Multiple Linear Regression - Estimated Regression Equation |
neat[t] = + 1.91248932919395 + 0.22582746701983fail[t] -0.0151695182184149performance[t] + 0.0407018900354282goals[t] + 0.408125426799028`organized `[t] -0.108520379228040M1[t] -0.320677772100933M2[t] -0.0523926228821235M3[t] -0.100794438378459M4[t] -0.0408498667731373M5[t] -0.325277806373867M6[t] -0.129584987021746M7[t] -0.168273241267620M8[t] + 0.353475024355944M9[t] + 0.368840159639130M10[t] + 0.0953099758679434M11[t] -0.00910905651160431t + 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) | 1.91248932919395 | 0.506351 | 3.777 | 0.000233 | 0.000116 |
fail | 0.22582746701983 | 0.070489 | 3.2037 | 0.001675 | 0.000838 |
performance | -0.0151695182184149 | 0.078959 | -0.1921 | 0.847924 | 0.423962 |
goals | 0.0407018900354282 | 0.074355 | 0.5474 | 0.584962 | 0.292481 |
`organized ` | 0.408125426799028 | 0.086822 | 4.7007 | 6e-06 | 3e-06 |
M1 | -0.108520379228040 | 0.3161 | -0.3433 | 0.731873 | 0.365937 |
M2 | -0.320677772100933 | 0.314246 | -1.0205 | 0.309242 | 0.154621 |
M3 | -0.0523926228821235 | 0.320743 | -0.1633 | 0.870477 | 0.435238 |
M4 | -0.100794438378459 | 0.321759 | -0.3133 | 0.754542 | 0.377271 |
M5 | -0.0408498667731373 | 0.322792 | -0.1266 | 0.899474 | 0.449737 |
M6 | -0.325277806373867 | 0.320407 | -1.0152 | 0.311736 | 0.155868 |
M7 | -0.129584987021746 | 0.32523 | -0.3984 | 0.690903 | 0.345452 |
M8 | -0.168273241267620 | 0.323169 | -0.5207 | 0.603388 | 0.301694 |
M9 | 0.353475024355944 | 0.320861 | 1.1016 | 0.272479 | 0.136239 |
M10 | 0.368840159639130 | 0.323868 | 1.1389 | 0.256679 | 0.128339 |
M11 | 0.0953099758679434 | 0.320917 | 0.297 | 0.766906 | 0.383453 |
t | -0.00910905651160431 | 0.00162 | -5.6231 | 0 | 0 |
Multiple Linear Regression - Regression Statistics | |
Multiple R | 0.661871167577602 |
R-squared | 0.438073442470539 |
Adjusted R-squared | 0.374757774016515 |
F-TEST (value) | 6.91887889944086 |
F-TEST (DF numerator) | 16 |
F-TEST (DF denominator) | 142 |
p-value | 1.57234225639513e-11 |
Multiple Linear Regression - Residual Statistics | |
Residual Standard Deviation | 0.812915986590508 |
Sum Squared Residuals | 93.8382009781274 |
Multiple Linear Regression - Actuals, Interpolation, and Residuals | |||
Time or Index | Actuals | Interpolation Forecast | Residuals Prediction Error |
1 | 4 | 4.88643493745207 | -0.886434937452065 |
2 | 4 | 3.80538812722888 | 0.194611872771119 |
3 | 4 | 4.72404948557196 | -0.724049485571957 |
4 | 4 | 3.96635145789272 | 0.0336485421072819 |
5 | 4 | 3.63459391800442 | 0.36540608199558 |
6 | 5 | 4.13177540367313 | 0.86822459632687 |
7 | 4 | 3.69476912629339 | 0.305230873706614 |
8 | 3 | 3.63660896193731 | -0.63660896193731 |
9 | 4 | 4.10854628101384 | -0.108546281013841 |
10 | 4 | 4.42203360687611 | -0.42203360687611 |
11 | 4 | 4.04282106830405 | -0.0428210683040475 |
12 | 4 | 3.90806299948767 | 0.0919370005123304 |
13 | 4 | 3.82077260018486 | 0.179227399815144 |
14 | 2 | 3.16584835218432 | -1.16584835218432 |
15 | 3 | 3.72942807477700 | -0.729428074777004 |
16 | 4 | 4.50135852717092 | -0.501358527170923 |
17 | 3 | 3.85200688659334 | -0.85200688659334 |
18 | 2 | 2.74221903688295 | -0.74221903688295 |
19 | 4 | 3.77058602513854 | 0.229413974861463 |
20 | 3 | 3.72278871438106 | -0.722788714381059 |
21 | 3 | 4.49159442694968 | -1.49159442694968 |
22 | 4 | 4.7492103445581 | -0.749210344558104 |
23 | 3 | 3.97421428020022 | -0.974214280200224 |
24 | 3 | 3.82909335778525 | -0.829093357785248 |
25 | 4 | 4.11958934884463 | -0.119589348844633 |
26 | 4 | 3.33060426749372 | 0.669395732506282 |
27 | 4 | 3.83077734543917 | 0.169222654560832 |
28 | 4 | 3.7325645833958 | 0.267435416604200 |
29 | 4 | 3.82410198852495 | 0.175898011475055 |
30 | 4 | 3.44916121234175 | 0.550838787658245 |
31 | 5 | 4.57692911609182 | 0.423070883908183 |
32 | 4 | 3.65418192627724 | 0.345818073722764 |
33 | 4 | 3.85809662408464 | 0.141903375915358 |
34 | 4 | 4.86290151623348 | -0.862901516233478 |
35 | 3 | 3.67978002507657 | -0.67978002507657 |
36 | 4 | 4.66096882055554 | -0.660968820555541 |
37 | 3 | 3.90938649099704 | -0.909386490997039 |
38 | 4 | 3.39605831274027 | 0.60394168725973 |
39 | 4 | 4.17312360133958 | -0.173123601339577 |
40 | 3 | 3.67912731351039 | -0.679127313510391 |
41 | 5 | 4.34874620420455 | 0.651253795795448 |
42 | 4 | 3.60638189125776 | 0.393618108742238 |
43 | 3 | 3.52643629704302 | -0.52643629704302 |
44 | 3 | 3.70163883610017 | -0.701638836100169 |
45 | 3 | 4.07268197546836 | -1.07268197546836 |
46 | 4 | 3.79723917896627 | 0.202760821033733 |
47 | 4 | 3.71489503388629 | 0.285104966113707 |
48 | 4 | 4.14353471561726 | -0.143534715617261 |
49 | 4 | 3.57425034583796 | 0.425749654162042 |
50 | 4 | 3.2819429699812 | 0.718057030018798 |
51 | 4 | 3.62732950737908 | 0.372670492620921 |
52 | 4 | 3.51394722711730 | 0.486052772882704 |
53 | 5 | 4.01361005904547 | 0.98638994095453 |
54 | 3 | 2.61176048046281 | 0.388239519537192 |
55 | 3 | 3.45302284431938 | -0.45302284431938 |
56 | 5 | 4.08468698203600 | 0.915313017963995 |
57 | 5 | 4.37149872412813 | 0.628501275871866 |
58 | 4 | 3.96962937610069 | 0.0303706238993117 |
59 | 4 | 3.84375572378008 | 0.156244276219918 |
60 | 3 | 2.41838711271418 | 0.581612887285822 |
61 | 4 | 3.42423977766328 | 0.575760222336722 |
62 | 4 | 3.20297332827878 | 0.79702667172122 |
63 | 5 | 3.27702384400158 | 1.72297615599842 |
64 | 4 | 3.36393665894262 | 0.636063341057384 |
65 | 4 | 3.24481611527035 | 0.755183884729653 |
66 | 5 | 4.11829072708739 | 0.881709272912612 |
67 | 4 | 3.84087765487503 | 0.159122345124967 |
68 | 3 | 3.11559794305807 | -0.115597943058065 |
69 | 4 | 3.60270478035301 | 0.397295219646989 |
70 | 4 | 4.08614816498127 | -0.0861481649812668 |
71 | 4 | 3.53980718484842 | 0.460192815151579 |
72 | 4 | 3.44773005348208 | 0.552269946517916 |
73 | 4 | 4.20024383217973 | -0.200243832179727 |
74 | 4 | 3.9382754927598 | 0.0617245072401984 |
75 | 4 | 3.60420058168358 | 0.395799418316423 |
76 | 3 | 3.78768669491388 | -0.787686694913881 |
77 | 4 | 3.75429081273154 | 0.245709187268461 |
78 | 3 | 3.05262838982018 | -0.0526283898201764 |
79 | 5 | 3.62180520764271 | 1.37819479235729 |
80 | 4 | 2.79365226870279 | 1.20634773129721 |
81 | 5 | 3.68888453279676 | 1.31111546720324 |
82 | 5 | 3.66960823975133 | 1.33039176024867 |
83 | 4 | 3.38696899946854 | 0.613031000531463 |
84 | 4 | 3.09742439010459 | 0.902575609895412 |
85 | 4 | 3.81404294338662 | 0.185957056613381 |
86 | 4 | 3.16948154898468 | 0.830518451015322 |
87 | 4 | 3.26906443652449 | 0.730935563475505 |
88 | 5 | 4.10167296179207 | 0.898327038207927 |
89 | 4 | 3.32108810506932 | 0.678911894930681 |
90 | 3 | 2.90261782164550 | 0.0973821783545034 |
91 | 4 | 3.08920158448601 | 0.910798415513987 |
92 | 3 | 3.32027553179700 | -0.320275531797005 |
93 | 4 | 3.34338553403908 | 0.656614465960921 |
94 | 4 | 2.96704855782865 | 1.03295144217135 |
95 | 4 | 3.72648763816374 | 0.273512361836258 |
96 | 4 | 3.67313334941822 | 0.326866650581779 |
97 | 4 | 3.73026663706438 | 0.269733362935619 |
98 | 3 | 3.33706508149928 | -0.337065081499283 |
99 | 3 | 3.14939290478664 | -0.149392904786644 |
100 | 3 | 3.02084110630645 | -0.0208411063064463 |
101 | 3 | 3.61990485372910 | -0.619904853729096 |
102 | 3 | 2.83401103354167 | 0.165988966458327 |
103 | 2 | 2.39983237336713 | -0.399832373367134 |
104 | 3 | 2.95762796740630 | 0.042372032593703 |
105 | 5 | 3.93426401157113 | 1.06573598842887 |
106 | 2 | 3.06086259209742 | -1.06086259209742 |
107 | 2 | 2.81609762464485 | -0.816097624644849 |
108 | 3 | 2.47350922423226 | 0.52649077576774 |
109 | 3 | 2.97183554688786 | 0.0281644531121445 |
110 | 2 | 2.8064405057572 | -0.806440505757201 |
111 | 2 | 2.79908724140915 | -0.799087241409148 |
112 | 4 | 2.59998029965744 | 1.40001970034256 |
113 | 3 | 2.21235135151530 | 0.787648648484702 |
114 | 1 | 2.27106837394815 | -1.27106837394815 |
115 | 1 | 2.72135387663872 | -1.72135387663872 |
116 | 1 | 2.07277032570442 | -1.07277032570442 |
117 | 2 | 3.53091455714499 | -1.53091455714499 |
118 | 2 | 3.35204505893217 | -1.35204505893217 |
119 | 3 | 2.30902637330517 | 0.690973626694833 |
120 | 1 | 2.32067103885238 | -1.32067103885238 |
121 | 3 | 2.25410634674676 | 0.745893653253241 |
122 | 1 | 2.24830451078349 | -1.24830451078349 |
123 | 2 | 2.94113840210674 | -0.94113840210674 |
124 | 1 | 2.67296958129738 | -1.67296958129738 |
125 | 2 | 2.94963256341093 | -0.949632563410932 |
126 | 2 | 2.4737976075194 | -0.473797607519399 |
127 | 3 | 2.62721471671788 | 0.372785283282117 |
128 | 2 | 2.80524487298024 | -0.805244872980235 |
129 | 2 | 3.31788408209219 | -1.31788408209219 |
130 | 4 | 2.50788930726572 | 1.49211069273428 |
131 | 2 | 3.01596854876397 | -1.01596854876397 |
132 | 3 | 3.33484446140187 | -0.334844461401867 |
133 | 2 | 2.59362498544196 | -0.593624985441963 |
134 | 1 | 2.34682616424045 | -1.34682616424045 |
135 | 2 | 2.8469992421859 | -0.846999242185903 |
136 | 3 | 2.80267884098176 | 0.197321159018235 |
137 | 1 | 1.60077808665618 | -0.600778086656181 |
138 | 2 | 2.45021359087007 | -0.450213590870075 |
139 | 2 | 2.31007570698242 | -0.310075706982419 |
140 | 3 | 2.18087461615409 | 0.819125383845914 |
141 | 3 | 2.73421571530147 | 0.265784284698527 |
142 | 3 | 1.94975331229201 | 1.05024668770799 |
143 | 4 | 3.43169756514110 | 0.568302434858904 |
144 | 4 | 2.99970831624278 | 1.00029168375721 |
145 | 2 | 3.11073396472818 | -1.11073396472818 |
146 | 3 | 2.04005000810359 | 0.959949991896412 |
147 | 3 | 2.94834851284807 | 0.0516514871519341 |
148 | 2 | 2.25688474702127 | -0.256884747021268 |
149 | 1 | 2.62407905524456 | -1.62407905524456 |
150 | 2 | 2.35607443094924 | -0.356074430949238 |
151 | 2 | 2.36789547040395 | -0.367895470403951 |
152 | 4 | 2.95405105346533 | 1.04594894653467 |
153 | 4 | 2.94532875505671 | 1.05467124494329 |
154 | 2 | 2.60563074411679 | -0.60563074411679 |
155 | 3 | 2.518479934417 | 0.481520065583001 |
156 | 2 | 2.69293216010592 | -0.69293216010592 |
157 | 4 | 2.59047224258469 | 1.40952775741531 |
158 | 2 | 1.93074132996434 | 0.0692586700356638 |
159 | 4 | 3.08003681994706 | 0.91996318005294 |
Goldfeld-Quandt test for Heteroskedasticity | |||
p-values | Alternative Hypothesis | ||
breakpoint index | greater | 2-sided | less |
20 | 0.428668139044791 | 0.857336278089582 | 0.571331860955209 |
21 | 0.27733604579056 | 0.55467209158112 | 0.72266395420944 |
22 | 0.240760948498464 | 0.481521896996927 | 0.759239051501536 |
23 | 0.177504817986353 | 0.355009635972706 | 0.822495182013647 |
24 | 0.110388635964664 | 0.220777271929329 | 0.889611364035335 |
25 | 0.0663546789698085 | 0.132709357939617 | 0.933645321030191 |
26 | 0.040594807313886 | 0.081189614627772 | 0.959405192686114 |
27 | 0.107094463047319 | 0.214188926094638 | 0.892905536952681 |
28 | 0.0913433190798588 | 0.182686638159718 | 0.908656680920141 |
29 | 0.0607981243245648 | 0.121596248649130 | 0.939201875675435 |
30 | 0.0429551156120772 | 0.0859102312241543 | 0.957044884387923 |
31 | 0.0564202079537636 | 0.112840415907527 | 0.943579792046236 |
32 | 0.0516201859890342 | 0.103240371978068 | 0.948379814010966 |
33 | 0.0551950762557932 | 0.110390152511586 | 0.944804923744207 |
34 | 0.0587268071220573 | 0.117453614244115 | 0.941273192877943 |
35 | 0.0616814206171002 | 0.123362841234200 | 0.9383185793829 |
36 | 0.0451135458670546 | 0.0902270917341092 | 0.954886454132945 |
37 | 0.0504656563294614 | 0.100931312658923 | 0.949534343670539 |
38 | 0.0589836137479877 | 0.117967227495975 | 0.941016386252012 |
39 | 0.0493370801074684 | 0.0986741602149368 | 0.950662919892532 |
40 | 0.0439283449328107 | 0.0878566898656215 | 0.95607165506719 |
41 | 0.0358971065294053 | 0.0717942130588105 | 0.964102893470595 |
42 | 0.0242539725283055 | 0.0485079450566111 | 0.975746027471694 |
43 | 0.0203727110987992 | 0.0407454221975985 | 0.9796272889012 |
44 | 0.0174695897827455 | 0.0349391795654911 | 0.982530410217254 |
45 | 0.0250953210906046 | 0.0501906421812091 | 0.974904678909395 |
46 | 0.0207479507553039 | 0.0414959015106078 | 0.979252049244696 |
47 | 0.0227067729353674 | 0.0454135458707348 | 0.977293227064633 |
48 | 0.0191027480407725 | 0.0382054960815451 | 0.980897251959228 |
49 | 0.0157251811807353 | 0.0314503623614706 | 0.984274818819265 |
50 | 0.0107475666985538 | 0.0214951333971077 | 0.989252433301446 |
51 | 0.00964806571107034 | 0.0192961314221407 | 0.99035193428893 |
52 | 0.00732501800696291 | 0.0146500360139258 | 0.992674981993037 |
53 | 0.00610444692245212 | 0.0122088938449042 | 0.993895553077548 |
54 | 0.00397833935277452 | 0.00795667870554904 | 0.996021660647226 |
55 | 0.00663516785581521 | 0.0132703357116304 | 0.993364832144185 |
56 | 0.00891067101800732 | 0.0178213420360146 | 0.991089328981993 |
57 | 0.00734653724568696 | 0.0146930744913739 | 0.992653462754313 |
58 | 0.00523374679184329 | 0.0104674935836866 | 0.994766253208157 |
59 | 0.00349140367385705 | 0.00698280734771411 | 0.996508596326143 |
60 | 0.00342898426252641 | 0.00685796852505282 | 0.996571015737474 |
61 | 0.00239773526910487 | 0.00479547053820974 | 0.997602264730895 |
62 | 0.00164033808912388 | 0.00328067617824776 | 0.998359661910876 |
63 | 0.00346486788415394 | 0.00692973576830787 | 0.996535132115846 |
64 | 0.00243910135660809 | 0.00487820271321617 | 0.997560898643392 |
65 | 0.00181608434984212 | 0.00363216869968424 | 0.998183915650158 |
66 | 0.00127867801468335 | 0.00255735602936669 | 0.998721321985317 |
67 | 0.000826910012984882 | 0.00165382002596976 | 0.999173089987015 |
68 | 0.000667178392139518 | 0.00133435678427904 | 0.99933282160786 |
69 | 0.00041763804275479 | 0.00083527608550958 | 0.999582361957245 |
70 | 0.000287658250046701 | 0.000575316500093401 | 0.999712341749953 |
71 | 0.000229430975584082 | 0.000458861951168164 | 0.999770569024416 |
72 | 0.000142061042529593 | 0.000284122085059186 | 0.99985793895747 |
73 | 0.000133233179246372 | 0.000266466358492744 | 0.999866766820754 |
74 | 0.000104643290040762 | 0.000209286580081525 | 0.99989535670996 |
75 | 6.30375019059781e-05 | 0.000126075003811956 | 0.999936962498094 |
76 | 0.000135959810105757 | 0.000271919620211514 | 0.999864040189894 |
77 | 0.000111744160806597 | 0.000223488321613194 | 0.999888255839193 |
78 | 0.000126716325391571 | 0.000253432650783142 | 0.999873283674608 |
79 | 0.000188490240653453 | 0.000376980481306905 | 0.999811509759347 |
80 | 0.000218088724568250 | 0.000436177449136499 | 0.999781911275432 |
81 | 0.000296164942552215 | 0.00059232988510443 | 0.999703835057448 |
82 | 0.000454270750391256 | 0.000908541500782511 | 0.999545729249609 |
83 | 0.000311809651934784 | 0.000623619303869568 | 0.999688190348065 |
84 | 0.00024570790774756 | 0.00049141581549512 | 0.999754292092252 |
85 | 0.000157796896652786 | 0.000315593793305572 | 0.999842203103347 |
86 | 0.000145701602624395 | 0.000291403205248789 | 0.999854298397376 |
87 | 0.000116823307992768 | 0.000233646615985537 | 0.999883176692007 |
88 | 9.44260565070915e-05 | 0.000188852113014183 | 0.999905573943493 |
89 | 7.32996667704886e-05 | 0.000146599333540977 | 0.99992670033323 |
90 | 8.55492302300503e-05 | 0.000171098460460101 | 0.99991445076977 |
91 | 0.000126259608380383 | 0.000252519216760766 | 0.99987374039162 |
92 | 0.000141816931177771 | 0.000283633862355543 | 0.999858183068822 |
93 | 0.000159905055540945 | 0.000319810111081889 | 0.99984009494446 |
94 | 0.000226322838144948 | 0.000452645676289897 | 0.999773677161855 |
95 | 0.000191652834197883 | 0.000383305668395767 | 0.999808347165802 |
96 | 0.000144013557196753 | 0.000288027114393506 | 0.999855986442803 |
97 | 0.000105976774493026 | 0.000211953548986052 | 0.999894023225507 |
98 | 0.000121946587779997 | 0.000243893175559995 | 0.99987805341222 |
99 | 0.000147315032178872 | 0.000294630064357745 | 0.999852684967821 |
100 | 0.000161054376760928 | 0.000322108753521856 | 0.99983894562324 |
101 | 0.000205434073910199 | 0.000410868147820397 | 0.99979456592609 |
102 | 0.000271605803526976 | 0.000543211607053951 | 0.999728394196473 |
103 | 0.000258717402139155 | 0.000517434804278311 | 0.99974128259786 |
104 | 0.000203449630371195 | 0.00040689926074239 | 0.999796550369629 |
105 | 0.00168969576651353 | 0.00337939153302707 | 0.998310304233486 |
106 | 0.00163330228057279 | 0.00326660456114558 | 0.998366697719427 |
107 | 0.00160529356022709 | 0.00321058712045417 | 0.998394706439773 |
108 | 0.00136200991878948 | 0.00272401983757895 | 0.99863799008121 |
109 | 0.00124823089100913 | 0.00249646178201826 | 0.99875176910899 |
110 | 0.00200606138637293 | 0.00401212277274587 | 0.997993938613627 |
111 | 0.00297617065490250 | 0.00595234130980501 | 0.997023829345097 |
112 | 0.0290680308429418 | 0.0581360616858836 | 0.970931969157058 |
113 | 0.0604165395427022 | 0.120833079085404 | 0.939583460457298 |
114 | 0.0859536105648165 | 0.171907221129633 | 0.914046389435184 |
115 | 0.162174275935195 | 0.32434855187039 | 0.837825724064805 |
116 | 0.191299108979191 | 0.382598217958382 | 0.808700891020809 |
117 | 0.196907651078627 | 0.393815302157254 | 0.803092348921373 |
118 | 0.200545476633576 | 0.401090953267152 | 0.799454523366424 |
119 | 0.216781844751067 | 0.433563689502135 | 0.783218155248933 |
120 | 0.243032795154939 | 0.486065590309878 | 0.756967204845061 |
121 | 0.255914921698472 | 0.511829843396943 | 0.744085078301528 |
122 | 0.241780185940003 | 0.483560371880005 | 0.758219814059997 |
123 | 0.210661033105907 | 0.421322066211814 | 0.789338966894093 |
124 | 0.220715669635189 | 0.441431339270377 | 0.779284330364811 |
125 | 0.226985464900521 | 0.453970929801043 | 0.773014535099479 |
126 | 0.178703609551170 | 0.357407219102339 | 0.82129639044883 |
127 | 0.19851294656647 | 0.39702589313294 | 0.80148705343353 |
128 | 0.235941071115642 | 0.471882142231283 | 0.764058928884358 |
129 | 0.246013161633416 | 0.492026323266831 | 0.753986838366584 |
130 | 0.327680426282546 | 0.655360852565093 | 0.672319573717454 |
131 | 0.324757351515695 | 0.64951470303139 | 0.675242648484305 |
132 | 0.249547374513023 | 0.499094749026046 | 0.750452625486977 |
133 | 0.210585402517729 | 0.421170805035459 | 0.78941459748227 |
134 | 0.294035378585677 | 0.588070757171354 | 0.705964621414323 |
135 | 0.442471575604692 | 0.884943151209384 | 0.557528424395308 |
136 | 0.362325380626252 | 0.724650761252504 | 0.637674619373748 |
137 | 0.303495369318894 | 0.606990738637787 | 0.696504630681106 |
138 | 0.197370514893060 | 0.394741029786120 | 0.80262948510694 |
139 | 0.128228810691926 | 0.256457621383852 | 0.871771189308074 |
Meta Analysis of Goldfeld-Quandt test for Heteroskedasticity | |||
Description | # significant tests | % significant tests | OK/NOK |
1% type I error level | 54 | 0.45 | NOK |
5% type I error level | 69 | 0.575 | NOK |
10% type I error level | 77 | 0.641666666666667 | NOK |