Multiple Linear Regression - Estimated Regression Equation |
vrijetijdsbesteding[t] = + 100.676931818182 -0.090488636363676M1[t] -0.0355909090909097M2[t] -0.298693181818184M3[t] -0.109795454545457M4[t] -0.394897727272729M5[t] -0.384000000000005M6[t] -0.543102272727275M7[t] -0.488204545454552M8[t] + 0.51469318181818M9[t] + 0.391590909090904M10[t] + 0.139602272727273M11[t] + 0.327102272727273t + 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) | 100.676931818182 | 0.337006 | 298.7392 | 0 | 0 |
M1 | -0.090488636363676 | 0.40885 | -0.2213 | 0.825841 | 0.41292 |
M2 | -0.0355909090909097 | 0.408592 | -0.0871 | 0.930974 | 0.465487 |
M3 | -0.298693181818184 | 0.408392 | -0.7314 | 0.468334 | 0.234167 |
M4 | -0.109795454545457 | 0.408249 | -0.2689 | 0.789203 | 0.394602 |
M5 | -0.394897727272729 | 0.408163 | -0.9675 | 0.338466 | 0.169233 |
M6 | -0.384000000000005 | 0.408135 | -0.9409 | 0.351797 | 0.175899 |
M7 | -0.543102272727275 | 0.408163 | -1.3306 | 0.190024 | 0.095012 |
M8 | -0.488204545454552 | 0.408249 | -1.1958 | 0.238019 | 0.119009 |
M9 | 0.51469318181818 | 0.408392 | 1.2603 | 0.214061 | 0.10703 |
M10 | 0.391590909090904 | 0.408592 | 0.9584 | 0.342987 | 0.171494 |
M11 | 0.139602272727273 | 0.430239 | 0.3245 | 0.747081 | 0.373541 |
t | 0.327102272727273 | 0.004834 | 67.665 | 0 | 0 |
Multiple Linear Regression - Regression Statistics | |
Multiple R | 0.995287469888219 |
R-squared | 0.990597147716492 |
Adjusted R-squared | 0.98808972044089 |
F-TEST (value) | 395.065155968917 |
F-TEST (DF numerator) | 12 |
F-TEST (DF denominator) | 45 |
p-value | 0 |
Multiple Linear Regression - Residual Statistics | |
Residual Standard Deviation | 0.608411215437963 |
Sum Squared Residuals | 16.6573893181815 |
Multiple Linear Regression - Actuals, Interpolation, and Residuals | |||
Time or Index | Actuals | Interpolation Forecast | Residuals Prediction Error |
1 | 101.76 | 100.913545454546 | 0.8464545454544 |
2 | 102.37 | 101.295545454545 | 1.07445454545456 |
3 | 102.38 | 101.359545454545 | 1.02045454545455 |
4 | 102.86 | 101.875545454545 | 0.984454545454555 |
5 | 102.87 | 101.917545454545 | 0.952454545454554 |
6 | 102.92 | 102.255545454545 | 0.664454545454556 |
7 | 102.95 | 102.423545454545 | 0.526454545454553 |
8 | 103.02 | 102.805545454545 | 0.21445454545455 |
9 | 104.08 | 104.135545454545 | -0.0555454545454503 |
10 | 104.16 | 104.339545454545 | -0.179545454545449 |
11 | 104.24 | 104.414659090909 | -0.174659090909094 |
12 | 104.33 | 104.602159090909 | -0.27215909090909 |
13 | 104.73 | 104.838772727273 | -0.108772727272687 |
14 | 104.86 | 105.220772727273 | -0.360772727272727 |
15 | 105.03 | 105.284772727273 | -0.254772727272722 |
16 | 105.62 | 105.800772727273 | -0.18077272727272 |
17 | 105.63 | 105.842772727273 | -0.212772727272729 |
18 | 105.63 | 106.180772727273 | -0.550772727272726 |
19 | 105.94 | 106.348772727273 | -0.408772727272728 |
20 | 106.61 | 106.730772727273 | -0.120772727272722 |
21 | 107.69 | 108.060772727273 | -0.370772727272728 |
22 | 107.78 | 108.264772727273 | -0.484772727272721 |
23 | 107.93 | 108.339886363636 | -0.409886363636358 |
24 | 108.48 | 108.527386363636 | -0.0473863636363602 |
25 | 108.14 | 108.764 | -0.623999999999961 |
26 | 108.48 | 109.146 | -0.665999999999996 |
27 | 108.48 | 109.21 | -0.729999999999996 |
28 | 108.89 | 109.726 | -0.835999999999999 |
29 | 108.93 | 109.768 | -0.837999999999993 |
30 | 109.21 | 110.106 | -0.896000000000003 |
31 | 109.47 | 110.274 | -0.804000000000001 |
32 | 109.8 | 110.656 | -0.856 |
33 | 111.73 | 111.986 | -0.255999999999998 |
34 | 111.85 | 112.19 | -0.340000000000004 |
35 | 112.12 | 112.265113636364 | -0.145113636363635 |
36 | 112.15 | 112.452613636364 | -0.302613636363634 |
37 | 112.17 | 112.689227272727 | -0.519227272727236 |
38 | 112.67 | 113.071227272727 | -0.401227272727275 |
39 | 112.8 | 113.135227272727 | -0.335227272727278 |
40 | 113.44 | 113.651227272727 | -0.211227272727276 |
41 | 113.53 | 113.693227272727 | -0.163227272727275 |
42 | 114.53 | 114.031227272727 | 0.498772727272728 |
43 | 114.51 | 114.199227272727 | 0.310772727272729 |
44 | 115.05 | 114.581227272727 | 0.468772727272723 |
45 | 116.67 | 115.911227272727 | 0.758772727272724 |
46 | 117.07 | 116.115227272727 | 0.95477272727272 |
47 | 116.92 | 116.190340909091 | 0.729659090909087 |
48 | 117 | 116.377840909091 | 0.622159090909082 |
49 | 117.02 | 116.614454545455 | 0.405545454545484 |
50 | 117.35 | 116.996454545455 | 0.353545454545441 |
51 | 117.36 | 117.060454545455 | 0.299545454545449 |
52 | 117.82 | 117.576454545455 | 0.24354545454544 |
53 | 117.88 | 117.618454545455 | 0.261545454545442 |
54 | 118.24 | 117.956454545455 | 0.283545454545444 |
55 | 118.5 | 118.124454545455 | 0.375545454545447 |
56 | 118.8 | 118.506454545455 | 0.293545454545449 |
57 | 119.76 | 119.836454545455 | -0.0764545454545484 |
58 | 120.09 | 120.040454545455 | 0.0495454545454541 |
Goldfeld-Quandt test for Heteroskedasticity | |||
p-values | Alternative Hypothesis | ||
breakpoint index | greater | 2-sided | less |
16 | 0.0577063209451328 | 0.115412641890266 | 0.942293679054867 |
17 | 0.019739302720929 | 0.039478605441858 | 0.980260697279071 |
18 | 0.00535063146476823 | 0.0107012629295365 | 0.994649368535232 |
19 | 0.00426899606102449 | 0.00853799212204898 | 0.995731003938976 |
20 | 0.101377248225139 | 0.202754496450277 | 0.898622751774861 |
21 | 0.193496468950704 | 0.386992937901407 | 0.806503531049296 |
22 | 0.235644735312614 | 0.471289470625229 | 0.764355264687386 |
23 | 0.26002738288873 | 0.520054765777461 | 0.73997261711127 |
24 | 0.459618447571994 | 0.919236895143988 | 0.540381552428006 |
25 | 0.364204097994082 | 0.728408195988165 | 0.635795902005918 |
26 | 0.272759828499015 | 0.545519656998031 | 0.727240171500985 |
27 | 0.192915890128643 | 0.385831780257286 | 0.807084109871357 |
28 | 0.133282101613714 | 0.266564203227428 | 0.866717898386286 |
29 | 0.0875443865868321 | 0.175088773173664 | 0.912455613413168 |
30 | 0.0735845586927304 | 0.147169117385461 | 0.92641544130727 |
31 | 0.0612717359939966 | 0.122543471987993 | 0.938728264006003 |
32 | 0.061846277454788 | 0.123692554909576 | 0.938153722545212 |
33 | 0.124886854057839 | 0.249773708115678 | 0.87511314594216 |
34 | 0.191697033206665 | 0.383394066413331 | 0.808302966793335 |
35 | 0.29323642813062 | 0.58647285626124 | 0.70676357186938 |
36 | 0.347076714499711 | 0.694153428999422 | 0.652923285500289 |
37 | 0.415023206029049 | 0.830046412058098 | 0.584976793970951 |
38 | 0.481716329291993 | 0.963432658583987 | 0.518283670708007 |
39 | 0.554444443730993 | 0.891111112538013 | 0.445555556269007 |
40 | 0.61259315499723 | 0.774813690005539 | 0.38740684500277 |
41 | 0.743354509673894 | 0.513290980652211 | 0.256645490326106 |
42 | 0.698178696460078 | 0.603642607079844 | 0.301821303539922 |
Meta Analysis of Goldfeld-Quandt test for Heteroskedasticity | |||
Description | # significant tests | % significant tests | OK/NOK |
1% type I error level | 1 | 0.037037037037037 | NOK |
5% type I error level | 3 | 0.111111111111111 | NOK |
10% type I error level | 3 | 0.111111111111111 | NOK |