Multiple Linear Regression - Estimated Regression Equation |
PSS[t] = + 10.1553588186132 -0.520868917539678IDT[t] + 1.95835376594495HPP[t] + 0.0420113088658949TGYW[t] -0.876103192773687POP[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) | 10.1553588186132 | 1.266727 | 8.017 | 0 | 0 |
IDT | -0.520868917539678 | 0.218734 | -2.3813 | 0.020388 | 0.010194 |
HPP | 1.95835376594495 | 0.216052 | 9.0643 | 0 | 0 |
TGYW | 0.0420113088658949 | 0.19652 | 0.2138 | 0.831434 | 0.415717 |
POP | -0.876103192773687 | 0.04024 | -21.7721 | 0 | 0 |
Multiple Linear Regression - Regression Statistics | |
Multiple R | 0.978298437003284 |
R-squared | 0.957067831843069 |
Adjusted R-squared | 0.95425260770163 |
F-TEST (value) | 339.961503510753 |
F-TEST (DF numerator) | 4 |
F-TEST (DF denominator) | 61 |
p-value | 0 |
Multiple Linear Regression - Residual Statistics | |
Residual Standard Deviation | 1.26192173482487 |
Sum Squared Residuals | 97.1392343542274 |
Multiple Linear Regression - Actuals, Interpolation, and Residuals | |||
Time or Index | Actuals | Interpolation Forecast | Residuals Prediction Error |
1 | 14 | 13.3625098224190 | 0.637490177581043 |
2 | 18 | 18.1973318559485 | -0.197331855948484 |
3 | 11 | 12.2787606784737 | -1.27876067847374 |
4 | 12 | 12.7996295960134 | -0.79962959601344 |
5 | 16 | 15.7181091724639 | 0.281890827536148 |
6 | 18 | 18.1973318559485 | -0.197331855948480 |
7 | 14 | 14.3211370621505 | -0.321137062150491 |
8 | 14 | 13.9659027869165 | 0.0340972130835167 |
9 | 15 | 15.3208635883640 | -0.320863588363956 |
10 | 15 | 15.3208635883640 | -0.320863588363956 |
11 | 17 | 15.4048862060957 | 1.59511379390425 |
12 | 19 | 18.7182007734882 | 0.281799226511841 |
13 | 10 | 9.6099383620608 | 0.390061637939198 |
14 | 16 | 15.8417325059036 | 0.158267494096365 |
15 | 18 | 17.3632399720407 | 0.636760027959312 |
16 | 14 | 13.9659027869165 | 0.0340972130835167 |
17 | 14 | 14.4447603955903 | -0.444760395590268 |
18 | 17 | 16.2389780900035 | 0.761021909996462 |
19 | 14 | 15.6340865547321 | -1.63408655473207 |
20 | 16 | 17.2792173543089 | -1.27921735430890 |
21 | 18 | 16.7598470075432 | 1.24015299245678 |
22 | 11 | 11.9235264032398 | -0.923526403239752 |
23 | 14 | 12.4047946050714 | 1.59520539492856 |
24 | 12 | 11.9655377121056 | 0.0344622878943541 |
25 | 17 | 17.3212286631748 | -0.321228663174793 |
26 | 9 | 8.61021183584734 | 0.389788164152664 |
27 | 16 | 15.3628748972299 | 0.63712510277015 |
28 | 14 | 14.3211370621505 | -0.321137062150491 |
29 | 15 | 14.8420059796902 | 0.15799402030983 |
30 | 11 | 12.2787606784738 | -1.27876067847376 |
31 | 16 | 15.3628748972299 | 0.63712510277015 |
32 | 13 | 12.0075490209715 | 0.99245097902846 |
33 | 17 | 15.8837438147695 | 1.11625618523047 |
34 | 15 | 15.3208635883640 | -0.320863588363956 |
35 | 14 | 13.9659027869165 | 0.0340972130835167 |
36 | 16 | 15.3628748972299 | 0.63712510277015 |
37 | 9 | 8.61021183584734 | 0.389788164152664 |
38 | 15 | 15.3208635883640 | -0.320863588363956 |
39 | 17 | 17.3212286631748 | -0.321228663174793 |
40 | 13 | 11.6523147457375 | 1.34768525426247 |
41 | 15 | 14.4867717044562 | 0.513228295543837 |
42 | 16 | 15.3628748972299 | 0.63712510277015 |
43 | 16 | 16.4451254704011 | -0.445125470401106 |
44 | 12 | 11.1314458281979 | 0.868554171802146 |
45 | 4 | 6.51782035176119 | -2.51782035176119 |
46 | 2 | 4.95671216991615 | -2.95671216991615 |
47 | 2 | 2.88978424722667 | -0.889784247226666 |
48 | 3 | 0.889419172415828 | 2.11058082758417 |
49 | 4 | 0.532686326407821 | 3.46731367359218 |
50 | 2 | 2.6416255579632 | -0.641625557963202 |
51 | 2 | 2.45052735426087 | -0.450527354260868 |
52 | 4 | 2.28639128272919 | 1.71360871727081 |
53 | 2 | 2.47748948643153 | -0.477489486431528 |
54 | 3 | 4.12262028600836 | -1.12262028600836 |
55 | 2 | 5.60211644327951 | -3.60211644327952 |
56 | 2 | 2.88978424722667 | -0.889784247226666 |
57 | 2 | 1.97166974558708 | 0.0283302544129174 |
58 | 3 | 3.36864185590045 | -0.368641855900449 |
59 | 4 | 4.08060897714246 | -0.0806089771424625 |
60 | 5 | 4.03859766827657 | 0.961402331723432 |
61 | 3 | 5.66867929115816 | -2.66867929115816 |
62 | 5 | 2.68363686682910 | 2.31636313317090 |
63 | 3 | 2.43547817756563 | 0.564521822434367 |
64 | 3 | 1.76552236518951 | 1.23447763481049 |
65 | 4 | 2.84777293836077 | 1.15222706163923 |
66 | 2 | 3.87446159674489 | -1.87446159674489 |
Goldfeld-Quandt test for Heteroskedasticity | |||
p-values | Alternative Hypothesis | ||
breakpoint index | greater | 2-sided | less |
8 | 4.11588828496535e-47 | 8.2317765699307e-47 | 1 |
9 | 2.26952480416351e-61 | 4.53904960832702e-61 | 1 |
10 | 9.4213181480394e-74 | 1.88426362960788e-73 | 1 |
11 | 9.68790836133826e-87 | 1.93758167226765e-86 | 1 |
12 | 7.47441199972816e-105 | 1.49488239994563e-104 | 1 |
13 | 2.84465013323496e-119 | 5.68930026646993e-119 | 1 |
14 | 5.67470699116044e-128 | 1.13494139823209e-127 | 1 |
15 | 3.75254467215592e-146 | 7.50508934431184e-146 | 1 |
16 | 1.05897517656618e-168 | 2.11795035313236e-168 | 1 |
17 | 2.19396382287957e-181 | 4.38792764575914e-181 | 1 |
18 | 1.8913562405899e-186 | 3.7827124811798e-186 | 1 |
19 | 2.44495688794345e-199 | 4.88991377588691e-199 | 1 |
20 | 3.98282786161020e-224 | 7.96565572322039e-224 | 1 |
21 | 1.58455670913723e-227 | 3.16911341827446e-227 | 1 |
22 | 2.13000917136951e-247 | 4.26001834273902e-247 | 1 |
23 | 1.32751170163987e-258 | 2.65502340327974e-258 | 1 |
24 | 2.87715741018553e-273 | 5.75431482037105e-273 | 1 |
25 | 6.81670357889293e-294 | 1.36334071577859e-293 | 1 |
26 | 3.88115644895887e-307 | 7.76231289791774e-307 | 1 |
27 | 0 | 0 | 1 |
28 | 0 | 0 | 1 |
29 | 0 | 0 | 1 |
30 | 0 | 0 | 1 |
31 | 0 | 0 | 1 |
32 | 0 | 0 | 1 |
33 | 0 | 0 | 1 |
34 | 0 | 0 | 1 |
35 | 0 | 0 | 1 |
36 | 0 | 0 | 1 |
37 | 0 | 0 | 1 |
38 | 0 | 0 | 1 |
39 | 0 | 0 | 1 |
40 | 0 | 0 | 1 |
41 | 0 | 0 | 1 |
42 | 0 | 0 | 1 |
43 | 0 | 0 | 1 |
44 | 0 | 0 | 1 |
45 | 0 | 0 | 1 |
46 | 2.16775240647444e-14 | 4.33550481294887e-14 | 0.999999999999978 |
47 | 2.17161799031552e-07 | 4.34323598063105e-07 | 0.9999997828382 |
48 | 0.00795327242063898 | 0.0159065448412780 | 0.99204672757936 |
49 | 0.257307345031696 | 0.514614690063392 | 0.742692654968304 |
50 | 0.244452910896673 | 0.488905821793345 | 0.755547089103327 |
51 | 0.33534414646283 | 0.67068829292566 | 0.66465585353717 |
52 | 0.295571000928419 | 0.591142001856837 | 0.704428999071581 |
53 | 0.259797516979347 | 0.519595033958695 | 0.740202483020653 |
54 | 0.246673236802684 | 0.493346473605369 | 0.753326763197316 |
55 | 0.330158003559143 | 0.660316007118286 | 0.669841996440857 |
56 | 0.309329550128397 | 0.618659100256794 | 0.690670449871603 |
57 | 0.394726138363535 | 0.78945227672707 | 0.605273861636465 |
58 | 0.361849254561772 | 0.723698509123543 | 0.638150745438228 |
Meta Analysis of Goldfeld-Quandt test for Heteroskedasticity | |||
Description | # significant tests | % significant tests | OK/NOK |
1% type I error level | 40 | 0.784313725490196 | NOK |
5% type I error level | 41 | 0.80392156862745 | NOK |
10% type I error level | 41 | 0.80392156862745 | NOK |