The Studentized range upper quantiles q(k, df; 0.10)
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df k-> 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20
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1 8.929 13.437 16.358 18.488 20.150 21.504 22.642 23.621 24.477 25.237 25.918 26.536 27.100 27.618 28.097 28.542 28.958 29.347 29.713
2 4.129 5.733 6.772 7.538 8.139 8.633 9.049 9.409 9.725 10.006 10.259 10.488 10.698 10.891 11.070 11.237 11.392 11.538 11.676
3 3.328 4.467 5.199 5.738 6.162 6.511 6.806 7.062 7.287 7.487 7.667 7.831 7.982 8.120 8.248 8.368 8.479 8.584 8.683
4 3.015 3.976 4.586 5.035 5.388 5.679 5.926 6.139 6.327 6.494 6.645 6.783 6.909 7.025 7.132 7.233 7.326 7.414 7.497
5 2.850 3.717 4.264 4.664 4.979 5.238 5.458 5.648 5.816 5.965 6.100 6.223 6.336 6.439 6.536 6.626 6.710 6.788 6.863
6 2.748 3.558 4.065 4.435 4.726 4.966 5.168 5.344 5.499 5.637 5.762 5.875 5.979 6.075 6.164 6.247 6.325 6.398 6.466
7 2.679 3.451 3.931 4.280 4.555 4.780 4.971 5.137 5.283 5.413 5.530 5.637 5.735 5.826 5.910 5.988 6.061 6.130 6.195
8 2.630 3.374 3.834 4.169 4.431 4.646 4.829 4.987 5.126 5.250 5.362 5.464 5.558 5.644 5.724 5.799 5.869 5.935 5.997
9 2.592 3.316 3.761 4.084 4.337 4.545 4.721 4.873 5.007 5.126 5.234 5.333 5.423 5.506 5.583 5.655 5.722 5.786 5.845
10 2.563 3.270 3.704 4.018 4.264 4.465 4.636 4.783 4.913 5.029 5.134 5.229 5.316 5.397 5.472 5.542 5.607 5.668 5.726
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11 2.540 3.234 3.658 3.965 4.205 4.401 4.567 4.711 4.838 4.951 5.053 5.145 5.231 5.309 5.382 5.450 5.514 5.573 5.630
12 2.521 3.204 3.621 3.921 4.156 4.349 4.511 4.652 4.776 4.886 4.986 5.076 5.160 5.236 5.308 5.374 5.436 5.495 5.550
13 2.504 3.179 3.589 3.885 4.116 4.304 4.464 4.602 4.724 4.832 4.930 5.019 5.100 5.175 5.245 5.310 5.371 5.429 5.483
14 2.491 3.158 3.563 3.854 4.081 4.267 4.424 4.560 4.679 4.786 4.882 4.969 5.050 5.124 5.192 5.256 5.316 5.372 5.426
15 2.479 3.140 3.540 3.828 4.052 4.235 4.390 4.524 4.641 4.746 4.841 4.927 5.006 5.079 5.146 5.209 5.268 5.324 5.376
16 2.469 3.124 3.520 3.804 4.026 4.207 4.360 4.492 4.608 4.712 4.805 4.890 4.968 5.040 5.106 5.169 5.227 5.282 5.333
17 2.460 3.110 3.503 3.784 4.003 4.182 4.334 4.464 4.579 4.681 4.774 4.857 4.934 5.005 5.071 5.133 5.190 5.244 5.295
18 2.452 3.098 3.487 3.766 3.984 4.161 4.310 4.440 4.553 4.654 4.746 4.829 4.905 4.975 5.040 5.101 5.158 5.211 5.262
19 2.445 3.087 3.474 3.751 3.966 4.142 4.290 4.418 4.530 4.630 4.721 4.803 4.878 4.948 5.012 5.072 5.129 5.182 5.232
20 2.439 3.077 3.462 3.736 3.950 4.124 4.271 4.398 4.510 4.609 4.699 4.780 4.855 4.923 4.987 5.047 5.103 5.155 5.205
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df k-> 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20
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21 2.433 3.069 3.451 3.724 3.936 4.109 4.255 4.380 4.491 4.590 4.678 4.759 4.833 4.901 4.965 5.024 5.079 5.131 5.180
22 2.428 3.061 3.441 3.712 3.923 4.095 4.239 4.364 4.474 4.572 4.660 4.740 4.814 4.882 4.944 5.003 5.058 5.109 5.158
23 2.424 3.054 3.432 3.701 3.911 4.082 4.226 4.350 4.459 4.556 4.644 4.723 4.796 4.863 4.926 4.984 5.038 5.089 5.138
24 2.420 3.047 3.423 3.692 3.900 4.070 4.213 4.336 4.445 4.541 4.628 4.707 4.780 4.847 4.909 4.966 5.020 5.071 5.119
25 2.416 3.041 3.416 3.683 3.890 4.059 4.201 4.324 4.432 4.528 4.614 4.693 4.765 4.831 4.893 4.950 5.004 5.055 5.102
26 2.412 3.036 3.409 3.675 3.881 4.049 4.191 4.313 4.420 4.515 4.601 4.680 4.751 4.817 4.878 4.936 4.989 5.039 5.086
27 2.409 3.030 3.402 3.667 3.873 4.040 4.181 4.302 4.409 4.504 4.590 4.667 4.739 4.804 4.865 4.922 4.975 5.025 5.072
28 2.406 3.026 3.396 3.660 3.865 4.032 4.172 4.293 4.399 4.493 4.579 4.656 4.727 4.792 4.853 4.909 4.962 5.012 5.058
29 2.403 3.021 3.391 3.654 3.858 4.024 4.163 4.284 4.389 4.484 4.568 4.645 4.716 4.781 4.841 4.897 4.950 4.999 5.046
30 2.400 3.017 3.386 3.648 3.851 4.016 4.155 4.275 4.381 4.474 4.559 4.635 4.706 4.770 4.830 4.886 4.939 4.988 5.034
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31 2.398 3.013 3.381 3.642 3.845 4.009 4.148 4.268 4.372 4.466 4.550 4.626 4.696 4.760 4.820 4.876 4.928 4.977 5.023
32 2.396 3.010 3.376 3.637 3.839 4.003 4.141 4.260 4.365 4.458 4.541 4.617 4.687 4.751 4.811 4.866 4.918 4.967 5.013
33 2.393 3.006 3.372 3.632 3.833 3.997 4.135 4.253 4.357 4.450 4.533 4.609 4.679 4.743 4.802 4.857 4.909 4.957 5.003
34 2.391 3.003 3.368 3.627 3.828 3.991 4.129 4.247 4.351 4.443 4.526 4.602 4.671 4.734 4.794 4.849 4.900 4.949 4.994
35 2.389 3.000 3.364 3.623 3.823 3.986 4.123 4.241 4.344 4.436 4.519 4.594 4.663 4.727 4.786 4.841 4.892 4.940 4.986
36 2.388 2.998 3.361 3.619 3.819 3.981 4.117 4.235 4.338 4.430 4.512 4.588 4.656 4.720 4.778 4.833 4.884 4.932 4.978
37 2.386 2.995 3.357 3.615 3.814 3.976 4.112 4.230 4.332 4.424 4.506 4.581 4.650 4.713 4.771 4.826 4.877 4.925 4.970
38 2.384 2.992 3.354 3.611 3.810 3.972 4.107 4.224 4.327 4.418 4.500 4.575 4.643 4.706 4.765 4.819 4.870 4.918 4.963
39 2.383 2.990 3.351 3.608 3.806 3.967 4.103 4.220 4.322 4.413 4.495 4.569 4.637 4.700 4.758 4.812 4.863 4.911 4.956
40 2.381 2.988 3.348 3.605 3.802 3.963 4.099 4.215 4.317 4.408 4.490 4.564 4.632 4.694 4.752 4.806 4.857 4.904 4.949
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48 2.372 2.973 3.330 3.583 3.778 3.937 4.070 4.185 4.285 4.375 4.455 4.528 4.595 4.656 4.713 4.766 4.816 4.863 4.907
60 2.363 2.959 3.312 3.562 3.755 3.911 4.042 4.155 4.254 4.342 4.421 4.493 4.558 4.619 4.675 4.727 4.775 4.821 4.864
80 2.353 2.945 3.294 3.541 3.731 3.885 4.014 4.125 4.223 4.309 4.387 4.457 4.521 4.581 4.636 4.687 4.735 4.780 4.822
120 2.344 2.930 3.276 3.520 3.707 3.859 3.986 4.096 4.191 4.276 4.353 4.422 4.485 4.543 4.597 4.647 4.694 4.738 4.779
240 2.335 2.916 3.258 3.499 3.684 3.834 3.959 4.066 4.160 4.244 4.319 4.386 4.448 4.505 4.558 4.607 4.653 4.696 4.737
Inf 2.326 2.902 3.240 3.478 3.661 3.808 3.931 4.037 4.129 4.211 4.285 4.351 4.412 4.468 4.519 4.568 4.612 4.654 4.694
 Pro Tukeyovu metodu (přednáška č.9) odpovídá značení:   );,(,1  dfkqrnrq 
The Studentized range upper quantiles q(k, df; 0.05)
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df k-> 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20
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1 17.969 26.976 32.819 37.082 40.408 43.119 45.397 47.357 49.071 50.592 51.957 53.194 54.323 55.361 56.320 57.212 58.044 58.824 59.558
2 6.085 8.331 9.798 10.881 11.734 12.435 13.027 13.539 13.988 14.389 14.749 15.076 15.375 15.650 15.905 16.143 16.365 16.573 16.769
3 4.501 5.910 6.825 7.502 8.037 8.478 8.852 9.177 9.462 9.717 9.946 10.155 10.346 10.522 10.686 10.838 10.980 11.114 11.240
4 3.926 5.040 5.757 6.287 6.706 7.053 7.347 7.602 7.826 8.027 8.208 8.373 8.524 8.664 8.793 8.914 9.027 9.133 9.233
5 3.635 4.602 5.218 5.673 6.033 6.330 6.582 6.801 6.995 7.167 7.323 7.466 7.596 7.716 7.828 7.932 8.030 8.122 8.208
6 3.460 4.339 4.896 5.305 5.628 5.895 6.122 6.319 6.493 6.649 6.789 6.917 7.034 7.143 7.244 7.338 7.426 7.508 7.586
7 3.344 4.165 4.681 5.060 5.359 5.606 5.815 5.997 6.158 6.302 6.431 6.550 6.658 6.759 6.852 6.939 7.020 7.097 7.169
8 3.261 4.041 4.529 4.886 5.167 5.399 5.596 5.767 5.918 6.053 6.175 6.287 6.389 6.483 6.571 6.653 6.729 6.801 6.869
9 3.199 3.948 4.415 4.755 5.024 5.244 5.432 5.595 5.738 5.867 5.983 6.089 6.186 6.276 6.359 6.437 6.510 6.579 6.643
10 3.151 3.877 4.327 4.654 4.912 5.124 5.304 5.460 5.598 5.722 5.833 5.935 6.028 6.114 6.194 6.269 6.339 6.405 6.467
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11 3.113 3.820 4.256 4.574 4.823 5.028 5.202 5.353 5.486 5.605 5.713 5.811 5.901 5.984 6.062 6.134 6.202 6.265 6.325
12 3.081 3.773 4.199 4.508 4.750 4.950 5.119 5.265 5.395 5.510 5.615 5.710 5.797 5.878 5.953 6.023 6.089 6.151 6.209
13 3.055 3.734 4.151 4.453 4.690 4.884 5.049 5.192 5.318 5.431 5.533 5.625 5.711 5.789 5.862 5.931 5.995 6.055 6.112
14 3.033 3.701 4.111 4.407 4.639 4.829 4.990 5.130 5.253 5.364 5.463 5.554 5.637 5.714 5.785 5.852 5.915 5.973 6.029
15 3.014 3.673 4.076 4.367 4.595 4.782 4.940 5.077 5.198 5.306 5.403 5.492 5.574 5.649 5.719 5.785 5.846 5.904 5.958
16 2.998 3.649 4.046 4.333 4.557 4.741 4.896 5.031 5.150 5.256 5.352 5.439 5.519 5.593 5.662 5.726 5.786 5.843 5.896
17 2.984 3.628 4.020 4.303 4.524 4.705 4.858 4.991 5.108 5.212 5.306 5.392 5.471 5.544 5.612 5.675 5.734 5.790 5.842
18 2.971 3.609 3.997 4.276 4.494 4.673 4.824 4.955 5.071 5.173 5.266 5.351 5.429 5.501 5.567 5.629 5.688 5.743 5.794
19 2.960 3.593 3.977 4.253 4.468 4.645 4.794 4.924 5.037 5.139 5.231 5.314 5.391 5.462 5.528 5.589 5.647 5.701 5.752
20 2.950 3.578 3.958 4.232 4.445 4.620 4.768 4.895 5.008 5.108 5.199 5.282 5.357 5.427 5.492 5.553 5.610 5.663 5.714
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df k-> 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20
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21 2.941 3.565 3.942 4.213 4.424 4.597 4.743 4.870 4.981 5.081 5.170 5.252 5.327 5.396 5.460 5.520 5.576 5.629 5.679
22 2.933 3.553 3.927 4.196 4.405 4.577 4.722 4.847 4.957 5.056 5.144 5.225 5.299 5.368 5.431 5.491 5.546 5.599 5.648
23 2.926 3.542 3.914 4.180 4.388 4.558 4.702 4.826 4.935 5.033 5.121 5.201 5.274 5.342 5.405 5.464 5.519 5.571 5.620
24 2.919 3.532 3.901 4.166 4.373 4.541 4.684 4.807 4.915 5.012 5.099 5.179 5.251 5.319 5.381 5.439 5.494 5.545 5.594
25 2.913 3.523 3.890 4.153 4.358 4.526 4.667 4.789 4.897 4.993 5.079 5.158 5.230 5.297 5.359 5.417 5.471 5.522 5.570
26 2.907 3.514 3.880 4.141 4.345 4.511 4.652 4.773 4.880 4.975 5.061 5.139 5.211 5.277 5.339 5.396 5.450 5.500 5.548
27 2.902 3.506 3.870 4.130 4.333 4.498 4.638 4.758 4.864 4.959 5.044 5.122 5.193 5.259 5.320 5.377 5.430 5.480 5.528
28 2.897 3.499 3.861 4.120 4.322 4.486 4.625 4.745 4.850 4.944 5.029 5.106 5.177 5.242 5.302 5.359 5.412 5.462 5.509
29 2.892 3.493 3.853 4.111 4.311 4.475 4.613 4.732 4.837 4.930 5.014 5.091 5.161 5.226 5.286 5.342 5.395 5.445 5.491
30 2.888 3.486 3.845 4.102 4.301 4.464 4.601 4.720 4.824 4.917 5.001 5.077 5.147 5.211 5.271 5.327 5.379 5.429 5.475
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31 2.884 3.481 3.838 4.094 4.292 4.454 4.591 4.709 4.812 4.905 4.988 5.064 5.134 5.198 5.257 5.313 5.365 5.414 5.460
32 2.881 3.475 3.832 4.086 4.284 4.445 4.581 4.698 4.802 4.894 4.976 5.052 5.121 5.185 5.244 5.299 5.351 5.400 5.445
33 2.877 3.470 3.825 4.079 4.276 4.436 4.572 4.689 4.791 4.883 4.965 5.040 5.109 5.173 5.232 5.287 5.338 5.386 5.432
34 2.874 3.465 3.820 4.072 4.268 4.428 4.563 4.680 4.782 4.873 4.955 5.030 5.098 5.161 5.220 5.275 5.326 5.374 5.420
35 2.871 3.461 3.814 4.066 4.261 4.421 4.555 4.671 4.773 4.863 4.945 5.020 5.088 5.151 5.209 5.264 5.315 5.362 5.408
36 2.868 3.457 3.809 4.060 4.255 4.414 4.547 4.663 4.764 4.855 4.936 5.010 5.078 5.141 5.199 5.253 5.304 5.352 5.397
37 2.865 3.453 3.804 4.054 4.249 4.407 4.540 4.655 4.756 4.846 4.927 5.001 5.069 5.131 5.189 5.243 5.294 5.341 5.386
38 2.863 3.449 3.799 4.049 4.243 4.400 4.533 4.648 4.749 4.838 4.919 4.993 5.060 5.122 5.180 5.234 5.284 5.331 5.376
39 2.861 3.445 3.795 4.044 4.237 4.394 4.527 4.641 4.741 4.831 4.911 4.985 5.052 5.114 5.171 5.225 5.275 5.322 5.367
40 2.858 3.442 3.791 4.039 4.232 4.388 4.521 4.634 4.735 4.824 4.904 4.977 5.044 5.106 5.163 5.216 5.266 5.313 5.358
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48 2.843 3.420 3.764 4.008 4.197 4.351 4.481 4.592 4.690 4.777 4.856 4.927 4.993 5.053 5.109 5.161 5.210 5.256 5.299
60 2.829 3.399 3.737 3.977 4.163 4.314 4.441 4.550 4.646 4.732 4.808 4.878 4.942 5.001 5.056 5.107 5.154 5.199 5.241
80 2.814 3.377 3.711 3.947 4.129 4.277 4.402 4.509 4.603 4.686 4.761 4.829 4.892 4.949 5.003 5.052 5.099 5.142 5.183
120 2.800 3.356 3.685 3.917 4.096 4.241 4.363 4.468 4.560 4.641 4.714 4.781 4.842 4.898 4.950 4.998 5.043 5.086 5.126
240 2.786 3.335 3.659 3.887 4.063 4.205 4.324 4.427 4.517 4.596 4.668 4.733 4.792 4.847 4.897 4.944 4.988 5.030 5.069
Inf 2.772 3.314 3.633 3.858 4.030 4.170 4.286 4.387 4.474 4.552 4.622 4.685 4.743 4.796 4.845 4.891 4.934 4.974 5.012
 Pro Tukeyovu metodu (přednáška č.9) odpovídá značení:   );,(,1  dfkqrnrq 
The Studentized range upper quantiles q(k, df; 0.01)
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df k-> 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20
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1 90.024 135.04 164.25 185.57 202.21 215.77 227.17 236.97 245.54 253.15 259.98 266.16 271.81 277.00 281.80 286.26 290.43 294.33 297.99
2 14.036 19.019 22.294 24.717 26.629 28.201 29.530 30.679 31.689 32.589 33.398 34.134 34.806 35.426 36.000 36.534 37.034 37.502 37.943
3 8.260 10.619 12.170 13.324 14.241 14.998 15.641 16.199 16.691 17.130 17.526 17.887 18.217 18.522 18.805 19.068 19.315 19.546 19.765
4 6.511 8.120 9.173 9.958 10.583 11.101 11.542 11.925 12.264 12.567 12.840 13.090 13.318 13.530 13.726 13.909 14.081 14.242 14.394
5 5.702 6.976 7.804 8.421 8.913 9.321 9.669 9.971 10.239 10.479 10.696 10.894 11.076 11.244 11.400 11.545 11.682 11.811 11.932
6 5.243 6.331 7.033 7.556 7.972 8.318 8.612 8.869 9.097 9.300 9.485 9.653 9.808 9.951 10.084 10.208 10.325 10.434 10.538
7 4.949 5.919 6.542 7.005 7.373 7.678 7.939 8.166 8.367 8.548 8.711 8.860 8.997 9.124 9.242 9.353 9.456 9.553 9.645
8 4.745 5.635 6.204 6.625 6.959 7.237 7.474 7.680 7.863 8.027 8.176 8.311 8.436 8.552 8.659 8.760 8.854 8.943 9.027
9 4.596 5.428 5.957 6.347 6.657 6.915 7.134 7.325 7.494 7.646 7.784 7.910 8.025 8.132 8.232 8.325 8.412 8.495 8.573
10 4.482 5.270 5.769 6.136 6.428 6.669 6.875 7.054 7.213 7.356 7.485 7.603 7.712 7.812 7.906 7.993 8.075 8.153 8.226
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11 4.392 5.146 5.621 5.970 6.247 6.476 6.671 6.841 6.992 7.127 7.250 7.362 7.464 7.560 7.648 7.731 7.809 7.883 7.952
12 4.320 5.046 5.502 5.836 6.101 6.320 6.507 6.670 6.814 6.943 7.060 7.166 7.265 7.356 7.441 7.520 7.594 7.664 7.730
13 4.260 4.964 5.404 5.726 5.981 6.192 6.372 6.528 6.666 6.791 6.903 7.006 7.100 7.188 7.269 7.345 7.417 7.484 7.548
14 4.210 4.895 5.322 5.634 5.881 6.085 6.258 6.409 6.543 6.663 6.772 6.871 6.962 7.047 7.125 7.199 7.268 7.333 7.394
15 4.167 4.836 5.252 5.556 5.796 5.994 6.162 6.309 6.438 6.555 6.660 6.756 6.845 6.927 7.003 7.074 7.141 7.204 7.264
16 4.131 4.786 5.192 5.489 5.722 5.915 6.079 6.222 6.348 6.461 6.564 6.658 6.744 6.823 6.897 6.967 7.032 7.093 7.151
17 4.099 4.742 5.140 5.430 5.659 5.847 6.007 6.147 6.270 6.380 6.480 6.572 6.656 6.733 6.806 6.873 6.937 6.997 7.053
18 4.071 4.703 5.094 5.379 5.603 5.787 5.944 6.081 6.201 6.309 6.407 6.496 6.579 6.655 6.725 6.791 6.854 6.912 6.967
19 4.046 4.669 5.054 5.334 5.553 5.735 5.889 6.022 6.141 6.246 6.342 6.430 6.510 6.585 6.654 6.719 6.780 6.837 6.891
20 4.024 4.639 5.018 5.293 5.510 5.688 5.839 5.970 6.086 6.190 6.285 6.370 6.449 6.523 6.591 6.654 6.714 6.770 6.823
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df k-> 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20
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21 4.004 4.612 4.986 5.257 5.470 5.646 5.794 5.924 6.038 6.140 6.233 6.317 6.395 6.467 6.534 6.596 6.655 6.710 6.762
22 3.986 4.588 4.957 5.225 5.435 5.608 5.754 5.882 5.994 6.095 6.186 6.269 6.346 6.417 6.482 6.544 6.602 6.656 6.707
23 3.970 4.566 4.931 5.195 5.403 5.573 5.718 5.844 5.955 6.054 6.144 6.226 6.301 6.371 6.436 6.497 6.553 6.607 6.658
24 3.955 4.546 4.907 5.168 5.373 5.542 5.685 5.809 5.919 6.017 6.105 6.186 6.261 6.330 6.394 6.453 6.510 6.562 6.612
25 3.942 4.527 4.885 5.144 5.347 5.513 5.655 5.778 5.886 5.983 6.070 6.150 6.224 6.292 6.355 6.414 6.469 6.522 6.571
26 3.930 4.510 4.865 5.121 5.322 5.487 5.627 5.749 5.856 5.951 6.038 6.117 6.190 6.257 6.319 6.378 6.432 6.484 6.533
27 3.918 4.495 4.847 5.101 5.300 5.463 5.602 5.722 5.828 5.923 6.008 6.087 6.158 6.225 6.287 6.344 6.399 6.450 6.498
28 3.908 4.481 4.830 5.082 5.279 5.441 5.578 5.697 5.802 5.896 5.981 6.058 6.129 6.195 6.256 6.314 6.367 6.418 6.465
29 3.898 4.467 4.814 5.064 5.260 5.420 5.556 5.674 5.778 5.871 5.955 6.032 6.103 6.168 6.228 6.285 6.338 6.388 6.435
30 3.889 4.455 4.799 5.048 5.242 5.401 5.536 5.653 5.756 5.848 5.932 6.008 6.078 6.142 6.202 6.258 6.311 6.361 6.407
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31 3.881 4.443 4.786 5.032 5.225 5.383 5.517 5.633 5.736 5.827 5.910 5.985 6.055 6.119 6.178 6.234 6.286 6.335 6.381
32 3.873 4.433 4.773 5.018 5.210 5.367 5.500 5.615 5.716 5.807 5.889 5.964 6.033 6.096 6.155 6.211 6.262 6.311 6.357
33 3.865 4.423 4.761 5.005 5.195 5.351 5.483 5.598 5.698 5.789 5.870 5.944 6.013 6.076 6.134 6.189 6.240 6.289 6.334
34 3.859 4.413 4.750 4.992 5.181 5.336 5.468 5.581 5.682 5.771 5.852 5.926 5.994 6.056 6.114 6.169 6.220 6.268 6.313
35 3.852 4.404 4.739 4.980 5.169 5.323 5.453 5.566 5.666 5.755 5.835 5.908 5.976 6.038 6.096 6.150 6.200 6.248 6.293
36 3.846 4.396 4.729 4.969 5.156 5.310 5.439 5.552 5.651 5.739 5.819 5.892 5.959 6.021 6.078 6.132 6.182 6.229 6.274
37 3.840 4.388 4.720 4.959 5.145 5.298 5.427 5.538 5.637 5.725 5.804 5.876 5.943 6.004 6.061 6.115 6.165 6.212 6.256
38 3.835 4.381 4.711 4.949 5.134 5.286 5.414 5.526 5.623 5.711 5.790 5.862 5.928 5.989 6.046 6.099 6.148 6.195 6.239
39 3.830 4.374 4.703 4.940 5.124 5.275 5.403 5.513 5.611 5.698 5.776 5.848 5.914 5.974 6.031 6.084 6.133 6.179 6.223
40 3.825 4.367 4.695 4.931 5.114 5.265 5.392 5.502 5.599 5.685 5.764 5.835 5.900 5.961 6.017 6.069 6.118 6.165 6.208
------------------------------------------------------------------------------------------------------------------------------------------
48 3.793 4.324 4.644 4.874 5.052 5.198 5.322 5.428 5.522 5.606 5.681 5.750 5.814 5.872 5.926 5.977 6.024 6.069 6.111
60 3.762 4.282 4.594 4.818 4.991 5.133 5.253 5.356 5.447 5.528 5.601 5.667 5.728 5.784 5.837 5.886 5.931 5.974 6.015
80 3.732 4.241 4.545 4.763 4.931 5.069 5.185 5.284 5.372 5.451 5.521 5.585 5.644 5.698 5.749 5.796 5.840 5.881 5.920
120 3.702 4.200 4.497 4.709 4.872 5.005 5.118 5.214 5.299 5.375 5.443 5.505 5.561 5.614 5.662 5.708 5.750 5.790 5.827
240 3.672 4.160 4.450 4.655 4.814 4.943 5.052 5.145 5.227 5.300 5.366 5.426 5.480 5.530 5.577 5.621 5.661 5.699 5.735
Inf 3.643 4.120 4.403 4.603 4.757 4.882 4.987 5.078 5.157 5.227 5.290 5.348 5.400 5.448 5.493 5.535 5.574 5.611 5.645
------------------------------------------------------------------------------------------------------------------------------------------
 Pro Tukeyovu metodu (přednáška č.9) odpovídá značení:   );,(,1  dfkqrnrq 
 Zdroj: http://cse.niaes.affrc.go.jp/miwa/probcalc/s-range/srng_tbl.html
Kritické hodnoty Dn(α) Kolmogorovova-Smirnovova testu n= 4,…,40, α=0,01, α=0,05, α=0,10, α=0,15 a α=0,20.
alfa
n 0,20 0,15 0,10 0,05 0,01
4 0,4927 0,5221 0,5652 0,6239 0,7342
5 0,4470 0,4754 0,5095 0,5633 0,6685
6 0,4104 0,4334 0,4680 0,5193 0,6166
7 0,3815 0,4043 0,4361 0,4834 0,5758
8 0,3583 0,3801 0,4096 0,4543 0,5418
9 0,3391 0,3591 0,3875 0,4300 0,5133
10 0,3226 0,3416 0,3687 0,4093 0,4889
11 0,3083 0,3266 0,3524 0,3912 0,4677
12 0,2958 0,3134 0,3382 0,3754 0,4491
13 0,2847 0,3016 0,3255 0,3614 0,4325
14 0,2748 0,2911 0,3142 0,3489 0,4176
15 0,2659 0,2816 0,3040 0,3376 0,4042
16 0,2578 0,2731 0,2947 0,3273 0,3920
17 0,2504 0,2652 0,2863 0,3180 0,3809
18 0,2436 0,2580 0,2785 0,3094 0,3706
19 0,2374 0,2514 0,2714 0,3014 0,3612
20 0,2316 0,2452 0,2647 0,2941 0,3524
21 0,2263 0,2403 0,2587 0,2873 0,3443
22 0,2213 0,2350 0,2529 0,2809 0,3367
23 0,2166 0,2300 0,2475 0,2749 0,3296
24 0,2122 0,2253 0,2425 0,2693 0,3229
25 0,2080 0,2209 0,2377 0,2641 0,3166
26 0,2041 0,2167 0,2333 0,2591 0,3106
27 0,2004 0,2128 0,2290 0,2544 0,3050
28 0,1969 0,2090 0,2250 0,2500 0,2997
29 0,1936 0,2055 0,2212 0,2457 0,2947
30 0,1904 0,2022 0,2176 0,2417 0,2899
31 0,1874 0,1990 0,2142 0,2379 0,2853
32 0,1845 0,1959 0,2109 0,2343 0,2809
33 0,1818 0,1930 0,2078 0,2308 0,2768
34 0,1792 0,1902 0,2048 0,2275 0,2728
35 0,1767 0,1875 0,2019 0,2243 0,2690
36 0,1743 0,1850 0,1991 0,2212 0,2653
37 0,1719 0,1825 0,1965 0,2183 0,2618
38 0,1697 0,1802 0,1940 0,2155 0,2584
39 0,1676 0,1779 0,1915 0,2127 0,2552
40 0,1655 0,1757 0,1892 0,2101 0,2521
Pro n>40 lze Dn(α) aproximovat pomocí

2
ln
n2
1
Zdroj: kstest v MATLABu.
Modifikované kritické hodnoty Dn
*
(α) Kolmogorovova-Smirnovova testu n= 4,…,40, α=0,01, α=0,05, α=0,10, α=0,15 a α=0,20.
alfa
n 0,20 0,15 0,10 0,05 0,01
4 0,3028 0,3213 0,3453 0,3754 0,4131
5 0,2893 0,3026 0,3189 0,3431 0,3966
6 0,2688 0,2810 0,2973 0,3236 0,3703
7 0,2523 0,2643 0,2802 0,3041 0,3506
8 0,2387 0,2502 0,2651 0,2880 0,3326
9 0,2271 0,2379 0,2520 0,2740 0,3171
10 0,2171 0,2274 0,2410 0,2620 0,3034
11 0,2082 0,2181 0,2312 0,2515 0,2915
12 0,2002 0,2098 0,2224 0,2418 0,2808
13 0,1932 0,2025 0,2145 0,2333 0,2706
14 0,1868 0,1958 0,2075 0,2257 0,2619
15 0,1811 0,1898 0,2012 0,2189 0,2539
16 0,1759 0,1843 0,1953 0,2126 0,2472
17 0,1711 0,1792 0,1900 0,2068 0,2403
18 0,1666 0,1746 0,1850 0,2013 0,2341
19 0,1625 0,1703 0,1806 0,1965 0,2285
20 0,1587 0,1663 0,1763 0,1920 0,2232
21 0,1551 0,1626 0,1723 0,1877 0,2183
22 0,1518 0,1591 0,1687 0,1837 0,2137
23 0,1487 0,1558 0,1652 0,1799 0,2093
24 0,1458 0,1528 0,1619 0,1764 0,2052
25 0,1430 0,1499 0,1589 0,1730 0,2014
26 0,1404 0,1471 0,1560 0,1699 0,1977
27 0,1379 0,1445 0,1532 0,1669 0,1943
28 0,1356 0,1421 0,1506 0,1641 0,1910
29 0,1334 0,1398 0,1482 0,1614 0,1879
30 0,1312 0,1375 0,1458 0,1588 0,1849
31 0,1292 0,1354 0,1436 0,1564 0,1821
32 0,1273 0,1334 0,1414 0,1541 0,1794
33 0,1255 0,1315 0,1394 0,1518 0,1768
34 0,1237 0,1296 0,1374 0,1497 0,1743
35 0,1220 0,1279 0,1356 0,1476 0,1720
36 0,1204 0,1262 0,1338 0,1457 0,1697
37 0,1188 0,1245 0,1320 0,1438 0,1675
38 0,1173 0,1230 0,1304 0,1420 0,1654
39 0,1159 0,1214 0,1288 0,1402 0,1634
40 0,1145 0,1200 0,1272 0,1385 0,1614
>40
0,741
fN
0,775
fN
0,819
fN
0,895
fN
1,035
fN
Pro n>40 lze Dn
*
(α) aproximovat pomocí posledního řádku tabulky, kde 01,0
83,0



n
n
fN .
Zdroj: http://www.utdallas.edu/~herve/Abdi-Lillie2007-pretty.pdf +lillietest v MATLABu.
Koeficienty
 n
ia pro Shapiro – Wilkův test:
n 2 3 4 5 6 7 8 9 10
i 
1 0.7071 0.7071 0.6872 0.6646 0.6431 0.6233 0.6052 0.5888 0.5739
2 0.0000 0.1677 0.2413 0.2806 0.3031 0.3164 0.3244 0.3291
3 0.0000 0.0875 0.1401 0.1743 0.1976 0.2141
4 0.0000 0.0561 0.0947 0.1224
5 0.0000 0.0399
n 11 12 13 14 15 16 17 18 19 20
i 
1 0.5601 0.5475 0.5359 0.5251 0.5150 0.5056 0.4963 0.4886 0.4808 0.4734
2 0.3315 0.3325 0.3325 0.3318 0.3306 0.3290 0.3273 0.3253 0.3232 0.3211
3 0.2260 0.2347 0.2412 0.2460 0.2495 0.2521 0.2540 0.2553 0.2561 0.2565
4 0.1429 0.1586 0.1707 0.1802 0.1878 0.1939 0.1988 0.2027 0.2059 0.2085
5 0.0695 0.0922 0.1099 0.1240 0.1353 0.1447 0.1524 0.1587 0.1641 0.1686
6 0.0000 0.0303 0.0539 0.0727 0.0880 0.1005 0.1109 0.1197 0.1271 0.1334
7 0.0000 0.0240 0.0433 0.0593 0.0725 0.0837 0.0932 0.1013
8 0.0000 0.0196 0.0359 0.0496 0.0612 0.0711
9 0.0000 0.0163 0.0303 0.0422
10 0.0000 0.0140
n 21 22 23 24 25 26 27 28 29 30
i 
1 0.4643 0.4590 0.4542 0.4493 0.4450 0.4407 0.4366 0.4328 0.4291 0.4254
2 0.3185 0.3156 0.3126 0.3098 0.3069 0.3043 0.3018 0.2992 0.2968 0.2944
3 0.2578 0.2571 0.2563 0.2554 0.2543 0.2533 0.2522 0.2510 0.2499 0.2487
4 0.2119 0.2131 0.2139 0.2145 0.2148 0.2151 0.2152 0.2151 0.2150 0.2148
5 0.1736 0.1764 0.1787 0.1807 0.1822 0.1836 0.1848 0.1857 0.1064 0.1870
6 0.1399 0.1443 0.1480 0.1512 0.1539 0.1563 0.1584 0.1601 0.1616 0.1630
7 0.1092 0.1150 0.1201 0.1245 0.1283 0.1316 0.1346 0.1372 0.1395 0.1415
8 0.0804 0.0878 0.0941 0.0997 0.1046 0.1089 0.1128 0.1162 0.1192 0.1219
9 0.0530 0.0618 0.0696 0.0764 0.0823 0.0876 0.0923 0.0965 0.1002 0.1036
10 0.0263 0.0368 0.0459 0.0539 0.0610 0.0672 0.0728 0.0778 0.0822 0.0862
11 0.0000 0.0122 0.0228 0.0321 0.0403 0.0476 0.0540 0.0598 0.0650 0.0697
12 0.0000 0.0107 0.0200 0.0284 0.0358 0.0424 0.0483 0.0537
13 0.0000 0.0094 0.0178 0.0253 0.0320 0.0381
14 0.0000 0.0084 0.0159 0.0227
15 0.0000 0.0076
Zdroj: http://www.kmt.zcu.cz/person/Kohout/info_soubory/letnisem/ruzne/SWkoeficienty.pdf
http://www.santemaghreb.com/algerie/stat/stat_10.htm#28
Kritické hodnoty pro Shapiro – Wilkův test:
Zdroj: http://www.kmt.zcu.cz/person/Kohout/info_soubory/letnisem/ruzne/SWkrithodnoty.pdf
Kritické hodnoty znaménkového testu pro n = 6, 7, .., 20, α = 0,05 a α = 0,01
n α = 0,05 α = 0,01
k1 k2 k1 k2
6 0 6 - -
7 0 7 - -
8 0 8 0 8
9 1 8 0 9
10 1 9 0 10
11 1 10 0 11
12 2 10 1 11
13 2 11 1 12
14 2 12 1 13
15 3 12 2 13
16 3 13 2 14
17 4 13 2 15
18 4 14 3 15
19 4 15 3 16
20 5 15 3 17
Zdroj: Anděl, J.: Matematická statistika. (Tabulka XVIII.8).
Kritické hodnoty jednovýběrového Wilcoxonova testu pro n = 6, 7, .., 30, α = 0,05 a α = 0,01
n α = 0,05 α = 0,01
krit. hodnota krit. hodnota
6 0 -
7 2 -
8 3 0
9 5 1
10 8 3
11 10 5
12 13 7
13 17 9
14 21 12
15 25 15
16 29 19
17 34 23
18 40 27
19 46 32
20 52 37
21 58 42
22 65 48
23 73 54
24 81 61
25 89 68
26 98 75
27 107 83
28 116 91
29 126 100
30 137 109
Zdroj: Anděl, J.: Matematická statistika. (Tabulka XVIII.9).
Kritické hodnoty dvouvýběrového Wilcoxonova testu pro m = 1, 2, .., 30, n = 1, 2, …, 30, α = 0,05
n
m 1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20
1 -
2 - -
3 - - -
4 - - - 0
5 - - 0 1 2
6 - - 1 2 3 5
7 - - 1 3 5 6 8
8 - 0 2 4 6 8 10 13
9 - 0 2 4 7 10 12 15 17
10 - 0 3 5 8 11 14 17 20 23
11 -- 0 3 6 9 13 16 19 23 26 30
12 - 1 4 7 11 14 18 22 26 29 33 37
13 - 1 4 8 12 16 20 24 28 33 37 41 45
14 - 1 5 9 13 17 22 26 31 36 40 45 50 55
15 - 1 5 10 14 19 24 29 34 39 44 49 54 59 64
16 - 1 6 11 15 21 26 31 37 42 47 53 59 64 70 75
17 - 2 6 11 17 22 28 34 39 45 51 57 63 69 75 81 87
18 - 2 7 12 18 24 30 36 42 48 55 61 67 74 80 86 93 99
19 - 2 7 13 19 25 32 38 45 52 58 65 72 78 85 92 99 106 113
20 - 2 8 14 20 27 34 41 48 55 62 69 76 83 90 98 105 112 119 127
21 - 2 8 15 22 29 36 43 50 58 65 73 80 88 96 103 111 119 126 134
22 - 3 9 16 23 30 38 45 53 61 69 77 85 93 101 109 117 125 133 141
23 - 3 9 17 24 32 40 48 56 64 73 81 89 98 106 115 123 132 140 149
24 - 3 10 17 25 33 42 50 59 67 76 85 94 102 111 120 129 138 147 156
25 - 3 10 18 27 35 44 53 62 71 80 89 98 107 117 126 135 145 154 161
26 - 4 11 19 28 37 46 55 64 74 83 93 102 112 122 132 141 151 161 171
27 - 4 11 20 29 38 48 57 67 77 87 97 107 117 127 137 147 158 168 178
28 - 4 12 21 30 40 50 60 70 80 90 101 111 122 132 143 154 164 175 186
29 - 4 13 22 32 42 52 62 73 83 94 105 116 127 138 149 160 171 182 193
30 - 5 13 23 33 43 54 65 76 87 98 109 120 131 143 154 166 177 189 200
Zdroj: Anděl, J.: Matematická statistika. (Tabulka XVIII.10a).
Kritické hodnoty Neményiho metody, r = 3, 4, .., 10, n = 1, 2, …, 25, α = 0,05
r
n 3 4 5 6 7 8 9 10
1 3,3 4,7 6,1 7,5 9,0 10,5 12,0 13,5
2 8,8 12,6 16,5 20,5 24,7 28,9 33,1 37,4
3 15,7 22,7 29,9 37,3 44,8 52,5 60,3 68,2
4 23,9 34,6 45,6 57,0 68,6 80,4 92,4 104,6
5 33,1 48,1 63,5 79,3 95,5 112,0 128,8 145,8
6 43,3 62,9 83,2 104,0 125,3 147,0 169,1 191,4
7 54,4 79,1 104,6 130,8 157,6 184,9 212,8 240,9
8 66,3 96,4 127,6 159,6 192,4 225,7 259,7 294,1
9 75,9 114,8 152,0 190,2 229,3 269,1 309,6 350,6
10 92,3 134,3 177,8 222,6 268,4 315,0 362,4 410,5
11 106,3 154,8 205,0 256,6 309,4 363,2 417,9 473,3
12 120,9 176,2 233,4 292,2 352,4 413,6 476,0 539,1
13 136,2 198,5 263,0 329,3 397,1 466,2 536,5 607,7
14 152,1 221,7 293,8 367,8 443,6 520,8 599,4 679,0
15 168,6 245,7 325,7 407,8 491,9 577,4 664,6 752,8
16 185,6 270,6 358,6 449,1 541,7 635,9 732,0 829,2
17 203,1 296,2 392,6 491,7 593,1 696,3 801,5 907,9
18 221,2 322,6 427,6 535,5 646,1 758,5 873,1 989,0
19 239,8 349,7 463,6 580,6 700,5 822,4 946,7 1072,4
20 258,8 377,6 500,5 626,9 756,4 888,1 1022,3 1158,1
21 278,4 406,1 538,4 674,4 813,7 955,4 1099,8 1245,9
22 298,4 435,3 577,2 723,0 872,3 1024,3 1179,1 1335,7
23 318,9 465,2 616,9 772,7 932,4 1094,8 1260,3 1427,7
24 339,8 495,8 657,4 823,5 993,7 1166,8 1343,2 1521,7
25 361,1 527,0 698,8 875,4 1056,3 1240,4 1427,9 1611,6
Zdroj: Blatná, Dagmar: Neparametrické metody. Tabulka T21/1.
Kritické hodnoty pro Spearmanův koeficient pořadové korelace, n=5,..30, , α = 0,05 a , α = 0,01
alfa
n 0,05 0,01
5 0,900 1,000
6 0,829 0,943
7 0,714 0,893
8 0,643 0,833
9 0,600 0,783
10 0,564 0,745
11 0,536 0,709
12 0,503 0,671
13 0,484 0,648
14 0,464 0,622
15 0,443 0,604
16 0,429 0,582
17 0,414 0,566
18 0,401 0,550
19 0,391 0,535
20 0,380 0,520
21 0,370 0,508
22 0,361 0,496
23 0,353 0,486
24 0,344 0,476
25 0,337 0,466
26 0,331 0,457
27 0,324 0,448
28 0,317 0,440
29 0,312 0,433
30 0,306 0,425
Adapted from Zar, J. H. (1972). Significance testing of the Spearman rank correlation. Journal of the American Statistical Association. 67, 578 – 580.
Zdroj: http://www.ace.upm.edu.my/~bas/5950/Spearman%20Rho%20Table.pdf
Pro n > 20 lze použít testovou statistiku
2
S
S
0
r1
2nr
T


 , která se v případě platnosti nulové hypotézy asymptoticky řídí rozložením t(n-2).
Pro n > 30 lze použít testovou statistiku 1nrs  . Platí-li H0, pak 1nrs  ≈ N(0, 1).
alfa
n 0,05 0,01
5 1,000 *
6 0,886 1,000
7 0,786 0,929
8 0,738 0,881
9 0,700 0,833
10 0,648 0,794
11 0,618 0,755
12 0,587 0,727
13 0,560 0,703
14 0,538 0,675
15 0,521 0,654
16 0,503 0,635
17 0,485 0,615
18 0,472 0,600
19 0,460 0,584
20 0,447 0,570
21 0,435 0,556
22 0,425 0,544
23 0,415 0,532
24 0,406 0,521
25 0,398 0,511
26 0,390 0,501
27 0,382 0,491
28 0,375 0,483
29 0,368 0,475
30 0,362 0,467