Multiple Linear Regression - Estimated Regression Equation |
Paradoxicalsleep[t] = + 1.0745043501874 -0.110510307330023Overalldangerindex[t] -0.30353818298999Gestationtime[t] + e[t] |
Multiple Linear Regression - Ordinary Least Squares | |||||
Variable | Parameter | S.D. | T-STAT H0: parameter = 0 | 2-tail p-value | 1-tail p-value |
(Intercept) | 1.0745043501874 | 0.128751 | 8.3456 | 0 | 0 |
Overalldangerindex | -0.110510307330023 | 0.022191 | -4.98 | 1.6e-05 | 8e-06 |
Gestationtime | -0.30353818298999 | 0.068904 | -4.4052 | 9.1e-05 | 4.5e-05 |
Multiple Linear Regression - Regression Statistics | |
Multiple R | 0.809091622594016 |
R-squared | 0.654629253751817 |
Adjusted R-squared | 0.635441990071363 |
F-TEST (value) | 34.1179057448752 |
F-TEST (DF numerator) | 2 |
F-TEST (DF denominator) | 36 |
p-value | 4.88809770438081e-09 |
Multiple Linear Regression - Residual Statistics | |
Residual Standard Deviation | 0.181763723400882 |
Sum Squared Residuals | 1.18936984120389 |
Multiple Linear Regression - Actuals, Interpolation, and Residuals | |||
Time or Index | Actuals | Interpolation Forecast | Residuals Prediction Error |
1 | 0.30103 | 0.250255072658831 | 0.0507749273411687 |
2 | 0.25527 | -0.215980737462651 | 0.471250737462651 |
3 | -0.1549 | -0.0520974370845253 | -0.102802562915475 |
4 | 0.59106 | 0.495309840648025 | 0.0957501593519752 |
5 | 0 | -0.154699413698802 | 0.154699413698802 |
6 | 0.5563 | 0.41782564867617 | 0.13847435132383 |
7 | 0.14613 | 0.247118809944429 | -0.100988809944429 |
8 | 0.17609 | 0.0104466055205621 | 0.165643394479438 |
9 | -0.1549 | -0.221324170532132 | 0.0664241705321322 |
10 | 0.32222 | 0.471275687318877 | -0.149055687318877 |
11 | 0.61278 | 0.360765379988854 | 0.252014620011146 |
12 | 0.07918 | 0.222373216218228 | -0.143193216218228 |
13 | -0.30103 | -0.136803963478569 | -0.164226036521431 |
14 | 0.53148 | 0.487987338625449 | 0.043492661374551 |
15 | 0.17609 | 0.207771155283437 | -0.031681155283437 |
16 | 0.53148 | 0.303705111301539 | 0.227774888698461 |
17 | -0.09691 | 0.0762263651563229 | -0.173136365156323 |
18 | -0.09691 | -0.244887839677645 | 0.147977839677645 |
19 | 0.30103 | 0.448291776102875 | -0.147261776102875 |
20 | 0.27875 | 0.227455606450338 | 0.0512943935496621 |
21 | 0.11394 | 0.354823976698883 | -0.240883976698883 |
22 | 0.74819 | 0.636421706538241 | 0.111768293461759 |
23 | 0.49136 | 0.332883523548251 | 0.158476476451749 |
24 | 0.25527 | 0.202051334867048 | 0.0532186651329517 |
25 | -0.04576 | -0.0445636193827138 | -0.00119638061728618 |
26 | 0.25527 | 0.479995178267323 | -0.224725178267322 |
27 | 0.27875 | 0.00696198717983687 | 0.271788012820163 |
28 | -0.04576 | 0.0692681089533349 | -0.115028108953335 |
29 | 0.41497 | 0.341629171884308 | 0.073340828115692 |
30 | 0.38021 | 0.443122520846556 | -0.0629125208465558 |
31 | 0.07918 | 0.181195226313806 | -0.102015226313806 |
32 | -0.04576 | 0.139507292261961 | -0.185267292261961 |
33 | -0.30103 | 0.0289969849319376 | -0.330026984931938 |
34 | -0.22185 | -0.139450816434242 | -0.0823991835657579 |
35 | 0.36173 | 0.313747315443705 | 0.0479826845562951 |
36 | -0.30103 | 0.0445229629918757 | -0.345552962991876 |
37 | 0.41497 | 0.34877258637892 | 0.0661974136210802 |
38 | -0.22185 | -0.0724193184357053 | -0.149430681564295 |
39 | 0.81954 | 0.616099825187062 | 0.203440174812939 |
Goldfeld-Quandt test for Heteroskedasticity | |||
p-values | Alternative Hypothesis | ||
breakpoint index | greater | 2-sided | less |
6 | 0.597922213564454 | 0.804155572871093 | 0.402077786435546 |
7 | 0.805804416927485 | 0.38839116614503 | 0.194195583072515 |
8 | 0.7209684044599 | 0.558063191080201 | 0.2790315955401 |
9 | 0.649749713936246 | 0.700500572127508 | 0.350250286063754 |
10 | 0.612987655905291 | 0.774024688189417 | 0.387012344094709 |
11 | 0.690089468091665 | 0.619821063816671 | 0.309910531908335 |
12 | 0.691184206014896 | 0.617631587970208 | 0.308815793985104 |
13 | 0.737886685051194 | 0.524226629897611 | 0.262113314948806 |
14 | 0.651760497064667 | 0.696479005870667 | 0.348239502935333 |
15 | 0.56662983120479 | 0.866740337590419 | 0.43337016879521 |
16 | 0.594680005354591 | 0.810639989290819 | 0.405319994645409 |
17 | 0.610871636933861 | 0.778256726132278 | 0.389128363066139 |
18 | 0.613433781493006 | 0.773132437013989 | 0.386566218506994 |
19 | 0.589196961672997 | 0.821606076654007 | 0.410803038327003 |
20 | 0.503418139079496 | 0.993163721841007 | 0.496581860920504 |
21 | 0.591395981070864 | 0.817208037858272 | 0.408604018929136 |
22 | 0.526278491835462 | 0.947443016329075 | 0.473721508164538 |
23 | 0.534348855651302 | 0.931302288697397 | 0.465651144348698 |
24 | 0.482911047859622 | 0.965822095719245 | 0.517088952140378 |
25 | 0.414298504826927 | 0.828597009653854 | 0.585701495173073 |
26 | 0.602851554743702 | 0.794296890512596 | 0.397148445256298 |
27 | 0.9605562364507 | 0.0788875270985991 | 0.0394437635492996 |
28 | 0.97055213919692 | 0.0588957216061584 | 0.0294478608030792 |
29 | 0.961722114256579 | 0.0765557714868425 | 0.0382778857434213 |
30 | 0.932746256496212 | 0.134507487007577 | 0.0672537435037885 |
31 | 0.913605559996808 | 0.172788880006384 | 0.0863944400031918 |
32 | 0.93635189406064 | 0.127296211878719 | 0.0636481059393594 |
33 | 0.880355301334991 | 0.239289397330017 | 0.119644698665009 |
Meta Analysis of Goldfeld-Quandt test for Heteroskedasticity | |||
Description | # significant tests | % significant tests | OK/NOK |
1% type I error level | 0 | 0 | OK |
5% type I error level | 0 | 0 | OK |
10% type I error level | 3 | 0.107142857142857 | NOK |