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Description of Statistical Computation

Author's title

Author*The author of this computation has been verified*
R Software Modulerwasp_exponentialsmoothing.wasp
Title produced by softwareExponential Smoothing
Date of computationSun, 17 Nov 2013 09:50:22 -0500
Cite this page as followsStatistical Computations at FreeStatistics.org, Office for Research Development and Education, URL https://freestatistics.org/blog/index.php?v=date/2013/Nov/17/t1384699920vtz2b8kw15uqu14.htm/, Retrieved Mon, 29 Apr 2024 06:31:13 +0000
Statistical Computations at FreeStatistics.org, Office for Research Development and Education, URL https://freestatistics.org/blog/index.php?pk=225769, Retrieved Mon, 29 Apr 2024 06:31:13 +0000
QR Codes:

Original text written by user:
IsPrivate?No (this computation is public)
User-defined keywords
Estimated Impact60

Tree of Dependent Computations

Family? (F = Feedback message, R = changed R code, M = changed R Module, P = changed Parameters, D = changed Data)
-       [Exponential Smoothing] [Ws8 Exponential S...] [2013-11-17 14:50:22] [113c22c9ed50e819fac395000376f96b] [Current]
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Dataset

Dataseries X:
Download CSV
Histogram
Boxplots 
9700
9081
9084
9743
8587
9731
9563
9998
9437
10038
9918
9252
9737
9035
9133
9487
8700
9627
8947
9283
8829
9947
9628
9318
9605
8640
9214
9567
8547
9185
9470
9123
9278
10170
9434
9655
9429
8739
9552
9687
9019
9672
9206
9069
9788
10312
10105
9863
9656
9295
9946
9701
9049
10190
9706
9765
9893
9994
10433
10073
10112
9266
9820
10097
9115
10411
9678
10408
10153
10368
10581
10597
10680
9738
9556

Tables (Output of Computation)





Summary of computational transaction
Raw Inputview raw input (R code)
Raw Outputview raw output of R engine
Computing time3 seconds
R Server'George Udny Yule' @ yule.wessa.net

\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 & 3 seconds \tabularnewline
R Server & 'George Udny Yule' @ yule.wessa.net \tabularnewline
\hline
\end{tabular}
%Source: https://freestatistics.org/blog/index.php?pk=225769&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]3 seconds[/C][/ROW]
[ROW][C]R Server[/C][C]'George Udny Yule' @ yule.wessa.net[/C][/ROW]
[/TABLE]
Source: https://freestatistics.org/blog/index.php?pk=225769&T=0

Globally Unique Identifier (entire table): ba.freestatistics.org/blog/index.php?pk=225769&T=0

As an alternative you can also use a QR Code:  
QR Code


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

Summary of computational transaction
Raw Inputview raw input (R code)
Raw Outputview raw output of R engine
Computing time3 seconds
R Server'George Udny Yule' @ yule.wessa.net






Estimated Parameters of Exponential Smoothing
ParameterValue
alpha0.114796863298257
beta0.182276928575137
gamma0.552028524618862

\begin{tabular}{lllllllll}
\hline
Estimated Parameters of Exponential Smoothing \tabularnewline
Parameter & Value \tabularnewline
alpha & 0.114796863298257 \tabularnewline
beta & 0.182276928575137 \tabularnewline
gamma & 0.552028524618862 \tabularnewline
\hline
\end{tabular}
%Source: https://freestatistics.org/blog/index.php?pk=225769&T=1

[TABLE]
[ROW][C]Estimated Parameters of Exponential Smoothing[/C][/ROW]
[ROW][C]Parameter[/C][C]Value[/C][/ROW]
[ROW][C]alpha[/C][C]0.114796863298257[/C][/ROW]
[ROW][C]beta[/C][C]0.182276928575137[/C][/ROW]
[ROW][C]gamma[/C][C]0.552028524618862[/C][/ROW]
[/TABLE]
Source: https://freestatistics.org/blog/index.php?pk=225769&T=1

Globally Unique Identifier (entire table): ba.freestatistics.org/blog/index.php?pk=225769&T=1

As an alternative you can also use a QR Code:  
QR Code


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

Estimated Parameters of Exponential Smoothing
ParameterValue
alpha0.114796863298257
beta0.182276928575137
gamma0.552028524618862






Interpolation Forecasts of Exponential Smoothing
tObservedFittedResiduals
1397379769.78069418618-32.7806941861818
1490359093.31591227103-58.3159122710331
1591339215.67915722104-82.6791572210368
1694879566.47569619328-79.4756961932799
1787008753.67194271874-53.6719427187381
1896279659.47888223125-32.4788822312457
1989479350.82964678487-403.829646784869
2092839688.29629327536-405.296293275362
2188299055.06877602586-226.068776025861
2299479559.30462729403387.695372705974
2396289450.02965530042177.970344699575
2493188795.73144048545522.268559514547
2596059305.11634736975299.883652630251
2686408683.0267379677-43.0267379677043
2792148790.39426331927423.605736680733
2895679199.17940147508367.820598524924
2985478492.3955165014754.6044834985296
3091859421.14866186548-236.14866186548
3194708937.607423781532.392576219005
3291239416.30780766799-293.307807667994
3392788926.70135324997351.298646750027
34101709858.85165211439311.148347885612
3594349690.76166400194-256.761664001935
3696559191.43644314758463.563556852416
3794299633.91207251752-204.912072517522
3887398805.93614546096-66.9361454609625
3995529174.25034309644377.749656903561
4096879587.1350139603799.864986039629
4190198702.36240768842316.637592311577
4296729569.24247389957102.757526100426
4392069533.56534036741-327.565340367411
4490699529.10504389932-460.105043899324
4597889346.48317977296441.516820227038
461031210312.1941513574-0.194151357416558
47101059829.08633628827275.913663711728
4898639759.78481102365103.215188976354
4996569850.20625084769-194.206250847692
5092959079.62754159286215.372458407144
5199469740.26702857129205.732971428706
52970110023.4477783762-322.447778376161
5390499175.04657764439-126.046577644394
54101909906.03808870955283.961911290446
5597069673.3246607742732.6753392257342
5697659651.81359426895113.186405731052
57989310009.7694133085-116.769413308479
58999410733.3832933037-739.383293303727
591043310283.3685552977149.631444702296
601007310101.6100228502-28.61002285022
611011210018.946343920693.0536560794408
6292669460.26384707428-194.263847074282
63982010070.9014032279-250.901403227925
641009710019.923130805677.0768691943904
6591159285.0604147138-170.0604147138
661041110212.247197839198.752802160956
6796789823.76969802744-145.76969802744
68104089800.50024374482607.499756255182
691015310095.607330051357.3926699486983
701036810531.7503168496-163.750316849628
711058110587.9446430433-6.94464304330722
721059710296.1614075419300.838592458134
731068010317.9752466026362.024753397398
7497389641.7787904295296.2212095704836
75955610297.3020308051-741.30203080506

\begin{tabular}{lllllllll}
\hline
Interpolation Forecasts of Exponential Smoothing \tabularnewline
t & Observed & Fitted & Residuals \tabularnewline
13 & 9737 & 9769.78069418618 & -32.7806941861818 \tabularnewline
14 & 9035 & 9093.31591227103 & -58.3159122710331 \tabularnewline
15 & 9133 & 9215.67915722104 & -82.6791572210368 \tabularnewline
16 & 9487 & 9566.47569619328 & -79.4756961932799 \tabularnewline
17 & 8700 & 8753.67194271874 & -53.6719427187381 \tabularnewline
18 & 9627 & 9659.47888223125 & -32.4788822312457 \tabularnewline
19 & 8947 & 9350.82964678487 & -403.829646784869 \tabularnewline
20 & 9283 & 9688.29629327536 & -405.296293275362 \tabularnewline
21 & 8829 & 9055.06877602586 & -226.068776025861 \tabularnewline
22 & 9947 & 9559.30462729403 & 387.695372705974 \tabularnewline
23 & 9628 & 9450.02965530042 & 177.970344699575 \tabularnewline
24 & 9318 & 8795.73144048545 & 522.268559514547 \tabularnewline
25 & 9605 & 9305.11634736975 & 299.883652630251 \tabularnewline
26 & 8640 & 8683.0267379677 & -43.0267379677043 \tabularnewline
27 & 9214 & 8790.39426331927 & 423.605736680733 \tabularnewline
28 & 9567 & 9199.17940147508 & 367.820598524924 \tabularnewline
29 & 8547 & 8492.39551650147 & 54.6044834985296 \tabularnewline
30 & 9185 & 9421.14866186548 & -236.14866186548 \tabularnewline
31 & 9470 & 8937.607423781 & 532.392576219005 \tabularnewline
32 & 9123 & 9416.30780766799 & -293.307807667994 \tabularnewline
33 & 9278 & 8926.70135324997 & 351.298646750027 \tabularnewline
34 & 10170 & 9858.85165211439 & 311.148347885612 \tabularnewline
35 & 9434 & 9690.76166400194 & -256.761664001935 \tabularnewline
36 & 9655 & 9191.43644314758 & 463.563556852416 \tabularnewline
37 & 9429 & 9633.91207251752 & -204.912072517522 \tabularnewline
38 & 8739 & 8805.93614546096 & -66.9361454609625 \tabularnewline
39 & 9552 & 9174.25034309644 & 377.749656903561 \tabularnewline
40 & 9687 & 9587.13501396037 & 99.864986039629 \tabularnewline
41 & 9019 & 8702.36240768842 & 316.637592311577 \tabularnewline
42 & 9672 & 9569.24247389957 & 102.757526100426 \tabularnewline
43 & 9206 & 9533.56534036741 & -327.565340367411 \tabularnewline
44 & 9069 & 9529.10504389932 & -460.105043899324 \tabularnewline
45 & 9788 & 9346.48317977296 & 441.516820227038 \tabularnewline
46 & 10312 & 10312.1941513574 & -0.194151357416558 \tabularnewline
47 & 10105 & 9829.08633628827 & 275.913663711728 \tabularnewline
48 & 9863 & 9759.78481102365 & 103.215188976354 \tabularnewline
49 & 9656 & 9850.20625084769 & -194.206250847692 \tabularnewline
50 & 9295 & 9079.62754159286 & 215.372458407144 \tabularnewline
51 & 9946 & 9740.26702857129 & 205.732971428706 \tabularnewline
52 & 9701 & 10023.4477783762 & -322.447778376161 \tabularnewline
53 & 9049 & 9175.04657764439 & -126.046577644394 \tabularnewline
54 & 10190 & 9906.03808870955 & 283.961911290446 \tabularnewline
55 & 9706 & 9673.32466077427 & 32.6753392257342 \tabularnewline
56 & 9765 & 9651.81359426895 & 113.186405731052 \tabularnewline
57 & 9893 & 10009.7694133085 & -116.769413308479 \tabularnewline
58 & 9994 & 10733.3832933037 & -739.383293303727 \tabularnewline
59 & 10433 & 10283.3685552977 & 149.631444702296 \tabularnewline
60 & 10073 & 10101.6100228502 & -28.61002285022 \tabularnewline
61 & 10112 & 10018.9463439206 & 93.0536560794408 \tabularnewline
62 & 9266 & 9460.26384707428 & -194.263847074282 \tabularnewline
63 & 9820 & 10070.9014032279 & -250.901403227925 \tabularnewline
64 & 10097 & 10019.9231308056 & 77.0768691943904 \tabularnewline
65 & 9115 & 9285.0604147138 & -170.0604147138 \tabularnewline
66 & 10411 & 10212.247197839 & 198.752802160956 \tabularnewline
67 & 9678 & 9823.76969802744 & -145.76969802744 \tabularnewline
68 & 10408 & 9800.50024374482 & 607.499756255182 \tabularnewline
69 & 10153 & 10095.6073300513 & 57.3926699486983 \tabularnewline
70 & 10368 & 10531.7503168496 & -163.750316849628 \tabularnewline
71 & 10581 & 10587.9446430433 & -6.94464304330722 \tabularnewline
72 & 10597 & 10296.1614075419 & 300.838592458134 \tabularnewline
73 & 10680 & 10317.9752466026 & 362.024753397398 \tabularnewline
74 & 9738 & 9641.77879042952 & 96.2212095704836 \tabularnewline
75 & 9556 & 10297.3020308051 & -741.30203080506 \tabularnewline
\hline
\end{tabular}
%Source: https://freestatistics.org/blog/index.php?pk=225769&T=2

[TABLE]
[ROW][C]Interpolation Forecasts of Exponential Smoothing[/C][/ROW]
[ROW][C]t[/C][C]Observed[/C][C]Fitted[/C][C]Residuals[/C][/ROW]
[ROW][C]13[/C][C]9737[/C][C]9769.78069418618[/C][C]-32.7806941861818[/C][/ROW]
[ROW][C]14[/C][C]9035[/C][C]9093.31591227103[/C][C]-58.3159122710331[/C][/ROW]
[ROW][C]15[/C][C]9133[/C][C]9215.67915722104[/C][C]-82.6791572210368[/C][/ROW]
[ROW][C]16[/C][C]9487[/C][C]9566.47569619328[/C][C]-79.4756961932799[/C][/ROW]
[ROW][C]17[/C][C]8700[/C][C]8753.67194271874[/C][C]-53.6719427187381[/C][/ROW]
[ROW][C]18[/C][C]9627[/C][C]9659.47888223125[/C][C]-32.4788822312457[/C][/ROW]
[ROW][C]19[/C][C]8947[/C][C]9350.82964678487[/C][C]-403.829646784869[/C][/ROW]
[ROW][C]20[/C][C]9283[/C][C]9688.29629327536[/C][C]-405.296293275362[/C][/ROW]
[ROW][C]21[/C][C]8829[/C][C]9055.06877602586[/C][C]-226.068776025861[/C][/ROW]
[ROW][C]22[/C][C]9947[/C][C]9559.30462729403[/C][C]387.695372705974[/C][/ROW]
[ROW][C]23[/C][C]9628[/C][C]9450.02965530042[/C][C]177.970344699575[/C][/ROW]
[ROW][C]24[/C][C]9318[/C][C]8795.73144048545[/C][C]522.268559514547[/C][/ROW]
[ROW][C]25[/C][C]9605[/C][C]9305.11634736975[/C][C]299.883652630251[/C][/ROW]
[ROW][C]26[/C][C]8640[/C][C]8683.0267379677[/C][C]-43.0267379677043[/C][/ROW]
[ROW][C]27[/C][C]9214[/C][C]8790.39426331927[/C][C]423.605736680733[/C][/ROW]
[ROW][C]28[/C][C]9567[/C][C]9199.17940147508[/C][C]367.820598524924[/C][/ROW]
[ROW][C]29[/C][C]8547[/C][C]8492.39551650147[/C][C]54.6044834985296[/C][/ROW]
[ROW][C]30[/C][C]9185[/C][C]9421.14866186548[/C][C]-236.14866186548[/C][/ROW]
[ROW][C]31[/C][C]9470[/C][C]8937.607423781[/C][C]532.392576219005[/C][/ROW]
[ROW][C]32[/C][C]9123[/C][C]9416.30780766799[/C][C]-293.307807667994[/C][/ROW]
[ROW][C]33[/C][C]9278[/C][C]8926.70135324997[/C][C]351.298646750027[/C][/ROW]
[ROW][C]34[/C][C]10170[/C][C]9858.85165211439[/C][C]311.148347885612[/C][/ROW]
[ROW][C]35[/C][C]9434[/C][C]9690.76166400194[/C][C]-256.761664001935[/C][/ROW]
[ROW][C]36[/C][C]9655[/C][C]9191.43644314758[/C][C]463.563556852416[/C][/ROW]
[ROW][C]37[/C][C]9429[/C][C]9633.91207251752[/C][C]-204.912072517522[/C][/ROW]
[ROW][C]38[/C][C]8739[/C][C]8805.93614546096[/C][C]-66.9361454609625[/C][/ROW]
[ROW][C]39[/C][C]9552[/C][C]9174.25034309644[/C][C]377.749656903561[/C][/ROW]
[ROW][C]40[/C][C]9687[/C][C]9587.13501396037[/C][C]99.864986039629[/C][/ROW]
[ROW][C]41[/C][C]9019[/C][C]8702.36240768842[/C][C]316.637592311577[/C][/ROW]
[ROW][C]42[/C][C]9672[/C][C]9569.24247389957[/C][C]102.757526100426[/C][/ROW]
[ROW][C]43[/C][C]9206[/C][C]9533.56534036741[/C][C]-327.565340367411[/C][/ROW]
[ROW][C]44[/C][C]9069[/C][C]9529.10504389932[/C][C]-460.105043899324[/C][/ROW]
[ROW][C]45[/C][C]9788[/C][C]9346.48317977296[/C][C]441.516820227038[/C][/ROW]
[ROW][C]46[/C][C]10312[/C][C]10312.1941513574[/C][C]-0.194151357416558[/C][/ROW]
[ROW][C]47[/C][C]10105[/C][C]9829.08633628827[/C][C]275.913663711728[/C][/ROW]
[ROW][C]48[/C][C]9863[/C][C]9759.78481102365[/C][C]103.215188976354[/C][/ROW]
[ROW][C]49[/C][C]9656[/C][C]9850.20625084769[/C][C]-194.206250847692[/C][/ROW]
[ROW][C]50[/C][C]9295[/C][C]9079.62754159286[/C][C]215.372458407144[/C][/ROW]
[ROW][C]51[/C][C]9946[/C][C]9740.26702857129[/C][C]205.732971428706[/C][/ROW]
[ROW][C]52[/C][C]9701[/C][C]10023.4477783762[/C][C]-322.447778376161[/C][/ROW]
[ROW][C]53[/C][C]9049[/C][C]9175.04657764439[/C][C]-126.046577644394[/C][/ROW]
[ROW][C]54[/C][C]10190[/C][C]9906.03808870955[/C][C]283.961911290446[/C][/ROW]
[ROW][C]55[/C][C]9706[/C][C]9673.32466077427[/C][C]32.6753392257342[/C][/ROW]
[ROW][C]56[/C][C]9765[/C][C]9651.81359426895[/C][C]113.186405731052[/C][/ROW]
[ROW][C]57[/C][C]9893[/C][C]10009.7694133085[/C][C]-116.769413308479[/C][/ROW]
[ROW][C]58[/C][C]9994[/C][C]10733.3832933037[/C][C]-739.383293303727[/C][/ROW]
[ROW][C]59[/C][C]10433[/C][C]10283.3685552977[/C][C]149.631444702296[/C][/ROW]
[ROW][C]60[/C][C]10073[/C][C]10101.6100228502[/C][C]-28.61002285022[/C][/ROW]
[ROW][C]61[/C][C]10112[/C][C]10018.9463439206[/C][C]93.0536560794408[/C][/ROW]
[ROW][C]62[/C][C]9266[/C][C]9460.26384707428[/C][C]-194.263847074282[/C][/ROW]
[ROW][C]63[/C][C]9820[/C][C]10070.9014032279[/C][C]-250.901403227925[/C][/ROW]
[ROW][C]64[/C][C]10097[/C][C]10019.9231308056[/C][C]77.0768691943904[/C][/ROW]
[ROW][C]65[/C][C]9115[/C][C]9285.0604147138[/C][C]-170.0604147138[/C][/ROW]
[ROW][C]66[/C][C]10411[/C][C]10212.247197839[/C][C]198.752802160956[/C][/ROW]
[ROW][C]67[/C][C]9678[/C][C]9823.76969802744[/C][C]-145.76969802744[/C][/ROW]
[ROW][C]68[/C][C]10408[/C][C]9800.50024374482[/C][C]607.499756255182[/C][/ROW]
[ROW][C]69[/C][C]10153[/C][C]10095.6073300513[/C][C]57.3926699486983[/C][/ROW]
[ROW][C]70[/C][C]10368[/C][C]10531.7503168496[/C][C]-163.750316849628[/C][/ROW]
[ROW][C]71[/C][C]10581[/C][C]10587.9446430433[/C][C]-6.94464304330722[/C][/ROW]
[ROW][C]72[/C][C]10597[/C][C]10296.1614075419[/C][C]300.838592458134[/C][/ROW]
[ROW][C]73[/C][C]10680[/C][C]10317.9752466026[/C][C]362.024753397398[/C][/ROW]
[ROW][C]74[/C][C]9738[/C][C]9641.77879042952[/C][C]96.2212095704836[/C][/ROW]
[ROW][C]75[/C][C]9556[/C][C]10297.3020308051[/C][C]-741.30203080506[/C][/ROW]
[/TABLE]
Source: https://freestatistics.org/blog/index.php?pk=225769&T=2

Globally Unique Identifier (entire table): ba.freestatistics.org/blog/index.php?pk=225769&T=2

As an alternative you can also use a QR Code:  
QR Code


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

Interpolation Forecasts of Exponential Smoothing
tObservedFittedResiduals
1397379769.78069418618-32.7806941861818
1490359093.31591227103-58.3159122710331
1591339215.67915722104-82.6791572210368
1694879566.47569619328-79.4756961932799
1787008753.67194271874-53.6719427187381
1896279659.47888223125-32.4788822312457
1989479350.82964678487-403.829646784869
2092839688.29629327536-405.296293275362
2188299055.06877602586-226.068776025861
2299479559.30462729403387.695372705974
2396289450.02965530042177.970344699575
2493188795.73144048545522.268559514547
2596059305.11634736975299.883652630251
2686408683.0267379677-43.0267379677043
2792148790.39426331927423.605736680733
2895679199.17940147508367.820598524924
2985478492.3955165014754.6044834985296
3091859421.14866186548-236.14866186548
3194708937.607423781532.392576219005
3291239416.30780766799-293.307807667994
3392788926.70135324997351.298646750027
34101709858.85165211439311.148347885612
3594349690.76166400194-256.761664001935
3696559191.43644314758463.563556852416
3794299633.91207251752-204.912072517522
3887398805.93614546096-66.9361454609625
3995529174.25034309644377.749656903561
4096879587.1350139603799.864986039629
4190198702.36240768842316.637592311577
4296729569.24247389957102.757526100426
4392069533.56534036741-327.565340367411
4490699529.10504389932-460.105043899324
4597889346.48317977296441.516820227038
461031210312.1941513574-0.194151357416558
47101059829.08633628827275.913663711728
4898639759.78481102365103.215188976354
4996569850.20625084769-194.206250847692
5092959079.62754159286215.372458407144
5199469740.26702857129205.732971428706
52970110023.4477783762-322.447778376161
5390499175.04657764439-126.046577644394
54101909906.03808870955283.961911290446
5597069673.3246607742732.6753392257342
5697659651.81359426895113.186405731052
57989310009.7694133085-116.769413308479
58999410733.3832933037-739.383293303727
591043310283.3685552977149.631444702296
601007310101.6100228502-28.61002285022
611011210018.946343920693.0536560794408
6292669460.26384707428-194.263847074282
63982010070.9014032279-250.901403227925
641009710019.923130805677.0768691943904
6591159285.0604147138-170.0604147138
661041110212.247197839198.752802160956
6796789823.76969802744-145.76969802744
68104089800.50024374482607.499756255182
691015310095.607330051357.3926699486983
701036810531.7503168496-163.750316849628
711058110587.9446430433-6.94464304330722
721059710296.1614075419300.838592458134
731068010317.9752466026362.024753397398
7497389641.7787904295296.2212095704836
75955610297.3020308051-741.30203080506






Extrapolation Forecasts of Exponential Smoothing
tForecast95% Lower Bound95% Upper Bound
7610363.853384029610016.406535000510711.3002330587
779480.821328247299126.125878569599835.51677792499
7810656.234050109510286.189003960811026.2790962582
7910065.6011955269684.8360494237810446.3663416282
8010448.027721928610047.237088620710848.8183552365
8110400.77751783049980.7507614152910820.8042742455
8210726.795950190810279.026803193311174.5650971883
8310882.225554964910405.527708575311358.9234013545
8410736.866235681210235.128184728911238.6042866336
8510746.975279354710214.563684909211279.3868738003
869869.056694121869332.3479543343910405.7654339093
8710089.73322097439629.7716140845510549.6948278641

\begin{tabular}{lllllllll}
\hline
Extrapolation Forecasts of Exponential Smoothing \tabularnewline
t & Forecast & 95% Lower Bound & 95% Upper Bound \tabularnewline
76 & 10363.8533840296 & 10016.4065350005 & 10711.3002330587 \tabularnewline
77 & 9480.82132824729 & 9126.12587856959 & 9835.51677792499 \tabularnewline
78 & 10656.2340501095 & 10286.1890039608 & 11026.2790962582 \tabularnewline
79 & 10065.601195526 & 9684.83604942378 & 10446.3663416282 \tabularnewline
80 & 10448.0277219286 & 10047.2370886207 & 10848.8183552365 \tabularnewline
81 & 10400.7775178304 & 9980.75076141529 & 10820.8042742455 \tabularnewline
82 & 10726.7959501908 & 10279.0268031933 & 11174.5650971883 \tabularnewline
83 & 10882.2255549649 & 10405.5277085753 & 11358.9234013545 \tabularnewline
84 & 10736.8662356812 & 10235.1281847289 & 11238.6042866336 \tabularnewline
85 & 10746.9752793547 & 10214.5636849092 & 11279.3868738003 \tabularnewline
86 & 9869.05669412186 & 9332.34795433439 & 10405.7654339093 \tabularnewline
87 & 10089.7332209743 & 9629.77161408455 & 10549.6948278641 \tabularnewline
\hline
\end{tabular}
%Source: https://freestatistics.org/blog/index.php?pk=225769&T=3

[TABLE]
[ROW][C]Extrapolation Forecasts of Exponential Smoothing[/C][/ROW]
[ROW][C]t[/C][C]Forecast[/C][C]95% Lower Bound[/C][C]95% Upper Bound[/C][/ROW]
[ROW][C]76[/C][C]10363.8533840296[/C][C]10016.4065350005[/C][C]10711.3002330587[/C][/ROW]
[ROW][C]77[/C][C]9480.82132824729[/C][C]9126.12587856959[/C][C]9835.51677792499[/C][/ROW]
[ROW][C]78[/C][C]10656.2340501095[/C][C]10286.1890039608[/C][C]11026.2790962582[/C][/ROW]
[ROW][C]79[/C][C]10065.601195526[/C][C]9684.83604942378[/C][C]10446.3663416282[/C][/ROW]
[ROW][C]80[/C][C]10448.0277219286[/C][C]10047.2370886207[/C][C]10848.8183552365[/C][/ROW]
[ROW][C]81[/C][C]10400.7775178304[/C][C]9980.75076141529[/C][C]10820.8042742455[/C][/ROW]
[ROW][C]82[/C][C]10726.7959501908[/C][C]10279.0268031933[/C][C]11174.5650971883[/C][/ROW]
[ROW][C]83[/C][C]10882.2255549649[/C][C]10405.5277085753[/C][C]11358.9234013545[/C][/ROW]
[ROW][C]84[/C][C]10736.8662356812[/C][C]10235.1281847289[/C][C]11238.6042866336[/C][/ROW]
[ROW][C]85[/C][C]10746.9752793547[/C][C]10214.5636849092[/C][C]11279.3868738003[/C][/ROW]
[ROW][C]86[/C][C]9869.05669412186[/C][C]9332.34795433439[/C][C]10405.7654339093[/C][/ROW]
[ROW][C]87[/C][C]10089.7332209743[/C][C]9629.77161408455[/C][C]10549.6948278641[/C][/ROW]
[/TABLE]
Source: https://freestatistics.org/blog/index.php?pk=225769&T=3

Globally Unique Identifier (entire table): ba.freestatistics.org/blog/index.php?pk=225769&T=3

As an alternative you can also use a QR Code:  
QR Code


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

Extrapolation Forecasts of Exponential Smoothing
tForecast95% Lower Bound95% Upper Bound
7610363.853384029610016.406535000510711.3002330587
779480.821328247299126.125878569599835.51677792499
7810656.234050109510286.189003960811026.2790962582
7910065.6011955269684.8360494237810446.3663416282
8010448.027721928610047.237088620710848.8183552365
8110400.77751783049980.7507614152910820.8042742455
8210726.795950190810279.026803193311174.5650971883
8310882.225554964910405.527708575311358.9234013545
8410736.866235681210235.128184728911238.6042866336
8510746.975279354710214.563684909211279.3868738003
869869.056694121869332.3479543343910405.7654339093
8710089.73322097439629.7716140845510549.6948278641


Figures (Output of Computation)

Input Parameters & R Code

Parameters (Session):
par1 = 12 ; par2 = Triple ; par3 = multiplicative ;
Parameters (R input):
par1 = 12 ; par2 = Triple ; par3 = multiplicative ;
R code (references can be found in the software module):
par3 <- 'multiplicative'
par2 <- 'Double'
par1 <- '12'
par1 <- as.numeric(par1)
if (par2 == 'Single') K <- 1
if (par2 == 'Double') K <- 2
if (par2 == 'Triple') K <- par1
nx <- length(x)
nxmK <- nx - K
x <- ts(x, frequency = par1)
if (par2 == 'Single') fit <- HoltWinters(x, gamma=F, beta=F)
if (par2 == 'Double') fit <- HoltWinters(x, gamma=F)
if (par2 == 'Triple') fit <- HoltWinters(x, seasonal=par3)
fit
myresid <- x - fit$fitted[,'xhat']
bitmap(file='test1.png')
op <- par(mfrow=c(2,1))
plot(fit,ylab='Observed (black) / Fitted (red)',main='Interpolation Fit of Exponential Smoothing')
plot(myresid,ylab='Residuals',main='Interpolation Prediction Errors')
par(op)
dev.off()
bitmap(file='test2.png')
p <- predict(fit, par1, prediction.interval=TRUE)
np <- length(p[,1])
plot(fit,p,ylab='Observed (black) / Fitted (red)',main='Extrapolation Fit of Exponential Smoothing')
dev.off()
bitmap(file='test3.png')
op <- par(mfrow = c(2,2))
acf(as.numeric(myresid),lag.max = nx/2,main='Residual ACF')
spectrum(myresid,main='Residals Periodogram')
cpgram(myresid,main='Residal Cumulative Periodogram')
qqnorm(myresid,main='Residual Normal QQ Plot')
qqline(myresid)
par(op)
dev.off()
load(file='createtable')
a<-table.start()
a<-table.row.start(a)
a<-table.element(a,'Estimated Parameters of Exponential Smoothing',2,TRUE)
a<-table.row.end(a)
a<-table.row.start(a)
a<-table.element(a,'Parameter',header=TRUE)
a<-table.element(a,'Value',header=TRUE)
a<-table.row.end(a)
a<-table.row.start(a)
a<-table.element(a,'alpha',header=TRUE)
a<-table.element(a,fit$alpha)
a<-table.row.end(a)
a<-table.row.start(a)
a<-table.element(a,'beta',header=TRUE)
a<-table.element(a,fit$beta)
a<-table.row.end(a)
a<-table.row.start(a)
a<-table.element(a,'gamma',header=TRUE)
a<-table.element(a,fit$gamma)
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,'Interpolation Forecasts of Exponential Smoothing',4,TRUE)
a<-table.row.end(a)
a<-table.row.start(a)
a<-table.element(a,'t',header=TRUE)
a<-table.element(a,'Observed',header=TRUE)
a<-table.element(a,'Fitted',header=TRUE)
a<-table.element(a,'Residuals',header=TRUE)
a<-table.row.end(a)
for (i in 1:nxmK) {
a<-table.row.start(a)
a<-table.element(a,i+K,header=TRUE)
a<-table.element(a,x[i+K])
a<-table.element(a,fit$fitted[i,'xhat'])
a<-table.element(a,myresid[i])
a<-table.row.end(a)
}
a<-table.end(a)
table.save(a,file='mytable1.tab')
a<-table.start()
a<-table.row.start(a)
a<-table.element(a,'Extrapolation Forecasts of Exponential Smoothing',4,TRUE)
a<-table.row.end(a)
a<-table.row.start(a)
a<-table.element(a,'t',header=TRUE)
a<-table.element(a,'Forecast',header=TRUE)
a<-table.element(a,'95% Lower Bound',header=TRUE)
a<-table.element(a,'95% Upper Bound',header=TRUE)
a<-table.row.end(a)
for (i in 1:np) {
a<-table.row.start(a)
a<-table.element(a,nx+i,header=TRUE)
a<-table.element(a,p[i,'fit'])
a<-table.element(a,p[i,'lwr'])
a<-table.element(a,p[i,'upr'])
a<-table.row.end(a)
}
a<-table.end(a)
table.save(a,file='mytable2.tab')