Multiple Linear Regression - Estimated Regression Equation

W<25j[t] = -0.85984552928061 + 3.54483298931266`W>25j`[t] -0.171607853890170Inflatie[t] + 0.0397278955082736M1[t] -1.12623947562415M2[t] -2.54488958002931M3[t] -3.63953232460585M4[t] -4.48059367685237M5[t] -4.92702449418643M6[t] -5.00448146757193M7[t] -4.54462317350121M8[t] -4.62640371693578M9[t] -3.97237108806821M10[t] -0.505813455539065M11[t] + 0.0313473298499503t + 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)	-0.85984552928061	3.749455	-0.2293	0.819655	0.409828
`W>25j`	3.54483298931266	0.48463	7.3145	0	0
Inflatie	-0.171607853890170	0.113298	-1.5147	0.13685	0.068425
M1	0.0397278955082736	0.723448	0.0549	0.95645	0.478225
M2	-1.12623947562415	0.729722	-1.5434	0.129742	0.064871
M3	-2.54488958002931	0.735711	-3.4591	0.001197	0.000598
M4	-3.63953232460585	0.716151	-5.0821	7e-06	3e-06
M5	-4.48059367685237	0.717846	-6.2417	0	0
M6	-4.92702449418643	0.729603	-6.753	0	0
M7	-5.00448146757193	0.720622	-6.9447	0	0
M8	-4.54462317350121	0.711902	-6.3838	0	0
M9	-4.62640371693578	0.71322	-6.4866	0	0
M10	-3.97237108806821	0.718493	-5.5288	2e-06	1e-06
M11	-0.505813455539065	0.710413	-0.712	0.48014	0.24007
t	0.0313473298499503	0.014382	2.1796	0.034558	0.017279

Multiple Linear Regression - Regression Statistics
Multiple R	0.922272475482965
R-squared	0.850586519033475
Adjusted R-squared	0.804102324955001
F-TEST (value)	18.2984030571235
F-TEST (DF numerator)	14
F-TEST (DF denominator)	45
p-value	4.45199432874688e-14
Multiple Linear Regression - Residual Statistics
Residual Standard Deviation	1.12274196540784
Sum Squared Residuals	56.7247284399538

Multiple Linear Regression - Actuals, Interpolation, and Residuals
Time or Index	Actuals	Interpolation Forecast	Residuals Prediction Error
1	25.6	25.1340996799891	0.465900320010903
2	23.7	22.7815826734116	0.918417326588387
3	22	20.3994731436187	1.60052685638134
4	21.3	19.7593041693794	1.54069583062059
5	20.7	19.9958792583876	0.704120741612372
6	20.4	20.238280012599	0.161719987401000
7	20.3	19.7518831431871	0.548116856812906
8	20.4	18.8937987129388	1.50620128706123
9	19.8	18.8605262847432	0.93947371525684
10	19.5	19.1227798029733	0.377220197026652
11	23.1	23.6841346621462	-0.584134662146236
12	23.5	24.5414571756885	-1.04145717568849
13	23.5	24.2408883167264	-0.740888316726426
14	22.9	22.8890712596248	0.0109287403751691
15	21.9	21.1301244007493	0.769875599250668
16	21.5	20.6899916569402	0.810008343059813
17	20.5	20.5892442324062	-0.0892442324061564
18	20.2	20.8831273427846	-0.68312734278458
19	19.4	20.9399824115831	-1.53998241158313
20	19.2	21.3625448939477	-2.16254489394773
21	18.8	20.5688235117225	-1.76882351172254
22	18.8	20.2422359298133	-1.44223592981331
23	22.6	22.6938517807876	-0.093851780787630
24	23.3	22.5392067537031	0.76079324629687
25	23	22.6789251206174	0.321074879382581
26	21.4	21.578626650113	-0.178626650112986
27	19.9	20.494324818322	-0.594324818321984
28	18.8	20.1228352160689	-1.32283521606891
29	18.6	19.7362476341597	-1.13624763415968
30	18.4	19.3040033612866	-0.904003361286556
31	18.6	18.9034104188197	-0.303410418819732
32	19.9	19.3946160427404	0.505383957259591
33	19.2	18.3665368593071	0.83346314069293
34	18.4	17.6339836222995	0.766016377700477
35	21.1	21.1318885846786	-0.031888584678619
36	20.5	20.9772435575941	-0.477243557594123
37	19.1	20.3050306143118	-1.20503061431178
38	18.1	19.7420908877797	-1.64209088777970
39	17	18.2346626155014	-1.23466261550137
40	17.1	17.8460122278593	-0.746012227859276
41	17.4	17.6766216617692	-0.276621661769181
42	16.8	16.8898940899648	-0.0898940899647866
43	15.3	15.6430482665233	-0.343048266523299
44	14.3	15.4767696487485	-1.17676964874849
45	13.4	14.1912786844799	-0.791278684479897
46	15.3	15.4654997433368	-0.165499743336828
47	22.1	21.0731437139145	1.02685628608549
48	23.7	22.0505917251799	1.64940827482012
49	22.2	21.0410562683553	1.15894373164472
50	19.5	18.6086285290709	0.891371470929134
51	16.6	17.1414150218087	-0.541415021808654
52	17.3	17.5818567297522	-0.281856729752217
53	19.8	19.0020072132774	0.797992786722647
54	21.2	19.6846951933651	1.51530480663492
55	21.5	19.8616757598867	1.63832424011326
56	20.6	19.2722707016246	1.3277292983754
57	19.1	18.3128346597473	0.787165340252669
58	19.6	19.135500901577	0.464499098423013
59	23.5	23.816981258473	-0.316981258473003
60	24	24.8915007878344	-0.891500787834384

Goldfeld-Quandt test for Heteroskedasticity
p-values	Alternative Hypothesis
breakpoint index	greater	2-sided	less
18	3.81648950483327e-05	7.63297900966653e-05	0.999961835104952
19	0.032096708147092	0.064193416294184	0.967903291852908
20	0.153824221159038	0.307648442318077	0.846175778840962
21	0.131458381615298	0.262916763230597	0.868541618384701
22	0.115192954468204	0.230385908936409	0.884807045531796
23	0.0672808936404348	0.134561787280870	0.932719106359565
24	0.0531745335877493	0.106349067175499	0.94682546641225
25	0.0386331575387983	0.0772663150775966	0.961366842461202
26	0.0320427630591567	0.0640855261183134	0.967957236940843
27	0.0273410701098955	0.054682140219791	0.972658929890104
28	0.0469535691529899	0.0939071383059797	0.95304643084701
29	0.0364119849486726	0.0728239698973452	0.963588015051327
30	0.0310862938443072	0.0621725876886144	0.968913706155693
31	0.0262048094081598	0.0524096188163196	0.97379519059184
32	0.0640144152826126	0.128028830565225	0.935985584717387
33	0.0684932271440438	0.136986454288088	0.931506772855956
34	0.0633656527420648	0.126731305484130	0.936634347257935
35	0.06836541614117	0.13673083228234	0.93163458385883
36	0.326329439368213	0.652658878736426	0.673670560631787
37	0.670628876188109	0.658742247623782	0.329371123811891
38	0.644606756384774	0.710786487230452	0.355393243615226
39	0.566441097565652	0.867117804868697	0.433558902434348
40	0.484971184241663	0.969942368483326	0.515028815758337
41	0.538029654744658	0.923940690510685	0.461970345255342
42	0.484545793828947	0.969091587657894	0.515454206171053

Meta Analysis of Goldfeld-Quandt test for Heteroskedasticity
Description	# significant tests	% significant tests	OK/NOK
1% type I error level	1	0.04	NOK
5% type I error level	1	0.04	OK
10% type I error level	9	0.36	NOK