Multiple Linear Regression - Estimated Regression Equation |
SWS[t] = + 101.747169187514 + 0.85898554456651PS[t] + 0.0483563309262615L[t] + 0.00897769792082374WB[t] -0.00229591302763007WBR[t] -0.0465855631325102TG[t] -24.6233778463786P[t] -39.2386116719054S[t] + 11.529514004365D[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) | 101.747169187514 | 69.11223 | 1.4722 | 0.14688 | 0.07344 |
PS | 0.85898554456651 | 0.075204 | 11.4221 | 0 | 0 |
L | 0.0483563309262615 | 0.118259 | 0.4089 | 0.684258 | 0.342129 |
WB | 0.00897769792082374 | 0.300033 | 0.0299 | 0.976241 | 0.488121 |
WBR | -0.00229591302763007 | 0.163977 | -0.014 | 0.988881 | 0.494441 |
TG | -0.0465855631325102 | 0.104604 | -0.4454 | 0.65788 | 0.32894 |
P | -24.6233778463786 | 51.141729 | -0.4815 | 0.632162 | 0.316081 |
S | -39.2386116719054 | 33.633703 | -1.1666 | 0.248576 | 0.124288 |
D | 11.529514004365 | 67.319369 | 0.1713 | 0.864667 | 0.432333 |
Multiple Linear Regression - Regression Statistics | |
Multiple R | 0.87368168438707 |
R-squared | 0.763319685633427 |
Adjusted R-squared | 0.727594355163001 |
F-TEST (value) | 21.3663435882087 |
F-TEST (DF numerator) | 8 |
F-TEST (DF denominator) | 53 |
p-value | 4.61852778244065e-14 |
Multiple Linear Regression - Residual Statistics | |
Residual Standard Deviation | 215.781932434378 |
Sum Squared Residuals | 2467777.64535107 |
Multiple Linear Regression - Actuals, Interpolation, and Residuals | |||
Time or Index | Actuals | Interpolation Forecast | Residuals Prediction Error |
1 | -999 | -1019.98855021996 | 20.9885502199627 |
2 | 6.3 | 23.199771588242 | -16.899771588242 |
3 | -999 | -810.9017891256 | -188.0982108744 |
4 | -999 | -972.862401292858 | -26.1375987071424 |
5 | 2.1 | -134.086488336087 | 136.186488336087 |
6 | 0.1 | -113.967656659258 | 114.067656659258 |
7 | 15.8 | 52.0525305885091 | -36.2525305885091 |
8 | 5.2 | -161.705444917625 | 166.905444917625 |
9 | 10.9 | 11.6583677803472 | -0.75836778034717 |
10 | 8.3 | 41.7784854532164 | -33.4784854532164 |
11 | 11 | -135.807599473809 | 146.807599473809 |
12 | 3.2 | -167.750313490837 | 170.950313490837 |
13 | 7.6 | 36.8705213185432 | -29.2705213185432 |
14 | -999 | -1032.39350498793 | 33.3935049879323 |
15 | 6.3 | 49.4291350555717 | -43.1291350555717 |
16 | 8.6 | -1.83482579365 | 10.43482579365 |
17 | 6.6 | -1.0633849763385 | 7.6633849763385 |
18 | 9.5 | -6.9840449466668 | 16.4840449466668 |
19 | 4.8 | 59.4483361065811 | -54.6483361065811 |
20 | 12 | 101.884670301323 | -89.8846703013233 |
21 | -999 | -173.749779364453 | -825.250220635547 |
22 | 3.3 | -165.428959208572 | 168.728959208572 |
23 | 11 | 14.0600049279436 | -3.06000492794355 |
24 | -999 | -935.340615687663 | -63.6593843123367 |
25 | 4.7 | -40.2160337671778 | 44.9160337671778 |
26 | -999 | -810.81158510603 | -188.18841489397 |
27 | 10.4 | -23.9767045456583 | 34.3767045456583 |
28 | 7.4 | -95.0839115007682 | 102.483911500768 |
29 | 2.1 | -169.482820352693 | 171.582820352693 |
30 | 2.1 | -811.749928402107 | 813.849928402107 |
31 | -999 | -980.887992807227 | -18.1120071927734 |
32 | 7.7 | -53.4024472946123 | 61.1024472946123 |
33 | 17.9 | 49.9634543470547 | -32.0634543470547 |
34 | 6.1 | 40.9700660191363 | -34.8700660191363 |
35 | 8.2 | -22.8584528150715 | 31.0584528150715 |
36 | 8.4 | -24.7786764252754 | 33.1786764252754 |
37 | 11.9 | -1.00896958411785 | 12.9089695841178 |
38 | 10.8 | -0.979621721600047 | 11.7796217216 |
39 | 13.8 | 29.285187608221 | -15.485187608221 |
40 | 14.3 | 22.1848456725161 | -7.88484567251613 |
41 | -999 | -177.293234109293 | -821.706765890707 |
42 | 15.2 | -7.34458808446739 | 22.5445880844674 |
43 | 10 | -113.926646744838 | 123.926646744838 |
44 | 11.9 | 37.6920520027061 | -25.7920520027061 |
45 | 6.5 | -108.691925502891 | 115.191925502891 |
46 | 7.5 | -159.721196195239 | 167.221196195239 |
47 | -999 | -863.368253027925 | -135.631746972075 |
48 | 10.6 | 24.7074578556763 | -14.1074578556763 |
49 | 7.4 | 49.4500082748432 | -42.0500082748432 |
50 | 8.4 | -47.7132297017044 | 56.1132297017044 |
51 | 5.7 | -12.3094586953449 | 18.0094586953449 |
52 | 4.9 | -22.2957438554392 | 27.1957438554392 |
53 | -999 | -1024.34644921044 | 25.3464492104357 |
54 | 3.2 | -165.324047451923 | 168.524047451923 |
55 | -999 | -864.639046277187 | -134.360953722813 |
56 | 8.1 | 60.2936876597159 | -52.1936876597159 |
57 | 11 | 35.7210768395584 | -24.7210768395584 |
58 | 4.9 | 14.6917342828972 | -9.7917342828972 |
59 | 13.2 | -27.3443197157806 | 40.5443197157806 |
60 | 9.7 | -76.5466925864286 | 86.2466925864286 |
61 | 12.8 | 66.1288512629373 | -53.3288512629373 |
62 | -999 | -859.10291098299 | -139.897089017009 |
Goldfeld-Quandt test for Heteroskedasticity | |||
p-values | Alternative Hypothesis | ||
breakpoint index | greater | 2-sided | less |
12 | 9.96973862224964e-07 | 1.99394772444993e-06 | 0.999999003026138 |
13 | 8.49260436245862e-08 | 1.69852087249172e-07 | 0.999999915073956 |
14 | 2.46545252722167e-09 | 4.93090505444335e-09 | 0.999999997534547 |
15 | 4.77975522073967e-11 | 9.55951044147933e-11 | 0.999999999952202 |
16 | 7.21835601031355e-13 | 1.44367120206271e-12 | 0.999999999999278 |
17 | 1.79564723558835e-14 | 3.5912944711767e-14 | 0.999999999999982 |
18 | 3.20455910313866e-16 | 6.40911820627731e-16 | 1 |
19 | 9.9805876716248e-18 | 1.99611753432496e-17 | 1 |
20 | 1.31542306454433e-19 | 2.63084612908866e-19 | 1 |
21 | 0.705842943502996 | 0.588314112994009 | 0.294157056497004 |
22 | 0.63763372561569 | 0.72473254876862 | 0.36236627438431 |
23 | 0.54895564434901 | 0.90208871130198 | 0.45104435565099 |
24 | 0.462912500910654 | 0.925825001821307 | 0.537087499089346 |
25 | 0.379949463749085 | 0.75989892749817 | 0.620050536250915 |
26 | 0.333257744374903 | 0.666515488749805 | 0.666742255625097 |
27 | 0.258305163028266 | 0.516610326056532 | 0.741694836971734 |
28 | 0.20268568024568 | 0.405371360491361 | 0.79731431975432 |
29 | 0.22880313014402 | 0.457606260288039 | 0.77119686985598 |
30 | 0.999576128750102 | 0.000847742499796067 | 0.000423871249898033 |
31 | 0.99909151284502 | 0.00181697430996149 | 0.000908487154980746 |
32 | 0.998094974771878 | 0.00381005045624386 | 0.00190502522812193 |
33 | 0.996209025993802 | 0.0075819480123959 | 0.00379097400619795 |
34 | 0.9998839372825 | 0.00023212543500041 | 0.000116062717500205 |
35 | 0.99973095016094 | 0.000538099678119414 | 0.000269049839059707 |
36 | 0.99995348929557 | 9.30214088604779e-05 | 4.65107044302389e-05 |
37 | 0.999881195113487 | 0.000237609773025734 | 0.000118804886512867 |
38 | 0.999755074258572 | 0.000489851482855774 | 0.000244925741427887 |
39 | 0.999362298760348 | 0.00127540247930339 | 0.000637701239651696 |
40 | 0.99841836536591 | 0.0031632692681803 | 0.00158163463409015 |
41 | 1 | 3.93149082272253e-22 | 1.96574541136126e-22 |
42 | 1 | 5.67553500437753e-21 | 2.83776750218877e-21 |
43 | 1 | 3.07398365230405e-19 | 1.53699182615203e-19 |
44 | 1 | 2.01560109383137e-17 | 1.00780054691568e-17 |
45 | 1 | 9.70110436599121e-16 | 4.85055218299561e-16 |
46 | 0.999999999999963 | 7.46333488779647e-14 | 3.73166744389824e-14 |
47 | 0.999999999996005 | 7.99054504135137e-12 | 3.99527252067568e-12 |
48 | 0.999999999686606 | 6.26788520369982e-10 | 3.13394260184991e-10 |
49 | 0.999999968497706 | 6.30045888297975e-08 | 3.15022944148988e-08 |
50 | 0.999996975078445 | 6.04984311026263e-06 | 3.02492155513131e-06 |
Meta Analysis of Goldfeld-Quandt test for Heteroskedasticity | |||
Description | # significant tests | % significant tests | OK/NOK |
1% type I error level | 30 | 0.769230769230769 | NOK |
5% type I error level | 30 | 0.769230769230769 | NOK |
10% type I error level | 30 | 0.769230769230769 | NOK |