 0001 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 9000 1000 9600 0000 0024 XX174 0001 0004 0016 0000 0001 0003 0000 0000 0000 0000 991 45 50 0046 0020 0339 0176 1110 0703 2119 1641 2600 2461 2128 2461 1160 1641 0407 0703 0083 0176 0008 0020 0025 0010 0207 0098 0763 0439 1665 1172 2384 2051 2340 2461 1596 2051 0746 1172 0229 0439 0042 0003 0010 0002 0029 0161 0537 1208 1934 2124 2256 1934 0762 1208 0277 0537 0068 0161 0010 0029 0001 0002 8000 1000 0600 $600 0000 9160
992 Appendix B Tables TABLE 5 BINOMIAL PROBABILITIES (Continued) P 71 X .10 15 25 18 1501 0536 0180 0056 0016 ,0004 3002 1704 0811 0338 0126 0042 0012 2835 2556 1723 0958 0458 0190 0069 1680 2406 2297 1704 1046 0547 0246 0700 1592 2153 2130 1681 1104 0614 0218 0787 1507 1988 2017 1664 -1146 0052 0301 1436 1873 1941 1655 0010 0820 1376 1792 1892 0002 0376 0811 -1327 1734 0000 01:39 0386 0794 1284 0000 0042 01:49 0385 0771 0000 0046 0151 0374 0000 0012 0145 0000 0045 0002 0012 0000 0002 0000 0000 0002 0000 0000 0000 0000 0000 0000 0002 0020 20 0 1 2 3 4 5 6 7 8 6 10 11 12 13 14 15 0000 16 0000 17 0000 18 0000 0 1216 1 2702 2 2852 3 1901 4 DIZI+V 6 10 11 12 BUTTRICI 13 14 15 16 0000 0000 0002 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0388 0115 0032 1368 0576 0211 2293 1369 2428 2054 1339 1821 2182 1897 5. 0319 1028 1746 2003 6 0089 0454 1091 1686 0545 1124 7 0020 0160 8 0004 0046 0222 0074 0271 0002 0020 0000 0000 0000 0005 00:30 0000 0000 0008 0000 0000 00000002 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 17 0000 18 0000 19 0000 20 0000 8680 1600 1000 0022 1000 1000 0000 0000 0000 0000 1100 0000 0000 A 0000 0000 9180 0350 0120 0033 1000 1000 0100 0000 6990 6090 6600 0000 0000 0000 0000 0000 0000 0000 12 8000 40 0010 1000 1100 45 .50 0000 0000 .0003 0022 .0095 0031 0291 0117 .0666 0327 1181 0708 1657 1214 .1864 1669 1694 1855 1248 1669 0742 1214 0354 0708 0134 0327 0039 0117 0031 6000 1000 0000 0000 0000 0000 0068 0005 0031 0123 0000 0002 0278 0008 0716 0323 0040 0011 1304 0738 0350 01:39 0046 1789 1272 0746 0365 .0148 1916 1712 1244 0746 0370 1643 1844 1659 1221 0739 1144 1614 1797 1623 1201 0654 1158 1597 1771 1602 0308 0686 1171 1593 .1762 01:20 0336 0710 1185 1602 00:39 01.36 0355 0727 1201 0010 0045 0146 0366 0739 0002 0012 0049 0150 0370 0000 0003 0013 0049 .0148 0000 0000 0003 0013 0046 0000 0000 0000 0002 0011 0000 0000 0000 0000 0002 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 1000 9000 0000 0000 0000 1000 9000 1000 0000 0000
Appendix B Tables TABLE 5 BINOMIAL PROBABILITIES (Continued) P x 55 .60 .65 .70 .75 80 2025 1600 1225 0625 0400 4950 4800 4550 4200 3750 3200 3025 3600 4225 4900 5625 6400 0911 0640 0429 0270 0156 .0080 0034 3341 2880 0960 0574 2389 1890 1406 4436 4410 4219 4084 4320 3840 3251 1664 2160 2746 3430 4219 5120 6141 0410 0256 0150 0039 0016 0005 2005 1536 1115 0469 0256 0036 3675 3456 3105 2646 2109 1536 0975 0486 0135 2995 3456 3845 4116 4219 4096 3685 2916 1715 0915 1296 1785 2401 3164 4096 5220 6561 8145 0 0185 0102 0053 0003 0000 0000 1128 0768 0024 0010 0284 0146 1811 1323 0879 0488 0000 0022 0005 0244 2 2757 2304 0512 0011 3 3369 3456 3364 3087 1382 0729 0214 3915 2637 2048 3955 4096 2373 3277 3281 4 2059 5 0503 2036 2592 3124 3601 0778 1160 1681 4437 5905 7738 0 0083 0018 0007 0000 0002 0001 0102 0044 0015 0000 0000 1861 0001 0041 0000 0369 0205 0004 1382 .0951 0595 0330 0154 0055 3032 2765 2355 1852 1318 0819 0415 2780 3110 3280 3241 2966 2458 1359 1866 2437 3025 0754 0012 0146 0021 0305 1762 0984 3993 3543 2321 3560 3932 1176 1780 0277 0467 2621 3771 5314 7351 0037 0016 0000 0000 0000 0000 0002 0036 0320 0172 0084 0013 0000 0000 0001 0012 0002 1172 0774 0466 0250 0115 0043 0000 2388 1935 1442 0577 0287 0109 0026 0972 2679 2269 0002 2918 2903 1730 1147 0617 0230 0036 2613 3115 2753 2097 1240 0406 0872 1306 2985 3177 1848 2471 0280 0490 0824 1335 3115 3670 3720 2573 3960 3206 2097 4783 .6983 0007 0002 0000 0000 0000 0000 0033 0012 0004 ,0000 0000 0000 0217 0100 0038 0011 0002 0000 0000 0808 0467 0231 0092 0026 0004 0000 1875 1361 0865 0459 0185 0046 0004 2786 2541 2076 1468 0839 0054 0331 2376 1488 2965 0515 2587 1373 0319 .3115 2936 1977 2670 3355 3847 1001 2793 3826 1678 2725 4305 .6634 0576 M 2 0 1 2 0 0123 DI2MT 0 1 3 4 SINM In 1 T 2 3 4 5 6 0 T 2 3 4 5 6 7 0152 0017 0164 0079 0703 0413 1239 2322 2787 2090 0121 I 6090 6 7 8 2140 2 3 1719 4 2627 5 2568 1569 0548 0084 9680 0168 9000 0060 1800 0756 1000 . 1000 1900 1000 1000 993 85 .90 95 0225 0100 0025 2550 0950 1800 7225 8100 9025 0010 0270 2430 7290 $110 1000 0000 1000 1800 1000 1000 0071 1354 8574 0000 5000
994 Appendix B Tables TABLE 5 BINOMIAL PROBABILITIES (Continued) n 55 .60 .65 .70 .75 80 .90 .0003 0000 0000 .0000 0000 0083 0035 0013 0004 0001 0000 0000 0407 0212 0039 0012 0003 0000 -1160 0743 0424 0210 0087 0028 0001 1672 1181 0165 0050 0008 2128 2600 2508 2194 2716 0283 0735 0389 1715 1168 .0661 0074 2668 2336 1762 1069 0446 2119 2508 -1110. 1612 2162 2668 3003 3020 2597 1722 0339 0605 1004 1556 2253 3020 .3679 3874 0046 0207 0404 0751 1342 2316 3874 0 0003 0000 0000 0000 0000 0000 1 0042 .0016 0005 0001 0000 0000 ,0000 2 0229 .0106 0043 0014 0004 0000 0000 3 0746 0425 0212 0090 0031 0000 1996 1115 0689 0368 0162 0055 0012 0001 5 2340 2007 1536 1029 0584 0264 0085 0015 6 2377 2001 1460 0881 0401 2384 1665 0763 2508 2150 2522 7 2668 2503 2013 1298 0574 8 1209 1757 2335 2816 3020 2759 1937 9 0207 0403 0725 1211 1877 2684 3474 3874 10 0025 0135 0282 0563 1074 1969 3487 0 0000 0000 0000 0000 ,0000 0000 1 0000 0000 0000 0000 0000 2 0002 0000 0000 0000 0000 3 0015 0004 0001 0000 0000 4 0078 0024 0005 0001 0000 0291 0115 0033 0006 0000 0792 0401 0155 0040 0005 1585 1032 0532 0193 0038 2311 1936 1329 0683 0213 2397 2581 2362 1720 0852 1678 2323 2835 2924 2301 0712 1267 2062 3012 3766 01:38 0317 0687 1422 2824 0000 0000 0000 0000 0000 .0000 0000 0000 0000 0000 0000 0000 0001 0000 0007 0034 0131 .0393 0917 1651 2252 6 10 12 15 x 0 1234 2 5 6 7 8 6 145 4 5 6 L 6 1 8000 0000 0010 ,0003 0068 0005 0008 01277 0125 0048 0762 0420 0199 1489 1009 0591 2124 1766 1281 2225 2270 2039 2128 2367 8 -1700 0923 1419 1954 0339 0639 1088 0075 10 11 0174 0368 12 0008 0022 0057 0 0000 0000 0000 0001 0000 0010 .0003 0052 0016 0191 0074 0515 0245 1048 0612 0298 1647 1181 0710 2013 1771 1319 1914 2066 1906 1404 1859 2123 0780 1268 1792 2 3 4 5 6 7 8 9 10 11 1000 1010 1000 0900 1000 1000 0000 1000 0004 0024 9600 1000 9000 0030 0116 0348 0811 1472 2061 2186 0000 0000 1000 8000 1000 0007 0035 0138 0430 1032 1876 .85 0000 0000 0000 9000 1000 0000 0000 0000 0000 0000 1000 2110 0010 0105 0746 3151 5987 0000 0000 0000 ,0000 ,0000 0000 0000 0002 0021 0173 0988 3413 $404 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0005 .0000 .0000 0030 0003 0000 0132 .0019 0000 0449 0105 0428 1156 95 .0000 ,0000 .0000 .0000 ,0000 0000 9000 0077 0629 2985 6302 0000 ,0000 0000 ,0000 0000 1000 9000 0049
Appendix B Tables TABLE 5 BINOMIAL PROBABILITIES (Continued) P X 55 .60 .65 .70 .75 12 0318 0634 1110 1700 2252 13 0090 .0219 0476 .1559 14 0016 0047 0126 0305 0668 15 0001 ,0005 0016 0047 0134 0 0000 0000 0000 0000 0000 0000 .0000 0000 .0000 0000 0000 0000 0000 0000 0009 0002 0000 0000 0000 0039 0011 0002 0000 0000 0134 0045 0012 0002 0000 0354 0047 0012 0002 0145 0374 0742 0151 0046 0010 1248 0771 0385 0149 0042 1694 1284 0794 0386 0139 1864 1734 1327 0811 0376 1657 1892 1792 1376 0820 12 1181 1655 1941 1873 1436 13 0666 1146 1664 2017 1988 14 0291 0614 1104 1681 2130 15 0095 0246 0547 1046 1704 16 0022 0190 0458 0958 17. 0003 0012 0042 0126 0338 18 0000 0001 0004 0016 .0056 ,0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 ,0000 0000 ,0000 0000 0002 ,0000 0000 0000 .0000 0013 ,0003 0000 0000 ,0000 0049 ,0013 0003 0000 .0000 0150 0049 0012 ,0002 0000 0366 0146 0045 0010 .0002 0355 01:36 0039 0008 0727 1185 1593 0710 0336 0120 0030 1171 0686 0308 0099 1771 1597 1158 0654 0271 1623 1797 1614 1144 1221 1659 1844 1643 1124 0746 1244 1712 .1916 1686 0365 0746 1272 2023 1789 0738 1304 1897 0139 0350 0040 0123 0323 0008 0031 .0005 0001 0000 0000 M 18 20 1 2 3 4 5 6 7 8 6 10 11 0 I 2 3 4 5 6 7 8 6 10 11 12 13 14 15 16 17 18 19 20 1000 6900 0010 0020 0002 995 80 .85 .90 95 2501 2184 1285 0307 2309 2856 2669 1348 1319 2312 3432 3658 0352 0874 2059 4633 0000 0000 0000 0000 .0000 .0000 .0000 0000 0000 .0000 0000 0000 0000 0000 .0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0001 0000 0000 0000 0008 0001 0000 0000 0033 0004 0000 0000 0120 0022 0002 0000 0350 0010 0000 0816 0301 ,0052 0002 1507 0787 0218 0014 2153 1592 0700 .0093 2297 2406 1680 0473 1723 2556 2835 1683 0811 1704 3002 3763 0180 0536 1501 3972 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 .0000 .0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 0000 .0000 .0000 0000 0000 0000 0000 0000 0001 0000 .0000 0000 0005 ,0000 0000 0000 0020 0002 0000 0000 0074 .0011 .0001 0000 0004 0000 0222 0046 0545 20160 .0020 0000 -1091 0454 .0089 0003 1746 1028 0319 0022 2182 1821 0898 0133 0716 .1339 2054 2428 1901 0596 0278 2293 2852 1887 .1369 0211 .0576 0068 1368 2702 3774 0008 0032 0115 0388 1216 3585 9160 6090 6990 0000 1600
996 Appendix B Tables TABLE 6 VALUES OF e* A .00 1.0000 05 9512 .10 9048 15 8607 20 8187 7788 7408 7047 6703 6376 6065 5769 5488 5220 4966 4724 4493 4274 4066 3867 3679 3499 3329 3166 3012 2865 2725 2592 2466 2346 2231 2122 2019 1920 1827 1738 1653 1572 1496 1423 25 .30 35 40 45 50 55 .60 65 .70 75 80 85 90 .95 1.00 1.05 1.10 1.15 1.20 1.25 1.30 1.35 1.40 1.45 1.50 1.55 1.60 1.65 1.70 1.75 1.80 1.85 1.90 1.95 A 2.00 2.05 2.10 2.15 2.20 2.25 2.30 2.35 2.40 2.45 2.50 2.55 2.60 2.65 2.70 2.75 2.80 2.85 2.90 2.95 3.00 3.05 3.10 3.15 3.20 3.25 3.30 3.35 3.40 3.45 3.50 3.55 3.60 3.65 3.70 3.75 3.80 3.85 3.90 3.95 1353 -1287 1225 1165 1108 1054 1003 0954 0907 0863 0821 0781 .0743 .0707 0672 0639 0608 0578 0550 0523 .0498 .0474 0450 .0429 0408 0388 .0369 0351 0334 0317 0302 0287 0273 0260 0247 0235 0224 0213 0202 0193 A 4.00 4.05 4.10 4.15 4.20 4.25 4.30 4.35 4.40 4.45 4.50 4.55 4.60 4.65 4.70 4.75 4.80 4.85 4.90 4.95 5.00 6.00 7.00 8.00 9.00 10.00 1 0183 0174 0166 0158 0150 0143 0136 0129 0123 0117 0111 0106 0101 0096 0091 0087 0082 0078 0074 0071 0067 0025 0009 000335 000123 000045
Appendix 8 Tables 997 TABLE 7 POISSON PROBABILITIES Entries in the table give the probability of x occurrences for a Poisson process with a mean . For example, when - 2.5, the probability of four occurrences is 1336. H x 0.1 0.5 0.6 0.8 0.9 1.0 4066 3679 9048 0905 0.7 6065 5488 4966 4493 3033 3293 3476 0758 0126 .0198 0284 3595 3659 .8187 .7408 6703 1637 2222 2681 0045 0164 0333 0536 0033 0072 3679 1647 1839 0988 1217 1438 .0383 0002 0494 0613 .0011 0001 0000 0002 0007 0016 0030 0050 0077 0111 0153 0007 0012 0020 0031 0000 0000 ,0000 0000 .0000 0001 0000 .0000 0000 0000 .0000 0000 0002 0004 0000 0000 0000 0005 0001 0002 0003 0000 0000 0000 0000 0001 μ 1.1 1.2 1.3 14 1.5 1.6 1.7 1.8 19 2.0 0 1653 1496 1353 I 2231 2019 1827 3347 3230 3106 2510 2584 2640 2975 2842 2707 2 3329 3012 2725 2466 3662 3614 3543 3452 2417 1128 1255 1378 0395 0471 0551 2014 2169 2303 2678 2700 2707 3 0738 0867 0998 1607 1710 1804 1496 0636 0723 4 0203 0260 0324 0812 0902 5 0045 .0062 .0084 0111 .0141 0216 0260 0309 0361 0176 0035 0047 6 0008 0012 .0018 0098 0120 7 0026 0061 .0078 0005 0008 0011 0015 0001 0001 0002 0003 0020 0027 0001 0002 0003 0000 0000 .0001 0000 .0000 0000 0034 0005 0006 0009 0000 0000 0000 0001 0001 0001 0002 μ 2.1 2.2 2.3 24 2.5 2.6 2.7 2.8 2.9 3.0 1225 .1108 1003 0907 0498 1494 2572 .2438 2700 1890 .1966 2306 2177 2681 2652 2613 2033 2090 0821 .0743 0672 0608 0550 2052 1931 1815 1703 1596 2384 2314 2225 2237 2565 2510 2450 2138 2176 2205 1336 2240 2240 0992 1082 1169 1254 1488 1557 1622 1680 1008 0417 0476 0146 0174 0044 0055 05:38 0602 0668 0735 0804 0872 0940 0206 0241 0278 0319 0362 0407 0455 0504 ,0068 0083 0099 0118 0139 0163 0188 0216 .0019 0025 0031 0038 0047 0057 0068 0081 0005 0007 0009 0011 0014 0018 0022 0027 8 0011 0015 0004 0003 0002 0002 0003 10 0001 0001 ,0001 11 0000 .0000 0000 12 0000 0000 0000 0004 0005 0006 0008 0000 0000 0001 0001 0001 0002 0002 0000 0000 0000 0000 0000 0000 0001 0 1 2 3 4 5 6 7 x 8 9 x 0 1 2 3 4 56799
998 Appendix B Tables TABLE 7 POISSON PROBABILITIES (Continued) * 3.1 3.2 3.4 3.5 3.6 3.7 3.8 3.9 4.0 0450 0408 0369 0344 0224 0202 0183 0302 0273 0247 1057 0984 0915 0850 1397 1304 1217 0789 0733 2165 2087 2008 1135 1929 1850 2186 2158 1465 2237 2226 2209 1771 1692 1615 1539 2125 2087 2046 1888 1912 1931 1944 1951 2001 1954 1734 1781 1823 1858 1954 5 1075 1140 1203 1264 1322 1377 1429 1477 1522 1563 0555 0662 0716 0771 0826 0881 0936 0989 1042 0246 0278 0312 0348 0385 0425 0551 0595 0466 0508 0215 0241 8 0095 0111 0129 0148 0169 0269 0298 9 0033 0040 0047 0056 0076 0089 0102 .0116 0132 10 0010 0013 0023 0028 0033 0039 0045 0053 0007 11 ,0003 0004 0011 0013 12 0001 0003 0003 0004 .0005 13 0000 0000 14 x 0 1 2 3 4 567 9 CHENIN 8090 012 1000 9100⁰ 3 1348 4 0005 11 0023 0027 12 0008 13 14 0001 0001 15 0000 0000 X 5.1 5.2 5.3 6000 1000 0002 0002 0000 0000 0001 .0002 0002 0000 0000 0000 0000 0000 0000 0000 0000 0000 0001 4.5 4.6 4.7 4.8 5.0 0 0166 0150 0136 0123 0082 0074 0067 1 0679 0630 0583 0540 0500 0462 0427 0395 0365 0337 0842 2 1393 1323 1254 1188 1125 -1063 -1005 0948 0894 3 1904 1852 1798 1743 1687 1631 1574 1517 1460 4 1951 1944 1933 1917 1898 1875 1849 1404 1820 1789 1755 1747 1753 1755 1398 1432 5 1600 1633 1662 1687 1708 1725 1738 6 1093 1143 1191 1237 1281 1323 1362 1462 7 0640 0686 0732 0778 0824 0869 0914 0959 1002 1044 8 0328 0360 0393 0428 0463 0500 0537 0575 .0614 0653 0150 0168 0188 0209 9 0232 0255 0280 0307 .0334 0363 10 .0061 0071 0081 0092 0132 0147 0164 0181 0032 0037 0056 0064 0073 0082 0022 0026 0030 0034 .0011 0013 .0008 0009 0003 0005 0003 0004 0001 0001 0002 5.6 5.7 5.8 5.9 6.0 0027 0025 0037 0033 0030 0207 0191 0176 0162 0580 0544 0509 0477 0149 0446 0892 1033 0985 0938 1472 1428 1383 1339 1100 6100 9000 0002 0003 0004 0005 1000 9900 .0061 0055 0050 0311 0287 0265 0793 0746 0701 0659 1239 1185 1293 1719 1681 1641 1600 1110 of 9000 F 0000 0000 0001 5.4 5.5 0045 0041 0244 0225 1610 0104 0118 0043 0049 0014 0016 0019 0007 0001 0002 0002 6000 A 1000 1010 0618 1133 1082 1558 1515 1000 1600 1000 9100⁰ 1000 6100 9000
Appendix B Tables TABLE 7 POISSON PROBABILITIES (Continued) A X 5.1 5.2 5.3 5.4 5.5 5.6 5.7 5.8 5.9 6.0 1753 1748 1740 1728 -1714 1697 1678 1656 1632 1606 1490 1515 1537 1555 1587 1594 1601 1605 1606 1086 1125 1163 1326 1353 1377 0962 0998 1033 0692 0392 0620 0654 0688 0386 0413 0334 0359 0173 .0082 0092 0190 0207 0225 .1571 1200 1234 1267 1298 0731 0771 0810 0849 0887 0925 0423 0454 0486 0519 0552 0586 0220 0241 0262 0285 .0309 0104 0116 0129 0143 0157 0045 0051 0058 0065 0073 0018 0021 0024 0028 0032 0007 0008 .0009 0002 0003 0003 0001 0001 0001 0000 0000 0000 12 0102 0113 0036 0041 0046 0200 0093 0039 13 0015 0006 0002 0001 0000 0052 14 0015 0017 .0019 0022 0011 .0013 0004 0005 0006 0007 0008 15. 0009 0001 .0002 0002 0000 0001 0001 0002 .0003 0003 0001 0001 0001 17 6.1 6.5 6.6 6.7 6.8 6.9 7.0 0022 0020 0009 .0015 0014 0098 0090 0012 0011 0010 0082 0076 0137 0070 0018 0017 0126 0116 0106 0364 0806 0765 0726 0064 0417 0390 0340 0318 .0296 0276 0258 0240 0223 0848 0688 0652 0617 0584 0552 0521 4 1294 1249 1205 1162 1118 1076 1034 0992 0952 0912 5 1579 1549 1519 1487 1454 1420 1385 1349 1314 1277 6 1605 1601 1586 1575 1562 1546 1529 1511 1490 7 1480 1486 1489 1490 8 1462 1472 1188 1215 1240 1263 1284 0858 0891 0923 0954 0985 1304 .1014 9 1595 1399 1418 1435 1450 1066 1099 1130 1160 0723 0757 0791 0825 10 0441 0469 0498 .0528 0558 .0588 0618 0649 0679 0710 11 0245 0265 0285 0307 0330 0353 0377 0401 0426 0452 12 0124 0137 0150 0164 0179 0194 0210 0227 0245 0264 13 0058 0065 0073 0081 0089 0098 0108 0119 0130 0142 14 0025 0029 0033 0037 0041 0046 0052 0058 0064 0012 0014 0016 0026 0029 0005 0005 0006 0011 .0013 0002 .0002 0001 0001 0000 0000 .0071 15 0010 0033 16 0004 0014 17 0001 0002 0018 0020 0023 0007 .0008 0010 0003 .0003 0004 0004 0005 0001 0001 .0001 0002 0002 0001 0001 0006 18 0002 0000 0001 0000 19 0000 0000 .0000 0000 0001 A X 7.1 7.2 7.3 7.4 7.5 7.6 7.7 7.8 7.9 8.0 0008 0007 0007 0059 0054 0049 0208 0194 0180 0438 .0006 0006 .0005 .0005 0004 .0004 .0003 0045 0041 .0038 0035 0032 0029 0027 0167 0156 0145 0134 0125 0116 0107 0413 0389 0366 0345 0324 0305 0286 0764 0729 0696 0663 0632 0602 0573 0492 0464 0836 0799 5 6 7 8 9 10 SOS HWN=S 11 16 M 0 1 2 3 0123 4 0874 999
1000 Appendix B Tables TABLE 7 POISSON PROBABILITIES (Continued) x 7.1 7.2 7.3 74 7.5 7.6 7.7 7.8 7.9 1204 1167 1130 1094 1057 1021 0951 1241 -1468 1445 1420 1394 1367 1339 1311 1282 1252 1486 1481 1474 1465 1454 1442 1428 1413 1351 1363 1373 1382 1388 1392 1096 1121 1144 1167 1187 1207 0770 0800 0829 0858 0887 0914 0558 0585 0613 0640 0941 0667 0695 0344 0366 0388 0411 0434 0457 0211 0227 0243 0260 0278 0113 0123 0134 0145 0157 0051 0057 0062 0075 0083 0041 0024 0026 0030 0010 0012 0005 0019 0008 0002 0002 0002 .0003 .0003 0003 0004 0002 5 6 7 1489 8 6 SHEDN S61K9 10. 11 12 13 0154 14 .0078 0037 0041 .0016 0019 0007 0008 18. 0003 0003 0004 15 17 1321 1337 1042 1070 0740 0478 0504 0531 0283 0303 0323 0168 0181 0095 0104 0046 0021 20 21 x SHEDH 2552 852 1000 9800 1100 1000 1000 6000 18 9610 0900 1000 9000 1000 1000 0000 1000 0000 0000 0000 0001 0000 0000 0000 0000 0000 0000 0000 0001 8.1 8.2 8.3 8.4 8.5 8.6 8.7 8.8 8.9 0 0003 0002 0002 0021 0019 1 0025 0012 2 0003 0002 0002 0023 0017 0016 0092 0086 .0079 0074 0068 0237 0222 0208 0195 0491 0466 0443 0420 0002 0002 0014 .0013 0063 .0058 0054 0183 0171 0160 0150 0398 0377 0357 0337 0100 0269 0252 0517 0050 3 4 0544 5 0882 0849 0816 0784 6 1191 1160 1128 1097 7 1378 1358 1338 1317 8 1395 9 1256 0607 0911 1171 1318 1392 1269 1318 1186 0970 10 1017 11 0749 12 0505 13 0315 1040 1063 -1084 1104 0776 0802 0828 0853 0878 0902 0530 0555 0579 0604 0629 0654 0354 0374 0395 0416 0438 0728 0334 0504 0182 0196 0210 0225 0324 15 0098 0107 0116 0126 0136 0147 01.58 1094 0109 16 0050 0055 0066 0072 0079 .0093 17 0024 0026 0029 0033 0058 0036 0040 0044 0048 0053 0017 0019 0021 18 0012 0014 0029 0015 0007 19 0005 0005 0008 0009 0010 0024 0026 0011 0012 0014 20 0002 0002 0002 0003 0003 0004 0004 0005 0005 21 0001 0001 0002 0002 0002 0002 0003 0001 0001 0000 0000 22 0000 0001 0001 .0001 0001 P 0240 8 1000 6900 1000 0033 0037 0013 0015 0017 0006 0006 0007 1000 9860 0752 0722 0692 0663 0635 1066 1034 1003 0972 0941 1294 1271 1247 1222 1388 1382 1375 1366 1356 1344 1332 1280 1290 1299 1306 1311 1315 1317 1123 1140 1157 1172 0925 0948 0679 0703 0459 0481 0256 0272 0289 0306 0182 1000 9800 8.0 0916 1221 1396 1395 1396 1224 1241 0967 0993 0722 0481 0296 0169 1000 6910 1000 2611" 0600 1010 0045 0021 6000 1000 9.0 0001 1100 9000 1000
Appendix B Tables 1001 TABLE 7 POISSON PROBABILITIES (Continued) 9.1 9.2 9.3 9.4 9.5 9.6 9.7 9.8 10 0001 0001 ,0001 .0001 0001 0001 0001 0000 1 0010 0009 0006 .0005 0005 0005 2 0046 0043 0027 0025 0023 .0008 0007 .0007 .0037 0034 0031 0029 0115 0107 .0100 .0093 0269 0254 .0040 0123 0302 0285 3 0140 0131 0087 0081 0076 4 0319 .0189 5 0240 0226 0213 0201 0418 0398 0682 0656 0581 0378 6 0881 0736 0631 0555 0530 0506 0483 0851 0822 .0793 0764 1091 1037 1010 1269 1251 1232 .1212 7 1145 1118 0460 0439 0709 0982 1191 1170 1148 1126 1274 .1263 1251 0955 0928 0901 8 1302 1286 1317 1315 1311 1306 1300 1293 1284 1198 1210 1251 1219 1031 1228 1235 1049 0799 0822 1137 1012 0776 0549 0572 0594 0752 0526 0342 1241 1245 1249 1250 1067 1083 .1098 1112 1125 0844 0888 0908 0928 0617 0640 0662 0419 0439 0459 0948 0729 0685 .0707 0361 0380 .0399 0479 0500 0521 .03.30 0347 0297 0313 0180 0192 0217 0208 0221 0235 .02.50 0265 .0281 0118 0127 0137 0147 0157 0168 17 .0063 0075 .0081 0088 0095 0103 18 0032 0035 .0039 0042 0046 0051 0055 0015 0017 .0019 0021 0023 0204 0111 .0119 0065 0128 .0071 0026 0028 0031 0034 0037 20 0007 0012 0019 0008 0003 0009 ,0010 0014 .0015 0017 .0004 0004 0005 0006 0006 0007 21 .0003 0008 22 0001 0002 0002 0002 0002 .0003 0003 0004 23 0000 0001 ,0001 0001 0002 24 0000 0000 0000 0000 0000 0000 0001 0001 11 12 13 14 15 16 17 18 19 0 0000 0000 0000 0000 0000 ,0000 0000 0000 0000 0000 0000 .0000 0000 0000 1 0002 0000 0000 2 0000 0000 0000 0000 0000 0002 ,0001 0000 0000 ,0001 0013 0006 0003 0010 0005 0002 0037 0087 0048 0026 0014 0007 0174 0104 .0060 0034 .0018 0304 0194 0120 0072 0042 0024 .0473 0324 0213 0135 .0083 0050 x 0 6 10 11 61234 14 56139 x 1660 3 4 5 6 7 6000 0100 6900 1000 1901" 1000 1000 0000 1000 1000 1000 1100 0004 0002 0001 20 0000 0000 0004 0002 0000 0018 .0008 0004 0037 0102 0000 0000 0000 0000 0053 0027 0224 0127 0070 0001 0002 0411 0255 0152 0646 0437 0004 .0010 0005 8 0281 0457 .0661 0888 0655 1085 0874 0013 9 0029 0150 .0095 0058 .0245 0164 0355 10 1194 1048 0859 .0663 0486 0341 0230 11 1194 1144 .1015 0844 0663 .0496 12 1094 1144 .1099 .0984 0829 13 0926 1056 .1099 1060 0956 14 0728 0905 1021 1060 1024 0504 .0368 0259 0176 0814 0658 0509 0378 0271 0930 0800 0655 0514 0387 1000 71 6100 9980 μ 1000 1990 0900 1000 9.9 1000 6000 1000 9010⁰
1002 Appendix B Tables TABLE 7 POISSON PROBABILITIES (Continued) x 11 12 13 14 15 16 17 18 19 0885 0989 1024 0992 .0906 0786 .0650 0719 .0866 0884 0772 15 0534 0724 16 .0367 0543 17 0237 0383 0550 .0713 18 .0145 0256 .0397 0554 19 0084 0161 0272 .0409 0863 .0960 .0992 .0963 0847 0934 .0963 0936 0706 0830 0557 .0699 .0909 0936 0911 0814 0887 0911 0046 0097 0177 0286 0418 0024 0055 0109 0191 0299 0012 0030 .0065 0121 0204 .0074 0133 0216 0043 0083 0144 0559 .0692 .0798 .0866 0426 0560 .0684 0783 0310 0433 .0560 0676 .0006 0016 .0003 0008 .0037 0020 0320 0438 0559 0226 0328 0442 24 0004 0010 0024 0050 0154 0237 0336 .0001 26 0000 0002 27 0000 0092 .0057 0101 .0164 .0246 .0005 .0013 0002 .0007 0016 0034 .0063 0109 0173 0000 0000 .0003 0070 .0117 .0009 .0019 0038 0004 0011 .0023 29 0000 .0000 0001 .0002 0044 .0077 30 .0000 0000 ,0000 0001 0002 .0013 0026 0049 .0003 0007 0015 .0030 0009 .0018 31 ,0000 0000 0000 .0000 32 0000 0000 .0000 .0000 33 .0000 0000 0000 0000 34 0000 0000 0000 .0000 0001 .0004 ,0000 0001 0002 0000 0000 0001 .0005 0010 0002 .0006 35 .0000 36 0000 37 0000 0000 ,0000 .0000 0000 0000 0000 ,0001 0003 ,0000 0000 0000 0000 0000 0001 .0002 0000 .0000 0000 0000 0000 0000 0001 0000 0000 0000 0000 0000 0000 0000 0000 .0000 0000 0000 0000 0000 0000 38 39 .0000 0000 0000 .0000 85233 38532 20 21 22 0000 1000 0000 1000 6700 1000 11 9000 1000 20 0516 .0646 0760 0844 0888 0888 .0846 0769 .0669 .0557 0446 .0343 0254 .0181 0125 .0083 0054 0034 .0020 0012 0007 0004 0002 0001 .0001