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R Software Module

rwasp_arimaforecasting.wasp

Title produced by software

ARIMA Forecasting

Date of computation

Tue, 16 Dec 2008 15:06:35 -0700

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Statistical Computations at FreeStatistics.org, Office for Research Development and Education, URL https://freestatistics.org/blog/index.php?v=date/2008/Dec/16/t1229465299ckcnnojq50pbcax.htm/, Retrieved Wed, 15 May 2024 01:00:34 +0000

Statistical Computations at FreeStatistics.org, Office for Research Development and Education, URL https://freestatistics.org/blog/index.php?pk=34228, Retrieved Wed, 15 May 2024 01:00:34 +0000

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Estimated Impact

152

Family? (F = Feedback message, R = changed R code, M = changed R Module, P = changed Parameters, D = changed Data)

F     [ARIMA Forecasting] [ARIMA Forecasting] [2008-12-14 11:12:20] [005278dde49cfd8c32bf201feaeb19d6]
F   PD    [ARIMA Forecasting] [Step 1] [2008-12-16 22:06:35] [a413cf7744efd6bb212437a3916e2f23] [Current]

Feedback Forum

2008-12-23 11:38:46 [Katja van Hek] [reply] 
De eerste tabel: de voorspelde waarden liggen steeds binnen het 95% betrouwbaarheidsinterval. De voorspelde waarden staan in kolom 3, de interval waarden zijn terug te vinden in kolom 4 en 5. Kolom 6 geeft de p-waarde waarbij de nulhypothese stelt dat de waarde uit de dataset en de voorspelde waarde niet significant verschillend zijn van elkaar. De 7e kolom geeft de waarschijnlijkheid dat er een stijging is tov de laatste waarde. De 8e kolom geeft dan weer de waarschijnlijkheid dat er een stijging is tov vorig jaar. De 9e kolom geeft vervolgens de waarschijnlijkheid dat er een stijging is tov laatst gekende waarde. 
De voorspelde waarden liggen steeds in de buurt van de waarden uit de dataset. De berekende p-waarden zijn allemaal groter dan 5%, en dus niet significant. 
Tweede tabel: enkel de eerste 3 kolommen zijn belangrijk.De 1e kolom geeft de tijdsperiode weer. De 2e kolom geeft de procentuele standaardfout. De standaard fout neemt toe naarmate de tijd vordert. De 3e kolom geeft de procentuele werkelijke fout. Deze kent een fluctuerend verloop.  
De grafiek geeft de testing period een grijze kleur. De bekomen waarden liggen steeds tussen het 95% betrouwbaarheidsinterval.De tweede grafiek bevestigt dit en laat zien dat zowel de voorspelde als de bekomen waarden een gelijkmatig verloop hebben. Ze liggen ook beiden tussen het interval. 
2008-12-23 20:36:31 [] [reply] 
Step 1:  De eerste grafiek zijn waarnemingen en de laatste 12 maanden voorspellingen.  
In de tweede grafiek wordt  ingezoomd op die laatste 12 maanden. 
 
Step 2: Wat je zegt klopt voor de lange termijn-grafiek. Maar uit de korte termijn-grafiek kunnen we niets afleiden omdat de grafiek over een te korter periode gaat. Je kan wel stellen dat de voorspellingen en waarnemingen vrij goed overeenkomen. 
 
Step 3: Juist. 
 
Step 4: De voorspelling kan als volgt geïnterpreteerd worden: De dataset vertoont een stijgende trend, wat normaal is voor gegevens over de werkloosheid en is over het algemeen niet erg seizoenaal gebonden, we zien wel sterke verschillen tussen de verschillende maanden, maar deze doen zich niet voor op bepaalde tijdstippen in het jaar. 
 
Step5: Juist, je kan ook nog zeggen dat de voorspelde waarden binnen het betrouwbaarheidsinterval liggen. 

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Dataseries X:

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Summary of computational transaction
Raw Input	view raw input (R code)
Raw Output	view raw output of R engine
Computing time	4 seconds
R Server	'Sir Ronald Aylmer Fisher' @ 193.190.124.24

\begin{tabular}{lllllllll}
\hline
Summary of computational transaction \tabularnewline
Raw Input & view raw input (R code)  \tabularnewline
Raw Output & view raw output of R engine  \tabularnewline
Computing time & 4 seconds \tabularnewline
R Server & 'Sir Ronald Aylmer Fisher' @ 193.190.124.24 \tabularnewline
\hline
\end{tabular}
%Source: https://freestatistics.org/blog/index.php?pk=34228&T=0

[TABLE]
[ROW][C]Summary of computational transaction[/C][/ROW]
[ROW][C]Raw Input[/C][C]view raw input (R code) [/C][/ROW]
[ROW][C]Raw Output[/C][C]view raw output of R engine [/C][/ROW]
[ROW][C]Computing time[/C][C]4 seconds[/C][/ROW]
[ROW][C]R Server[/C][C]'Sir Ronald Aylmer Fisher' @ 193.190.124.24[/C][/ROW]
[/TABLE]
Source: https://freestatistics.org/blog/index.php?pk=34228&T=0

Globally Unique Identifier (entire table): ba.freestatistics.org/blog/index.php?pk=34228&T=0

As an alternative you can also use a QR Code:

The GUIDs for individual cells are displayed in the table below:

Summary of computational transaction
Raw Input	view raw input (R code)
Raw Output	view raw output of R engine
Computing time	4 seconds
R Server	'Sir Ronald Aylmer Fisher' @ 193.190.124.24

Univariate ARIMA Extrapolation Forecast
time	Y[t]	F[t]	95% LB	95% UB	p-value(H0: Y[t] = F[t])	P(F[t]>Y[t-1])	P(F[t]>Y[t-s])	P(F[t]>Y[360])
348	702.2	-	-	-	-	-	-	-
349	784.8	-	-	-	-	-	-	-
350	810.9	-	-	-	-	-	-	-
351	755.6	-	-	-	-	-	-	-
352	656.8	-	-	-	-	-	-	-
353	615.1	-	-	-	-	-	-	-
354	745.3	-	-	-	-	-	-	-
355	694.1	-	-	-	-	-	-	-
356	675.7	-	-	-	-	-	-	-
357	643.7	-	-	-	-	-	-	-
358	622.1	-	-	-	-	-	-	-
359	634.6	-	-	-	-	-	-	-
360	588	-	-	-	-	-	-	-
361	689.7	681.4452	627.6446	737.4578	0.3863	0.9995	1e-04	0.9995
362	673.9	679.8483	600.4653	764.158	0.445	0.4094	0.0012	0.9836
363	647.9	637.5015	535.3716	748.5415	0.4272	0.2603	0.0186	0.8089
364	568.8	571.9019	453.7519	703.7077	0.4816	0.1292	0.1034	0.4054
365	545.7	534.0724	401.4773	685.5556	0.4402	0.3266	0.1472	0.2427
366	632.6	652.6361	486.1119	843.6435	0.4186	0.8637	0.1708	0.7464
367	643.8	621.6841	442.7402	830.9266	0.4179	0.4593	0.2488	0.6238
368	593.1	590.6605	401.8226	815.7594	0.4915	0.3218	0.2295	0.5092
369	579.7	574.1637	374.8801	815.7654	0.4821	0.439	0.2863	0.4553
370	546	552.6469	345.4877	808.2414	0.4797	0.4178	0.2972	0.3932
371	562.9	571.2615	348.8135	848.3009	0.4764	0.5709	0.327	0.4529
372	572.5	558.9887	328.718	850.0316	0.4638	0.4895	0.4226	0.4226

\begin{tabular}{lllllllll}
\hline
Univariate ARIMA Extrapolation Forecast \tabularnewline
time & Y[t] & F[t] & 95% LB & 95% UB & p-value(H0: Y[t] = F[t]) & P(F[t]>Y[t-1]) & P(F[t]>Y[t-s]) & P(F[t]>Y[360]) \tabularnewline
348 & 702.2 & - & - & - & - & - & - & - \tabularnewline
349 & 784.8 & - & - & - & - & - & - & - \tabularnewline
350 & 810.9 & - & - & - & - & - & - & - \tabularnewline
351 & 755.6 & - & - & - & - & - & - & - \tabularnewline
352 & 656.8 & - & - & - & - & - & - & - \tabularnewline
353 & 615.1 & - & - & - & - & - & - & - \tabularnewline
354 & 745.3 & - & - & - & - & - & - & - \tabularnewline
355 & 694.1 & - & - & - & - & - & - & - \tabularnewline
356 & 675.7 & - & - & - & - & - & - & - \tabularnewline
357 & 643.7 & - & - & - & - & - & - & - \tabularnewline
358 & 622.1 & - & - & - & - & - & - & - \tabularnewline
359 & 634.6 & - & - & - & - & - & - & - \tabularnewline
360 & 588 & - & - & - & - & - & - & - \tabularnewline
361 & 689.7 & 681.4452 & 627.6446 & 737.4578 & 0.3863 & 0.9995 & 1e-04 & 0.9995 \tabularnewline
362 & 673.9 & 679.8483 & 600.4653 & 764.158 & 0.445 & 0.4094 & 0.0012 & 0.9836 \tabularnewline
363 & 647.9 & 637.5015 & 535.3716 & 748.5415 & 0.4272 & 0.2603 & 0.0186 & 0.8089 \tabularnewline
364 & 568.8 & 571.9019 & 453.7519 & 703.7077 & 0.4816 & 0.1292 & 0.1034 & 0.4054 \tabularnewline
365 & 545.7 & 534.0724 & 401.4773 & 685.5556 & 0.4402 & 0.3266 & 0.1472 & 0.2427 \tabularnewline
366 & 632.6 & 652.6361 & 486.1119 & 843.6435 & 0.4186 & 0.8637 & 0.1708 & 0.7464 \tabularnewline
367 & 643.8 & 621.6841 & 442.7402 & 830.9266 & 0.4179 & 0.4593 & 0.2488 & 0.6238 \tabularnewline
368 & 593.1 & 590.6605 & 401.8226 & 815.7594 & 0.4915 & 0.3218 & 0.2295 & 0.5092 \tabularnewline
369 & 579.7 & 574.1637 & 374.8801 & 815.7654 & 0.4821 & 0.439 & 0.2863 & 0.4553 \tabularnewline
370 & 546 & 552.6469 & 345.4877 & 808.2414 & 0.4797 & 0.4178 & 0.2972 & 0.3932 \tabularnewline
371 & 562.9 & 571.2615 & 348.8135 & 848.3009 & 0.4764 & 0.5709 & 0.327 & 0.4529 \tabularnewline
372 & 572.5 & 558.9887 & 328.718 & 850.0316 & 0.4638 & 0.4895 & 0.4226 & 0.4226 \tabularnewline
\hline
\end{tabular}
%Source: https://freestatistics.org/blog/index.php?pk=34228&T=1

[TABLE]
[ROW][C]Univariate ARIMA Extrapolation Forecast[/C][/ROW]
[ROW][C]time[/C][C]Y[t][/C][C]F[t][/C][C]95% LB[/C][C]95% UB[/C][C]p-value(H0: Y[t] = F[t])[/C][C]P(F[t]>Y[t-1])[/C][C]P(F[t]>Y[t-s])[/C][C]P(F[t]>Y[360])[/C][/ROW]
[ROW][C]348[/C][C]702.2[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][/ROW]
[ROW][C]349[/C][C]784.8[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][/ROW]
[ROW][C]350[/C][C]810.9[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][/ROW]
[ROW][C]351[/C][C]755.6[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][/ROW]
[ROW][C]352[/C][C]656.8[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][/ROW]
[ROW][C]353[/C][C]615.1[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][/ROW]
[ROW][C]354[/C][C]745.3[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][/ROW]
[ROW][C]355[/C][C]694.1[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][/ROW]
[ROW][C]356[/C][C]675.7[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][/ROW]
[ROW][C]357[/C][C]643.7[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][/ROW]
[ROW][C]358[/C][C]622.1[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][/ROW]
[ROW][C]359[/C][C]634.6[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][/ROW]
[ROW][C]360[/C][C]588[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][C]-[/C][/ROW]
[ROW][C]361[/C][C]689.7[/C][C]681.4452[/C][C]627.6446[/C][C]737.4578[/C][C]0.3863[/C][C]0.9995[/C][C]1e-04[/C][C]0.9995[/C][/ROW]
[ROW][C]362[/C][C]673.9[/C][C]679.8483[/C][C]600.4653[/C][C]764.158[/C][C]0.445[/C][C]0.4094[/C][C]0.0012[/C][C]0.9836[/C][/ROW]
[ROW][C]363[/C][C]647.9[/C][C]637.5015[/C][C]535.3716[/C][C]748.5415[/C][C]0.4272[/C][C]0.2603[/C][C]0.0186[/C][C]0.8089[/C][/ROW]
[ROW][C]364[/C][C]568.8[/C][C]571.9019[/C][C]453.7519[/C][C]703.7077[/C][C]0.4816[/C][C]0.1292[/C][C]0.1034[/C][C]0.4054[/C][/ROW]
[ROW][C]365[/C][C]545.7[/C][C]534.0724[/C][C]401.4773[/C][C]685.5556[/C][C]0.4402[/C][C]0.3266[/C][C]0.1472[/C][C]0.2427[/C][/ROW]
[ROW][C]366[/C][C]632.6[/C][C]652.6361[/C][C]486.1119[/C][C]843.6435[/C][C]0.4186[/C][C]0.8637[/C][C]0.1708[/C][C]0.7464[/C][/ROW]
[ROW][C]367[/C][C]643.8[/C][C]621.6841[/C][C]442.7402[/C][C]830.9266[/C][C]0.4179[/C][C]0.4593[/C][C]0.2488[/C][C]0.6238[/C][/ROW]
[ROW][C]368[/C][C]593.1[/C][C]590.6605[/C][C]401.8226[/C][C]815.7594[/C][C]0.4915[/C][C]0.3218[/C][C]0.2295[/C][C]0.5092[/C][/ROW]
[ROW][C]369[/C][C]579.7[/C][C]574.1637[/C][C]374.8801[/C][C]815.7654[/C][C]0.4821[/C][C]0.439[/C][C]0.2863[/C][C]0.4553[/C][/ROW]
[ROW][C]370[/C][C]546[/C][C]552.6469[/C][C]345.4877[/C][C]808.2414[/C][C]0.4797[/C][C]0.4178[/C][C]0.2972[/C][C]0.3932[/C][/ROW]
[ROW][C]371[/C][C]562.9[/C][C]571.2615[/C][C]348.8135[/C][C]848.3009[/C][C]0.4764[/C][C]0.5709[/C][C]0.327[/C][C]0.4529[/C][/ROW]
[ROW][C]372[/C][C]572.5[/C][C]558.9887[/C][C]328.718[/C][C]850.0316[/C][C]0.4638[/C][C]0.4895[/C][C]0.4226[/C][C]0.4226[/C][/ROW]
[/TABLE]
Source: https://freestatistics.org/blog/index.php?pk=34228&T=1

Globally Unique Identifier (entire table): ba.freestatistics.org/blog/index.php?pk=34228&T=1

As an alternative you can also use a QR Code:

The GUIDs for individual cells are displayed in the table below:

Univariate ARIMA Extrapolation Forecast
time	Y[t]	F[t]	95% LB	95% UB	p-value(H0: Y[t] = F[t])	P(F[t]>Y[t-1])	P(F[t]>Y[t-s])	P(F[t]>Y[360])
348	702.2	-	-	-	-	-	-	-
349	784.8	-	-	-	-	-	-	-
350	810.9	-	-	-	-	-	-	-
351	755.6	-	-	-	-	-	-	-
352	656.8	-	-	-	-	-	-	-
353	615.1	-	-	-	-	-	-	-
354	745.3	-	-	-	-	-	-	-
355	694.1	-	-	-	-	-	-	-
356	675.7	-	-	-	-	-	-	-
357	643.7	-	-	-	-	-	-	-
358	622.1	-	-	-	-	-	-	-
359	634.6	-	-	-	-	-	-	-
360	588	-	-	-	-	-	-	-
361	689.7	681.4452	627.6446	737.4578	0.3863	0.9995	1e-04	0.9995
362	673.9	679.8483	600.4653	764.158	0.445	0.4094	0.0012	0.9836
363	647.9	637.5015	535.3716	748.5415	0.4272	0.2603	0.0186	0.8089
364	568.8	571.9019	453.7519	703.7077	0.4816	0.1292	0.1034	0.4054
365	545.7	534.0724	401.4773	685.5556	0.4402	0.3266	0.1472	0.2427
366	632.6	652.6361	486.1119	843.6435	0.4186	0.8637	0.1708	0.7464
367	643.8	621.6841	442.7402	830.9266	0.4179	0.4593	0.2488	0.6238
368	593.1	590.6605	401.8226	815.7594	0.4915	0.3218	0.2295	0.5092
369	579.7	574.1637	374.8801	815.7654	0.4821	0.439	0.2863	0.4553
370	546	552.6469	345.4877	808.2414	0.4797	0.4178	0.2972	0.3932
371	562.9	571.2615	348.8135	848.3009	0.4764	0.5709	0.327	0.4529
372	572.5	558.9887	328.718	850.0316	0.4638	0.4895	0.4226	0.4226

Univariate ARIMA Extrapolation Forecast Performance
time	% S.E.	PE	MAPE	Sq.E	MSE	RMSE
361	0.0419	0.0121	0.001	68.1414	5.6784	2.3829
362	0.0633	-0.0087	7e-04	35.3824	2.9485	1.7171
363	0.0889	0.0163	0.0014	108.1281	9.0107	3.0018
364	0.1176	-0.0054	5e-04	9.622	0.8018	0.8955
365	0.1447	0.0218	0.0018	135.2001	11.2667	3.3566
366	0.1493	-0.0307	0.0026	401.4456	33.4538	5.7839
367	0.1717	0.0356	0.003	489.112	40.7593	6.3843
368	0.1944	0.0041	3e-04	5.9514	0.4959	0.7042
369	0.2147	0.0096	8e-04	30.6504	2.5542	1.5982
370	0.236	-0.012	0.001	44.1812	3.6818	1.9188
371	0.2474	-0.0146	0.0012	69.9148	5.8262	2.4138
372	0.2656	0.0242	0.002	182.5548	15.2129	3.9004

\begin{tabular}{lllllllll}
\hline
Univariate ARIMA Extrapolation Forecast Performance \tabularnewline
time & % S.E. & PE & MAPE & Sq.E & MSE & RMSE \tabularnewline
361 & 0.0419 & 0.0121 & 0.001 & 68.1414 & 5.6784 & 2.3829 \tabularnewline
362 & 0.0633 & -0.0087 & 7e-04 & 35.3824 & 2.9485 & 1.7171 \tabularnewline
363 & 0.0889 & 0.0163 & 0.0014 & 108.1281 & 9.0107 & 3.0018 \tabularnewline
364 & 0.1176 & -0.0054 & 5e-04 & 9.622 & 0.8018 & 0.8955 \tabularnewline
365 & 0.1447 & 0.0218 & 0.0018 & 135.2001 & 11.2667 & 3.3566 \tabularnewline
366 & 0.1493 & -0.0307 & 0.0026 & 401.4456 & 33.4538 & 5.7839 \tabularnewline
367 & 0.1717 & 0.0356 & 0.003 & 489.112 & 40.7593 & 6.3843 \tabularnewline
368 & 0.1944 & 0.0041 & 3e-04 & 5.9514 & 0.4959 & 0.7042 \tabularnewline
369 & 0.2147 & 0.0096 & 8e-04 & 30.6504 & 2.5542 & 1.5982 \tabularnewline
370 & 0.236 & -0.012 & 0.001 & 44.1812 & 3.6818 & 1.9188 \tabularnewline
371 & 0.2474 & -0.0146 & 0.0012 & 69.9148 & 5.8262 & 2.4138 \tabularnewline
372 & 0.2656 & 0.0242 & 0.002 & 182.5548 & 15.2129 & 3.9004 \tabularnewline
\hline
\end{tabular}
%Source: https://freestatistics.org/blog/index.php?pk=34228&T=2

[TABLE]
[ROW][C]Univariate ARIMA Extrapolation Forecast Performance[/C][/ROW]
[ROW][C]time[/C][C]% S.E.[/C][C]PE[/C][C]MAPE[/C][C]Sq.E[/C][C]MSE[/C][C]RMSE[/C][/ROW]
[ROW][C]361[/C][C]0.0419[/C][C]0.0121[/C][C]0.001[/C][C]68.1414[/C][C]5.6784[/C][C]2.3829[/C][/ROW]
[ROW][C]362[/C][C]0.0633[/C][C]-0.0087[/C][C]7e-04[/C][C]35.3824[/C][C]2.9485[/C][C]1.7171[/C][/ROW]
[ROW][C]363[/C][C]0.0889[/C][C]0.0163[/C][C]0.0014[/C][C]108.1281[/C][C]9.0107[/C][C]3.0018[/C][/ROW]
[ROW][C]364[/C][C]0.1176[/C][C]-0.0054[/C][C]5e-04[/C][C]9.622[/C][C]0.8018[/C][C]0.8955[/C][/ROW]
[ROW][C]365[/C][C]0.1447[/C][C]0.0218[/C][C]0.0018[/C][C]135.2001[/C][C]11.2667[/C][C]3.3566[/C][/ROW]
[ROW][C]366[/C][C]0.1493[/C][C]-0.0307[/C][C]0.0026[/C][C]401.4456[/C][C]33.4538[/C][C]5.7839[/C][/ROW]
[ROW][C]367[/C][C]0.1717[/C][C]0.0356[/C][C]0.003[/C][C]489.112[/C][C]40.7593[/C][C]6.3843[/C][/ROW]
[ROW][C]368[/C][C]0.1944[/C][C]0.0041[/C][C]3e-04[/C][C]5.9514[/C][C]0.4959[/C][C]0.7042[/C][/ROW]
[ROW][C]369[/C][C]0.2147[/C][C]0.0096[/C][C]8e-04[/C][C]30.6504[/C][C]2.5542[/C][C]1.5982[/C][/ROW]
[ROW][C]370[/C][C]0.236[/C][C]-0.012[/C][C]0.001[/C][C]44.1812[/C][C]3.6818[/C][C]1.9188[/C][/ROW]
[ROW][C]371[/C][C]0.2474[/C][C]-0.0146[/C][C]0.0012[/C][C]69.9148[/C][C]5.8262[/C][C]2.4138[/C][/ROW]
[ROW][C]372[/C][C]0.2656[/C][C]0.0242[/C][C]0.002[/C][C]182.5548[/C][C]15.2129[/C][C]3.9004[/C][/ROW]
[/TABLE]
Source: https://freestatistics.org/blog/index.php?pk=34228&T=2

Globally Unique Identifier (entire table): ba.freestatistics.org/blog/index.php?pk=34228&T=2

As an alternative you can also use a QR Code:

The GUIDs for individual cells are displayed in the table below:

Univariate ARIMA Extrapolation Forecast Performance
time	% S.E.	PE	MAPE	Sq.E	MSE	RMSE
361	0.0419	0.0121	0.001	68.1414	5.6784	2.3829
362	0.0633	-0.0087	7e-04	35.3824	2.9485	1.7171
363	0.0889	0.0163	0.0014	108.1281	9.0107	3.0018
364	0.1176	-0.0054	5e-04	9.622	0.8018	0.8955
365	0.1447	0.0218	0.0018	135.2001	11.2667	3.3566
366	0.1493	-0.0307	0.0026	401.4456	33.4538	5.7839
367	0.1717	0.0356	0.003	489.112	40.7593	6.3843
368	0.1944	0.0041	3e-04	5.9514	0.4959	0.7042
369	0.2147	0.0096	8e-04	30.6504	2.5542	1.5982
370	0.236	-0.012	0.001	44.1812	3.6818	1.9188
371	0.2474	-0.0146	0.0012	69.9148	5.8262	2.4138
372	0.2656	0.0242	0.002	182.5548	15.2129	3.9004

Figure 1

PNG link

Postscript link

PDF link

Figure 2

PNG link

Postscript link

PDF link

Parameters (Session):

par1 = 12 ; par2 = 0.5 ; par3 = 1 ; par4 = 1 ; par5 = 12 ; par6 = 3 ; par7 = 0 ; par8 = 0 ; par9 = 1 ; par10 = FALSE ;

Parameters (R input):

par1 = 12 ; par2 = 0.5 ; par3 = 1 ; par4 = 1 ; par5 = 12 ; par6 = 3 ; par7 = 0 ; par8 = 0 ; par9 = 1 ; par10 = FALSE ;

R code (references can be found in the software module):

par1 <- as.numeric(par1) #cut off periods
par2 <- as.numeric(par2) #lambda
par3 <- as.numeric(par3) #degree of non-seasonal differencing
par4 <- as.numeric(par4) #degree of seasonal differencing
par5 <- as.numeric(par5) #seasonal period
par6 <- as.numeric(par6) #p
par7 <- as.numeric(par7) #q
par8 <- as.numeric(par8) #P
par9 <- as.numeric(par9) #Q
if (par10 == 'TRUE') par10 <- TRUE
if (par10 == 'FALSE') par10 <- FALSE
if (par2 == 0) x <- log(x)
if (par2 != 0) x <- x^par2
lx <- length(x)
first <- lx - 2*par1
nx <- lx - par1
nx1 <- nx + 1
fx <- lx - nx
if (fx < 1) {
fx <- par5
nx1 <- lx + fx - 1
first <- lx - 2*fx
}
first <- 1
if (fx < 3) fx <- round(lx/10,0)
(arima.out <- arima(x[1:nx], order=c(par6,par3,par7), seasonal=list(order=c(par8,par4,par9), period=par5), include.mean=par10, method='ML'))
(forecast <- predict(arima.out,fx))
(lb <- forecast$pred - 1.96 * forecast$se)
(ub <- forecast$pred + 1.96 * forecast$se)
if (par2 == 0) {
x <- exp(x)
forecast$pred <- exp(forecast$pred)
lb <- exp(lb)
ub <- exp(ub)
}
if (par2 != 0) {
x <- x^(1/par2)
forecast$pred <- forecast$pred^(1/par2)
lb <- lb^(1/par2)
ub <- ub^(1/par2)
}
if (par2 < 0) {
olb <- lb
lb <- ub
ub <- olb
}
(actandfor <- c(x[1:nx], forecast$pred))
(perc.se <- (ub-forecast$pred)/1.96/forecast$pred)
bitmap(file='test1.png')
opar <- par(mar=c(4,4,2,2),las=1)
ylim <- c( min(x[first:nx],lb), max(x[first:nx],ub))
plot(x,ylim=ylim,type='n',xlim=c(first,lx))
usr <- par('usr')
rect(usr[1],usr[3],nx+1,usr[4],border=NA,col='lemonchiffon')
rect(nx1,usr[3],usr[2],usr[4],border=NA,col='lavender')
abline(h= (-3:3)*2 , col ='gray', lty =3)
polygon( c(nx1:lx,lx:nx1), c(lb,rev(ub)), col = 'orange', lty=2,border=NA)
lines(nx1:lx, lb , lty=2)
lines(nx1:lx, ub , lty=2)
lines(x, lwd=2)
lines(nx1:lx, forecast$pred , lwd=2 , col ='white')
box()
par(opar)
dev.off()
prob.dec <- array(NA, dim=fx)
prob.sdec <- array(NA, dim=fx)
prob.ldec <- array(NA, dim=fx)
prob.pval <- array(NA, dim=fx)
perf.pe <- array(0, dim=fx)
perf.mape <- array(0, dim=fx)
perf.se <- array(0, dim=fx)
perf.mse <- array(0, dim=fx)
perf.rmse <- array(0, dim=fx)
for (i in 1:fx) {
locSD <- (ub[i] - forecast$pred[i]) / 1.96
perf.pe[i] = (x[nx+i] - forecast$pred[i]) / forecast$pred[i]
perf.mape[i] = perf.mape[i] + abs(perf.pe[i])
perf.se[i] = (x[nx+i] - forecast$pred[i])^2
perf.mse[i] = perf.mse[i] + perf.se[i]
prob.dec[i] = pnorm((x[nx+i-1] - forecast$pred[i]) / locSD)
prob.sdec[i] = pnorm((x[nx+i-par5] - forecast$pred[i]) / locSD)
prob.ldec[i] = pnorm((x[nx] - forecast$pred[i]) / locSD)
prob.pval[i] = pnorm(abs(x[nx+i] - forecast$pred[i]) / locSD)
}
perf.mape = perf.mape / fx
perf.mse = perf.mse / fx
perf.rmse = sqrt(perf.mse)
bitmap(file='test2.png')
plot(forecast$pred, pch=19, type='b',main='ARIMA Extrapolation Forecast', ylab='Forecast and 95% CI', xlab='time',ylim=c(min(lb),max(ub)))
dum <- forecast$pred
dum[1:12] <- x[(nx+1):lx]
lines(dum, lty=1)
lines(ub,lty=3)
lines(lb,lty=3)
dev.off()
load(file='createtable')
a<-table.start()
a<-table.row.start(a)
a<-table.element(a,'Univariate ARIMA Extrapolation Forecast',9,TRUE)
a<-table.row.end(a)
a<-table.row.start(a)
a<-table.element(a,'time',1,header=TRUE)
a<-table.element(a,'Y[t]',1,header=TRUE)
a<-table.element(a,'F[t]',1,header=TRUE)
a<-table.element(a,'95% LB',1,header=TRUE)
a<-table.element(a,'95% UB',1,header=TRUE)
a<-table.element(a,'p-value
(H0: Y[t] = F[t])',1,header=TRUE)
a<-table.element(a,'P(F[t]>Y[t-1])',1,header=TRUE)
a<-table.element(a,'P(F[t]>Y[t-s])',1,header=TRUE)
mylab <- paste('P(F[t]>Y[',nx,sep='')
mylab <- paste(mylab,'])',sep='')
a<-table.element(a,mylab,1,header=TRUE)
a<-table.row.end(a)
for (i in (nx-par5):nx) {
a<-table.row.start(a)
a<-table.element(a,i,header=TRUE)
a<-table.element(a,x[i])
a<-table.element(a,'-')
a<-table.element(a,'-')
a<-table.element(a,'-')
a<-table.element(a,'-')
a<-table.element(a,'-')
a<-table.element(a,'-')
a<-table.element(a,'-')
a<-table.row.end(a)
}
for (i in 1:fx) {
a<-table.row.start(a)
a<-table.element(a,nx+i,header=TRUE)
a<-table.element(a,round(x[nx+i],4))
a<-table.element(a,round(forecast$pred[i],4))
a<-table.element(a,round(lb[i],4))
a<-table.element(a,round(ub[i],4))
a<-table.element(a,round((1-prob.pval[i]),4))
a<-table.element(a,round((1-prob.dec[i]),4))
a<-table.element(a,round((1-prob.sdec[i]),4))
a<-table.element(a,round((1-prob.ldec[i]),4))
a<-table.row.end(a)
}
a<-table.end(a)
table.save(a,file='mytable.tab')
a<-table.start()
a<-table.row.start(a)
a<-table.element(a,'Univariate ARIMA Extrapolation Forecast Performance',7,TRUE)
a<-table.row.end(a)
a<-table.row.start(a)
a<-table.element(a,'time',1,header=TRUE)
a<-table.element(a,'% S.E.',1,header=TRUE)
a<-table.element(a,'PE',1,header=TRUE)
a<-table.element(a,'MAPE',1,header=TRUE)
a<-table.element(a,'Sq.E',1,header=TRUE)
a<-table.element(a,'MSE',1,header=TRUE)
a<-table.element(a,'RMSE',1,header=TRUE)
a<-table.row.end(a)
for (i in 1:fx) {
a<-table.row.start(a)
a<-table.element(a,nx+i,header=TRUE)
a<-table.element(a,round(perc.se[i],4))
a<-table.element(a,round(perf.pe[i],4))
a<-table.element(a,round(perf.mape[i],4))
a<-table.element(a,round(perf.se[i],4))
a<-table.element(a,round(perf.mse[i],4))
a<-table.element(a,round(perf.rmse[i],4))
a<-table.row.end(a)
}
a<-table.end(a)
table.save(a,file='mytable1.tab')

Free Statistics

Description of Statistical Computation

Tree of Dependent Computations

Dataset

Tables (Output of Computation)

Figures (Output of Computation)

Input Parameters & R Code