In[1]:=
Estimate | Standard Error | t-Statistic | P-Value | |
-0.269676 | 0.0723842 | -3.72562 | 0.000198714 | |
-0.269122 | 0.0679544 | -3.96034 | 0.0000767236 | |
-0.284338 | 0.0643297 | -4.42001 | 0.000010248 | |
-0.239971 | 0.0612258 | -3.91944 | 0.0000908975 | |
10.0045 | 0.0779343 | 128.371 | 1.0587263050.935223712756645*^-1170 | |
9.97411 | 0.0749798 | 133.024 | 1.1701375068.935223712756645*^-1207 | |
10.0589 | 0.0727999 | 138.172 | 1.8215807947.935223712756637*^-1247 | |
9.88058 | 0.0710989 | 138.969 | 1.5525537313.93522371275664*^-1253 | |
8.99005 | 0.0809573 | 111.047 | 2.5331420814.935223712756645*^-1024 | |
8.9853 | 0.0786922 | 114.183 | 6.8149693396.935223712756645*^-1052 | |
8.99403 | 0.0774302 | 116.157 | 5.3684534498.935223712756645*^-1069 | |
9.11633 | 0.0767128 | 118.837 | 6.4292955051.935223712756645*^-1092 | |
0.973196 | 0.0301746 | 32.2521 | 3.93373*10^^-194 | |
0.986933 | 0.0290418 | 33.9831 | 5.35699*10^^-212 | |
10.0711 | 0.0592327 | 170.026 | 3.1097285279.93522371275664*^-1471 | |
7.97317 | 0.0447422 | 178.202 | 3.6995817796.935223712756645*^-1523 | |
11.5778 | 1.14203 | 10.1379 | 9.65538*10^^-24 | |
-0.00304848 | 0.000097187 | -31.3672 | 3.67254*10^^-185 | |
0.001971 | 0.0000974809 | 20.2194 | 6.35027*10^^-85 | |
-0.0040752 | 0.0000978193 | -41.6605 | 3.77664*10^^-295 | |
0.00103007 | 0.0000981251 | 10.4975 | 2.62163*10^^-25 |
Estimate | Standard Error | t-Statistic | P-Value | |
-0.252003 | 0.0756608 | -3.33069 | 0.000912369 | |
9.96999 | 0.0823323 | 121.095 | 1.52565364034.670996698205203*^-467 | |
8.96825 | 0.0878349 | 102.104 | 4.55596334754.670996698205203*^-419 | |
0.940434 | 0.0801625 | 11.7316 | 4.1189*10^^-29 | |
1.01672 | 0.0779103 | 13.0498 | 5.96444*10^^-35 | |
10.2686 | 0.127076 | 80.807 | 2.52876122063.670996698205203*^-354 | |
7.98655 | 0.11922 | 66.9902 | 1.94929*10^^-304 | |
14.1878 | 2.49078 | 5.69611 | 1.81395*10^^-8 | |
-0.00307117 | 0.0000999663 | -30.7221 | 2.4234*10^^-131 |
Estimate | Standard Error | t-Statistic | P-Value | |
-0.261395 | 0.0683375 | -3.82507 | 0.000142565 | |
9.96931 | 0.0764134 | 130.466 | 5.64565979733.670996698205203*^-489 | |
8.98235 | 0.0827771 | 108.512 | 2.88948332192.670996698205203*^-436 | |
0.950891 | 0.0641457 | 14.8239 | 2.27172*10^^-43 | |
1.03461 | 0.0636505 | 16.2546 | 1.49456*10^^-50 | |
10.0652 | 0.11974 | 84.0588 | 4.51706267220.670996698205203*^-365 | |
7.99216 | 0.0966898 | 82.6577 | 1.75174546279.670996698205203*^-360 | |
12.9473 | 2.37638 | 5.44834 | 7.07702*10^^-8 | |
0.00195684 | 0.0000981008 | 19.9473 | 2.88842*10^^-70 |
Estimate | Standard Error | t-Statistic | P-Value | |
-0.295161 | 0.0655312 | -4.50412 | 7.82327*10^^-6 | |
10.0692 | 0.0749917 | 134.271 | 2.82110662842.670996698205203*^-497 | |
8.99764 | 0.0829648 | 108.451 | 4.17474151160.670996698205203*^-436 | |
0.995252 | 0.0567664 | 17.5324 | 3.30025*10^^-57 | |
0.948745 | 0.0546002 | 17.3762 | 2.20269*10^^-56 | |
10.0182 | 0.116126 | 86.2705 | 3.45405438087.670996698205203*^-372 | |
7.99148 | 0.0835353 | 95.6659 | 8.17547585329.670996698205203*^-401 | |
10.0651 | 2.25131 | 4.47079 | 9.10722*10^^-6 | |
-0.00406094 | 0.0000999734 | -40.6202 | 2.9457*10^^-185 |
Estimate | Standard Error | t-Statistic | P-Value | |
-0.241563 | 0.0635985 | -3.79825 | 0.000158549 | |
9.90135 | 0.0746939 | 132.559 | 1.43821037178.670996698205203*^-493 | |
9.14022 | 0.0840548 | 108.741 | 7.31239052058.670996698205203*^-437 | |
0.964994 | 0.0510726 | 18.8945 | 1.65572*10^^-64 | |
1.00185 | 0.0496399 | 20.1823 | 1.4564*10^^-71 | |
9.97632 | 0.113527 | 87.8765 | 2.91635658702.670996698205203*^-377 | |
7.96094 | 0.0768354 | 103.61 | 3.40030072556.670996698205203*^-423 | |
10.4394 | 2.15252 | 4.84984 | 1.52766*10^^-6 | |
0.00103079 | 0.000102509 | 10.0556 | 2.71153*10^^-22 |
27 GHz | 31 GHz | 35 GHz | 39 GHz | |
1.09258 | 1.01131 | 1.03771 | 1.07901 | |
1.11605 | 1.0386 | 1.06112 | 1.10368 | |
1.17712 | 1.10651 | 1.14807 | 1.20058 | |
Indeterminate | Indeterminate | Indeterminate | Indeterminate | |
Indeterminate | Indeterminate | Indeterminate | Indeterminate | |
7.05762 | 4.51909 | 3.53915 | 2.86478 | |
7.19685 | 4.80347 | 3.5346 | 2.92156 | |
4.60262 | 4.0865 | 3.84355 | 3.67344 | |
7.10004 | 4.6701 | 3.48582 | 2.94909 | |
4.75678 | 4.32985 | 3.8861 | 3.55252 | |
1.05801 | 1.01276 | 1.04453 | 1.09135 |