Estimated Parameters of Exponential Smoothing
ParameterValue
alpha0.567263099764302
betaFALSE
gammaFALSE


Interpolation Forecasts of Exponential Smoothing
tObservedFittedResiduals
23969041086-1396
34312940294.1007127292834.89928727096
43786341902.234469946-4039.23446994597
53595339610.9258038496-3657.9258038496
62913337535.9194736501-8402.91947365005
72469332769.2533259575-8076.25332595751
82220528187.8928297931-5982.8928297931
92172524794.018497607-3069.01849760705
102719223053.07755142054138.92244857951
112179025400.9355292858-3610.93552928576
121325323352.5850478941-10099.5850478941
133770217623.463127292520078.5368727075
143036429013.27619243641350.72380756362
153260929779.49196644042829.50803355964
163021231384.5674643654-1172.56746436539
172996530719.4132098467-754.413209846713
182835230291.4624339259-1939.46243392593
192581429191.2769617807-3377.27696178069
202241427275.4723636784-4861.47236367841
212050624517.7384812397-4011.73848123971
222880622242.02727492796563.97272507206
232222825965.5267897207-3737.52678972065
241397123845.3657575316-9874.36575753159
253684518244.002429707718600.9975702923
263533828795.661970146542.33802986002
273502232506.88892066422515.11107933575
283477733933.6186277798843.38137222021
292688734412.0377592689-7525.0377592689
302397030143.3615141026-6173.36151410261
312278026641.4413256471-3861.44132564712
321735124450.9881497026-7099.98814970256
332138220423.4268636125958.573136387527
342456120967.19003231043593.80996768955
351740923005.8258145459-5596.82581454587
361151419830.9530541457-8316.95305414572
373151415113.052484056816400.9475159432
382707124416.70481102242654.29518897762
392946225922.38852761133539.6114723887
402610527930.2795033998-1825.2795033998
412239726894.865794365-4497.86579436498
422384324343.3925015297-500.392501529677
432170524059.5383000131-2354.53830001314
441808922723.8956054339-4634.89560543392
452076420094.6903572115669.309642788467
462531620474.36501988194841.63498011814
471770423220.8458866309-5516.84588663095
481554820091.3427880587-4543.34278805874
492802917514.072074812810514.9279251872
502938323478.80268345275904.19731654731
513643826828.03595485749609.96404514261
523203432279.4139477285-245.413947728477
532267932140.1996710146-9461.19967101463
542431926773.2102181459-2454.21021814588
551800425381.0273223272-7377.02732232722
561753721196.3119364179-3659.31193641793
572036619120.5193043611245.48069563901
582278219827.03454446582954.96545553423
591916921503.2774084686-2334.27740846855
601380720179.1279700309-6372.1279700309
612974316564.454905656413178.5450943436
622559124040.15724625741550.84275374263
632909624919.89311399244176.10688600758
642648227288.8444510961-806.844451096127
652240526831.1513667397-4426.15136673971
662704424320.35902241692723.64097758306
671797025865.3800460058-7895.38004600578
681873021386.6222872913-2656.62228729132
691968419879.6184936995-195.618493699516
701978519768.651340592316.3486594076967
711847919777.9253318049-1298.9253318049
721069819041.0929217229-8343.09292172288


Extrapolation Forecasts of Exponential Smoothing
tForecast95% Lower Bound95% Upper Bound
7314308.36416932481802.4654353410626814.2629033084
7414308.3641693248-69.544331462215328686.2726701117
7514308.3641693248-1724.446020075930341.1743587254
7614308.3641693248-3223.8277153682831840.5560540178
7714308.3641693248-4604.7133696175433221.441708267
7814308.3641693248-5891.4192875935634508.1476262431
7914308.3641693248-7100.9329097186835717.6612483682
8014308.3641693248-8245.6765136900136862.4048523395
8114308.3641693248-9335.0598814220437951.7882200715
8214308.3641693248-10376.413539939338993.1418785888
8314308.3641693248-11375.580237018439992.3085756679
8414308.3641693248-12337.306210316240954.0345489657