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Description of Statistical Computation

Author's title

Author*Unverified author*
R Software Modulerwasp_exponentialsmoothing.wasp
Title produced by softwareExponential Smoothing
Date of computationMon, 01 May 2017 16:03:17 +0100
Cite this page as followsStatistical Computations at FreeStatistics.org, Office for Research Development and Education, URL https://freestatistics.org/blog/index.php?v=date/2017/May/01/t1493651029sr9t78ci2lur1ls.htm/, Retrieved Thu, 16 May 2024 07:33:09 +0200
Statistical Computations at FreeStatistics.org, Office for Research Development and Education, URL https://freestatistics.org/blog/index.php?pk=, Retrieved Thu, 16 May 2024 07:33:09 +0200
QR Codes:

Original text written by user:
IsPrivate?No (this computation is public)
User-defined keywords
Estimated Impact0

Tree of Dependent Computations

Dataset

Dataseries X:
Download CSV
Histogram
Boxplots 
92.76
93.12
93.6
93.24
93.4
93.32
93.13
93.19
93.84
94.01
93.78
93.47
93.6
92.85
92.91
92.29
92.5
93.1
92.86
93.19
93.73
93.88
93.85
93.45
93.43
93.59
95.28
94.95
94.49
94.45
94.35
95.52
96.89
97.54
97.65
97.35
98.2
99.46
100.35
99.72
99.69
99.62
99.77
100.19
100.82
100.36
101.08
100.73
101.51
102.12
102.88
103.47
103.53
103.67
103.68
103.76
103.67
103.01
103.39
103.43
103.4
104.8

Tables (Output of Computation)





Summary of computational transaction
Raw Inputview raw input (R code)
Raw Outputview raw output of R engine
Computing time2 seconds
R Server'Gwilym Jenkins' @ jenkins.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 & 2 seconds \tabularnewline
R Server & 'Gwilym Jenkins' @ jenkins.wessa.net \tabularnewline
\hline
\end{tabular}
%Source: https://freestatistics.org/blog/index.php?pk=&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]2 seconds[/C][/ROW]
[ROW][C]R Server[/C][C]'Gwilym Jenkins' @ jenkins.wessa.net[/C][/ROW]
[/TABLE]
Source: https://freestatistics.org/blog/index.php?pk=&T=0

Globally Unique Identifier (entire table): ba.freestatistics.org/blog/index.php?pk=&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 time2 seconds
R Server'Gwilym Jenkins' @ jenkins.wessa.net






Estimated Parameters of Exponential Smoothing
ParameterValue
alpha0.850882342210893
beta0.056623319177496
gamma1

\begin{tabular}{lllllllll}
\hline
Estimated Parameters of Exponential Smoothing \tabularnewline
Parameter & Value \tabularnewline
alpha & 0.850882342210893 \tabularnewline
beta & 0.056623319177496 \tabularnewline
gamma & 1 \tabularnewline
\hline
\end{tabular}
%Source: https://freestatistics.org/blog/index.php?pk=&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]0.850882342210893[/C][/ROW]
[ROW][C]beta[/C][C]0.056623319177496[/C][/ROW]
[ROW][C]gamma[/C][C]1[/C][/ROW]
[/TABLE]
Source: https://freestatistics.org/blog/index.php?pk=&T=1

Globally Unique Identifier (entire table): ba.freestatistics.org/blog/index.php?pk=&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
alpha0.850882342210893
beta0.056623319177496
gamma1






Interpolation Forecasts of Exponential Smoothing
tObservedFittedResiduals
1393.693.8814580300668-0.281458030066773
1492.8592.8613131841517-0.0113131841516605
1592.9192.87414948155280.0358505184472193
1692.2992.25447751669880.0355224833012358
1792.592.45867994737520.0413200526248119
1893.193.05497952832140.045020471678626
1992.8692.83466345884960.0253365411503665
2093.1992.85915704802250.330842951977473
2193.7393.813012233289-0.0830122332890255
2293.8893.9594224012227-0.0794224012227431
2393.8593.71422719763010.135772802369871
2493.4593.5476887076253-0.097688707625295
2593.4393.5496565765176-0.119656576517613
2693.5992.7211456262260.868854373773956
2795.2893.54539220703141.73460779296863
2894.9594.49318410374490.456815896255151
2994.4995.2193064207926-0.729306420792597
3094.4595.2942599228589-0.84425992285891
3194.3594.3879402079678-0.0379402079678357
3295.5294.47953657987061.04046342012937
3396.8996.0992642256290.790735774371001
3497.5497.14903314702560.390966852974373
3597.6597.50559027828780.144409721712179
3697.3597.4734849058796-0.123484905879607
3798.297.62748678404320.572513215956775
3899.4697.71166566846181.74833433153822
39100.3599.66897496713650.681025032863474
4099.7299.6821404516180.0378595483819879
4199.69100.051332994692-0.361332994691864
4299.62100.648256636981-1.02825663698098
4399.7799.8841890651296-0.114189065129636
44100.19100.265828230606-0.0758282306060778
45100.82101.055830766454-0.235830766453944
46100.36101.259135171354-0.899135171353691
47101.08100.4932644680480.586735531952343
48100.73100.823733222469-0.0937332224693819
49101.51101.1535118803840.356488119616472
50102.12101.2408991540490.879100845950632
51102.88102.2871127847080.592887215292066
52103.47102.0890817932281.38091820677204
53103.53103.588415938902-0.058415938902229
54103.67104.425141166781-0.755141166781371
55103.68104.106184928176-0.426184928176397
56103.76104.299237788851-0.539237788850727
57103.67104.731888535343-1.06188853534293
58103.01104.134059197736-1.12405919773566
59103.39103.3874102354010.00258976459882376
60103.43103.0687233151530.361276684846985
61103.4103.842009708237-0.442009708236995
62104.8103.2638339285521.53616607144774

\begin{tabular}{lllllllll}
\hline
Interpolation Forecasts of Exponential Smoothing \tabularnewline
t & Observed & Fitted & Residuals \tabularnewline
13 & 93.6 & 93.8814580300668 & -0.281458030066773 \tabularnewline
14 & 92.85 & 92.8613131841517 & -0.0113131841516605 \tabularnewline
15 & 92.91 & 92.8741494815528 & 0.0358505184472193 \tabularnewline
16 & 92.29 & 92.2544775166988 & 0.0355224833012358 \tabularnewline
17 & 92.5 & 92.4586799473752 & 0.0413200526248119 \tabularnewline
18 & 93.1 & 93.0549795283214 & 0.045020471678626 \tabularnewline
19 & 92.86 & 92.8346634588496 & 0.0253365411503665 \tabularnewline
20 & 93.19 & 92.8591570480225 & 0.330842951977473 \tabularnewline
21 & 93.73 & 93.813012233289 & -0.0830122332890255 \tabularnewline
22 & 93.88 & 93.9594224012227 & -0.0794224012227431 \tabularnewline
23 & 93.85 & 93.7142271976301 & 0.135772802369871 \tabularnewline
24 & 93.45 & 93.5476887076253 & -0.097688707625295 \tabularnewline
25 & 93.43 & 93.5496565765176 & -0.119656576517613 \tabularnewline
26 & 93.59 & 92.721145626226 & 0.868854373773956 \tabularnewline
27 & 95.28 & 93.5453922070314 & 1.73460779296863 \tabularnewline
28 & 94.95 & 94.4931841037449 & 0.456815896255151 \tabularnewline
29 & 94.49 & 95.2193064207926 & -0.729306420792597 \tabularnewline
30 & 94.45 & 95.2942599228589 & -0.84425992285891 \tabularnewline
31 & 94.35 & 94.3879402079678 & -0.0379402079678357 \tabularnewline
32 & 95.52 & 94.4795365798706 & 1.04046342012937 \tabularnewline
33 & 96.89 & 96.099264225629 & 0.790735774371001 \tabularnewline
34 & 97.54 & 97.1490331470256 & 0.390966852974373 \tabularnewline
35 & 97.65 & 97.5055902782878 & 0.144409721712179 \tabularnewline
36 & 97.35 & 97.4734849058796 & -0.123484905879607 \tabularnewline
37 & 98.2 & 97.6274867840432 & 0.572513215956775 \tabularnewline
38 & 99.46 & 97.7116656684618 & 1.74833433153822 \tabularnewline
39 & 100.35 & 99.6689749671365 & 0.681025032863474 \tabularnewline
40 & 99.72 & 99.682140451618 & 0.0378595483819879 \tabularnewline
41 & 99.69 & 100.051332994692 & -0.361332994691864 \tabularnewline
42 & 99.62 & 100.648256636981 & -1.02825663698098 \tabularnewline
43 & 99.77 & 99.8841890651296 & -0.114189065129636 \tabularnewline
44 & 100.19 & 100.265828230606 & -0.0758282306060778 \tabularnewline
45 & 100.82 & 101.055830766454 & -0.235830766453944 \tabularnewline
46 & 100.36 & 101.259135171354 & -0.899135171353691 \tabularnewline
47 & 101.08 & 100.493264468048 & 0.586735531952343 \tabularnewline
48 & 100.73 & 100.823733222469 & -0.0937332224693819 \tabularnewline
49 & 101.51 & 101.153511880384 & 0.356488119616472 \tabularnewline
50 & 102.12 & 101.240899154049 & 0.879100845950632 \tabularnewline
51 & 102.88 & 102.287112784708 & 0.592887215292066 \tabularnewline
52 & 103.47 & 102.089081793228 & 1.38091820677204 \tabularnewline
53 & 103.53 & 103.588415938902 & -0.058415938902229 \tabularnewline
54 & 103.67 & 104.425141166781 & -0.755141166781371 \tabularnewline
55 & 103.68 & 104.106184928176 & -0.426184928176397 \tabularnewline
56 & 103.76 & 104.299237788851 & -0.539237788850727 \tabularnewline
57 & 103.67 & 104.731888535343 & -1.06188853534293 \tabularnewline
58 & 103.01 & 104.134059197736 & -1.12405919773566 \tabularnewline
59 & 103.39 & 103.387410235401 & 0.00258976459882376 \tabularnewline
60 & 103.43 & 103.068723315153 & 0.361276684846985 \tabularnewline
61 & 103.4 & 103.842009708237 & -0.442009708236995 \tabularnewline
62 & 104.8 & 103.263833928552 & 1.53616607144774 \tabularnewline
\hline
\end{tabular}
%Source: https://freestatistics.org/blog/index.php?pk=&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]93.6[/C][C]93.8814580300668[/C][C]-0.281458030066773[/C][/ROW]
[ROW][C]14[/C][C]92.85[/C][C]92.8613131841517[/C][C]-0.0113131841516605[/C][/ROW]
[ROW][C]15[/C][C]92.91[/C][C]92.8741494815528[/C][C]0.0358505184472193[/C][/ROW]
[ROW][C]16[/C][C]92.29[/C][C]92.2544775166988[/C][C]0.0355224833012358[/C][/ROW]
[ROW][C]17[/C][C]92.5[/C][C]92.4586799473752[/C][C]0.0413200526248119[/C][/ROW]
[ROW][C]18[/C][C]93.1[/C][C]93.0549795283214[/C][C]0.045020471678626[/C][/ROW]
[ROW][C]19[/C][C]92.86[/C][C]92.8346634588496[/C][C]0.0253365411503665[/C][/ROW]
[ROW][C]20[/C][C]93.19[/C][C]92.8591570480225[/C][C]0.330842951977473[/C][/ROW]
[ROW][C]21[/C][C]93.73[/C][C]93.813012233289[/C][C]-0.0830122332890255[/C][/ROW]
[ROW][C]22[/C][C]93.88[/C][C]93.9594224012227[/C][C]-0.0794224012227431[/C][/ROW]
[ROW][C]23[/C][C]93.85[/C][C]93.7142271976301[/C][C]0.135772802369871[/C][/ROW]
[ROW][C]24[/C][C]93.45[/C][C]93.5476887076253[/C][C]-0.097688707625295[/C][/ROW]
[ROW][C]25[/C][C]93.43[/C][C]93.5496565765176[/C][C]-0.119656576517613[/C][/ROW]
[ROW][C]26[/C][C]93.59[/C][C]92.721145626226[/C][C]0.868854373773956[/C][/ROW]
[ROW][C]27[/C][C]95.28[/C][C]93.5453922070314[/C][C]1.73460779296863[/C][/ROW]
[ROW][C]28[/C][C]94.95[/C][C]94.4931841037449[/C][C]0.456815896255151[/C][/ROW]
[ROW][C]29[/C][C]94.49[/C][C]95.2193064207926[/C][C]-0.729306420792597[/C][/ROW]
[ROW][C]30[/C][C]94.45[/C][C]95.2942599228589[/C][C]-0.84425992285891[/C][/ROW]
[ROW][C]31[/C][C]94.35[/C][C]94.3879402079678[/C][C]-0.0379402079678357[/C][/ROW]
[ROW][C]32[/C][C]95.52[/C][C]94.4795365798706[/C][C]1.04046342012937[/C][/ROW]
[ROW][C]33[/C][C]96.89[/C][C]96.099264225629[/C][C]0.790735774371001[/C][/ROW]
[ROW][C]34[/C][C]97.54[/C][C]97.1490331470256[/C][C]0.390966852974373[/C][/ROW]
[ROW][C]35[/C][C]97.65[/C][C]97.5055902782878[/C][C]0.144409721712179[/C][/ROW]
[ROW][C]36[/C][C]97.35[/C][C]97.4734849058796[/C][C]-0.123484905879607[/C][/ROW]
[ROW][C]37[/C][C]98.2[/C][C]97.6274867840432[/C][C]0.572513215956775[/C][/ROW]
[ROW][C]38[/C][C]99.46[/C][C]97.7116656684618[/C][C]1.74833433153822[/C][/ROW]
[ROW][C]39[/C][C]100.35[/C][C]99.6689749671365[/C][C]0.681025032863474[/C][/ROW]
[ROW][C]40[/C][C]99.72[/C][C]99.682140451618[/C][C]0.0378595483819879[/C][/ROW]
[ROW][C]41[/C][C]99.69[/C][C]100.051332994692[/C][C]-0.361332994691864[/C][/ROW]
[ROW][C]42[/C][C]99.62[/C][C]100.648256636981[/C][C]-1.02825663698098[/C][/ROW]
[ROW][C]43[/C][C]99.77[/C][C]99.8841890651296[/C][C]-0.114189065129636[/C][/ROW]
[ROW][C]44[/C][C]100.19[/C][C]100.265828230606[/C][C]-0.0758282306060778[/C][/ROW]
[ROW][C]45[/C][C]100.82[/C][C]101.055830766454[/C][C]-0.235830766453944[/C][/ROW]
[ROW][C]46[/C][C]100.36[/C][C]101.259135171354[/C][C]-0.899135171353691[/C][/ROW]
[ROW][C]47[/C][C]101.08[/C][C]100.493264468048[/C][C]0.586735531952343[/C][/ROW]
[ROW][C]48[/C][C]100.73[/C][C]100.823733222469[/C][C]-0.0937332224693819[/C][/ROW]
[ROW][C]49[/C][C]101.51[/C][C]101.153511880384[/C][C]0.356488119616472[/C][/ROW]
[ROW][C]50[/C][C]102.12[/C][C]101.240899154049[/C][C]0.879100845950632[/C][/ROW]
[ROW][C]51[/C][C]102.88[/C][C]102.287112784708[/C][C]0.592887215292066[/C][/ROW]
[ROW][C]52[/C][C]103.47[/C][C]102.089081793228[/C][C]1.38091820677204[/C][/ROW]
[ROW][C]53[/C][C]103.53[/C][C]103.588415938902[/C][C]-0.058415938902229[/C][/ROW]
[ROW][C]54[/C][C]103.67[/C][C]104.425141166781[/C][C]-0.755141166781371[/C][/ROW]
[ROW][C]55[/C][C]103.68[/C][C]104.106184928176[/C][C]-0.426184928176397[/C][/ROW]
[ROW][C]56[/C][C]103.76[/C][C]104.299237788851[/C][C]-0.539237788850727[/C][/ROW]
[ROW][C]57[/C][C]103.67[/C][C]104.731888535343[/C][C]-1.06188853534293[/C][/ROW]
[ROW][C]58[/C][C]103.01[/C][C]104.134059197736[/C][C]-1.12405919773566[/C][/ROW]
[ROW][C]59[/C][C]103.39[/C][C]103.387410235401[/C][C]0.00258976459882376[/C][/ROW]
[ROW][C]60[/C][C]103.43[/C][C]103.068723315153[/C][C]0.361276684846985[/C][/ROW]
[ROW][C]61[/C][C]103.4[/C][C]103.842009708237[/C][C]-0.442009708236995[/C][/ROW]
[ROW][C]62[/C][C]104.8[/C][C]103.263833928552[/C][C]1.53616607144774[/C][/ROW]
[/TABLE]
Source: https://freestatistics.org/blog/index.php?pk=&T=2

Globally Unique Identifier (entire table): ba.freestatistics.org/blog/index.php?pk=&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
1393.693.8814580300668-0.281458030066773
1492.8592.8613131841517-0.0113131841516605
1592.9192.87414948155280.0358505184472193
1692.2992.25447751669880.0355224833012358
1792.592.45867994737520.0413200526248119
1893.193.05497952832140.045020471678626
1992.8692.83466345884960.0253365411503665
2093.1992.85915704802250.330842951977473
2193.7393.813012233289-0.0830122332890255
2293.8893.9594224012227-0.0794224012227431
2393.8593.71422719763010.135772802369871
2493.4593.5476887076253-0.097688707625295
2593.4393.5496565765176-0.119656576517613
2693.5992.7211456262260.868854373773956
2795.2893.54539220703141.73460779296863
2894.9594.49318410374490.456815896255151
2994.4995.2193064207926-0.729306420792597
3094.4595.2942599228589-0.84425992285891
3194.3594.3879402079678-0.0379402079678357
3295.5294.47953657987061.04046342012937
3396.8996.0992642256290.790735774371001
3497.5497.14903314702560.390966852974373
3597.6597.50559027828780.144409721712179
3697.3597.4734849058796-0.123484905879607
3798.297.62748678404320.572513215956775
3899.4697.71166566846181.74833433153822
39100.3599.66897496713650.681025032863474
4099.7299.6821404516180.0378595483819879
4199.69100.051332994692-0.361332994691864
4299.62100.648256636981-1.02825663698098
4399.7799.8841890651296-0.114189065129636
44100.19100.265828230606-0.0758282306060778
45100.82101.055830766454-0.235830766453944
46100.36101.259135171354-0.899135171353691
47101.08100.4932644680480.586735531952343
48100.73100.823733222469-0.0937332224693819
49101.51101.1535118803840.356488119616472
50102.12101.2408991540490.879100845950632
51102.88102.2871127847080.592887215292066
52103.47102.0890817932281.38091820677204
53103.53103.588415938902-0.058415938902229
54103.67104.425141166781-0.755141166781371
55103.68104.106184928176-0.426184928176397
56103.76104.299237788851-0.539237788850727
57103.67104.731888535343-1.06188853534293
58103.01104.134059197736-1.12405919773566
59103.39103.3874102354010.00258976459882376
60103.43103.0687233151530.361276684846985
61103.4103.842009708237-0.442009708236995
62104.8103.2638339285521.53616607144774






Extrapolation Forecasts of Exponential Smoothing
tForecast95% Lower Bound95% Upper Bound
63104.801323590913103.476661082146106.125986099679
64104.144884060661102.370218658271105.919549463051
65104.133679864022101.963868680392106.303491047652
66104.801016239096102.254879688451107.347152789741
67105.093389874626102.194661840534107.992117908719
68105.574920761155102.328680252322108.821161269988
69106.36212260987102.764646236053109.959598983687
70106.675728518833102.743978344425110.607478693241
71107.132167055469102.862302882084111.402031228854
72106.91962889067102.337458918279111.501798863062
73107.324320140918102.404713253047112.243927028788
74107.48627098824999.6497429294736115.322799047024

\begin{tabular}{lllllllll}
\hline
Extrapolation Forecasts of Exponential Smoothing \tabularnewline
t & Forecast & 95% Lower Bound & 95% Upper Bound \tabularnewline
63 & 104.801323590913 & 103.476661082146 & 106.125986099679 \tabularnewline
64 & 104.144884060661 & 102.370218658271 & 105.919549463051 \tabularnewline
65 & 104.133679864022 & 101.963868680392 & 106.303491047652 \tabularnewline
66 & 104.801016239096 & 102.254879688451 & 107.347152789741 \tabularnewline
67 & 105.093389874626 & 102.194661840534 & 107.992117908719 \tabularnewline
68 & 105.574920761155 & 102.328680252322 & 108.821161269988 \tabularnewline
69 & 106.36212260987 & 102.764646236053 & 109.959598983687 \tabularnewline
70 & 106.675728518833 & 102.743978344425 & 110.607478693241 \tabularnewline
71 & 107.132167055469 & 102.862302882084 & 111.402031228854 \tabularnewline
72 & 106.91962889067 & 102.337458918279 & 111.501798863062 \tabularnewline
73 & 107.324320140918 & 102.404713253047 & 112.243927028788 \tabularnewline
74 & 107.486270988249 & 99.6497429294736 & 115.322799047024 \tabularnewline
\hline
\end{tabular}
%Source: https://freestatistics.org/blog/index.php?pk=&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]63[/C][C]104.801323590913[/C][C]103.476661082146[/C][C]106.125986099679[/C][/ROW]
[ROW][C]64[/C][C]104.144884060661[/C][C]102.370218658271[/C][C]105.919549463051[/C][/ROW]
[ROW][C]65[/C][C]104.133679864022[/C][C]101.963868680392[/C][C]106.303491047652[/C][/ROW]
[ROW][C]66[/C][C]104.801016239096[/C][C]102.254879688451[/C][C]107.347152789741[/C][/ROW]
[ROW][C]67[/C][C]105.093389874626[/C][C]102.194661840534[/C][C]107.992117908719[/C][/ROW]
[ROW][C]68[/C][C]105.574920761155[/C][C]102.328680252322[/C][C]108.821161269988[/C][/ROW]
[ROW][C]69[/C][C]106.36212260987[/C][C]102.764646236053[/C][C]109.959598983687[/C][/ROW]
[ROW][C]70[/C][C]106.675728518833[/C][C]102.743978344425[/C][C]110.607478693241[/C][/ROW]
[ROW][C]71[/C][C]107.132167055469[/C][C]102.862302882084[/C][C]111.402031228854[/C][/ROW]
[ROW][C]72[/C][C]106.91962889067[/C][C]102.337458918279[/C][C]111.501798863062[/C][/ROW]
[ROW][C]73[/C][C]107.324320140918[/C][C]102.404713253047[/C][C]112.243927028788[/C][/ROW]
[ROW][C]74[/C][C]107.486270988249[/C][C]99.6497429294736[/C][C]115.322799047024[/C][/ROW]
[/TABLE]
Source: https://freestatistics.org/blog/index.php?pk=&T=3

Globally Unique Identifier (entire table): ba.freestatistics.org/blog/index.php?pk=&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
63104.801323590913103.476661082146106.125986099679
64104.144884060661102.370218658271105.919549463051
65104.133679864022101.963868680392106.303491047652
66104.801016239096102.254879688451107.347152789741
67105.093389874626102.194661840534107.992117908719
68105.574920761155102.328680252322108.821161269988
69106.36212260987102.764646236053109.959598983687
70106.675728518833102.743978344425110.607478693241
71107.132167055469102.862302882084111.402031228854
72106.91962889067102.337458918279111.501798863062
73107.324320140918102.404713253047112.243927028788
74107.48627098824999.6497429294736115.322799047024


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 <- 'Single'
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')