390 Supplementary Tables for Tetrachoric Groupings 
Supplementary Tables for determining High 
r = -80. 
n = 
u 
'1 
'3 
'4 
'5 
'6 
"7 
'8 
'9 
1 '0 
1 1 
l % 
k = 0-0 
•3976 
•3766 
•3538 
•3294 
•3039 
■2778 
•2515 
•2254 
•2001 
•1759 
•1531 
•1320 
•1127 
o-i 
•3766 
•3583 
•3380 
•3162 
•2930 
•2689 
•2445 
•2200 
•I960 
•1728 
•1509 
•1304 
•1116 
0-2 
•3538 
•3380 
•3204 
•3011 
•2804 
•2586 
■2361 
■2134 
•1909 
•1690 
•1481 
•1284 
•1102 
OS 
•3294 
•3162 
•3011 
•2843 
•2661 
•2466 
■2263 
•2056 
•1848 
•1643 
•1446 
•1258 
•1083 
0-4 
•3039 
■2930 
•2804 
•2661 
•2503 
•2332 
•2152 
•1965 
•1775 
•1587 
•1402 
•1226 
•1060 
OS 
•2778 
•2689 
■2586 
•2466 
•2332 
•2186 
•2028 
•1862 
■1692 
■1520 
•1351 
•1187 
•1031 
0-6 
•2515 
•2445 
•2361 
•2263 
■2152 
•2028 
•1893 
•1748 
•1598 
•1444 
■1291 
•1140 
•0995 
0-7 
■2254 
•2200 
•2134 
•2056 
•1965 
•1862 
•1748 
•1625 
•1494 
•1359 
•1222 
•1086 
•0954 
0-8 
•2001 
•I960 
■1909 
•1848 
■1775 
•1692 
•1598 
•1494 
•1383 
•1266 
•1146 
•1025 
•0906 
09 
•1759 
•1728 
■1690 
•1643 
•1587 
•1520 
•1444 
•1359 
•1266 
■1167 
•1064 
•0958 
•0852 
1-0 
•1531 
•1509 
•1481 
•1446 
•1402 
■1351 
•1291 
•1222 
•1146 
•1064 
•0976 
•0886 
•0794 
1-1 
•1320 
•1304 
•1284 
•1258 
•1226 
■1187 
•1140 
■1086 
•1025 
■0958 
■0886 
•0809 
•0731 
1-2 
•1127 
•1116 
•1102 
■1083 
•1060 
•1031 
•0995 
■0954 
•0906 
•0852 
•0794 
•0731 
•0665 
IS 
•0953 
•0946 
•0936 
•0923 
•0906 
•0885 
•0859 
•0828 
•0791 
•0749 
•0702 
0652 
•0597 
1-4 
•0798 
•0793 
•0787 
•0778 
•0766 
•0751 
•0733 
■0710 
•0682 
•0650 
•0614 
•0574 
•0530 
1-5 
•0662 
•0659 
•0655 
•0649 
•0641 
•0631 
•0618 
•0601 
•0581 
•0557 
•0529 
•0498 
■0464 
1-6 
■0545 
•0543 
•0540 
■0536 
•0531 
•0524 
•0515 
•0503 
■0489 
•0471 
•0451 
•0427 
•0401 
1-7 
•0444 
•0443 
•0441 
•0438 
•0435 
•0430 
•0424 
■0416 
•0406 
•0394 
■0379 
•0362 
■0342 
1 • Q 
1 o 
• AO^Q 
UoOo 
• AO Fi f 7 
Uoo/ 
'0357 
•0355 
■0353 
"0350 
•0346 
•0341 
•0334 
•0325 
.AO 1 K 
0.3 Lo 
• AOAO 
UZo/ 
1-9 
■0287 
•0286 
•0286 
■0285 
■0283 
•0281 
•0279 
•0275 
•0271 
•0265 
•0258 
•0249 
•0238 
2-0 
•0227 
•0227 
•0227 
•0226 
•0225 
•0224 
•0223 
•0220 
•0217 
•0213 
•0209 
■0202 
•0195 
2-1 
•0178 
•0178 
•0178 
•0178 
•0177 
•0177 
•0176 
•0174 
•0172 
■0170 
•0167 
•0163 
•0158 
2-2 
■0139 
•0139 
•0139 
■0139 
•0138 
•0138 
•0137 
•0137 
■0135 
•0134 
•0132 
•0129 
•0126 
2-8 
•0107 
•0107 
•0107 
•0107 
■0107 
•0107 
•0106 
•0106 
•0105 
■0104 
•0103 
•0101 
•0099 
2-4 
•0082 
•0082 
•0082 
■0082 
■0082 
•0082 
•0082 
•0081 
•0081 
•0080 
•0079 
•0078 
•0077 
2-5 
•0062 
•0062 
•0062 
■0062 
•0062 
•0062 
•0062 
•0062 
■0061 
•0061 
•0061 
•0060 
•0059 
2-6 
•0047 
•0047 
•0047 
•0047 
•0047 
•0047 
•0046 
•0046 
•0046 
•0046 
•0046 
•0045 
■0045 
r = S5. 
0 
■1 
'2 
■3 
■4 
•5 
■6 
•7 
■8 
•9 
1-0 
VI 
1-2 
k = 0-0 
•4117 
•3905 
•3670 
■3417 
•3149 
•2873 
•2595 
•2319 
■2052 
•1798 
•1560 
•1341 
•1141 
o-i 
•3905 
•3723 
•3518 
•3292 
•3050 
•2796 
•2537 
•2277 
•2022 
•1777 
•1546 
•1332 
•1136 
0-2 
•3670 
•3518 
■3342 
•3145 
•2930 
•2702 
•2464 
■2222 
•1983 
•1749 
•1527 
•1319 
•1127 
OS 
•3417 
•3292 
•3145 
•2978 
•2791 
■2588 
•2374 
•2154 
•1931 
•1712 
•1501 
•1301 
•1116 
0-4 
•3149 
•3050 
•2930 
•2791 
•2632 
•2457 
•2268 
•2070 
•1867 
•1665 
■1467 
•1277 
•1099 
0-5 
•2873 
•2796 
•2702 
•2588 
•2457 
•2309 
•2146 
•1972 
•1790 
•1606 
•1423 
•1246 
•1078 
0-6 
•2595 
•2537 
•2464 
•2374 
•2268 
•2146 
■2008 
•1859 
•1700 
•1535 
•1370 
•1206 
•1049 
0-7 
•2319 
•2277 
•2222 
•2154 
•2070 
•1972 
•1859 
•1733 
•1597 
•1453 
•1306 
•1158 
•1014 
0-8 
•2052 
•2022 
•1983 
•1931 
■1867 
•1790 
•1700 
■1597 
•1483 
•1360 
•1232 
•1101 
•0971 
0-9 
•1798 
•1777 
•1749 
•1712 
•1665 
•1606 
•1535 
•1453 
•1360 
•1258 
•1149 
•1035 
•0920 
1-0 
•1560 
•1546 
•1527 
•1501 
•1467 
•1423 
•1370 
■1306 
•1232 
•1149 
•1058 
•0962 
•0862 
1-1 
■1341 
■1332 
•1319 
•1301 
•1277 
•1246 
•1206 
•1158 
■1101 
•1035 
•0962 
•0882 
•0798 
1-2 
•1141 
•1136 
•1127 
•1116 
•1099 
•1078 
•1049 
•1014 
•0971 
■0920 
•0862 
•0798 
•0729 
1-3 
•0963 
•0959 
•0954 
•0947 
•0936 
•0921 
•0901 
•0876 
■0845 
■0807 
•0763 
•0712 
•0656 
1-4 
•0805 
•0803 
•0800 
•0795 
•0788 
•0778 
•0765 
•0748 
■0725 
•0698 
•0665 
•0626 
•0583 
1-5 
•0666 
•0665 
■0664 
•0661 
•0656 
•0650 
•0642 
•0630 
•0615 
•0595 
•0571 
•0543 
•0510 
1-6 
•0547 
•0547 
•0546 
•0544 
•0541 
•0538 
•0532 
•0525 
•0514 
•0501 
■0484 
•0464 
•0439 
1-7 
•0445 
•0445 
•0444 
•0443 
•0442 
•0440 
•0436 
•0432 
•0425 
•0416 
•0405 
•0390 
•0373 
1-8 
•0359 
•0359 
•0359 
•0358 
•0357 
•0356 
•0354 
•0351 
•0347 
■0341 
•0334 
•0324 
•0312 
1-9 
•0287 
•0287 
•0287 
■0287 
•0286 
•0285 
•0284 
•0283 
■0280 
■0276 
•0272 
■0265 
•0257 
2-0 
•0227 
■0227 
■0227 
•0227 
■0227 
•0227 
•0226 
•0225 
•0224 
•0221 
•0218 
•0214 
•0209 
2'1 
•0179 
•0179 
•0179 
•0178 
•0178 
•0178 
•0178 
•0177 
•0176 
•0175 
•0173 
•0171 
•0167 
2-2 
•0139 
•0139 
•0139 
•0139 
•0139 
•0139 
•0139 
•0138 
■0138 
•0137 
•0136 
•0135 
•0133 
2-3 
•0107 
■0107 
•0107 
•0107 
■0107 
•0107 
•0107 
•0107 
■0107 
•0106 
•0106 
•0105 
•0104 
2-4 
•0082 
•0082 
•0082 
•0082 
■0082 
•0082 
•0082 
•0082 
•0082 
•0081 
•0081 
•0081 
•0080 
2-5 
•0062 
•0062 
•0062 
•0062 
•0062 
•0062 
•0062 
•0062 
■0062 
•0062 
•0062 
•0061 
•0061 
2-6 
•0047 
•0047 
•0047 
•0047 
•0047 
•0047 
•0047 
•0047 
•0047 
•0046 
•0046 
•0046 
•0046 
